0.08/0.14 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.08/0.14 % Command : vampire --mode casc -t %d %s 0.16/0.36 % Computer : n021.cluster.edu 0.16/0.36 % Model : x86_64 x86_64 0.16/0.36 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.16/0.36 % Memory : 8042.1875MB 0.16/0.36 % OS : Linux 3.10.0-693.el7.x86_64 0.16/0.36 % CPULimit : 960 0.16/0.36 % DateTime : Thu Jul 2 07:38:37 EDT 2020 0.16/0.36 % CPUTime : 0.23/0.47 % dis+11_3_afr=on:afp=4000:afq=1.4:anc=none:cond=on:fsr=off:gs=on:lcm=reverse:nm=64:nwc=1:sos=on:sp=reverse_arity_3 on theBenchmark 0.85/1.07 % Time limit reached! 0.85/1.07 % ------------------------------ 0.85/1.07 % Version: Vampire 4.4.0 (commit 7916d27 on 2019-08-23 08:50:16 +0100) 0.85/1.07 % Termination reason: Time limit 0.85/1.07 % Termination phase: Saturation 0.85/1.07 0.85/1.07 % Memory used [KB]: 7036 0.85/1.07 % Time elapsed: 0.600 s 0.85/1.07 % ------------------------------ 0.85/1.07 % ------------------------------ 0.92/1.13 % dis+1011_10_add=large:afr=on:afp=4000:afq=1.0:amm=off:anc=none:lma=on:nm=64:nwc=4:sac=on:sp=occurrence_75 on theBenchmark 10.98/11.03 % Time limit reached! 10.98/11.03 % ------------------------------ 10.98/11.03 % Version: Vampire 4.4.0 (commit 7916d27 on 2019-08-23 08:50:16 +0100) 10.98/11.03 % Termination reason: Time limit 10.98/11.03 % Termination phase: Saturation 10.98/11.03 10.98/11.03 % Memory used [KB]: 14711 10.98/11.03 % Time elapsed: 9.900 s 10.98/11.03 % ------------------------------ 10.98/11.03 % ------------------------------ 10.98/11.06 % ins+11_32_av=off:igbrr=0.4:igrr=1/64:igrpq=1.05:igwr=on:lcm=reverse:lma=on:nm=64:newcnf=on:nwc=1:sp=reverse_arity:updr=off_55 on theBenchmark 18.46/18.36 % Time limit reached! 18.46/18.36 % ------------------------------ 18.46/18.36 % Version: Vampire 4.4.0 (commit 7916d27 on 2019-08-23 08:50:16 +0100) 18.46/18.36 % Termination reason: Time limit 18.46/18.36 % Termination phase: Saturation 18.46/18.36 18.46/18.36 % Memory used [KB]: 24690 18.46/18.36 % Time elapsed: 7.300 s 18.46/18.36 % ------------------------------ 18.46/18.36 % ------------------------------ 18.46/18.40 % lrs+1011_1024_add=large:afp=4000:afq=1.1:anc=none:br=off:fsr=off:gsp=input_only:lma=on:nwc=1:stl=30:sos=on:urr=on_187 on theBenchmark 23.28/23.14 % Refutation found. Thanks to Tanya! 23.28/23.14 % SZS status Theorem for theBenchmark 23.28/23.14 % SZS output start Proof for theBenchmark 23.28/23.14 fof(f664275,plain,( 23.28/23.14 $false), 23.28/23.14 inference(unit_resulting_resolution,[],[f472263,f715,f663893,f663947,f4616])). 23.28/23.14 fof(f4616,plain,( 23.28/23.14 ( ! [X28,X27] : (~p24(X28) | ~p25(X28) | ~r1(X27,X28) | sP2154(X27)) )), 23.28/23.14 inference(cnf_transformation,[],[f4616_D])). 23.28/23.14 fof(f4616_D,plain,( 23.28/23.14 ( ! [X27] : (( ! [X28] : (~p24(X28) | ~p25(X28) | ~r1(X27,X28)) ) <=> ~sP2154(X27)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2154])])). 23.28/23.14 fof(f663947,plain,( 23.28/23.14 p24(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472258,f6450,f663755,f4724])). 23.28/23.14 fof(f4724,plain,( 23.28/23.14 ( ! [X26,X27] : (p23(X27) | ~r1(X26,X27) | p24(X27) | sP2208(X26)) )), 23.28/23.14 inference(cnf_transformation,[],[f4724_D])). 23.28/23.14 fof(f4724_D,plain,( 23.28/23.14 ( ! [X26] : (( ! [X27] : (p23(X27) | ~r1(X26,X27) | p24(X27)) ) <=> ~sP2208(X26)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2208])])). 23.28/23.14 fof(f663755,plain,( 23.28/23.14 ~p23(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472252,f6450,f663563,f4824])). 23.28/23.14 fof(f4824,plain,( 23.28/23.14 ( ! [X26,X25] : (~p22(X26) | ~p23(X26) | ~r1(X25,X26) | sP2258(X25)) )), 23.28/23.14 inference(cnf_transformation,[],[f4824_D])). 23.28/23.14 fof(f4824_D,plain,( 23.28/23.14 ( ! [X25] : (( ! [X26] : (~p22(X26) | ~p23(X26) | ~r1(X25,X26)) ) <=> ~sP2258(X25)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2258])])). 23.28/23.14 fof(f663563,plain,( 23.28/23.14 p22(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472249,f6450,f663371,f4962])). 23.28/23.14 fof(f4962,plain,( 23.28/23.14 ( ! [X24,X23] : (p21(X24) | ~r1(X23,X24) | p22(X24) | sP2327(X23)) )), 23.28/23.14 inference(cnf_transformation,[],[f4962_D])). 23.28/23.14 fof(f4962_D,plain,( 23.28/23.14 ( ! [X23] : (( ! [X24] : (p21(X24) | ~r1(X23,X24) | p22(X24)) ) <=> ~sP2327(X23)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2327])])). 23.28/23.14 fof(f663371,plain,( 23.28/23.14 ~p21(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472240,f6450,f663179,f5008])). 23.28/23.14 fof(f5008,plain,( 23.28/23.14 ( ! [X24,X23] : (~r1(X23,X24) | ~p20(X24) | ~p21(X24) | sP2350(X23)) )), 23.28/23.14 inference(cnf_transformation,[],[f5008_D])). 23.28/23.14 fof(f5008_D,plain,( 23.28/23.14 ( ! [X23] : (( ! [X24] : (~r1(X23,X24) | ~p20(X24) | ~p21(X24)) ) <=> ~sP2350(X23)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2350])])). 23.28/23.14 fof(f663179,plain,( 23.28/23.14 p20(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472237,f6450,f662987,f5140])). 23.28/23.14 fof(f5140,plain,( 23.28/23.14 ( ! [X23,X22] : (p20(X23) | p19(X23) | ~r1(X22,X23) | sP2416(X22)) )), 23.28/23.14 inference(cnf_transformation,[],[f5140_D])). 23.28/23.14 fof(f5140_D,plain,( 23.28/23.14 ( ! [X22] : (( ! [X23] : (p20(X23) | p19(X23) | ~r1(X22,X23)) ) <=> ~sP2416(X22)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2416])])). 23.28/23.14 fof(f662987,plain,( 23.28/23.14 ~p19(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472231,f6450,f662795,f5250])). 23.28/23.14 fof(f5250,plain,( 23.28/23.14 ( ! [X21,X22] : (~p19(X22) | ~p18(X22) | ~r1(X21,X22) | sP2471(X21)) )), 23.28/23.14 inference(cnf_transformation,[],[f5250_D])). 23.28/23.14 fof(f5250_D,plain,( 23.28/23.14 ( ! [X21] : (( ! [X22] : (~p19(X22) | ~p18(X22) | ~r1(X21,X22)) ) <=> ~sP2471(X21)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2471])])). 23.28/23.14 fof(f662795,plain,( 23.28/23.14 p18(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472222,f6450,f662603,f5292])). 23.28/23.14 fof(f5292,plain,( 23.28/23.14 ( ! [X19,X20] : (p18(X20) | p17(X20) | ~r1(X19,X20) | sP2492(X19)) )), 23.28/23.14 inference(cnf_transformation,[],[f5292_D])). 23.28/23.14 fof(f5292_D,plain,( 23.28/23.14 ( ! [X19] : (( ! [X20] : (p18(X20) | p17(X20) | ~r1(X19,X20)) ) <=> ~sP2492(X19)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2492])])). 23.28/23.14 fof(f662603,plain,( 23.28/23.14 ~p17(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472219,f6450,f662411,f5374])). 23.28/23.14 fof(f5374,plain,( 23.28/23.14 ( ! [X19,X18] : (~p17(X19) | ~p16(X19) | ~r1(X18,X19) | sP2533(X18)) )), 23.28/23.14 inference(cnf_transformation,[],[f5374_D])). 23.28/23.14 fof(f5374_D,plain,( 23.28/23.14 ( ! [X18] : (( ! [X19] : (~p17(X19) | ~p16(X19) | ~r1(X18,X19)) ) <=> ~sP2533(X18)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2533])])). 23.28/23.14 fof(f662411,plain,( 23.28/23.14 p16(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472213,f6450,f662219,f5444])). 23.28/23.14 fof(f5444,plain,( 23.28/23.14 ( ! [X19,X18] : (p15(X19) | p16(X19) | ~r1(X18,X19) | sP2568(X18)) )), 23.28/23.14 inference(cnf_transformation,[],[f5444_D])). 23.28/23.14 fof(f5444_D,plain,( 23.28/23.14 ( ! [X18] : (( ! [X19] : (p15(X19) | p16(X19) | ~r1(X18,X19)) ) <=> ~sP2568(X18)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2568])])). 23.28/23.14 fof(f662219,plain,( 23.28/23.14 ~p15(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472204,f6450,f662027,f5506])). 23.28/23.14 fof(f5506,plain,( 23.28/23.14 ( ! [X17,X18] : (~p14(X18) | ~p15(X18) | ~r1(X17,X18) | sP2599(X17)) )), 23.28/23.14 inference(cnf_transformation,[],[f5506_D])). 23.28/23.14 fof(f5506_D,plain,( 23.28/23.14 ( ! [X17] : (( ! [X18] : (~p14(X18) | ~p15(X18) | ~r1(X17,X18)) ) <=> ~sP2599(X17)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2599])])). 23.28/23.14 fof(f662027,plain,( 23.28/23.14 p14(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472198,f6450,f661835,f5542])). 23.28/23.14 fof(f5542,plain,( 23.28/23.14 ( ! [X17,X16] : (sP2617(X16) | p14(X17) | p13(X17) | ~r1(X16,X17)) )), 23.28/23.14 inference(cnf_transformation,[],[f5542_D])). 23.28/23.14 fof(f5542_D,plain,( 23.28/23.14 ( ! [X16] : (( ! [X17] : (p14(X17) | p13(X17) | ~r1(X16,X17)) ) <=> ~sP2617(X16)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2617])])). 23.28/23.14 fof(f661835,plain,( 23.28/23.14 ~p13(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472195,f6450,f661643,f5655])). 23.28/23.14 fof(f5655,plain,( 23.28/23.14 ( ! [X15,X16] : (~sP2673(X15) | ~p12(X16) | ~r1(X15,X16) | ~p13(X16)) )), 23.28/23.14 inference(general_splitting,[],[f5653,f5654_D])). 23.28/23.14 fof(f5654,plain,( 23.28/23.14 ( ! [X14,X15] : (~sP2672(X14) | ~r1(X14,X15) | sP2673(X15)) )), 23.28/23.14 inference(cnf_transformation,[],[f5654_D])). 23.28/23.14 fof(f5654_D,plain,( 23.28/23.14 ( ! [X15] : (( ! [X14] : (~sP2672(X14) | ~r1(X14,X15)) ) <=> ~sP2673(X15)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2673])])). 23.28/23.14 fof(f5653,plain,( 23.28/23.14 ( ! [X14,X15,X16] : (~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~sP2672(X14)) )), 23.28/23.14 inference(general_splitting,[],[f5651,f5652_D])). 23.28/23.14 fof(f5652,plain,( 23.28/23.14 ( ! [X14,X13] : (~sP2671(X13) | ~r1(X13,X14) | sP2672(X14)) )), 23.28/23.14 inference(cnf_transformation,[],[f5652_D])). 23.28/23.14 fof(f5652_D,plain,( 23.28/23.14 ( ! [X14] : (( ! [X13] : (~sP2671(X13) | ~r1(X13,X14)) ) <=> ~sP2672(X14)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2672])])). 23.28/23.14 fof(f5651,plain,( 23.28/23.14 ( ! [X14,X15,X13,X16] : (~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2671(X13)) )), 23.28/23.14 inference(general_splitting,[],[f5649,f5650_D])). 23.28/23.14 fof(f5650,plain,( 23.28/23.14 ( ! [X12,X13] : (~sP2670(X12) | ~r1(X12,X13) | sP2671(X13)) )), 23.28/23.14 inference(cnf_transformation,[],[f5650_D])). 23.28/23.14 fof(f5650_D,plain,( 23.28/23.14 ( ! [X13] : (( ! [X12] : (~sP2670(X12) | ~r1(X12,X13)) ) <=> ~sP2671(X13)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2671])])). 23.28/23.14 fof(f5649,plain,( 23.28/23.14 ( ! [X14,X12,X15,X13,X16] : (~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2670(X12)) )), 23.28/23.14 inference(general_splitting,[],[f5647,f5648_D])). 23.28/23.14 fof(f5648,plain,( 23.28/23.14 ( ! [X12,X11] : (~sP2669(X11) | ~r1(X11,X12) | sP2670(X12)) )), 23.28/23.14 inference(cnf_transformation,[],[f5648_D])). 23.28/23.14 fof(f5648_D,plain,( 23.28/23.14 ( ! [X12] : (( ! [X11] : (~sP2669(X11) | ~r1(X11,X12)) ) <=> ~sP2670(X12)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2670])])). 23.28/23.14 fof(f5647,plain,( 23.28/23.14 ( ! [X14,X12,X15,X13,X11,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2669(X11)) )), 23.28/23.14 inference(general_splitting,[],[f5645,f5646_D])). 23.28/23.14 fof(f5646,plain,( 23.28/23.14 ( ! [X10,X11] : (~sP2668(X10) | ~r1(X10,X11) | sP2669(X11)) )), 23.28/23.14 inference(cnf_transformation,[],[f5646_D])). 23.28/23.14 fof(f5646_D,plain,( 23.28/23.14 ( ! [X11] : (( ! [X10] : (~sP2668(X10) | ~r1(X10,X11)) ) <=> ~sP2669(X11)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2669])])). 23.28/23.14 fof(f5645,plain,( 23.28/23.14 ( ! [X14,X12,X10,X15,X13,X11,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2668(X10)) )), 23.28/23.14 inference(general_splitting,[],[f5643,f5644_D])). 23.28/23.14 fof(f5644,plain,( 23.28/23.14 ( ! [X10,X9] : (~sP2667(X9) | ~r1(X9,X10) | sP2668(X10)) )), 23.28/23.14 inference(cnf_transformation,[],[f5644_D])). 23.28/23.14 fof(f5644_D,plain,( 23.28/23.14 ( ! [X10] : (( ! [X9] : (~sP2667(X9) | ~r1(X9,X10)) ) <=> ~sP2668(X10)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2668])])). 23.28/23.14 fof(f5643,plain,( 23.28/23.14 ( ! [X14,X12,X10,X15,X13,X11,X9,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP2667(X9)) )), 23.28/23.14 inference(general_splitting,[],[f5641,f5642_D])). 23.28/23.14 fof(f5642,plain,( 23.28/23.14 ( ! [X8,X9] : (~sP2666(X8) | ~r1(X8,X9) | sP2667(X9)) )), 23.28/23.14 inference(cnf_transformation,[],[f5642_D])). 23.28/23.14 fof(f5642_D,plain,( 23.28/23.14 ( ! [X9] : (( ! [X8] : (~sP2666(X8) | ~r1(X8,X9)) ) <=> ~sP2667(X9)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2667])])). 23.28/23.14 fof(f5641,plain,( 23.28/23.14 ( ! [X14,X12,X10,X8,X15,X13,X11,X9,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP2666(X8)) )), 23.28/23.14 inference(general_splitting,[],[f5639,f5640_D])). 23.28/23.14 fof(f5640,plain,( 23.28/23.14 ( ! [X8,X7] : (~sP2665(X7) | ~r1(X7,X8) | sP2666(X8)) )), 23.28/23.14 inference(cnf_transformation,[],[f5640_D])). 23.28/23.14 fof(f5640_D,plain,( 23.28/23.14 ( ! [X8] : (( ! [X7] : (~sP2665(X7) | ~r1(X7,X8)) ) <=> ~sP2666(X8)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2666])])). 23.28/23.14 fof(f5639,plain,( 23.28/23.14 ( ! [X14,X12,X10,X8,X7,X15,X13,X11,X9,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP2665(X7)) )), 23.28/23.14 inference(general_splitting,[],[f5637,f5638_D])). 23.28/23.14 fof(f5638,plain,( 23.28/23.14 ( ! [X6,X7] : (~sP2664(X6) | ~r1(X6,X7) | sP2665(X7)) )), 23.28/23.14 inference(cnf_transformation,[],[f5638_D])). 23.28/23.14 fof(f5638_D,plain,( 23.28/23.14 ( ! [X7] : (( ! [X6] : (~sP2664(X6) | ~r1(X6,X7)) ) <=> ~sP2665(X7)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2665])])). 23.28/23.14 fof(f5637,plain,( 23.28/23.14 ( ! [X6,X14,X12,X10,X8,X7,X15,X13,X11,X9,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP2664(X6)) )), 23.28/23.14 inference(general_splitting,[],[f5635,f5636_D])). 23.28/23.14 fof(f5636,plain,( 23.28/23.14 ( ! [X6,X5] : (~sP2663(X5) | ~r1(X5,X6) | sP2664(X6)) )), 23.28/23.14 inference(cnf_transformation,[],[f5636_D])). 23.28/23.14 fof(f5636_D,plain,( 23.28/23.14 ( ! [X6] : (( ! [X5] : (~sP2663(X5) | ~r1(X5,X6)) ) <=> ~sP2664(X6)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2664])])). 23.28/23.14 fof(f5635,plain,( 23.28/23.14 ( ! [X6,X14,X12,X10,X8,X7,X5,X15,X13,X11,X9,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2663(X5)) )), 23.28/23.14 inference(general_splitting,[],[f5633,f5634_D])). 23.28/23.14 fof(f5634,plain,( 23.28/23.14 ( ! [X4,X5] : (~sP2662(X4) | ~r1(X4,X5) | sP2663(X5)) )), 23.28/23.14 inference(cnf_transformation,[],[f5634_D])). 23.28/23.14 fof(f5634_D,plain,( 23.28/23.14 ( ! [X5] : (( ! [X4] : (~sP2662(X4) | ~r1(X4,X5)) ) <=> ~sP2663(X5)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2663])])). 23.28/23.14 fof(f5633,plain,( 23.28/23.14 ( ! [X6,X4,X14,X12,X10,X8,X7,X5,X15,X13,X11,X9,X16] : (~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2662(X4)) )), 23.28/23.14 inference(general_splitting,[],[f5631,f5632_D])). 23.28/23.14 fof(f5632,plain,( 23.28/23.14 ( ! [X4,X3] : (~sP2661(X3) | ~r1(X3,X4) | sP2662(X4)) )), 23.28/23.14 inference(cnf_transformation,[],[f5632_D])). 23.28/23.14 fof(f5632_D,plain,( 23.28/23.14 ( ! [X4] : (( ! [X3] : (~sP2661(X3) | ~r1(X3,X4)) ) <=> ~sP2662(X4)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2662])])). 23.28/23.14 fof(f5631,plain,( 23.28/23.14 ( ! [X6,X4,X14,X12,X10,X8,X7,X5,X3,X15,X13,X11,X9,X16] : (~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2661(X3)) )), 23.28/23.14 inference(general_splitting,[],[f5629,f5630_D])). 23.28/23.14 fof(f5630,plain,( 23.28/23.14 ( ! [X3,X1] : (~sP2660(X1) | ~r1(X1,X3) | sP2661(X3)) )), 23.28/23.14 inference(cnf_transformation,[],[f5630_D])). 23.28/23.14 fof(f5630_D,plain,( 23.28/23.14 ( ! [X3] : (( ! [X1] : (~sP2660(X1) | ~r1(X1,X3)) ) <=> ~sP2661(X3)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2661])])). 23.28/23.14 fof(f5629,plain,( 23.28/23.14 ( ! [X6,X4,X14,X12,X10,X8,X7,X5,X3,X1,X15,X13,X11,X9,X16] : (~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP2660(X1)) )), 23.28/23.14 inference(general_splitting,[],[f546,f5628_D])). 23.28/23.14 fof(f5628,plain,( 23.28/23.14 ( ! [X0,X1] : (~sP10(X0) | ~r1(X0,X1) | sP2660(X1)) )), 23.28/23.14 inference(cnf_transformation,[],[f5628_D])). 23.28/23.14 fof(f5628_D,plain,( 23.28/23.14 ( ! [X1] : (( ! [X0] : (~sP10(X0) | ~r1(X0,X1)) ) <=> ~sP2660(X1)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2660])])). 23.28/23.14 fof(f546,plain,( 23.28/23.14 ( ! [X6,X4,X0,X14,X12,X10,X8,X7,X5,X3,X1,X15,X13,X11,X9,X16] : (~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~p13(X16) | ~p12(X16) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP10(X0)) )), 23.28/23.14 inference(cnf_transformation,[],[f210])). 23.28/23.14 fof(f210,plain,( 23.28/23.14 ! [X0] : (! [X1] : (((~p13(sK85(X1)) & r1(X1,sK85(X1))) & sP9(X1) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (((p13(X16) | p12(X16)) & (~p13(X16) | ~p12(X16))) | ~r1(X15,X16))) | ~r1(X13,X14)) | ~r1(X12,X13)))) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6))) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP10(X0))), 23.28/23.14 inference(skolemisation,[status(esa),new_symbols(skolem,[sK85])],[f208,f209])). 23.28/23.14 fof(f209,plain,( 23.28/23.14 ! [X1] : (? [X2] : (~p13(X2) & r1(X1,X2)) => (~p13(sK85(X1)) & r1(X1,sK85(X1))))), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f208,plain,( 23.28/23.14 ! [X0] : (! [X1] : ((? [X2] : (~p13(X2) & r1(X1,X2)) & sP9(X1) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (((p13(X16) | p12(X16)) & (~p13(X16) | ~p12(X16))) | ~r1(X15,X16))) | ~r1(X13,X14)) | ~r1(X12,X13)))) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6))) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP10(X0))), 23.28/23.14 inference(rectify,[],[f207])). 23.28/23.14 fof(f207,plain,( 23.28/23.14 ! [X503] : (! [X505] : ((? [X506] : (~p13(X506) & r1(X505,X506)) & sP9(X505) & ! [X616] : (! [X617] : (! [X618] : (~r1(X617,X618) | ! [X619] : (! [X620] : (! [X621] : (! [X622] : (~r1(X621,X622) | ! [X623] : (! [X624] : (~r1(X623,X624) | ! [X625] : (~r1(X624,X625) | ! [X626] : (! [X627] : (! [X628] : (~r1(X627,X628) | ! [X629] : (((p13(X629) | p12(X629)) & (~p13(X629) | ~p12(X629))) | ~r1(X628,X629))) | ~r1(X626,X627)) | ~r1(X625,X626)))) | ~r1(X622,X623))) | ~r1(X620,X621)) | ~r1(X619,X620)) | ~r1(X618,X619))) | ~r1(X616,X617)) | ~r1(X505,X616))) | ~r1(X503,X505)) | ~sP10(X503))), 23.28/23.14 inference(nnf_transformation,[],[f20])). 23.28/23.14 fof(f20,plain,( 23.28/23.14 ! [X503] : (! [X505] : ((? [X506] : (~p13(X506) & r1(X505,X506)) & sP9(X505) & ! [X616] : (! [X617] : (! [X618] : (~r1(X617,X618) | ! [X619] : (! [X620] : (! [X621] : (! [X622] : (~r1(X621,X622) | ! [X623] : (! [X624] : (~r1(X623,X624) | ! [X625] : (~r1(X624,X625) | ! [X626] : (! [X627] : (! [X628] : (~r1(X627,X628) | ! [X629] : (((p13(X629) | p12(X629)) & (~p13(X629) | ~p12(X629))) | ~r1(X628,X629))) | ~r1(X626,X627)) | ~r1(X625,X626)))) | ~r1(X622,X623))) | ~r1(X620,X621)) | ~r1(X619,X620)) | ~r1(X618,X619))) | ~r1(X616,X617)) | ~r1(X505,X616))) | ~r1(X503,X505)) | ~sP10(X503))), 23.28/23.14 introduced(predicate_definition_introduction,[new_symbols(naming,[sP10])])). 23.28/23.14 fof(f661643,plain,( 23.28/23.14 p12(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472186,f6450,f661451,f5658])). 23.28/23.14 fof(f5658,plain,( 23.28/23.14 ( ! [X14,X13] : (p12(X14) | ~r1(X13,X14) | p11(X14) | sP2675(X13)) )), 23.28/23.14 inference(cnf_transformation,[],[f5658_D])). 23.28/23.14 fof(f5658_D,plain,( 23.28/23.14 ( ! [X13] : (( ! [X14] : (p12(X14) | ~r1(X13,X14) | p11(X14)) ) <=> ~sP2675(X13)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2675])])). 23.28/23.14 fof(f661451,plain,( 23.28/23.14 ~p11(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472183,f6450,f661259,f5734])). 23.28/23.14 fof(f5734,plain,( 23.28/23.14 ( ! [X14,X13] : (~p11(X14) | ~r1(X13,X14) | ~p10(X14) | sP2713(X13)) )), 23.28/23.14 inference(cnf_transformation,[],[f5734_D])). 23.28/23.14 fof(f5734_D,plain,( 23.28/23.14 ( ! [X13] : (( ! [X14] : (~p11(X14) | ~r1(X13,X14) | ~p10(X14)) ) <=> ~sP2713(X13)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2713])])). 23.28/23.14 fof(f661259,plain,( 23.28/23.14 p10(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472177,f6450,f661067,f5780])). 23.28/23.14 fof(f5780,plain,( 23.28/23.14 ( ! [X12,X11] : (p10(X12) | ~r1(X11,X12) | p9(X12) | sP2736(X11)) )), 23.28/23.14 inference(cnf_transformation,[],[f5780_D])). 23.28/23.14 fof(f5780_D,plain,( 23.28/23.14 ( ! [X11] : (( ! [X12] : (p10(X12) | ~r1(X11,X12) | p9(X12)) ) <=> ~sP2736(X11)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2736])])). 23.28/23.14 fof(f661067,plain,( 23.28/23.14 ~p9(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472171,f6450,f660875,f5822])). 23.28/23.14 fof(f5822,plain,( 23.28/23.14 ( ! [X12,X11] : (~p9(X12) | ~p8(X12) | ~r1(X11,X12) | sP2757(X11)) )), 23.28/23.14 inference(cnf_transformation,[],[f5822_D])). 23.28/23.14 fof(f5822_D,plain,( 23.28/23.14 ( ! [X11] : (( ! [X12] : (~p9(X12) | ~p8(X12) | ~r1(X11,X12)) ) <=> ~sP2757(X11)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2757])])). 23.28/23.14 fof(f660875,plain,( 23.28/23.14 p8(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472165,f6450,f660683,f5860])). 23.28/23.14 fof(f5860,plain,( 23.28/23.14 ( ! [X10,X9] : (sP2776(X9) | p8(X10) | ~r1(X9,X10) | p7(X10)) )), 23.28/23.14 inference(cnf_transformation,[],[f5860_D])). 23.28/23.14 fof(f5860_D,plain,( 23.28/23.14 ( ! [X9] : (( ! [X10] : (p8(X10) | ~r1(X9,X10) | p7(X10)) ) <=> ~sP2776(X9)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2776])])). 23.28/23.14 fof(f660683,plain,( 23.28/23.14 ~p7(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472156,f6450,f660491,f5891])). 23.28/23.14 fof(f5891,plain,( 23.28/23.14 ( ! [X8,X9] : (~sP2791(X8) | ~p6(X9) | ~r1(X8,X9) | ~p7(X9)) )), 23.28/23.14 inference(general_splitting,[],[f5889,f5890_D])). 23.28/23.14 fof(f5890,plain,( 23.28/23.14 ( ! [X8,X7] : (~sP2790(X7) | ~r1(X7,X8) | sP2791(X8)) )), 23.28/23.14 inference(cnf_transformation,[],[f5890_D])). 23.28/23.14 fof(f5890_D,plain,( 23.28/23.14 ( ! [X8] : (( ! [X7] : (~sP2790(X7) | ~r1(X7,X8)) ) <=> ~sP2791(X8)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2791])])). 23.28/23.14 fof(f5889,plain,( 23.28/23.14 ( ! [X8,X7,X9] : (~p7(X9) | ~p6(X9) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2790(X7)) )), 23.28/23.14 inference(general_splitting,[],[f5887,f5888_D])). 23.28/23.14 fof(f5888,plain,( 23.28/23.14 ( ! [X6,X7] : (~sP2789(X6) | ~r1(X6,X7) | sP2790(X7)) )), 23.28/23.14 inference(cnf_transformation,[],[f5888_D])). 23.28/23.14 fof(f5888_D,plain,( 23.28/23.14 ( ! [X7] : (( ! [X6] : (~sP2789(X6) | ~r1(X6,X7)) ) <=> ~sP2790(X7)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2790])])). 23.28/23.14 fof(f5887,plain,( 23.28/23.14 ( ! [X6,X8,X7,X9] : (~r1(X6,X7) | ~p7(X9) | ~p6(X9) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2789(X6)) )), 23.28/23.14 inference(general_splitting,[],[f5885,f5886_D])). 23.28/23.14 fof(f5886,plain,( 23.28/23.14 ( ! [X6,X5] : (~sP2788(X5) | ~r1(X5,X6) | sP2789(X6)) )), 23.28/23.14 inference(cnf_transformation,[],[f5886_D])). 23.28/23.14 fof(f5886_D,plain,( 23.28/23.14 ( ! [X6] : (( ! [X5] : (~sP2788(X5) | ~r1(X5,X6)) ) <=> ~sP2789(X6)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2789])])). 23.28/23.14 fof(f5885,plain,( 23.28/23.14 ( ! [X6,X8,X7,X5,X9] : (~r1(X5,X6) | ~r1(X6,X7) | ~p7(X9) | ~p6(X9) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2788(X5)) )), 23.28/23.14 inference(general_splitting,[],[f5883,f5884_D])). 23.28/23.14 fof(f5884,plain,( 23.28/23.14 ( ! [X4,X5] : (~sP2787(X4) | ~r1(X4,X5) | sP2788(X5)) )), 23.28/23.14 inference(cnf_transformation,[],[f5884_D])). 23.28/23.14 fof(f5884_D,plain,( 23.28/23.14 ( ! [X5] : (( ! [X4] : (~sP2787(X4) | ~r1(X4,X5)) ) <=> ~sP2788(X5)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2788])])). 23.28/23.14 fof(f5883,plain,( 23.28/23.14 ( ! [X6,X4,X8,X7,X5,X9] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~p7(X9) | ~p6(X9) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2787(X4)) )), 23.28/23.14 inference(general_splitting,[],[f5881,f5882_D])). 23.28/23.14 fof(f5882,plain,( 23.28/23.14 ( ! [X4,X3] : (~sP2786(X3) | ~r1(X3,X4) | sP2787(X4)) )), 23.28/23.14 inference(cnf_transformation,[],[f5882_D])). 23.28/23.14 fof(f5882_D,plain,( 23.28/23.14 ( ! [X4] : (( ! [X3] : (~sP2786(X3) | ~r1(X3,X4)) ) <=> ~sP2787(X4)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2787])])). 23.28/23.14 fof(f5881,plain,( 23.28/23.14 ( ! [X6,X4,X8,X7,X5,X3,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~p7(X9) | ~p6(X9) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2786(X3)) )), 23.28/23.14 inference(general_splitting,[],[f5879,f5880_D])). 23.28/23.14 fof(f5880,plain,( 23.28/23.14 ( ! [X2,X3] : (~sP2785(X2) | ~r1(X2,X3) | sP2786(X3)) )), 23.28/23.14 inference(cnf_transformation,[],[f5880_D])). 23.28/23.14 fof(f5880_D,plain,( 23.28/23.14 ( ! [X3] : (( ! [X2] : (~sP2785(X2) | ~r1(X2,X3)) ) <=> ~sP2786(X3)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2786])])). 23.28/23.14 fof(f5879,plain,( 23.28/23.14 ( ! [X6,X4,X2,X8,X7,X5,X3,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~p7(X9) | ~p6(X9) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X2,X3) | ~sP2785(X2)) )), 23.28/23.14 inference(general_splitting,[],[f5877,f5878_D])). 23.28/23.14 fof(f5878,plain,( 23.28/23.14 ( ! [X2,X1] : (~sP2784(X1) | ~r1(X1,X2) | sP2785(X2)) )), 23.28/23.14 inference(cnf_transformation,[],[f5878_D])). 23.28/23.14 fof(f5878_D,plain,( 23.28/23.14 ( ! [X2] : (( ! [X1] : (~sP2784(X1) | ~r1(X1,X2)) ) <=> ~sP2785(X2)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2785])])). 23.28/23.14 fof(f5877,plain,( 23.28/23.14 ( ! [X6,X4,X2,X8,X7,X5,X3,X1,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~p7(X9) | ~p6(X9) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X2,X3) | ~r1(X1,X2) | ~sP2784(X1)) )), 23.28/23.14 inference(general_splitting,[],[f580,f5876_D])). 23.28/23.14 fof(f5876,plain,( 23.28/23.14 ( ! [X0,X1] : (~sP4(X0) | ~r1(X0,X1) | sP2784(X1)) )), 23.28/23.14 inference(cnf_transformation,[],[f5876_D])). 23.28/23.14 fof(f5876_D,plain,( 23.28/23.14 ( ! [X1] : (( ! [X0] : (~sP4(X0) | ~r1(X0,X1)) ) <=> ~sP2784(X1)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2784])])). 23.28/23.14 fof(f580,plain,( 23.28/23.14 ( ! [X6,X4,X2,X0,X8,X7,X5,X3,X1,X9] : (~r1(X0,X1) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~p7(X9) | ~p6(X9) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X2,X3) | ~r1(X1,X2) | ~sP4(X0)) )), 23.28/23.14 inference(cnf_transformation,[],[f234])). 23.28/23.14 fof(f234,plain,( 23.28/23.14 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (((~p7(X9) | ~p6(X9)) & (p6(X9) | p7(X9))) | ~r1(X8,X9)) | ~r1(X7,X8)))))) | ~r1(X2,X3)) | ~r1(X1,X2)) & (~p7(sK91(X1)) & r1(X1,sK91(X1))) & sP3(X1))) | ~sP4(X0))), 23.28/23.14 inference(skolemisation,[status(esa),new_symbols(skolem,[sK91])],[f232,f233])). 23.28/23.14 fof(f233,plain,( 23.28/23.14 ! [X1] : (? [X10] : (~p7(X10) & r1(X1,X10)) => (~p7(sK91(X1)) & r1(X1,sK91(X1))))), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f232,plain,( 23.28/23.14 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (((~p7(X9) | ~p6(X9)) & (p6(X9) | p7(X9))) | ~r1(X8,X9)) | ~r1(X7,X8)))))) | ~r1(X2,X3)) | ~r1(X1,X2)) & ? [X10] : (~p7(X10) & r1(X1,X10)) & sP3(X1))) | ~sP4(X0))), 23.28/23.14 inference(rectify,[],[f231])). 23.28/23.14 fof(f231,plain,( 23.28/23.14 ! [X538] : (! [X548] : (~r1(X538,X548) | (! [X549] : (! [X550] : (! [X551] : (~r1(X550,X551) | ! [X552] : (~r1(X551,X552) | ! [X553] : (~r1(X552,X553) | ! [X554] : (~r1(X553,X554) | ! [X555] : (! [X556] : (((~p7(X556) | ~p6(X556)) & (p6(X556) | p7(X556))) | ~r1(X555,X556)) | ~r1(X554,X555)))))) | ~r1(X549,X550)) | ~r1(X548,X549)) & ? [X557] : (~p7(X557) & r1(X548,X557)) & sP3(X548))) | ~sP4(X538))), 23.28/23.14 inference(nnf_transformation,[],[f14])). 23.28/23.14 fof(f14,plain,( 23.28/23.14 ! [X538] : (! [X548] : (~r1(X538,X548) | (! [X549] : (! [X550] : (! [X551] : (~r1(X550,X551) | ! [X552] : (~r1(X551,X552) | ! [X553] : (~r1(X552,X553) | ! [X554] : (~r1(X553,X554) | ! [X555] : (! [X556] : (((~p7(X556) | ~p6(X556)) & (p6(X556) | p7(X556))) | ~r1(X555,X556)) | ~r1(X554,X555)))))) | ~r1(X549,X550)) | ~r1(X548,X549)) & ? [X557] : (~p7(X557) & r1(X548,X557)) & sP3(X548))) | ~sP4(X538))), 23.28/23.14 introduced(predicate_definition_introduction,[new_symbols(naming,[sP4])])). 23.28/23.14 fof(f660491,plain,( 23.28/23.14 p6(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472153,f6450,f660299,f5935])). 23.28/23.14 fof(f5935,plain,( 23.28/23.14 ( ! [X8,X9] : (~sP2813(X8) | p6(X9) | p5(X9) | ~r1(X8,X9)) )), 23.28/23.14 inference(general_splitting,[],[f5933,f5934_D])). 23.28/23.14 fof(f5934,plain,( 23.28/23.14 ( ! [X8,X7] : (~sP2812(X7) | ~r1(X7,X8) | sP2813(X8)) )), 23.28/23.14 inference(cnf_transformation,[],[f5934_D])). 23.28/23.14 fof(f5934_D,plain,( 23.28/23.14 ( ! [X8] : (( ! [X7] : (~sP2812(X7) | ~r1(X7,X8)) ) <=> ~sP2813(X8)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2813])])). 23.28/23.14 fof(f5933,plain,( 23.28/23.14 ( ! [X8,X7,X9] : (~r1(X7,X8) | ~r1(X8,X9) | p6(X9) | p5(X9) | ~sP2812(X7)) )), 23.28/23.14 inference(general_splitting,[],[f5931,f5932_D])). 23.28/23.14 fof(f5932,plain,( 23.28/23.14 ( ! [X6,X7] : (~sP2811(X6) | ~r1(X6,X7) | sP2812(X7)) )), 23.28/23.14 inference(cnf_transformation,[],[f5932_D])). 23.28/23.14 fof(f5932_D,plain,( 23.28/23.14 ( ! [X7] : (( ! [X6] : (~sP2811(X6) | ~r1(X6,X7)) ) <=> ~sP2812(X7)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2812])])). 23.28/23.14 fof(f5931,plain,( 23.28/23.14 ( ! [X6,X8,X7,X9] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | p6(X9) | p5(X9) | ~sP2811(X6)) )), 23.28/23.14 inference(general_splitting,[],[f5929,f5930_D])). 23.28/23.14 fof(f5930,plain,( 23.28/23.14 ( ! [X6,X5] : (~sP2810(X5) | ~r1(X5,X6) | sP2811(X6)) )), 23.28/23.14 inference(cnf_transformation,[],[f5930_D])). 23.28/23.14 fof(f5930_D,plain,( 23.28/23.14 ( ! [X6] : (( ! [X5] : (~sP2810(X5) | ~r1(X5,X6)) ) <=> ~sP2811(X6)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2811])])). 23.28/23.14 fof(f5929,plain,( 23.28/23.14 ( ! [X6,X8,X7,X5,X9] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | p6(X9) | p5(X9) | ~r1(X5,X6) | ~sP2810(X5)) )), 23.28/23.14 inference(general_splitting,[],[f5927,f5928_D])). 23.28/23.14 fof(f5928,plain,( 23.28/23.14 ( ! [X4,X5] : (~sP2809(X4) | ~r1(X4,X5) | sP2810(X5)) )), 23.28/23.14 inference(cnf_transformation,[],[f5928_D])). 23.28/23.14 fof(f5928_D,plain,( 23.28/23.14 ( ! [X5] : (( ! [X4] : (~sP2809(X4) | ~r1(X4,X5)) ) <=> ~sP2810(X5)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2810])])). 23.28/23.14 fof(f5927,plain,( 23.28/23.14 ( ! [X6,X4,X8,X7,X5,X9] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | p6(X9) | p5(X9) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2809(X4)) )), 23.28/23.14 inference(general_splitting,[],[f5925,f5926_D])). 23.28/23.14 fof(f5926,plain,( 23.28/23.14 ( ! [X4,X3] : (~sP2808(X3) | ~r1(X3,X4) | sP2809(X4)) )), 23.28/23.14 inference(cnf_transformation,[],[f5926_D])). 23.28/23.14 fof(f5926_D,plain,( 23.28/23.14 ( ! [X4] : (( ! [X3] : (~sP2808(X3) | ~r1(X3,X4)) ) <=> ~sP2809(X4)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2809])])). 23.28/23.14 fof(f5925,plain,( 23.28/23.14 ( ! [X6,X4,X8,X7,X5,X3,X9] : (~r1(X3,X4) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | p6(X9) | p5(X9) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2808(X3)) )), 23.28/23.14 inference(general_splitting,[],[f5923,f5924_D])). 23.28/23.14 fof(f5924,plain,( 23.28/23.14 ( ! [X3,X1] : (~sP2807(X1) | ~r1(X1,X3) | sP2808(X3)) )), 23.28/23.14 inference(cnf_transformation,[],[f5924_D])). 23.28/23.14 fof(f5924_D,plain,( 23.28/23.14 ( ! [X3] : (( ! [X1] : (~sP2807(X1) | ~r1(X1,X3)) ) <=> ~sP2808(X3)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2808])])). 23.28/23.14 fof(f5923,plain,( 23.28/23.14 ( ! [X6,X4,X8,X7,X5,X3,X1,X9] : (~r1(X3,X4) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | p6(X9) | p5(X9) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~sP2807(X1)) )), 23.28/23.14 inference(general_splitting,[],[f581,f5922_D])). 23.28/23.14 fof(f5922,plain,( 23.28/23.14 ( ! [X0,X1] : (~sP3(X0) | ~r1(X0,X1) | sP2807(X1)) )), 23.28/23.14 inference(cnf_transformation,[],[f5922_D])). 23.28/23.14 fof(f5922_D,plain,( 23.28/23.14 ( ! [X1] : (( ! [X0] : (~sP3(X0) | ~r1(X0,X1)) ) <=> ~sP2807(X1)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2807])])). 23.28/23.14 fof(f581,plain,( 23.28/23.14 ( ! [X6,X4,X0,X8,X7,X5,X3,X1,X9] : (~r1(X3,X4) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | p6(X9) | p5(X9) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP3(X0)) )), 23.28/23.14 inference(cnf_transformation,[],[f238])). 23.28/23.14 fof(f238,plain,( 23.28/23.14 ! [X0] : (! [X1] : ((sP2(X1) & (~p6(sK92(X1)) & r1(X1,sK92(X1))) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ((~p5(X9) | ~p6(X9)) & (p6(X9) | p5(X9)))))) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP3(X0))), 23.28/23.14 inference(skolemisation,[status(esa),new_symbols(skolem,[sK92])],[f236,f237])). 23.28/23.14 fof(f237,plain,( 23.28/23.14 ! [X1] : (? [X2] : (~p6(X2) & r1(X1,X2)) => (~p6(sK92(X1)) & r1(X1,sK92(X1))))), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f236,plain,( 23.28/23.14 ! [X0] : (! [X1] : ((sP2(X1) & ? [X2] : (~p6(X2) & r1(X1,X2)) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ((~p5(X9) | ~p6(X9)) & (p6(X9) | p5(X9)))))) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP3(X0))), 23.28/23.14 inference(rectify,[],[f235])). 23.28/23.14 fof(f235,plain,( 23.28/23.14 ! [X548] : (! [X558] : ((sP2(X558) & ? [X584] : (~p6(X584) & r1(X558,X584)) & ! [X585] : (! [X586] : (~r1(X585,X586) | ! [X587] : (! [X588] : (! [X589] : (~r1(X588,X589) | ! [X590] : (~r1(X589,X590) | ! [X591] : (~r1(X590,X591) | ((~p5(X591) | ~p6(X591)) & (p6(X591) | p5(X591)))))) | ~r1(X587,X588)) | ~r1(X586,X587))) | ~r1(X558,X585))) | ~r1(X548,X558)) | ~sP3(X548))), 23.28/23.14 inference(nnf_transformation,[],[f13])). 23.28/23.14 fof(f13,plain,( 23.28/23.14 ! [X548] : (! [X558] : ((sP2(X558) & ? [X584] : (~p6(X584) & r1(X558,X584)) & ! [X585] : (! [X586] : (~r1(X585,X586) | ! [X587] : (! [X588] : (! [X589] : (~r1(X588,X589) | ! [X590] : (~r1(X589,X590) | ! [X591] : (~r1(X590,X591) | ((~p5(X591) | ~p6(X591)) & (p6(X591) | p5(X591)))))) | ~r1(X587,X588)) | ~r1(X586,X587))) | ~r1(X558,X585))) | ~r1(X548,X558)) | ~sP3(X548))), 23.28/23.14 introduced(predicate_definition_introduction,[new_symbols(naming,[sP3])])). 23.28/23.14 fof(f660299,plain,( 23.28/23.14 ~p5(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472147,f6450,f660107,f5950])). 23.28/23.14 fof(f5950,plain,( 23.28/23.14 ( ! [X8,X7] : (~p5(X8) | ~r1(X7,X8) | ~p4(X8) | sP2821(X7)) )), 23.28/23.14 inference(cnf_transformation,[],[f5950_D])). 23.28/23.14 fof(f5950_D,plain,( 23.28/23.14 ( ! [X7] : (( ! [X8] : (~p5(X8) | ~r1(X7,X8) | ~p4(X8)) ) <=> ~sP2821(X7)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2821])])). 23.28/23.14 fof(f660107,plain,( 23.28/23.14 p4(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472141,f6450,f659914,f5970])). 23.28/23.14 fof(f5970,plain,( 23.28/23.14 ( ! [X6,X5] : (p4(X6) | p3(X6) | ~r1(X5,X6) | sP2831(X5)) )), 23.28/23.14 inference(cnf_transformation,[],[f5970_D])). 23.28/23.14 fof(f5970_D,plain,( 23.28/23.14 ( ! [X5] : (( ! [X6] : (p4(X6) | p3(X6) | ~r1(X5,X6)) ) <=> ~sP2831(X5)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2831])])). 23.28/23.14 fof(f659914,plain,( 23.28/23.14 ~p3(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472129,f6450,f659724,f5990])). 23.28/23.14 fof(f5990,plain,( 23.28/23.14 ( ! [X4,X5] : (~p3(X5) | ~p2(X5) | ~r1(X4,X5) | sP2841(X4)) )), 23.28/23.14 inference(cnf_transformation,[],[f5990_D])). 23.28/23.14 fof(f5990_D,plain,( 23.28/23.14 ( ! [X4] : (( ! [X5] : (~p3(X5) | ~p2(X5) | ~r1(X4,X5)) ) <=> ~sP2841(X4)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2841])])). 23.28/23.14 fof(f659724,plain,( 23.28/23.14 p2(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f472132,f6450,f659532,f6003])). 23.28/23.14 fof(f6003,plain,( 23.28/23.14 ( ! [X8,X9] : (~sP2847(X8) | p2(X9) | p1(X9) | ~r1(X8,X9)) )), 23.28/23.14 inference(general_splitting,[],[f6001,f6002_D])). 23.28/23.14 fof(f6002,plain,( 23.28/23.14 ( ! [X8,X7] : (~sP2846(X7) | ~r1(X7,X8) | sP2847(X8)) )), 23.28/23.14 inference(cnf_transformation,[],[f6002_D])). 23.28/23.14 fof(f6002_D,plain,( 23.28/23.14 ( ! [X8] : (( ! [X7] : (~sP2846(X7) | ~r1(X7,X8)) ) <=> ~sP2847(X8)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2847])])). 23.28/23.14 fof(f6001,plain,( 23.28/23.14 ( ! [X8,X7,X9] : (~r1(X7,X8) | ~r1(X8,X9) | p2(X9) | p1(X9) | ~sP2846(X7)) )), 23.28/23.14 inference(general_splitting,[],[f5999,f6000_D])). 23.28/23.14 fof(f6000,plain,( 23.28/23.14 ( ! [X6,X7] : (~sP2845(X6) | ~r1(X6,X7) | sP2846(X7)) )), 23.28/23.14 inference(cnf_transformation,[],[f6000_D])). 23.28/23.14 fof(f6000_D,plain,( 23.28/23.14 ( ! [X7] : (( ! [X6] : (~sP2845(X6) | ~r1(X6,X7)) ) <=> ~sP2846(X7)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2846])])). 23.28/23.14 fof(f5999,plain,( 23.28/23.14 ( ! [X6,X8,X7,X9] : (~r1(X7,X8) | ~r1(X8,X9) | p2(X9) | p1(X9) | ~r1(X6,X7) | ~sP2845(X6)) )), 23.28/23.14 inference(general_splitting,[],[f5997,f5998_D])). 23.28/23.14 fof(f5998,plain,( 23.28/23.14 ( ! [X6,X1] : (~sP2844(X1) | ~r1(X1,X6) | sP2845(X6)) )), 23.28/23.14 inference(cnf_transformation,[],[f5998_D])). 23.28/23.14 fof(f5998_D,plain,( 23.28/23.14 ( ! [X6] : (( ! [X1] : (~sP2844(X1) | ~r1(X1,X6)) ) <=> ~sP2845(X6)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2845])])). 23.28/23.14 fof(f5997,plain,( 23.28/23.14 ( ! [X6,X8,X7,X1,X9] : (~r1(X7,X8) | ~r1(X8,X9) | p2(X9) | p1(X9) | ~r1(X6,X7) | ~r1(X1,X6) | ~sP2844(X1)) )), 23.28/23.14 inference(general_splitting,[],[f599,f5996_D])). 23.28/23.14 fof(f5996,plain,( 23.28/23.14 ( ! [X0,X1] : (~sP0(X0) | ~r1(X0,X1) | sP2844(X1)) )), 23.28/23.14 inference(cnf_transformation,[],[f5996_D])). 23.28/23.14 fof(f5996_D,plain,( 23.28/23.14 ( ! [X1] : (( ! [X0] : (~sP0(X0) | ~r1(X0,X1)) ) <=> ~sP2844(X1)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2844])])). 23.28/23.14 fof(f599,plain,( 23.28/23.14 ( ! [X6,X0,X8,X7,X1,X9] : (~r1(X7,X8) | ~r1(X8,X9) | p2(X9) | p1(X9) | ~r1(X6,X7) | ~r1(X1,X6) | ~r1(X0,X1) | ~sP0(X0)) )), 23.28/23.14 inference(cnf_transformation,[],[f250])). 23.28/23.14 fof(f250,plain,( 23.28/23.14 ! [X0] : (! [X1] : ((! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ((p2(X5) | p3(X5)) & (~p2(X5) | ~p3(X5)))) | ~r1(X3,X4)) | ~r1(X2,X3))) & ! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ((p2(X9) | p1(X9)) & (~p1(X9) | ~p2(X9))))) | ~r1(X6,X7)) | ~r1(X1,X6)) & (~p3(sK95(X1)) & r1(X1,sK95(X1)))) | ~r1(X0,X1)) | ~sP0(X0))), 23.28/23.14 inference(skolemisation,[status(esa),new_symbols(skolem,[sK95])],[f248,f249])). 23.28/23.14 fof(f249,plain,( 23.28/23.14 ! [X1] : (? [X10] : (~p3(X10) & r1(X1,X10)) => (~p3(sK95(X1)) & r1(X1,sK95(X1))))), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f248,plain,( 23.28/23.14 ! [X0] : (! [X1] : ((! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ((p2(X5) | p3(X5)) & (~p2(X5) | ~p3(X5)))) | ~r1(X3,X4)) | ~r1(X2,X3))) & ! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ((p2(X9) | p1(X9)) & (~p1(X9) | ~p2(X9))))) | ~r1(X6,X7)) | ~r1(X1,X6)) & ? [X10] : (~p3(X10) & r1(X1,X10))) | ~r1(X0,X1)) | ~sP0(X0))), 23.28/23.14 inference(rectify,[],[f247])). 23.28/23.14 fof(f247,plain,( 23.28/23.14 ! [X560] : (! [X566] : ((! [X567] : (~r1(X566,X567) | ! [X568] : (! [X569] : (! [X570] : (~r1(X569,X570) | ((p2(X570) | p3(X570)) & (~p2(X570) | ~p3(X570)))) | ~r1(X568,X569)) | ~r1(X567,X568))) & ! [X571] : (! [X572] : (! [X573] : (~r1(X572,X573) | ! [X574] : (~r1(X573,X574) | ((p2(X574) | p1(X574)) & (~p1(X574) | ~p2(X574))))) | ~r1(X571,X572)) | ~r1(X566,X571)) & ? [X575] : (~p3(X575) & r1(X566,X575))) | ~r1(X560,X566)) | ~sP0(X560))), 23.28/23.14 inference(nnf_transformation,[],[f10])). 23.28/23.14 fof(f10,plain,( 23.28/23.14 ! [X560] : (! [X566] : ((! [X567] : (~r1(X566,X567) | ! [X568] : (! [X569] : (! [X570] : (~r1(X569,X570) | ((p2(X570) | p3(X570)) & (~p2(X570) | ~p3(X570)))) | ~r1(X568,X569)) | ~r1(X567,X568))) & ! [X571] : (! [X572] : (! [X573] : (~r1(X572,X573) | ! [X574] : (~r1(X573,X574) | ((p2(X574) | p1(X574)) & (~p1(X574) | ~p2(X574))))) | ~r1(X571,X572)) | ~r1(X566,X571)) & ? [X575] : (~p3(X575) & r1(X566,X575))) | ~r1(X560,X566)) | ~sP0(X560))), 23.28/23.14 introduced(predicate_definition_introduction,[new_symbols(naming,[sP0])])). 23.28/23.14 fof(f659532,plain,( 23.28/23.14 ~p1(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f485571,f6450,f486450,f6012])). 23.28/23.14 fof(f6012,plain,( 23.28/23.14 ( ! [X54,X53] : (sP2852(X53) | ~p51(X54) | ~r1(X53,X54) | ~p1(X54)) )), 23.28/23.14 inference(cnf_transformation,[],[f6012_D])). 23.28/23.14 fof(f6012_D,plain,( 23.28/23.14 ( ! [X53] : (( ! [X54] : (~p51(X54) | ~r1(X53,X54) | ~p1(X54)) ) <=> ~sP2852(X53)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2852])])). 23.28/23.14 fof(f486450,plain,( 23.28/23.14 p51(sK48(sK101))), 23.28/23.14 inference(unit_resulting_resolution,[],[f6452,f6450,f486029,f6222])). 23.28/23.14 fof(f6222,plain,( 23.28/23.14 ( ! [X107,X108] : (sP2957(X107) | p50(X108) | ~r1(X107,X108) | p51(X108)) )), 23.28/23.14 inference(cnf_transformation,[],[f6222_D])). 23.28/23.14 fof(f6222_D,plain,( 23.28/23.14 ( ! [X107] : (( ! [X108] : (p50(X108) | ~r1(X107,X108) | p51(X108)) ) <=> ~sP2957(X107)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2957])])). 23.28/23.14 fof(f486029,plain,( 23.28/23.14 ~sP2957(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f462650,f6228])). 23.28/23.14 fof(f6228,plain,( 23.28/23.14 ( ! [X107,X106] : (sP2960(X106) | ~sP2957(X107) | ~r1(X106,X107)) )), 23.28/23.14 inference(cnf_transformation,[],[f6228_D])). 23.28/23.14 fof(f6228_D,plain,( 23.28/23.14 ( ! [X106] : (( ! [X107] : (~sP2957(X107) | ~r1(X106,X107)) ) <=> ~sP2960(X106)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2960])])). 23.28/23.14 fof(f462650,plain,( 23.28/23.14 ~sP2960(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f439290,f6260])). 23.28/23.14 fof(f6260,plain,( 23.28/23.14 ( ! [X105,X106] : (sP2976(X105) | ~sP2960(X106) | ~r1(X105,X106)) )), 23.28/23.14 inference(cnf_transformation,[],[f6260_D])). 23.28/23.14 fof(f6260_D,plain,( 23.28/23.14 ( ! [X105] : (( ! [X106] : (~sP2960(X106) | ~r1(X105,X106)) ) <=> ~sP2976(X105)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2976])])). 23.28/23.14 fof(f439290,plain,( 23.28/23.14 ~sP2976(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f416365,f6262])). 23.28/23.14 fof(f6262,plain,( 23.28/23.14 ( ! [X105,X104] : (sP2977(X104) | ~sP2976(X105) | ~r1(X104,X105)) )), 23.28/23.14 inference(cnf_transformation,[],[f6262_D])). 23.28/23.14 fof(f6262_D,plain,( 23.28/23.14 ( ! [X104] : (( ! [X105] : (~sP2976(X105) | ~r1(X104,X105)) ) <=> ~sP2977(X104)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2977])])). 23.28/23.14 fof(f416365,plain,( 23.28/23.14 ~sP2977(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f393595,f6264])). 23.28/23.14 fof(f6264,plain,( 23.28/23.14 ( ! [X103,X104] : (sP2978(X103) | ~sP2977(X104) | ~r1(X103,X104)) )), 23.28/23.14 inference(cnf_transformation,[],[f6264_D])). 23.28/23.14 fof(f6264_D,plain,( 23.28/23.14 ( ! [X103] : (( ! [X104] : (~sP2977(X104) | ~r1(X103,X104)) ) <=> ~sP2978(X103)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2978])])). 23.28/23.14 fof(f393595,plain,( 23.28/23.14 ~sP2978(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f364411,f6266])). 23.28/23.14 fof(f6266,plain,( 23.28/23.14 ( ! [X103,X102] : (sP2979(X102) | ~sP2978(X103) | ~r1(X102,X103)) )), 23.28/23.14 inference(cnf_transformation,[],[f6266_D])). 23.28/23.14 fof(f6266_D,plain,( 23.28/23.14 ( ! [X102] : (( ! [X103] : (~sP2978(X103) | ~r1(X102,X103)) ) <=> ~sP2979(X102)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2979])])). 23.28/23.14 fof(f364411,plain,( 23.28/23.14 ~sP2979(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f331917,f6268])). 23.28/23.14 fof(f6268,plain,( 23.28/23.14 ( ! [X101,X102] : (sP2980(X101) | ~sP2979(X102) | ~r1(X101,X102)) )), 23.28/23.14 inference(cnf_transformation,[],[f6268_D])). 23.28/23.14 fof(f6268_D,plain,( 23.28/23.14 ( ! [X101] : (( ! [X102] : (~sP2979(X102) | ~r1(X101,X102)) ) <=> ~sP2980(X101)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2980])])). 23.28/23.14 fof(f331917,plain,( 23.28/23.14 ~sP2980(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f312603,f6270])). 23.28/23.14 fof(f6270,plain,( 23.28/23.14 ( ! [X101,X100] : (sP2981(X100) | ~sP2980(X101) | ~r1(X100,X101)) )), 23.28/23.14 inference(cnf_transformation,[],[f6270_D])). 23.28/23.14 fof(f6270_D,plain,( 23.28/23.14 ( ! [X100] : (( ! [X101] : (~sP2980(X101) | ~r1(X100,X101)) ) <=> ~sP2981(X100)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2981])])). 23.28/23.14 fof(f312603,plain,( 23.28/23.14 ~sP2981(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f294076,f6272])). 23.28/23.14 fof(f6272,plain,( 23.28/23.14 ( ! [X99,X100] : (sP2982(X99) | ~sP2981(X100) | ~r1(X99,X100)) )), 23.28/23.14 inference(cnf_transformation,[],[f6272_D])). 23.28/23.14 fof(f6272_D,plain,( 23.28/23.14 ( ! [X99] : (( ! [X100] : (~sP2981(X100) | ~r1(X99,X100)) ) <=> ~sP2982(X99)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2982])])). 23.28/23.14 fof(f294076,plain,( 23.28/23.14 ~sP2982(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f276303,f6274])). 23.28/23.14 fof(f6274,plain,( 23.28/23.14 ( ! [X99,X98] : (sP2983(X98) | ~sP2982(X99) | ~r1(X98,X99)) )), 23.28/23.14 inference(cnf_transformation,[],[f6274_D])). 23.28/23.14 fof(f6274_D,plain,( 23.28/23.14 ( ! [X98] : (( ! [X99] : (~sP2982(X99) | ~r1(X98,X99)) ) <=> ~sP2983(X98)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2983])])). 23.28/23.14 fof(f276303,plain,( 23.28/23.14 ~sP2983(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f259281,f6276])). 23.28/23.14 fof(f6276,plain,( 23.28/23.14 ( ! [X97,X98] : (sP2984(X97) | ~sP2983(X98) | ~r1(X97,X98)) )), 23.28/23.14 inference(cnf_transformation,[],[f6276_D])). 23.28/23.14 fof(f6276_D,plain,( 23.28/23.14 ( ! [X97] : (( ! [X98] : (~sP2983(X98) | ~r1(X97,X98)) ) <=> ~sP2984(X97)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2984])])). 23.28/23.14 fof(f259281,plain,( 23.28/23.14 ~sP2984(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f242989,f6278])). 23.28/23.14 fof(f6278,plain,( 23.28/23.14 ( ! [X97,X96] : (sP2985(X96) | ~sP2984(X97) | ~r1(X96,X97)) )), 23.28/23.14 inference(cnf_transformation,[],[f6278_D])). 23.28/23.14 fof(f6278_D,plain,( 23.28/23.14 ( ! [X96] : (( ! [X97] : (~sP2984(X97) | ~r1(X96,X97)) ) <=> ~sP2985(X96)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2985])])). 23.28/23.14 fof(f242989,plain,( 23.28/23.14 ~sP2985(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f227407,f6280])). 23.28/23.14 fof(f6280,plain,( 23.28/23.14 ( ! [X95,X96] : (sP2986(X95) | ~sP2985(X96) | ~r1(X95,X96)) )), 23.28/23.14 inference(cnf_transformation,[],[f6280_D])). 23.28/23.14 fof(f6280_D,plain,( 23.28/23.14 ( ! [X95] : (( ! [X96] : (~sP2985(X96) | ~r1(X95,X96)) ) <=> ~sP2986(X95)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2986])])). 23.28/23.14 fof(f227407,plain,( 23.28/23.14 ~sP2986(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f212528,f6282])). 23.28/23.14 fof(f6282,plain,( 23.28/23.14 ( ! [X94,X95] : (sP2987(X94) | ~sP2986(X95) | ~r1(X94,X95)) )), 23.28/23.14 inference(cnf_transformation,[],[f6282_D])). 23.28/23.14 fof(f6282_D,plain,( 23.28/23.14 ( ! [X94] : (( ! [X95] : (~sP2986(X95) | ~r1(X94,X95)) ) <=> ~sP2987(X94)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2987])])). 23.28/23.14 fof(f212528,plain,( 23.28/23.14 ~sP2987(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f198330,f6284])). 23.28/23.14 fof(f6284,plain,( 23.28/23.14 ( ! [X94,X93] : (sP2988(X93) | ~sP2987(X94) | ~r1(X93,X94)) )), 23.28/23.14 inference(cnf_transformation,[],[f6284_D])). 23.28/23.14 fof(f6284_D,plain,( 23.28/23.14 ( ! [X93] : (( ! [X94] : (~sP2987(X94) | ~r1(X93,X94)) ) <=> ~sP2988(X93)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2988])])). 23.28/23.14 fof(f198330,plain,( 23.28/23.14 ~sP2988(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f184802,f6286])). 23.28/23.14 fof(f6286,plain,( 23.28/23.14 ( ! [X92,X93] : (sP2989(X92) | ~sP2988(X93) | ~r1(X92,X93)) )), 23.28/23.14 inference(cnf_transformation,[],[f6286_D])). 23.28/23.14 fof(f6286_D,plain,( 23.28/23.14 ( ! [X92] : (( ! [X93] : (~sP2988(X93) | ~r1(X92,X93)) ) <=> ~sP2989(X92)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2989])])). 23.28/23.14 fof(f184802,plain,( 23.28/23.14 ~sP2989(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f171924,f6288])). 23.28/23.14 fof(f6288,plain,( 23.28/23.14 ( ! [X92,X91] : (sP2990(X91) | ~sP2989(X92) | ~r1(X91,X92)) )), 23.28/23.14 inference(cnf_transformation,[],[f6288_D])). 23.28/23.14 fof(f6288_D,plain,( 23.28/23.14 ( ! [X91] : (( ! [X92] : (~sP2989(X92) | ~r1(X91,X92)) ) <=> ~sP2990(X91)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2990])])). 23.28/23.14 fof(f171924,plain,( 23.28/23.14 ~sP2990(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f159681,f6290])). 23.28/23.14 fof(f6290,plain,( 23.28/23.14 ( ! [X90,X91] : (sP2991(X90) | ~sP2990(X91) | ~r1(X90,X91)) )), 23.28/23.14 inference(cnf_transformation,[],[f6290_D])). 23.28/23.14 fof(f6290_D,plain,( 23.28/23.14 ( ! [X90] : (( ! [X91] : (~sP2990(X91) | ~r1(X90,X91)) ) <=> ~sP2991(X90)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2991])])). 23.28/23.14 fof(f159681,plain,( 23.28/23.14 ~sP2991(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f148055,f6292])). 23.28/23.14 fof(f6292,plain,( 23.28/23.14 ( ! [X90,X89] : (sP2992(X89) | ~sP2991(X90) | ~r1(X89,X90)) )), 23.28/23.14 inference(cnf_transformation,[],[f6292_D])). 23.28/23.14 fof(f6292_D,plain,( 23.28/23.14 ( ! [X89] : (( ! [X90] : (~sP2991(X90) | ~r1(X89,X90)) ) <=> ~sP2992(X89)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2992])])). 23.28/23.14 fof(f148055,plain,( 23.28/23.14 ~sP2992(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f137032,f6294])). 23.28/23.14 fof(f6294,plain,( 23.28/23.14 ( ! [X88,X89] : (sP2993(X88) | ~sP2992(X89) | ~r1(X88,X89)) )), 23.28/23.14 inference(cnf_transformation,[],[f6294_D])). 23.28/23.14 fof(f6294_D,plain,( 23.28/23.14 ( ! [X88] : (( ! [X89] : (~sP2992(X89) | ~r1(X88,X89)) ) <=> ~sP2993(X88)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2993])])). 23.28/23.14 fof(f137032,plain,( 23.28/23.14 ~sP2993(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f126596,f6296])). 23.28/23.14 fof(f6296,plain,( 23.28/23.14 ( ! [X88,X87] : (sP2994(X87) | ~sP2993(X88) | ~r1(X87,X88)) )), 23.28/23.14 inference(cnf_transformation,[],[f6296_D])). 23.28/23.14 fof(f6296_D,plain,( 23.28/23.14 ( ! [X87] : (( ! [X88] : (~sP2993(X88) | ~r1(X87,X88)) ) <=> ~sP2994(X87)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2994])])). 23.28/23.14 fof(f126596,plain,( 23.28/23.14 ~sP2994(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f116729,f6298])). 23.28/23.14 fof(f6298,plain,( 23.28/23.14 ( ! [X87,X86] : (sP2995(X86) | ~sP2994(X87) | ~r1(X86,X87)) )), 23.28/23.14 inference(cnf_transformation,[],[f6298_D])). 23.28/23.14 fof(f6298_D,plain,( 23.28/23.14 ( ! [X86] : (( ! [X87] : (~sP2994(X87) | ~r1(X86,X87)) ) <=> ~sP2995(X86)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2995])])). 23.28/23.14 fof(f116729,plain,( 23.28/23.14 ~sP2995(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f107410,f6318])). 23.28/23.14 fof(f6318,plain,( 23.28/23.14 ( ! [X85,X86] : (sP3005(X85) | ~sP2995(X86) | ~r1(X85,X86)) )), 23.28/23.14 inference(cnf_transformation,[],[f6318_D])). 23.28/23.14 fof(f6318_D,plain,( 23.28/23.14 ( ! [X85] : (( ! [X86] : (~sP2995(X86) | ~r1(X85,X86)) ) <=> ~sP3005(X85)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP3005])])). 23.28/23.14 fof(f107410,plain,( 23.28/23.14 ~sP3005(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f98634,f6320])). 23.28/23.14 fof(f6320,plain,( 23.28/23.14 ( ! [X85,X84] : (sP3006(X84) | ~sP3005(X85) | ~r1(X84,X85)) )), 23.28/23.14 inference(cnf_transformation,[],[f6320_D])). 23.28/23.14 fof(f6320_D,plain,( 23.28/23.14 ( ! [X84] : (( ! [X85] : (~sP3005(X85) | ~r1(X84,X85)) ) <=> ~sP3006(X84)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP3006])])). 23.28/23.14 fof(f98634,plain,( 23.28/23.14 ~sP3006(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f90380,f6322])). 23.28/23.14 fof(f6322,plain,( 23.28/23.14 ( ! [X83,X84] : (sP3007(X83) | ~sP3006(X84) | ~r1(X83,X84)) )), 23.28/23.14 inference(cnf_transformation,[],[f6322_D])). 23.28/23.14 fof(f6322_D,plain,( 23.28/23.14 ( ! [X83] : (( ! [X84] : (~sP3006(X84) | ~r1(X83,X84)) ) <=> ~sP3007(X83)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP3007])])). 23.28/23.14 fof(f90380,plain,( 23.28/23.14 ~sP3007(sK101)), 23.28/23.14 inference(unit_resulting_resolution,[],[f715,f82634,f6323])). 23.28/23.14 fof(f6323,plain,( 23.28/23.14 ( ! [X83,X82] : (~sP3007(X83) | ~sP3004(X82) | ~r1(X82,X83)) )), 23.28/23.14 inference(general_splitting,[],[f6321,f6322_D])). 23.28/23.14 fof(f6321,plain,( 23.28/23.14 ( ! [X83,X84,X82] : (~r1(X82,X83) | ~r1(X83,X84) | ~sP3004(X82) | ~sP3006(X84)) )), 23.28/23.14 inference(general_splitting,[],[f6319,f6320_D])). 23.28/23.14 fof(f6319,plain,( 23.28/23.14 ( ! [X85,X83,X84,X82] : (~r1(X82,X83) | ~r1(X83,X84) | ~r1(X84,X85) | ~sP3004(X82) | ~sP3005(X85)) )), 23.28/23.14 inference(general_splitting,[],[f6317,f6318_D])). 23.28/23.14 fof(f6317,plain,( 23.28/23.14 ( ! [X85,X83,X86,X84,X82] : (~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~sP2995(X86) | ~sP3004(X82)) )), 23.28/23.14 inference(general_splitting,[],[f6315,f6316_D])). 23.28/23.14 fof(f6316,plain,( 23.28/23.14 ( ! [X81,X82] : (sP3004(X82) | ~sP3003(X81) | ~r1(X81,X82)) )), 23.28/23.14 inference(cnf_transformation,[],[f6316_D])). 23.28/23.14 fof(f6316_D,plain,( 23.28/23.14 ( ! [X82] : (( ! [X81] : (~sP3003(X81) | ~r1(X81,X82)) ) <=> ~sP3004(X82)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP3004])])). 23.28/23.14 fof(f6315,plain,( 23.28/23.14 ( ! [X85,X83,X81,X86,X84,X82] : (~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~sP2995(X86) | ~sP3003(X81)) )), 23.28/23.14 inference(general_splitting,[],[f6313,f6314_D])). 23.28/23.14 fof(f6314,plain,( 23.28/23.14 ( ! [X80,X81] : (sP3003(X81) | ~sP3002(X80) | ~r1(X80,X81)) )), 23.28/23.14 inference(cnf_transformation,[],[f6314_D])). 23.28/23.14 fof(f6314_D,plain,( 23.28/23.14 ( ! [X81] : (( ! [X80] : (~sP3002(X80) | ~r1(X80,X81)) ) <=> ~sP3003(X81)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP3003])])). 23.28/23.14 fof(f6313,plain,( 23.28/23.14 ( ! [X80,X85,X83,X81,X86,X84,X82] : (~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~sP2995(X86) | ~sP3002(X80)) )), 23.28/23.14 inference(general_splitting,[],[f6311,f6312_D])). 23.28/23.14 fof(f6312,plain,( 23.28/23.14 ( ! [X80,X79] : (sP3002(X80) | ~sP3001(X79) | ~r1(X79,X80)) )), 23.28/23.14 inference(cnf_transformation,[],[f6312_D])). 23.28/23.14 fof(f6312_D,plain,( 23.28/23.14 ( ! [X80] : (( ! [X79] : (~sP3001(X79) | ~r1(X79,X80)) ) <=> ~sP3002(X80)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP3002])])). 23.28/23.14 fof(f6311,plain,( 23.28/23.14 ( ! [X80,X85,X83,X81,X79,X86,X84,X82] : (~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~sP2995(X86) | ~sP3001(X79)) )), 23.28/23.14 inference(general_splitting,[],[f6309,f6310_D])). 23.28/23.14 fof(f6310,plain,( 23.28/23.14 ( ! [X78,X79] : (sP3001(X79) | ~sP3000(X78) | ~r1(X78,X79)) )), 23.28/23.14 inference(cnf_transformation,[],[f6310_D])). 23.28/23.14 fof(f6310_D,plain,( 23.28/23.14 ( ! [X79] : (( ! [X78] : (~sP3000(X78) | ~r1(X78,X79)) ) <=> ~sP3001(X79)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP3001])])). 23.28/23.14 fof(f6309,plain,( 23.28/23.14 ( ! [X80,X78,X85,X83,X81,X79,X86,X84,X82] : (~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~sP2995(X86) | ~sP3000(X78)) )), 23.28/23.14 inference(general_splitting,[],[f6307,f6308_D])). 23.28/23.14 fof(f6308,plain,( 23.28/23.14 ( ! [X78,X77] : (sP3000(X78) | ~sP2999(X77) | ~r1(X77,X78)) )), 23.28/23.14 inference(cnf_transformation,[],[f6308_D])). 23.28/23.14 fof(f6308_D,plain,( 23.28/23.14 ( ! [X78] : (( ! [X77] : (~sP2999(X77) | ~r1(X77,X78)) ) <=> ~sP3000(X78)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP3000])])). 23.28/23.14 fof(f6307,plain,( 23.28/23.14 ( ! [X80,X78,X85,X83,X81,X79,X77,X86,X84,X82] : (~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~sP2995(X86) | ~sP2999(X77)) )), 23.28/23.14 inference(general_splitting,[],[f6305,f6306_D])). 23.28/23.14 fof(f6306,plain,( 23.28/23.14 ( ! [X76,X77] : (sP2999(X77) | ~sP2998(X76) | ~r1(X76,X77)) )), 23.28/23.14 inference(cnf_transformation,[],[f6306_D])). 23.28/23.14 fof(f6306_D,plain,( 23.28/23.14 ( ! [X77] : (( ! [X76] : (~sP2998(X76) | ~r1(X76,X77)) ) <=> ~sP2999(X77)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2999])])). 23.28/23.14 fof(f6305,plain,( 23.28/23.14 ( ! [X80,X78,X76,X85,X83,X81,X79,X77,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~sP2995(X86) | ~sP2998(X76)) )), 23.28/23.14 inference(general_splitting,[],[f6303,f6304_D])). 23.28/23.14 fof(f6304,plain,( 23.28/23.14 ( ! [X76,X75] : (sP2998(X76) | ~sP2997(X75) | ~r1(X75,X76)) )), 23.28/23.14 inference(cnf_transformation,[],[f6304_D])). 23.28/23.14 fof(f6304_D,plain,( 23.28/23.14 ( ! [X76] : (( ! [X75] : (~sP2997(X75) | ~r1(X75,X76)) ) <=> ~sP2998(X76)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2998])])). 23.28/23.14 fof(f6303,plain,( 23.28/23.14 ( ! [X80,X78,X76,X85,X83,X81,X79,X77,X75,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~sP2995(X86) | ~sP2997(X75)) )), 23.28/23.14 inference(general_splitting,[],[f6301,f6302_D])). 23.28/23.14 fof(f6302,plain,( 23.28/23.14 ( ! [X74,X75] : (sP2997(X75) | ~sP2996(X74) | ~r1(X74,X75)) )), 23.28/23.14 inference(cnf_transformation,[],[f6302_D])). 23.28/23.14 fof(f6302_D,plain,( 23.28/23.14 ( ! [X75] : (( ! [X74] : (~sP2996(X74) | ~r1(X74,X75)) ) <=> ~sP2997(X75)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2997])])). 23.28/23.14 fof(f6301,plain,( 23.28/23.14 ( ! [X80,X78,X76,X74,X85,X83,X81,X79,X77,X75,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~sP2995(X86) | ~sP2996(X74)) )), 23.28/23.14 inference(general_splitting,[],[f6299,f6300_D])). 23.28/23.14 fof(f6300,plain,( 23.28/23.14 ( ! [X74,X73] : (sP2996(X74) | ~sP2975(X73) | ~r1(X73,X74)) )), 23.28/23.14 inference(cnf_transformation,[],[f6300_D])). 23.28/23.14 fof(f6300_D,plain,( 23.28/23.14 ( ! [X74] : (( ! [X73] : (~sP2975(X73) | ~r1(X73,X74)) ) <=> ~sP2996(X74)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2996])])). 23.28/23.14 fof(f6299,plain,( 23.28/23.14 ( ! [X80,X78,X76,X74,X85,X83,X81,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2995(X86)) )), 23.28/23.14 inference(general_splitting,[],[f6297,f6298_D])). 23.28/23.14 fof(f6297,plain,( 23.28/23.14 ( ! [X80,X78,X76,X74,X87,X85,X83,X81,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2994(X87)) )), 23.28/23.14 inference(general_splitting,[],[f6295,f6296_D])). 23.28/23.14 fof(f6295,plain,( 23.28/23.14 ( ! [X80,X88,X78,X76,X74,X87,X85,X83,X81,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2993(X88)) )), 23.28/23.14 inference(general_splitting,[],[f6293,f6294_D])). 23.28/23.14 fof(f6293,plain,( 23.28/23.14 ( ! [X80,X88,X78,X76,X74,X87,X85,X83,X81,X89,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2992(X89)) )), 23.28/23.14 inference(general_splitting,[],[f6291,f6292_D])). 23.28/23.14 fof(f6291,plain,( 23.28/23.14 ( ! [X80,X90,X88,X78,X76,X74,X87,X85,X83,X81,X89,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2991(X90)) )), 23.28/23.14 inference(general_splitting,[],[f6289,f6290_D])). 23.28/23.14 fof(f6289,plain,( 23.28/23.14 ( ! [X80,X90,X88,X78,X76,X74,X87,X85,X83,X81,X91,X89,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2990(X91)) )), 23.28/23.14 inference(general_splitting,[],[f6287,f6288_D])). 23.28/23.14 fof(f6287,plain,( 23.28/23.14 ( ! [X80,X92,X90,X88,X78,X76,X74,X87,X85,X83,X81,X91,X89,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2989(X92)) )), 23.28/23.14 inference(general_splitting,[],[f6285,f6286_D])). 23.28/23.14 fof(f6285,plain,( 23.28/23.14 ( ! [X80,X92,X90,X88,X78,X76,X74,X87,X85,X83,X81,X93,X91,X89,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2988(X93)) )), 23.28/23.14 inference(general_splitting,[],[f6283,f6284_D])). 23.28/23.14 fof(f6283,plain,( 23.28/23.14 ( ! [X80,X94,X92,X90,X88,X78,X76,X74,X87,X85,X83,X81,X93,X91,X89,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2987(X94)) )), 23.28/23.14 inference(general_splitting,[],[f6281,f6282_D])). 23.28/23.14 fof(f6281,plain,( 23.28/23.14 ( ! [X80,X94,X92,X90,X88,X78,X76,X74,X87,X85,X83,X81,X95,X93,X91,X89,X79,X77,X75,X73,X86,X84,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2986(X95)) )), 23.28/23.14 inference(general_splitting,[],[f6279,f6280_D])). 23.28/23.14 fof(f6279,plain,( 23.28/23.14 ( ! [X94,X90,X78,X74,X87,X83,X95,X91,X96,X79,X75,X84,X80,X92,X88,X76,X85,X81,X93,X89,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2985(X96)) )), 23.28/23.14 inference(general_splitting,[],[f6277,f6278_D])). 23.28/23.14 fof(f6277,plain,( 23.28/23.14 ( ! [X94,X90,X78,X74,X87,X83,X95,X91,X96,X79,X75,X84,X80,X92,X88,X97,X76,X85,X81,X93,X89,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2984(X97)) )), 23.28/23.14 inference(general_splitting,[],[f6275,f6276_D])). 23.28/23.14 fof(f6275,plain,( 23.28/23.14 ( ! [X94,X90,X78,X74,X87,X83,X95,X91,X96,X79,X75,X84,X80,X92,X88,X97,X76,X85,X81,X93,X89,X98,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2983(X98)) )), 23.28/23.14 inference(general_splitting,[],[f6273,f6274_D])). 23.28/23.14 fof(f6273,plain,( 23.28/23.14 ( ! [X94,X90,X99,X78,X74,X87,X83,X95,X91,X96,X79,X75,X84,X80,X92,X88,X97,X76,X85,X81,X93,X89,X98,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2982(X99)) )), 23.28/23.14 inference(general_splitting,[],[f6271,f6272_D])). 23.28/23.14 fof(f6271,plain,( 23.28/23.14 ( ! [X94,X90,X99,X78,X74,X87,X83,X95,X91,X100,X96,X79,X75,X84,X80,X92,X88,X97,X76,X85,X81,X93,X89,X98,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2981(X100)) )), 23.28/23.14 inference(general_splitting,[],[f6269,f6270_D])). 23.28/23.14 fof(f6269,plain,( 23.28/23.14 ( ! [X94,X90,X99,X78,X74,X87,X83,X95,X91,X100,X96,X79,X75,X84,X80,X92,X88,X101,X97,X76,X85,X81,X93,X89,X98,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2980(X101)) )), 23.28/23.14 inference(general_splitting,[],[f6267,f6268_D])). 23.28/23.14 fof(f6267,plain,( 23.28/23.14 ( ! [X94,X90,X99,X78,X74,X87,X83,X95,X91,X100,X96,X79,X75,X84,X80,X92,X88,X101,X97,X76,X85,X81,X93,X89,X102,X98,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2979(X102)) )), 23.28/23.14 inference(general_splitting,[],[f6265,f6266_D])). 23.28/23.14 fof(f6265,plain,( 23.28/23.14 ( ! [X94,X90,X103,X99,X78,X74,X87,X83,X95,X91,X100,X96,X79,X75,X84,X80,X92,X88,X101,X97,X76,X85,X81,X93,X89,X102,X98,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2978(X103)) )), 23.28/23.14 inference(general_splitting,[],[f6263,f6264_D])). 23.28/23.14 fof(f6263,plain,( 23.28/23.14 ( ! [X94,X90,X103,X99,X78,X74,X87,X83,X95,X91,X100,X96,X79,X75,X104,X84,X80,X92,X88,X101,X97,X76,X85,X81,X93,X89,X102,X98,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2977(X104)) )), 23.28/23.14 inference(general_splitting,[],[f6261,f6262_D])). 23.28/23.14 fof(f6261,plain,( 23.28/23.14 ( ! [X94,X90,X103,X99,X78,X74,X87,X83,X95,X91,X100,X96,X79,X75,X104,X84,X80,X92,X88,X101,X97,X76,X105,X85,X81,X93,X89,X102,X98,X77,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2975(X73) | ~sP2976(X105)) )), 23.28/23.14 inference(general_splitting,[],[f6259,f6260_D])). 23.28/23.14 fof(f6259,plain,( 23.28/23.14 ( ! [X94,X90,X103,X99,X78,X74,X87,X83,X95,X91,X100,X96,X79,X75,X104,X84,X80,X92,X88,X101,X97,X76,X105,X85,X81,X93,X89,X102,X98,X77,X106,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~sP2960(X106) | ~sP2975(X73)) )), 23.28/23.14 inference(general_splitting,[],[f6257,f6258_D])). 23.28/23.14 fof(f6258,plain,( 23.28/23.14 ( ! [X72,X73] : (sP2975(X73) | ~sP2974(X72) | ~r1(X72,X73)) )), 23.28/23.14 inference(cnf_transformation,[],[f6258_D])). 23.28/23.14 fof(f6258_D,plain,( 23.28/23.14 ( ! [X73] : (( ! [X72] : (~sP2974(X72) | ~r1(X72,X73)) ) <=> ~sP2975(X73)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2975])])). 23.28/23.14 fof(f6257,plain,( 23.28/23.14 ( ! [X94,X90,X103,X99,X78,X74,X87,X83,X95,X91,X100,X96,X79,X75,X104,X84,X80,X92,X88,X101,X97,X76,X105,X72,X85,X81,X93,X89,X102,X98,X77,X106,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~sP2960(X106) | ~sP2974(X72)) )), 23.28/23.14 inference(general_splitting,[],[f6255,f6256_D])). 23.28/23.14 fof(f6256,plain,( 23.28/23.14 ( ! [X72,X71] : (sP2974(X72) | ~sP2973(X71) | ~r1(X71,X72)) )), 23.28/23.14 inference(cnf_transformation,[],[f6256_D])). 23.28/23.14 fof(f6256_D,plain,( 23.28/23.14 ( ! [X72] : (( ! [X71] : (~sP2973(X71) | ~r1(X71,X72)) ) <=> ~sP2974(X72)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2974])])). 23.28/23.14 fof(f6255,plain,( 23.28/23.14 ( ! [X94,X90,X103,X99,X78,X74,X87,X83,X95,X91,X71,X100,X96,X79,X75,X104,X84,X80,X92,X88,X101,X97,X76,X105,X72,X85,X81,X93,X89,X102,X98,X77,X106,X73,X86,X82] : (~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~sP2960(X106) | ~sP2973(X71)) )), 23.28/23.14 inference(general_splitting,[],[f6253,f6254_D])). 23.28/23.14 fof(f6254,plain,( 23.28/23.14 ( ! [X70,X71] : (sP2973(X71) | ~sP2972(X70) | ~r1(X70,X71)) )), 23.28/23.14 inference(cnf_transformation,[],[f6254_D])). 23.28/23.14 fof(f6254_D,plain,( 23.28/23.14 ( ! [X71] : (( ! [X70] : (~sP2972(X70) | ~r1(X70,X71)) ) <=> ~sP2973(X71)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2973])])). 23.28/23.14 fof(f6253,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X78,X74,X87,X83,X95,X91,X71,X100,X96,X79,X75,X104,X84,X80,X92,X88,X101,X97,X76,X105,X72,X85,X81,X93,X89,X102,X98,X77,X106,X73,X86,X82] : (~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~sP2960(X106) | ~sP2972(X70)) )), 23.28/23.14 inference(general_splitting,[],[f6251,f6252_D])). 23.28/23.14 fof(f6252,plain,( 23.28/23.14 ( ! [X70,X69] : (sP2972(X70) | ~sP2971(X69) | ~r1(X69,X70)) )), 23.28/23.14 inference(cnf_transformation,[],[f6252_D])). 23.28/23.14 fof(f6252_D,plain,( 23.28/23.14 ( ! [X70] : (( ! [X69] : (~sP2971(X69) | ~r1(X69,X70)) ) <=> ~sP2972(X70)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2972])])). 23.28/23.14 fof(f6251,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X78,X74,X87,X83,X95,X91,X71,X100,X96,X79,X75,X104,X84,X80,X92,X88,X101,X97,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X77,X106,X73,X86,X82] : (~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~sP2960(X106) | ~sP2971(X69)) )), 23.28/23.14 inference(general_splitting,[],[f6249,f6250_D])). 23.28/23.14 fof(f6250,plain,( 23.28/23.14 ( ! [X68,X69] : (sP2971(X69) | ~sP2970(X68) | ~r1(X68,X69)) )), 23.28/23.14 inference(cnf_transformation,[],[f6250_D])). 23.28/23.14 fof(f6250_D,plain,( 23.28/23.14 ( ! [X69] : (( ! [X68] : (~sP2970(X68) | ~r1(X68,X69)) ) <=> ~sP2971(X69)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2971])])). 23.28/23.14 fof(f6249,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X78,X74,X87,X83,X95,X91,X71,X100,X96,X79,X75,X104,X84,X80,X92,X88,X101,X68,X97,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X77,X106,X73,X86,X82] : (~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~sP2960(X106) | ~sP2970(X68)) )), 23.28/23.14 inference(general_splitting,[],[f6247,f6248_D])). 23.28/23.14 fof(f6248,plain,( 23.28/23.14 ( ! [X68,X67] : (sP2970(X68) | ~sP2969(X67) | ~r1(X67,X68)) )), 23.28/23.14 inference(cnf_transformation,[],[f6248_D])). 23.28/23.14 fof(f6248_D,plain,( 23.28/23.14 ( ! [X68] : (( ! [X67] : (~sP2969(X67) | ~r1(X67,X68)) ) <=> ~sP2970(X68)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2970])])). 23.28/23.14 fof(f6247,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X78,X74,X87,X83,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X80,X92,X88,X101,X68,X97,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X77,X106,X73,X86,X82] : (~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~sP2960(X106) | ~sP2969(X67)) )), 23.28/23.14 inference(general_splitting,[],[f6245,f6246_D])). 23.28/23.14 fof(f6246,plain,( 23.28/23.14 ( ! [X66,X67] : (sP2969(X67) | ~sP2968(X66) | ~r1(X66,X67)) )), 23.28/23.14 inference(cnf_transformation,[],[f6246_D])). 23.28/23.14 fof(f6246_D,plain,( 23.28/23.14 ( ! [X67] : (( ! [X66] : (~sP2968(X66) | ~r1(X66,X67)) ) <=> ~sP2969(X67)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2969])])). 23.28/23.14 fof(f6245,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X66,X78,X74,X87,X83,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X80,X92,X88,X101,X68,X97,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X77,X106,X73,X86,X82] : (~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~sP2960(X106) | ~sP2968(X66)) )), 23.28/23.14 inference(general_splitting,[],[f6243,f6244_D])). 23.28/23.14 fof(f6244,plain,( 23.28/23.14 ( ! [X66,X65] : (sP2968(X66) | ~sP2967(X65) | ~r1(X65,X66)) )), 23.28/23.14 inference(cnf_transformation,[],[f6244_D])). 23.28/23.14 fof(f6244_D,plain,( 23.28/23.14 ( ! [X66] : (( ! [X65] : (~sP2967(X65) | ~r1(X65,X66)) ) <=> ~sP2968(X66)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2968])])). 23.28/23.14 fof(f6243,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X66,X78,X74,X87,X83,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X80,X92,X88,X101,X68,X97,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X65,X77,X106,X73,X86,X82] : (~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~sP2960(X106) | ~sP2967(X65)) )), 23.28/23.14 inference(general_splitting,[],[f6241,f6242_D])). 23.28/23.14 fof(f6242,plain,( 23.28/23.14 ( ! [X64,X65] : (sP2967(X65) | ~sP2966(X64) | ~r1(X64,X65)) )), 23.28/23.14 inference(cnf_transformation,[],[f6242_D])). 23.28/23.14 fof(f6242_D,plain,( 23.28/23.14 ( ! [X65] : (( ! [X64] : (~sP2966(X64) | ~r1(X64,X65)) ) <=> ~sP2967(X65)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2967])])). 23.28/23.14 fof(f6241,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X66,X78,X74,X87,X83,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X80,X92,X88,X101,X68,X97,X64,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X65,X77,X106,X73,X86,X82] : (~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~sP2960(X106) | ~sP2966(X64)) )), 23.28/23.14 inference(general_splitting,[],[f6239,f6240_D])). 23.28/23.14 fof(f6240,plain,( 23.28/23.14 ( ! [X64,X63] : (sP2966(X64) | ~sP2965(X63) | ~r1(X63,X64)) )), 23.28/23.14 inference(cnf_transformation,[],[f6240_D])). 23.28/23.14 fof(f6240_D,plain,( 23.28/23.14 ( ! [X64] : (( ! [X63] : (~sP2965(X63) | ~r1(X63,X64)) ) <=> ~sP2966(X64)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2966])])). 23.28/23.14 fof(f6239,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X66,X78,X74,X87,X83,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X63,X80,X92,X88,X101,X68,X97,X64,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X65,X77,X106,X73,X86,X82] : (~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~sP2960(X106) | ~sP2965(X63)) )), 23.28/23.14 inference(general_splitting,[],[f6237,f6238_D])). 23.28/23.14 fof(f6238,plain,( 23.28/23.14 ( ! [X62,X63] : (sP2965(X63) | ~sP2964(X62) | ~r1(X62,X63)) )), 23.28/23.14 inference(cnf_transformation,[],[f6238_D])). 23.28/23.14 fof(f6238_D,plain,( 23.28/23.14 ( ! [X63] : (( ! [X62] : (~sP2964(X62) | ~r1(X62,X63)) ) <=> ~sP2965(X63)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2965])])). 23.28/23.14 fof(f6237,plain,( 23.28/23.14 ( ! [X94,X90,X103,X70,X99,X66,X78,X74,X87,X83,X62,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X63,X80,X92,X88,X101,X68,X97,X64,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X65,X77,X106,X73,X86,X82] : (~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~sP2960(X106) | ~sP2964(X62)) )), 23.28/23.14 inference(general_splitting,[],[f6235,f6236_D])). 23.28/23.14 fof(f6236,plain,( 23.28/23.14 ( ! [X61,X62] : (sP2964(X62) | ~sP2963(X61) | ~r1(X61,X62)) )), 23.28/23.14 inference(cnf_transformation,[],[f6236_D])). 23.28/23.14 fof(f6236_D,plain,( 23.28/23.14 ( ! [X62] : (( ! [X61] : (~sP2963(X61) | ~r1(X61,X62)) ) <=> ~sP2964(X62)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2964])])). 23.28/23.14 fof(f6235,plain,( 23.28/23.14 ( ! [X61,X94,X90,X103,X70,X99,X66,X78,X74,X87,X83,X62,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X63,X80,X92,X88,X101,X68,X97,X64,X76,X105,X72,X85,X81,X93,X89,X102,X69,X98,X65,X77,X106,X73,X86,X82] : (~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~sP2960(X106) | ~sP2963(X61)) )), 23.28/23.14 inference(general_splitting,[],[f6233,f6234_D])). 23.28/23.14 fof(f6234,plain,( 23.28/23.14 ( ! [X61,X60] : (sP2963(X61) | ~sP2962(X60) | ~r1(X60,X61)) )), 23.28/23.14 inference(cnf_transformation,[],[f6234_D])). 23.28/23.14 fof(f6234_D,plain,( 23.28/23.14 ( ! [X61] : (( ! [X60] : (~sP2962(X60) | ~r1(X60,X61)) ) <=> ~sP2963(X61)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2963])])). 23.28/23.14 fof(f6233,plain,( 23.28/23.14 ( ! [X61,X94,X90,X103,X70,X99,X66,X78,X74,X87,X83,X62,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X63,X80,X92,X88,X101,X68,X97,X64,X76,X105,X72,X85,X81,X60,X93,X89,X102,X69,X98,X65,X77,X106,X73,X86,X82] : (~r1(X60,X61) | ~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~sP2960(X106) | ~sP2962(X60)) )), 23.28/23.14 inference(general_splitting,[],[f6231,f6232_D])). 23.28/23.14 fof(f6232,plain,( 23.28/23.14 ( ! [X59,X60] : (sP2962(X60) | ~sP2961(X59) | ~r1(X59,X60)) )), 23.28/23.14 inference(cnf_transformation,[],[f6232_D])). 23.28/23.14 fof(f6232_D,plain,( 23.28/23.14 ( ! [X60] : (( ! [X59] : (~sP2961(X59) | ~r1(X59,X60)) ) <=> ~sP2962(X60)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2962])])). 23.28/23.14 fof(f6231,plain,( 23.28/23.14 ( ! [X61,X94,X90,X103,X70,X99,X66,X78,X74,X87,X83,X62,X95,X91,X71,X100,X67,X96,X79,X75,X104,X84,X63,X80,X59,X92,X88,X101,X68,X97,X64,X76,X105,X72,X85,X81,X60,X93,X89,X102,X69,X98,X65,X77,X106,X73,X86,X82] : (~r1(X60,X61) | ~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~r1(X59,X60) | ~sP2960(X106) | ~sP2961(X59)) )), 23.28/23.14 inference(general_splitting,[],[f6229,f6230_D])). 23.28/23.14 fof(f6230,plain,( 23.28/23.14 ( ! [X59,X58] : (sP2961(X59) | ~sP2959(X58) | ~r1(X58,X59)) )), 23.28/23.14 inference(cnf_transformation,[],[f6230_D])). 23.28/23.14 fof(f6230_D,plain,( 23.28/23.14 ( ! [X59] : (( ! [X58] : (~sP2959(X58) | ~r1(X58,X59)) ) <=> ~sP2961(X59)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2961])])). 23.28/23.14 fof(f6229,plain,( 23.28/23.14 ( ! [X90,X103,X66,X74,X87,X62,X95,X71,X100,X79,X84,X59,X92,X68,X97,X76,X105,X81,X89,X102,X65,X73,X86,X61,X94,X70,X99,X78,X83,X58,X91,X67,X96,X75,X104,X63,X80,X88,X101,X64,X72,X85,X60,X93,X69,X98,X77,X106,X82] : (~r1(X58,X59) | ~r1(X60,X61) | ~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~r1(X59,X60) | ~sP2959(X58) | ~sP2960(X106)) )), 23.28/23.14 inference(general_splitting,[],[f6227,f6228_D])). 23.28/23.14 fof(f6227,plain,( 23.28/23.14 ( ! [X90,X103,X66,X74,X87,X62,X95,X71,X100,X79,X84,X59,X92,X68,X97,X76,X105,X81,X89,X102,X65,X73,X86,X61,X94,X70,X99,X78,X107,X83,X58,X91,X67,X96,X75,X104,X63,X80,X88,X101,X64,X72,X85,X60,X93,X69,X98,X77,X106,X82] : (~r1(X58,X59) | ~r1(X60,X61) | ~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X106,X107) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~r1(X59,X60) | ~sP2957(X107) | ~sP2959(X58)) )), 23.28/23.14 inference(general_splitting,[],[f6225,f6226_D])). 23.28/23.14 fof(f6226,plain,( 23.28/23.14 ( ! [X57,X58] : (sP2959(X58) | ~sP2958(X57) | ~r1(X57,X58)) )), 23.28/23.14 inference(cnf_transformation,[],[f6226_D])). 23.28/23.14 fof(f6226_D,plain,( 23.28/23.14 ( ! [X58] : (( ! [X57] : (~sP2958(X57) | ~r1(X57,X58)) ) <=> ~sP2959(X58)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2959])])). 23.28/23.14 fof(f6225,plain,( 23.28/23.14 ( ! [X57,X90,X103,X66,X74,X87,X62,X95,X71,X100,X79,X84,X59,X92,X68,X97,X76,X105,X81,X89,X102,X65,X73,X86,X61,X94,X70,X99,X78,X107,X83,X58,X91,X67,X96,X75,X104,X63,X80,X88,X101,X64,X72,X85,X60,X93,X69,X98,X77,X106,X82] : (~r1(X57,X58) | ~r1(X58,X59) | ~r1(X60,X61) | ~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X106,X107) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~r1(X59,X60) | ~sP2957(X107) | ~sP2958(X57)) )), 23.28/23.14 inference(general_splitting,[],[f6223,f6224_D])). 23.28/23.14 fof(f6224,plain,( 23.28/23.14 ( ! [X57,X56] : (sP2958(X57) | ~sP2956(X56) | ~r1(X56,X57)) )), 23.28/23.14 inference(cnf_transformation,[],[f6224_D])). 23.28/23.14 fof(f6224_D,plain,( 23.28/23.14 ( ! [X57] : (( ! [X56] : (~sP2956(X56) | ~r1(X56,X57)) ) <=> ~sP2958(X57)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2958])])). 23.28/23.14 fof(f6223,plain,( 23.28/23.14 ( ! [X57,X90,X103,X66,X74,X87,X62,X95,X71,X100,X79,X84,X59,X92,X68,X97,X76,X105,X81,X56,X89,X102,X65,X73,X86,X61,X94,X70,X99,X78,X107,X83,X58,X91,X67,X96,X75,X104,X63,X80,X88,X101,X64,X72,X85,X60,X93,X69,X98,X77,X106,X82] : (~r1(X57,X58) | ~r1(X58,X59) | ~r1(X60,X61) | ~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X106,X107) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~r1(X59,X60) | ~r1(X56,X57) | ~sP2956(X56) | ~sP2957(X107)) )), 23.28/23.14 inference(general_splitting,[],[f6221,f6222_D])). 23.28/23.14 fof(f6221,plain,( 23.28/23.14 ( ! [X57,X90,X103,X66,X74,X87,X62,X95,X71,X100,X79,X108,X84,X59,X92,X68,X97,X76,X105,X81,X56,X89,X102,X65,X73,X86,X61,X94,X70,X99,X78,X107,X83,X58,X91,X67,X96,X75,X104,X63,X80,X88,X101,X64,X72,X85,X60,X93,X69,X98,X77,X106,X82] : (~r1(X57,X58) | ~r1(X58,X59) | ~r1(X60,X61) | ~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X106,X107) | p51(X108) | p50(X108) | ~r1(X107,X108) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~r1(X59,X60) | ~r1(X56,X57) | ~sP2956(X56)) )), 23.28/23.14 inference(general_splitting,[],[f711,f6220_D])). 23.28/23.14 fof(f6220,plain,( 23.28/23.14 ( ! [X56,X1] : (sP2956(X56) | ~r1(sK96,X1) | ~r1(X1,X56)) )), 23.28/23.14 inference(cnf_transformation,[],[f6220_D])). 23.28/23.14 fof(f6220_D,plain,( 23.28/23.14 ( ! [X56] : (( ! [X1] : (~r1(sK96,X1) | ~r1(X1,X56)) ) <=> ~sP2956(X56)) )), 23.28/23.14 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2956])])). 23.28/23.14 fof(f711,plain,( 23.28/23.14 ( ! [X57,X90,X103,X66,X74,X87,X62,X95,X71,X100,X1,X79,X108,X84,X59,X92,X68,X97,X76,X105,X81,X56,X89,X102,X65,X73,X86,X61,X94,X70,X99,X78,X107,X83,X58,X91,X67,X96,X75,X104,X63,X80,X88,X101,X64,X72,X85,X60,X93,X69,X98,X77,X106,X82] : (~r1(X57,X58) | ~r1(X58,X59) | ~r1(X60,X61) | ~r1(X63,X64) | ~r1(X65,X66) | ~r1(X66,X67) | ~r1(X68,X69) | ~r1(X69,X70) | ~r1(X70,X71) | ~r1(X76,X77) | ~r1(X77,X78) | ~r1(X78,X79) | ~r1(X79,X80) | ~r1(X81,X82) | ~r1(X82,X83) | ~r1(X83,X84) | ~r1(X89,X90) | ~r1(X90,X91) | ~r1(X91,X92) | ~r1(X93,X94) | ~r1(X96,X97) | ~r1(X97,X98) | ~r1(X98,X99) | ~r1(X99,X100) | ~r1(X100,X101) | ~r1(X104,X105) | ~r1(X105,X106) | ~r1(X106,X107) | p51(X108) | p50(X108) | ~r1(X107,X108) | ~r1(X103,X104) | ~r1(X102,X103) | ~r1(X101,X102) | ~r1(X95,X96) | ~r1(X94,X95) | ~r1(X92,X93) | ~r1(X88,X89) | ~r1(X87,X88) | ~r1(X86,X87) | ~r1(X85,X86) | ~r1(X84,X85) | ~r1(X80,X81) | ~r1(X75,X76) | ~r1(X74,X75) | ~r1(X73,X74) | ~r1(X72,X73) | ~r1(X71,X72) | ~r1(X67,X68) | ~r1(X64,X65) | ~r1(X62,X63) | ~r1(X61,X62) | ~r1(X59,X60) | ~r1(X56,X57) | ~r1(X1,X56) | ~r1(sK96,X1)) )), 23.28/23.14 inference(cnf_transformation,[],[f360])). 23.28/23.14 fof(f360,plain,( 23.28/23.14 ! [X1] : ((! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (((~p1(X54) | ~p51(X54)) & (p1(X54) | p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) & r1(X1,sK97(X1)) & ! [X56] : ((! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (((p51(X108) | p50(X108)) & (~p50(X108) | ~p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) & sP47(X56) & (r1(X56,sK98(X56)) & ~p51(sK98(X56)))) | ~r1(X1,X56))) | ~r1(sK96,X1)) & ((r1(sK99,sK100) & ((r1(sK101,sK102) & (r1(sK102,sK103) & (r1(sK103,sK104) & (r1(sK104,sK105) & (r1(sK105,sK106) & ((r1(sK107,sK108) & (r1(sK108,sK109) & (((((r1(sK113,sK114) & ((r1(sK115,sK116) & ((((r1(sK119,sK120) & (r1(sK120,sK121) & (r1(sK121,sK122) & (r1(sK122,sK123) & (r1(sK123,sK124) & ((r1(sK125,sK126) & ((r1(sK127,sK128) & (r1(sK128,sK129) & (r1(sK129,sK130) & (r1(sK130,sK131) & (r1(sK131,sK132) & (((((((r1(sK138,sK139) & (r1(sK139,sK140) & ((r1(sK141,sK142) & (r1(sK142,sK143) & (r1(sK143,sK144) & (r1(sK144,sK145) & ((((r1(sK148,sK149) & r1(sK149,sK150)) & r1(sK147,sK148)) & r1(sK146,sK147)) & r1(sK145,sK146)))))) & r1(sK140,sK141)))) & r1(sK137,sK138)) & r1(sK136,sK137)) & r1(sK135,sK136)) & r1(sK134,sK135)) & r1(sK133,sK134)) & r1(sK132,sK133))))))) & r1(sK126,sK127))) & r1(sK124,sK125))))))) & r1(sK118,sK119)) & r1(sK117,sK118)) & r1(sK116,sK117))) & r1(sK114,sK115))) & r1(sK112,sK113)) & r1(sK111,sK112)) & r1(sK110,sK111)) & r1(sK109,sK110)))) & r1(sK106,sK107))))))) & r1(sK100,sK101))) & r1(sK96,sK99)) & r1(sK96,sK151) & (r1(sK96,sK152) & (r1(sK152,sK153) & (r1(sK153,sK154) & ((((r1(sK157,sK158) & ((r1(sK159,sK160) & ((((r1(sK163,sK164) & (((r1(sK166,sK167) & (r1(sK167,sK168) & (((r1(sK170,sK171) & (r1(sK171,sK172) & (r1(sK172,sK173) & ((((((r1(sK178,sK179) & ((((r1(sK182,sK183) & (r1(sK183,sK184) & (r1(sK184,sK185) & ((((r1(sK188,sK189) & (r1(sK189,sK190) & (r1(sK190,sK191) & (((((r1(sK195,sK196) & ((r1(sK197,sK198) & ((r1(sK199,sK200) & (r1(sK200,sK201) & (r1(sK201,sK202) & r1(sK202,sK203)))) & r1(sK198,sK199))) & r1(sK196,sK197))) & r1(sK194,sK195)) & r1(sK193,sK194)) & r1(sK192,sK193)) & r1(sK191,sK192))))) & r1(sK187,sK188)) & r1(sK186,sK187)) & r1(sK185,sK186))))) & r1(sK181,sK182)) & r1(sK180,sK181)) & r1(sK179,sK180))) & r1(sK177,sK178)) & r1(sK176,sK177)) & r1(sK175,sK176)) & r1(sK174,sK175)) & r1(sK173,sK174))))) & r1(sK169,sK170)) & r1(sK168,sK169)))) & r1(sK165,sK166)) & r1(sK164,sK165))) & r1(sK162,sK163)) & r1(sK161,sK162)) & r1(sK160,sK161))) & r1(sK158,sK159))) & r1(sK156,sK157)) & r1(sK155,sK156)) & r1(sK154,sK155)))))), 23.28/23.14 inference(skolemisation,[status(esa),new_symbols(skolem,[sK96,sK97,sK98,sK99,sK100,sK101,sK102,sK103,sK104,sK105,sK106,sK107,sK108,sK109,sK110,sK111,sK112,sK113,sK114,sK115,sK116,sK117,sK118,sK119,sK120,sK121,sK122,sK123,sK124,sK125,sK126,sK127,sK128,sK129,sK130,sK131,sK132,sK133,sK134,sK135,sK136,sK137,sK138,sK139,sK140,sK141,sK142,sK143,sK144,sK145,sK146,sK147,sK148,sK149,sK150,sK151,sK152,sK153,sK154,sK155,sK156,sK157,sK158,sK159,sK160,sK161,sK162,sK163,sK164,sK165,sK166,sK167,sK168,sK169,sK170,sK171,sK172,sK173,sK174,sK175,sK176,sK177,sK178,sK179,sK180,sK181,sK182,sK183,sK184,sK185,sK186,sK187,sK188,sK189,sK190,sK191,sK192,sK193,sK194,sK195,sK196,sK197,sK198,sK199,sK200,sK201,sK202,sK203])],[f251,f359,f358,f357,f356,f355,f354,f353,f352,f351,f350,f349,f348,f347,f346,f345,f344,f343,f342,f341,f340,f339,f338,f337,f336,f335,f334,f333,f332,f331,f330,f329,f328,f327,f326,f325,f324,f323,f322,f321,f320,f319,f318,f317,f316,f315,f314,f313,f312,f311,f310,f309,f308,f307,f306,f305,f304,f303,f302,f301,f300,f299,f298,f297,f296,f295,f294,f293,f292,f291,f290,f289,f288,f287,f286,f285,f284,f283,f282,f281,f280,f279,f278,f277,f276,f275,f274,f273,f272,f271,f270,f269,f268,f267,f266,f265,f264,f263,f262,f261,f260,f259,f258,f257,f256,f255,f254,f253,f252])). 23.28/23.14 fof(f252,plain,( 23.28/23.14 ? [X0] : (! [X1] : ((! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (((~p1(X54) | ~p51(X54)) & (p1(X54) | p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) & ? [X55] : r1(X1,X55) & ! [X56] : ((! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (((p51(X108) | p50(X108)) & (~p50(X108) | ~p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) & sP47(X56) & ? [X109] : (r1(X56,X109) & ~p51(X109))) | ~r1(X1,X56))) | ~r1(X0,X1)) & ? [X110] : (? [X111] : (r1(X110,X111) & ? [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(X111,X112))) & r1(X0,X110)) & ? [X162] : r1(X0,X162) & ? [X163] : (r1(X0,X163) & ? [X164] : (r1(X163,X164) & ? [X165] : (r1(X164,X165) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166)))))) => (! [X1] : ((! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (((~p1(X54) | ~p51(X54)) & (p1(X54) | p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) & ? [X55] : r1(X1,X55) & ! [X56] : ((! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (((p51(X108) | p50(X108)) & (~p50(X108) | ~p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) & sP47(X56) & ? [X109] : (r1(X56,X109) & ~p51(X109))) | ~r1(X1,X56))) | ~r1(sK96,X1)) & ? [X110] : (? [X111] : (r1(X110,X111) & ? [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(X111,X112))) & r1(sK96,X110)) & ? [X162] : r1(sK96,X162) & ? [X163] : (r1(sK96,X163) & ? [X164] : (r1(X163,X164) & ? [X165] : (r1(X164,X165) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166))))))), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f253,plain,( 23.28/23.14 ! [X1] : (? [X55] : r1(X1,X55) => r1(X1,sK97(X1)))), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f254,plain,( 23.28/23.14 ! [X56] : (? [X109] : (r1(X56,X109) & ~p51(X109)) => (r1(X56,sK98(X56)) & ~p51(sK98(X56))))), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f255,plain,( 23.28/23.14 ( ! [X0] : (? [X110] : (? [X111] : (r1(X110,X111) & ? [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(X111,X112))) & r1(X0,X110)) => (? [X111] : (r1(sK99,X111) & ? [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(X111,X112))) & r1(X0,sK99))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f256,plain,( 23.28/23.14 ( ! [X110] : (? [X111] : (r1(X110,X111) & ? [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(X111,X112))) => (r1(X110,sK100) & ? [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(sK100,X112)))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f257,plain,( 23.28/23.14 ( ! [X111] : (? [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(X111,X112)) => (? [X113] : (r1(sK101,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(X111,sK101))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f258,plain,( 23.28/23.14 ( ! [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) => (r1(X112,sK102) & ? [X114] : (r1(sK102,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118)))))))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f259,plain,( 23.28/23.14 ( ! [X113] : (? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118)))))) => (r1(X113,sK103) & ? [X115] : (r1(sK103,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f260,plain,( 23.28/23.14 ( ! [X114] : (? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))) => (r1(X114,sK104) & ? [X116] : (r1(sK104,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118)))))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f261,plain,( 23.28/23.14 ( ! [X115] : (? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118)))) => (r1(X115,sK105) & ? [X117] : (r1(sK105,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f262,plain,( 23.28/23.14 ( ! [X116] : (? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))) => (r1(X116,sK106) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(sK106,X118)))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f263,plain,( 23.28/23.14 ( ! [X117] : (? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118)) => (? [X119] : (r1(sK107,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,sK107))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f264,plain,( 23.28/23.14 ( ! [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) => (r1(X118,sK108) & ? [X120] : (r1(sK108,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121))))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f265,plain,( 23.28/23.14 ( ! [X119] : (? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121))) => (r1(X119,sK109) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(sK109,X121)))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f266,plain,( 23.28/23.14 ( ! [X120] : (? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)) => (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(sK110,X122)) & r1(X120,sK110))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f267,plain,( 23.28/23.14 ( ! [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) => (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(sK111,X123)) & r1(X121,sK111))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f268,plain,( 23.28/23.14 ( ! [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) => (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(sK112,X124)) & r1(X122,sK112))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f269,plain,( 23.28/23.14 ( ! [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) => (? [X125] : (r1(sK113,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,sK113))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f270,plain,( 23.28/23.14 ( ! [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) => (r1(X124,sK114) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(sK114,X126)))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.14 fof(f271,plain,( 23.28/23.14 ( ! [X125] : (? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126)) => (? [X127] : (r1(sK115,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,sK115))) )), 23.28/23.14 introduced(choice_axiom,[])). 23.28/23.15 fof(f272,plain,( 23.28/23.15 ( ! [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) => (r1(X126,sK116) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(sK116,X128)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f273,plain,( 23.28/23.15 ( ! [X127] : (? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128)) => (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(sK117,X129)) & r1(X127,sK117))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f274,plain,( 23.28/23.15 ( ! [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) => (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(sK118,X130)) & r1(X128,sK118))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f275,plain,( 23.28/23.15 ( ! [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) => (? [X131] : (r1(sK119,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,sK119))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f276,plain,( 23.28/23.15 ( ! [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) => (r1(X130,sK120) & ? [X132] : (r1(sK120,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136)))))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f277,plain,( 23.28/23.15 ( ! [X131] : (? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136)))))) => (r1(X131,sK121) & ? [X133] : (r1(sK121,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f278,plain,( 23.28/23.15 ( ! [X132] : (? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))) => (r1(X132,sK122) & ? [X134] : (r1(sK122,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136)))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f279,plain,( 23.28/23.15 ( ! [X133] : (? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136)))) => (r1(X133,sK123) & ? [X135] : (r1(sK123,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f280,plain,( 23.28/23.15 ( ! [X134] : (? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))) => (r1(X134,sK124) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(sK124,X136)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f281,plain,( 23.28/23.15 ( ! [X135] : (? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136)) => (? [X137] : (r1(sK125,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,sK125))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f282,plain,( 23.28/23.15 ( ! [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) => (r1(X136,sK126) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(sK126,X138)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f283,plain,( 23.28/23.15 ( ! [X137] : (? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138)) => (? [X139] : (r1(sK127,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,sK127))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f284,plain,( 23.28/23.15 ( ! [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) => (r1(X138,sK128) & ? [X140] : (r1(sK128,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144)))))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f285,plain,( 23.28/23.15 ( ! [X139] : (? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144)))))) => (r1(X139,sK129) & ? [X141] : (r1(sK129,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f286,plain,( 23.28/23.15 ( ! [X140] : (? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))) => (r1(X140,sK130) & ? [X142] : (r1(sK130,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144)))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f287,plain,( 23.28/23.15 ( ! [X141] : (? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144)))) => (r1(X141,sK131) & ? [X143] : (r1(sK131,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f288,plain,( 23.28/23.15 ( ! [X142] : (? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))) => (r1(X142,sK132) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(sK132,X144)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f289,plain,( 23.28/23.15 ( ! [X143] : (? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144)) => (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(sK133,X145)) & r1(X143,sK133))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f290,plain,( 23.28/23.15 ( ! [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) => (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(sK134,X146)) & r1(X144,sK134))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f291,plain,( 23.28/23.15 ( ! [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) => (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(sK135,X147)) & r1(X145,sK135))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f292,plain,( 23.28/23.15 ( ! [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) => (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(sK136,X148)) & r1(X146,sK136))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f293,plain,( 23.28/23.15 ( ! [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) => (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(sK137,X149)) & r1(X147,sK137))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f294,plain,( 23.28/23.15 ( ! [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) => (? [X150] : (r1(sK138,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,sK138))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f295,plain,( 23.28/23.15 ( ! [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) => (r1(X149,sK139) & ? [X151] : (r1(sK139,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f296,plain,( 23.28/23.15 ( ! [X150] : (? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152))) => (r1(X150,sK140) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(sK140,X152)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f297,plain,( 23.28/23.15 ( ! [X151] : (? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)) => (? [X153] : (r1(sK141,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,sK141))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f298,plain,( 23.28/23.15 ( ! [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) => (r1(X152,sK142) & ? [X154] : (r1(sK142,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157))))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f299,plain,( 23.28/23.15 ( ! [X153] : (? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157))))) => (r1(X153,sK143) & ? [X155] : (r1(sK143,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f300,plain,( 23.28/23.15 ( ! [X154] : (? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))) => (r1(X154,sK144) & ? [X156] : (r1(sK144,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f301,plain,( 23.28/23.15 ( ! [X155] : (? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157))) => (r1(X155,sK145) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(sK145,X157)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f302,plain,( 23.28/23.15 ( ! [X156] : (? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)) => (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(sK146,X158)) & r1(X156,sK146))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f303,plain,( 23.28/23.15 ( ! [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) => (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(sK147,X159)) & r1(X157,sK147))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f304,plain,( 23.28/23.15 ( ! [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) => (? [X160] : (r1(sK148,X160) & ? [X161] : r1(X160,X161)) & r1(X158,sK148))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f305,plain,( 23.28/23.15 ( ! [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) => (r1(X159,sK149) & ? [X161] : r1(sK149,X161))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f306,plain,( 23.28/23.15 ( ! [X160] : (? [X161] : r1(X160,X161) => r1(X160,sK150)) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f307,plain,( 23.28/23.15 ( ! [X0] : (? [X162] : r1(X0,X162) => r1(X0,sK151)) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f308,plain,( 23.28/23.15 ( ! [X0] : (? [X163] : (r1(X0,X163) & ? [X164] : (r1(X163,X164) & ? [X165] : (r1(X164,X165) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166))))) => (r1(X0,sK152) & ? [X164] : (r1(sK152,X164) & ? [X165] : (r1(X164,X165) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166)))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f309,plain,( 23.28/23.15 ( ! [X163] : (? [X164] : (r1(X163,X164) & ? [X165] : (r1(X164,X165) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166)))) => (r1(X163,sK153) & ? [X165] : (r1(sK153,X165) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f310,plain,( 23.28/23.15 ( ! [X164] : (? [X165] : (r1(X164,X165) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166))) => (r1(X164,sK154) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(sK154,X166)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f311,plain,( 23.28/23.15 ( ! [X165] : (? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166)) => (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(sK155,X167)) & r1(X165,sK155))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f312,plain,( 23.28/23.15 ( ! [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) => (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(sK156,X168)) & r1(X166,sK156))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f313,plain,( 23.28/23.15 ( ! [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) => (? [X169] : (r1(sK157,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,sK157))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f314,plain,( 23.28/23.15 ( ! [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) => (r1(X168,sK158) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(sK158,X170)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f315,plain,( 23.28/23.15 ( ! [X169] : (? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170)) => (? [X171] : (r1(sK159,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,sK159))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f316,plain,( 23.28/23.15 ( ! [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) => (r1(X170,sK160) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(sK160,X172)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f317,plain,( 23.28/23.15 ( ! [X171] : (? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172)) => (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(sK161,X173)) & r1(X171,sK161))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f318,plain,( 23.28/23.15 ( ! [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) => (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(sK162,X174)) & r1(X172,sK162))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f319,plain,( 23.28/23.15 ( ! [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) => (? [X175] : (r1(sK163,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,sK163))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f320,plain,( 23.28/23.15 ( ! [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) => (r1(X174,sK164) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(sK164,X176)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f321,plain,( 23.28/23.15 ( ! [X175] : (? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176)) => (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(sK165,X177)) & r1(X175,sK165))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f322,plain,( 23.28/23.15 ( ! [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) => (? [X178] : (r1(sK166,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,sK166))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f323,plain,( 23.28/23.15 ( ! [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) => (r1(X177,sK167) & ? [X179] : (r1(sK167,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f324,plain,( 23.28/23.15 ( ! [X178] : (? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180))) => (r1(X178,sK168) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(sK168,X180)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f325,plain,( 23.28/23.15 ( ! [X179] : (? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)) => (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(sK169,X181)) & r1(X179,sK169))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f326,plain,( 23.28/23.15 ( ! [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) => (? [X182] : (r1(sK170,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,sK170))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f327,plain,( 23.28/23.15 ( ! [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) => (r1(X181,sK171) & ? [X183] : (r1(sK171,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185)))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f328,plain,( 23.28/23.15 ( ! [X182] : (? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185)))) => (r1(X182,sK172) & ? [X184] : (r1(sK172,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f329,plain,( 23.28/23.15 ( ! [X183] : (? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))) => (r1(X183,sK173) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(sK173,X185)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f330,plain,( 23.28/23.15 ( ! [X184] : (? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185)) => (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(sK174,X186)) & r1(X184,sK174))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f331,plain,( 23.28/23.15 ( ! [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) => (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(sK175,X187)) & r1(X185,sK175))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f332,plain,( 23.28/23.15 ( ! [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) => (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(sK176,X188)) & r1(X186,sK176))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f333,plain,( 23.28/23.15 ( ! [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) => (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(sK177,X189)) & r1(X187,sK177))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f334,plain,( 23.28/23.15 ( ! [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) => (? [X190] : (r1(sK178,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,sK178))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f335,plain,( 23.28/23.15 ( ! [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) => (r1(X189,sK179) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(sK179,X191)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f336,plain,( 23.28/23.15 ( ! [X190] : (? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191)) => (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(sK180,X192)) & r1(X190,sK180))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f337,plain,( 23.28/23.15 ( ! [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) => (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(sK181,X193)) & r1(X191,sK181))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f338,plain,( 23.28/23.15 ( ! [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) => (? [X194] : (r1(sK182,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,sK182))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f339,plain,( 23.28/23.15 ( ! [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) => (r1(X193,sK183) & ? [X195] : (r1(sK183,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197)))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f340,plain,( 23.28/23.15 ( ! [X194] : (? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197)))) => (r1(X194,sK184) & ? [X196] : (r1(sK184,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f341,plain,( 23.28/23.15 ( ! [X195] : (? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))) => (r1(X195,sK185) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(sK185,X197)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f342,plain,( 23.28/23.15 ( ! [X196] : (? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197)) => (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(sK186,X198)) & r1(X196,sK186))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f343,plain,( 23.28/23.15 ( ! [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) => (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(sK187,X199)) & r1(X197,sK187))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f344,plain,( 23.28/23.15 ( ! [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) => (? [X200] : (r1(sK188,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,sK188))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f345,plain,( 23.28/23.15 ( ! [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) => (r1(X199,sK189) & ? [X201] : (r1(sK189,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203)))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f346,plain,( 23.28/23.15 ( ! [X200] : (? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203)))) => (r1(X200,sK190) & ? [X202] : (r1(sK190,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f347,plain,( 23.28/23.15 ( ! [X201] : (? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))) => (r1(X201,sK191) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(sK191,X203)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f348,plain,( 23.28/23.15 ( ! [X202] : (? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203)) => (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(sK192,X204)) & r1(X202,sK192))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f349,plain,( 23.28/23.15 ( ! [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) => (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(sK193,X205)) & r1(X203,sK193))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f350,plain,( 23.28/23.15 ( ! [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) => (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(sK194,X206)) & r1(X204,sK194))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f351,plain,( 23.28/23.15 ( ! [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) => (? [X207] : (r1(sK195,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,sK195))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f352,plain,( 23.28/23.15 ( ! [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) => (r1(X206,sK196) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(sK196,X208)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f353,plain,( 23.28/23.15 ( ! [X207] : (? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208)) => (? [X209] : (r1(sK197,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,sK197))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f354,plain,( 23.28/23.15 ( ! [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) => (r1(X208,sK198) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(sK198,X210)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f355,plain,( 23.28/23.15 ( ! [X209] : (? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210)) => (? [X211] : (r1(sK199,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,sK199))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f356,plain,( 23.28/23.15 ( ! [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) => (r1(X210,sK200) & ? [X212] : (r1(sK200,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214))))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f357,plain,( 23.28/23.15 ( ! [X211] : (? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214))) => (r1(X211,sK201) & ? [X213] : (r1(sK201,X213) & ? [X214] : r1(X213,X214)))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f358,plain,( 23.28/23.15 ( ! [X212] : (? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)) => (r1(X212,sK202) & ? [X214] : r1(sK202,X214))) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f359,plain,( 23.28/23.15 ( ! [X213] : (? [X214] : r1(X213,X214) => r1(X213,sK203)) )), 23.28/23.15 introduced(choice_axiom,[])). 23.28/23.15 fof(f251,plain,( 23.28/23.15 ? [X0] : (! [X1] : ((! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (((~p1(X54) | ~p51(X54)) & (p1(X54) | p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) & ? [X55] : r1(X1,X55) & ! [X56] : ((! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (((p51(X108) | p50(X108)) & (~p50(X108) | ~p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) & sP47(X56) & ? [X109] : (r1(X56,X109) & ~p51(X109))) | ~r1(X1,X56))) | ~r1(X0,X1)) & ? [X110] : (? [X111] : (r1(X110,X111) & ? [X112] : (? [X113] : (r1(X112,X113) & ? [X114] : (r1(X113,X114) & ? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (r1(X116,X117) & ? [X118] : (? [X119] : (r1(X118,X119) & ? [X120] : (r1(X119,X120) & ? [X121] : (? [X122] : (? [X123] : (? [X124] : (? [X125] : (r1(X124,X125) & ? [X126] : (? [X127] : (r1(X126,X127) & ? [X128] : (? [X129] : (? [X130] : (? [X131] : (r1(X130,X131) & ? [X132] : (r1(X131,X132) & ? [X133] : (r1(X132,X133) & ? [X134] : (r1(X133,X134) & ? [X135] : (r1(X134,X135) & ? [X136] : (? [X137] : (r1(X136,X137) & ? [X138] : (? [X139] : (r1(X138,X139) & ? [X140] : (r1(X139,X140) & ? [X141] : (r1(X140,X141) & ? [X142] : (r1(X141,X142) & ? [X143] : (r1(X142,X143) & ? [X144] : (? [X145] : (? [X146] : (? [X147] : (? [X148] : (? [X149] : (? [X150] : (r1(X149,X150) & ? [X151] : (r1(X150,X151) & ? [X152] : (? [X153] : (r1(X152,X153) & ? [X154] : (r1(X153,X154) & ? [X155] : (r1(X154,X155) & ? [X156] : (r1(X155,X156) & ? [X157] : (? [X158] : (? [X159] : (? [X160] : (r1(X159,X160) & ? [X161] : r1(X160,X161)) & r1(X158,X159)) & r1(X157,X158)) & r1(X156,X157)))))) & r1(X151,X152)))) & r1(X148,X149)) & r1(X147,X148)) & r1(X146,X147)) & r1(X145,X146)) & r1(X144,X145)) & r1(X143,X144))))))) & r1(X137,X138))) & r1(X135,X136))))))) & r1(X129,X130)) & r1(X128,X129)) & r1(X127,X128))) & r1(X125,X126))) & r1(X123,X124)) & r1(X122,X123)) & r1(X121,X122)) & r1(X120,X121)))) & r1(X117,X118))))))) & r1(X111,X112))) & r1(X0,X110)) & ? [X162] : r1(X0,X162) & ? [X163] : (r1(X0,X163) & ? [X164] : (r1(X163,X164) & ? [X165] : (r1(X164,X165) & ? [X166] : (? [X167] : (? [X168] : (? [X169] : (r1(X168,X169) & ? [X170] : (? [X171] : (r1(X170,X171) & ? [X172] : (? [X173] : (? [X174] : (? [X175] : (r1(X174,X175) & ? [X176] : (? [X177] : (? [X178] : (r1(X177,X178) & ? [X179] : (r1(X178,X179) & ? [X180] : (? [X181] : (? [X182] : (r1(X181,X182) & ? [X183] : (r1(X182,X183) & ? [X184] : (r1(X183,X184) & ? [X185] : (? [X186] : (? [X187] : (? [X188] : (? [X189] : (? [X190] : (r1(X189,X190) & ? [X191] : (? [X192] : (? [X193] : (? [X194] : (r1(X193,X194) & ? [X195] : (r1(X194,X195) & ? [X196] : (r1(X195,X196) & ? [X197] : (? [X198] : (? [X199] : (? [X200] : (r1(X199,X200) & ? [X201] : (r1(X200,X201) & ? [X202] : (r1(X201,X202) & ? [X203] : (? [X204] : (? [X205] : (? [X206] : (? [X207] : (r1(X206,X207) & ? [X208] : (? [X209] : (r1(X208,X209) & ? [X210] : (? [X211] : (r1(X210,X211) & ? [X212] : (r1(X211,X212) & ? [X213] : (r1(X212,X213) & ? [X214] : r1(X213,X214)))) & r1(X209,X210))) & r1(X207,X208))) & r1(X205,X206)) & r1(X204,X205)) & r1(X203,X204)) & r1(X202,X203))))) & r1(X198,X199)) & r1(X197,X198)) & r1(X196,X197))))) & r1(X192,X193)) & r1(X191,X192)) & r1(X190,X191))) & r1(X188,X189)) & r1(X187,X188)) & r1(X186,X187)) & r1(X185,X186)) & r1(X184,X185))))) & r1(X180,X181)) & r1(X179,X180)))) & r1(X176,X177)) & r1(X175,X176))) & r1(X173,X174)) & r1(X172,X173)) & r1(X171,X172))) & r1(X169,X170))) & r1(X167,X168)) & r1(X166,X167)) & r1(X165,X166))))))), 23.28/23.15 inference(rectify,[],[f58])). 23.28/23.15 fof(f58,plain,( 23.28/23.15 ? [X0] : (! [X1] : ((! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (((~p1(X54) | ~p51(X54)) & (p1(X54) | p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) & ? [X55] : r1(X1,X55) & ! [X56] : ((! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (((p51(X108) | p50(X108)) & (~p50(X108) | ~p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) & sP47(X56) & ? [X1529] : (r1(X56,X1529) & ~p51(X1529))) | ~r1(X1,X56))) | ~r1(X0,X1)) & ? [X1530] : (? [X1531] : (r1(X1530,X1531) & ? [X1532] : (? [X1533] : (r1(X1532,X1533) & ? [X1534] : (r1(X1533,X1534) & ? [X1535] : (r1(X1534,X1535) & ? [X1536] : (r1(X1535,X1536) & ? [X1537] : (r1(X1536,X1537) & ? [X1538] : (? [X1539] : (r1(X1538,X1539) & ? [X1540] : (r1(X1539,X1540) & ? [X1541] : (? [X1542] : (? [X1543] : (? [X1544] : (? [X1545] : (r1(X1544,X1545) & ? [X1546] : (? [X1547] : (r1(X1546,X1547) & ? [X1548] : (? [X1549] : (? [X1550] : (? [X1551] : (r1(X1550,X1551) & ? [X1552] : (r1(X1551,X1552) & ? [X1553] : (r1(X1552,X1553) & ? [X1554] : (r1(X1553,X1554) & ? [X1555] : (r1(X1554,X1555) & ? [X1556] : (? [X1557] : (r1(X1556,X1557) & ? [X1558] : (? [X1559] : (r1(X1558,X1559) & ? [X1560] : (r1(X1559,X1560) & ? [X1561] : (r1(X1560,X1561) & ? [X1562] : (r1(X1561,X1562) & ? [X1563] : (r1(X1562,X1563) & ? [X1564] : (? [X1565] : (? [X1566] : (? [X1567] : (? [X1568] : (? [X1569] : (? [X1570] : (r1(X1569,X1570) & ? [X1571] : (r1(X1570,X1571) & ? [X1572] : (? [X1573] : (r1(X1572,X1573) & ? [X1574] : (r1(X1573,X1574) & ? [X1575] : (r1(X1574,X1575) & ? [X1576] : (r1(X1575,X1576) & ? [X1577] : (? [X1578] : (? [X1579] : (? [X1580] : (r1(X1579,X1580) & ? [X1581] : r1(X1580,X1581)) & r1(X1578,X1579)) & r1(X1577,X1578)) & r1(X1576,X1577)))))) & r1(X1571,X1572)))) & r1(X1568,X1569)) & r1(X1567,X1568)) & r1(X1566,X1567)) & r1(X1565,X1566)) & r1(X1564,X1565)) & r1(X1563,X1564))))))) & r1(X1557,X1558))) & r1(X1555,X1556))))))) & r1(X1549,X1550)) & r1(X1548,X1549)) & r1(X1547,X1548))) & r1(X1545,X1546))) & r1(X1543,X1544)) & r1(X1542,X1543)) & r1(X1541,X1542)) & r1(X1540,X1541)))) & r1(X1537,X1538))))))) & r1(X1531,X1532))) & r1(X0,X1530)) & ? [X1582] : r1(X0,X1582) & ? [X1583] : (r1(X0,X1583) & ? [X1584] : (r1(X1583,X1584) & ? [X1585] : (r1(X1584,X1585) & ? [X1586] : (? [X1587] : (? [X1588] : (? [X1589] : (r1(X1588,X1589) & ? [X1590] : (? [X1591] : (r1(X1590,X1591) & ? [X1592] : (? [X1593] : (? [X1594] : (? [X1595] : (r1(X1594,X1595) & ? [X1596] : (? [X1597] : (? [X1598] : (r1(X1597,X1598) & ? [X1599] : (r1(X1598,X1599) & ? [X1600] : (? [X1601] : (? [X1602] : (r1(X1601,X1602) & ? [X1603] : (r1(X1602,X1603) & ? [X1604] : (r1(X1603,X1604) & ? [X1605] : (? [X1606] : (? [X1607] : (? [X1608] : (? [X1609] : (? [X1610] : (r1(X1609,X1610) & ? [X1611] : (? [X1612] : (? [X1613] : (? [X1614] : (r1(X1613,X1614) & ? [X1615] : (r1(X1614,X1615) & ? [X1616] : (r1(X1615,X1616) & ? [X1617] : (? [X1618] : (? [X1619] : (? [X1620] : (r1(X1619,X1620) & ? [X1621] : (r1(X1620,X1621) & ? [X1622] : (r1(X1621,X1622) & ? [X1623] : (? [X1624] : (? [X1625] : (? [X1626] : (? [X1627] : (r1(X1626,X1627) & ? [X1628] : (? [X1629] : (r1(X1628,X1629) & ? [X1630] : (? [X1631] : (r1(X1630,X1631) & ? [X1632] : (r1(X1631,X1632) & ? [X1633] : (r1(X1632,X1633) & ? [X1634] : r1(X1633,X1634)))) & r1(X1629,X1630))) & r1(X1627,X1628))) & r1(X1625,X1626)) & r1(X1624,X1625)) & r1(X1623,X1624)) & r1(X1622,X1623))))) & r1(X1618,X1619)) & r1(X1617,X1618)) & r1(X1616,X1617))))) & r1(X1612,X1613)) & r1(X1611,X1612)) & r1(X1610,X1611))) & r1(X1608,X1609)) & r1(X1607,X1608)) & r1(X1606,X1607)) & r1(X1605,X1606)) & r1(X1604,X1605))))) & r1(X1600,X1601)) & r1(X1599,X1600)))) & r1(X1596,X1597)) & r1(X1595,X1596))) & r1(X1593,X1594)) & r1(X1592,X1593)) & r1(X1591,X1592))) & r1(X1589,X1590))) & r1(X1587,X1588)) & r1(X1586,X1587)) & r1(X1585,X1586))))))), 23.28/23.15 inference(definition_folding,[],[f9,f57,f56,f55,f54,f53,f52,f51,f50,f49,f48,f47,f46,f45,f44,f43,f42,f41,f40,f39,f38,f37,f36,f35,f34,f33,f32,f31,f30,f29,f28,f27,f26,f25,f24,f23,f22,f21,f20,f19,f18,f17,f16,f15,f14,f13,f12,f11,f10])). 23.28/23.15 fof(f11,plain,( 23.28/23.15 ! [X559] : (! [X560] : (~r1(X559,X560) | (! [X561] : (! [X562] : (~r1(X561,X562) | ! [X563] : (~r1(X562,X563) | ! [X564] : (! [X565] : (((~p4(X565) | ~p3(X565)) & (p4(X565) | p3(X565))) | ~r1(X564,X565)) | ~r1(X563,X564)))) | ~r1(X560,X561)) & sP0(X560) & ? [X576] : (r1(X560,X576) & ~p4(X576)))) | ~sP1(X559))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP1])])). 23.28/23.15 fof(f12,plain,( 23.28/23.15 ! [X558] : (! [X559] : ((sP1(X559) & ? [X577] : (r1(X559,X577) & ~p5(X577)) & ! [X578] : (~r1(X559,X578) | ! [X579] : (! [X580] : (! [X581] : (~r1(X580,X581) | ! [X582] : (~r1(X581,X582) | ! [X583] : (~r1(X582,X583) | ((p4(X583) | p5(X583)) & (~p5(X583) | ~p4(X583)))))) | ~r1(X579,X580)) | ~r1(X578,X579)))) | ~r1(X558,X559)) | ~sP2(X558))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP2])])). 23.28/23.15 fof(f15,plain,( 23.28/23.15 ! [X536] : (! [X538] : (~r1(X536,X538) | (! [X539] : (~r1(X538,X539) | ! [X540] : (! [X541] : (! [X542] : (! [X543] : (~r1(X542,X543) | ! [X544] : (! [X545] : (~r1(X544,X545) | ! [X546] : (! [X547] : (((~p7(X547) | ~p8(X547)) & (p7(X547) | p8(X547))) | ~r1(X546,X547)) | ~r1(X545,X546))) | ~r1(X543,X544))) | ~r1(X541,X542)) | ~r1(X540,X541)) | ~r1(X539,X540))) & sP4(X538) & ? [X592] : (r1(X538,X592) & ~p8(X592)))) | ~sP5(X536))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP5])])). 23.28/23.15 fof(f16,plain,( 23.28/23.15 ! [X523] : (! [X536] : (~r1(X523,X536) | (? [X537] : (r1(X536,X537) & ~p9(X537)) & sP5(X536) & ! [X593] : (~r1(X536,X593) | ! [X594] : (~r1(X593,X594) | ! [X595] : (! [X596] : (! [X597] : (! [X598] : (! [X599] : (~r1(X598,X599) | ! [X600] : (! [X601] : (! [X602] : (((p8(X602) | p9(X602)) & (~p9(X602) | ~p8(X602))) | ~r1(X601,X602)) | ~r1(X600,X601)) | ~r1(X599,X600))) | ~r1(X597,X598)) | ~r1(X596,X597)) | ~r1(X595,X596)) | ~r1(X594,X595)))))) | ~sP6(X523))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP6])])). 23.28/23.15 fof(f17,plain,( 23.28/23.15 ! [X522] : (! [X523] : ((! [X524] : (! [X525] : (! [X526] : (~r1(X525,X526) | ! [X527] : (~r1(X526,X527) | ! [X528] : (~r1(X527,X528) | ! [X529] : (~r1(X528,X529) | ! [X530] : (~r1(X529,X530) | ! [X531] : (! [X532] : (! [X533] : (! [X534] : (~r1(X533,X534) | ((~p10(X534) | ~p9(X534)) & (p10(X534) | p9(X534)))) | ~r1(X532,X533)) | ~r1(X531,X532)) | ~r1(X530,X531))))))) | ~r1(X524,X525)) | ~r1(X523,X524)) & ? [X535] : (~p10(X535) & r1(X523,X535)) & sP6(X523)) | ~r1(X522,X523)) | ~sP7(X522))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP7])])). 23.28/23.15 fof(f18,plain,( 23.28/23.15 ! [X507] : (! [X522] : (~r1(X507,X522) | (sP7(X522) & ? [X603] : (r1(X522,X603) & ~p11(X603)) & ! [X604] : (~r1(X522,X604) | ! [X605] : (~r1(X604,X605) | ! [X606] : (~r1(X605,X606) | ! [X607] : (~r1(X606,X607) | ! [X608] : (~r1(X607,X608) | ! [X609] : (~r1(X608,X609) | ! [X610] : (~r1(X609,X610) | ! [X611] : (! [X612] : (! [X613] : (~r1(X612,X613) | ! [X614] : (! [X615] : (~r1(X614,X615) | ((p11(X615) | p10(X615)) & (~p11(X615) | ~p10(X615)))) | ~r1(X613,X614))) | ~r1(X611,X612)) | ~r1(X610,X611))))))))))) | ~sP8(X507))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP8])])). 23.28/23.15 fof(f19,plain,( 23.28/23.15 ! [X505] : (! [X507] : (~r1(X505,X507) | (! [X508] : (~r1(X507,X508) | ! [X509] : (~r1(X508,X509) | ! [X510] : (! [X511] : (! [X512] : (! [X513] : (! [X514] : (~r1(X513,X514) | ! [X515] : (~r1(X514,X515) | ! [X516] : (! [X517] : (~r1(X516,X517) | ! [X518] : (~r1(X517,X518) | ! [X519] : (~r1(X518,X519) | ! [X520] : (~r1(X519,X520) | ((p12(X520) | p11(X520)) & (~p12(X520) | ~p11(X520))))))) | ~r1(X515,X516)))) | ~r1(X512,X513)) | ~r1(X511,X512)) | ~r1(X510,X511)) | ~r1(X509,X510)))) & ? [X521] : (r1(X507,X521) & ~p12(X521)) & sP8(X507))) | ~sP9(X505))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP9])])). 23.28/23.15 fof(f21,plain,( 23.28/23.15 ! [X502] : (! [X503] : (~r1(X502,X503) | (? [X504] : (r1(X503,X504) & ~p14(X504)) & sP10(X503) & ! [X630] : (~r1(X503,X630) | ! [X631] : (! [X632] : (~r1(X631,X632) | ! [X633] : (! [X634] : (~r1(X633,X634) | ! [X635] : (! [X636] : (! [X637] : (~r1(X636,X637) | ! [X638] : (~r1(X637,X638) | ! [X639] : (~r1(X638,X639) | ! [X640] : (~r1(X639,X640) | ! [X641] : (! [X642] : (~r1(X641,X642) | ! [X643] : (! [X644] : (~r1(X643,X644) | ((p14(X644) | p13(X644)) & (~p14(X644) | ~p13(X644)))) | ~r1(X642,X643))) | ~r1(X640,X641)))))) | ~r1(X635,X636)) | ~r1(X634,X635))) | ~r1(X632,X633))) | ~r1(X630,X631))))) | ~sP11(X502))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP11])])). 23.28/23.15 fof(f22,plain,( 23.28/23.15 ! [X501] : (! [X502] : (~r1(X501,X502) | (sP11(X502) & ? [X645] : (~p15(X645) & r1(X502,X645)) & ! [X646] : (! [X647] : (! [X648] : (~r1(X647,X648) | ! [X649] : (! [X650] : (~r1(X649,X650) | ! [X651] : (~r1(X650,X651) | ! [X652] : (! [X653] : (! [X654] : (! [X655] : (~r1(X654,X655) | ! [X656] : (! [X657] : (~r1(X656,X657) | ! [X658] : (~r1(X657,X658) | ! [X659] : (! [X660] : (~r1(X659,X660) | ! [X661] : (((~p14(X661) | ~p15(X661)) & (p14(X661) | p15(X661))) | ~r1(X660,X661))) | ~r1(X658,X659)))) | ~r1(X655,X656))) | ~r1(X653,X654)) | ~r1(X652,X653)) | ~r1(X651,X652)))) | ~r1(X648,X649))) | ~r1(X646,X647)) | ~r1(X502,X646)))) | ~sP12(X501))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP12])])). 23.28/23.15 fof(f23,plain,( 23.28/23.15 ! [X481] : (! [X501] : (~r1(X481,X501) | (sP12(X501) & ? [X662] : (~p16(X662) & r1(X501,X662)) & ! [X663] : (~r1(X501,X663) | ! [X664] : (! [X665] : (~r1(X664,X665) | ! [X666] : (! [X667] : (! [X668] : (! [X669] : (~r1(X668,X669) | ! [X670] : (! [X671] : (~r1(X670,X671) | ! [X672] : (! [X673] : (~r1(X672,X673) | ! [X674] : (! [X675] : (! [X676] : (! [X677] : (! [X678] : (~r1(X677,X678) | ! [X679] : (~r1(X678,X679) | ((~p15(X679) | ~p16(X679)) & (p16(X679) | p15(X679))))) | ~r1(X676,X677)) | ~r1(X675,X676)) | ~r1(X674,X675)) | ~r1(X673,X674))) | ~r1(X671,X672))) | ~r1(X669,X670))) | ~r1(X667,X668)) | ~r1(X666,X667)) | ~r1(X665,X666))) | ~r1(X663,X664))))) | ~sP13(X481))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP13])])). 23.28/23.15 fof(f24,plain,( 23.28/23.15 ! [X461] : (! [X481] : (~r1(X461,X481) | (! [X482] : (~r1(X481,X482) | ! [X483] : (! [X484] : (~r1(X483,X484) | ! [X485] : (! [X486] : (~r1(X485,X486) | ! [X487] : (~r1(X486,X487) | ! [X488] : (~r1(X487,X488) | ! [X489] : (~r1(X488,X489) | ! [X490] : (~r1(X489,X490) | ! [X491] : (~r1(X490,X491) | ! [X492] : (~r1(X491,X492) | ! [X493] : (! [X494] : (! [X495] : (~r1(X494,X495) | ! [X496] : (~r1(X495,X496) | ! [X497] : (~r1(X496,X497) | ! [X498] : (! [X499] : (~r1(X498,X499) | ((p17(X499) | p16(X499)) & (~p16(X499) | ~p17(X499)))) | ~r1(X497,X498))))) | ~r1(X493,X494)) | ~r1(X492,X493))))))))) | ~r1(X484,X485))) | ~r1(X482,X483))) & ? [X500] : (~p17(X500) & r1(X481,X500)) & sP13(X481))) | ~sP14(X461))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP14])])). 23.28/23.15 fof(f25,plain,( 23.28/23.15 ! [X459] : (! [X461] : ((! [X462] : (~r1(X461,X462) | ! [X463] : (~r1(X462,X463) | ! [X464] : (~r1(X463,X464) | ! [X465] : (! [X466] : (! [X467] : (! [X468] : (~r1(X467,X468) | ! [X469] : (! [X470] : (! [X471] : (~r1(X470,X471) | ! [X472] : (~r1(X471,X472) | ! [X473] : (! [X474] : (~r1(X473,X474) | ! [X475] : (! [X476] : (! [X477] : (! [X478] : (! [X479] : (~r1(X478,X479) | ! [X480] : (~r1(X479,X480) | ((p17(X480) | p18(X480)) & (~p17(X480) | ~p18(X480))))) | ~r1(X477,X478)) | ~r1(X476,X477)) | ~r1(X475,X476)) | ~r1(X474,X475))) | ~r1(X472,X473)))) | ~r1(X469,X470)) | ~r1(X468,X469))) | ~r1(X466,X467)) | ~r1(X465,X466)) | ~r1(X464,X465))))) & sP14(X461) & ? [X680] : (~p18(X680) & r1(X461,X680))) | ~r1(X459,X461)) | ~sP15(X459))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP15])])). 23.28/23.15 fof(f26,plain,( 23.28/23.15 ! [X457] : (! [X459] : ((? [X460] : (r1(X459,X460) & ~p19(X460)) & sP15(X459) & ! [X681] : (! [X682] : (~r1(X681,X682) | ! [X683] : (! [X684] : (~r1(X683,X684) | ! [X685] : (~r1(X684,X685) | ! [X686] : (! [X687] : (~r1(X686,X687) | ! [X688] : (! [X689] : (~r1(X688,X689) | ! [X690] : (~r1(X689,X690) | ! [X691] : (~r1(X690,X691) | ! [X692] : (~r1(X691,X692) | ! [X693] : (! [X694] : (! [X695] : (! [X696] : (~r1(X695,X696) | ! [X697] : (! [X698] : (! [X699] : (~r1(X698,X699) | ! [X700] : (((p18(X700) | p19(X700)) & (~p18(X700) | ~p19(X700))) | ~r1(X699,X700))) | ~r1(X697,X698)) | ~r1(X696,X697))) | ~r1(X694,X695)) | ~r1(X693,X694)) | ~r1(X692,X693)))))) | ~r1(X687,X688))) | ~r1(X685,X686)))) | ~r1(X682,X683))) | ~r1(X459,X681))) | ~r1(X457,X459)) | ~sP16(X457))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP16])])). 23.28/23.15 fof(f27,plain,( 23.28/23.15 ! [X455] : (! [X457] : ((? [X458] : (r1(X457,X458) & ~p20(X458)) & sP16(X457) & ! [X701] : (! [X702] : (! [X703] : (~r1(X702,X703) | ! [X704] : (! [X705] : (! [X706] : (! [X707] : (! [X708] : (~r1(X707,X708) | ! [X709] : (! [X710] : (! [X711] : (! [X712] : (~r1(X711,X712) | ! [X713] : (~r1(X712,X713) | ! [X714] : (! [X715] : (~r1(X714,X715) | ! [X716] : (~r1(X715,X716) | ! [X717] : (~r1(X716,X717) | ! [X718] : (~r1(X717,X718) | ! [X719] : (~r1(X718,X719) | ! [X720] : (! [X721] : (((~p19(X721) | ~p20(X721)) & (p19(X721) | p20(X721))) | ~r1(X720,X721)) | ~r1(X719,X720))))))) | ~r1(X713,X714)))) | ~r1(X710,X711)) | ~r1(X709,X710)) | ~r1(X708,X709))) | ~r1(X706,X707)) | ~r1(X705,X706)) | ~r1(X704,X705)) | ~r1(X703,X704))) | ~r1(X701,X702)) | ~r1(X457,X701))) | ~r1(X455,X457)) | ~sP17(X455))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP17])])). 23.28/23.15 fof(f28,plain,( 23.28/23.15 ! [X431] : (! [X455] : ((? [X456] : (r1(X455,X456) & ~p21(X456)) & sP17(X455) & ! [X722] : (~r1(X455,X722) | ! [X723] : (~r1(X722,X723) | ! [X724] : (! [X725] : (~r1(X724,X725) | ! [X726] : (! [X727] : (~r1(X726,X727) | ! [X728] : (! [X729] : (! [X730] : (~r1(X729,X730) | ! [X731] : (! [X732] : (~r1(X731,X732) | ! [X733] : (! [X734] : (! [X735] : (~r1(X734,X735) | ! [X736] : (~r1(X735,X736) | ! [X737] : (! [X738] : (! [X739] : (~r1(X738,X739) | ! [X740] : (! [X741] : (~r1(X740,X741) | ! [X742] : (! [X743] : (((~p21(X743) | ~p20(X743)) & (p20(X743) | p21(X743))) | ~r1(X742,X743)) | ~r1(X741,X742))) | ~r1(X739,X740))) | ~r1(X737,X738)) | ~r1(X736,X737)))) | ~r1(X733,X734)) | ~r1(X732,X733))) | ~r1(X730,X731))) | ~r1(X728,X729)) | ~r1(X727,X728))) | ~r1(X725,X726))) | ~r1(X723,X724))))) | ~r1(X431,X455)) | ~sP18(X431))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP18])])). 23.28/23.15 fof(f29,plain,( 23.28/23.15 ! [X429] : (! [X431] : (~r1(X429,X431) | (! [X432] : (! [X433] : (~r1(X432,X433) | ! [X434] : (~r1(X433,X434) | ! [X435] : (! [X436] : (~r1(X435,X436) | ! [X437] : (~r1(X436,X437) | ! [X438] : (~r1(X437,X438) | ! [X439] : (! [X440] : (~r1(X439,X440) | ! [X441] : (! [X442] : (! [X443] : (! [X444] : (! [X445] : (~r1(X444,X445) | ! [X446] : (~r1(X445,X446) | ! [X447] : (! [X448] : (~r1(X447,X448) | ! [X449] : (! [X450] : (~r1(X449,X450) | ! [X451] : (~r1(X450,X451) | ! [X452] : (! [X453] : (~r1(X452,X453) | ! [X454] : (~r1(X453,X454) | ((~p21(X454) | ~p22(X454)) & (p21(X454) | p22(X454))))) | ~r1(X451,X452)))) | ~r1(X448,X449))) | ~r1(X446,X447)))) | ~r1(X443,X444)) | ~r1(X442,X443)) | ~r1(X441,X442)) | ~r1(X440,X441))) | ~r1(X438,X439))))) | ~r1(X434,X435)))) | ~r1(X431,X432)) & sP18(X431) & ? [X744] : (~p22(X744) & r1(X431,X744)))) | ~sP19(X429))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP19])])). 23.28/23.15 fof(f30,plain,( 23.28/23.15 ! [X427] : (! [X429] : (~r1(X427,X429) | (? [X430] : (~p23(X430) & r1(X429,X430)) & sP19(X429) & ! [X745] : (! [X746] : (! [X747] : (! [X748] : (! [X749] : (! [X750] : (! [X751] : (! [X752] : (~r1(X751,X752) | ! [X753] : (! [X754] : (! [X755] : (! [X756] : (! [X757] : (~r1(X756,X757) | ! [X758] : (! [X759] : (! [X760] : (! [X761] : (! [X762] : (! [X763] : (~r1(X762,X763) | ! [X764] : (~r1(X763,X764) | ! [X765] : (~r1(X764,X765) | ! [X766] : (~r1(X765,X766) | ! [X767] : (! [X768] : (((~p22(X768) | ~p23(X768)) & (p22(X768) | p23(X768))) | ~r1(X767,X768)) | ~r1(X766,X767)))))) | ~r1(X761,X762)) | ~r1(X760,X761)) | ~r1(X759,X760)) | ~r1(X758,X759)) | ~r1(X757,X758))) | ~r1(X755,X756)) | ~r1(X754,X755)) | ~r1(X753,X754)) | ~r1(X752,X753))) | ~r1(X750,X751)) | ~r1(X749,X750)) | ~r1(X748,X749)) | ~r1(X747,X748)) | ~r1(X746,X747)) | ~r1(X745,X746)) | ~r1(X429,X745)))) | ~sP20(X427))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP20])])). 23.28/23.15 fof(f31,plain,( 23.28/23.15 ! [X426] : (! [X427] : ((? [X428] : (r1(X427,X428) & ~p24(X428)) & sP20(X427) & ! [X769] : (! [X770] : (~r1(X769,X770) | ! [X771] : (! [X772] : (! [X773] : (! [X774] : (! [X775] : (! [X776] : (~r1(X775,X776) | ! [X777] : (~r1(X776,X777) | ! [X778] : (! [X779] : (! [X780] : (! [X781] : (! [X782] : (! [X783] : (! [X784] : (~r1(X783,X784) | ! [X785] : (! [X786] : (! [X787] : (~r1(X786,X787) | ! [X788] : (! [X789] : (~r1(X788,X789) | ! [X790] : (! [X791] : (~r1(X790,X791) | ! [X792] : (~r1(X791,X792) | ! [X793] : (~r1(X792,X793) | ((p23(X793) | p24(X793)) & (~p24(X793) | ~p23(X793)))))) | ~r1(X789,X790))) | ~r1(X787,X788))) | ~r1(X785,X786)) | ~r1(X784,X785))) | ~r1(X782,X783)) | ~r1(X781,X782)) | ~r1(X780,X781)) | ~r1(X779,X780)) | ~r1(X778,X779)) | ~r1(X777,X778)))) | ~r1(X774,X775)) | ~r1(X773,X774)) | ~r1(X772,X773)) | ~r1(X771,X772)) | ~r1(X770,X771))) | ~r1(X427,X769))) | ~r1(X426,X427)) | ~sP21(X426))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP21])])). 23.28/23.15 fof(f32,plain,( 23.28/23.15 ! [X398] : (! [X426] : ((sP21(X426) & ? [X794] : (~p25(X794) & r1(X426,X794)) & ! [X795] : (! [X796] : (~r1(X795,X796) | ! [X797] : (! [X798] : (~r1(X797,X798) | ! [X799] : (~r1(X798,X799) | ! [X800] : (~r1(X799,X800) | ! [X801] : (! [X802] : (~r1(X801,X802) | ! [X803] : (! [X804] : (~r1(X803,X804) | ! [X805] : (~r1(X804,X805) | ! [X806] : (~r1(X805,X806) | ! [X807] : (! [X808] : (! [X809] : (~r1(X808,X809) | ! [X810] : (! [X811] : (! [X812] : (! [X813] : (~r1(X812,X813) | ! [X814] : (~r1(X813,X814) | ! [X815] : (~r1(X814,X815) | ! [X816] : (~r1(X815,X816) | ! [X817] : (! [X818] : (~r1(X817,X818) | ! [X819] : (! [X820] : (((~p25(X820) | ~p24(X820)) & (p25(X820) | p24(X820))) | ~r1(X819,X820)) | ~r1(X818,X819))) | ~r1(X816,X817)))))) | ~r1(X811,X812)) | ~r1(X810,X811)) | ~r1(X809,X810))) | ~r1(X807,X808)) | ~r1(X806,X807))))) | ~r1(X802,X803))) | ~r1(X800,X801))))) | ~r1(X796,X797))) | ~r1(X426,X795))) | ~r1(X398,X426)) | ~sP22(X398))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP22])])). 23.28/23.15 fof(f33,plain,( 23.28/23.15 ! [X396] : (! [X398] : (~r1(X396,X398) | (! [X399] : (! [X400] : (~r1(X399,X400) | ! [X401] : (! [X402] : (! [X403] : (! [X404] : (! [X405] : (~r1(X404,X405) | ! [X406] : (~r1(X405,X406) | ! [X407] : (~r1(X406,X407) | ! [X408] : (~r1(X407,X408) | ! [X409] : (~r1(X408,X409) | ! [X410] : (~r1(X409,X410) | ! [X411] : (! [X412] : (~r1(X411,X412) | ! [X413] : (! [X414] : (~r1(X413,X414) | ! [X415] : (~r1(X414,X415) | ! [X416] : (~r1(X415,X416) | ! [X417] : (~r1(X416,X417) | ! [X418] : (! [X419] : (~r1(X418,X419) | ! [X420] : (! [X421] : (~r1(X420,X421) | ! [X422] : (! [X423] : (~r1(X422,X423) | ! [X424] : (~r1(X423,X424) | ! [X425] : (~r1(X424,X425) | ((~p25(X425) | ~p26(X425)) & (p25(X425) | p26(X425)))))) | ~r1(X421,X422))) | ~r1(X419,X420))) | ~r1(X417,X418)))))) | ~r1(X412,X413))) | ~r1(X410,X411)))))))) | ~r1(X403,X404)) | ~r1(X402,X403)) | ~r1(X401,X402)) | ~r1(X400,X401))) | ~r1(X398,X399)) & sP22(X398) & ? [X821] : (r1(X398,X821) & ~p26(X821)))) | ~sP23(X396))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP23])])). 23.28/23.15 fof(f34,plain,( 23.28/23.15 ! [X395] : (! [X396] : ((? [X397] : (r1(X396,X397) & ~p27(X397)) & sP23(X396) & ! [X822] : (! [X823] : (~r1(X822,X823) | ! [X824] : (~r1(X823,X824) | ! [X825] : (~r1(X824,X825) | ! [X826] : (~r1(X825,X826) | ! [X827] : (~r1(X826,X827) | ! [X828] : (! [X829] : (! [X830] : (! [X831] : (~r1(X830,X831) | ! [X832] : (~r1(X831,X832) | ! [X833] : (~r1(X832,X833) | ! [X834] : (! [X835] : (! [X836] : (~r1(X835,X836) | ! [X837] : (! [X838] : (! [X839] : (! [X840] : (~r1(X839,X840) | ! [X841] : (~r1(X840,X841) | ! [X842] : (~r1(X841,X842) | ! [X843] : (~r1(X842,X843) | ! [X844] : (! [X845] : (! [X846] : (! [X847] : (! [X848] : (! [X849] : (~r1(X848,X849) | ((~p26(X849) | ~p27(X849)) & (p27(X849) | p26(X849)))) | ~r1(X847,X848)) | ~r1(X846,X847)) | ~r1(X845,X846)) | ~r1(X844,X845)) | ~r1(X843,X844)))))) | ~r1(X838,X839)) | ~r1(X837,X838)) | ~r1(X836,X837))) | ~r1(X834,X835)) | ~r1(X833,X834))))) | ~r1(X829,X830)) | ~r1(X828,X829)) | ~r1(X827,X828))))))) | ~r1(X396,X822))) | ~r1(X395,X396)) | ~sP24(X395))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP24])])). 23.28/23.15 fof(f35,plain,( 23.28/23.15 ! [X364] : (! [X395] : ((sP24(X395) & ? [X850] : (~p28(X850) & r1(X395,X850)) & ! [X851] : (! [X852] : (! [X853] : (~r1(X852,X853) | ! [X854] : (! [X855] : (~r1(X854,X855) | ! [X856] : (~r1(X855,X856) | ! [X857] : (~r1(X856,X857) | ! [X858] : (! [X859] : (! [X860] : (~r1(X859,X860) | ! [X861] : (! [X862] : (! [X863] : (! [X864] : (~r1(X863,X864) | ! [X865] : (~r1(X864,X865) | ! [X866] : (~r1(X865,X866) | ! [X867] : (~r1(X866,X867) | ! [X868] : (! [X869] : (~r1(X868,X869) | ! [X870] : (! [X871] : (! [X872] : (~r1(X871,X872) | ! [X873] : (! [X874] : (~r1(X873,X874) | ! [X875] : (! [X876] : (! [X877] : (~r1(X876,X877) | ! [X878] : (! [X879] : (((p27(X879) | p28(X879)) & (~p28(X879) | ~p27(X879))) | ~r1(X878,X879)) | ~r1(X877,X878))) | ~r1(X875,X876)) | ~r1(X874,X875))) | ~r1(X872,X873))) | ~r1(X870,X871)) | ~r1(X869,X870))) | ~r1(X867,X868)))))) | ~r1(X862,X863)) | ~r1(X861,X862)) | ~r1(X860,X861))) | ~r1(X858,X859)) | ~r1(X857,X858))))) | ~r1(X853,X854))) | ~r1(X851,X852)) | ~r1(X395,X851))) | ~r1(X364,X395)) | ~sP25(X364))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP25])])). 23.28/23.15 fof(f36,plain,( 23.28/23.15 ! [X362] : (! [X364] : ((! [X365] : (! [X366] : (~r1(X365,X366) | ! [X367] : (! [X368] : (! [X369] : (! [X370] : (! [X371] : (! [X372] : (~r1(X371,X372) | ! [X373] : (~r1(X372,X373) | ! [X374] : (! [X375] : (~r1(X374,X375) | ! [X376] : (! [X377] : (~r1(X376,X377) | ! [X378] : (~r1(X377,X378) | ! [X379] : (! [X380] : (~r1(X379,X380) | ! [X381] : (! [X382] : (! [X383] : (~r1(X382,X383) | ! [X384] : (~r1(X383,X384) | ! [X385] : (~r1(X384,X385) | ! [X386] : (! [X387] : (! [X388] : (! [X389] : (~r1(X388,X389) | ! [X390] : (~r1(X389,X390) | ! [X391] : (! [X392] : (! [X393] : (! [X394] : (((p28(X394) | p29(X394)) & (~p28(X394) | ~p29(X394))) | ~r1(X393,X394)) | ~r1(X392,X393)) | ~r1(X391,X392)) | ~r1(X390,X391)))) | ~r1(X387,X388)) | ~r1(X386,X387)) | ~r1(X385,X386))))) | ~r1(X381,X382)) | ~r1(X380,X381))) | ~r1(X378,X379)))) | ~r1(X375,X376))) | ~r1(X373,X374)))) | ~r1(X370,X371)) | ~r1(X369,X370)) | ~r1(X368,X369)) | ~r1(X367,X368)) | ~r1(X366,X367))) | ~r1(X364,X365)) & sP25(X364) & ? [X880] : (r1(X364,X880) & ~p29(X880))) | ~r1(X362,X364)) | ~sP26(X362))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP26])])). 23.28/23.15 fof(f37,plain,( 23.28/23.15 ! [X328] : (! [X362] : ((? [X363] : (~p30(X363) & r1(X362,X363)) & sP26(X362) & ! [X881] : (! [X882] : (~r1(X881,X882) | ! [X883] : (! [X884] : (! [X885] : (! [X886] : (~r1(X885,X886) | ! [X887] : (~r1(X886,X887) | ! [X888] : (~r1(X887,X888) | ! [X889] : (~r1(X888,X889) | ! [X890] : (! [X891] : (~r1(X890,X891) | ! [X892] : (! [X893] : (! [X894] : (! [X895] : (~r1(X894,X895) | ! [X896] : (! [X897] : (~r1(X896,X897) | ! [X898] : (~r1(X897,X898) | ! [X899] : (~r1(X898,X899) | ! [X900] : (~r1(X899,X900) | ! [X901] : (! [X902] : (~r1(X901,X902) | ! [X903] : (! [X904] : (! [X905] : (~r1(X904,X905) | ! [X906] : (! [X907] : (! [X908] : (! [X909] : (! [X910] : (! [X911] : (((~p30(X911) | ~p29(X911)) & (p29(X911) | p30(X911))) | ~r1(X910,X911)) | ~r1(X909,X910)) | ~r1(X908,X909)) | ~r1(X907,X908)) | ~r1(X906,X907)) | ~r1(X905,X906))) | ~r1(X903,X904)) | ~r1(X902,X903))) | ~r1(X900,X901)))))) | ~r1(X895,X896))) | ~r1(X893,X894)) | ~r1(X892,X893)) | ~r1(X891,X892))) | ~r1(X889,X890)))))) | ~r1(X884,X885)) | ~r1(X883,X884)) | ~r1(X882,X883))) | ~r1(X362,X881))) | ~r1(X328,X362)) | ~sP27(X328))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP27])])). 23.28/23.15 fof(f38,plain,( 23.28/23.15 ! [X293] : (! [X328] : ((! [X329] : (! [X330] : (! [X331] : (~r1(X330,X331) | ! [X332] : (! [X333] : (~r1(X332,X333) | ! [X334] : (~r1(X333,X334) | ! [X335] : (~r1(X334,X335) | ! [X336] : (~r1(X335,X336) | ! [X337] : (! [X338] : (~r1(X337,X338) | ! [X339] : (! [X340] : (~r1(X339,X340) | ! [X341] : (! [X342] : (~r1(X341,X342) | ! [X343] : (~r1(X342,X343) | ! [X344] : (! [X345] : (~r1(X344,X345) | ! [X346] : (! [X347] : (! [X348] : (! [X349] : (! [X350] : (! [X351] : (! [X352] : (! [X353] : (! [X354] : (~r1(X353,X354) | ! [X355] : (~r1(X354,X355) | ! [X356] : (~r1(X355,X356) | ! [X357] : (! [X358] : (~r1(X357,X358) | ! [X359] : (! [X360] : (((~p31(X360) | ~p30(X360)) & (p30(X360) | p31(X360))) | ~r1(X359,X360)) | ~r1(X358,X359))) | ~r1(X356,X357))))) | ~r1(X352,X353)) | ~r1(X351,X352)) | ~r1(X350,X351)) | ~r1(X349,X350)) | ~r1(X348,X349)) | ~r1(X347,X348)) | ~r1(X346,X347)) | ~r1(X345,X346))) | ~r1(X343,X344)))) | ~r1(X340,X341))) | ~r1(X338,X339))) | ~r1(X336,X337)))))) | ~r1(X331,X332))) | ~r1(X329,X330)) | ~r1(X328,X329)) & ? [X361] : (r1(X328,X361) & ~p31(X361)) & sP27(X328)) | ~r1(X293,X328)) | ~sP28(X293))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP28])])). 23.28/23.15 fof(f39,plain,( 23.28/23.15 ! [X292] : (! [X293] : (~r1(X292,X293) | (! [X294] : (~r1(X293,X294) | ! [X295] : (! [X296] : (~r1(X295,X296) | ! [X297] : (! [X298] : (! [X299] : (~r1(X298,X299) | ! [X300] : (! [X301] : (! [X302] : (~r1(X301,X302) | ! [X303] : (~r1(X302,X303) | ! [X304] : (! [X305] : (~r1(X304,X305) | ! [X306] : (! [X307] : (~r1(X306,X307) | ! [X308] : (! [X309] : (! [X310] : (! [X311] : (! [X312] : (~r1(X311,X312) | ! [X313] : (~r1(X312,X313) | ! [X314] : (~r1(X313,X314) | ! [X315] : (! [X316] : (~r1(X315,X316) | ! [X317] : (! [X318] : (! [X319] : (! [X320] : (~r1(X319,X320) | ! [X321] : (! [X322] : (! [X323] : (~r1(X322,X323) | ! [X324] : (~r1(X323,X324) | ! [X325] : (~r1(X324,X325) | ! [X326] : (~r1(X325,X326) | ((~p31(X326) | ~p32(X326)) & (p32(X326) | p31(X326))))))) | ~r1(X321,X322)) | ~r1(X320,X321))) | ~r1(X318,X319)) | ~r1(X317,X318)) | ~r1(X316,X317))) | ~r1(X314,X315))))) | ~r1(X310,X311)) | ~r1(X309,X310)) | ~r1(X308,X309)) | ~r1(X307,X308))) | ~r1(X305,X306))) | ~r1(X303,X304)))) | ~r1(X300,X301)) | ~r1(X299,X300))) | ~r1(X297,X298)) | ~r1(X296,X297))) | ~r1(X294,X295))) & ? [X327] : (~p32(X327) & r1(X293,X327)) & sP28(X293))) | ~sP29(X292))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP29])])). 23.28/23.15 fof(f40,plain,( 23.28/23.15 ! [X256] : (! [X292] : ((sP29(X292) & ? [X912] : (r1(X292,X912) & ~p33(X912)) & ! [X913] : (~r1(X292,X913) | ! [X914] : (~r1(X913,X914) | ! [X915] : (! [X916] : (~r1(X915,X916) | ! [X917] : (~r1(X916,X917) | ! [X918] : (~r1(X917,X918) | ! [X919] : (! [X920] : (~r1(X919,X920) | ! [X921] : (~r1(X920,X921) | ! [X922] : (! [X923] : (~r1(X922,X923) | ! [X924] : (~r1(X923,X924) | ! [X925] : (~r1(X924,X925) | ! [X926] : (! [X927] : (~r1(X926,X927) | ! [X928] : (~r1(X927,X928) | ! [X929] : (! [X930] : (! [X931] : (! [X932] : (! [X933] : (! [X934] : (! [X935] : (~r1(X934,X935) | ! [X936] : (~r1(X935,X936) | ! [X937] : (~r1(X936,X937) | ! [X938] : (! [X939] : (~r1(X938,X939) | ! [X940] : (! [X941] : (~r1(X940,X941) | ! [X942] : (~r1(X941,X942) | ! [X943] : (~r1(X942,X943) | ! [X944] : (! [X945] : (! [X946] : (((p33(X946) | p32(X946)) & (~p32(X946) | ~p33(X946))) | ~r1(X945,X946)) | ~r1(X944,X945)) | ~r1(X943,X944))))) | ~r1(X939,X940))) | ~r1(X937,X938))))) | ~r1(X933,X934)) | ~r1(X932,X933)) | ~r1(X931,X932)) | ~r1(X930,X931)) | ~r1(X929,X930)) | ~r1(X928,X929)))) | ~r1(X925,X926))))) | ~r1(X921,X922)))) | ~r1(X918,X919))))) | ~r1(X914,X915))))) | ~r1(X256,X292)) | ~sP30(X256))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP30])])). 23.28/23.15 fof(f41,plain,( 23.28/23.15 ! [X255] : (! [X256] : ((! [X257] : (~r1(X256,X257) | ! [X258] : (! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (! [X263] : (~r1(X262,X263) | ! [X264] : (! [X265] : (~r1(X264,X265) | ! [X266] : (! [X267] : (! [X268] : (! [X269] : (~r1(X268,X269) | ! [X270] : (~r1(X269,X270) | ! [X271] : (~r1(X270,X271) | ! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (! [X280] : (~r1(X279,X280) | ! [X281] : (~r1(X280,X281) | ! [X282] : (! [X283] : (! [X284] : (~r1(X283,X284) | ! [X285] : (! [X286] : (! [X287] : (! [X288] : (! [X289] : (~r1(X288,X289) | ! [X290] : (~r1(X289,X290) | ! [X291] : (((~p34(X291) | ~p33(X291)) & (p33(X291) | p34(X291))) | ~r1(X290,X291)))) | ~r1(X287,X288)) | ~r1(X286,X287)) | ~r1(X285,X286)) | ~r1(X284,X285))) | ~r1(X282,X283)) | ~r1(X281,X282)))) | ~r1(X278,X279)))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272))))) | ~r1(X267,X268)) | ~r1(X266,X267)) | ~r1(X265,X266))) | ~r1(X263,X264))) | ~r1(X261,X262)) | ~r1(X260,X261)))) | ~r1(X257,X258))) & sP30(X256) & ? [X947] : (r1(X256,X947) & ~p34(X947))) | ~r1(X255,X256)) | ~sP31(X255))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP31])])). 23.28/23.15 fof(f42,plain,( 23.28/23.15 ! [X254] : (! [X255] : ((sP31(X255) & ? [X948] : (~p35(X948) & r1(X255,X948)) & ! [X949] : (~r1(X255,X949) | ! [X950] : (! [X951] : (~r1(X950,X951) | ! [X952] : (~r1(X951,X952) | ! [X953] : (~r1(X952,X953) | ! [X954] : (! [X955] : (! [X956] : (~r1(X955,X956) | ! [X957] : (! [X958] : (! [X959] : (~r1(X958,X959) | ! [X960] : (~r1(X959,X960) | ! [X961] : (! [X962] : (! [X963] : (! [X964] : (! [X965] : (~r1(X964,X965) | ! [X966] : (! [X967] : (! [X968] : (~r1(X967,X968) | ! [X969] : (! [X970] : (! [X971] : (~r1(X970,X971) | ! [X972] : (! [X973] : (~r1(X972,X973) | ! [X974] : (! [X975] : (! [X976] : (~r1(X975,X976) | ! [X977] : (! [X978] : (~r1(X977,X978) | ! [X979] : (~r1(X978,X979) | ! [X980] : (! [X981] : (~r1(X980,X981) | ! [X982] : (! [X983] : (~r1(X982,X983) | ! [X984] : (~r1(X983,X984) | ((~p34(X984) | ~p35(X984)) & (p35(X984) | p34(X984))))) | ~r1(X981,X982))) | ~r1(X979,X980)))) | ~r1(X976,X977))) | ~r1(X974,X975)) | ~r1(X973,X974))) | ~r1(X971,X972))) | ~r1(X969,X970)) | ~r1(X968,X969))) | ~r1(X966,X967)) | ~r1(X965,X966))) | ~r1(X963,X964)) | ~r1(X962,X963)) | ~r1(X961,X962)) | ~r1(X960,X961)))) | ~r1(X957,X958)) | ~r1(X956,X957))) | ~r1(X954,X955)) | ~r1(X953,X954))))) | ~r1(X949,X950)))) | ~r1(X254,X255)) | ~sP32(X254))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP32])])). 23.28/23.15 fof(f43,plain,( 23.28/23.15 ! [X214] : (! [X254] : (~r1(X214,X254) | (sP32(X254) & ? [X985] : (r1(X254,X985) & ~p36(X985)) & ! [X986] : (! [X987] : (~r1(X986,X987) | ! [X988] : (~r1(X987,X988) | ! [X989] : (~r1(X988,X989) | ! [X990] : (~r1(X989,X990) | ! [X991] : (! [X992] : (! [X993] : (! [X994] : (~r1(X993,X994) | ! [X995] : (! [X996] : (~r1(X995,X996) | ! [X997] : (! [X998] : (~r1(X997,X998) | ! [X999] : (~r1(X998,X999) | ! [X1000] : (~r1(X999,X1000) | ! [X1001] : (! [X1002] : (! [X1003] : (~r1(X1002,X1003) | ! [X1004] : (! [X1005] : (! [X1006] : (~r1(X1005,X1006) | ! [X1007] : (~r1(X1006,X1007) | ! [X1008] : (~r1(X1007,X1008) | ! [X1009] : (! [X1010] : (! [X1011] : (~r1(X1010,X1011) | ! [X1012] : (~r1(X1011,X1012) | ! [X1013] : (~r1(X1012,X1013) | ! [X1014] : (! [X1015] : (~r1(X1014,X1015) | ! [X1016] : (~r1(X1015,X1016) | ! [X1017] : (! [X1018] : (! [X1019] : (~r1(X1018,X1019) | ! [X1020] : (~r1(X1019,X1020) | ! [X1021] : (! [X1022] : (((~p36(X1022) | ~p35(X1022)) & (p35(X1022) | p36(X1022))) | ~r1(X1021,X1022)) | ~r1(X1020,X1021)))) | ~r1(X1017,X1018)) | ~r1(X1016,X1017)))) | ~r1(X1013,X1014))))) | ~r1(X1009,X1010)) | ~r1(X1008,X1009))))) | ~r1(X1004,X1005)) | ~r1(X1003,X1004))) | ~r1(X1001,X1002)) | ~r1(X1000,X1001))))) | ~r1(X996,X997))) | ~r1(X994,X995))) | ~r1(X992,X993)) | ~r1(X991,X992)) | ~r1(X990,X991)))))) | ~r1(X254,X986)))) | ~sP33(X214))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP33])])). 23.28/23.15 fof(f44,plain,( 23.28/23.15 ! [X213] : (! [X214] : (~r1(X213,X214) | (! [X215] : (! [X216] : (~r1(X215,X216) | ! [X217] : (~r1(X216,X217) | ! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (! [X221] : (! [X222] : (! [X223] : (~r1(X222,X223) | ! [X224] : (~r1(X223,X224) | ! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (~r1(X233,X234) | ! [X235] : (! [X236] : (~r1(X235,X236) | ! [X237] : (~r1(X236,X237) | ! [X238] : (~r1(X237,X238) | ! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~r1(X242,X243) | ! [X244] : (! [X245] : (! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (~r1(X251,X252) | ((~p36(X252) | ~p37(X252)) & (p36(X252) | p37(X252))))) | ~r1(X249,X250))))) | ~r1(X245,X246)) | ~r1(X244,X245)) | ~r1(X243,X244)))))))))) | ~r1(X234,X235))))) | ~r1(X230,X231)))) | ~r1(X227,X228)) | ~r1(X226,X227)) | ~r1(X225,X226))))) | ~r1(X221,X222)) | ~r1(X220,X221)) | ~r1(X219,X220)) | ~r1(X218,X219))))) | ~r1(X214,X215)) & ? [X253] : (r1(X214,X253) & ~p37(X253)) & sP33(X214))) | ~sP34(X213))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP34])])). 23.28/23.15 fof(f45,plain,( 23.28/23.15 ! [X212] : (! [X213] : (~r1(X212,X213) | (sP34(X213) & ? [X1023] : (r1(X213,X1023) & ~p38(X1023)) & ! [X1024] : (~r1(X213,X1024) | ! [X1025] : (~r1(X1024,X1025) | ! [X1026] : (! [X1027] : (! [X1028] : (~r1(X1027,X1028) | ! [X1029] : (~r1(X1028,X1029) | ! [X1030] : (~r1(X1029,X1030) | ! [X1031] : (! [X1032] : (~r1(X1031,X1032) | ! [X1033] : (~r1(X1032,X1033) | ! [X1034] : (~r1(X1033,X1034) | ! [X1035] : (! [X1036] : (~r1(X1035,X1036) | ! [X1037] : (! [X1038] : (! [X1039] : (~r1(X1038,X1039) | ! [X1040] : (~r1(X1039,X1040) | ! [X1041] : (! [X1042] : (~r1(X1041,X1042) | ! [X1043] : (~r1(X1042,X1043) | ! [X1044] : (~r1(X1043,X1044) | ! [X1045] : (~r1(X1044,X1045) | ! [X1046] : (! [X1047] : (! [X1048] : (~r1(X1047,X1048) | ! [X1049] : (! [X1050] : (! [X1051] : (~r1(X1050,X1051) | ! [X1052] : (~r1(X1051,X1052) | ! [X1053] : (! [X1054] : (~r1(X1053,X1054) | ! [X1055] : (~r1(X1054,X1055) | ! [X1056] : (~r1(X1055,X1056) | ! [X1057] : (! [X1058] : (! [X1059] : (~r1(X1058,X1059) | ! [X1060] : (! [X1061] : (! [X1062] : (~r1(X1061,X1062) | ((p37(X1062) | p38(X1062)) & (~p38(X1062) | ~p37(X1062)))) | ~r1(X1060,X1061)) | ~r1(X1059,X1060))) | ~r1(X1057,X1058)) | ~r1(X1056,X1057))))) | ~r1(X1052,X1053)))) | ~r1(X1049,X1050)) | ~r1(X1048,X1049))) | ~r1(X1046,X1047)) | ~r1(X1045,X1046)))))) | ~r1(X1040,X1041)))) | ~r1(X1037,X1038)) | ~r1(X1036,X1037))) | ~r1(X1034,X1035))))) | ~r1(X1030,X1031))))) | ~r1(X1026,X1027)) | ~r1(X1025,X1026)))))) | ~sP35(X212))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP35])])). 23.28/23.15 fof(f46,plain,( 23.28/23.15 ! [X170] : (! [X212] : (~r1(X170,X212) | (sP35(X212) & ? [X1063] : (r1(X212,X1063) & ~p39(X1063)) & ! [X1064] : (! [X1065] : (~r1(X1064,X1065) | ! [X1066] : (! [X1067] : (! [X1068] : (! [X1069] : (~r1(X1068,X1069) | ! [X1070] : (! [X1071] : (~r1(X1070,X1071) | ! [X1072] : (! [X1073] : (~r1(X1072,X1073) | ! [X1074] : (~r1(X1073,X1074) | ! [X1075] : (! [X1076] : (! [X1077] : (~r1(X1076,X1077) | ! [X1078] : (! [X1079] : (! [X1080] : (! [X1081] : (! [X1082] : (! [X1083] : (! [X1084] : (! [X1085] : (! [X1086] : (! [X1087] : (! [X1088] : (! [X1089] : (~r1(X1088,X1089) | ! [X1090] : (! [X1091] : (! [X1092] : (~r1(X1091,X1092) | ! [X1093] : (~r1(X1092,X1093) | ! [X1094] : (~r1(X1093,X1094) | ! [X1095] : (~r1(X1094,X1095) | ! [X1096] : (~r1(X1095,X1096) | ! [X1097] : (! [X1098] : (! [X1099] : (~r1(X1098,X1099) | ! [X1100] : (~r1(X1099,X1100) | ! [X1101] : (! [X1102] : (~r1(X1101,X1102) | ! [X1103] : (((p39(X1103) | p38(X1103)) & (~p38(X1103) | ~p39(X1103))) | ~r1(X1102,X1103))) | ~r1(X1100,X1101)))) | ~r1(X1097,X1098)) | ~r1(X1096,X1097))))))) | ~r1(X1090,X1091)) | ~r1(X1089,X1090))) | ~r1(X1087,X1088)) | ~r1(X1086,X1087)) | ~r1(X1085,X1086)) | ~r1(X1084,X1085)) | ~r1(X1083,X1084)) | ~r1(X1082,X1083)) | ~r1(X1081,X1082)) | ~r1(X1080,X1081)) | ~r1(X1079,X1080)) | ~r1(X1078,X1079)) | ~r1(X1077,X1078))) | ~r1(X1075,X1076)) | ~r1(X1074,X1075)))) | ~r1(X1071,X1072))) | ~r1(X1069,X1070))) | ~r1(X1067,X1068)) | ~r1(X1066,X1067)) | ~r1(X1065,X1066))) | ~r1(X212,X1064)))) | ~sP36(X170))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP36])])). 23.28/23.15 fof(f47,plain,( 23.28/23.15 ! [X168] : (! [X170] : (~r1(X168,X170) | (! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (! [X174] : (! [X175] : (! [X176] : (! [X177] : (! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (! [X186] : (! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (~r1(X190,X191) | ! [X192] : (! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (~r1(X195,X196) | ! [X197] : (~r1(X196,X197) | ! [X198] : (! [X199] : (! [X200] : (~r1(X199,X200) | ! [X201] : (~r1(X200,X201) | ! [X202] : (! [X203] : (~r1(X202,X203) | ! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (~r1(X205,X206) | ! [X207] : (! [X208] : (~r1(X207,X208) | ! [X209] : (! [X210] : (~r1(X209,X210) | ! [X211] : (~r1(X210,X211) | ((p39(X211) | p40(X211)) & (~p39(X211) | ~p40(X211))))) | ~r1(X208,X209))) | ~r1(X206,X207)))) | ~r1(X203,X204))) | ~r1(X201,X202)))) | ~r1(X198,X199)) | ~r1(X197,X198))))))) | ~r1(X191,X192))) | ~r1(X189,X190)))) | ~r1(X186,X187)) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184))) | ~r1(X181,X182)) | ~r1(X180,X181))) | ~r1(X178,X179)) | ~r1(X177,X178)) | ~r1(X176,X177)) | ~r1(X175,X176)) | ~r1(X174,X175)) | ~r1(X173,X174)) | ~r1(X172,X173))) | ~r1(X170,X171)) & sP36(X170) & ? [X1104] : (r1(X170,X1104) & ~p40(X1104)))) | ~sP37(X168))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP37])])). 23.28/23.15 fof(f48,plain,( 23.28/23.15 ! [X123] : (! [X168] : (~r1(X123,X168) | (? [X169] : (~p41(X169) & r1(X168,X169)) & sP37(X168) & ! [X1105] : (~r1(X168,X1105) | ! [X1106] : (~r1(X1105,X1106) | ! [X1107] : (~r1(X1106,X1107) | ! [X1108] : (~r1(X1107,X1108) | ! [X1109] : (~r1(X1108,X1109) | ! [X1110] : (~r1(X1109,X1110) | ! [X1111] : (! [X1112] : (~r1(X1111,X1112) | ! [X1113] : (! [X1114] : (~r1(X1113,X1114) | ! [X1115] : (~r1(X1114,X1115) | ! [X1116] : (~r1(X1115,X1116) | ! [X1117] : (! [X1118] : (! [X1119] : (~r1(X1118,X1119) | ! [X1120] : (~r1(X1119,X1120) | ! [X1121] : (~r1(X1120,X1121) | ! [X1122] : (~r1(X1121,X1122) | ! [X1123] : (! [X1124] : (! [X1125] : (! [X1126] : (~r1(X1125,X1126) | ! [X1127] : (! [X1128] : (! [X1129] : (~r1(X1128,X1129) | ! [X1130] : (~r1(X1129,X1130) | ! [X1131] : (! [X1132] : (~r1(X1131,X1132) | ! [X1133] : (! [X1134] : (! [X1135] : (~r1(X1134,X1135) | ! [X1136] : (! [X1137] : (! [X1138] : (! [X1139] : (~r1(X1138,X1139) | ! [X1140] : (! [X1141] : (! [X1142] : (~r1(X1141,X1142) | ! [X1143] : (! [X1144] : (~r1(X1143,X1144) | ! [X1145] : (~r1(X1144,X1145) | ! [X1146] : (((p40(X1146) | p41(X1146)) & (~p41(X1146) | ~p40(X1146))) | ~r1(X1145,X1146)))) | ~r1(X1142,X1143))) | ~r1(X1140,X1141)) | ~r1(X1139,X1140))) | ~r1(X1137,X1138)) | ~r1(X1136,X1137)) | ~r1(X1135,X1136))) | ~r1(X1133,X1134)) | ~r1(X1132,X1133))) | ~r1(X1130,X1131)))) | ~r1(X1127,X1128)) | ~r1(X1126,X1127))) | ~r1(X1124,X1125)) | ~r1(X1123,X1124)) | ~r1(X1122,X1123)))))) | ~r1(X1117,X1118)) | ~r1(X1116,X1117))))) | ~r1(X1112,X1113))) | ~r1(X1110,X1111)))))))))) | ~sP38(X123))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP38])])). 23.28/23.15 fof(f49,plain,( 23.28/23.15 ! [X121] : (! [X123] : ((! [X124] : (~r1(X123,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (! [X130] : (! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (! [X134] : (~r1(X133,X134) | ! [X135] : (~r1(X134,X135) | ! [X136] : (! [X137] : (! [X138] : (! [X139] : (! [X140] : (~r1(X139,X140) | ! [X141] : (! [X142] : (! [X143] : (! [X144] : (! [X145] : (~r1(X144,X145) | ! [X146] : (! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (! [X165] : (! [X166] : (~r1(X165,X166) | ((p42(X166) | p41(X166)) & (~p42(X166) | ~p41(X166)))) | ~r1(X164,X165)) | ~r1(X163,X164)) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160)) | ~r1(X158,X159)))) | ~r1(X155,X156)) | ~r1(X154,X155))))))) | ~r1(X148,X149)) | ~r1(X147,X148))) | ~r1(X145,X146))) | ~r1(X143,X144)) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141))) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137)) | ~r1(X135,X136)))) | ~r1(X132,X133)) | ~r1(X131,X132))) | ~r1(X129,X130)) | ~r1(X128,X129))))))) & ? [X167] : (~p42(X167) & r1(X123,X167)) & sP38(X123)) | ~r1(X121,X123)) | ~sP39(X121))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP39])])). 23.28/23.15 fof(f50,plain,( 23.28/23.15 ! [X119] : (! [X121] : (~r1(X119,X121) | (? [X122] : (~p43(X122) & r1(X121,X122)) & sP39(X121) & ! [X1147] : (~r1(X121,X1147) | ! [X1148] : (! [X1149] : (~r1(X1148,X1149) | ! [X1150] : (! [X1151] : (! [X1152] : (~r1(X1151,X1152) | ! [X1153] : (! [X1154] : (! [X1155] : (~r1(X1154,X1155) | ! [X1156] : (! [X1157] : (! [X1158] : (~r1(X1157,X1158) | ! [X1159] : (~r1(X1158,X1159) | ! [X1160] : (~r1(X1159,X1160) | ! [X1161] : (! [X1162] : (~r1(X1161,X1162) | ! [X1163] : (~r1(X1162,X1163) | ! [X1164] : (~r1(X1163,X1164) | ! [X1165] : (~r1(X1164,X1165) | ! [X1166] : (! [X1167] : (~r1(X1166,X1167) | ! [X1168] : (! [X1169] : (~r1(X1168,X1169) | ! [X1170] : (~r1(X1169,X1170) | ! [X1171] : (! [X1172] : (~r1(X1171,X1172) | ! [X1173] : (! [X1174] : (~r1(X1173,X1174) | ! [X1175] : (! [X1176] : (! [X1177] : (~r1(X1176,X1177) | ! [X1178] : (~r1(X1177,X1178) | ! [X1179] : (~r1(X1178,X1179) | ! [X1180] : (! [X1181] : (! [X1182] : (! [X1183] : (! [X1184] : (~r1(X1183,X1184) | ! [X1185] : (! [X1186] : (~r1(X1185,X1186) | ! [X1187] : (~r1(X1186,X1187) | ! [X1188] : (! [X1189] : (~r1(X1188,X1189) | ! [X1190] : (~r1(X1189,X1190) | ((~p43(X1190) | ~p42(X1190)) & (p43(X1190) | p42(X1190))))) | ~r1(X1187,X1188)))) | ~r1(X1184,X1185))) | ~r1(X1182,X1183)) | ~r1(X1181,X1182)) | ~r1(X1180,X1181)) | ~r1(X1179,X1180))))) | ~r1(X1175,X1176)) | ~r1(X1174,X1175))) | ~r1(X1172,X1173))) | ~r1(X1170,X1171)))) | ~r1(X1167,X1168))) | ~r1(X1165,X1166)))))) | ~r1(X1160,X1161))))) | ~r1(X1156,X1157)) | ~r1(X1155,X1156))) | ~r1(X1153,X1154)) | ~r1(X1152,X1153))) | ~r1(X1150,X1151)) | ~r1(X1149,X1150))) | ~r1(X1147,X1148))))) | ~sP40(X119))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP40])])). 23.28/23.15 fof(f51,plain,( 23.28/23.15 ! [X117] : (! [X119] : ((? [X120] : (r1(X119,X120) & ~p44(X120)) & sP40(X119) & ! [X1191] : (~r1(X119,X1191) | ! [X1192] : (~r1(X1191,X1192) | ! [X1193] : (~r1(X1192,X1193) | ! [X1194] : (! [X1195] : (~r1(X1194,X1195) | ! [X1196] : (! [X1197] : (~r1(X1196,X1197) | ! [X1198] : (~r1(X1197,X1198) | ! [X1199] : (! [X1200] : (! [X1201] : (~r1(X1200,X1201) | ! [X1202] : (~r1(X1201,X1202) | ! [X1203] : (~r1(X1202,X1203) | ! [X1204] : (~r1(X1203,X1204) | ! [X1205] : (~r1(X1204,X1205) | ! [X1206] : (~r1(X1205,X1206) | ! [X1207] : (! [X1208] : (! [X1209] : (! [X1210] : (! [X1211] : (! [X1212] : (~r1(X1211,X1212) | ! [X1213] : (! [X1214] : (! [X1215] : (! [X1216] : (~r1(X1215,X1216) | ! [X1217] : (~r1(X1216,X1217) | ! [X1218] : (~r1(X1217,X1218) | ! [X1219] : (! [X1220] : (~r1(X1219,X1220) | ! [X1221] : (! [X1222] : (~r1(X1221,X1222) | ! [X1223] : (~r1(X1222,X1223) | ! [X1224] : (! [X1225] : (~r1(X1224,X1225) | ! [X1226] : (! [X1227] : (! [X1228] : (~r1(X1227,X1228) | ! [X1229] : (! [X1230] : (~r1(X1229,X1230) | ! [X1231] : (~r1(X1230,X1231) | ! [X1232] : (! [X1233] : (! [X1234] : (! [X1235] : (~r1(X1234,X1235) | ((~p43(X1235) | ~p44(X1235)) & (p43(X1235) | p44(X1235)))) | ~r1(X1233,X1234)) | ~r1(X1232,X1233)) | ~r1(X1231,X1232)))) | ~r1(X1228,X1229))) | ~r1(X1226,X1227)) | ~r1(X1225,X1226))) | ~r1(X1223,X1224)))) | ~r1(X1220,X1221))) | ~r1(X1218,X1219))))) | ~r1(X1214,X1215)) | ~r1(X1213,X1214)) | ~r1(X1212,X1213))) | ~r1(X1210,X1211)) | ~r1(X1209,X1210)) | ~r1(X1208,X1209)) | ~r1(X1207,X1208)) | ~r1(X1206,X1207)))))))) | ~r1(X1199,X1200)) | ~r1(X1198,X1199)))) | ~r1(X1195,X1196))) | ~r1(X1193,X1194)))))) | ~r1(X117,X119)) | ~sP41(X117))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP41])])). 23.28/23.15 fof(f52,plain,( 23.28/23.15 ! [X115] : (! [X117] : ((? [X118] : (~p45(X118) & r1(X117,X118)) & sP41(X117) & ! [X1236] : (~r1(X117,X1236) | ! [X1237] : (! [X1238] : (! [X1239] : (~r1(X1238,X1239) | ! [X1240] : (~r1(X1239,X1240) | ! [X1241] : (~r1(X1240,X1241) | ! [X1242] : (~r1(X1241,X1242) | ! [X1243] : (~r1(X1242,X1243) | ! [X1244] : (~r1(X1243,X1244) | ! [X1245] : (~r1(X1244,X1245) | ! [X1246] : (! [X1247] : (! [X1248] : (~r1(X1247,X1248) | ! [X1249] : (! [X1250] : (~r1(X1249,X1250) | ! [X1251] : (! [X1252] : (! [X1253] : (! [X1254] : (~r1(X1253,X1254) | ! [X1255] : (! [X1256] : (! [X1257] : (! [X1258] : (~r1(X1257,X1258) | ! [X1259] : (! [X1260] : (! [X1261] : (~r1(X1260,X1261) | ! [X1262] : (! [X1263] : (! [X1264] : (~r1(X1263,X1264) | ! [X1265] : (~r1(X1264,X1265) | ! [X1266] : (! [X1267] : (! [X1268] : (~r1(X1267,X1268) | ! [X1269] : (~r1(X1268,X1269) | ! [X1270] : (~r1(X1269,X1270) | ! [X1271] : (~r1(X1270,X1271) | ! [X1272] : (~r1(X1271,X1272) | ! [X1273] : (! [X1274] : (~r1(X1273,X1274) | ! [X1275] : (~r1(X1274,X1275) | ! [X1276] : (~r1(X1275,X1276) | ! [X1277] : (! [X1278] : (! [X1279] : (~r1(X1278,X1279) | ! [X1280] : (! [X1281] : (~r1(X1280,X1281) | ((p45(X1281) | p44(X1281)) & (~p44(X1281) | ~p45(X1281)))) | ~r1(X1279,X1280))) | ~r1(X1277,X1278)) | ~r1(X1276,X1277))))) | ~r1(X1272,X1273))))))) | ~r1(X1266,X1267)) | ~r1(X1265,X1266)))) | ~r1(X1262,X1263)) | ~r1(X1261,X1262))) | ~r1(X1259,X1260)) | ~r1(X1258,X1259))) | ~r1(X1256,X1257)) | ~r1(X1255,X1256)) | ~r1(X1254,X1255))) | ~r1(X1252,X1253)) | ~r1(X1251,X1252)) | ~r1(X1250,X1251))) | ~r1(X1248,X1249))) | ~r1(X1246,X1247)) | ~r1(X1245,X1246))))))))) | ~r1(X1237,X1238)) | ~r1(X1236,X1237)))) | ~r1(X115,X117)) | ~sP42(X115))), 23.28/23.15 introduced(predicate_definition_introduction,[new_symbols(naming,[sP42])])). 23.28/23.15 fof(f53,plain,( 23.28/23.15 ! [X113] : (! [X115] : ((? [X116] : (~p46(X116) & r1(X115,X116)) & sP42(X115) & ! [X1282] : (~r1(X115,X1282) | ! [X1283] : (~r1(X1282,X1283) | ! [X1284] : (! [X1285] : (~r1(X1284,X1285) | ! [X1286] : (! [X1287] : (! [X1288] : (! [X1289] : (! [X1290] : (~r1(X1289,X1290) | ! [X1291] : (~r1(X1290,X1291) | ! [X1292] : (! [X1293] : (~r1(X1292,X1293) | ! [X1294] : (! [X1295] : (~r1(X1294,X1295) | ! [X1296] : (~r1(X1295,X1296) | ! [X1297] : (~r1(X1296,X1297) | ! [X1298] : (! [X1299] : (! [X1300] : (~r1(X1299,X1300) | ! [X1301] : (~r1(X1300,X1301) | ! [X1302] : (~r1(X1301,X1302) | ! [X1303] : (! [X1304] : (~r1(X1303,X1304) | ! [X1305] : (~r1(X1304,X1305) | ! [X1306] : (~r1(X1305,X1306) | ! [X1307] : (! [X1308] : (~r1(X1307,X1308) | ! [X1309] : (~r1(X1308,X1309) | ! [X1310] : (~r1(X1309,X1310) | ! [X1311] : (! [X1312] : (! [X1313] : (~r1(X1312,X1313) | ! [X1314] : (~r1(X1313,X1314) | ! [X1315] : (! [X1316] : (~r1(X1315,X1316) | ! [X1317] : (! [X1318] : (! [X1319] : (! [X1320] : (! [X1321] : (! [X1322] : (~r1(X1321,X1322) | ! [X1323] : (~r1(X1322,X1323) | ! [X1324] : (! [X1325] : (~r1(X1324,X1325) | ! [X1326] : (~r1(X1325,X1326) | ! [X1327] : (~r1(X1326,X1327) | ! [X1328] : (((p46(X1328) | p45(X1328)) & (~p46(X1328) | ~p45(X1328))) | ~r1(X1327,X1328))))) | ~r1(X1323,X1324)))) | ~r1(X1320,X1321)) | ~r1(X1319,X1320)) | ~r1(X1318,X1319)) | ~r1(X1317,X1318)) | ~r1(X1316,X1317))) | ~r1(X1314,X1315)))) | ~r1(X1311,X1312)) | ~r1(X1310,X1311))))) | ~r1(X1306,X1307))))) | ~r1(X1302,X1303))))) | ~r1(X1298,X1299)) | ~r1(X1297,X1298))))) | ~r1(X1293,X1294))) | ~r1(X1291,X1292)))) | ~r1(X1288,X1289)) | ~r1(X1287,X1288)) | ~r1(X1286,X1287)) | ~r1(X1285,X1286))) | ~r1(X1283,X1284))))) | ~r1(X113,X115)) | ~sP43(X113))), 23.28/23.16 introduced(predicate_definition_introduction,[new_symbols(naming,[sP43])])). 23.28/23.16 fof(f54,plain,( 23.28/23.16 ! [X112] : (! [X113] : ((? [X114] : (r1(X113,X114) & ~p47(X114)) & sP43(X113) & ! [X1329] : (! [X1330] : (~r1(X1329,X1330) | ! [X1331] : (~r1(X1330,X1331) | ! [X1332] : (~r1(X1331,X1332) | ! [X1333] : (! [X1334] : (~r1(X1333,X1334) | ! [X1335] : (~r1(X1334,X1335) | ! [X1336] : (~r1(X1335,X1336) | ! [X1337] : (~r1(X1336,X1337) | ! [X1338] : (~r1(X1337,X1338) | ! [X1339] : (~r1(X1338,X1339) | ! [X1340] : (! [X1341] : (~r1(X1340,X1341) | ! [X1342] : (! [X1343] : (~r1(X1342,X1343) | ! [X1344] : (! [X1345] : (! [X1346] : (~r1(X1345,X1346) | ! [X1347] : (~r1(X1346,X1347) | ! [X1348] : (! [X1349] : (~r1(X1348,X1349) | ! [X1350] : (! [X1351] : (! [X1352] : (~r1(X1351,X1352) | ! [X1353] : (~r1(X1352,X1353) | ! [X1354] : (! [X1355] : (~r1(X1354,X1355) | ! [X1356] : (! [X1357] : (~r1(X1356,X1357) | ! [X1358] : (~r1(X1357,X1358) | ! [X1359] : (! [X1360] : (! [X1361] : (! [X1362] : (~r1(X1361,X1362) | ! [X1363] : (! [X1364] : (~r1(X1363,X1364) | ! [X1365] : (! [X1366] : (~r1(X1365,X1366) | ! [X1367] : (~r1(X1366,X1367) | ! [X1368] : (~r1(X1367,X1368) | ! [X1369] : (! [X1370] : (~r1(X1369,X1370) | ! [X1371] : (~r1(X1370,X1371) | ! [X1372] : (~r1(X1371,X1372) | ! [X1373] : (~r1(X1372,X1373) | ! [X1374] : (~r1(X1373,X1374) | ! [X1375] : (~r1(X1374,X1375) | ! [X1376] : (((~p47(X1376) | ~p46(X1376)) & (p46(X1376) | p47(X1376))) | ~r1(X1375,X1376)))))))) | ~r1(X1368,X1369))))) | ~r1(X1364,X1365))) | ~r1(X1362,X1363))) | ~r1(X1360,X1361)) | ~r1(X1359,X1360)) | ~r1(X1358,X1359)))) | ~r1(X1355,X1356))) | ~r1(X1353,X1354)))) | ~r1(X1350,X1351)) | ~r1(X1349,X1350))) | ~r1(X1347,X1348)))) | ~r1(X1344,X1345)) | ~r1(X1343,X1344))) | ~r1(X1341,X1342))) | ~r1(X1339,X1340)))))))) | ~r1(X1332,X1333))))) | ~r1(X113,X1329))) | ~r1(X112,X113)) | ~sP44(X112))), 23.28/23.16 introduced(predicate_definition_introduction,[new_symbols(naming,[sP44])])). 23.28/23.16 fof(f55,plain,( 23.28/23.16 ! [X111] : (! [X112] : ((sP44(X112) & ? [X1377] : (~p48(X1377) & r1(X112,X1377)) & ! [X1378] : (! [X1379] : (! [X1380] : (! [X1381] : (~r1(X1380,X1381) | ! [X1382] : (~r1(X1381,X1382) | ! [X1383] : (! [X1384] : (~r1(X1383,X1384) | ! [X1385] : (! [X1386] : (~r1(X1385,X1386) | ! [X1387] : (~r1(X1386,X1387) | ! [X1388] : (! [X1389] : (~r1(X1388,X1389) | ! [X1390] : (~r1(X1389,X1390) | ! [X1391] : (~r1(X1390,X1391) | ! [X1392] : (! [X1393] : (! [X1394] : (~r1(X1393,X1394) | ! [X1395] : (! [X1396] : (! [X1397] : (~r1(X1396,X1397) | ! [X1398] : (! [X1399] : (~r1(X1398,X1399) | ! [X1400] : (! [X1401] : (~r1(X1400,X1401) | ! [X1402] : (~r1(X1401,X1402) | ! [X1403] : (! [X1404] : (~r1(X1403,X1404) | ! [X1405] : (! [X1406] : (! [X1407] : (~r1(X1406,X1407) | ! [X1408] : (! [X1409] : (~r1(X1408,X1409) | ! [X1410] : (! [X1411] : (! [X1412] : (! [X1413] : (~r1(X1412,X1413) | ! [X1414] : (~r1(X1413,X1414) | ! [X1415] : (! [X1416] : (! [X1417] : (! [X1418] : (~r1(X1417,X1418) | ! [X1419] : (~r1(X1418,X1419) | ! [X1420] : (~r1(X1419,X1420) | ! [X1421] : (~r1(X1420,X1421) | ! [X1422] : (! [X1423] : (! [X1424] : (! [X1425] : (~r1(X1424,X1425) | ! [X1426] : (((p47(X1426) | p48(X1426)) & (~p48(X1426) | ~p47(X1426))) | ~r1(X1425,X1426))) | ~r1(X1423,X1424)) | ~r1(X1422,X1423)) | ~r1(X1421,X1422)))))) | ~r1(X1416,X1417)) | ~r1(X1415,X1416)) | ~r1(X1414,X1415)))) | ~r1(X1411,X1412)) | ~r1(X1410,X1411)) | ~r1(X1409,X1410))) | ~r1(X1407,X1408))) | ~r1(X1405,X1406)) | ~r1(X1404,X1405))) | ~r1(X1402,X1403)))) | ~r1(X1399,X1400))) | ~r1(X1397,X1398))) | ~r1(X1395,X1396)) | ~r1(X1394,X1395))) | ~r1(X1392,X1393)) | ~r1(X1391,X1392))))) | ~r1(X1387,X1388)))) | ~r1(X1384,X1385))) | ~r1(X1382,X1383)))) | ~r1(X1379,X1380)) | ~r1(X1378,X1379)) | ~r1(X112,X1378))) | ~r1(X111,X112)) | ~sP45(X111))), 23.28/23.16 introduced(predicate_definition_introduction,[new_symbols(naming,[sP45])])). 23.28/23.16 fof(f56,plain,( 23.28/23.16 ! [X109] : (! [X111] : ((sP45(X111) & ? [X1427] : (~p49(X1427) & r1(X111,X1427)) & ! [X1428] : (! [X1429] : (! [X1430] : (~r1(X1429,X1430) | ! [X1431] : (~r1(X1430,X1431) | ! [X1432] : (~r1(X1431,X1432) | ! [X1433] : (! [X1434] : (~r1(X1433,X1434) | ! [X1435] : (~r1(X1434,X1435) | ! [X1436] : (! [X1437] : (~r1(X1436,X1437) | ! [X1438] : (~r1(X1437,X1438) | ! [X1439] : (~r1(X1438,X1439) | ! [X1440] : (~r1(X1439,X1440) | ! [X1441] : (! [X1442] : (~r1(X1441,X1442) | ! [X1443] : (~r1(X1442,X1443) | ! [X1444] : (~r1(X1443,X1444) | ! [X1445] : (~r1(X1444,X1445) | ! [X1446] : (! [X1447] : (~r1(X1446,X1447) | ! [X1448] : (~r1(X1447,X1448) | ! [X1449] : (~r1(X1448,X1449) | ! [X1450] : (! [X1451] : (! [X1452] : (~r1(X1451,X1452) | ! [X1453] : (! [X1454] : (~r1(X1453,X1454) | ! [X1455] : (~r1(X1454,X1455) | ! [X1456] : (~r1(X1455,X1456) | ! [X1457] : (~r1(X1456,X1457) | ! [X1458] : (! [X1459] : (! [X1460] : (! [X1461] : (~r1(X1460,X1461) | ! [X1462] : (! [X1463] : (! [X1464] : (! [X1465] : (! [X1466] : (~r1(X1465,X1466) | ! [X1467] : (~r1(X1466,X1467) | ! [X1468] : (~r1(X1467,X1468) | ! [X1469] : (~r1(X1468,X1469) | ! [X1470] : (! [X1471] : (! [X1472] : (~r1(X1471,X1472) | ! [X1473] : (! [X1474] : (! [X1475] : (! [X1476] : (! [X1477] : (~r1(X1476,X1477) | ((~p49(X1477) | ~p48(X1477)) & (p49(X1477) | p48(X1477)))) | ~r1(X1475,X1476)) | ~r1(X1474,X1475)) | ~r1(X1473,X1474)) | ~r1(X1472,X1473))) | ~r1(X1470,X1471)) | ~r1(X1469,X1470)))))) | ~r1(X1464,X1465)) | ~r1(X1463,X1464)) | ~r1(X1462,X1463)) | ~r1(X1461,X1462))) | ~r1(X1459,X1460)) | ~r1(X1458,X1459)) | ~r1(X1457,X1458)))))) | ~r1(X1452,X1453))) | ~r1(X1450,X1451)) | ~r1(X1449,X1450))))) | ~r1(X1445,X1446)))))) | ~r1(X1440,X1441)))))) | ~r1(X1435,X1436)))) | ~r1(X1432,X1433))))) | ~r1(X1428,X1429)) | ~r1(X111,X1428))) | ~r1(X109,X111)) | ~sP46(X109))), 23.28/23.16 introduced(predicate_definition_introduction,[new_symbols(naming,[sP46])])). 23.28/23.16 fof(f57,plain,( 23.28/23.16 ! [X56] : (! [X109] : ((? [X110] : (~p50(X110) & r1(X109,X110)) & sP46(X109) & ! [X1478] : (~r1(X109,X1478) | ! [X1479] : (! [X1480] : (! [X1481] : (! [X1482] : (! [X1483] : (~r1(X1482,X1483) | ! [X1484] : (! [X1485] : (~r1(X1484,X1485) | ! [X1486] : (! [X1487] : (! [X1488] : (~r1(X1487,X1488) | ! [X1489] : (~r1(X1488,X1489) | ! [X1490] : (~r1(X1489,X1490) | ! [X1491] : (~r1(X1490,X1491) | ! [X1492] : (~r1(X1491,X1492) | ! [X1493] : (! [X1494] : (~r1(X1493,X1494) | ! [X1495] : (~r1(X1494,X1495) | ! [X1496] : (! [X1497] : (! [X1498] : (! [X1499] : (! [X1500] : (! [X1501] : (~r1(X1500,X1501) | ! [X1502] : (! [X1503] : (~r1(X1502,X1503) | ! [X1504] : (~r1(X1503,X1504) | ! [X1505] : (! [X1506] : (! [X1507] : (! [X1508] : (! [X1509] : (~r1(X1508,X1509) | ! [X1510] : (~r1(X1509,X1510) | ! [X1511] : (~r1(X1510,X1511) | ! [X1512] : (~r1(X1511,X1512) | ! [X1513] : (~r1(X1512,X1513) | ! [X1514] : (! [X1515] : (! [X1516] : (~r1(X1515,X1516) | ! [X1517] : (~r1(X1516,X1517) | ! [X1518] : (~r1(X1517,X1518) | ! [X1519] : (! [X1520] : (! [X1521] : (! [X1522] : (! [X1523] : (! [X1524] : (! [X1525] : (~r1(X1524,X1525) | ! [X1526] : (~r1(X1525,X1526) | ! [X1527] : (~r1(X1526,X1527) | ! [X1528] : (((p49(X1528) | p50(X1528)) & (~p49(X1528) | ~p50(X1528))) | ~r1(X1527,X1528))))) | ~r1(X1523,X1524)) | ~r1(X1522,X1523)) | ~r1(X1521,X1522)) | ~r1(X1520,X1521)) | ~r1(X1519,X1520)) | ~r1(X1518,X1519))))) | ~r1(X1514,X1515)) | ~r1(X1513,X1514))))))) | ~r1(X1507,X1508)) | ~r1(X1506,X1507)) | ~r1(X1505,X1506)) | ~r1(X1504,X1505)))) | ~r1(X1501,X1502))) | ~r1(X1499,X1500)) | ~r1(X1498,X1499)) | ~r1(X1497,X1498)) | ~r1(X1496,X1497)) | ~r1(X1495,X1496)))) | ~r1(X1492,X1493))))))) | ~r1(X1486,X1487)) | ~r1(X1485,X1486))) | ~r1(X1483,X1484))) | ~r1(X1481,X1482)) | ~r1(X1480,X1481)) | ~r1(X1479,X1480)) | ~r1(X1478,X1479)))) | ~r1(X56,X109)) | ~sP47(X56))), 23.28/23.16 introduced(predicate_definition_introduction,[new_symbols(naming,[sP47])])). 23.28/23.16 fof(f9,plain,( 23.28/23.16 ? [X0] : (! [X1] : ((! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (((~p1(X54) | ~p51(X54)) & (p1(X54) | p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) & ? [X55] : r1(X1,X55) & ! [X56] : ((! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (((p51(X108) | p50(X108)) & (~p50(X108) | ~p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) & ! [X109] : ((? [X110] : (~p50(X110) & r1(X109,X110)) & ! [X111] : ((! [X112] : ((! [X113] : ((? [X114] : (r1(X113,X114) & ~p47(X114)) & ! [X115] : ((? [X116] : (~p46(X116) & r1(X115,X116)) & ! [X117] : ((? [X118] : (~p45(X118) & r1(X117,X118)) & ! [X119] : ((? [X120] : (r1(X119,X120) & ~p44(X120)) & ! [X121] : (~r1(X119,X121) | (? [X122] : (~p43(X122) & r1(X121,X122)) & ! [X123] : ((! [X124] : (~r1(X123,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (! [X130] : (! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (! [X134] : (~r1(X133,X134) | ! [X135] : (~r1(X134,X135) | ! [X136] : (! [X137] : (! [X138] : (! [X139] : (! [X140] : (~r1(X139,X140) | ! [X141] : (! [X142] : (! [X143] : (! [X144] : (! [X145] : (~r1(X144,X145) | ! [X146] : (! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (! [X165] : (! [X166] : (~r1(X165,X166) | ((p42(X166) | p41(X166)) & (~p42(X166) | ~p41(X166)))) | ~r1(X164,X165)) | ~r1(X163,X164)) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160)) | ~r1(X158,X159)))) | ~r1(X155,X156)) | ~r1(X154,X155))))))) | ~r1(X148,X149)) | ~r1(X147,X148))) | ~r1(X145,X146))) | ~r1(X143,X144)) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141))) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137)) | ~r1(X135,X136)))) | ~r1(X132,X133)) | ~r1(X131,X132))) | ~r1(X129,X130)) | ~r1(X128,X129))))))) & ? [X167] : (~p42(X167) & r1(X123,X167)) & ! [X168] : (~r1(X123,X168) | (? [X169] : (~p41(X169) & r1(X168,X169)) & ! [X170] : (~r1(X168,X170) | (! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (! [X174] : (! [X175] : (! [X176] : (! [X177] : (! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (! [X186] : (! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (~r1(X190,X191) | ! [X192] : (! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (~r1(X195,X196) | ! [X197] : (~r1(X196,X197) | ! [X198] : (! [X199] : (! [X200] : (~r1(X199,X200) | ! [X201] : (~r1(X200,X201) | ! [X202] : (! [X203] : (~r1(X202,X203) | ! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (~r1(X205,X206) | ! [X207] : (! [X208] : (~r1(X207,X208) | ! [X209] : (! [X210] : (~r1(X209,X210) | ! [X211] : (~r1(X210,X211) | ((p39(X211) | p40(X211)) & (~p39(X211) | ~p40(X211))))) | ~r1(X208,X209))) | ~r1(X206,X207)))) | ~r1(X203,X204))) | ~r1(X201,X202)))) | ~r1(X198,X199)) | ~r1(X197,X198))))))) | ~r1(X191,X192))) | ~r1(X189,X190)))) | ~r1(X186,X187)) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184))) | ~r1(X181,X182)) | ~r1(X180,X181))) | ~r1(X178,X179)) | ~r1(X177,X178)) | ~r1(X176,X177)) | ~r1(X175,X176)) | ~r1(X174,X175)) | ~r1(X173,X174)) | ~r1(X172,X173))) | ~r1(X170,X171)) & ! [X212] : (~r1(X170,X212) | (! [X213] : (~r1(X212,X213) | (! [X214] : (~r1(X213,X214) | (! [X215] : (! [X216] : (~r1(X215,X216) | ! [X217] : (~r1(X216,X217) | ! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (! [X221] : (! [X222] : (! [X223] : (~r1(X222,X223) | ! [X224] : (~r1(X223,X224) | ! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (~r1(X233,X234) | ! [X235] : (! [X236] : (~r1(X235,X236) | ! [X237] : (~r1(X236,X237) | ! [X238] : (~r1(X237,X238) | ! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~r1(X242,X243) | ! [X244] : (! [X245] : (! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (~r1(X251,X252) | ((~p36(X252) | ~p37(X252)) & (p36(X252) | p37(X252))))) | ~r1(X249,X250))))) | ~r1(X245,X246)) | ~r1(X244,X245)) | ~r1(X243,X244)))))))))) | ~r1(X234,X235))))) | ~r1(X230,X231)))) | ~r1(X227,X228)) | ~r1(X226,X227)) | ~r1(X225,X226))))) | ~r1(X221,X222)) | ~r1(X220,X221)) | ~r1(X219,X220)) | ~r1(X218,X219))))) | ~r1(X214,X215)) & ? [X253] : (r1(X214,X253) & ~p37(X253)) & ! [X254] : (~r1(X214,X254) | (! [X255] : ((! [X256] : ((! [X257] : (~r1(X256,X257) | ! [X258] : (! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (! [X263] : (~r1(X262,X263) | ! [X264] : (! [X265] : (~r1(X264,X265) | ! [X266] : (! [X267] : (! [X268] : (! [X269] : (~r1(X268,X269) | ! [X270] : (~r1(X269,X270) | ! [X271] : (~r1(X270,X271) | ! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (! [X280] : (~r1(X279,X280) | ! [X281] : (~r1(X280,X281) | ! [X282] : (! [X283] : (! [X284] : (~r1(X283,X284) | ! [X285] : (! [X286] : (! [X287] : (! [X288] : (! [X289] : (~r1(X288,X289) | ! [X290] : (~r1(X289,X290) | ! [X291] : (((~p34(X291) | ~p33(X291)) & (p33(X291) | p34(X291))) | ~r1(X290,X291)))) | ~r1(X287,X288)) | ~r1(X286,X287)) | ~r1(X285,X286)) | ~r1(X284,X285))) | ~r1(X282,X283)) | ~r1(X281,X282)))) | ~r1(X278,X279)))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272))))) | ~r1(X267,X268)) | ~r1(X266,X267)) | ~r1(X265,X266))) | ~r1(X263,X264))) | ~r1(X261,X262)) | ~r1(X260,X261)))) | ~r1(X257,X258))) & ! [X292] : ((! [X293] : (~r1(X292,X293) | (! [X294] : (~r1(X293,X294) | ! [X295] : (! [X296] : (~r1(X295,X296) | ! [X297] : (! [X298] : (! [X299] : (~r1(X298,X299) | ! [X300] : (! [X301] : (! [X302] : (~r1(X301,X302) | ! [X303] : (~r1(X302,X303) | ! [X304] : (! [X305] : (~r1(X304,X305) | ! [X306] : (! [X307] : (~r1(X306,X307) | ! [X308] : (! [X309] : (! [X310] : (! [X311] : (! [X312] : (~r1(X311,X312) | ! [X313] : (~r1(X312,X313) | ! [X314] : (~r1(X313,X314) | ! [X315] : (! [X316] : (~r1(X315,X316) | ! [X317] : (! [X318] : (! [X319] : (! [X320] : (~r1(X319,X320) | ! [X321] : (! [X322] : (! [X323] : (~r1(X322,X323) | ! [X324] : (~r1(X323,X324) | ! [X325] : (~r1(X324,X325) | ! [X326] : (~r1(X325,X326) | ((~p31(X326) | ~p32(X326)) & (p32(X326) | p31(X326))))))) | ~r1(X321,X322)) | ~r1(X320,X321))) | ~r1(X318,X319)) | ~r1(X317,X318)) | ~r1(X316,X317))) | ~r1(X314,X315))))) | ~r1(X310,X311)) | ~r1(X309,X310)) | ~r1(X308,X309)) | ~r1(X307,X308))) | ~r1(X305,X306))) | ~r1(X303,X304)))) | ~r1(X300,X301)) | ~r1(X299,X300))) | ~r1(X297,X298)) | ~r1(X296,X297))) | ~r1(X294,X295))) & ? [X327] : (~p32(X327) & r1(X293,X327)) & ! [X328] : ((! [X329] : (! [X330] : (! [X331] : (~r1(X330,X331) | ! [X332] : (! [X333] : (~r1(X332,X333) | ! [X334] : (~r1(X333,X334) | ! [X335] : (~r1(X334,X335) | ! [X336] : (~r1(X335,X336) | ! [X337] : (! [X338] : (~r1(X337,X338) | ! [X339] : (! [X340] : (~r1(X339,X340) | ! [X341] : (! [X342] : (~r1(X341,X342) | ! [X343] : (~r1(X342,X343) | ! [X344] : (! [X345] : (~r1(X344,X345) | ! [X346] : (! [X347] : (! [X348] : (! [X349] : (! [X350] : (! [X351] : (! [X352] : (! [X353] : (! [X354] : (~r1(X353,X354) | ! [X355] : (~r1(X354,X355) | ! [X356] : (~r1(X355,X356) | ! [X357] : (! [X358] : (~r1(X357,X358) | ! [X359] : (! [X360] : (((~p31(X360) | ~p30(X360)) & (p30(X360) | p31(X360))) | ~r1(X359,X360)) | ~r1(X358,X359))) | ~r1(X356,X357))))) | ~r1(X352,X353)) | ~r1(X351,X352)) | ~r1(X350,X351)) | ~r1(X349,X350)) | ~r1(X348,X349)) | ~r1(X347,X348)) | ~r1(X346,X347)) | ~r1(X345,X346))) | ~r1(X343,X344)))) | ~r1(X340,X341))) | ~r1(X338,X339))) | ~r1(X336,X337)))))) | ~r1(X331,X332))) | ~r1(X329,X330)) | ~r1(X328,X329)) & ? [X361] : (r1(X328,X361) & ~p31(X361)) & ! [X362] : ((? [X363] : (~p30(X363) & r1(X362,X363)) & ! [X364] : ((! [X365] : (! [X366] : (~r1(X365,X366) | ! [X367] : (! [X368] : (! [X369] : (! [X370] : (! [X371] : (! [X372] : (~r1(X371,X372) | ! [X373] : (~r1(X372,X373) | ! [X374] : (! [X375] : (~r1(X374,X375) | ! [X376] : (! [X377] : (~r1(X376,X377) | ! [X378] : (~r1(X377,X378) | ! [X379] : (! [X380] : (~r1(X379,X380) | ! [X381] : (! [X382] : (! [X383] : (~r1(X382,X383) | ! [X384] : (~r1(X383,X384) | ! [X385] : (~r1(X384,X385) | ! [X386] : (! [X387] : (! [X388] : (! [X389] : (~r1(X388,X389) | ! [X390] : (~r1(X389,X390) | ! [X391] : (! [X392] : (! [X393] : (! [X394] : (((p28(X394) | p29(X394)) & (~p28(X394) | ~p29(X394))) | ~r1(X393,X394)) | ~r1(X392,X393)) | ~r1(X391,X392)) | ~r1(X390,X391)))) | ~r1(X387,X388)) | ~r1(X386,X387)) | ~r1(X385,X386))))) | ~r1(X381,X382)) | ~r1(X380,X381))) | ~r1(X378,X379)))) | ~r1(X375,X376))) | ~r1(X373,X374)))) | ~r1(X370,X371)) | ~r1(X369,X370)) | ~r1(X368,X369)) | ~r1(X367,X368)) | ~r1(X366,X367))) | ~r1(X364,X365)) & ! [X395] : ((! [X396] : ((? [X397] : (r1(X396,X397) & ~p27(X397)) & ! [X398] : (~r1(X396,X398) | (! [X399] : (! [X400] : (~r1(X399,X400) | ! [X401] : (! [X402] : (! [X403] : (! [X404] : (! [X405] : (~r1(X404,X405) | ! [X406] : (~r1(X405,X406) | ! [X407] : (~r1(X406,X407) | ! [X408] : (~r1(X407,X408) | ! [X409] : (~r1(X408,X409) | ! [X410] : (~r1(X409,X410) | ! [X411] : (! [X412] : (~r1(X411,X412) | ! [X413] : (! [X414] : (~r1(X413,X414) | ! [X415] : (~r1(X414,X415) | ! [X416] : (~r1(X415,X416) | ! [X417] : (~r1(X416,X417) | ! [X418] : (! [X419] : (~r1(X418,X419) | ! [X420] : (! [X421] : (~r1(X420,X421) | ! [X422] : (! [X423] : (~r1(X422,X423) | ! [X424] : (~r1(X423,X424) | ! [X425] : (~r1(X424,X425) | ((~p25(X425) | ~p26(X425)) & (p25(X425) | p26(X425)))))) | ~r1(X421,X422))) | ~r1(X419,X420))) | ~r1(X417,X418)))))) | ~r1(X412,X413))) | ~r1(X410,X411)))))))) | ~r1(X403,X404)) | ~r1(X402,X403)) | ~r1(X401,X402)) | ~r1(X400,X401))) | ~r1(X398,X399)) & ! [X426] : ((! [X427] : ((? [X428] : (r1(X427,X428) & ~p24(X428)) & ! [X429] : (~r1(X427,X429) | (? [X430] : (~p23(X430) & r1(X429,X430)) & ! [X431] : (~r1(X429,X431) | (! [X432] : (! [X433] : (~r1(X432,X433) | ! [X434] : (~r1(X433,X434) | ! [X435] : (! [X436] : (~r1(X435,X436) | ! [X437] : (~r1(X436,X437) | ! [X438] : (~r1(X437,X438) | ! [X439] : (! [X440] : (~r1(X439,X440) | ! [X441] : (! [X442] : (! [X443] : (! [X444] : (! [X445] : (~r1(X444,X445) | ! [X446] : (~r1(X445,X446) | ! [X447] : (! [X448] : (~r1(X447,X448) | ! [X449] : (! [X450] : (~r1(X449,X450) | ! [X451] : (~r1(X450,X451) | ! [X452] : (! [X453] : (~r1(X452,X453) | ! [X454] : (~r1(X453,X454) | ((~p21(X454) | ~p22(X454)) & (p21(X454) | p22(X454))))) | ~r1(X451,X452)))) | ~r1(X448,X449))) | ~r1(X446,X447)))) | ~r1(X443,X444)) | ~r1(X442,X443)) | ~r1(X441,X442)) | ~r1(X440,X441))) | ~r1(X438,X439))))) | ~r1(X434,X435)))) | ~r1(X431,X432)) & ! [X455] : ((? [X456] : (r1(X455,X456) & ~p21(X456)) & ! [X457] : ((? [X458] : (r1(X457,X458) & ~p20(X458)) & ! [X459] : ((? [X460] : (r1(X459,X460) & ~p19(X460)) & ! [X461] : ((! [X462] : (~r1(X461,X462) | ! [X463] : (~r1(X462,X463) | ! [X464] : (~r1(X463,X464) | ! [X465] : (! [X466] : (! [X467] : (! [X468] : (~r1(X467,X468) | ! [X469] : (! [X470] : (! [X471] : (~r1(X470,X471) | ! [X472] : (~r1(X471,X472) | ! [X473] : (! [X474] : (~r1(X473,X474) | ! [X475] : (! [X476] : (! [X477] : (! [X478] : (! [X479] : (~r1(X478,X479) | ! [X480] : (~r1(X479,X480) | ((p17(X480) | p18(X480)) & (~p17(X480) | ~p18(X480))))) | ~r1(X477,X478)) | ~r1(X476,X477)) | ~r1(X475,X476)) | ~r1(X474,X475))) | ~r1(X472,X473)))) | ~r1(X469,X470)) | ~r1(X468,X469))) | ~r1(X466,X467)) | ~r1(X465,X466)) | ~r1(X464,X465))))) & ! [X481] : (~r1(X461,X481) | (! [X482] : (~r1(X481,X482) | ! [X483] : (! [X484] : (~r1(X483,X484) | ! [X485] : (! [X486] : (~r1(X485,X486) | ! [X487] : (~r1(X486,X487) | ! [X488] : (~r1(X487,X488) | ! [X489] : (~r1(X488,X489) | ! [X490] : (~r1(X489,X490) | ! [X491] : (~r1(X490,X491) | ! [X492] : (~r1(X491,X492) | ! [X493] : (! [X494] : (! [X495] : (~r1(X494,X495) | ! [X496] : (~r1(X495,X496) | ! [X497] : (~r1(X496,X497) | ! [X498] : (! [X499] : (~r1(X498,X499) | ((p17(X499) | p16(X499)) & (~p16(X499) | ~p17(X499)))) | ~r1(X497,X498))))) | ~r1(X493,X494)) | ~r1(X492,X493))))))))) | ~r1(X484,X485))) | ~r1(X482,X483))) & ? [X500] : (~p17(X500) & r1(X481,X500)) & ! [X501] : (~r1(X481,X501) | (! [X502] : (~r1(X501,X502) | (! [X503] : (~r1(X502,X503) | (? [X504] : (r1(X503,X504) & ~p14(X504)) & ! [X505] : ((? [X506] : (~p13(X506) & r1(X505,X506)) & ! [X507] : (~r1(X505,X507) | (! [X508] : (~r1(X507,X508) | ! [X509] : (~r1(X508,X509) | ! [X510] : (! [X511] : (! [X512] : (! [X513] : (! [X514] : (~r1(X513,X514) | ! [X515] : (~r1(X514,X515) | ! [X516] : (! [X517] : (~r1(X516,X517) | ! [X518] : (~r1(X517,X518) | ! [X519] : (~r1(X518,X519) | ! [X520] : (~r1(X519,X520) | ((p12(X520) | p11(X520)) & (~p12(X520) | ~p11(X520))))))) | ~r1(X515,X516)))) | ~r1(X512,X513)) | ~r1(X511,X512)) | ~r1(X510,X511)) | ~r1(X509,X510)))) & ? [X521] : (r1(X507,X521) & ~p12(X521)) & ! [X522] : (~r1(X507,X522) | (! [X523] : ((! [X524] : (! [X525] : (! [X526] : (~r1(X525,X526) | ! [X527] : (~r1(X526,X527) | ! [X528] : (~r1(X527,X528) | ! [X529] : (~r1(X528,X529) | ! [X530] : (~r1(X529,X530) | ! [X531] : (! [X532] : (! [X533] : (! [X534] : (~r1(X533,X534) | ((~p10(X534) | ~p9(X534)) & (p10(X534) | p9(X534)))) | ~r1(X532,X533)) | ~r1(X531,X532)) | ~r1(X530,X531))))))) | ~r1(X524,X525)) | ~r1(X523,X524)) & ? [X535] : (~p10(X535) & r1(X523,X535)) & ! [X536] : (~r1(X523,X536) | (? [X537] : (r1(X536,X537) & ~p9(X537)) & ! [X538] : (~r1(X536,X538) | (! [X539] : (~r1(X538,X539) | ! [X540] : (! [X541] : (! [X542] : (! [X543] : (~r1(X542,X543) | ! [X544] : (! [X545] : (~r1(X544,X545) | ! [X546] : (! [X547] : (((~p7(X547) | ~p8(X547)) & (p7(X547) | p8(X547))) | ~r1(X546,X547)) | ~r1(X545,X546))) | ~r1(X543,X544))) | ~r1(X541,X542)) | ~r1(X540,X541)) | ~r1(X539,X540))) & ! [X548] : (~r1(X538,X548) | (! [X549] : (! [X550] : (! [X551] : (~r1(X550,X551) | ! [X552] : (~r1(X551,X552) | ! [X553] : (~r1(X552,X553) | ! [X554] : (~r1(X553,X554) | ! [X555] : (! [X556] : (((~p7(X556) | ~p6(X556)) & (p6(X556) | p7(X556))) | ~r1(X555,X556)) | ~r1(X554,X555)))))) | ~r1(X549,X550)) | ~r1(X548,X549)) & ? [X557] : (~p7(X557) & r1(X548,X557)) & ! [X558] : ((! [X559] : ((! [X560] : (~r1(X559,X560) | (! [X561] : (! [X562] : (~r1(X561,X562) | ! [X563] : (~r1(X562,X563) | ! [X564] : (! [X565] : (((~p4(X565) | ~p3(X565)) & (p4(X565) | p3(X565))) | ~r1(X564,X565)) | ~r1(X563,X564)))) | ~r1(X560,X561)) & ! [X566] : ((! [X567] : (~r1(X566,X567) | ! [X568] : (! [X569] : (! [X570] : (~r1(X569,X570) | ((p2(X570) | p3(X570)) & (~p2(X570) | ~p3(X570)))) | ~r1(X568,X569)) | ~r1(X567,X568))) & ! [X571] : (! [X572] : (! [X573] : (~r1(X572,X573) | ! [X574] : (~r1(X573,X574) | ((p2(X574) | p1(X574)) & (~p1(X574) | ~p2(X574))))) | ~r1(X571,X572)) | ~r1(X566,X571)) & ? [X575] : (~p3(X575) & r1(X566,X575))) | ~r1(X560,X566)) & ? [X576] : (r1(X560,X576) & ~p4(X576)))) & ? [X577] : (r1(X559,X577) & ~p5(X577)) & ! [X578] : (~r1(X559,X578) | ! [X579] : (! [X580] : (! [X581] : (~r1(X580,X581) | ! [X582] : (~r1(X581,X582) | ! [X583] : (~r1(X582,X583) | ((p4(X583) | p5(X583)) & (~p5(X583) | ~p4(X583)))))) | ~r1(X579,X580)) | ~r1(X578,X579)))) | ~r1(X558,X559)) & ? [X584] : (~p6(X584) & r1(X558,X584)) & ! [X585] : (! [X586] : (~r1(X585,X586) | ! [X587] : (! [X588] : (! [X589] : (~r1(X588,X589) | ! [X590] : (~r1(X589,X590) | ! [X591] : (~r1(X590,X591) | ((~p5(X591) | ~p6(X591)) & (p6(X591) | p5(X591)))))) | ~r1(X587,X588)) | ~r1(X586,X587))) | ~r1(X558,X585))) | ~r1(X548,X558)))) & ? [X592] : (r1(X538,X592) & ~p8(X592)))) & ! [X593] : (~r1(X536,X593) | ! [X594] : (~r1(X593,X594) | ! [X595] : (! [X596] : (! [X597] : (! [X598] : (! [X599] : (~r1(X598,X599) | ! [X600] : (! [X601] : (! [X602] : (((p8(X602) | p9(X602)) & (~p9(X602) | ~p8(X602))) | ~r1(X601,X602)) | ~r1(X600,X601)) | ~r1(X599,X600))) | ~r1(X597,X598)) | ~r1(X596,X597)) | ~r1(X595,X596)) | ~r1(X594,X595))))))) | ~r1(X522,X523)) & ? [X603] : (r1(X522,X603) & ~p11(X603)) & ! [X604] : (~r1(X522,X604) | ! [X605] : (~r1(X604,X605) | ! [X606] : (~r1(X605,X606) | ! [X607] : (~r1(X606,X607) | ! [X608] : (~r1(X607,X608) | ! [X609] : (~r1(X608,X609) | ! [X610] : (~r1(X609,X610) | ! [X611] : (! [X612] : (! [X613] : (~r1(X612,X613) | ! [X614] : (! [X615] : (~r1(X614,X615) | ((p11(X615) | p10(X615)) & (~p11(X615) | ~p10(X615)))) | ~r1(X613,X614))) | ~r1(X611,X612)) | ~r1(X610,X611))))))))))))) & ! [X616] : (! [X617] : (! [X618] : (~r1(X617,X618) | ! [X619] : (! [X620] : (! [X621] : (! [X622] : (~r1(X621,X622) | ! [X623] : (! [X624] : (~r1(X623,X624) | ! [X625] : (~r1(X624,X625) | ! [X626] : (! [X627] : (! [X628] : (~r1(X627,X628) | ! [X629] : (((p13(X629) | p12(X629)) & (~p13(X629) | ~p12(X629))) | ~r1(X628,X629))) | ~r1(X626,X627)) | ~r1(X625,X626)))) | ~r1(X622,X623))) | ~r1(X620,X621)) | ~r1(X619,X620)) | ~r1(X618,X619))) | ~r1(X616,X617)) | ~r1(X505,X616))) | ~r1(X503,X505)) & ! [X630] : (~r1(X503,X630) | ! [X631] : (! [X632] : (~r1(X631,X632) | ! [X633] : (! [X634] : (~r1(X633,X634) | ! [X635] : (! [X636] : (! [X637] : (~r1(X636,X637) | ! [X638] : (~r1(X637,X638) | ! [X639] : (~r1(X638,X639) | ! [X640] : (~r1(X639,X640) | ! [X641] : (! [X642] : (~r1(X641,X642) | ! [X643] : (! [X644] : (~r1(X643,X644) | ((p14(X644) | p13(X644)) & (~p14(X644) | ~p13(X644)))) | ~r1(X642,X643))) | ~r1(X640,X641)))))) | ~r1(X635,X636)) | ~r1(X634,X635))) | ~r1(X632,X633))) | ~r1(X630,X631))))) & ? [X645] : (~p15(X645) & r1(X502,X645)) & ! [X646] : (! [X647] : (! [X648] : (~r1(X647,X648) | ! [X649] : (! [X650] : (~r1(X649,X650) | ! [X651] : (~r1(X650,X651) | ! [X652] : (! [X653] : (! [X654] : (! [X655] : (~r1(X654,X655) | ! [X656] : (! [X657] : (~r1(X656,X657) | ! [X658] : (~r1(X657,X658) | ! [X659] : (! [X660] : (~r1(X659,X660) | ! [X661] : (((~p14(X661) | ~p15(X661)) & (p14(X661) | p15(X661))) | ~r1(X660,X661))) | ~r1(X658,X659)))) | ~r1(X655,X656))) | ~r1(X653,X654)) | ~r1(X652,X653)) | ~r1(X651,X652)))) | ~r1(X648,X649))) | ~r1(X646,X647)) | ~r1(X502,X646)))) & ? [X662] : (~p16(X662) & r1(X501,X662)) & ! [X663] : (~r1(X501,X663) | ! [X664] : (! [X665] : (~r1(X664,X665) | ! [X666] : (! [X667] : (! [X668] : (! [X669] : (~r1(X668,X669) | ! [X670] : (! [X671] : (~r1(X670,X671) | ! [X672] : (! [X673] : (~r1(X672,X673) | ! [X674] : (! [X675] : (! [X676] : (! [X677] : (! [X678] : (~r1(X677,X678) | ! [X679] : (~r1(X678,X679) | ((~p15(X679) | ~p16(X679)) & (p16(X679) | p15(X679))))) | ~r1(X676,X677)) | ~r1(X675,X676)) | ~r1(X674,X675)) | ~r1(X673,X674))) | ~r1(X671,X672))) | ~r1(X669,X670))) | ~r1(X667,X668)) | ~r1(X666,X667)) | ~r1(X665,X666))) | ~r1(X663,X664))))))) & ? [X680] : (~p18(X680) & r1(X461,X680))) | ~r1(X459,X461)) & ! [X681] : (! [X682] : (~r1(X681,X682) | ! [X683] : (! [X684] : (~r1(X683,X684) | ! [X685] : (~r1(X684,X685) | ! [X686] : (! [X687] : (~r1(X686,X687) | ! [X688] : (! [X689] : (~r1(X688,X689) | ! [X690] : (~r1(X689,X690) | ! [X691] : (~r1(X690,X691) | ! [X692] : (~r1(X691,X692) | ! [X693] : (! [X694] : (! [X695] : (! [X696] : (~r1(X695,X696) | ! [X697] : (! [X698] : (! [X699] : (~r1(X698,X699) | ! [X700] : (((p18(X700) | p19(X700)) & (~p18(X700) | ~p19(X700))) | ~r1(X699,X700))) | ~r1(X697,X698)) | ~r1(X696,X697))) | ~r1(X694,X695)) | ~r1(X693,X694)) | ~r1(X692,X693)))))) | ~r1(X687,X688))) | ~r1(X685,X686)))) | ~r1(X682,X683))) | ~r1(X459,X681))) | ~r1(X457,X459)) & ! [X701] : (! [X702] : (! [X703] : (~r1(X702,X703) | ! [X704] : (! [X705] : (! [X706] : (! [X707] : (! [X708] : (~r1(X707,X708) | ! [X709] : (! [X710] : (! [X711] : (! [X712] : (~r1(X711,X712) | ! [X713] : (~r1(X712,X713) | ! [X714] : (! [X715] : (~r1(X714,X715) | ! [X716] : (~r1(X715,X716) | ! [X717] : (~r1(X716,X717) | ! [X718] : (~r1(X717,X718) | ! [X719] : (~r1(X718,X719) | ! [X720] : (! [X721] : (((~p19(X721) | ~p20(X721)) & (p19(X721) | p20(X721))) | ~r1(X720,X721)) | ~r1(X719,X720))))))) | ~r1(X713,X714)))) | ~r1(X710,X711)) | ~r1(X709,X710)) | ~r1(X708,X709))) | ~r1(X706,X707)) | ~r1(X705,X706)) | ~r1(X704,X705)) | ~r1(X703,X704))) | ~r1(X701,X702)) | ~r1(X457,X701))) | ~r1(X455,X457)) & ! [X722] : (~r1(X455,X722) | ! [X723] : (~r1(X722,X723) | ! [X724] : (! [X725] : (~r1(X724,X725) | ! [X726] : (! [X727] : (~r1(X726,X727) | ! [X728] : (! [X729] : (! [X730] : (~r1(X729,X730) | ! [X731] : (! [X732] : (~r1(X731,X732) | ! [X733] : (! [X734] : (! [X735] : (~r1(X734,X735) | ! [X736] : (~r1(X735,X736) | ! [X737] : (! [X738] : (! [X739] : (~r1(X738,X739) | ! [X740] : (! [X741] : (~r1(X740,X741) | ! [X742] : (! [X743] : (((~p21(X743) | ~p20(X743)) & (p20(X743) | p21(X743))) | ~r1(X742,X743)) | ~r1(X741,X742))) | ~r1(X739,X740))) | ~r1(X737,X738)) | ~r1(X736,X737)))) | ~r1(X733,X734)) | ~r1(X732,X733))) | ~r1(X730,X731))) | ~r1(X728,X729)) | ~r1(X727,X728))) | ~r1(X725,X726))) | ~r1(X723,X724))))) | ~r1(X431,X455)) & ? [X744] : (~p22(X744) & r1(X431,X744)))) & ! [X745] : (! [X746] : (! [X747] : (! [X748] : (! [X749] : (! [X750] : (! [X751] : (! [X752] : (~r1(X751,X752) | ! [X753] : (! [X754] : (! [X755] : (! [X756] : (! [X757] : (~r1(X756,X757) | ! [X758] : (! [X759] : (! [X760] : (! [X761] : (! [X762] : (! [X763] : (~r1(X762,X763) | ! [X764] : (~r1(X763,X764) | ! [X765] : (~r1(X764,X765) | ! [X766] : (~r1(X765,X766) | ! [X767] : (! [X768] : (((~p22(X768) | ~p23(X768)) & (p22(X768) | p23(X768))) | ~r1(X767,X768)) | ~r1(X766,X767)))))) | ~r1(X761,X762)) | ~r1(X760,X761)) | ~r1(X759,X760)) | ~r1(X758,X759)) | ~r1(X757,X758))) | ~r1(X755,X756)) | ~r1(X754,X755)) | ~r1(X753,X754)) | ~r1(X752,X753))) | ~r1(X750,X751)) | ~r1(X749,X750)) | ~r1(X748,X749)) | ~r1(X747,X748)) | ~r1(X746,X747)) | ~r1(X745,X746)) | ~r1(X429,X745)))) & ! [X769] : (! [X770] : (~r1(X769,X770) | ! [X771] : (! [X772] : (! [X773] : (! [X774] : (! [X775] : (! [X776] : (~r1(X775,X776) | ! [X777] : (~r1(X776,X777) | ! [X778] : (! [X779] : (! [X780] : (! [X781] : (! [X782] : (! [X783] : (! [X784] : (~r1(X783,X784) | ! [X785] : (! [X786] : (! [X787] : (~r1(X786,X787) | ! [X788] : (! [X789] : (~r1(X788,X789) | ! [X790] : (! [X791] : (~r1(X790,X791) | ! [X792] : (~r1(X791,X792) | ! [X793] : (~r1(X792,X793) | ((p23(X793) | p24(X793)) & (~p24(X793) | ~p23(X793)))))) | ~r1(X789,X790))) | ~r1(X787,X788))) | ~r1(X785,X786)) | ~r1(X784,X785))) | ~r1(X782,X783)) | ~r1(X781,X782)) | ~r1(X780,X781)) | ~r1(X779,X780)) | ~r1(X778,X779)) | ~r1(X777,X778)))) | ~r1(X774,X775)) | ~r1(X773,X774)) | ~r1(X772,X773)) | ~r1(X771,X772)) | ~r1(X770,X771))) | ~r1(X427,X769))) | ~r1(X426,X427)) & ? [X794] : (~p25(X794) & r1(X426,X794)) & ! [X795] : (! [X796] : (~r1(X795,X796) | ! [X797] : (! [X798] : (~r1(X797,X798) | ! [X799] : (~r1(X798,X799) | ! [X800] : (~r1(X799,X800) | ! [X801] : (! [X802] : (~r1(X801,X802) | ! [X803] : (! [X804] : (~r1(X803,X804) | ! [X805] : (~r1(X804,X805) | ! [X806] : (~r1(X805,X806) | ! [X807] : (! [X808] : (! [X809] : (~r1(X808,X809) | ! [X810] : (! [X811] : (! [X812] : (! [X813] : (~r1(X812,X813) | ! [X814] : (~r1(X813,X814) | ! [X815] : (~r1(X814,X815) | ! [X816] : (~r1(X815,X816) | ! [X817] : (! [X818] : (~r1(X817,X818) | ! [X819] : (! [X820] : (((~p25(X820) | ~p24(X820)) & (p25(X820) | p24(X820))) | ~r1(X819,X820)) | ~r1(X818,X819))) | ~r1(X816,X817)))))) | ~r1(X811,X812)) | ~r1(X810,X811)) | ~r1(X809,X810))) | ~r1(X807,X808)) | ~r1(X806,X807))))) | ~r1(X802,X803))) | ~r1(X800,X801))))) | ~r1(X796,X797))) | ~r1(X426,X795))) | ~r1(X398,X426)) & ? [X821] : (r1(X398,X821) & ~p26(X821)))) & ! [X822] : (! [X823] : (~r1(X822,X823) | ! [X824] : (~r1(X823,X824) | ! [X825] : (~r1(X824,X825) | ! [X826] : (~r1(X825,X826) | ! [X827] : (~r1(X826,X827) | ! [X828] : (! [X829] : (! [X830] : (! [X831] : (~r1(X830,X831) | ! [X832] : (~r1(X831,X832) | ! [X833] : (~r1(X832,X833) | ! [X834] : (! [X835] : (! [X836] : (~r1(X835,X836) | ! [X837] : (! [X838] : (! [X839] : (! [X840] : (~r1(X839,X840) | ! [X841] : (~r1(X840,X841) | ! [X842] : (~r1(X841,X842) | ! [X843] : (~r1(X842,X843) | ! [X844] : (! [X845] : (! [X846] : (! [X847] : (! [X848] : (! [X849] : (~r1(X848,X849) | ((~p26(X849) | ~p27(X849)) & (p27(X849) | p26(X849)))) | ~r1(X847,X848)) | ~r1(X846,X847)) | ~r1(X845,X846)) | ~r1(X844,X845)) | ~r1(X843,X844)))))) | ~r1(X838,X839)) | ~r1(X837,X838)) | ~r1(X836,X837))) | ~r1(X834,X835)) | ~r1(X833,X834))))) | ~r1(X829,X830)) | ~r1(X828,X829)) | ~r1(X827,X828))))))) | ~r1(X396,X822))) | ~r1(X395,X396)) & ? [X850] : (~p28(X850) & r1(X395,X850)) & ! [X851] : (! [X852] : (! [X853] : (~r1(X852,X853) | ! [X854] : (! [X855] : (~r1(X854,X855) | ! [X856] : (~r1(X855,X856) | ! [X857] : (~r1(X856,X857) | ! [X858] : (! [X859] : (! [X860] : (~r1(X859,X860) | ! [X861] : (! [X862] : (! [X863] : (! [X864] : (~r1(X863,X864) | ! [X865] : (~r1(X864,X865) | ! [X866] : (~r1(X865,X866) | ! [X867] : (~r1(X866,X867) | ! [X868] : (! [X869] : (~r1(X868,X869) | ! [X870] : (! [X871] : (! [X872] : (~r1(X871,X872) | ! [X873] : (! [X874] : (~r1(X873,X874) | ! [X875] : (! [X876] : (! [X877] : (~r1(X876,X877) | ! [X878] : (! [X879] : (((p27(X879) | p28(X879)) & (~p28(X879) | ~p27(X879))) | ~r1(X878,X879)) | ~r1(X877,X878))) | ~r1(X875,X876)) | ~r1(X874,X875))) | ~r1(X872,X873))) | ~r1(X870,X871)) | ~r1(X869,X870))) | ~r1(X867,X868)))))) | ~r1(X862,X863)) | ~r1(X861,X862)) | ~r1(X860,X861))) | ~r1(X858,X859)) | ~r1(X857,X858))))) | ~r1(X853,X854))) | ~r1(X851,X852)) | ~r1(X395,X851))) | ~r1(X364,X395)) & ? [X880] : (r1(X364,X880) & ~p29(X880))) | ~r1(X362,X364)) & ! [X881] : (! [X882] : (~r1(X881,X882) | ! [X883] : (! [X884] : (! [X885] : (! [X886] : (~r1(X885,X886) | ! [X887] : (~r1(X886,X887) | ! [X888] : (~r1(X887,X888) | ! [X889] : (~r1(X888,X889) | ! [X890] : (! [X891] : (~r1(X890,X891) | ! [X892] : (! [X893] : (! [X894] : (! [X895] : (~r1(X894,X895) | ! [X896] : (! [X897] : (~r1(X896,X897) | ! [X898] : (~r1(X897,X898) | ! [X899] : (~r1(X898,X899) | ! [X900] : (~r1(X899,X900) | ! [X901] : (! [X902] : (~r1(X901,X902) | ! [X903] : (! [X904] : (! [X905] : (~r1(X904,X905) | ! [X906] : (! [X907] : (! [X908] : (! [X909] : (! [X910] : (! [X911] : (((~p30(X911) | ~p29(X911)) & (p29(X911) | p30(X911))) | ~r1(X910,X911)) | ~r1(X909,X910)) | ~r1(X908,X909)) | ~r1(X907,X908)) | ~r1(X906,X907)) | ~r1(X905,X906))) | ~r1(X903,X904)) | ~r1(X902,X903))) | ~r1(X900,X901)))))) | ~r1(X895,X896))) | ~r1(X893,X894)) | ~r1(X892,X893)) | ~r1(X891,X892))) | ~r1(X889,X890)))))) | ~r1(X884,X885)) | ~r1(X883,X884)) | ~r1(X882,X883))) | ~r1(X362,X881))) | ~r1(X328,X362))) | ~r1(X293,X328)))) & ? [X912] : (r1(X292,X912) & ~p33(X912)) & ! [X913] : (~r1(X292,X913) | ! [X914] : (~r1(X913,X914) | ! [X915] : (! [X916] : (~r1(X915,X916) | ! [X917] : (~r1(X916,X917) | ! [X918] : (~r1(X917,X918) | ! [X919] : (! [X920] : (~r1(X919,X920) | ! [X921] : (~r1(X920,X921) | ! [X922] : (! [X923] : (~r1(X922,X923) | ! [X924] : (~r1(X923,X924) | ! [X925] : (~r1(X924,X925) | ! [X926] : (! [X927] : (~r1(X926,X927) | ! [X928] : (~r1(X927,X928) | ! [X929] : (! [X930] : (! [X931] : (! [X932] : (! [X933] : (! [X934] : (! [X935] : (~r1(X934,X935) | ! [X936] : (~r1(X935,X936) | ! [X937] : (~r1(X936,X937) | ! [X938] : (! [X939] : (~r1(X938,X939) | ! [X940] : (! [X941] : (~r1(X940,X941) | ! [X942] : (~r1(X941,X942) | ! [X943] : (~r1(X942,X943) | ! [X944] : (! [X945] : (! [X946] : (((p33(X946) | p32(X946)) & (~p32(X946) | ~p33(X946))) | ~r1(X945,X946)) | ~r1(X944,X945)) | ~r1(X943,X944))))) | ~r1(X939,X940))) | ~r1(X937,X938))))) | ~r1(X933,X934)) | ~r1(X932,X933)) | ~r1(X931,X932)) | ~r1(X930,X931)) | ~r1(X929,X930)) | ~r1(X928,X929)))) | ~r1(X925,X926))))) | ~r1(X921,X922)))) | ~r1(X918,X919))))) | ~r1(X914,X915))))) | ~r1(X256,X292)) & ? [X947] : (r1(X256,X947) & ~p34(X947))) | ~r1(X255,X256)) & ? [X948] : (~p35(X948) & r1(X255,X948)) & ! [X949] : (~r1(X255,X949) | ! [X950] : (! [X951] : (~r1(X950,X951) | ! [X952] : (~r1(X951,X952) | ! [X953] : (~r1(X952,X953) | ! [X954] : (! [X955] : (! [X956] : (~r1(X955,X956) | ! [X957] : (! [X958] : (! [X959] : (~r1(X958,X959) | ! [X960] : (~r1(X959,X960) | ! [X961] : (! [X962] : (! [X963] : (! [X964] : (! [X965] : (~r1(X964,X965) | ! [X966] : (! [X967] : (! [X968] : (~r1(X967,X968) | ! [X969] : (! [X970] : (! [X971] : (~r1(X970,X971) | ! [X972] : (! [X973] : (~r1(X972,X973) | ! [X974] : (! [X975] : (! [X976] : (~r1(X975,X976) | ! [X977] : (! [X978] : (~r1(X977,X978) | ! [X979] : (~r1(X978,X979) | ! [X980] : (! [X981] : (~r1(X980,X981) | ! [X982] : (! [X983] : (~r1(X982,X983) | ! [X984] : (~r1(X983,X984) | ((~p34(X984) | ~p35(X984)) & (p35(X984) | p34(X984))))) | ~r1(X981,X982))) | ~r1(X979,X980)))) | ~r1(X976,X977))) | ~r1(X974,X975)) | ~r1(X973,X974))) | ~r1(X971,X972))) | ~r1(X969,X970)) | ~r1(X968,X969))) | ~r1(X966,X967)) | ~r1(X965,X966))) | ~r1(X963,X964)) | ~r1(X962,X963)) | ~r1(X961,X962)) | ~r1(X960,X961)))) | ~r1(X957,X958)) | ~r1(X956,X957))) | ~r1(X954,X955)) | ~r1(X953,X954))))) | ~r1(X949,X950)))) | ~r1(X254,X255)) & ? [X985] : (r1(X254,X985) & ~p36(X985)) & ! [X986] : (! [X987] : (~r1(X986,X987) | ! [X988] : (~r1(X987,X988) | ! [X989] : (~r1(X988,X989) | ! [X990] : (~r1(X989,X990) | ! [X991] : (! [X992] : (! [X993] : (! [X994] : (~r1(X993,X994) | ! [X995] : (! [X996] : (~r1(X995,X996) | ! [X997] : (! [X998] : (~r1(X997,X998) | ! [X999] : (~r1(X998,X999) | ! [X1000] : (~r1(X999,X1000) | ! [X1001] : (! [X1002] : (! [X1003] : (~r1(X1002,X1003) | ! [X1004] : (! [X1005] : (! [X1006] : (~r1(X1005,X1006) | ! [X1007] : (~r1(X1006,X1007) | ! [X1008] : (~r1(X1007,X1008) | ! [X1009] : (! [X1010] : (! [X1011] : (~r1(X1010,X1011) | ! [X1012] : (~r1(X1011,X1012) | ! [X1013] : (~r1(X1012,X1013) | ! [X1014] : (! [X1015] : (~r1(X1014,X1015) | ! [X1016] : (~r1(X1015,X1016) | ! [X1017] : (! [X1018] : (! [X1019] : (~r1(X1018,X1019) | ! [X1020] : (~r1(X1019,X1020) | ! [X1021] : (! [X1022] : (((~p36(X1022) | ~p35(X1022)) & (p35(X1022) | p36(X1022))) | ~r1(X1021,X1022)) | ~r1(X1020,X1021)))) | ~r1(X1017,X1018)) | ~r1(X1016,X1017)))) | ~r1(X1013,X1014))))) | ~r1(X1009,X1010)) | ~r1(X1008,X1009))))) | ~r1(X1004,X1005)) | ~r1(X1003,X1004))) | ~r1(X1001,X1002)) | ~r1(X1000,X1001))))) | ~r1(X996,X997))) | ~r1(X994,X995))) | ~r1(X992,X993)) | ~r1(X991,X992)) | ~r1(X990,X991)))))) | ~r1(X254,X986)))))) & ? [X1023] : (r1(X213,X1023) & ~p38(X1023)) & ! [X1024] : (~r1(X213,X1024) | ! [X1025] : (~r1(X1024,X1025) | ! [X1026] : (! [X1027] : (! [X1028] : (~r1(X1027,X1028) | ! [X1029] : (~r1(X1028,X1029) | ! [X1030] : (~r1(X1029,X1030) | ! [X1031] : (! [X1032] : (~r1(X1031,X1032) | ! [X1033] : (~r1(X1032,X1033) | ! [X1034] : (~r1(X1033,X1034) | ! [X1035] : (! [X1036] : (~r1(X1035,X1036) | ! [X1037] : (! [X1038] : (! [X1039] : (~r1(X1038,X1039) | ! [X1040] : (~r1(X1039,X1040) | ! [X1041] : (! [X1042] : (~r1(X1041,X1042) | ! [X1043] : (~r1(X1042,X1043) | ! [X1044] : (~r1(X1043,X1044) | ! [X1045] : (~r1(X1044,X1045) | ! [X1046] : (! [X1047] : (! [X1048] : (~r1(X1047,X1048) | ! [X1049] : (! [X1050] : (! [X1051] : (~r1(X1050,X1051) | ! [X1052] : (~r1(X1051,X1052) | ! [X1053] : (! [X1054] : (~r1(X1053,X1054) | ! [X1055] : (~r1(X1054,X1055) | ! [X1056] : (~r1(X1055,X1056) | ! [X1057] : (! [X1058] : (! [X1059] : (~r1(X1058,X1059) | ! [X1060] : (! [X1061] : (! [X1062] : (~r1(X1061,X1062) | ((p37(X1062) | p38(X1062)) & (~p38(X1062) | ~p37(X1062)))) | ~r1(X1060,X1061)) | ~r1(X1059,X1060))) | ~r1(X1057,X1058)) | ~r1(X1056,X1057))))) | ~r1(X1052,X1053)))) | ~r1(X1049,X1050)) | ~r1(X1048,X1049))) | ~r1(X1046,X1047)) | ~r1(X1045,X1046)))))) | ~r1(X1040,X1041)))) | ~r1(X1037,X1038)) | ~r1(X1036,X1037))) | ~r1(X1034,X1035))))) | ~r1(X1030,X1031))))) | ~r1(X1026,X1027)) | ~r1(X1025,X1026)))))) & ? [X1063] : (r1(X212,X1063) & ~p39(X1063)) & ! [X1064] : (! [X1065] : (~r1(X1064,X1065) | ! [X1066] : (! [X1067] : (! [X1068] : (! [X1069] : (~r1(X1068,X1069) | ! [X1070] : (! [X1071] : (~r1(X1070,X1071) | ! [X1072] : (! [X1073] : (~r1(X1072,X1073) | ! [X1074] : (~r1(X1073,X1074) | ! [X1075] : (! [X1076] : (! [X1077] : (~r1(X1076,X1077) | ! [X1078] : (! [X1079] : (! [X1080] : (! [X1081] : (! [X1082] : (! [X1083] : (! [X1084] : (! [X1085] : (! [X1086] : (! [X1087] : (! [X1088] : (! [X1089] : (~r1(X1088,X1089) | ! [X1090] : (! [X1091] : (! [X1092] : (~r1(X1091,X1092) | ! [X1093] : (~r1(X1092,X1093) | ! [X1094] : (~r1(X1093,X1094) | ! [X1095] : (~r1(X1094,X1095) | ! [X1096] : (~r1(X1095,X1096) | ! [X1097] : (! [X1098] : (! [X1099] : (~r1(X1098,X1099) | ! [X1100] : (~r1(X1099,X1100) | ! [X1101] : (! [X1102] : (~r1(X1101,X1102) | ! [X1103] : (((p39(X1103) | p38(X1103)) & (~p38(X1103) | ~p39(X1103))) | ~r1(X1102,X1103))) | ~r1(X1100,X1101)))) | ~r1(X1097,X1098)) | ~r1(X1096,X1097))))))) | ~r1(X1090,X1091)) | ~r1(X1089,X1090))) | ~r1(X1087,X1088)) | ~r1(X1086,X1087)) | ~r1(X1085,X1086)) | ~r1(X1084,X1085)) | ~r1(X1083,X1084)) | ~r1(X1082,X1083)) | ~r1(X1081,X1082)) | ~r1(X1080,X1081)) | ~r1(X1079,X1080)) | ~r1(X1078,X1079)) | ~r1(X1077,X1078))) | ~r1(X1075,X1076)) | ~r1(X1074,X1075)))) | ~r1(X1071,X1072))) | ~r1(X1069,X1070))) | ~r1(X1067,X1068)) | ~r1(X1066,X1067)) | ~r1(X1065,X1066))) | ~r1(X212,X1064)))) & ? [X1104] : (r1(X170,X1104) & ~p40(X1104)))) & ! [X1105] : (~r1(X168,X1105) | ! [X1106] : (~r1(X1105,X1106) | ! [X1107] : (~r1(X1106,X1107) | ! [X1108] : (~r1(X1107,X1108) | ! [X1109] : (~r1(X1108,X1109) | ! [X1110] : (~r1(X1109,X1110) | ! [X1111] : (! [X1112] : (~r1(X1111,X1112) | ! [X1113] : (! [X1114] : (~r1(X1113,X1114) | ! [X1115] : (~r1(X1114,X1115) | ! [X1116] : (~r1(X1115,X1116) | ! [X1117] : (! [X1118] : (! [X1119] : (~r1(X1118,X1119) | ! [X1120] : (~r1(X1119,X1120) | ! [X1121] : (~r1(X1120,X1121) | ! [X1122] : (~r1(X1121,X1122) | ! [X1123] : (! [X1124] : (! [X1125] : (! [X1126] : (~r1(X1125,X1126) | ! [X1127] : (! [X1128] : (! [X1129] : (~r1(X1128,X1129) | ! [X1130] : (~r1(X1129,X1130) | ! [X1131] : (! [X1132] : (~r1(X1131,X1132) | ! [X1133] : (! [X1134] : (! [X1135] : (~r1(X1134,X1135) | ! [X1136] : (! [X1137] : (! [X1138] : (! [X1139] : (~r1(X1138,X1139) | ! [X1140] : (! [X1141] : (! [X1142] : (~r1(X1141,X1142) | ! [X1143] : (! [X1144] : (~r1(X1143,X1144) | ! [X1145] : (~r1(X1144,X1145) | ! [X1146] : (((p40(X1146) | p41(X1146)) & (~p41(X1146) | ~p40(X1146))) | ~r1(X1145,X1146)))) | ~r1(X1142,X1143))) | ~r1(X1140,X1141)) | ~r1(X1139,X1140))) | ~r1(X1137,X1138)) | ~r1(X1136,X1137)) | ~r1(X1135,X1136))) | ~r1(X1133,X1134)) | ~r1(X1132,X1133))) | ~r1(X1130,X1131)))) | ~r1(X1127,X1128)) | ~r1(X1126,X1127))) | ~r1(X1124,X1125)) | ~r1(X1123,X1124)) | ~r1(X1122,X1123)))))) | ~r1(X1117,X1118)) | ~r1(X1116,X1117))))) | ~r1(X1112,X1113))) | ~r1(X1110,X1111))))))))))) | ~r1(X121,X123)) & ! [X1147] : (~r1(X121,X1147) | ! [X1148] : (! [X1149] : (~r1(X1148,X1149) | ! [X1150] : (! [X1151] : (! [X1152] : (~r1(X1151,X1152) | ! [X1153] : (! [X1154] : (! [X1155] : (~r1(X1154,X1155) | ! [X1156] : (! [X1157] : (! [X1158] : (~r1(X1157,X1158) | ! [X1159] : (~r1(X1158,X1159) | ! [X1160] : (~r1(X1159,X1160) | ! [X1161] : (! [X1162] : (~r1(X1161,X1162) | ! [X1163] : (~r1(X1162,X1163) | ! [X1164] : (~r1(X1163,X1164) | ! [X1165] : (~r1(X1164,X1165) | ! [X1166] : (! [X1167] : (~r1(X1166,X1167) | ! [X1168] : (! [X1169] : (~r1(X1168,X1169) | ! [X1170] : (~r1(X1169,X1170) | ! [X1171] : (! [X1172] : (~r1(X1171,X1172) | ! [X1173] : (! [X1174] : (~r1(X1173,X1174) | ! [X1175] : (! [X1176] : (! [X1177] : (~r1(X1176,X1177) | ! [X1178] : (~r1(X1177,X1178) | ! [X1179] : (~r1(X1178,X1179) | ! [X1180] : (! [X1181] : (! [X1182] : (! [X1183] : (! [X1184] : (~r1(X1183,X1184) | ! [X1185] : (! [X1186] : (~r1(X1185,X1186) | ! [X1187] : (~r1(X1186,X1187) | ! [X1188] : (! [X1189] : (~r1(X1188,X1189) | ! [X1190] : (~r1(X1189,X1190) | ((~p43(X1190) | ~p42(X1190)) & (p43(X1190) | p42(X1190))))) | ~r1(X1187,X1188)))) | ~r1(X1184,X1185))) | ~r1(X1182,X1183)) | ~r1(X1181,X1182)) | ~r1(X1180,X1181)) | ~r1(X1179,X1180))))) | ~r1(X1175,X1176)) | ~r1(X1174,X1175))) | ~r1(X1172,X1173))) | ~r1(X1170,X1171)))) | ~r1(X1167,X1168))) | ~r1(X1165,X1166)))))) | ~r1(X1160,X1161))))) | ~r1(X1156,X1157)) | ~r1(X1155,X1156))) | ~r1(X1153,X1154)) | ~r1(X1152,X1153))) | ~r1(X1150,X1151)) | ~r1(X1149,X1150))) | ~r1(X1147,X1148))))) & ! [X1191] : (~r1(X119,X1191) | ! [X1192] : (~r1(X1191,X1192) | ! [X1193] : (~r1(X1192,X1193) | ! [X1194] : (! [X1195] : (~r1(X1194,X1195) | ! [X1196] : (! [X1197] : (~r1(X1196,X1197) | ! [X1198] : (~r1(X1197,X1198) | ! [X1199] : (! [X1200] : (! [X1201] : (~r1(X1200,X1201) | ! [X1202] : (~r1(X1201,X1202) | ! [X1203] : (~r1(X1202,X1203) | ! [X1204] : (~r1(X1203,X1204) | ! [X1205] : (~r1(X1204,X1205) | ! [X1206] : (~r1(X1205,X1206) | ! [X1207] : (! [X1208] : (! [X1209] : (! [X1210] : (! [X1211] : (! [X1212] : (~r1(X1211,X1212) | ! [X1213] : (! [X1214] : (! [X1215] : (! [X1216] : (~r1(X1215,X1216) | ! [X1217] : (~r1(X1216,X1217) | ! [X1218] : (~r1(X1217,X1218) | ! [X1219] : (! [X1220] : (~r1(X1219,X1220) | ! [X1221] : (! [X1222] : (~r1(X1221,X1222) | ! [X1223] : (~r1(X1222,X1223) | ! [X1224] : (! [X1225] : (~r1(X1224,X1225) | ! [X1226] : (! [X1227] : (! [X1228] : (~r1(X1227,X1228) | ! [X1229] : (! [X1230] : (~r1(X1229,X1230) | ! [X1231] : (~r1(X1230,X1231) | ! [X1232] : (! [X1233] : (! [X1234] : (! [X1235] : (~r1(X1234,X1235) | ((~p43(X1235) | ~p44(X1235)) & (p43(X1235) | p44(X1235)))) | ~r1(X1233,X1234)) | ~r1(X1232,X1233)) | ~r1(X1231,X1232)))) | ~r1(X1228,X1229))) | ~r1(X1226,X1227)) | ~r1(X1225,X1226))) | ~r1(X1223,X1224)))) | ~r1(X1220,X1221))) | ~r1(X1218,X1219))))) | ~r1(X1214,X1215)) | ~r1(X1213,X1214)) | ~r1(X1212,X1213))) | ~r1(X1210,X1211)) | ~r1(X1209,X1210)) | ~r1(X1208,X1209)) | ~r1(X1207,X1208)) | ~r1(X1206,X1207)))))))) | ~r1(X1199,X1200)) | ~r1(X1198,X1199)))) | ~r1(X1195,X1196))) | ~r1(X1193,X1194)))))) | ~r1(X117,X119)) & ! [X1236] : (~r1(X117,X1236) | ! [X1237] : (! [X1238] : (! [X1239] : (~r1(X1238,X1239) | ! [X1240] : (~r1(X1239,X1240) | ! [X1241] : (~r1(X1240,X1241) | ! [X1242] : (~r1(X1241,X1242) | ! [X1243] : (~r1(X1242,X1243) | ! [X1244] : (~r1(X1243,X1244) | ! [X1245] : (~r1(X1244,X1245) | ! [X1246] : (! [X1247] : (! [X1248] : (~r1(X1247,X1248) | ! [X1249] : (! [X1250] : (~r1(X1249,X1250) | ! [X1251] : (! [X1252] : (! [X1253] : (! [X1254] : (~r1(X1253,X1254) | ! [X1255] : (! [X1256] : (! [X1257] : (! [X1258] : (~r1(X1257,X1258) | ! [X1259] : (! [X1260] : (! [X1261] : (~r1(X1260,X1261) | ! [X1262] : (! [X1263] : (! [X1264] : (~r1(X1263,X1264) | ! [X1265] : (~r1(X1264,X1265) | ! [X1266] : (! [X1267] : (! [X1268] : (~r1(X1267,X1268) | ! [X1269] : (~r1(X1268,X1269) | ! [X1270] : (~r1(X1269,X1270) | ! [X1271] : (~r1(X1270,X1271) | ! [X1272] : (~r1(X1271,X1272) | ! [X1273] : (! [X1274] : (~r1(X1273,X1274) | ! [X1275] : (~r1(X1274,X1275) | ! [X1276] : (~r1(X1275,X1276) | ! [X1277] : (! [X1278] : (! [X1279] : (~r1(X1278,X1279) | ! [X1280] : (! [X1281] : (~r1(X1280,X1281) | ((p45(X1281) | p44(X1281)) & (~p44(X1281) | ~p45(X1281)))) | ~r1(X1279,X1280))) | ~r1(X1277,X1278)) | ~r1(X1276,X1277))))) | ~r1(X1272,X1273))))))) | ~r1(X1266,X1267)) | ~r1(X1265,X1266)))) | ~r1(X1262,X1263)) | ~r1(X1261,X1262))) | ~r1(X1259,X1260)) | ~r1(X1258,X1259))) | ~r1(X1256,X1257)) | ~r1(X1255,X1256)) | ~r1(X1254,X1255))) | ~r1(X1252,X1253)) | ~r1(X1251,X1252)) | ~r1(X1250,X1251))) | ~r1(X1248,X1249))) | ~r1(X1246,X1247)) | ~r1(X1245,X1246))))))))) | ~r1(X1237,X1238)) | ~r1(X1236,X1237)))) | ~r1(X115,X117)) & ! [X1282] : (~r1(X115,X1282) | ! [X1283] : (~r1(X1282,X1283) | ! [X1284] : (! [X1285] : (~r1(X1284,X1285) | ! [X1286] : (! [X1287] : (! [X1288] : (! [X1289] : (! [X1290] : (~r1(X1289,X1290) | ! [X1291] : (~r1(X1290,X1291) | ! [X1292] : (! [X1293] : (~r1(X1292,X1293) | ! [X1294] : (! [X1295] : (~r1(X1294,X1295) | ! [X1296] : (~r1(X1295,X1296) | ! [X1297] : (~r1(X1296,X1297) | ! [X1298] : (! [X1299] : (! [X1300] : (~r1(X1299,X1300) | ! [X1301] : (~r1(X1300,X1301) | ! [X1302] : (~r1(X1301,X1302) | ! [X1303] : (! [X1304] : (~r1(X1303,X1304) | ! [X1305] : (~r1(X1304,X1305) | ! [X1306] : (~r1(X1305,X1306) | ! [X1307] : (! [X1308] : (~r1(X1307,X1308) | ! [X1309] : (~r1(X1308,X1309) | ! [X1310] : (~r1(X1309,X1310) | ! [X1311] : (! [X1312] : (! [X1313] : (~r1(X1312,X1313) | ! [X1314] : (~r1(X1313,X1314) | ! [X1315] : (! [X1316] : (~r1(X1315,X1316) | ! [X1317] : (! [X1318] : (! [X1319] : (! [X1320] : (! [X1321] : (! [X1322] : (~r1(X1321,X1322) | ! [X1323] : (~r1(X1322,X1323) | ! [X1324] : (! [X1325] : (~r1(X1324,X1325) | ! [X1326] : (~r1(X1325,X1326) | ! [X1327] : (~r1(X1326,X1327) | ! [X1328] : (((p46(X1328) | p45(X1328)) & (~p46(X1328) | ~p45(X1328))) | ~r1(X1327,X1328))))) | ~r1(X1323,X1324)))) | ~r1(X1320,X1321)) | ~r1(X1319,X1320)) | ~r1(X1318,X1319)) | ~r1(X1317,X1318)) | ~r1(X1316,X1317))) | ~r1(X1314,X1315)))) | ~r1(X1311,X1312)) | ~r1(X1310,X1311))))) | ~r1(X1306,X1307))))) | ~r1(X1302,X1303))))) | ~r1(X1298,X1299)) | ~r1(X1297,X1298))))) | ~r1(X1293,X1294))) | ~r1(X1291,X1292)))) | ~r1(X1288,X1289)) | ~r1(X1287,X1288)) | ~r1(X1286,X1287)) | ~r1(X1285,X1286))) | ~r1(X1283,X1284))))) | ~r1(X113,X115)) & ! [X1329] : (! [X1330] : (~r1(X1329,X1330) | ! [X1331] : (~r1(X1330,X1331) | ! [X1332] : (~r1(X1331,X1332) | ! [X1333] : (! [X1334] : (~r1(X1333,X1334) | ! [X1335] : (~r1(X1334,X1335) | ! [X1336] : (~r1(X1335,X1336) | ! [X1337] : (~r1(X1336,X1337) | ! [X1338] : (~r1(X1337,X1338) | ! [X1339] : (~r1(X1338,X1339) | ! [X1340] : (! [X1341] : (~r1(X1340,X1341) | ! [X1342] : (! [X1343] : (~r1(X1342,X1343) | ! [X1344] : (! [X1345] : (! [X1346] : (~r1(X1345,X1346) | ! [X1347] : (~r1(X1346,X1347) | ! [X1348] : (! [X1349] : (~r1(X1348,X1349) | ! [X1350] : (! [X1351] : (! [X1352] : (~r1(X1351,X1352) | ! [X1353] : (~r1(X1352,X1353) | ! [X1354] : (! [X1355] : (~r1(X1354,X1355) | ! [X1356] : (! [X1357] : (~r1(X1356,X1357) | ! [X1358] : (~r1(X1357,X1358) | ! [X1359] : (! [X1360] : (! [X1361] : (! [X1362] : (~r1(X1361,X1362) | ! [X1363] : (! [X1364] : (~r1(X1363,X1364) | ! [X1365] : (! [X1366] : (~r1(X1365,X1366) | ! [X1367] : (~r1(X1366,X1367) | ! [X1368] : (~r1(X1367,X1368) | ! [X1369] : (! [X1370] : (~r1(X1369,X1370) | ! [X1371] : (~r1(X1370,X1371) | ! [X1372] : (~r1(X1371,X1372) | ! [X1373] : (~r1(X1372,X1373) | ! [X1374] : (~r1(X1373,X1374) | ! [X1375] : (~r1(X1374,X1375) | ! [X1376] : (((~p47(X1376) | ~p46(X1376)) & (p46(X1376) | p47(X1376))) | ~r1(X1375,X1376)))))))) | ~r1(X1368,X1369))))) | ~r1(X1364,X1365))) | ~r1(X1362,X1363))) | ~r1(X1360,X1361)) | ~r1(X1359,X1360)) | ~r1(X1358,X1359)))) | ~r1(X1355,X1356))) | ~r1(X1353,X1354)))) | ~r1(X1350,X1351)) | ~r1(X1349,X1350))) | ~r1(X1347,X1348)))) | ~r1(X1344,X1345)) | ~r1(X1343,X1344))) | ~r1(X1341,X1342))) | ~r1(X1339,X1340)))))))) | ~r1(X1332,X1333))))) | ~r1(X113,X1329))) | ~r1(X112,X113)) & ? [X1377] : (~p48(X1377) & r1(X112,X1377)) & ! [X1378] : (! [X1379] : (! [X1380] : (! [X1381] : (~r1(X1380,X1381) | ! [X1382] : (~r1(X1381,X1382) | ! [X1383] : (! [X1384] : (~r1(X1383,X1384) | ! [X1385] : (! [X1386] : (~r1(X1385,X1386) | ! [X1387] : (~r1(X1386,X1387) | ! [X1388] : (! [X1389] : (~r1(X1388,X1389) | ! [X1390] : (~r1(X1389,X1390) | ! [X1391] : (~r1(X1390,X1391) | ! [X1392] : (! [X1393] : (! [X1394] : (~r1(X1393,X1394) | ! [X1395] : (! [X1396] : (! [X1397] : (~r1(X1396,X1397) | ! [X1398] : (! [X1399] : (~r1(X1398,X1399) | ! [X1400] : (! [X1401] : (~r1(X1400,X1401) | ! [X1402] : (~r1(X1401,X1402) | ! [X1403] : (! [X1404] : (~r1(X1403,X1404) | ! [X1405] : (! [X1406] : (! [X1407] : (~r1(X1406,X1407) | ! [X1408] : (! [X1409] : (~r1(X1408,X1409) | ! [X1410] : (! [X1411] : (! [X1412] : (! [X1413] : (~r1(X1412,X1413) | ! [X1414] : (~r1(X1413,X1414) | ! [X1415] : (! [X1416] : (! [X1417] : (! [X1418] : (~r1(X1417,X1418) | ! [X1419] : (~r1(X1418,X1419) | ! [X1420] : (~r1(X1419,X1420) | ! [X1421] : (~r1(X1420,X1421) | ! [X1422] : (! [X1423] : (! [X1424] : (! [X1425] : (~r1(X1424,X1425) | ! [X1426] : (((p47(X1426) | p48(X1426)) & (~p48(X1426) | ~p47(X1426))) | ~r1(X1425,X1426))) | ~r1(X1423,X1424)) | ~r1(X1422,X1423)) | ~r1(X1421,X1422)))))) | ~r1(X1416,X1417)) | ~r1(X1415,X1416)) | ~r1(X1414,X1415)))) | ~r1(X1411,X1412)) | ~r1(X1410,X1411)) | ~r1(X1409,X1410))) | ~r1(X1407,X1408))) | ~r1(X1405,X1406)) | ~r1(X1404,X1405))) | ~r1(X1402,X1403)))) | ~r1(X1399,X1400))) | ~r1(X1397,X1398))) | ~r1(X1395,X1396)) | ~r1(X1394,X1395))) | ~r1(X1392,X1393)) | ~r1(X1391,X1392))))) | ~r1(X1387,X1388)))) | ~r1(X1384,X1385))) | ~r1(X1382,X1383)))) | ~r1(X1379,X1380)) | ~r1(X1378,X1379)) | ~r1(X112,X1378))) | ~r1(X111,X112)) & ? [X1427] : (~p49(X1427) & r1(X111,X1427)) & ! [X1428] : (! [X1429] : (! [X1430] : (~r1(X1429,X1430) | ! [X1431] : (~r1(X1430,X1431) | ! [X1432] : (~r1(X1431,X1432) | ! [X1433] : (! [X1434] : (~r1(X1433,X1434) | ! [X1435] : (~r1(X1434,X1435) | ! [X1436] : (! [X1437] : (~r1(X1436,X1437) | ! [X1438] : (~r1(X1437,X1438) | ! [X1439] : (~r1(X1438,X1439) | ! [X1440] : (~r1(X1439,X1440) | ! [X1441] : (! [X1442] : (~r1(X1441,X1442) | ! [X1443] : (~r1(X1442,X1443) | ! [X1444] : (~r1(X1443,X1444) | ! [X1445] : (~r1(X1444,X1445) | ! [X1446] : (! [X1447] : (~r1(X1446,X1447) | ! [X1448] : (~r1(X1447,X1448) | ! [X1449] : (~r1(X1448,X1449) | ! [X1450] : (! [X1451] : (! [X1452] : (~r1(X1451,X1452) | ! [X1453] : (! [X1454] : (~r1(X1453,X1454) | ! [X1455] : (~r1(X1454,X1455) | ! [X1456] : (~r1(X1455,X1456) | ! [X1457] : (~r1(X1456,X1457) | ! [X1458] : (! [X1459] : (! [X1460] : (! [X1461] : (~r1(X1460,X1461) | ! [X1462] : (! [X1463] : (! [X1464] : (! [X1465] : (! [X1466] : (~r1(X1465,X1466) | ! [X1467] : (~r1(X1466,X1467) | ! [X1468] : (~r1(X1467,X1468) | ! [X1469] : (~r1(X1468,X1469) | ! [X1470] : (! [X1471] : (! [X1472] : (~r1(X1471,X1472) | ! [X1473] : (! [X1474] : (! [X1475] : (! [X1476] : (! [X1477] : (~r1(X1476,X1477) | ((~p49(X1477) | ~p48(X1477)) & (p49(X1477) | p48(X1477)))) | ~r1(X1475,X1476)) | ~r1(X1474,X1475)) | ~r1(X1473,X1474)) | ~r1(X1472,X1473))) | ~r1(X1470,X1471)) | ~r1(X1469,X1470)))))) | ~r1(X1464,X1465)) | ~r1(X1463,X1464)) | ~r1(X1462,X1463)) | ~r1(X1461,X1462))) | ~r1(X1459,X1460)) | ~r1(X1458,X1459)) | ~r1(X1457,X1458)))))) | ~r1(X1452,X1453))) | ~r1(X1450,X1451)) | ~r1(X1449,X1450))))) | ~r1(X1445,X1446)))))) | ~r1(X1440,X1441)))))) | ~r1(X1435,X1436)))) | ~r1(X1432,X1433))))) | ~r1(X1428,X1429)) | ~r1(X111,X1428))) | ~r1(X109,X111)) & ! [X1478] : (~r1(X109,X1478) | ! [X1479] : (! [X1480] : (! [X1481] : (! [X1482] : (! [X1483] : (~r1(X1482,X1483) | ! [X1484] : (! [X1485] : (~r1(X1484,X1485) | ! [X1486] : (! [X1487] : (! [X1488] : (~r1(X1487,X1488) | ! [X1489] : (~r1(X1488,X1489) | ! [X1490] : (~r1(X1489,X1490) | ! [X1491] : (~r1(X1490,X1491) | ! [X1492] : (~r1(X1491,X1492) | ! [X1493] : (! [X1494] : (~r1(X1493,X1494) | ! [X1495] : (~r1(X1494,X1495) | ! [X1496] : (! [X1497] : (! [X1498] : (! [X1499] : (! [X1500] : (! [X1501] : (~r1(X1500,X1501) | ! [X1502] : (! [X1503] : (~r1(X1502,X1503) | ! [X1504] : (~r1(X1503,X1504) | ! [X1505] : (! [X1506] : (! [X1507] : (! [X1508] : (! [X1509] : (~r1(X1508,X1509) | ! [X1510] : (~r1(X1509,X1510) | ! [X1511] : (~r1(X1510,X1511) | ! [X1512] : (~r1(X1511,X1512) | ! [X1513] : (~r1(X1512,X1513) | ! [X1514] : (! [X1515] : (! [X1516] : (~r1(X1515,X1516) | ! [X1517] : (~r1(X1516,X1517) | ! [X1518] : (~r1(X1517,X1518) | ! [X1519] : (! [X1520] : (! [X1521] : (! [X1522] : (! [X1523] : (! [X1524] : (! [X1525] : (~r1(X1524,X1525) | ! [X1526] : (~r1(X1525,X1526) | ! [X1527] : (~r1(X1526,X1527) | ! [X1528] : (((p49(X1528) | p50(X1528)) & (~p49(X1528) | ~p50(X1528))) | ~r1(X1527,X1528))))) | ~r1(X1523,X1524)) | ~r1(X1522,X1523)) | ~r1(X1521,X1522)) | ~r1(X1520,X1521)) | ~r1(X1519,X1520)) | ~r1(X1518,X1519))))) | ~r1(X1514,X1515)) | ~r1(X1513,X1514))))))) | ~r1(X1507,X1508)) | ~r1(X1506,X1507)) | ~r1(X1505,X1506)) | ~r1(X1504,X1505)))) | ~r1(X1501,X1502))) | ~r1(X1499,X1500)) | ~r1(X1498,X1499)) | ~r1(X1497,X1498)) | ~r1(X1496,X1497)) | ~r1(X1495,X1496)))) | ~r1(X1492,X1493))))))) | ~r1(X1486,X1487)) | ~r1(X1485,X1486))) | ~r1(X1483,X1484))) | ~r1(X1481,X1482)) | ~r1(X1480,X1481)) | ~r1(X1479,X1480)) | ~r1(X1478,X1479)))) | ~r1(X56,X109)) & ? [X1529] : (r1(X56,X1529) & ~p51(X1529))) | ~r1(X1,X56))) | ~r1(X0,X1)) & ? [X1530] : (? [X1531] : (r1(X1530,X1531) & ? [X1532] : (? [X1533] : (r1(X1532,X1533) & ? [X1534] : (r1(X1533,X1534) & ? [X1535] : (r1(X1534,X1535) & ? [X1536] : (r1(X1535,X1536) & ? [X1537] : (r1(X1536,X1537) & ? [X1538] : (? [X1539] : (r1(X1538,X1539) & ? [X1540] : (r1(X1539,X1540) & ? [X1541] : (? [X1542] : (? [X1543] : (? [X1544] : (? [X1545] : (r1(X1544,X1545) & ? [X1546] : (? [X1547] : (r1(X1546,X1547) & ? [X1548] : (? [X1549] : (? [X1550] : (? [X1551] : (r1(X1550,X1551) & ? [X1552] : (r1(X1551,X1552) & ? [X1553] : (r1(X1552,X1553) & ? [X1554] : (r1(X1553,X1554) & ? [X1555] : (r1(X1554,X1555) & ? [X1556] : (? [X1557] : (r1(X1556,X1557) & ? [X1558] : (? [X1559] : (r1(X1558,X1559) & ? [X1560] : (r1(X1559,X1560) & ? [X1561] : (r1(X1560,X1561) & ? [X1562] : (r1(X1561,X1562) & ? [X1563] : (r1(X1562,X1563) & ? [X1564] : (? [X1565] : (? [X1566] : (? [X1567] : (? [X1568] : (? [X1569] : (? [X1570] : (r1(X1569,X1570) & ? [X1571] : (r1(X1570,X1571) & ? [X1572] : (? [X1573] : (r1(X1572,X1573) & ? [X1574] : (r1(X1573,X1574) & ? [X1575] : (r1(X1574,X1575) & ? [X1576] : (r1(X1575,X1576) & ? [X1577] : (? [X1578] : (? [X1579] : (? [X1580] : (r1(X1579,X1580) & ? [X1581] : r1(X1580,X1581)) & r1(X1578,X1579)) & r1(X1577,X1578)) & r1(X1576,X1577)))))) & r1(X1571,X1572)))) & r1(X1568,X1569)) & r1(X1567,X1568)) & r1(X1566,X1567)) & r1(X1565,X1566)) & r1(X1564,X1565)) & r1(X1563,X1564))))))) & r1(X1557,X1558))) & r1(X1555,X1556))))))) & r1(X1549,X1550)) & r1(X1548,X1549)) & r1(X1547,X1548))) & r1(X1545,X1546))) & r1(X1543,X1544)) & r1(X1542,X1543)) & r1(X1541,X1542)) & r1(X1540,X1541)))) & r1(X1537,X1538))))))) & r1(X1531,X1532))) & r1(X0,X1530)) & ? [X1582] : r1(X0,X1582) & ? [X1583] : (r1(X0,X1583) & ? [X1584] : (r1(X1583,X1584) & ? [X1585] : (r1(X1584,X1585) & ? [X1586] : (? [X1587] : (? [X1588] : (? [X1589] : (r1(X1588,X1589) & ? [X1590] : (? [X1591] : (r1(X1590,X1591) & ? [X1592] : (? [X1593] : (? [X1594] : (? [X1595] : (r1(X1594,X1595) & ? [X1596] : (? [X1597] : (? [X1598] : (r1(X1597,X1598) & ? [X1599] : (r1(X1598,X1599) & ? [X1600] : (? [X1601] : (? [X1602] : (r1(X1601,X1602) & ? [X1603] : (r1(X1602,X1603) & ? [X1604] : (r1(X1603,X1604) & ? [X1605] : (? [X1606] : (? [X1607] : (? [X1608] : (? [X1609] : (? [X1610] : (r1(X1609,X1610) & ? [X1611] : (? [X1612] : (? [X1613] : (? [X1614] : (r1(X1613,X1614) & ? [X1615] : (r1(X1614,X1615) & ? [X1616] : (r1(X1615,X1616) & ? [X1617] : (? [X1618] : (? [X1619] : (? [X1620] : (r1(X1619,X1620) & ? [X1621] : (r1(X1620,X1621) & ? [X1622] : (r1(X1621,X1622) & ? [X1623] : (? [X1624] : (? [X1625] : (? [X1626] : (? [X1627] : (r1(X1626,X1627) & ? [X1628] : (? [X1629] : (r1(X1628,X1629) & ? [X1630] : (? [X1631] : (r1(X1630,X1631) & ? [X1632] : (r1(X1631,X1632) & ? [X1633] : (r1(X1632,X1633) & ? [X1634] : r1(X1633,X1634)))) & r1(X1629,X1630))) & r1(X1627,X1628))) & r1(X1625,X1626)) & r1(X1624,X1625)) & r1(X1623,X1624)) & r1(X1622,X1623))))) & r1(X1618,X1619)) & r1(X1617,X1618)) & r1(X1616,X1617))))) & r1(X1612,X1613)) & r1(X1611,X1612)) & r1(X1610,X1611))) & r1(X1608,X1609)) & r1(X1607,X1608)) & r1(X1606,X1607)) & r1(X1605,X1606)) & r1(X1604,X1605))))) & r1(X1600,X1601)) & r1(X1599,X1600)))) & r1(X1596,X1597)) & r1(X1595,X1596))) & r1(X1593,X1594)) & r1(X1592,X1593)) & r1(X1591,X1592))) & r1(X1589,X1590))) & r1(X1587,X1588)) & r1(X1586,X1587)) & r1(X1585,X1586))))))), 23.28/23.16 inference(ennf_transformation,[],[f8])). 23.28/23.16 fof(f8,plain,( 23.28/23.16 ? [X0] : ~(~! [X1] : (~(~! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (~((p1(X54) & p51(X54)) | (~p1(X54) & ~p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ! [X55] : ~r1(X1,X55) | ~! [X56] : (~(~! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (~((~p51(X108) & ~p50(X108)) | (p50(X108) & p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) | ~! [X109] : (~(! [X110] : (p50(X110) | ~r1(X109,X110)) | ~! [X111] : (~(~! [X112] : (~(~! [X113] : (~(! [X114] : (~r1(X113,X114) | p47(X114)) | ~! [X115] : (~(! [X116] : (p46(X116) | ~r1(X115,X116)) | ~! [X117] : (~(! [X118] : (p45(X118) | ~r1(X117,X118)) | ~! [X119] : (~(! [X120] : (~r1(X119,X120) | p44(X120)) | ~! [X121] : (~r1(X119,X121) | ~(! [X122] : (p43(X122) | ~r1(X121,X122)) | ~! [X123] : (~(~! [X124] : (~r1(X123,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (! [X130] : (! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (! [X134] : (~r1(X133,X134) | ! [X135] : (~r1(X134,X135) | ! [X136] : (! [X137] : (! [X138] : (! [X139] : (! [X140] : (~r1(X139,X140) | ! [X141] : (! [X142] : (! [X143] : (! [X144] : (! [X145] : (~r1(X144,X145) | ! [X146] : (! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (! [X165] : (! [X166] : (~r1(X165,X166) | ~((~p42(X166) & ~p41(X166)) | (p42(X166) & p41(X166)))) | ~r1(X164,X165)) | ~r1(X163,X164)) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160)) | ~r1(X158,X159)))) | ~r1(X155,X156)) | ~r1(X154,X155))))))) | ~r1(X148,X149)) | ~r1(X147,X148))) | ~r1(X145,X146))) | ~r1(X143,X144)) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141))) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137)) | ~r1(X135,X136)))) | ~r1(X132,X133)) | ~r1(X131,X132))) | ~r1(X129,X130)) | ~r1(X128,X129))))))) | ! [X167] : (p42(X167) | ~r1(X123,X167)) | ~! [X168] : (~r1(X123,X168) | ~(! [X169] : (p41(X169) | ~r1(X168,X169)) | ~! [X170] : (~r1(X168,X170) | ~(~! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (! [X174] : (! [X175] : (! [X176] : (! [X177] : (! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (! [X186] : (! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (~r1(X190,X191) | ! [X192] : (! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (~r1(X195,X196) | ! [X197] : (~r1(X196,X197) | ! [X198] : (! [X199] : (! [X200] : (~r1(X199,X200) | ! [X201] : (~r1(X200,X201) | ! [X202] : (! [X203] : (~r1(X202,X203) | ! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (~r1(X205,X206) | ! [X207] : (! [X208] : (~r1(X207,X208) | ! [X209] : (! [X210] : (~r1(X209,X210) | ! [X211] : (~r1(X210,X211) | ~((~p39(X211) & ~p40(X211)) | (p39(X211) & p40(X211))))) | ~r1(X208,X209))) | ~r1(X206,X207)))) | ~r1(X203,X204))) | ~r1(X201,X202)))) | ~r1(X198,X199)) | ~r1(X197,X198))))))) | ~r1(X191,X192))) | ~r1(X189,X190)))) | ~r1(X186,X187)) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184))) | ~r1(X181,X182)) | ~r1(X180,X181))) | ~r1(X178,X179)) | ~r1(X177,X178)) | ~r1(X176,X177)) | ~r1(X175,X176)) | ~r1(X174,X175)) | ~r1(X173,X174)) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~! [X212] : (~r1(X170,X212) | ~(~! [X213] : (~r1(X212,X213) | ~(~! [X214] : (~r1(X213,X214) | ~(~! [X215] : (! [X216] : (~r1(X215,X216) | ! [X217] : (~r1(X216,X217) | ! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (! [X221] : (! [X222] : (! [X223] : (~r1(X222,X223) | ! [X224] : (~r1(X223,X224) | ! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (~r1(X233,X234) | ! [X235] : (! [X236] : (~r1(X235,X236) | ! [X237] : (~r1(X236,X237) | ! [X238] : (~r1(X237,X238) | ! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~r1(X242,X243) | ! [X244] : (! [X245] : (! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (~r1(X251,X252) | ~((p36(X252) & p37(X252)) | (~p36(X252) & ~p37(X252))))) | ~r1(X249,X250))))) | ~r1(X245,X246)) | ~r1(X244,X245)) | ~r1(X243,X244)))))))))) | ~r1(X234,X235))))) | ~r1(X230,X231)))) | ~r1(X227,X228)) | ~r1(X226,X227)) | ~r1(X225,X226))))) | ~r1(X221,X222)) | ~r1(X220,X221)) | ~r1(X219,X220)) | ~r1(X218,X219))))) | ~r1(X214,X215)) | ! [X253] : (~r1(X214,X253) | p37(X253)) | ~! [X254] : (~r1(X214,X254) | ~(~! [X255] : (~(~! [X256] : (~(~! [X257] : (~r1(X256,X257) | ! [X258] : (! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (! [X263] : (~r1(X262,X263) | ! [X264] : (! [X265] : (~r1(X264,X265) | ! [X266] : (! [X267] : (! [X268] : (! [X269] : (~r1(X268,X269) | ! [X270] : (~r1(X269,X270) | ! [X271] : (~r1(X270,X271) | ! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (! [X280] : (~r1(X279,X280) | ! [X281] : (~r1(X280,X281) | ! [X282] : (! [X283] : (! [X284] : (~r1(X283,X284) | ! [X285] : (! [X286] : (! [X287] : (! [X288] : (! [X289] : (~r1(X288,X289) | ! [X290] : (~r1(X289,X290) | ! [X291] : (~((p34(X291) & p33(X291)) | (~p33(X291) & ~p34(X291))) | ~r1(X290,X291)))) | ~r1(X287,X288)) | ~r1(X286,X287)) | ~r1(X285,X286)) | ~r1(X284,X285))) | ~r1(X282,X283)) | ~r1(X281,X282)))) | ~r1(X278,X279)))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272))))) | ~r1(X267,X268)) | ~r1(X266,X267)) | ~r1(X265,X266))) | ~r1(X263,X264))) | ~r1(X261,X262)) | ~r1(X260,X261)))) | ~r1(X257,X258))) | ~! [X292] : (~(~! [X293] : (~r1(X292,X293) | ~(~! [X294] : (~r1(X293,X294) | ! [X295] : (! [X296] : (~r1(X295,X296) | ! [X297] : (! [X298] : (! [X299] : (~r1(X298,X299) | ! [X300] : (! [X301] : (! [X302] : (~r1(X301,X302) | ! [X303] : (~r1(X302,X303) | ! [X304] : (! [X305] : (~r1(X304,X305) | ! [X306] : (! [X307] : (~r1(X306,X307) | ! [X308] : (! [X309] : (! [X310] : (! [X311] : (! [X312] : (~r1(X311,X312) | ! [X313] : (~r1(X312,X313) | ! [X314] : (~r1(X313,X314) | ! [X315] : (! [X316] : (~r1(X315,X316) | ! [X317] : (! [X318] : (! [X319] : (! [X320] : (~r1(X319,X320) | ! [X321] : (! [X322] : (! [X323] : (~r1(X322,X323) | ! [X324] : (~r1(X323,X324) | ! [X325] : (~r1(X324,X325) | ! [X326] : (~r1(X325,X326) | ~((p31(X326) & p32(X326)) | (~p32(X326) & ~p31(X326))))))) | ~r1(X321,X322)) | ~r1(X320,X321))) | ~r1(X318,X319)) | ~r1(X317,X318)) | ~r1(X316,X317))) | ~r1(X314,X315))))) | ~r1(X310,X311)) | ~r1(X309,X310)) | ~r1(X308,X309)) | ~r1(X307,X308))) | ~r1(X305,X306))) | ~r1(X303,X304)))) | ~r1(X300,X301)) | ~r1(X299,X300))) | ~r1(X297,X298)) | ~r1(X296,X297))) | ~r1(X294,X295))) | ! [X327] : (p32(X327) | ~r1(X293,X327)) | ~! [X328] : (~(~! [X329] : (! [X330] : (! [X331] : (~r1(X330,X331) | ! [X332] : (! [X333] : (~r1(X332,X333) | ! [X334] : (~r1(X333,X334) | ! [X335] : (~r1(X334,X335) | ! [X336] : (~r1(X335,X336) | ! [X337] : (! [X338] : (~r1(X337,X338) | ! [X339] : (! [X340] : (~r1(X339,X340) | ! [X341] : (! [X342] : (~r1(X341,X342) | ! [X343] : (~r1(X342,X343) | ! [X344] : (! [X345] : (~r1(X344,X345) | ! [X346] : (! [X347] : (! [X348] : (! [X349] : (! [X350] : (! [X351] : (! [X352] : (! [X353] : (! [X354] : (~r1(X353,X354) | ! [X355] : (~r1(X354,X355) | ! [X356] : (~r1(X355,X356) | ! [X357] : (! [X358] : (~r1(X357,X358) | ! [X359] : (! [X360] : (~((p31(X360) & p30(X360)) | (~p30(X360) & ~p31(X360))) | ~r1(X359,X360)) | ~r1(X358,X359))) | ~r1(X356,X357))))) | ~r1(X352,X353)) | ~r1(X351,X352)) | ~r1(X350,X351)) | ~r1(X349,X350)) | ~r1(X348,X349)) | ~r1(X347,X348)) | ~r1(X346,X347)) | ~r1(X345,X346))) | ~r1(X343,X344)))) | ~r1(X340,X341))) | ~r1(X338,X339))) | ~r1(X336,X337)))))) | ~r1(X331,X332))) | ~r1(X329,X330)) | ~r1(X328,X329)) | ! [X361] : (~r1(X328,X361) | p31(X361)) | ~! [X362] : (~(! [X363] : (p30(X363) | ~r1(X362,X363)) | ~! [X364] : (~(~! [X365] : (! [X366] : (~r1(X365,X366) | ! [X367] : (! [X368] : (! [X369] : (! [X370] : (! [X371] : (! [X372] : (~r1(X371,X372) | ! [X373] : (~r1(X372,X373) | ! [X374] : (! [X375] : (~r1(X374,X375) | ! [X376] : (! [X377] : (~r1(X376,X377) | ! [X378] : (~r1(X377,X378) | ! [X379] : (! [X380] : (~r1(X379,X380) | ! [X381] : (! [X382] : (! [X383] : (~r1(X382,X383) | ! [X384] : (~r1(X383,X384) | ! [X385] : (~r1(X384,X385) | ! [X386] : (! [X387] : (! [X388] : (! [X389] : (~r1(X388,X389) | ! [X390] : (~r1(X389,X390) | ! [X391] : (! [X392] : (! [X393] : (! [X394] : (~((~p28(X394) & ~p29(X394)) | (p28(X394) & p29(X394))) | ~r1(X393,X394)) | ~r1(X392,X393)) | ~r1(X391,X392)) | ~r1(X390,X391)))) | ~r1(X387,X388)) | ~r1(X386,X387)) | ~r1(X385,X386))))) | ~r1(X381,X382)) | ~r1(X380,X381))) | ~r1(X378,X379)))) | ~r1(X375,X376))) | ~r1(X373,X374)))) | ~r1(X370,X371)) | ~r1(X369,X370)) | ~r1(X368,X369)) | ~r1(X367,X368)) | ~r1(X366,X367))) | ~r1(X364,X365)) | ~! [X395] : (~(~! [X396] : (~(! [X397] : (~r1(X396,X397) | p27(X397)) | ~! [X398] : (~r1(X396,X398) | ~(~! [X399] : (! [X400] : (~r1(X399,X400) | ! [X401] : (! [X402] : (! [X403] : (! [X404] : (! [X405] : (~r1(X404,X405) | ! [X406] : (~r1(X405,X406) | ! [X407] : (~r1(X406,X407) | ! [X408] : (~r1(X407,X408) | ! [X409] : (~r1(X408,X409) | ! [X410] : (~r1(X409,X410) | ! [X411] : (! [X412] : (~r1(X411,X412) | ! [X413] : (! [X414] : (~r1(X413,X414) | ! [X415] : (~r1(X414,X415) | ! [X416] : (~r1(X415,X416) | ! [X417] : (~r1(X416,X417) | ! [X418] : (! [X419] : (~r1(X418,X419) | ! [X420] : (! [X421] : (~r1(X420,X421) | ! [X422] : (! [X423] : (~r1(X422,X423) | ! [X424] : (~r1(X423,X424) | ! [X425] : (~r1(X424,X425) | ~((p25(X425) & p26(X425)) | (~p25(X425) & ~p26(X425)))))) | ~r1(X421,X422))) | ~r1(X419,X420))) | ~r1(X417,X418)))))) | ~r1(X412,X413))) | ~r1(X410,X411)))))))) | ~r1(X403,X404)) | ~r1(X402,X403)) | ~r1(X401,X402)) | ~r1(X400,X401))) | ~r1(X398,X399)) | ~! [X426] : (~(~! [X427] : (~(! [X428] : (~r1(X427,X428) | p24(X428)) | ~! [X429] : (~r1(X427,X429) | ~(! [X430] : (p23(X430) | ~r1(X429,X430)) | ~! [X431] : (~r1(X429,X431) | ~(~! [X432] : (! [X433] : (~r1(X432,X433) | ! [X434] : (~r1(X433,X434) | ! [X435] : (! [X436] : (~r1(X435,X436) | ! [X437] : (~r1(X436,X437) | ! [X438] : (~r1(X437,X438) | ! [X439] : (! [X440] : (~r1(X439,X440) | ! [X441] : (! [X442] : (! [X443] : (! [X444] : (! [X445] : (~r1(X444,X445) | ! [X446] : (~r1(X445,X446) | ! [X447] : (! [X448] : (~r1(X447,X448) | ! [X449] : (! [X450] : (~r1(X449,X450) | ! [X451] : (~r1(X450,X451) | ! [X452] : (! [X453] : (~r1(X452,X453) | ! [X454] : (~r1(X453,X454) | ~((p21(X454) & p22(X454)) | (~p21(X454) & ~p22(X454))))) | ~r1(X451,X452)))) | ~r1(X448,X449))) | ~r1(X446,X447)))) | ~r1(X443,X444)) | ~r1(X442,X443)) | ~r1(X441,X442)) | ~r1(X440,X441))) | ~r1(X438,X439))))) | ~r1(X434,X435)))) | ~r1(X431,X432)) | ~! [X455] : (~(! [X456] : (~r1(X455,X456) | p21(X456)) | ~! [X457] : (~(! [X458] : (~r1(X457,X458) | p20(X458)) | ~! [X459] : (~(! [X460] : (~r1(X459,X460) | p19(X460)) | ~! [X461] : (~(~! [X462] : (~r1(X461,X462) | ! [X463] : (~r1(X462,X463) | ! [X464] : (~r1(X463,X464) | ! [X465] : (! [X466] : (! [X467] : (! [X468] : (~r1(X467,X468) | ! [X469] : (! [X470] : (! [X471] : (~r1(X470,X471) | ! [X472] : (~r1(X471,X472) | ! [X473] : (! [X474] : (~r1(X473,X474) | ! [X475] : (! [X476] : (! [X477] : (! [X478] : (! [X479] : (~r1(X478,X479) | ! [X480] : (~r1(X479,X480) | ~((~p17(X480) & ~p18(X480)) | (p17(X480) & p18(X480))))) | ~r1(X477,X478)) | ~r1(X476,X477)) | ~r1(X475,X476)) | ~r1(X474,X475))) | ~r1(X472,X473)))) | ~r1(X469,X470)) | ~r1(X468,X469))) | ~r1(X466,X467)) | ~r1(X465,X466)) | ~r1(X464,X465))))) | ~! [X481] : (~r1(X461,X481) | ~(~! [X482] : (~r1(X481,X482) | ! [X483] : (! [X484] : (~r1(X483,X484) | ! [X485] : (! [X486] : (~r1(X485,X486) | ! [X487] : (~r1(X486,X487) | ! [X488] : (~r1(X487,X488) | ! [X489] : (~r1(X488,X489) | ! [X490] : (~r1(X489,X490) | ! [X491] : (~r1(X490,X491) | ! [X492] : (~r1(X491,X492) | ! [X493] : (! [X494] : (! [X495] : (~r1(X494,X495) | ! [X496] : (~r1(X495,X496) | ! [X497] : (~r1(X496,X497) | ! [X498] : (! [X499] : (~r1(X498,X499) | ~((~p17(X499) & ~p16(X499)) | (p16(X499) & p17(X499)))) | ~r1(X497,X498))))) | ~r1(X493,X494)) | ~r1(X492,X493))))))))) | ~r1(X484,X485))) | ~r1(X482,X483))) | ! [X500] : (p17(X500) | ~r1(X481,X500)) | ~! [X501] : (~r1(X481,X501) | ~(~! [X502] : (~r1(X501,X502) | ~(~! [X503] : (~r1(X502,X503) | ~(! [X504] : (~r1(X503,X504) | p14(X504)) | ~! [X505] : (~(! [X506] : (p13(X506) | ~r1(X505,X506)) | ~! [X507] : (~r1(X505,X507) | ~(~! [X508] : (~r1(X507,X508) | ! [X509] : (~r1(X508,X509) | ! [X510] : (! [X511] : (! [X512] : (! [X513] : (! [X514] : (~r1(X513,X514) | ! [X515] : (~r1(X514,X515) | ! [X516] : (! [X517] : (~r1(X516,X517) | ! [X518] : (~r1(X517,X518) | ! [X519] : (~r1(X518,X519) | ! [X520] : (~r1(X519,X520) | ~((~p12(X520) & ~p11(X520)) | (p12(X520) & p11(X520))))))) | ~r1(X515,X516)))) | ~r1(X512,X513)) | ~r1(X511,X512)) | ~r1(X510,X511)) | ~r1(X509,X510)))) | ! [X521] : (~r1(X507,X521) | p12(X521)) | ~! [X522] : (~r1(X507,X522) | ~(~! [X523] : (~(~! [X524] : (! [X525] : (! [X526] : (~r1(X525,X526) | ! [X527] : (~r1(X526,X527) | ! [X528] : (~r1(X527,X528) | ! [X529] : (~r1(X528,X529) | ! [X530] : (~r1(X529,X530) | ! [X531] : (! [X532] : (! [X533] : (! [X534] : (~r1(X533,X534) | ~((p10(X534) & p9(X534)) | (~p10(X534) & ~p9(X534)))) | ~r1(X532,X533)) | ~r1(X531,X532)) | ~r1(X530,X531))))))) | ~r1(X524,X525)) | ~r1(X523,X524)) | ! [X535] : (p10(X535) | ~r1(X523,X535)) | ~! [X536] : (~r1(X523,X536) | ~(! [X537] : (~r1(X536,X537) | p9(X537)) | ~! [X538] : (~r1(X536,X538) | ~(~! [X539] : (~r1(X538,X539) | ! [X540] : (! [X541] : (! [X542] : (! [X543] : (~r1(X542,X543) | ! [X544] : (! [X545] : (~r1(X544,X545) | ! [X546] : (! [X547] : (~((p7(X547) & p8(X547)) | (~p7(X547) & ~p8(X547))) | ~r1(X546,X547)) | ~r1(X545,X546))) | ~r1(X543,X544))) | ~r1(X541,X542)) | ~r1(X540,X541)) | ~r1(X539,X540))) | ~! [X548] : (~r1(X538,X548) | ~(~! [X549] : (! [X550] : (! [X551] : (~r1(X550,X551) | ! [X552] : (~r1(X551,X552) | ! [X553] : (~r1(X552,X553) | ! [X554] : (~r1(X553,X554) | ! [X555] : (! [X556] : (~((p7(X556) & p6(X556)) | (~p6(X556) & ~p7(X556))) | ~r1(X555,X556)) | ~r1(X554,X555)))))) | ~r1(X549,X550)) | ~r1(X548,X549)) | ! [X557] : (p7(X557) | ~r1(X548,X557)) | ~! [X558] : (~(~! [X559] : (~(~! [X560] : (~r1(X559,X560) | ~(~! [X561] : (! [X562] : (~r1(X561,X562) | ! [X563] : (~r1(X562,X563) | ! [X564] : (! [X565] : (~((p4(X565) & p3(X565)) | (~p4(X565) & ~p3(X565))) | ~r1(X564,X565)) | ~r1(X563,X564)))) | ~r1(X560,X561)) | ~! [X566] : (~(~! [X567] : (~r1(X566,X567) | ! [X568] : (! [X569] : (! [X570] : (~r1(X569,X570) | ~((~p2(X570) & ~p3(X570)) | (p2(X570) & p3(X570)))) | ~r1(X568,X569)) | ~r1(X567,X568))) | ~! [X571] : (! [X572] : (! [X573] : (~r1(X572,X573) | ! [X574] : (~r1(X573,X574) | ~((~p2(X574) & ~p1(X574)) | (p1(X574) & p2(X574))))) | ~r1(X571,X572)) | ~r1(X566,X571)) | ! [X575] : (p3(X575) | ~r1(X566,X575))) | ~r1(X560,X566)) | ! [X576] : (~r1(X560,X576) | p4(X576)))) | ! [X577] : (~r1(X559,X577) | p5(X577)) | ~! [X578] : (~r1(X559,X578) | ! [X579] : (! [X580] : (! [X581] : (~r1(X580,X581) | ! [X582] : (~r1(X581,X582) | ! [X583] : (~r1(X582,X583) | ~((~p4(X583) & ~p5(X583)) | (p5(X583) & p4(X583)))))) | ~r1(X579,X580)) | ~r1(X578,X579)))) | ~r1(X558,X559)) | ! [X584] : (p6(X584) | ~r1(X558,X584)) | ~! [X585] : (! [X586] : (~r1(X585,X586) | ! [X587] : (! [X588] : (! [X589] : (~r1(X588,X589) | ! [X590] : (~r1(X589,X590) | ! [X591] : (~r1(X590,X591) | ~((p5(X591) & p6(X591)) | (~p6(X591) & ~p5(X591)))))) | ~r1(X587,X588)) | ~r1(X586,X587))) | ~r1(X558,X585))) | ~r1(X548,X558)))) | ! [X592] : (~r1(X538,X592) | p8(X592)))) | ~! [X593] : (~r1(X536,X593) | ! [X594] : (~r1(X593,X594) | ! [X595] : (! [X596] : (! [X597] : (! [X598] : (! [X599] : (~r1(X598,X599) | ! [X600] : (! [X601] : (! [X602] : (~((~p8(X602) & ~p9(X602)) | (p9(X602) & p8(X602))) | ~r1(X601,X602)) | ~r1(X600,X601)) | ~r1(X599,X600))) | ~r1(X597,X598)) | ~r1(X596,X597)) | ~r1(X595,X596)) | ~r1(X594,X595))))))) | ~r1(X522,X523)) | ! [X603] : (~r1(X522,X603) | p11(X603)) | ~! [X604] : (~r1(X522,X604) | ! [X605] : (~r1(X604,X605) | ! [X606] : (~r1(X605,X606) | ! [X607] : (~r1(X606,X607) | ! [X608] : (~r1(X607,X608) | ! [X609] : (~r1(X608,X609) | ! [X610] : (~r1(X609,X610) | ! [X611] : (! [X612] : (! [X613] : (~r1(X612,X613) | ! [X614] : (! [X615] : (~r1(X614,X615) | ~((~p11(X615) & ~p10(X615)) | (p11(X615) & p10(X615)))) | ~r1(X613,X614))) | ~r1(X611,X612)) | ~r1(X610,X611))))))))))))) | ~! [X616] : (! [X617] : (! [X618] : (~r1(X617,X618) | ! [X619] : (! [X620] : (! [X621] : (! [X622] : (~r1(X621,X622) | ! [X623] : (! [X624] : (~r1(X623,X624) | ! [X625] : (~r1(X624,X625) | ! [X626] : (! [X627] : (! [X628] : (~r1(X627,X628) | ! [X629] : (~((~p13(X629) & ~p12(X629)) | (p13(X629) & p12(X629))) | ~r1(X628,X629))) | ~r1(X626,X627)) | ~r1(X625,X626)))) | ~r1(X622,X623))) | ~r1(X620,X621)) | ~r1(X619,X620)) | ~r1(X618,X619))) | ~r1(X616,X617)) | ~r1(X505,X616))) | ~r1(X503,X505)) | ~! [X630] : (~r1(X503,X630) | ! [X631] : (! [X632] : (~r1(X631,X632) | ! [X633] : (! [X634] : (~r1(X633,X634) | ! [X635] : (! [X636] : (! [X637] : (~r1(X636,X637) | ! [X638] : (~r1(X637,X638) | ! [X639] : (~r1(X638,X639) | ! [X640] : (~r1(X639,X640) | ! [X641] : (! [X642] : (~r1(X641,X642) | ! [X643] : (! [X644] : (~r1(X643,X644) | ~((~p14(X644) & ~p13(X644)) | (p14(X644) & p13(X644)))) | ~r1(X642,X643))) | ~r1(X640,X641)))))) | ~r1(X635,X636)) | ~r1(X634,X635))) | ~r1(X632,X633))) | ~r1(X630,X631))))) | ! [X645] : (p15(X645) | ~r1(X502,X645)) | ~! [X646] : (! [X647] : (! [X648] : (~r1(X647,X648) | ! [X649] : (! [X650] : (~r1(X649,X650) | ! [X651] : (~r1(X650,X651) | ! [X652] : (! [X653] : (! [X654] : (! [X655] : (~r1(X654,X655) | ! [X656] : (! [X657] : (~r1(X656,X657) | ! [X658] : (~r1(X657,X658) | ! [X659] : (! [X660] : (~r1(X659,X660) | ! [X661] : (~((p14(X661) & p15(X661)) | (~p14(X661) & ~p15(X661))) | ~r1(X660,X661))) | ~r1(X658,X659)))) | ~r1(X655,X656))) | ~r1(X653,X654)) | ~r1(X652,X653)) | ~r1(X651,X652)))) | ~r1(X648,X649))) | ~r1(X646,X647)) | ~r1(X502,X646)))) | ! [X662] : (p16(X662) | ~r1(X501,X662)) | ~! [X663] : (~r1(X501,X663) | ! [X664] : (! [X665] : (~r1(X664,X665) | ! [X666] : (! [X667] : (! [X668] : (! [X669] : (~r1(X668,X669) | ! [X670] : (! [X671] : (~r1(X670,X671) | ! [X672] : (! [X673] : (~r1(X672,X673) | ! [X674] : (! [X675] : (! [X676] : (! [X677] : (! [X678] : (~r1(X677,X678) | ! [X679] : (~r1(X678,X679) | ~((p15(X679) & p16(X679)) | (~p16(X679) & ~p15(X679))))) | ~r1(X676,X677)) | ~r1(X675,X676)) | ~r1(X674,X675)) | ~r1(X673,X674))) | ~r1(X671,X672))) | ~r1(X669,X670))) | ~r1(X667,X668)) | ~r1(X666,X667)) | ~r1(X665,X666))) | ~r1(X663,X664))))))) | ! [X680] : (p18(X680) | ~r1(X461,X680))) | ~r1(X459,X461)) | ~! [X681] : (! [X682] : (~r1(X681,X682) | ! [X683] : (! [X684] : (~r1(X683,X684) | ! [X685] : (~r1(X684,X685) | ! [X686] : (! [X687] : (~r1(X686,X687) | ! [X688] : (! [X689] : (~r1(X688,X689) | ! [X690] : (~r1(X689,X690) | ! [X691] : (~r1(X690,X691) | ! [X692] : (~r1(X691,X692) | ! [X693] : (! [X694] : (! [X695] : (! [X696] : (~r1(X695,X696) | ! [X697] : (! [X698] : (! [X699] : (~r1(X698,X699) | ! [X700] : (~((~p18(X700) & ~p19(X700)) | (p18(X700) & p19(X700))) | ~r1(X699,X700))) | ~r1(X697,X698)) | ~r1(X696,X697))) | ~r1(X694,X695)) | ~r1(X693,X694)) | ~r1(X692,X693)))))) | ~r1(X687,X688))) | ~r1(X685,X686)))) | ~r1(X682,X683))) | ~r1(X459,X681))) | ~r1(X457,X459)) | ~! [X701] : (! [X702] : (! [X703] : (~r1(X702,X703) | ! [X704] : (! [X705] : (! [X706] : (! [X707] : (! [X708] : (~r1(X707,X708) | ! [X709] : (! [X710] : (! [X711] : (! [X712] : (~r1(X711,X712) | ! [X713] : (~r1(X712,X713) | ! [X714] : (! [X715] : (~r1(X714,X715) | ! [X716] : (~r1(X715,X716) | ! [X717] : (~r1(X716,X717) | ! [X718] : (~r1(X717,X718) | ! [X719] : (~r1(X718,X719) | ! [X720] : (! [X721] : (~((p19(X721) & p20(X721)) | (~p19(X721) & ~p20(X721))) | ~r1(X720,X721)) | ~r1(X719,X720))))))) | ~r1(X713,X714)))) | ~r1(X710,X711)) | ~r1(X709,X710)) | ~r1(X708,X709))) | ~r1(X706,X707)) | ~r1(X705,X706)) | ~r1(X704,X705)) | ~r1(X703,X704))) | ~r1(X701,X702)) | ~r1(X457,X701))) | ~r1(X455,X457)) | ~! [X722] : (~r1(X455,X722) | ! [X723] : (~r1(X722,X723) | ! [X724] : (! [X725] : (~r1(X724,X725) | ! [X726] : (! [X727] : (~r1(X726,X727) | ! [X728] : (! [X729] : (! [X730] : (~r1(X729,X730) | ! [X731] : (! [X732] : (~r1(X731,X732) | ! [X733] : (! [X734] : (! [X735] : (~r1(X734,X735) | ! [X736] : (~r1(X735,X736) | ! [X737] : (! [X738] : (! [X739] : (~r1(X738,X739) | ! [X740] : (! [X741] : (~r1(X740,X741) | ! [X742] : (! [X743] : (~((p21(X743) & p20(X743)) | (~p20(X743) & ~p21(X743))) | ~r1(X742,X743)) | ~r1(X741,X742))) | ~r1(X739,X740))) | ~r1(X737,X738)) | ~r1(X736,X737)))) | ~r1(X733,X734)) | ~r1(X732,X733))) | ~r1(X730,X731))) | ~r1(X728,X729)) | ~r1(X727,X728))) | ~r1(X725,X726))) | ~r1(X723,X724))))) | ~r1(X431,X455)) | ! [X744] : (p22(X744) | ~r1(X431,X744)))) | ~! [X745] : (! [X746] : (! [X747] : (! [X748] : (! [X749] : (! [X750] : (! [X751] : (! [X752] : (~r1(X751,X752) | ! [X753] : (! [X754] : (! [X755] : (! [X756] : (! [X757] : (~r1(X756,X757) | ! [X758] : (! [X759] : (! [X760] : (! [X761] : (! [X762] : (! [X763] : (~r1(X762,X763) | ! [X764] : (~r1(X763,X764) | ! [X765] : (~r1(X764,X765) | ! [X766] : (~r1(X765,X766) | ! [X767] : (! [X768] : (~((p22(X768) & p23(X768)) | (~p22(X768) & ~p23(X768))) | ~r1(X767,X768)) | ~r1(X766,X767)))))) | ~r1(X761,X762)) | ~r1(X760,X761)) | ~r1(X759,X760)) | ~r1(X758,X759)) | ~r1(X757,X758))) | ~r1(X755,X756)) | ~r1(X754,X755)) | ~r1(X753,X754)) | ~r1(X752,X753))) | ~r1(X750,X751)) | ~r1(X749,X750)) | ~r1(X748,X749)) | ~r1(X747,X748)) | ~r1(X746,X747)) | ~r1(X745,X746)) | ~r1(X429,X745)))) | ~! [X769] : (! [X770] : (~r1(X769,X770) | ! [X771] : (! [X772] : (! [X773] : (! [X774] : (! [X775] : (! [X776] : (~r1(X775,X776) | ! [X777] : (~r1(X776,X777) | ! [X778] : (! [X779] : (! [X780] : (! [X781] : (! [X782] : (! [X783] : (! [X784] : (~r1(X783,X784) | ! [X785] : (! [X786] : (! [X787] : (~r1(X786,X787) | ! [X788] : (! [X789] : (~r1(X788,X789) | ! [X790] : (! [X791] : (~r1(X790,X791) | ! [X792] : (~r1(X791,X792) | ! [X793] : (~r1(X792,X793) | ~((~p23(X793) & ~p24(X793)) | (p24(X793) & p23(X793)))))) | ~r1(X789,X790))) | ~r1(X787,X788))) | ~r1(X785,X786)) | ~r1(X784,X785))) | ~r1(X782,X783)) | ~r1(X781,X782)) | ~r1(X780,X781)) | ~r1(X779,X780)) | ~r1(X778,X779)) | ~r1(X777,X778)))) | ~r1(X774,X775)) | ~r1(X773,X774)) | ~r1(X772,X773)) | ~r1(X771,X772)) | ~r1(X770,X771))) | ~r1(X427,X769))) | ~r1(X426,X427)) | ! [X794] : (p25(X794) | ~r1(X426,X794)) | ~! [X795] : (! [X796] : (~r1(X795,X796) | ! [X797] : (! [X798] : (~r1(X797,X798) | ! [X799] : (~r1(X798,X799) | ! [X800] : (~r1(X799,X800) | ! [X801] : (! [X802] : (~r1(X801,X802) | ! [X803] : (! [X804] : (~r1(X803,X804) | ! [X805] : (~r1(X804,X805) | ! [X806] : (~r1(X805,X806) | ! [X807] : (! [X808] : (! [X809] : (~r1(X808,X809) | ! [X810] : (! [X811] : (! [X812] : (! [X813] : (~r1(X812,X813) | ! [X814] : (~r1(X813,X814) | ! [X815] : (~r1(X814,X815) | ! [X816] : (~r1(X815,X816) | ! [X817] : (! [X818] : (~r1(X817,X818) | ! [X819] : (! [X820] : (~((p25(X820) & p24(X820)) | (~p25(X820) & ~p24(X820))) | ~r1(X819,X820)) | ~r1(X818,X819))) | ~r1(X816,X817)))))) | ~r1(X811,X812)) | ~r1(X810,X811)) | ~r1(X809,X810))) | ~r1(X807,X808)) | ~r1(X806,X807))))) | ~r1(X802,X803))) | ~r1(X800,X801))))) | ~r1(X796,X797))) | ~r1(X426,X795))) | ~r1(X398,X426)) | ! [X821] : (~r1(X398,X821) | p26(X821)))) | ~! [X822] : (! [X823] : (~r1(X822,X823) | ! [X824] : (~r1(X823,X824) | ! [X825] : (~r1(X824,X825) | ! [X826] : (~r1(X825,X826) | ! [X827] : (~r1(X826,X827) | ! [X828] : (! [X829] : (! [X830] : (! [X831] : (~r1(X830,X831) | ! [X832] : (~r1(X831,X832) | ! [X833] : (~r1(X832,X833) | ! [X834] : (! [X835] : (! [X836] : (~r1(X835,X836) | ! [X837] : (! [X838] : (! [X839] : (! [X840] : (~r1(X839,X840) | ! [X841] : (~r1(X840,X841) | ! [X842] : (~r1(X841,X842) | ! [X843] : (~r1(X842,X843) | ! [X844] : (! [X845] : (! [X846] : (! [X847] : (! [X848] : (! [X849] : (~r1(X848,X849) | ~((p26(X849) & p27(X849)) | (~p27(X849) & ~p26(X849)))) | ~r1(X847,X848)) | ~r1(X846,X847)) | ~r1(X845,X846)) | ~r1(X844,X845)) | ~r1(X843,X844)))))) | ~r1(X838,X839)) | ~r1(X837,X838)) | ~r1(X836,X837))) | ~r1(X834,X835)) | ~r1(X833,X834))))) | ~r1(X829,X830)) | ~r1(X828,X829)) | ~r1(X827,X828))))))) | ~r1(X396,X822))) | ~r1(X395,X396)) | ! [X850] : (p28(X850) | ~r1(X395,X850)) | ~! [X851] : (! [X852] : (! [X853] : (~r1(X852,X853) | ! [X854] : (! [X855] : (~r1(X854,X855) | ! [X856] : (~r1(X855,X856) | ! [X857] : (~r1(X856,X857) | ! [X858] : (! [X859] : (! [X860] : (~r1(X859,X860) | ! [X861] : (! [X862] : (! [X863] : (! [X864] : (~r1(X863,X864) | ! [X865] : (~r1(X864,X865) | ! [X866] : (~r1(X865,X866) | ! [X867] : (~r1(X866,X867) | ! [X868] : (! [X869] : (~r1(X868,X869) | ! [X870] : (! [X871] : (! [X872] : (~r1(X871,X872) | ! [X873] : (! [X874] : (~r1(X873,X874) | ! [X875] : (! [X876] : (! [X877] : (~r1(X876,X877) | ! [X878] : (! [X879] : (~((~p27(X879) & ~p28(X879)) | (p28(X879) & p27(X879))) | ~r1(X878,X879)) | ~r1(X877,X878))) | ~r1(X875,X876)) | ~r1(X874,X875))) | ~r1(X872,X873))) | ~r1(X870,X871)) | ~r1(X869,X870))) | ~r1(X867,X868)))))) | ~r1(X862,X863)) | ~r1(X861,X862)) | ~r1(X860,X861))) | ~r1(X858,X859)) | ~r1(X857,X858))))) | ~r1(X853,X854))) | ~r1(X851,X852)) | ~r1(X395,X851))) | ~r1(X364,X395)) | ! [X880] : (~r1(X364,X880) | p29(X880))) | ~r1(X362,X364)) | ~! [X881] : (! [X882] : (~r1(X881,X882) | ! [X883] : (! [X884] : (! [X885] : (! [X886] : (~r1(X885,X886) | ! [X887] : (~r1(X886,X887) | ! [X888] : (~r1(X887,X888) | ! [X889] : (~r1(X888,X889) | ! [X890] : (! [X891] : (~r1(X890,X891) | ! [X892] : (! [X893] : (! [X894] : (! [X895] : (~r1(X894,X895) | ! [X896] : (! [X897] : (~r1(X896,X897) | ! [X898] : (~r1(X897,X898) | ! [X899] : (~r1(X898,X899) | ! [X900] : (~r1(X899,X900) | ! [X901] : (! [X902] : (~r1(X901,X902) | ! [X903] : (! [X904] : (! [X905] : (~r1(X904,X905) | ! [X906] : (! [X907] : (! [X908] : (! [X909] : (! [X910] : (! [X911] : (~((p30(X911) & p29(X911)) | (~p29(X911) & ~p30(X911))) | ~r1(X910,X911)) | ~r1(X909,X910)) | ~r1(X908,X909)) | ~r1(X907,X908)) | ~r1(X906,X907)) | ~r1(X905,X906))) | ~r1(X903,X904)) | ~r1(X902,X903))) | ~r1(X900,X901)))))) | ~r1(X895,X896))) | ~r1(X893,X894)) | ~r1(X892,X893)) | ~r1(X891,X892))) | ~r1(X889,X890)))))) | ~r1(X884,X885)) | ~r1(X883,X884)) | ~r1(X882,X883))) | ~r1(X362,X881))) | ~r1(X328,X362))) | ~r1(X293,X328)))) | ! [X912] : (~r1(X292,X912) | p33(X912)) | ~! [X913] : (~r1(X292,X913) | ! [X914] : (~r1(X913,X914) | ! [X915] : (! [X916] : (~r1(X915,X916) | ! [X917] : (~r1(X916,X917) | ! [X918] : (~r1(X917,X918) | ! [X919] : (! [X920] : (~r1(X919,X920) | ! [X921] : (~r1(X920,X921) | ! [X922] : (! [X923] : (~r1(X922,X923) | ! [X924] : (~r1(X923,X924) | ! [X925] : (~r1(X924,X925) | ! [X926] : (! [X927] : (~r1(X926,X927) | ! [X928] : (~r1(X927,X928) | ! [X929] : (! [X930] : (! [X931] : (! [X932] : (! [X933] : (! [X934] : (! [X935] : (~r1(X934,X935) | ! [X936] : (~r1(X935,X936) | ! [X937] : (~r1(X936,X937) | ! [X938] : (! [X939] : (~r1(X938,X939) | ! [X940] : (! [X941] : (~r1(X940,X941) | ! [X942] : (~r1(X941,X942) | ! [X943] : (~r1(X942,X943) | ! [X944] : (! [X945] : (! [X946] : (~((~p33(X946) & ~p32(X946)) | (p32(X946) & p33(X946))) | ~r1(X945,X946)) | ~r1(X944,X945)) | ~r1(X943,X944))))) | ~r1(X939,X940))) | ~r1(X937,X938))))) | ~r1(X933,X934)) | ~r1(X932,X933)) | ~r1(X931,X932)) | ~r1(X930,X931)) | ~r1(X929,X930)) | ~r1(X928,X929)))) | ~r1(X925,X926))))) | ~r1(X921,X922)))) | ~r1(X918,X919))))) | ~r1(X914,X915))))) | ~r1(X256,X292)) | ! [X947] : (~r1(X256,X947) | p34(X947))) | ~r1(X255,X256)) | ! [X948] : (p35(X948) | ~r1(X255,X948)) | ~! [X949] : (~r1(X255,X949) | ! [X950] : (! [X951] : (~r1(X950,X951) | ! [X952] : (~r1(X951,X952) | ! [X953] : (~r1(X952,X953) | ! [X954] : (! [X955] : (! [X956] : (~r1(X955,X956) | ! [X957] : (! [X958] : (! [X959] : (~r1(X958,X959) | ! [X960] : (~r1(X959,X960) | ! [X961] : (! [X962] : (! [X963] : (! [X964] : (! [X965] : (~r1(X964,X965) | ! [X966] : (! [X967] : (! [X968] : (~r1(X967,X968) | ! [X969] : (! [X970] : (! [X971] : (~r1(X970,X971) | ! [X972] : (! [X973] : (~r1(X972,X973) | ! [X974] : (! [X975] : (! [X976] : (~r1(X975,X976) | ! [X977] : (! [X978] : (~r1(X977,X978) | ! [X979] : (~r1(X978,X979) | ! [X980] : (! [X981] : (~r1(X980,X981) | ! [X982] : (! [X983] : (~r1(X982,X983) | ! [X984] : (~r1(X983,X984) | ~((p34(X984) & p35(X984)) | (~p35(X984) & ~p34(X984))))) | ~r1(X981,X982))) | ~r1(X979,X980)))) | ~r1(X976,X977))) | ~r1(X974,X975)) | ~r1(X973,X974))) | ~r1(X971,X972))) | ~r1(X969,X970)) | ~r1(X968,X969))) | ~r1(X966,X967)) | ~r1(X965,X966))) | ~r1(X963,X964)) | ~r1(X962,X963)) | ~r1(X961,X962)) | ~r1(X960,X961)))) | ~r1(X957,X958)) | ~r1(X956,X957))) | ~r1(X954,X955)) | ~r1(X953,X954))))) | ~r1(X949,X950)))) | ~r1(X254,X255)) | ! [X985] : (~r1(X254,X985) | p36(X985)) | ~! [X986] : (! [X987] : (~r1(X986,X987) | ! [X988] : (~r1(X987,X988) | ! [X989] : (~r1(X988,X989) | ! [X990] : (~r1(X989,X990) | ! [X991] : (! [X992] : (! [X993] : (! [X994] : (~r1(X993,X994) | ! [X995] : (! [X996] : (~r1(X995,X996) | ! [X997] : (! [X998] : (~r1(X997,X998) | ! [X999] : (~r1(X998,X999) | ! [X1000] : (~r1(X999,X1000) | ! [X1001] : (! [X1002] : (! [X1003] : (~r1(X1002,X1003) | ! [X1004] : (! [X1005] : (! [X1006] : (~r1(X1005,X1006) | ! [X1007] : (~r1(X1006,X1007) | ! [X1008] : (~r1(X1007,X1008) | ! [X1009] : (! [X1010] : (! [X1011] : (~r1(X1010,X1011) | ! [X1012] : (~r1(X1011,X1012) | ! [X1013] : (~r1(X1012,X1013) | ! [X1014] : (! [X1015] : (~r1(X1014,X1015) | ! [X1016] : (~r1(X1015,X1016) | ! [X1017] : (! [X1018] : (! [X1019] : (~r1(X1018,X1019) | ! [X1020] : (~r1(X1019,X1020) | ! [X1021] : (! [X1022] : (~((p36(X1022) & p35(X1022)) | (~p35(X1022) & ~p36(X1022))) | ~r1(X1021,X1022)) | ~r1(X1020,X1021)))) | ~r1(X1017,X1018)) | ~r1(X1016,X1017)))) | ~r1(X1013,X1014))))) | ~r1(X1009,X1010)) | ~r1(X1008,X1009))))) | ~r1(X1004,X1005)) | ~r1(X1003,X1004))) | ~r1(X1001,X1002)) | ~r1(X1000,X1001))))) | ~r1(X996,X997))) | ~r1(X994,X995))) | ~r1(X992,X993)) | ~r1(X991,X992)) | ~r1(X990,X991)))))) | ~r1(X254,X986)))))) | ! [X1023] : (~r1(X213,X1023) | p38(X1023)) | ~! [X1024] : (~r1(X213,X1024) | ! [X1025] : (~r1(X1024,X1025) | ! [X1026] : (! [X1027] : (! [X1028] : (~r1(X1027,X1028) | ! [X1029] : (~r1(X1028,X1029) | ! [X1030] : (~r1(X1029,X1030) | ! [X1031] : (! [X1032] : (~r1(X1031,X1032) | ! [X1033] : (~r1(X1032,X1033) | ! [X1034] : (~r1(X1033,X1034) | ! [X1035] : (! [X1036] : (~r1(X1035,X1036) | ! [X1037] : (! [X1038] : (! [X1039] : (~r1(X1038,X1039) | ! [X1040] : (~r1(X1039,X1040) | ! [X1041] : (! [X1042] : (~r1(X1041,X1042) | ! [X1043] : (~r1(X1042,X1043) | ! [X1044] : (~r1(X1043,X1044) | ! [X1045] : (~r1(X1044,X1045) | ! [X1046] : (! [X1047] : (! [X1048] : (~r1(X1047,X1048) | ! [X1049] : (! [X1050] : (! [X1051] : (~r1(X1050,X1051) | ! [X1052] : (~r1(X1051,X1052) | ! [X1053] : (! [X1054] : (~r1(X1053,X1054) | ! [X1055] : (~r1(X1054,X1055) | ! [X1056] : (~r1(X1055,X1056) | ! [X1057] : (! [X1058] : (! [X1059] : (~r1(X1058,X1059) | ! [X1060] : (! [X1061] : (! [X1062] : (~r1(X1061,X1062) | ~((~p37(X1062) & ~p38(X1062)) | (p38(X1062) & p37(X1062)))) | ~r1(X1060,X1061)) | ~r1(X1059,X1060))) | ~r1(X1057,X1058)) | ~r1(X1056,X1057))))) | ~r1(X1052,X1053)))) | ~r1(X1049,X1050)) | ~r1(X1048,X1049))) | ~r1(X1046,X1047)) | ~r1(X1045,X1046)))))) | ~r1(X1040,X1041)))) | ~r1(X1037,X1038)) | ~r1(X1036,X1037))) | ~r1(X1034,X1035))))) | ~r1(X1030,X1031))))) | ~r1(X1026,X1027)) | ~r1(X1025,X1026)))))) | ! [X1063] : (~r1(X212,X1063) | p39(X1063)) | ~! [X1064] : (! [X1065] : (~r1(X1064,X1065) | ! [X1066] : (! [X1067] : (! [X1068] : (! [X1069] : (~r1(X1068,X1069) | ! [X1070] : (! [X1071] : (~r1(X1070,X1071) | ! [X1072] : (! [X1073] : (~r1(X1072,X1073) | ! [X1074] : (~r1(X1073,X1074) | ! [X1075] : (! [X1076] : (! [X1077] : (~r1(X1076,X1077) | ! [X1078] : (! [X1079] : (! [X1080] : (! [X1081] : (! [X1082] : (! [X1083] : (! [X1084] : (! [X1085] : (! [X1086] : (! [X1087] : (! [X1088] : (! [X1089] : (~r1(X1088,X1089) | ! [X1090] : (! [X1091] : (! [X1092] : (~r1(X1091,X1092) | ! [X1093] : (~r1(X1092,X1093) | ! [X1094] : (~r1(X1093,X1094) | ! [X1095] : (~r1(X1094,X1095) | ! [X1096] : (~r1(X1095,X1096) | ! [X1097] : (! [X1098] : (! [X1099] : (~r1(X1098,X1099) | ! [X1100] : (~r1(X1099,X1100) | ! [X1101] : (! [X1102] : (~r1(X1101,X1102) | ! [X1103] : (~((~p39(X1103) & ~p38(X1103)) | (p38(X1103) & p39(X1103))) | ~r1(X1102,X1103))) | ~r1(X1100,X1101)))) | ~r1(X1097,X1098)) | ~r1(X1096,X1097))))))) | ~r1(X1090,X1091)) | ~r1(X1089,X1090))) | ~r1(X1087,X1088)) | ~r1(X1086,X1087)) | ~r1(X1085,X1086)) | ~r1(X1084,X1085)) | ~r1(X1083,X1084)) | ~r1(X1082,X1083)) | ~r1(X1081,X1082)) | ~r1(X1080,X1081)) | ~r1(X1079,X1080)) | ~r1(X1078,X1079)) | ~r1(X1077,X1078))) | ~r1(X1075,X1076)) | ~r1(X1074,X1075)))) | ~r1(X1071,X1072))) | ~r1(X1069,X1070))) | ~r1(X1067,X1068)) | ~r1(X1066,X1067)) | ~r1(X1065,X1066))) | ~r1(X212,X1064)))) | ! [X1104] : (~r1(X170,X1104) | p40(X1104)))) | ~! [X1105] : (~r1(X168,X1105) | ! [X1106] : (~r1(X1105,X1106) | ! [X1107] : (~r1(X1106,X1107) | ! [X1108] : (~r1(X1107,X1108) | ! [X1109] : (~r1(X1108,X1109) | ! [X1110] : (~r1(X1109,X1110) | ! [X1111] : (! [X1112] : (~r1(X1111,X1112) | ! [X1113] : (! [X1114] : (~r1(X1113,X1114) | ! [X1115] : (~r1(X1114,X1115) | ! [X1116] : (~r1(X1115,X1116) | ! [X1117] : (! [X1118] : (! [X1119] : (~r1(X1118,X1119) | ! [X1120] : (~r1(X1119,X1120) | ! [X1121] : (~r1(X1120,X1121) | ! [X1122] : (~r1(X1121,X1122) | ! [X1123] : (! [X1124] : (! [X1125] : (! [X1126] : (~r1(X1125,X1126) | ! [X1127] : (! [X1128] : (! [X1129] : (~r1(X1128,X1129) | ! [X1130] : (~r1(X1129,X1130) | ! [X1131] : (! [X1132] : (~r1(X1131,X1132) | ! [X1133] : (! [X1134] : (! [X1135] : (~r1(X1134,X1135) | ! [X1136] : (! [X1137] : (! [X1138] : (! [X1139] : (~r1(X1138,X1139) | ! [X1140] : (! [X1141] : (! [X1142] : (~r1(X1141,X1142) | ! [X1143] : (! [X1144] : (~r1(X1143,X1144) | ! [X1145] : (~r1(X1144,X1145) | ! [X1146] : (~((~p40(X1146) & ~p41(X1146)) | (p41(X1146) & p40(X1146))) | ~r1(X1145,X1146)))) | ~r1(X1142,X1143))) | ~r1(X1140,X1141)) | ~r1(X1139,X1140))) | ~r1(X1137,X1138)) | ~r1(X1136,X1137)) | ~r1(X1135,X1136))) | ~r1(X1133,X1134)) | ~r1(X1132,X1133))) | ~r1(X1130,X1131)))) | ~r1(X1127,X1128)) | ~r1(X1126,X1127))) | ~r1(X1124,X1125)) | ~r1(X1123,X1124)) | ~r1(X1122,X1123)))))) | ~r1(X1117,X1118)) | ~r1(X1116,X1117))))) | ~r1(X1112,X1113))) | ~r1(X1110,X1111))))))))))) | ~r1(X121,X123)) | ~! [X1147] : (~r1(X121,X1147) | ! [X1148] : (! [X1149] : (~r1(X1148,X1149) | ! [X1150] : (! [X1151] : (! [X1152] : (~r1(X1151,X1152) | ! [X1153] : (! [X1154] : (! [X1155] : (~r1(X1154,X1155) | ! [X1156] : (! [X1157] : (! [X1158] : (~r1(X1157,X1158) | ! [X1159] : (~r1(X1158,X1159) | ! [X1160] : (~r1(X1159,X1160) | ! [X1161] : (! [X1162] : (~r1(X1161,X1162) | ! [X1163] : (~r1(X1162,X1163) | ! [X1164] : (~r1(X1163,X1164) | ! [X1165] : (~r1(X1164,X1165) | ! [X1166] : (! [X1167] : (~r1(X1166,X1167) | ! [X1168] : (! [X1169] : (~r1(X1168,X1169) | ! [X1170] : (~r1(X1169,X1170) | ! [X1171] : (! [X1172] : (~r1(X1171,X1172) | ! [X1173] : (! [X1174] : (~r1(X1173,X1174) | ! [X1175] : (! [X1176] : (! [X1177] : (~r1(X1176,X1177) | ! [X1178] : (~r1(X1177,X1178) | ! [X1179] : (~r1(X1178,X1179) | ! [X1180] : (! [X1181] : (! [X1182] : (! [X1183] : (! [X1184] : (~r1(X1183,X1184) | ! [X1185] : (! [X1186] : (~r1(X1185,X1186) | ! [X1187] : (~r1(X1186,X1187) | ! [X1188] : (! [X1189] : (~r1(X1188,X1189) | ! [X1190] : (~r1(X1189,X1190) | ~((p43(X1190) & p42(X1190)) | (~p43(X1190) & ~p42(X1190))))) | ~r1(X1187,X1188)))) | ~r1(X1184,X1185))) | ~r1(X1182,X1183)) | ~r1(X1181,X1182)) | ~r1(X1180,X1181)) | ~r1(X1179,X1180))))) | ~r1(X1175,X1176)) | ~r1(X1174,X1175))) | ~r1(X1172,X1173))) | ~r1(X1170,X1171)))) | ~r1(X1167,X1168))) | ~r1(X1165,X1166)))))) | ~r1(X1160,X1161))))) | ~r1(X1156,X1157)) | ~r1(X1155,X1156))) | ~r1(X1153,X1154)) | ~r1(X1152,X1153))) | ~r1(X1150,X1151)) | ~r1(X1149,X1150))) | ~r1(X1147,X1148))))) | ~! [X1191] : (~r1(X119,X1191) | ! [X1192] : (~r1(X1191,X1192) | ! [X1193] : (~r1(X1192,X1193) | ! [X1194] : (! [X1195] : (~r1(X1194,X1195) | ! [X1196] : (! [X1197] : (~r1(X1196,X1197) | ! [X1198] : (~r1(X1197,X1198) | ! [X1199] : (! [X1200] : (! [X1201] : (~r1(X1200,X1201) | ! [X1202] : (~r1(X1201,X1202) | ! [X1203] : (~r1(X1202,X1203) | ! [X1204] : (~r1(X1203,X1204) | ! [X1205] : (~r1(X1204,X1205) | ! [X1206] : (~r1(X1205,X1206) | ! [X1207] : (! [X1208] : (! [X1209] : (! [X1210] : (! [X1211] : (! [X1212] : (~r1(X1211,X1212) | ! [X1213] : (! [X1214] : (! [X1215] : (! [X1216] : (~r1(X1215,X1216) | ! [X1217] : (~r1(X1216,X1217) | ! [X1218] : (~r1(X1217,X1218) | ! [X1219] : (! [X1220] : (~r1(X1219,X1220) | ! [X1221] : (! [X1222] : (~r1(X1221,X1222) | ! [X1223] : (~r1(X1222,X1223) | ! [X1224] : (! [X1225] : (~r1(X1224,X1225) | ! [X1226] : (! [X1227] : (! [X1228] : (~r1(X1227,X1228) | ! [X1229] : (! [X1230] : (~r1(X1229,X1230) | ! [X1231] : (~r1(X1230,X1231) | ! [X1232] : (! [X1233] : (! [X1234] : (! [X1235] : (~r1(X1234,X1235) | ~((p43(X1235) & p44(X1235)) | (~p43(X1235) & ~p44(X1235)))) | ~r1(X1233,X1234)) | ~r1(X1232,X1233)) | ~r1(X1231,X1232)))) | ~r1(X1228,X1229))) | ~r1(X1226,X1227)) | ~r1(X1225,X1226))) | ~r1(X1223,X1224)))) | ~r1(X1220,X1221))) | ~r1(X1218,X1219))))) | ~r1(X1214,X1215)) | ~r1(X1213,X1214)) | ~r1(X1212,X1213))) | ~r1(X1210,X1211)) | ~r1(X1209,X1210)) | ~r1(X1208,X1209)) | ~r1(X1207,X1208)) | ~r1(X1206,X1207)))))))) | ~r1(X1199,X1200)) | ~r1(X1198,X1199)))) | ~r1(X1195,X1196))) | ~r1(X1193,X1194)))))) | ~r1(X117,X119)) | ~! [X1236] : (~r1(X117,X1236) | ! [X1237] : (! [X1238] : (! [X1239] : (~r1(X1238,X1239) | ! [X1240] : (~r1(X1239,X1240) | ! [X1241] : (~r1(X1240,X1241) | ! [X1242] : (~r1(X1241,X1242) | ! [X1243] : (~r1(X1242,X1243) | ! [X1244] : (~r1(X1243,X1244) | ! [X1245] : (~r1(X1244,X1245) | ! [X1246] : (! [X1247] : (! [X1248] : (~r1(X1247,X1248) | ! [X1249] : (! [X1250] : (~r1(X1249,X1250) | ! [X1251] : (! [X1252] : (! [X1253] : (! [X1254] : (~r1(X1253,X1254) | ! [X1255] : (! [X1256] : (! [X1257] : (! [X1258] : (~r1(X1257,X1258) | ! [X1259] : (! [X1260] : (! [X1261] : (~r1(X1260,X1261) | ! [X1262] : (! [X1263] : (! [X1264] : (~r1(X1263,X1264) | ! [X1265] : (~r1(X1264,X1265) | ! [X1266] : (! [X1267] : (! [X1268] : (~r1(X1267,X1268) | ! [X1269] : (~r1(X1268,X1269) | ! [X1270] : (~r1(X1269,X1270) | ! [X1271] : (~r1(X1270,X1271) | ! [X1272] : (~r1(X1271,X1272) | ! [X1273] : (! [X1274] : (~r1(X1273,X1274) | ! [X1275] : (~r1(X1274,X1275) | ! [X1276] : (~r1(X1275,X1276) | ! [X1277] : (! [X1278] : (! [X1279] : (~r1(X1278,X1279) | ! [X1280] : (! [X1281] : (~r1(X1280,X1281) | ~((~p45(X1281) & ~p44(X1281)) | (p44(X1281) & p45(X1281)))) | ~r1(X1279,X1280))) | ~r1(X1277,X1278)) | ~r1(X1276,X1277))))) | ~r1(X1272,X1273))))))) | ~r1(X1266,X1267)) | ~r1(X1265,X1266)))) | ~r1(X1262,X1263)) | ~r1(X1261,X1262))) | ~r1(X1259,X1260)) | ~r1(X1258,X1259))) | ~r1(X1256,X1257)) | ~r1(X1255,X1256)) | ~r1(X1254,X1255))) | ~r1(X1252,X1253)) | ~r1(X1251,X1252)) | ~r1(X1250,X1251))) | ~r1(X1248,X1249))) | ~r1(X1246,X1247)) | ~r1(X1245,X1246))))))))) | ~r1(X1237,X1238)) | ~r1(X1236,X1237)))) | ~r1(X115,X117)) | ~! [X1282] : (~r1(X115,X1282) | ! [X1283] : (~r1(X1282,X1283) | ! [X1284] : (! [X1285] : (~r1(X1284,X1285) | ! [X1286] : (! [X1287] : (! [X1288] : (! [X1289] : (! [X1290] : (~r1(X1289,X1290) | ! [X1291] : (~r1(X1290,X1291) | ! [X1292] : (! [X1293] : (~r1(X1292,X1293) | ! [X1294] : (! [X1295] : (~r1(X1294,X1295) | ! [X1296] : (~r1(X1295,X1296) | ! [X1297] : (~r1(X1296,X1297) | ! [X1298] : (! [X1299] : (! [X1300] : (~r1(X1299,X1300) | ! [X1301] : (~r1(X1300,X1301) | ! [X1302] : (~r1(X1301,X1302) | ! [X1303] : (! [X1304] : (~r1(X1303,X1304) | ! [X1305] : (~r1(X1304,X1305) | ! [X1306] : (~r1(X1305,X1306) | ! [X1307] : (! [X1308] : (~r1(X1307,X1308) | ! [X1309] : (~r1(X1308,X1309) | ! [X1310] : (~r1(X1309,X1310) | ! [X1311] : (! [X1312] : (! [X1313] : (~r1(X1312,X1313) | ! [X1314] : (~r1(X1313,X1314) | ! [X1315] : (! [X1316] : (~r1(X1315,X1316) | ! [X1317] : (! [X1318] : (! [X1319] : (! [X1320] : (! [X1321] : (! [X1322] : (~r1(X1321,X1322) | ! [X1323] : (~r1(X1322,X1323) | ! [X1324] : (! [X1325] : (~r1(X1324,X1325) | ! [X1326] : (~r1(X1325,X1326) | ! [X1327] : (~r1(X1326,X1327) | ! [X1328] : (~((~p46(X1328) & ~p45(X1328)) | (p46(X1328) & p45(X1328))) | ~r1(X1327,X1328))))) | ~r1(X1323,X1324)))) | ~r1(X1320,X1321)) | ~r1(X1319,X1320)) | ~r1(X1318,X1319)) | ~r1(X1317,X1318)) | ~r1(X1316,X1317))) | ~r1(X1314,X1315)))) | ~r1(X1311,X1312)) | ~r1(X1310,X1311))))) | ~r1(X1306,X1307))))) | ~r1(X1302,X1303))))) | ~r1(X1298,X1299)) | ~r1(X1297,X1298))))) | ~r1(X1293,X1294))) | ~r1(X1291,X1292)))) | ~r1(X1288,X1289)) | ~r1(X1287,X1288)) | ~r1(X1286,X1287)) | ~r1(X1285,X1286))) | ~r1(X1283,X1284))))) | ~r1(X113,X115)) | ~! [X1329] : (! [X1330] : (~r1(X1329,X1330) | ! [X1331] : (~r1(X1330,X1331) | ! [X1332] : (~r1(X1331,X1332) | ! [X1333] : (! [X1334] : (~r1(X1333,X1334) | ! [X1335] : (~r1(X1334,X1335) | ! [X1336] : (~r1(X1335,X1336) | ! [X1337] : (~r1(X1336,X1337) | ! [X1338] : (~r1(X1337,X1338) | ! [X1339] : (~r1(X1338,X1339) | ! [X1340] : (! [X1341] : (~r1(X1340,X1341) | ! [X1342] : (! [X1343] : (~r1(X1342,X1343) | ! [X1344] : (! [X1345] : (! [X1346] : (~r1(X1345,X1346) | ! [X1347] : (~r1(X1346,X1347) | ! [X1348] : (! [X1349] : (~r1(X1348,X1349) | ! [X1350] : (! [X1351] : (! [X1352] : (~r1(X1351,X1352) | ! [X1353] : (~r1(X1352,X1353) | ! [X1354] : (! [X1355] : (~r1(X1354,X1355) | ! [X1356] : (! [X1357] : (~r1(X1356,X1357) | ! [X1358] : (~r1(X1357,X1358) | ! [X1359] : (! [X1360] : (! [X1361] : (! [X1362] : (~r1(X1361,X1362) | ! [X1363] : (! [X1364] : (~r1(X1363,X1364) | ! [X1365] : (! [X1366] : (~r1(X1365,X1366) | ! [X1367] : (~r1(X1366,X1367) | ! [X1368] : (~r1(X1367,X1368) | ! [X1369] : (! [X1370] : (~r1(X1369,X1370) | ! [X1371] : (~r1(X1370,X1371) | ! [X1372] : (~r1(X1371,X1372) | ! [X1373] : (~r1(X1372,X1373) | ! [X1374] : (~r1(X1373,X1374) | ! [X1375] : (~r1(X1374,X1375) | ! [X1376] : (~((p47(X1376) & p46(X1376)) | (~p46(X1376) & ~p47(X1376))) | ~r1(X1375,X1376)))))))) | ~r1(X1368,X1369))))) | ~r1(X1364,X1365))) | ~r1(X1362,X1363))) | ~r1(X1360,X1361)) | ~r1(X1359,X1360)) | ~r1(X1358,X1359)))) | ~r1(X1355,X1356))) | ~r1(X1353,X1354)))) | ~r1(X1350,X1351)) | ~r1(X1349,X1350))) | ~r1(X1347,X1348)))) | ~r1(X1344,X1345)) | ~r1(X1343,X1344))) | ~r1(X1341,X1342))) | ~r1(X1339,X1340)))))))) | ~r1(X1332,X1333))))) | ~r1(X113,X1329))) | ~r1(X112,X113)) | ! [X1377] : (p48(X1377) | ~r1(X112,X1377)) | ~! [X1378] : (! [X1379] : (! [X1380] : (! [X1381] : (~r1(X1380,X1381) | ! [X1382] : (~r1(X1381,X1382) | ! [X1383] : (! [X1384] : (~r1(X1383,X1384) | ! [X1385] : (! [X1386] : (~r1(X1385,X1386) | ! [X1387] : (~r1(X1386,X1387) | ! [X1388] : (! [X1389] : (~r1(X1388,X1389) | ! [X1390] : (~r1(X1389,X1390) | ! [X1391] : (~r1(X1390,X1391) | ! [X1392] : (! [X1393] : (! [X1394] : (~r1(X1393,X1394) | ! [X1395] : (! [X1396] : (! [X1397] : (~r1(X1396,X1397) | ! [X1398] : (! [X1399] : (~r1(X1398,X1399) | ! [X1400] : (! [X1401] : (~r1(X1400,X1401) | ! [X1402] : (~r1(X1401,X1402) | ! [X1403] : (! [X1404] : (~r1(X1403,X1404) | ! [X1405] : (! [X1406] : (! [X1407] : (~r1(X1406,X1407) | ! [X1408] : (! [X1409] : (~r1(X1408,X1409) | ! [X1410] : (! [X1411] : (! [X1412] : (! [X1413] : (~r1(X1412,X1413) | ! [X1414] : (~r1(X1413,X1414) | ! [X1415] : (! [X1416] : (! [X1417] : (! [X1418] : (~r1(X1417,X1418) | ! [X1419] : (~r1(X1418,X1419) | ! [X1420] : (~r1(X1419,X1420) | ! [X1421] : (~r1(X1420,X1421) | ! [X1422] : (! [X1423] : (! [X1424] : (! [X1425] : (~r1(X1424,X1425) | ! [X1426] : (~((~p47(X1426) & ~p48(X1426)) | (p48(X1426) & p47(X1426))) | ~r1(X1425,X1426))) | ~r1(X1423,X1424)) | ~r1(X1422,X1423)) | ~r1(X1421,X1422)))))) | ~r1(X1416,X1417)) | ~r1(X1415,X1416)) | ~r1(X1414,X1415)))) | ~r1(X1411,X1412)) | ~r1(X1410,X1411)) | ~r1(X1409,X1410))) | ~r1(X1407,X1408))) | ~r1(X1405,X1406)) | ~r1(X1404,X1405))) | ~r1(X1402,X1403)))) | ~r1(X1399,X1400))) | ~r1(X1397,X1398))) | ~r1(X1395,X1396)) | ~r1(X1394,X1395))) | ~r1(X1392,X1393)) | ~r1(X1391,X1392))))) | ~r1(X1387,X1388)))) | ~r1(X1384,X1385))) | ~r1(X1382,X1383)))) | ~r1(X1379,X1380)) | ~r1(X1378,X1379)) | ~r1(X112,X1378))) | ~r1(X111,X112)) | ! [X1427] : (p49(X1427) | ~r1(X111,X1427)) | ~! [X1428] : (! [X1429] : (! [X1430] : (~r1(X1429,X1430) | ! [X1431] : (~r1(X1430,X1431) | ! [X1432] : (~r1(X1431,X1432) | ! [X1433] : (! [X1434] : (~r1(X1433,X1434) | ! [X1435] : (~r1(X1434,X1435) | ! [X1436] : (! [X1437] : (~r1(X1436,X1437) | ! [X1438] : (~r1(X1437,X1438) | ! [X1439] : (~r1(X1438,X1439) | ! [X1440] : (~r1(X1439,X1440) | ! [X1441] : (! [X1442] : (~r1(X1441,X1442) | ! [X1443] : (~r1(X1442,X1443) | ! [X1444] : (~r1(X1443,X1444) | ! [X1445] : (~r1(X1444,X1445) | ! [X1446] : (! [X1447] : (~r1(X1446,X1447) | ! [X1448] : (~r1(X1447,X1448) | ! [X1449] : (~r1(X1448,X1449) | ! [X1450] : (! [X1451] : (! [X1452] : (~r1(X1451,X1452) | ! [X1453] : (! [X1454] : (~r1(X1453,X1454) | ! [X1455] : (~r1(X1454,X1455) | ! [X1456] : (~r1(X1455,X1456) | ! [X1457] : (~r1(X1456,X1457) | ! [X1458] : (! [X1459] : (! [X1460] : (! [X1461] : (~r1(X1460,X1461) | ! [X1462] : (! [X1463] : (! [X1464] : (! [X1465] : (! [X1466] : (~r1(X1465,X1466) | ! [X1467] : (~r1(X1466,X1467) | ! [X1468] : (~r1(X1467,X1468) | ! [X1469] : (~r1(X1468,X1469) | ! [X1470] : (! [X1471] : (! [X1472] : (~r1(X1471,X1472) | ! [X1473] : (! [X1474] : (! [X1475] : (! [X1476] : (! [X1477] : (~r1(X1476,X1477) | ~((p49(X1477) & p48(X1477)) | (~p49(X1477) & ~p48(X1477)))) | ~r1(X1475,X1476)) | ~r1(X1474,X1475)) | ~r1(X1473,X1474)) | ~r1(X1472,X1473))) | ~r1(X1470,X1471)) | ~r1(X1469,X1470)))))) | ~r1(X1464,X1465)) | ~r1(X1463,X1464)) | ~r1(X1462,X1463)) | ~r1(X1461,X1462))) | ~r1(X1459,X1460)) | ~r1(X1458,X1459)) | ~r1(X1457,X1458)))))) | ~r1(X1452,X1453))) | ~r1(X1450,X1451)) | ~r1(X1449,X1450))))) | ~r1(X1445,X1446)))))) | ~r1(X1440,X1441)))))) | ~r1(X1435,X1436)))) | ~r1(X1432,X1433))))) | ~r1(X1428,X1429)) | ~r1(X111,X1428))) | ~r1(X109,X111)) | ~! [X1478] : (~r1(X109,X1478) | ! [X1479] : (! [X1480] : (! [X1481] : (! [X1482] : (! [X1483] : (~r1(X1482,X1483) | ! [X1484] : (! [X1485] : (~r1(X1484,X1485) | ! [X1486] : (! [X1487] : (! [X1488] : (~r1(X1487,X1488) | ! [X1489] : (~r1(X1488,X1489) | ! [X1490] : (~r1(X1489,X1490) | ! [X1491] : (~r1(X1490,X1491) | ! [X1492] : (~r1(X1491,X1492) | ! [X1493] : (! [X1494] : (~r1(X1493,X1494) | ! [X1495] : (~r1(X1494,X1495) | ! [X1496] : (! [X1497] : (! [X1498] : (! [X1499] : (! [X1500] : (! [X1501] : (~r1(X1500,X1501) | ! [X1502] : (! [X1503] : (~r1(X1502,X1503) | ! [X1504] : (~r1(X1503,X1504) | ! [X1505] : (! [X1506] : (! [X1507] : (! [X1508] : (! [X1509] : (~r1(X1508,X1509) | ! [X1510] : (~r1(X1509,X1510) | ! [X1511] : (~r1(X1510,X1511) | ! [X1512] : (~r1(X1511,X1512) | ! [X1513] : (~r1(X1512,X1513) | ! [X1514] : (! [X1515] : (! [X1516] : (~r1(X1515,X1516) | ! [X1517] : (~r1(X1516,X1517) | ! [X1518] : (~r1(X1517,X1518) | ! [X1519] : (! [X1520] : (! [X1521] : (! [X1522] : (! [X1523] : (! [X1524] : (! [X1525] : (~r1(X1524,X1525) | ! [X1526] : (~r1(X1525,X1526) | ! [X1527] : (~r1(X1526,X1527) | ! [X1528] : (~((~p49(X1528) & ~p50(X1528)) | (p49(X1528) & p50(X1528))) | ~r1(X1527,X1528))))) | ~r1(X1523,X1524)) | ~r1(X1522,X1523)) | ~r1(X1521,X1522)) | ~r1(X1520,X1521)) | ~r1(X1519,X1520)) | ~r1(X1518,X1519))))) | ~r1(X1514,X1515)) | ~r1(X1513,X1514))))))) | ~r1(X1507,X1508)) | ~r1(X1506,X1507)) | ~r1(X1505,X1506)) | ~r1(X1504,X1505)))) | ~r1(X1501,X1502))) | ~r1(X1499,X1500)) | ~r1(X1498,X1499)) | ~r1(X1497,X1498)) | ~r1(X1496,X1497)) | ~r1(X1495,X1496)))) | ~r1(X1492,X1493))))))) | ~r1(X1486,X1487)) | ~r1(X1485,X1486))) | ~r1(X1483,X1484))) | ~r1(X1481,X1482)) | ~r1(X1480,X1481)) | ~r1(X1479,X1480)) | ~r1(X1478,X1479)))) | ~r1(X56,X109)) | ! [X1529] : (~r1(X56,X1529) | p51(X1529))) | ~r1(X1,X56))) | ~r1(X0,X1)) | ! [X1530] : (! [X1531] : (~r1(X1530,X1531) | ! [X1532] : (! [X1533] : (~r1(X1532,X1533) | ! [X1534] : (~r1(X1533,X1534) | ! [X1535] : (~r1(X1534,X1535) | ! [X1536] : (~r1(X1535,X1536) | ! [X1537] : (~r1(X1536,X1537) | ! [X1538] : (! [X1539] : (~r1(X1538,X1539) | ! [X1540] : (~r1(X1539,X1540) | ! [X1541] : (! [X1542] : (! [X1543] : (! [X1544] : (! [X1545] : (~r1(X1544,X1545) | ! [X1546] : (! [X1547] : (~r1(X1546,X1547) | ! [X1548] : (! [X1549] : (! [X1550] : (! [X1551] : (~r1(X1550,X1551) | ! [X1552] : (~r1(X1551,X1552) | ! [X1553] : (~r1(X1552,X1553) | ! [X1554] : (~r1(X1553,X1554) | ! [X1555] : (~r1(X1554,X1555) | ! [X1556] : (! [X1557] : (~r1(X1556,X1557) | ! [X1558] : (! [X1559] : (~r1(X1558,X1559) | ! [X1560] : (~r1(X1559,X1560) | ! [X1561] : (~r1(X1560,X1561) | ! [X1562] : (~r1(X1561,X1562) | ! [X1563] : (~r1(X1562,X1563) | ! [X1564] : (! [X1565] : (! [X1566] : (! [X1567] : (! [X1568] : (! [X1569] : (! [X1570] : (~r1(X1569,X1570) | ! [X1571] : (~r1(X1570,X1571) | ! [X1572] : (! [X1573] : (~r1(X1572,X1573) | ! [X1574] : (~r1(X1573,X1574) | ! [X1575] : (~r1(X1574,X1575) | ! [X1576] : (~r1(X1575,X1576) | ! [X1577] : (! [X1578] : (! [X1579] : (! [X1580] : (~r1(X1579,X1580) | ! [X1581] : ~r1(X1580,X1581)) | ~r1(X1578,X1579)) | ~r1(X1577,X1578)) | ~r1(X1576,X1577)))))) | ~r1(X1571,X1572)))) | ~r1(X1568,X1569)) | ~r1(X1567,X1568)) | ~r1(X1566,X1567)) | ~r1(X1565,X1566)) | ~r1(X1564,X1565)) | ~r1(X1563,X1564))))))) | ~r1(X1557,X1558))) | ~r1(X1555,X1556))))))) | ~r1(X1549,X1550)) | ~r1(X1548,X1549)) | ~r1(X1547,X1548))) | ~r1(X1545,X1546))) | ~r1(X1543,X1544)) | ~r1(X1542,X1543)) | ~r1(X1541,X1542)) | ~r1(X1540,X1541)))) | ~r1(X1537,X1538))))))) | ~r1(X1531,X1532))) | ~r1(X0,X1530)) | ! [X1582] : ~r1(X0,X1582) | ! [X1583] : (~r1(X0,X1583) | ! [X1584] : (~r1(X1583,X1584) | ! [X1585] : (~r1(X1584,X1585) | ! [X1586] : (! [X1587] : (! [X1588] : (! [X1589] : (~r1(X1588,X1589) | ! [X1590] : (! [X1591] : (~r1(X1590,X1591) | ! [X1592] : (! [X1593] : (! [X1594] : (! [X1595] : (~r1(X1594,X1595) | ! [X1596] : (! [X1597] : (! [X1598] : (~r1(X1597,X1598) | ! [X1599] : (~r1(X1598,X1599) | ! [X1600] : (! [X1601] : (! [X1602] : (~r1(X1601,X1602) | ! [X1603] : (~r1(X1602,X1603) | ! [X1604] : (~r1(X1603,X1604) | ! [X1605] : (! [X1606] : (! [X1607] : (! [X1608] : (! [X1609] : (! [X1610] : (~r1(X1609,X1610) | ! [X1611] : (! [X1612] : (! [X1613] : (! [X1614] : (~r1(X1613,X1614) | ! [X1615] : (~r1(X1614,X1615) | ! [X1616] : (~r1(X1615,X1616) | ! [X1617] : (! [X1618] : (! [X1619] : (! [X1620] : (~r1(X1619,X1620) | ! [X1621] : (~r1(X1620,X1621) | ! [X1622] : (~r1(X1621,X1622) | ! [X1623] : (! [X1624] : (! [X1625] : (! [X1626] : (! [X1627] : (~r1(X1626,X1627) | ! [X1628] : (! [X1629] : (~r1(X1628,X1629) | ! [X1630] : (! [X1631] : (~r1(X1630,X1631) | ! [X1632] : (~r1(X1631,X1632) | ! [X1633] : (~r1(X1632,X1633) | ! [X1634] : ~r1(X1633,X1634)))) | ~r1(X1629,X1630))) | ~r1(X1627,X1628))) | ~r1(X1625,X1626)) | ~r1(X1624,X1625)) | ~r1(X1623,X1624)) | ~r1(X1622,X1623))))) | ~r1(X1618,X1619)) | ~r1(X1617,X1618)) | ~r1(X1616,X1617))))) | ~r1(X1612,X1613)) | ~r1(X1611,X1612)) | ~r1(X1610,X1611))) | ~r1(X1608,X1609)) | ~r1(X1607,X1608)) | ~r1(X1606,X1607)) | ~r1(X1605,X1606)) | ~r1(X1604,X1605))))) | ~r1(X1600,X1601)) | ~r1(X1599,X1600)))) | ~r1(X1596,X1597)) | ~r1(X1595,X1596))) | ~r1(X1593,X1594)) | ~r1(X1592,X1593)) | ~r1(X1591,X1592))) | ~r1(X1589,X1590))) | ~r1(X1587,X1588)) | ~r1(X1586,X1587)) | ~r1(X1585,X1586))))))), 23.28/23.16 inference(pure_predicate_removal,[],[f7])). 23.28/23.16 fof(f7,plain,( 23.28/23.16 ? [X0] : ~(~! [X1] : (~(~! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (~((p1(X54) & p51(X54)) | (~p1(X54) & ~p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ! [X55] : (p52(X55) | ~r1(X1,X55)) | ~! [X56] : (~(~! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (~((~p51(X108) & ~p50(X108)) | (p50(X108) & p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) | ~! [X109] : (~(! [X110] : (p50(X110) | ~r1(X109,X110)) | ~! [X111] : (~(~! [X112] : (~(~! [X113] : (~(! [X114] : (~r1(X113,X114) | p47(X114)) | ~! [X115] : (~(! [X116] : (p46(X116) | ~r1(X115,X116)) | ~! [X117] : (~(! [X118] : (p45(X118) | ~r1(X117,X118)) | ~! [X119] : (~(! [X120] : (~r1(X119,X120) | p44(X120)) | ~! [X121] : (~r1(X119,X121) | ~(! [X122] : (p43(X122) | ~r1(X121,X122)) | ~! [X123] : (~(~! [X124] : (~r1(X123,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (! [X130] : (! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (! [X134] : (~r1(X133,X134) | ! [X135] : (~r1(X134,X135) | ! [X136] : (! [X137] : (! [X138] : (! [X139] : (! [X140] : (~r1(X139,X140) | ! [X141] : (! [X142] : (! [X143] : (! [X144] : (! [X145] : (~r1(X144,X145) | ! [X146] : (! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (! [X165] : (! [X166] : (~r1(X165,X166) | ~((~p42(X166) & ~p41(X166)) | (p42(X166) & p41(X166)))) | ~r1(X164,X165)) | ~r1(X163,X164)) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160)) | ~r1(X158,X159)))) | ~r1(X155,X156)) | ~r1(X154,X155))))))) | ~r1(X148,X149)) | ~r1(X147,X148))) | ~r1(X145,X146))) | ~r1(X143,X144)) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141))) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137)) | ~r1(X135,X136)))) | ~r1(X132,X133)) | ~r1(X131,X132))) | ~r1(X129,X130)) | ~r1(X128,X129))))))) | ! [X167] : (p42(X167) | ~r1(X123,X167)) | ~! [X168] : (~r1(X123,X168) | ~(! [X169] : (p41(X169) | ~r1(X168,X169)) | ~! [X170] : (~r1(X168,X170) | ~(~! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (! [X174] : (! [X175] : (! [X176] : (! [X177] : (! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (! [X186] : (! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (~r1(X190,X191) | ! [X192] : (! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (~r1(X195,X196) | ! [X197] : (~r1(X196,X197) | ! [X198] : (! [X199] : (! [X200] : (~r1(X199,X200) | ! [X201] : (~r1(X200,X201) | ! [X202] : (! [X203] : (~r1(X202,X203) | ! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (~r1(X205,X206) | ! [X207] : (! [X208] : (~r1(X207,X208) | ! [X209] : (! [X210] : (~r1(X209,X210) | ! [X211] : (~r1(X210,X211) | ~((~p39(X211) & ~p40(X211)) | (p39(X211) & p40(X211))))) | ~r1(X208,X209))) | ~r1(X206,X207)))) | ~r1(X203,X204))) | ~r1(X201,X202)))) | ~r1(X198,X199)) | ~r1(X197,X198))))))) | ~r1(X191,X192))) | ~r1(X189,X190)))) | ~r1(X186,X187)) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184))) | ~r1(X181,X182)) | ~r1(X180,X181))) | ~r1(X178,X179)) | ~r1(X177,X178)) | ~r1(X176,X177)) | ~r1(X175,X176)) | ~r1(X174,X175)) | ~r1(X173,X174)) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~! [X212] : (~r1(X170,X212) | ~(~! [X213] : (~r1(X212,X213) | ~(~! [X214] : (~r1(X213,X214) | ~(~! [X215] : (! [X216] : (~r1(X215,X216) | ! [X217] : (~r1(X216,X217) | ! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (! [X221] : (! [X222] : (! [X223] : (~r1(X222,X223) | ! [X224] : (~r1(X223,X224) | ! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (~r1(X233,X234) | ! [X235] : (! [X236] : (~r1(X235,X236) | ! [X237] : (~r1(X236,X237) | ! [X238] : (~r1(X237,X238) | ! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~r1(X242,X243) | ! [X244] : (! [X245] : (! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (~r1(X251,X252) | ~((p36(X252) & p37(X252)) | (~p36(X252) & ~p37(X252))))) | ~r1(X249,X250))))) | ~r1(X245,X246)) | ~r1(X244,X245)) | ~r1(X243,X244)))))))))) | ~r1(X234,X235))))) | ~r1(X230,X231)))) | ~r1(X227,X228)) | ~r1(X226,X227)) | ~r1(X225,X226))))) | ~r1(X221,X222)) | ~r1(X220,X221)) | ~r1(X219,X220)) | ~r1(X218,X219))))) | ~r1(X214,X215)) | ! [X253] : (~r1(X214,X253) | p37(X253)) | ~! [X254] : (~r1(X214,X254) | ~(~! [X255] : (~(~! [X256] : (~(~! [X257] : (~r1(X256,X257) | ! [X258] : (! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (! [X263] : (~r1(X262,X263) | ! [X264] : (! [X265] : (~r1(X264,X265) | ! [X266] : (! [X267] : (! [X268] : (! [X269] : (~r1(X268,X269) | ! [X270] : (~r1(X269,X270) | ! [X271] : (~r1(X270,X271) | ! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (! [X280] : (~r1(X279,X280) | ! [X281] : (~r1(X280,X281) | ! [X282] : (! [X283] : (! [X284] : (~r1(X283,X284) | ! [X285] : (! [X286] : (! [X287] : (! [X288] : (! [X289] : (~r1(X288,X289) | ! [X290] : (~r1(X289,X290) | ! [X291] : (~((p34(X291) & p33(X291)) | (~p33(X291) & ~p34(X291))) | ~r1(X290,X291)))) | ~r1(X287,X288)) | ~r1(X286,X287)) | ~r1(X285,X286)) | ~r1(X284,X285))) | ~r1(X282,X283)) | ~r1(X281,X282)))) | ~r1(X278,X279)))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272))))) | ~r1(X267,X268)) | ~r1(X266,X267)) | ~r1(X265,X266))) | ~r1(X263,X264))) | ~r1(X261,X262)) | ~r1(X260,X261)))) | ~r1(X257,X258))) | ~! [X292] : (~(~! [X293] : (~r1(X292,X293) | ~(~! [X294] : (~r1(X293,X294) | ! [X295] : (! [X296] : (~r1(X295,X296) | ! [X297] : (! [X298] : (! [X299] : (~r1(X298,X299) | ! [X300] : (! [X301] : (! [X302] : (~r1(X301,X302) | ! [X303] : (~r1(X302,X303) | ! [X304] : (! [X305] : (~r1(X304,X305) | ! [X306] : (! [X307] : (~r1(X306,X307) | ! [X308] : (! [X309] : (! [X310] : (! [X311] : (! [X312] : (~r1(X311,X312) | ! [X313] : (~r1(X312,X313) | ! [X314] : (~r1(X313,X314) | ! [X315] : (! [X316] : (~r1(X315,X316) | ! [X317] : (! [X318] : (! [X319] : (! [X320] : (~r1(X319,X320) | ! [X321] : (! [X322] : (! [X323] : (~r1(X322,X323) | ! [X324] : (~r1(X323,X324) | ! [X325] : (~r1(X324,X325) | ! [X326] : (~r1(X325,X326) | ~((p31(X326) & p32(X326)) | (~p32(X326) & ~p31(X326))))))) | ~r1(X321,X322)) | ~r1(X320,X321))) | ~r1(X318,X319)) | ~r1(X317,X318)) | ~r1(X316,X317))) | ~r1(X314,X315))))) | ~r1(X310,X311)) | ~r1(X309,X310)) | ~r1(X308,X309)) | ~r1(X307,X308))) | ~r1(X305,X306))) | ~r1(X303,X304)))) | ~r1(X300,X301)) | ~r1(X299,X300))) | ~r1(X297,X298)) | ~r1(X296,X297))) | ~r1(X294,X295))) | ! [X327] : (p32(X327) | ~r1(X293,X327)) | ~! [X328] : (~(~! [X329] : (! [X330] : (! [X331] : (~r1(X330,X331) | ! [X332] : (! [X333] : (~r1(X332,X333) | ! [X334] : (~r1(X333,X334) | ! [X335] : (~r1(X334,X335) | ! [X336] : (~r1(X335,X336) | ! [X337] : (! [X338] : (~r1(X337,X338) | ! [X339] : (! [X340] : (~r1(X339,X340) | ! [X341] : (! [X342] : (~r1(X341,X342) | ! [X343] : (~r1(X342,X343) | ! [X344] : (! [X345] : (~r1(X344,X345) | ! [X346] : (! [X347] : (! [X348] : (! [X349] : (! [X350] : (! [X351] : (! [X352] : (! [X353] : (! [X354] : (~r1(X353,X354) | ! [X355] : (~r1(X354,X355) | ! [X356] : (~r1(X355,X356) | ! [X357] : (! [X358] : (~r1(X357,X358) | ! [X359] : (! [X360] : (~((p31(X360) & p30(X360)) | (~p30(X360) & ~p31(X360))) | ~r1(X359,X360)) | ~r1(X358,X359))) | ~r1(X356,X357))))) | ~r1(X352,X353)) | ~r1(X351,X352)) | ~r1(X350,X351)) | ~r1(X349,X350)) | ~r1(X348,X349)) | ~r1(X347,X348)) | ~r1(X346,X347)) | ~r1(X345,X346))) | ~r1(X343,X344)))) | ~r1(X340,X341))) | ~r1(X338,X339))) | ~r1(X336,X337)))))) | ~r1(X331,X332))) | ~r1(X329,X330)) | ~r1(X328,X329)) | ! [X361] : (~r1(X328,X361) | p31(X361)) | ~! [X362] : (~(! [X363] : (p30(X363) | ~r1(X362,X363)) | ~! [X364] : (~(~! [X365] : (! [X366] : (~r1(X365,X366) | ! [X367] : (! [X368] : (! [X369] : (! [X370] : (! [X371] : (! [X372] : (~r1(X371,X372) | ! [X373] : (~r1(X372,X373) | ! [X374] : (! [X375] : (~r1(X374,X375) | ! [X376] : (! [X377] : (~r1(X376,X377) | ! [X378] : (~r1(X377,X378) | ! [X379] : (! [X380] : (~r1(X379,X380) | ! [X381] : (! [X382] : (! [X383] : (~r1(X382,X383) | ! [X384] : (~r1(X383,X384) | ! [X385] : (~r1(X384,X385) | ! [X386] : (! [X387] : (! [X388] : (! [X389] : (~r1(X388,X389) | ! [X390] : (~r1(X389,X390) | ! [X391] : (! [X392] : (! [X393] : (! [X394] : (~((~p28(X394) & ~p29(X394)) | (p28(X394) & p29(X394))) | ~r1(X393,X394)) | ~r1(X392,X393)) | ~r1(X391,X392)) | ~r1(X390,X391)))) | ~r1(X387,X388)) | ~r1(X386,X387)) | ~r1(X385,X386))))) | ~r1(X381,X382)) | ~r1(X380,X381))) | ~r1(X378,X379)))) | ~r1(X375,X376))) | ~r1(X373,X374)))) | ~r1(X370,X371)) | ~r1(X369,X370)) | ~r1(X368,X369)) | ~r1(X367,X368)) | ~r1(X366,X367))) | ~r1(X364,X365)) | ~! [X395] : (~(~! [X396] : (~(! [X397] : (~r1(X396,X397) | p27(X397)) | ~! [X398] : (~r1(X396,X398) | ~(~! [X399] : (! [X400] : (~r1(X399,X400) | ! [X401] : (! [X402] : (! [X403] : (! [X404] : (! [X405] : (~r1(X404,X405) | ! [X406] : (~r1(X405,X406) | ! [X407] : (~r1(X406,X407) | ! [X408] : (~r1(X407,X408) | ! [X409] : (~r1(X408,X409) | ! [X410] : (~r1(X409,X410) | ! [X411] : (! [X412] : (~r1(X411,X412) | ! [X413] : (! [X414] : (~r1(X413,X414) | ! [X415] : (~r1(X414,X415) | ! [X416] : (~r1(X415,X416) | ! [X417] : (~r1(X416,X417) | ! [X418] : (! [X419] : (~r1(X418,X419) | ! [X420] : (! [X421] : (~r1(X420,X421) | ! [X422] : (! [X423] : (~r1(X422,X423) | ! [X424] : (~r1(X423,X424) | ! [X425] : (~r1(X424,X425) | ~((p25(X425) & p26(X425)) | (~p25(X425) & ~p26(X425)))))) | ~r1(X421,X422))) | ~r1(X419,X420))) | ~r1(X417,X418)))))) | ~r1(X412,X413))) | ~r1(X410,X411)))))))) | ~r1(X403,X404)) | ~r1(X402,X403)) | ~r1(X401,X402)) | ~r1(X400,X401))) | ~r1(X398,X399)) | ~! [X426] : (~(~! [X427] : (~(! [X428] : (~r1(X427,X428) | p24(X428)) | ~! [X429] : (~r1(X427,X429) | ~(! [X430] : (p23(X430) | ~r1(X429,X430)) | ~! [X431] : (~r1(X429,X431) | ~(~! [X432] : (! [X433] : (~r1(X432,X433) | ! [X434] : (~r1(X433,X434) | ! [X435] : (! [X436] : (~r1(X435,X436) | ! [X437] : (~r1(X436,X437) | ! [X438] : (~r1(X437,X438) | ! [X439] : (! [X440] : (~r1(X439,X440) | ! [X441] : (! [X442] : (! [X443] : (! [X444] : (! [X445] : (~r1(X444,X445) | ! [X446] : (~r1(X445,X446) | ! [X447] : (! [X448] : (~r1(X447,X448) | ! [X449] : (! [X450] : (~r1(X449,X450) | ! [X451] : (~r1(X450,X451) | ! [X452] : (! [X453] : (~r1(X452,X453) | ! [X454] : (~r1(X453,X454) | ~((p21(X454) & p22(X454)) | (~p21(X454) & ~p22(X454))))) | ~r1(X451,X452)))) | ~r1(X448,X449))) | ~r1(X446,X447)))) | ~r1(X443,X444)) | ~r1(X442,X443)) | ~r1(X441,X442)) | ~r1(X440,X441))) | ~r1(X438,X439))))) | ~r1(X434,X435)))) | ~r1(X431,X432)) | ~! [X455] : (~(! [X456] : (~r1(X455,X456) | p21(X456)) | ~! [X457] : (~(! [X458] : (~r1(X457,X458) | p20(X458)) | ~! [X459] : (~(! [X460] : (~r1(X459,X460) | p19(X460)) | ~! [X461] : (~(~! [X462] : (~r1(X461,X462) | ! [X463] : (~r1(X462,X463) | ! [X464] : (~r1(X463,X464) | ! [X465] : (! [X466] : (! [X467] : (! [X468] : (~r1(X467,X468) | ! [X469] : (! [X470] : (! [X471] : (~r1(X470,X471) | ! [X472] : (~r1(X471,X472) | ! [X473] : (! [X474] : (~r1(X473,X474) | ! [X475] : (! [X476] : (! [X477] : (! [X478] : (! [X479] : (~r1(X478,X479) | ! [X480] : (~r1(X479,X480) | ~((~p17(X480) & ~p18(X480)) | (p17(X480) & p18(X480))))) | ~r1(X477,X478)) | ~r1(X476,X477)) | ~r1(X475,X476)) | ~r1(X474,X475))) | ~r1(X472,X473)))) | ~r1(X469,X470)) | ~r1(X468,X469))) | ~r1(X466,X467)) | ~r1(X465,X466)) | ~r1(X464,X465))))) | ~! [X481] : (~r1(X461,X481) | ~(~! [X482] : (~r1(X481,X482) | ! [X483] : (! [X484] : (~r1(X483,X484) | ! [X485] : (! [X486] : (~r1(X485,X486) | ! [X487] : (~r1(X486,X487) | ! [X488] : (~r1(X487,X488) | ! [X489] : (~r1(X488,X489) | ! [X490] : (~r1(X489,X490) | ! [X491] : (~r1(X490,X491) | ! [X492] : (~r1(X491,X492) | ! [X493] : (! [X494] : (! [X495] : (~r1(X494,X495) | ! [X496] : (~r1(X495,X496) | ! [X497] : (~r1(X496,X497) | ! [X498] : (! [X499] : (~r1(X498,X499) | ~((~p17(X499) & ~p16(X499)) | (p16(X499) & p17(X499)))) | ~r1(X497,X498))))) | ~r1(X493,X494)) | ~r1(X492,X493))))))))) | ~r1(X484,X485))) | ~r1(X482,X483))) | ! [X500] : (p17(X500) | ~r1(X481,X500)) | ~! [X501] : (~r1(X481,X501) | ~(~! [X502] : (~r1(X501,X502) | ~(~! [X503] : (~r1(X502,X503) | ~(! [X504] : (~r1(X503,X504) | p14(X504)) | ~! [X505] : (~(! [X506] : (p13(X506) | ~r1(X505,X506)) | ~! [X507] : (~r1(X505,X507) | ~(~! [X508] : (~r1(X507,X508) | ! [X509] : (~r1(X508,X509) | ! [X510] : (! [X511] : (! [X512] : (! [X513] : (! [X514] : (~r1(X513,X514) | ! [X515] : (~r1(X514,X515) | ! [X516] : (! [X517] : (~r1(X516,X517) | ! [X518] : (~r1(X517,X518) | ! [X519] : (~r1(X518,X519) | ! [X520] : (~r1(X519,X520) | ~((~p12(X520) & ~p11(X520)) | (p12(X520) & p11(X520))))))) | ~r1(X515,X516)))) | ~r1(X512,X513)) | ~r1(X511,X512)) | ~r1(X510,X511)) | ~r1(X509,X510)))) | ! [X521] : (~r1(X507,X521) | p12(X521)) | ~! [X522] : (~r1(X507,X522) | ~(~! [X523] : (~(~! [X524] : (! [X525] : (! [X526] : (~r1(X525,X526) | ! [X527] : (~r1(X526,X527) | ! [X528] : (~r1(X527,X528) | ! [X529] : (~r1(X528,X529) | ! [X530] : (~r1(X529,X530) | ! [X531] : (! [X532] : (! [X533] : (! [X534] : (~r1(X533,X534) | ~((p10(X534) & p9(X534)) | (~p10(X534) & ~p9(X534)))) | ~r1(X532,X533)) | ~r1(X531,X532)) | ~r1(X530,X531))))))) | ~r1(X524,X525)) | ~r1(X523,X524)) | ! [X535] : (p10(X535) | ~r1(X523,X535)) | ~! [X536] : (~r1(X523,X536) | ~(! [X537] : (~r1(X536,X537) | p9(X537)) | ~! [X538] : (~r1(X536,X538) | ~(~! [X539] : (~r1(X538,X539) | ! [X540] : (! [X541] : (! [X542] : (! [X543] : (~r1(X542,X543) | ! [X544] : (! [X545] : (~r1(X544,X545) | ! [X546] : (! [X547] : (~((p7(X547) & p8(X547)) | (~p7(X547) & ~p8(X547))) | ~r1(X546,X547)) | ~r1(X545,X546))) | ~r1(X543,X544))) | ~r1(X541,X542)) | ~r1(X540,X541)) | ~r1(X539,X540))) | ~! [X548] : (~r1(X538,X548) | ~(~! [X549] : (! [X550] : (! [X551] : (~r1(X550,X551) | ! [X552] : (~r1(X551,X552) | ! [X553] : (~r1(X552,X553) | ! [X554] : (~r1(X553,X554) | ! [X555] : (! [X556] : (~((p7(X556) & p6(X556)) | (~p6(X556) & ~p7(X556))) | ~r1(X555,X556)) | ~r1(X554,X555)))))) | ~r1(X549,X550)) | ~r1(X548,X549)) | ! [X557] : (p7(X557) | ~r1(X548,X557)) | ~! [X558] : (~(~! [X559] : (~(~! [X560] : (~r1(X559,X560) | ~(~! [X561] : (! [X562] : (~r1(X561,X562) | ! [X563] : (~r1(X562,X563) | ! [X564] : (! [X565] : (~((p4(X565) & p3(X565)) | (~p4(X565) & ~p3(X565))) | ~r1(X564,X565)) | ~r1(X563,X564)))) | ~r1(X560,X561)) | ~! [X566] : (~(~! [X567] : (~r1(X566,X567) | ! [X568] : (! [X569] : (! [X570] : (~r1(X569,X570) | ~((~p2(X570) & ~p3(X570)) | (p2(X570) & p3(X570)))) | ~r1(X568,X569)) | ~r1(X567,X568))) | ~! [X571] : (! [X572] : (! [X573] : (~r1(X572,X573) | ! [X574] : (~r1(X573,X574) | ~((~p2(X574) & ~p1(X574)) | (p1(X574) & p2(X574))))) | ~r1(X571,X572)) | ~r1(X566,X571)) | ! [X575] : (p3(X575) | ~r1(X566,X575))) | ~r1(X560,X566)) | ! [X576] : (~r1(X560,X576) | p4(X576)))) | ! [X577] : (~r1(X559,X577) | p5(X577)) | ~! [X578] : (~r1(X559,X578) | ! [X579] : (! [X580] : (! [X581] : (~r1(X580,X581) | ! [X582] : (~r1(X581,X582) | ! [X583] : (~r1(X582,X583) | ~((~p4(X583) & ~p5(X583)) | (p5(X583) & p4(X583)))))) | ~r1(X579,X580)) | ~r1(X578,X579)))) | ~r1(X558,X559)) | ! [X584] : (p6(X584) | ~r1(X558,X584)) | ~! [X585] : (! [X586] : (~r1(X585,X586) | ! [X587] : (! [X588] : (! [X589] : (~r1(X588,X589) | ! [X590] : (~r1(X589,X590) | ! [X591] : (~r1(X590,X591) | ~((p5(X591) & p6(X591)) | (~p6(X591) & ~p5(X591)))))) | ~r1(X587,X588)) | ~r1(X586,X587))) | ~r1(X558,X585))) | ~r1(X548,X558)))) | ! [X592] : (~r1(X538,X592) | p8(X592)))) | ~! [X593] : (~r1(X536,X593) | ! [X594] : (~r1(X593,X594) | ! [X595] : (! [X596] : (! [X597] : (! [X598] : (! [X599] : (~r1(X598,X599) | ! [X600] : (! [X601] : (! [X602] : (~((~p8(X602) & ~p9(X602)) | (p9(X602) & p8(X602))) | ~r1(X601,X602)) | ~r1(X600,X601)) | ~r1(X599,X600))) | ~r1(X597,X598)) | ~r1(X596,X597)) | ~r1(X595,X596)) | ~r1(X594,X595))))))) | ~r1(X522,X523)) | ! [X603] : (~r1(X522,X603) | p11(X603)) | ~! [X604] : (~r1(X522,X604) | ! [X605] : (~r1(X604,X605) | ! [X606] : (~r1(X605,X606) | ! [X607] : (~r1(X606,X607) | ! [X608] : (~r1(X607,X608) | ! [X609] : (~r1(X608,X609) | ! [X610] : (~r1(X609,X610) | ! [X611] : (! [X612] : (! [X613] : (~r1(X612,X613) | ! [X614] : (! [X615] : (~r1(X614,X615) | ~((~p11(X615) & ~p10(X615)) | (p11(X615) & p10(X615)))) | ~r1(X613,X614))) | ~r1(X611,X612)) | ~r1(X610,X611))))))))))))) | ~! [X616] : (! [X617] : (! [X618] : (~r1(X617,X618) | ! [X619] : (! [X620] : (! [X621] : (! [X622] : (~r1(X621,X622) | ! [X623] : (! [X624] : (~r1(X623,X624) | ! [X625] : (~r1(X624,X625) | ! [X626] : (! [X627] : (! [X628] : (~r1(X627,X628) | ! [X629] : (~((~p13(X629) & ~p12(X629)) | (p13(X629) & p12(X629))) | ~r1(X628,X629))) | ~r1(X626,X627)) | ~r1(X625,X626)))) | ~r1(X622,X623))) | ~r1(X620,X621)) | ~r1(X619,X620)) | ~r1(X618,X619))) | ~r1(X616,X617)) | ~r1(X505,X616))) | ~r1(X503,X505)) | ~! [X630] : (~r1(X503,X630) | ! [X631] : (! [X632] : (~r1(X631,X632) | ! [X633] : (! [X634] : (~r1(X633,X634) | ! [X635] : (! [X636] : (! [X637] : (~r1(X636,X637) | ! [X638] : (~r1(X637,X638) | ! [X639] : (~r1(X638,X639) | ! [X640] : (~r1(X639,X640) | ! [X641] : (! [X642] : (~r1(X641,X642) | ! [X643] : (! [X644] : (~r1(X643,X644) | ~((~p14(X644) & ~p13(X644)) | (p14(X644) & p13(X644)))) | ~r1(X642,X643))) | ~r1(X640,X641)))))) | ~r1(X635,X636)) | ~r1(X634,X635))) | ~r1(X632,X633))) | ~r1(X630,X631))))) | ! [X645] : (p15(X645) | ~r1(X502,X645)) | ~! [X646] : (! [X647] : (! [X648] : (~r1(X647,X648) | ! [X649] : (! [X650] : (~r1(X649,X650) | ! [X651] : (~r1(X650,X651) | ! [X652] : (! [X653] : (! [X654] : (! [X655] : (~r1(X654,X655) | ! [X656] : (! [X657] : (~r1(X656,X657) | ! [X658] : (~r1(X657,X658) | ! [X659] : (! [X660] : (~r1(X659,X660) | ! [X661] : (~((p14(X661) & p15(X661)) | (~p14(X661) & ~p15(X661))) | ~r1(X660,X661))) | ~r1(X658,X659)))) | ~r1(X655,X656))) | ~r1(X653,X654)) | ~r1(X652,X653)) | ~r1(X651,X652)))) | ~r1(X648,X649))) | ~r1(X646,X647)) | ~r1(X502,X646)))) | ! [X662] : (p16(X662) | ~r1(X501,X662)) | ~! [X663] : (~r1(X501,X663) | ! [X664] : (! [X665] : (~r1(X664,X665) | ! [X666] : (! [X667] : (! [X668] : (! [X669] : (~r1(X668,X669) | ! [X670] : (! [X671] : (~r1(X670,X671) | ! [X672] : (! [X673] : (~r1(X672,X673) | ! [X674] : (! [X675] : (! [X676] : (! [X677] : (! [X678] : (~r1(X677,X678) | ! [X679] : (~r1(X678,X679) | ~((p15(X679) & p16(X679)) | (~p16(X679) & ~p15(X679))))) | ~r1(X676,X677)) | ~r1(X675,X676)) | ~r1(X674,X675)) | ~r1(X673,X674))) | ~r1(X671,X672))) | ~r1(X669,X670))) | ~r1(X667,X668)) | ~r1(X666,X667)) | ~r1(X665,X666))) | ~r1(X663,X664))))))) | ! [X680] : (p18(X680) | ~r1(X461,X680))) | ~r1(X459,X461)) | ~! [X681] : (! [X682] : (~r1(X681,X682) | ! [X683] : (! [X684] : (~r1(X683,X684) | ! [X685] : (~r1(X684,X685) | ! [X686] : (! [X687] : (~r1(X686,X687) | ! [X688] : (! [X689] : (~r1(X688,X689) | ! [X690] : (~r1(X689,X690) | ! [X691] : (~r1(X690,X691) | ! [X692] : (~r1(X691,X692) | ! [X693] : (! [X694] : (! [X695] : (! [X696] : (~r1(X695,X696) | ! [X697] : (! [X698] : (! [X699] : (~r1(X698,X699) | ! [X700] : (~((~p18(X700) & ~p19(X700)) | (p18(X700) & p19(X700))) | ~r1(X699,X700))) | ~r1(X697,X698)) | ~r1(X696,X697))) | ~r1(X694,X695)) | ~r1(X693,X694)) | ~r1(X692,X693)))))) | ~r1(X687,X688))) | ~r1(X685,X686)))) | ~r1(X682,X683))) | ~r1(X459,X681))) | ~r1(X457,X459)) | ~! [X701] : (! [X702] : (! [X703] : (~r1(X702,X703) | ! [X704] : (! [X705] : (! [X706] : (! [X707] : (! [X708] : (~r1(X707,X708) | ! [X709] : (! [X710] : (! [X711] : (! [X712] : (~r1(X711,X712) | ! [X713] : (~r1(X712,X713) | ! [X714] : (! [X715] : (~r1(X714,X715) | ! [X716] : (~r1(X715,X716) | ! [X717] : (~r1(X716,X717) | ! [X718] : (~r1(X717,X718) | ! [X719] : (~r1(X718,X719) | ! [X720] : (! [X721] : (~((p19(X721) & p20(X721)) | (~p19(X721) & ~p20(X721))) | ~r1(X720,X721)) | ~r1(X719,X720))))))) | ~r1(X713,X714)))) | ~r1(X710,X711)) | ~r1(X709,X710)) | ~r1(X708,X709))) | ~r1(X706,X707)) | ~r1(X705,X706)) | ~r1(X704,X705)) | ~r1(X703,X704))) | ~r1(X701,X702)) | ~r1(X457,X701))) | ~r1(X455,X457)) | ~! [X722] : (~r1(X455,X722) | ! [X723] : (~r1(X722,X723) | ! [X724] : (! [X725] : (~r1(X724,X725) | ! [X726] : (! [X727] : (~r1(X726,X727) | ! [X728] : (! [X729] : (! [X730] : (~r1(X729,X730) | ! [X731] : (! [X732] : (~r1(X731,X732) | ! [X733] : (! [X734] : (! [X735] : (~r1(X734,X735) | ! [X736] : (~r1(X735,X736) | ! [X737] : (! [X738] : (! [X739] : (~r1(X738,X739) | ! [X740] : (! [X741] : (~r1(X740,X741) | ! [X742] : (! [X743] : (~((p21(X743) & p20(X743)) | (~p20(X743) & ~p21(X743))) | ~r1(X742,X743)) | ~r1(X741,X742))) | ~r1(X739,X740))) | ~r1(X737,X738)) | ~r1(X736,X737)))) | ~r1(X733,X734)) | ~r1(X732,X733))) | ~r1(X730,X731))) | ~r1(X728,X729)) | ~r1(X727,X728))) | ~r1(X725,X726))) | ~r1(X723,X724))))) | ~r1(X431,X455)) | ! [X744] : (p22(X744) | ~r1(X431,X744)))) | ~! [X745] : (! [X746] : (! [X747] : (! [X748] : (! [X749] : (! [X750] : (! [X751] : (! [X752] : (~r1(X751,X752) | ! [X753] : (! [X754] : (! [X755] : (! [X756] : (! [X757] : (~r1(X756,X757) | ! [X758] : (! [X759] : (! [X760] : (! [X761] : (! [X762] : (! [X763] : (~r1(X762,X763) | ! [X764] : (~r1(X763,X764) | ! [X765] : (~r1(X764,X765) | ! [X766] : (~r1(X765,X766) | ! [X767] : (! [X768] : (~((p22(X768) & p23(X768)) | (~p22(X768) & ~p23(X768))) | ~r1(X767,X768)) | ~r1(X766,X767)))))) | ~r1(X761,X762)) | ~r1(X760,X761)) | ~r1(X759,X760)) | ~r1(X758,X759)) | ~r1(X757,X758))) | ~r1(X755,X756)) | ~r1(X754,X755)) | ~r1(X753,X754)) | ~r1(X752,X753))) | ~r1(X750,X751)) | ~r1(X749,X750)) | ~r1(X748,X749)) | ~r1(X747,X748)) | ~r1(X746,X747)) | ~r1(X745,X746)) | ~r1(X429,X745)))) | ~! [X769] : (! [X770] : (~r1(X769,X770) | ! [X771] : (! [X772] : (! [X773] : (! [X774] : (! [X775] : (! [X776] : (~r1(X775,X776) | ! [X777] : (~r1(X776,X777) | ! [X778] : (! [X779] : (! [X780] : (! [X781] : (! [X782] : (! [X783] : (! [X784] : (~r1(X783,X784) | ! [X785] : (! [X786] : (! [X787] : (~r1(X786,X787) | ! [X788] : (! [X789] : (~r1(X788,X789) | ! [X790] : (! [X791] : (~r1(X790,X791) | ! [X792] : (~r1(X791,X792) | ! [X793] : (~r1(X792,X793) | ~((~p23(X793) & ~p24(X793)) | (p24(X793) & p23(X793)))))) | ~r1(X789,X790))) | ~r1(X787,X788))) | ~r1(X785,X786)) | ~r1(X784,X785))) | ~r1(X782,X783)) | ~r1(X781,X782)) | ~r1(X780,X781)) | ~r1(X779,X780)) | ~r1(X778,X779)) | ~r1(X777,X778)))) | ~r1(X774,X775)) | ~r1(X773,X774)) | ~r1(X772,X773)) | ~r1(X771,X772)) | ~r1(X770,X771))) | ~r1(X427,X769))) | ~r1(X426,X427)) | ! [X794] : (p25(X794) | ~r1(X426,X794)) | ~! [X795] : (! [X796] : (~r1(X795,X796) | ! [X797] : (! [X798] : (~r1(X797,X798) | ! [X799] : (~r1(X798,X799) | ! [X800] : (~r1(X799,X800) | ! [X801] : (! [X802] : (~r1(X801,X802) | ! [X803] : (! [X804] : (~r1(X803,X804) | ! [X805] : (~r1(X804,X805) | ! [X806] : (~r1(X805,X806) | ! [X807] : (! [X808] : (! [X809] : (~r1(X808,X809) | ! [X810] : (! [X811] : (! [X812] : (! [X813] : (~r1(X812,X813) | ! [X814] : (~r1(X813,X814) | ! [X815] : (~r1(X814,X815) | ! [X816] : (~r1(X815,X816) | ! [X817] : (! [X818] : (~r1(X817,X818) | ! [X819] : (! [X820] : (~((p25(X820) & p24(X820)) | (~p25(X820) & ~p24(X820))) | ~r1(X819,X820)) | ~r1(X818,X819))) | ~r1(X816,X817)))))) | ~r1(X811,X812)) | ~r1(X810,X811)) | ~r1(X809,X810))) | ~r1(X807,X808)) | ~r1(X806,X807))))) | ~r1(X802,X803))) | ~r1(X800,X801))))) | ~r1(X796,X797))) | ~r1(X426,X795))) | ~r1(X398,X426)) | ! [X821] : (~r1(X398,X821) | p26(X821)))) | ~! [X822] : (! [X823] : (~r1(X822,X823) | ! [X824] : (~r1(X823,X824) | ! [X825] : (~r1(X824,X825) | ! [X826] : (~r1(X825,X826) | ! [X827] : (~r1(X826,X827) | ! [X828] : (! [X829] : (! [X830] : (! [X831] : (~r1(X830,X831) | ! [X832] : (~r1(X831,X832) | ! [X833] : (~r1(X832,X833) | ! [X834] : (! [X835] : (! [X836] : (~r1(X835,X836) | ! [X837] : (! [X838] : (! [X839] : (! [X840] : (~r1(X839,X840) | ! [X841] : (~r1(X840,X841) | ! [X842] : (~r1(X841,X842) | ! [X843] : (~r1(X842,X843) | ! [X844] : (! [X845] : (! [X846] : (! [X847] : (! [X848] : (! [X849] : (~r1(X848,X849) | ~((p26(X849) & p27(X849)) | (~p27(X849) & ~p26(X849)))) | ~r1(X847,X848)) | ~r1(X846,X847)) | ~r1(X845,X846)) | ~r1(X844,X845)) | ~r1(X843,X844)))))) | ~r1(X838,X839)) | ~r1(X837,X838)) | ~r1(X836,X837))) | ~r1(X834,X835)) | ~r1(X833,X834))))) | ~r1(X829,X830)) | ~r1(X828,X829)) | ~r1(X827,X828))))))) | ~r1(X396,X822))) | ~r1(X395,X396)) | ! [X850] : (p28(X850) | ~r1(X395,X850)) | ~! [X851] : (! [X852] : (! [X853] : (~r1(X852,X853) | ! [X854] : (! [X855] : (~r1(X854,X855) | ! [X856] : (~r1(X855,X856) | ! [X857] : (~r1(X856,X857) | ! [X858] : (! [X859] : (! [X860] : (~r1(X859,X860) | ! [X861] : (! [X862] : (! [X863] : (! [X864] : (~r1(X863,X864) | ! [X865] : (~r1(X864,X865) | ! [X866] : (~r1(X865,X866) | ! [X867] : (~r1(X866,X867) | ! [X868] : (! [X869] : (~r1(X868,X869) | ! [X870] : (! [X871] : (! [X872] : (~r1(X871,X872) | ! [X873] : (! [X874] : (~r1(X873,X874) | ! [X875] : (! [X876] : (! [X877] : (~r1(X876,X877) | ! [X878] : (! [X879] : (~((~p27(X879) & ~p28(X879)) | (p28(X879) & p27(X879))) | ~r1(X878,X879)) | ~r1(X877,X878))) | ~r1(X875,X876)) | ~r1(X874,X875))) | ~r1(X872,X873))) | ~r1(X870,X871)) | ~r1(X869,X870))) | ~r1(X867,X868)))))) | ~r1(X862,X863)) | ~r1(X861,X862)) | ~r1(X860,X861))) | ~r1(X858,X859)) | ~r1(X857,X858))))) | ~r1(X853,X854))) | ~r1(X851,X852)) | ~r1(X395,X851))) | ~r1(X364,X395)) | ! [X880] : (~r1(X364,X880) | p29(X880))) | ~r1(X362,X364)) | ~! [X881] : (! [X882] : (~r1(X881,X882) | ! [X883] : (! [X884] : (! [X885] : (! [X886] : (~r1(X885,X886) | ! [X887] : (~r1(X886,X887) | ! [X888] : (~r1(X887,X888) | ! [X889] : (~r1(X888,X889) | ! [X890] : (! [X891] : (~r1(X890,X891) | ! [X892] : (! [X893] : (! [X894] : (! [X895] : (~r1(X894,X895) | ! [X896] : (! [X897] : (~r1(X896,X897) | ! [X898] : (~r1(X897,X898) | ! [X899] : (~r1(X898,X899) | ! [X900] : (~r1(X899,X900) | ! [X901] : (! [X902] : (~r1(X901,X902) | ! [X903] : (! [X904] : (! [X905] : (~r1(X904,X905) | ! [X906] : (! [X907] : (! [X908] : (! [X909] : (! [X910] : (! [X911] : (~((p30(X911) & p29(X911)) | (~p29(X911) & ~p30(X911))) | ~r1(X910,X911)) | ~r1(X909,X910)) | ~r1(X908,X909)) | ~r1(X907,X908)) | ~r1(X906,X907)) | ~r1(X905,X906))) | ~r1(X903,X904)) | ~r1(X902,X903))) | ~r1(X900,X901)))))) | ~r1(X895,X896))) | ~r1(X893,X894)) | ~r1(X892,X893)) | ~r1(X891,X892))) | ~r1(X889,X890)))))) | ~r1(X884,X885)) | ~r1(X883,X884)) | ~r1(X882,X883))) | ~r1(X362,X881))) | ~r1(X328,X362))) | ~r1(X293,X328)))) | ! [X912] : (~r1(X292,X912) | p33(X912)) | ~! [X913] : (~r1(X292,X913) | ! [X914] : (~r1(X913,X914) | ! [X915] : (! [X916] : (~r1(X915,X916) | ! [X917] : (~r1(X916,X917) | ! [X918] : (~r1(X917,X918) | ! [X919] : (! [X920] : (~r1(X919,X920) | ! [X921] : (~r1(X920,X921) | ! [X922] : (! [X923] : (~r1(X922,X923) | ! [X924] : (~r1(X923,X924) | ! [X925] : (~r1(X924,X925) | ! [X926] : (! [X927] : (~r1(X926,X927) | ! [X928] : (~r1(X927,X928) | ! [X929] : (! [X930] : (! [X931] : (! [X932] : (! [X933] : (! [X934] : (! [X935] : (~r1(X934,X935) | ! [X936] : (~r1(X935,X936) | ! [X937] : (~r1(X936,X937) | ! [X938] : (! [X939] : (~r1(X938,X939) | ! [X940] : (! [X941] : (~r1(X940,X941) | ! [X942] : (~r1(X941,X942) | ! [X943] : (~r1(X942,X943) | ! [X944] : (! [X945] : (! [X946] : (~((~p33(X946) & ~p32(X946)) | (p32(X946) & p33(X946))) | ~r1(X945,X946)) | ~r1(X944,X945)) | ~r1(X943,X944))))) | ~r1(X939,X940))) | ~r1(X937,X938))))) | ~r1(X933,X934)) | ~r1(X932,X933)) | ~r1(X931,X932)) | ~r1(X930,X931)) | ~r1(X929,X930)) | ~r1(X928,X929)))) | ~r1(X925,X926))))) | ~r1(X921,X922)))) | ~r1(X918,X919))))) | ~r1(X914,X915))))) | ~r1(X256,X292)) | ! [X947] : (~r1(X256,X947) | p34(X947))) | ~r1(X255,X256)) | ! [X948] : (p35(X948) | ~r1(X255,X948)) | ~! [X949] : (~r1(X255,X949) | ! [X950] : (! [X951] : (~r1(X950,X951) | ! [X952] : (~r1(X951,X952) | ! [X953] : (~r1(X952,X953) | ! [X954] : (! [X955] : (! [X956] : (~r1(X955,X956) | ! [X957] : (! [X958] : (! [X959] : (~r1(X958,X959) | ! [X960] : (~r1(X959,X960) | ! [X961] : (! [X962] : (! [X963] : (! [X964] : (! [X965] : (~r1(X964,X965) | ! [X966] : (! [X967] : (! [X968] : (~r1(X967,X968) | ! [X969] : (! [X970] : (! [X971] : (~r1(X970,X971) | ! [X972] : (! [X973] : (~r1(X972,X973) | ! [X974] : (! [X975] : (! [X976] : (~r1(X975,X976) | ! [X977] : (! [X978] : (~r1(X977,X978) | ! [X979] : (~r1(X978,X979) | ! [X980] : (! [X981] : (~r1(X980,X981) | ! [X982] : (! [X983] : (~r1(X982,X983) | ! [X984] : (~r1(X983,X984) | ~((p34(X984) & p35(X984)) | (~p35(X984) & ~p34(X984))))) | ~r1(X981,X982))) | ~r1(X979,X980)))) | ~r1(X976,X977))) | ~r1(X974,X975)) | ~r1(X973,X974))) | ~r1(X971,X972))) | ~r1(X969,X970)) | ~r1(X968,X969))) | ~r1(X966,X967)) | ~r1(X965,X966))) | ~r1(X963,X964)) | ~r1(X962,X963)) | ~r1(X961,X962)) | ~r1(X960,X961)))) | ~r1(X957,X958)) | ~r1(X956,X957))) | ~r1(X954,X955)) | ~r1(X953,X954))))) | ~r1(X949,X950)))) | ~r1(X254,X255)) | ! [X985] : (~r1(X254,X985) | p36(X985)) | ~! [X986] : (! [X987] : (~r1(X986,X987) | ! [X988] : (~r1(X987,X988) | ! [X989] : (~r1(X988,X989) | ! [X990] : (~r1(X989,X990) | ! [X991] : (! [X992] : (! [X993] : (! [X994] : (~r1(X993,X994) | ! [X995] : (! [X996] : (~r1(X995,X996) | ! [X997] : (! [X998] : (~r1(X997,X998) | ! [X999] : (~r1(X998,X999) | ! [X1000] : (~r1(X999,X1000) | ! [X1001] : (! [X1002] : (! [X1003] : (~r1(X1002,X1003) | ! [X1004] : (! [X1005] : (! [X1006] : (~r1(X1005,X1006) | ! [X1007] : (~r1(X1006,X1007) | ! [X1008] : (~r1(X1007,X1008) | ! [X1009] : (! [X1010] : (! [X1011] : (~r1(X1010,X1011) | ! [X1012] : (~r1(X1011,X1012) | ! [X1013] : (~r1(X1012,X1013) | ! [X1014] : (! [X1015] : (~r1(X1014,X1015) | ! [X1016] : (~r1(X1015,X1016) | ! [X1017] : (! [X1018] : (! [X1019] : (~r1(X1018,X1019) | ! [X1020] : (~r1(X1019,X1020) | ! [X1021] : (! [X1022] : (~((p36(X1022) & p35(X1022)) | (~p35(X1022) & ~p36(X1022))) | ~r1(X1021,X1022)) | ~r1(X1020,X1021)))) | ~r1(X1017,X1018)) | ~r1(X1016,X1017)))) | ~r1(X1013,X1014))))) | ~r1(X1009,X1010)) | ~r1(X1008,X1009))))) | ~r1(X1004,X1005)) | ~r1(X1003,X1004))) | ~r1(X1001,X1002)) | ~r1(X1000,X1001))))) | ~r1(X996,X997))) | ~r1(X994,X995))) | ~r1(X992,X993)) | ~r1(X991,X992)) | ~r1(X990,X991)))))) | ~r1(X254,X986)))))) | ! [X1023] : (~r1(X213,X1023) | p38(X1023)) | ~! [X1024] : (~r1(X213,X1024) | ! [X1025] : (~r1(X1024,X1025) | ! [X1026] : (! [X1027] : (! [X1028] : (~r1(X1027,X1028) | ! [X1029] : (~r1(X1028,X1029) | ! [X1030] : (~r1(X1029,X1030) | ! [X1031] : (! [X1032] : (~r1(X1031,X1032) | ! [X1033] : (~r1(X1032,X1033) | ! [X1034] : (~r1(X1033,X1034) | ! [X1035] : (! [X1036] : (~r1(X1035,X1036) | ! [X1037] : (! [X1038] : (! [X1039] : (~r1(X1038,X1039) | ! [X1040] : (~r1(X1039,X1040) | ! [X1041] : (! [X1042] : (~r1(X1041,X1042) | ! [X1043] : (~r1(X1042,X1043) | ! [X1044] : (~r1(X1043,X1044) | ! [X1045] : (~r1(X1044,X1045) | ! [X1046] : (! [X1047] : (! [X1048] : (~r1(X1047,X1048) | ! [X1049] : (! [X1050] : (! [X1051] : (~r1(X1050,X1051) | ! [X1052] : (~r1(X1051,X1052) | ! [X1053] : (! [X1054] : (~r1(X1053,X1054) | ! [X1055] : (~r1(X1054,X1055) | ! [X1056] : (~r1(X1055,X1056) | ! [X1057] : (! [X1058] : (! [X1059] : (~r1(X1058,X1059) | ! [X1060] : (! [X1061] : (! [X1062] : (~r1(X1061,X1062) | ~((~p37(X1062) & ~p38(X1062)) | (p38(X1062) & p37(X1062)))) | ~r1(X1060,X1061)) | ~r1(X1059,X1060))) | ~r1(X1057,X1058)) | ~r1(X1056,X1057))))) | ~r1(X1052,X1053)))) | ~r1(X1049,X1050)) | ~r1(X1048,X1049))) | ~r1(X1046,X1047)) | ~r1(X1045,X1046)))))) | ~r1(X1040,X1041)))) | ~r1(X1037,X1038)) | ~r1(X1036,X1037))) | ~r1(X1034,X1035))))) | ~r1(X1030,X1031))))) | ~r1(X1026,X1027)) | ~r1(X1025,X1026)))))) | ! [X1063] : (~r1(X212,X1063) | p39(X1063)) | ~! [X1064] : (! [X1065] : (~r1(X1064,X1065) | ! [X1066] : (! [X1067] : (! [X1068] : (! [X1069] : (~r1(X1068,X1069) | ! [X1070] : (! [X1071] : (~r1(X1070,X1071) | ! [X1072] : (! [X1073] : (~r1(X1072,X1073) | ! [X1074] : (~r1(X1073,X1074) | ! [X1075] : (! [X1076] : (! [X1077] : (~r1(X1076,X1077) | ! [X1078] : (! [X1079] : (! [X1080] : (! [X1081] : (! [X1082] : (! [X1083] : (! [X1084] : (! [X1085] : (! [X1086] : (! [X1087] : (! [X1088] : (! [X1089] : (~r1(X1088,X1089) | ! [X1090] : (! [X1091] : (! [X1092] : (~r1(X1091,X1092) | ! [X1093] : (~r1(X1092,X1093) | ! [X1094] : (~r1(X1093,X1094) | ! [X1095] : (~r1(X1094,X1095) | ! [X1096] : (~r1(X1095,X1096) | ! [X1097] : (! [X1098] : (! [X1099] : (~r1(X1098,X1099) | ! [X1100] : (~r1(X1099,X1100) | ! [X1101] : (! [X1102] : (~r1(X1101,X1102) | ! [X1103] : (~((~p39(X1103) & ~p38(X1103)) | (p38(X1103) & p39(X1103))) | ~r1(X1102,X1103))) | ~r1(X1100,X1101)))) | ~r1(X1097,X1098)) | ~r1(X1096,X1097))))))) | ~r1(X1090,X1091)) | ~r1(X1089,X1090))) | ~r1(X1087,X1088)) | ~r1(X1086,X1087)) | ~r1(X1085,X1086)) | ~r1(X1084,X1085)) | ~r1(X1083,X1084)) | ~r1(X1082,X1083)) | ~r1(X1081,X1082)) | ~r1(X1080,X1081)) | ~r1(X1079,X1080)) | ~r1(X1078,X1079)) | ~r1(X1077,X1078))) | ~r1(X1075,X1076)) | ~r1(X1074,X1075)))) | ~r1(X1071,X1072))) | ~r1(X1069,X1070))) | ~r1(X1067,X1068)) | ~r1(X1066,X1067)) | ~r1(X1065,X1066))) | ~r1(X212,X1064)))) | ! [X1104] : (~r1(X170,X1104) | p40(X1104)))) | ~! [X1105] : (~r1(X168,X1105) | ! [X1106] : (~r1(X1105,X1106) | ! [X1107] : (~r1(X1106,X1107) | ! [X1108] : (~r1(X1107,X1108) | ! [X1109] : (~r1(X1108,X1109) | ! [X1110] : (~r1(X1109,X1110) | ! [X1111] : (! [X1112] : (~r1(X1111,X1112) | ! [X1113] : (! [X1114] : (~r1(X1113,X1114) | ! [X1115] : (~r1(X1114,X1115) | ! [X1116] : (~r1(X1115,X1116) | ! [X1117] : (! [X1118] : (! [X1119] : (~r1(X1118,X1119) | ! [X1120] : (~r1(X1119,X1120) | ! [X1121] : (~r1(X1120,X1121) | ! [X1122] : (~r1(X1121,X1122) | ! [X1123] : (! [X1124] : (! [X1125] : (! [X1126] : (~r1(X1125,X1126) | ! [X1127] : (! [X1128] : (! [X1129] : (~r1(X1128,X1129) | ! [X1130] : (~r1(X1129,X1130) | ! [X1131] : (! [X1132] : (~r1(X1131,X1132) | ! [X1133] : (! [X1134] : (! [X1135] : (~r1(X1134,X1135) | ! [X1136] : (! [X1137] : (! [X1138] : (! [X1139] : (~r1(X1138,X1139) | ! [X1140] : (! [X1141] : (! [X1142] : (~r1(X1141,X1142) | ! [X1143] : (! [X1144] : (~r1(X1143,X1144) | ! [X1145] : (~r1(X1144,X1145) | ! [X1146] : (~((~p40(X1146) & ~p41(X1146)) | (p41(X1146) & p40(X1146))) | ~r1(X1145,X1146)))) | ~r1(X1142,X1143))) | ~r1(X1140,X1141)) | ~r1(X1139,X1140))) | ~r1(X1137,X1138)) | ~r1(X1136,X1137)) | ~r1(X1135,X1136))) | ~r1(X1133,X1134)) | ~r1(X1132,X1133))) | ~r1(X1130,X1131)))) | ~r1(X1127,X1128)) | ~r1(X1126,X1127))) | ~r1(X1124,X1125)) | ~r1(X1123,X1124)) | ~r1(X1122,X1123)))))) | ~r1(X1117,X1118)) | ~r1(X1116,X1117))))) | ~r1(X1112,X1113))) | ~r1(X1110,X1111))))))))))) | ~r1(X121,X123)) | ~! [X1147] : (~r1(X121,X1147) | ! [X1148] : (! [X1149] : (~r1(X1148,X1149) | ! [X1150] : (! [X1151] : (! [X1152] : (~r1(X1151,X1152) | ! [X1153] : (! [X1154] : (! [X1155] : (~r1(X1154,X1155) | ! [X1156] : (! [X1157] : (! [X1158] : (~r1(X1157,X1158) | ! [X1159] : (~r1(X1158,X1159) | ! [X1160] : (~r1(X1159,X1160) | ! [X1161] : (! [X1162] : (~r1(X1161,X1162) | ! [X1163] : (~r1(X1162,X1163) | ! [X1164] : (~r1(X1163,X1164) | ! [X1165] : (~r1(X1164,X1165) | ! [X1166] : (! [X1167] : (~r1(X1166,X1167) | ! [X1168] : (! [X1169] : (~r1(X1168,X1169) | ! [X1170] : (~r1(X1169,X1170) | ! [X1171] : (! [X1172] : (~r1(X1171,X1172) | ! [X1173] : (! [X1174] : (~r1(X1173,X1174) | ! [X1175] : (! [X1176] : (! [X1177] : (~r1(X1176,X1177) | ! [X1178] : (~r1(X1177,X1178) | ! [X1179] : (~r1(X1178,X1179) | ! [X1180] : (! [X1181] : (! [X1182] : (! [X1183] : (! [X1184] : (~r1(X1183,X1184) | ! [X1185] : (! [X1186] : (~r1(X1185,X1186) | ! [X1187] : (~r1(X1186,X1187) | ! [X1188] : (! [X1189] : (~r1(X1188,X1189) | ! [X1190] : (~r1(X1189,X1190) | ~((p43(X1190) & p42(X1190)) | (~p43(X1190) & ~p42(X1190))))) | ~r1(X1187,X1188)))) | ~r1(X1184,X1185))) | ~r1(X1182,X1183)) | ~r1(X1181,X1182)) | ~r1(X1180,X1181)) | ~r1(X1179,X1180))))) | ~r1(X1175,X1176)) | ~r1(X1174,X1175))) | ~r1(X1172,X1173))) | ~r1(X1170,X1171)))) | ~r1(X1167,X1168))) | ~r1(X1165,X1166)))))) | ~r1(X1160,X1161))))) | ~r1(X1156,X1157)) | ~r1(X1155,X1156))) | ~r1(X1153,X1154)) | ~r1(X1152,X1153))) | ~r1(X1150,X1151)) | ~r1(X1149,X1150))) | ~r1(X1147,X1148))))) | ~! [X1191] : (~r1(X119,X1191) | ! [X1192] : (~r1(X1191,X1192) | ! [X1193] : (~r1(X1192,X1193) | ! [X1194] : (! [X1195] : (~r1(X1194,X1195) | ! [X1196] : (! [X1197] : (~r1(X1196,X1197) | ! [X1198] : (~r1(X1197,X1198) | ! [X1199] : (! [X1200] : (! [X1201] : (~r1(X1200,X1201) | ! [X1202] : (~r1(X1201,X1202) | ! [X1203] : (~r1(X1202,X1203) | ! [X1204] : (~r1(X1203,X1204) | ! [X1205] : (~r1(X1204,X1205) | ! [X1206] : (~r1(X1205,X1206) | ! [X1207] : (! [X1208] : (! [X1209] : (! [X1210] : (! [X1211] : (! [X1212] : (~r1(X1211,X1212) | ! [X1213] : (! [X1214] : (! [X1215] : (! [X1216] : (~r1(X1215,X1216) | ! [X1217] : (~r1(X1216,X1217) | ! [X1218] : (~r1(X1217,X1218) | ! [X1219] : (! [X1220] : (~r1(X1219,X1220) | ! [X1221] : (! [X1222] : (~r1(X1221,X1222) | ! [X1223] : (~r1(X1222,X1223) | ! [X1224] : (! [X1225] : (~r1(X1224,X1225) | ! [X1226] : (! [X1227] : (! [X1228] : (~r1(X1227,X1228) | ! [X1229] : (! [X1230] : (~r1(X1229,X1230) | ! [X1231] : (~r1(X1230,X1231) | ! [X1232] : (! [X1233] : (! [X1234] : (! [X1235] : (~r1(X1234,X1235) | ~((p43(X1235) & p44(X1235)) | (~p43(X1235) & ~p44(X1235)))) | ~r1(X1233,X1234)) | ~r1(X1232,X1233)) | ~r1(X1231,X1232)))) | ~r1(X1228,X1229))) | ~r1(X1226,X1227)) | ~r1(X1225,X1226))) | ~r1(X1223,X1224)))) | ~r1(X1220,X1221))) | ~r1(X1218,X1219))))) | ~r1(X1214,X1215)) | ~r1(X1213,X1214)) | ~r1(X1212,X1213))) | ~r1(X1210,X1211)) | ~r1(X1209,X1210)) | ~r1(X1208,X1209)) | ~r1(X1207,X1208)) | ~r1(X1206,X1207)))))))) | ~r1(X1199,X1200)) | ~r1(X1198,X1199)))) | ~r1(X1195,X1196))) | ~r1(X1193,X1194)))))) | ~r1(X117,X119)) | ~! [X1236] : (~r1(X117,X1236) | ! [X1237] : (! [X1238] : (! [X1239] : (~r1(X1238,X1239) | ! [X1240] : (~r1(X1239,X1240) | ! [X1241] : (~r1(X1240,X1241) | ! [X1242] : (~r1(X1241,X1242) | ! [X1243] : (~r1(X1242,X1243) | ! [X1244] : (~r1(X1243,X1244) | ! [X1245] : (~r1(X1244,X1245) | ! [X1246] : (! [X1247] : (! [X1248] : (~r1(X1247,X1248) | ! [X1249] : (! [X1250] : (~r1(X1249,X1250) | ! [X1251] : (! [X1252] : (! [X1253] : (! [X1254] : (~r1(X1253,X1254) | ! [X1255] : (! [X1256] : (! [X1257] : (! [X1258] : (~r1(X1257,X1258) | ! [X1259] : (! [X1260] : (! [X1261] : (~r1(X1260,X1261) | ! [X1262] : (! [X1263] : (! [X1264] : (~r1(X1263,X1264) | ! [X1265] : (~r1(X1264,X1265) | ! [X1266] : (! [X1267] : (! [X1268] : (~r1(X1267,X1268) | ! [X1269] : (~r1(X1268,X1269) | ! [X1270] : (~r1(X1269,X1270) | ! [X1271] : (~r1(X1270,X1271) | ! [X1272] : (~r1(X1271,X1272) | ! [X1273] : (! [X1274] : (~r1(X1273,X1274) | ! [X1275] : (~r1(X1274,X1275) | ! [X1276] : (~r1(X1275,X1276) | ! [X1277] : (! [X1278] : (! [X1279] : (~r1(X1278,X1279) | ! [X1280] : (! [X1281] : (~r1(X1280,X1281) | ~((~p45(X1281) & ~p44(X1281)) | (p44(X1281) & p45(X1281)))) | ~r1(X1279,X1280))) | ~r1(X1277,X1278)) | ~r1(X1276,X1277))))) | ~r1(X1272,X1273))))))) | ~r1(X1266,X1267)) | ~r1(X1265,X1266)))) | ~r1(X1262,X1263)) | ~r1(X1261,X1262))) | ~r1(X1259,X1260)) | ~r1(X1258,X1259))) | ~r1(X1256,X1257)) | ~r1(X1255,X1256)) | ~r1(X1254,X1255))) | ~r1(X1252,X1253)) | ~r1(X1251,X1252)) | ~r1(X1250,X1251))) | ~r1(X1248,X1249))) | ~r1(X1246,X1247)) | ~r1(X1245,X1246))))))))) | ~r1(X1237,X1238)) | ~r1(X1236,X1237)))) | ~r1(X115,X117)) | ~! [X1282] : (~r1(X115,X1282) | ! [X1283] : (~r1(X1282,X1283) | ! [X1284] : (! [X1285] : (~r1(X1284,X1285) | ! [X1286] : (! [X1287] : (! [X1288] : (! [X1289] : (! [X1290] : (~r1(X1289,X1290) | ! [X1291] : (~r1(X1290,X1291) | ! [X1292] : (! [X1293] : (~r1(X1292,X1293) | ! [X1294] : (! [X1295] : (~r1(X1294,X1295) | ! [X1296] : (~r1(X1295,X1296) | ! [X1297] : (~r1(X1296,X1297) | ! [X1298] : (! [X1299] : (! [X1300] : (~r1(X1299,X1300) | ! [X1301] : (~r1(X1300,X1301) | ! [X1302] : (~r1(X1301,X1302) | ! [X1303] : (! [X1304] : (~r1(X1303,X1304) | ! [X1305] : (~r1(X1304,X1305) | ! [X1306] : (~r1(X1305,X1306) | ! [X1307] : (! [X1308] : (~r1(X1307,X1308) | ! [X1309] : (~r1(X1308,X1309) | ! [X1310] : (~r1(X1309,X1310) | ! [X1311] : (! [X1312] : (! [X1313] : (~r1(X1312,X1313) | ! [X1314] : (~r1(X1313,X1314) | ! [X1315] : (! [X1316] : (~r1(X1315,X1316) | ! [X1317] : (! [X1318] : (! [X1319] : (! [X1320] : (! [X1321] : (! [X1322] : (~r1(X1321,X1322) | ! [X1323] : (~r1(X1322,X1323) | ! [X1324] : (! [X1325] : (~r1(X1324,X1325) | ! [X1326] : (~r1(X1325,X1326) | ! [X1327] : (~r1(X1326,X1327) | ! [X1328] : (~((~p46(X1328) & ~p45(X1328)) | (p46(X1328) & p45(X1328))) | ~r1(X1327,X1328))))) | ~r1(X1323,X1324)))) | ~r1(X1320,X1321)) | ~r1(X1319,X1320)) | ~r1(X1318,X1319)) | ~r1(X1317,X1318)) | ~r1(X1316,X1317))) | ~r1(X1314,X1315)))) | ~r1(X1311,X1312)) | ~r1(X1310,X1311))))) | ~r1(X1306,X1307))))) | ~r1(X1302,X1303))))) | ~r1(X1298,X1299)) | ~r1(X1297,X1298))))) | ~r1(X1293,X1294))) | ~r1(X1291,X1292)))) | ~r1(X1288,X1289)) | ~r1(X1287,X1288)) | ~r1(X1286,X1287)) | ~r1(X1285,X1286))) | ~r1(X1283,X1284))))) | ~r1(X113,X115)) | ~! [X1329] : (! [X1330] : (~r1(X1329,X1330) | ! [X1331] : (~r1(X1330,X1331) | ! [X1332] : (~r1(X1331,X1332) | ! [X1333] : (! [X1334] : (~r1(X1333,X1334) | ! [X1335] : (~r1(X1334,X1335) | ! [X1336] : (~r1(X1335,X1336) | ! [X1337] : (~r1(X1336,X1337) | ! [X1338] : (~r1(X1337,X1338) | ! [X1339] : (~r1(X1338,X1339) | ! [X1340] : (! [X1341] : (~r1(X1340,X1341) | ! [X1342] : (! [X1343] : (~r1(X1342,X1343) | ! [X1344] : (! [X1345] : (! [X1346] : (~r1(X1345,X1346) | ! [X1347] : (~r1(X1346,X1347) | ! [X1348] : (! [X1349] : (~r1(X1348,X1349) | ! [X1350] : (! [X1351] : (! [X1352] : (~r1(X1351,X1352) | ! [X1353] : (~r1(X1352,X1353) | ! [X1354] : (! [X1355] : (~r1(X1354,X1355) | ! [X1356] : (! [X1357] : (~r1(X1356,X1357) | ! [X1358] : (~r1(X1357,X1358) | ! [X1359] : (! [X1360] : (! [X1361] : (! [X1362] : (~r1(X1361,X1362) | ! [X1363] : (! [X1364] : (~r1(X1363,X1364) | ! [X1365] : (! [X1366] : (~r1(X1365,X1366) | ! [X1367] : (~r1(X1366,X1367) | ! [X1368] : (~r1(X1367,X1368) | ! [X1369] : (! [X1370] : (~r1(X1369,X1370) | ! [X1371] : (~r1(X1370,X1371) | ! [X1372] : (~r1(X1371,X1372) | ! [X1373] : (~r1(X1372,X1373) | ! [X1374] : (~r1(X1373,X1374) | ! [X1375] : (~r1(X1374,X1375) | ! [X1376] : (~((p47(X1376) & p46(X1376)) | (~p46(X1376) & ~p47(X1376))) | ~r1(X1375,X1376)))))))) | ~r1(X1368,X1369))))) | ~r1(X1364,X1365))) | ~r1(X1362,X1363))) | ~r1(X1360,X1361)) | ~r1(X1359,X1360)) | ~r1(X1358,X1359)))) | ~r1(X1355,X1356))) | ~r1(X1353,X1354)))) | ~r1(X1350,X1351)) | ~r1(X1349,X1350))) | ~r1(X1347,X1348)))) | ~r1(X1344,X1345)) | ~r1(X1343,X1344))) | ~r1(X1341,X1342))) | ~r1(X1339,X1340)))))))) | ~r1(X1332,X1333))))) | ~r1(X113,X1329))) | ~r1(X112,X113)) | ! [X1377] : (p48(X1377) | ~r1(X112,X1377)) | ~! [X1378] : (! [X1379] : (! [X1380] : (! [X1381] : (~r1(X1380,X1381) | ! [X1382] : (~r1(X1381,X1382) | ! [X1383] : (! [X1384] : (~r1(X1383,X1384) | ! [X1385] : (! [X1386] : (~r1(X1385,X1386) | ! [X1387] : (~r1(X1386,X1387) | ! [X1388] : (! [X1389] : (~r1(X1388,X1389) | ! [X1390] : (~r1(X1389,X1390) | ! [X1391] : (~r1(X1390,X1391) | ! [X1392] : (! [X1393] : (! [X1394] : (~r1(X1393,X1394) | ! [X1395] : (! [X1396] : (! [X1397] : (~r1(X1396,X1397) | ! [X1398] : (! [X1399] : (~r1(X1398,X1399) | ! [X1400] : (! [X1401] : (~r1(X1400,X1401) | ! [X1402] : (~r1(X1401,X1402) | ! [X1403] : (! [X1404] : (~r1(X1403,X1404) | ! [X1405] : (! [X1406] : (! [X1407] : (~r1(X1406,X1407) | ! [X1408] : (! [X1409] : (~r1(X1408,X1409) | ! [X1410] : (! [X1411] : (! [X1412] : (! [X1413] : (~r1(X1412,X1413) | ! [X1414] : (~r1(X1413,X1414) | ! [X1415] : (! [X1416] : (! [X1417] : (! [X1418] : (~r1(X1417,X1418) | ! [X1419] : (~r1(X1418,X1419) | ! [X1420] : (~r1(X1419,X1420) | ! [X1421] : (~r1(X1420,X1421) | ! [X1422] : (! [X1423] : (! [X1424] : (! [X1425] : (~r1(X1424,X1425) | ! [X1426] : (~((~p47(X1426) & ~p48(X1426)) | (p48(X1426) & p47(X1426))) | ~r1(X1425,X1426))) | ~r1(X1423,X1424)) | ~r1(X1422,X1423)) | ~r1(X1421,X1422)))))) | ~r1(X1416,X1417)) | ~r1(X1415,X1416)) | ~r1(X1414,X1415)))) | ~r1(X1411,X1412)) | ~r1(X1410,X1411)) | ~r1(X1409,X1410))) | ~r1(X1407,X1408))) | ~r1(X1405,X1406)) | ~r1(X1404,X1405))) | ~r1(X1402,X1403)))) | ~r1(X1399,X1400))) | ~r1(X1397,X1398))) | ~r1(X1395,X1396)) | ~r1(X1394,X1395))) | ~r1(X1392,X1393)) | ~r1(X1391,X1392))))) | ~r1(X1387,X1388)))) | ~r1(X1384,X1385))) | ~r1(X1382,X1383)))) | ~r1(X1379,X1380)) | ~r1(X1378,X1379)) | ~r1(X112,X1378))) | ~r1(X111,X112)) | ! [X1427] : (p49(X1427) | ~r1(X111,X1427)) | ~! [X1428] : (! [X1429] : (! [X1430] : (~r1(X1429,X1430) | ! [X1431] : (~r1(X1430,X1431) | ! [X1432] : (~r1(X1431,X1432) | ! [X1433] : (! [X1434] : (~r1(X1433,X1434) | ! [X1435] : (~r1(X1434,X1435) | ! [X1436] : (! [X1437] : (~r1(X1436,X1437) | ! [X1438] : (~r1(X1437,X1438) | ! [X1439] : (~r1(X1438,X1439) | ! [X1440] : (~r1(X1439,X1440) | ! [X1441] : (! [X1442] : (~r1(X1441,X1442) | ! [X1443] : (~r1(X1442,X1443) | ! [X1444] : (~r1(X1443,X1444) | ! [X1445] : (~r1(X1444,X1445) | ! [X1446] : (! [X1447] : (~r1(X1446,X1447) | ! [X1448] : (~r1(X1447,X1448) | ! [X1449] : (~r1(X1448,X1449) | ! [X1450] : (! [X1451] : (! [X1452] : (~r1(X1451,X1452) | ! [X1453] : (! [X1454] : (~r1(X1453,X1454) | ! [X1455] : (~r1(X1454,X1455) | ! [X1456] : (~r1(X1455,X1456) | ! [X1457] : (~r1(X1456,X1457) | ! [X1458] : (! [X1459] : (! [X1460] : (! [X1461] : (~r1(X1460,X1461) | ! [X1462] : (! [X1463] : (! [X1464] : (! [X1465] : (! [X1466] : (~r1(X1465,X1466) | ! [X1467] : (~r1(X1466,X1467) | ! [X1468] : (~r1(X1467,X1468) | ! [X1469] : (~r1(X1468,X1469) | ! [X1470] : (! [X1471] : (! [X1472] : (~r1(X1471,X1472) | ! [X1473] : (! [X1474] : (! [X1475] : (! [X1476] : (! [X1477] : (~r1(X1476,X1477) | ~((p49(X1477) & p48(X1477)) | (~p49(X1477) & ~p48(X1477)))) | ~r1(X1475,X1476)) | ~r1(X1474,X1475)) | ~r1(X1473,X1474)) | ~r1(X1472,X1473))) | ~r1(X1470,X1471)) | ~r1(X1469,X1470)))))) | ~r1(X1464,X1465)) | ~r1(X1463,X1464)) | ~r1(X1462,X1463)) | ~r1(X1461,X1462))) | ~r1(X1459,X1460)) | ~r1(X1458,X1459)) | ~r1(X1457,X1458)))))) | ~r1(X1452,X1453))) | ~r1(X1450,X1451)) | ~r1(X1449,X1450))))) | ~r1(X1445,X1446)))))) | ~r1(X1440,X1441)))))) | ~r1(X1435,X1436)))) | ~r1(X1432,X1433))))) | ~r1(X1428,X1429)) | ~r1(X111,X1428))) | ~r1(X109,X111)) | ~! [X1478] : (~r1(X109,X1478) | ! [X1479] : (! [X1480] : (! [X1481] : (! [X1482] : (! [X1483] : (~r1(X1482,X1483) | ! [X1484] : (! [X1485] : (~r1(X1484,X1485) | ! [X1486] : (! [X1487] : (! [X1488] : (~r1(X1487,X1488) | ! [X1489] : (~r1(X1488,X1489) | ! [X1490] : (~r1(X1489,X1490) | ! [X1491] : (~r1(X1490,X1491) | ! [X1492] : (~r1(X1491,X1492) | ! [X1493] : (! [X1494] : (~r1(X1493,X1494) | ! [X1495] : (~r1(X1494,X1495) | ! [X1496] : (! [X1497] : (! [X1498] : (! [X1499] : (! [X1500] : (! [X1501] : (~r1(X1500,X1501) | ! [X1502] : (! [X1503] : (~r1(X1502,X1503) | ! [X1504] : (~r1(X1503,X1504) | ! [X1505] : (! [X1506] : (! [X1507] : (! [X1508] : (! [X1509] : (~r1(X1508,X1509) | ! [X1510] : (~r1(X1509,X1510) | ! [X1511] : (~r1(X1510,X1511) | ! [X1512] : (~r1(X1511,X1512) | ! [X1513] : (~r1(X1512,X1513) | ! [X1514] : (! [X1515] : (! [X1516] : (~r1(X1515,X1516) | ! [X1517] : (~r1(X1516,X1517) | ! [X1518] : (~r1(X1517,X1518) | ! [X1519] : (! [X1520] : (! [X1521] : (! [X1522] : (! [X1523] : (! [X1524] : (! [X1525] : (~r1(X1524,X1525) | ! [X1526] : (~r1(X1525,X1526) | ! [X1527] : (~r1(X1526,X1527) | ! [X1528] : (~((~p49(X1528) & ~p50(X1528)) | (p49(X1528) & p50(X1528))) | ~r1(X1527,X1528))))) | ~r1(X1523,X1524)) | ~r1(X1522,X1523)) | ~r1(X1521,X1522)) | ~r1(X1520,X1521)) | ~r1(X1519,X1520)) | ~r1(X1518,X1519))))) | ~r1(X1514,X1515)) | ~r1(X1513,X1514))))))) | ~r1(X1507,X1508)) | ~r1(X1506,X1507)) | ~r1(X1505,X1506)) | ~r1(X1504,X1505)))) | ~r1(X1501,X1502))) | ~r1(X1499,X1500)) | ~r1(X1498,X1499)) | ~r1(X1497,X1498)) | ~r1(X1496,X1497)) | ~r1(X1495,X1496)))) | ~r1(X1492,X1493))))))) | ~r1(X1486,X1487)) | ~r1(X1485,X1486))) | ~r1(X1483,X1484))) | ~r1(X1481,X1482)) | ~r1(X1480,X1481)) | ~r1(X1479,X1480)) | ~r1(X1478,X1479)))) | ~r1(X56,X109)) | ! [X1529] : (~r1(X56,X1529) | p51(X1529))) | ~r1(X1,X56))) | ~r1(X0,X1)) | ! [X1530] : (! [X1531] : (~r1(X1530,X1531) | ! [X1532] : (! [X1533] : (~r1(X1532,X1533) | ! [X1534] : (~r1(X1533,X1534) | ! [X1535] : (~r1(X1534,X1535) | ! [X1536] : (~r1(X1535,X1536) | ! [X1537] : (~r1(X1536,X1537) | ! [X1538] : (! [X1539] : (~r1(X1538,X1539) | ! [X1540] : (~r1(X1539,X1540) | ! [X1541] : (! [X1542] : (! [X1543] : (! [X1544] : (! [X1545] : (~r1(X1544,X1545) | ! [X1546] : (! [X1547] : (~r1(X1546,X1547) | ! [X1548] : (! [X1549] : (! [X1550] : (! [X1551] : (~r1(X1550,X1551) | ! [X1552] : (~r1(X1551,X1552) | ! [X1553] : (~r1(X1552,X1553) | ! [X1554] : (~r1(X1553,X1554) | ! [X1555] : (~r1(X1554,X1555) | ! [X1556] : (! [X1557] : (~r1(X1556,X1557) | ! [X1558] : (! [X1559] : (~r1(X1558,X1559) | ! [X1560] : (~r1(X1559,X1560) | ! [X1561] : (~r1(X1560,X1561) | ! [X1562] : (~r1(X1561,X1562) | ! [X1563] : (~r1(X1562,X1563) | ! [X1564] : (! [X1565] : (! [X1566] : (! [X1567] : (! [X1568] : (! [X1569] : (! [X1570] : (~r1(X1569,X1570) | ! [X1571] : (~r1(X1570,X1571) | ! [X1572] : (! [X1573] : (~r1(X1572,X1573) | ! [X1574] : (~r1(X1573,X1574) | ! [X1575] : (~r1(X1574,X1575) | ! [X1576] : (~r1(X1575,X1576) | ! [X1577] : (! [X1578] : (! [X1579] : (! [X1580] : (~r1(X1579,X1580) | ! [X1581] : (~r1(X1580,X1581) | (p50(X1581) & p49(X1581) & p48(X1581) & p45(X1581) & p41(X1581) & p38(X1581) & p36(X1581) & p35(X1581) & p34(X1581) & p32(X1581) & p31(X1581) & p29(X1581) & p26(X1581) & p25(X1581) & p23(X1581) & p21(X1581) & p18(X1581) & p12(X1581) & p8(X1581) & p6(X1581) & p5(X1581) & p1(X1581) & p2(X1581) & p3(X1581) & p4(X1581) & p7(X1581) & p9(X1581) & p10(X1581) & p11(X1581) & p13(X1581) & p14(X1581) & p15(X1581) & p16(X1581) & p17(X1581) & p19(X1581) & p20(X1581) & p22(X1581) & p24(X1581) & p27(X1581) & p28(X1581) & p30(X1581) & p33(X1581) & p37(X1581) & p39(X1581) & p40(X1581) & p42(X1581) & p43(X1581) & p44(X1581) & p46(X1581) & p47(X1581) & p51(X1581) & p52(X1581)))) | ~r1(X1578,X1579)) | ~r1(X1577,X1578)) | ~r1(X1576,X1577)))))) | ~r1(X1571,X1572)))) | ~r1(X1568,X1569)) | ~r1(X1567,X1568)) | ~r1(X1566,X1567)) | ~r1(X1565,X1566)) | ~r1(X1564,X1565)) | ~r1(X1563,X1564))))))) | ~r1(X1557,X1558))) | ~r1(X1555,X1556))))))) | ~r1(X1549,X1550)) | ~r1(X1548,X1549)) | ~r1(X1547,X1548))) | ~r1(X1545,X1546))) | ~r1(X1543,X1544)) | ~r1(X1542,X1543)) | ~r1(X1541,X1542)) | ~r1(X1540,X1541)))) | ~r1(X1537,X1538))))))) | ~r1(X1531,X1532))) | ~r1(X0,X1530)) | ! [X1582] : ~r1(X0,X1582) | ! [X1583] : (~r1(X0,X1583) | ! [X1584] : (~r1(X1583,X1584) | ! [X1585] : (~r1(X1584,X1585) | ! [X1586] : (! [X1587] : (! [X1588] : (! [X1589] : (~r1(X1588,X1589) | ! [X1590] : (! [X1591] : (~r1(X1590,X1591) | ! [X1592] : (! [X1593] : (! [X1594] : (! [X1595] : (~r1(X1594,X1595) | ! [X1596] : (! [X1597] : (! [X1598] : (~r1(X1597,X1598) | ! [X1599] : (~r1(X1598,X1599) | ! [X1600] : (! [X1601] : (! [X1602] : (~r1(X1601,X1602) | ! [X1603] : (~r1(X1602,X1603) | ! [X1604] : (~r1(X1603,X1604) | ! [X1605] : (! [X1606] : (! [X1607] : (! [X1608] : (! [X1609] : (! [X1610] : (~r1(X1609,X1610) | ! [X1611] : (! [X1612] : (! [X1613] : (! [X1614] : (~r1(X1613,X1614) | ! [X1615] : (~r1(X1614,X1615) | ! [X1616] : (~r1(X1615,X1616) | ! [X1617] : (! [X1618] : (! [X1619] : (! [X1620] : (~r1(X1619,X1620) | ! [X1621] : (~r1(X1620,X1621) | ! [X1622] : (~r1(X1621,X1622) | ! [X1623] : (! [X1624] : (! [X1625] : (! [X1626] : (! [X1627] : (~r1(X1626,X1627) | ! [X1628] : (! [X1629] : (~r1(X1628,X1629) | ! [X1630] : (! [X1631] : (~r1(X1630,X1631) | ! [X1632] : (~r1(X1631,X1632) | ! [X1633] : (~r1(X1632,X1633) | ! [X1634] : ~r1(X1633,X1634)))) | ~r1(X1629,X1630))) | ~r1(X1627,X1628))) | ~r1(X1625,X1626)) | ~r1(X1624,X1625)) | ~r1(X1623,X1624)) | ~r1(X1622,X1623))))) | ~r1(X1618,X1619)) | ~r1(X1617,X1618)) | ~r1(X1616,X1617))))) | ~r1(X1612,X1613)) | ~r1(X1611,X1612)) | ~r1(X1610,X1611))) | ~r1(X1608,X1609)) | ~r1(X1607,X1608)) | ~r1(X1606,X1607)) | ~r1(X1605,X1606)) | ~r1(X1604,X1605))))) | ~r1(X1600,X1601)) | ~r1(X1599,X1600)))) | ~r1(X1596,X1597)) | ~r1(X1595,X1596))) | ~r1(X1593,X1594)) | ~r1(X1592,X1593)) | ~r1(X1591,X1592))) | ~r1(X1589,X1590))) | ~r1(X1587,X1588)) | ~r1(X1586,X1587)) | ~r1(X1585,X1586))))))), 23.28/23.17 inference(pure_predicate_removal,[],[f6])). 23.28/23.17 fof(f6,plain,( 23.28/23.17 ? [X0] : ~(~! [X1] : (~(~! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (~((p1(X54) & p51(X54)) | (~p1(X54) & ~p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ! [X55] : (p52(X55) | ~r1(X1,X55)) | ~! [X56] : (~(~! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (~((~p51(X108) & ~p50(X108)) | (p50(X108) & p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) | ~! [X109] : (~(! [X110] : (p50(X110) | ~r1(X109,X110)) | ~! [X111] : (~(~! [X112] : (~(~! [X113] : (~(! [X114] : (~r1(X113,X114) | p47(X114)) | ~! [X115] : (~(! [X116] : (p46(X116) | ~r1(X115,X116)) | ~! [X117] : (~(! [X118] : (p45(X118) | ~r1(X117,X118)) | ~! [X119] : (~(! [X120] : (~r1(X119,X120) | p44(X120)) | ~! [X121] : (~r1(X119,X121) | ~(! [X122] : (p43(X122) | ~r1(X121,X122)) | ~! [X123] : (~(~! [X124] : (~r1(X123,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (! [X130] : (! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (! [X134] : (~r1(X133,X134) | ! [X135] : (~r1(X134,X135) | ! [X136] : (! [X137] : (! [X138] : (! [X139] : (! [X140] : (~r1(X139,X140) | ! [X141] : (! [X142] : (! [X143] : (! [X144] : (! [X145] : (~r1(X144,X145) | ! [X146] : (! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (! [X165] : (! [X166] : (~r1(X165,X166) | ~((~p42(X166) & ~p41(X166)) | (p42(X166) & p41(X166)))) | ~r1(X164,X165)) | ~r1(X163,X164)) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160)) | ~r1(X158,X159)))) | ~r1(X155,X156)) | ~r1(X154,X155))))))) | ~r1(X148,X149)) | ~r1(X147,X148))) | ~r1(X145,X146))) | ~r1(X143,X144)) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141))) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137)) | ~r1(X135,X136)))) | ~r1(X132,X133)) | ~r1(X131,X132))) | ~r1(X129,X130)) | ~r1(X128,X129))))))) | ! [X167] : (p42(X167) | ~r1(X123,X167)) | ~! [X168] : (~r1(X123,X168) | ~(! [X169] : (p41(X169) | ~r1(X168,X169)) | ~! [X170] : (~r1(X168,X170) | ~(~! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (! [X174] : (! [X175] : (! [X176] : (! [X177] : (! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (! [X186] : (! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (~r1(X190,X191) | ! [X192] : (! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (~r1(X195,X196) | ! [X197] : (~r1(X196,X197) | ! [X198] : (! [X199] : (! [X200] : (~r1(X199,X200) | ! [X201] : (~r1(X200,X201) | ! [X202] : (! [X203] : (~r1(X202,X203) | ! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (~r1(X205,X206) | ! [X207] : (! [X208] : (~r1(X207,X208) | ! [X209] : (! [X210] : (~r1(X209,X210) | ! [X211] : (~r1(X210,X211) | ~((~p39(X211) & ~p40(X211)) | (p39(X211) & p40(X211))))) | ~r1(X208,X209))) | ~r1(X206,X207)))) | ~r1(X203,X204))) | ~r1(X201,X202)))) | ~r1(X198,X199)) | ~r1(X197,X198))))))) | ~r1(X191,X192))) | ~r1(X189,X190)))) | ~r1(X186,X187)) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184))) | ~r1(X181,X182)) | ~r1(X180,X181))) | ~r1(X178,X179)) | ~r1(X177,X178)) | ~r1(X176,X177)) | ~r1(X175,X176)) | ~r1(X174,X175)) | ~r1(X173,X174)) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~! [X212] : (~r1(X170,X212) | ~(~! [X213] : (~r1(X212,X213) | ~(~! [X214] : (~r1(X213,X214) | ~(~! [X215] : (! [X216] : (~r1(X215,X216) | ! [X217] : (~r1(X216,X217) | ! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (! [X221] : (! [X222] : (! [X223] : (~r1(X222,X223) | ! [X224] : (~r1(X223,X224) | ! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (~r1(X233,X234) | ! [X235] : (! [X236] : (~r1(X235,X236) | ! [X237] : (~r1(X236,X237) | ! [X238] : (~r1(X237,X238) | ! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~r1(X242,X243) | ! [X244] : (! [X245] : (! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (~r1(X251,X252) | ~((p36(X252) & p37(X252)) | (~p36(X252) & ~p37(X252))))) | ~r1(X249,X250))))) | ~r1(X245,X246)) | ~r1(X244,X245)) | ~r1(X243,X244)))))))))) | ~r1(X234,X235))))) | ~r1(X230,X231)))) | ~r1(X227,X228)) | ~r1(X226,X227)) | ~r1(X225,X226))))) | ~r1(X221,X222)) | ~r1(X220,X221)) | ~r1(X219,X220)) | ~r1(X218,X219))))) | ~r1(X214,X215)) | ! [X253] : (~r1(X214,X253) | p37(X253)) | ~! [X254] : (~r1(X214,X254) | ~(~! [X255] : (~(~! [X256] : (~(~! [X257] : (~r1(X256,X257) | ! [X258] : (! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (! [X263] : (~r1(X262,X263) | ! [X264] : (! [X265] : (~r1(X264,X265) | ! [X266] : (! [X267] : (! [X268] : (! [X269] : (~r1(X268,X269) | ! [X270] : (~r1(X269,X270) | ! [X271] : (~r1(X270,X271) | ! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (! [X280] : (~r1(X279,X280) | ! [X281] : (~r1(X280,X281) | ! [X282] : (! [X283] : (! [X284] : (~r1(X283,X284) | ! [X285] : (! [X286] : (! [X287] : (! [X288] : (! [X289] : (~r1(X288,X289) | ! [X290] : (~r1(X289,X290) | ! [X291] : (~((p34(X291) & p33(X291)) | (~p33(X291) & ~p34(X291))) | ~r1(X290,X291)))) | ~r1(X287,X288)) | ~r1(X286,X287)) | ~r1(X285,X286)) | ~r1(X284,X285))) | ~r1(X282,X283)) | ~r1(X281,X282)))) | ~r1(X278,X279)))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272))))) | ~r1(X267,X268)) | ~r1(X266,X267)) | ~r1(X265,X266))) | ~r1(X263,X264))) | ~r1(X261,X262)) | ~r1(X260,X261)))) | ~r1(X257,X258))) | ~! [X292] : (~(~! [X293] : (~r1(X292,X293) | ~(~! [X294] : (~r1(X293,X294) | ! [X295] : (! [X296] : (~r1(X295,X296) | ! [X297] : (! [X298] : (! [X299] : (~r1(X298,X299) | ! [X300] : (! [X301] : (! [X302] : (~r1(X301,X302) | ! [X303] : (~r1(X302,X303) | ! [X304] : (! [X305] : (~r1(X304,X305) | ! [X306] : (! [X307] : (~r1(X306,X307) | ! [X308] : (! [X309] : (! [X310] : (! [X311] : (! [X312] : (~r1(X311,X312) | ! [X313] : (~r1(X312,X313) | ! [X314] : (~r1(X313,X314) | ! [X315] : (! [X316] : (~r1(X315,X316) | ! [X317] : (! [X318] : (! [X319] : (! [X320] : (~r1(X319,X320) | ! [X321] : (! [X322] : (! [X323] : (~r1(X322,X323) | ! [X324] : (~r1(X323,X324) | ! [X325] : (~r1(X324,X325) | ! [X326] : (~r1(X325,X326) | ~((p31(X326) & p32(X326)) | (~p32(X326) & ~p31(X326))))))) | ~r1(X321,X322)) | ~r1(X320,X321))) | ~r1(X318,X319)) | ~r1(X317,X318)) | ~r1(X316,X317))) | ~r1(X314,X315))))) | ~r1(X310,X311)) | ~r1(X309,X310)) | ~r1(X308,X309)) | ~r1(X307,X308))) | ~r1(X305,X306))) | ~r1(X303,X304)))) | ~r1(X300,X301)) | ~r1(X299,X300))) | ~r1(X297,X298)) | ~r1(X296,X297))) | ~r1(X294,X295))) | ! [X327] : (p32(X327) | ~r1(X293,X327)) | ~! [X328] : (~(~! [X329] : (! [X330] : (! [X331] : (~r1(X330,X331) | ! [X332] : (! [X333] : (~r1(X332,X333) | ! [X334] : (~r1(X333,X334) | ! [X335] : (~r1(X334,X335) | ! [X336] : (~r1(X335,X336) | ! [X337] : (! [X338] : (~r1(X337,X338) | ! [X339] : (! [X340] : (~r1(X339,X340) | ! [X341] : (! [X342] : (~r1(X341,X342) | ! [X343] : (~r1(X342,X343) | ! [X344] : (! [X345] : (~r1(X344,X345) | ! [X346] : (! [X347] : (! [X348] : (! [X349] : (! [X350] : (! [X351] : (! [X352] : (! [X353] : (! [X354] : (~r1(X353,X354) | ! [X355] : (~r1(X354,X355) | ! [X356] : (~r1(X355,X356) | ! [X357] : (! [X358] : (~r1(X357,X358) | ! [X359] : (! [X360] : (~((p31(X360) & p30(X360)) | (~p30(X360) & ~p31(X360))) | ~r1(X359,X360)) | ~r1(X358,X359))) | ~r1(X356,X357))))) | ~r1(X352,X353)) | ~r1(X351,X352)) | ~r1(X350,X351)) | ~r1(X349,X350)) | ~r1(X348,X349)) | ~r1(X347,X348)) | ~r1(X346,X347)) | ~r1(X345,X346))) | ~r1(X343,X344)))) | ~r1(X340,X341))) | ~r1(X338,X339))) | ~r1(X336,X337)))))) | ~r1(X331,X332))) | ~r1(X329,X330)) | ~r1(X328,X329)) | ! [X361] : (~r1(X328,X361) | p31(X361)) | ~! [X362] : (~(! [X363] : (p30(X363) | ~r1(X362,X363)) | ~! [X364] : (~(~! [X365] : (! [X366] : (~r1(X365,X366) | ! [X367] : (! [X368] : (! [X369] : (! [X370] : (! [X371] : (! [X372] : (~r1(X371,X372) | ! [X373] : (~r1(X372,X373) | ! [X374] : (! [X375] : (~r1(X374,X375) | ! [X376] : (! [X377] : (~r1(X376,X377) | ! [X378] : (~r1(X377,X378) | ! [X379] : (! [X380] : (~r1(X379,X380) | ! [X381] : (! [X382] : (! [X383] : (~r1(X382,X383) | ! [X384] : (~r1(X383,X384) | ! [X385] : (~r1(X384,X385) | ! [X386] : (! [X387] : (! [X388] : (! [X389] : (~r1(X388,X389) | ! [X390] : (~r1(X389,X390) | ! [X391] : (! [X392] : (! [X393] : (! [X394] : (~((~p28(X394) & ~p29(X394)) | (p28(X394) & p29(X394))) | ~r1(X393,X394)) | ~r1(X392,X393)) | ~r1(X391,X392)) | ~r1(X390,X391)))) | ~r1(X387,X388)) | ~r1(X386,X387)) | ~r1(X385,X386))))) | ~r1(X381,X382)) | ~r1(X380,X381))) | ~r1(X378,X379)))) | ~r1(X375,X376))) | ~r1(X373,X374)))) | ~r1(X370,X371)) | ~r1(X369,X370)) | ~r1(X368,X369)) | ~r1(X367,X368)) | ~r1(X366,X367))) | ~r1(X364,X365)) | ~! [X395] : (~(~! [X396] : (~(! [X397] : (~r1(X396,X397) | p27(X397)) | ~! [X398] : (~r1(X396,X398) | ~(~! [X399] : (! [X400] : (~r1(X399,X400) | ! [X401] : (! [X402] : (! [X403] : (! [X404] : (! [X405] : (~r1(X404,X405) | ! [X406] : (~r1(X405,X406) | ! [X407] : (~r1(X406,X407) | ! [X408] : (~r1(X407,X408) | ! [X409] : (~r1(X408,X409) | ! [X410] : (~r1(X409,X410) | ! [X411] : (! [X412] : (~r1(X411,X412) | ! [X413] : (! [X414] : (~r1(X413,X414) | ! [X415] : (~r1(X414,X415) | ! [X416] : (~r1(X415,X416) | ! [X417] : (~r1(X416,X417) | ! [X418] : (! [X419] : (~r1(X418,X419) | ! [X420] : (! [X421] : (~r1(X420,X421) | ! [X422] : (! [X423] : (~r1(X422,X423) | ! [X424] : (~r1(X423,X424) | ! [X425] : (~r1(X424,X425) | ~((p25(X425) & p26(X425)) | (~p25(X425) & ~p26(X425)))))) | ~r1(X421,X422))) | ~r1(X419,X420))) | ~r1(X417,X418)))))) | ~r1(X412,X413))) | ~r1(X410,X411)))))))) | ~r1(X403,X404)) | ~r1(X402,X403)) | ~r1(X401,X402)) | ~r1(X400,X401))) | ~r1(X398,X399)) | ~! [X426] : (~(~! [X427] : (~(! [X428] : (~r1(X427,X428) | p24(X428)) | ~! [X429] : (~r1(X427,X429) | ~(! [X430] : (p23(X430) | ~r1(X429,X430)) | ~! [X431] : (~r1(X429,X431) | ~(~! [X432] : (! [X433] : (~r1(X432,X433) | ! [X434] : (~r1(X433,X434) | ! [X435] : (! [X436] : (~r1(X435,X436) | ! [X437] : (~r1(X436,X437) | ! [X438] : (~r1(X437,X438) | ! [X439] : (! [X440] : (~r1(X439,X440) | ! [X441] : (! [X442] : (! [X443] : (! [X444] : (! [X445] : (~r1(X444,X445) | ! [X446] : (~r1(X445,X446) | ! [X447] : (! [X448] : (~r1(X447,X448) | ! [X449] : (! [X450] : (~r1(X449,X450) | ! [X451] : (~r1(X450,X451) | ! [X452] : (! [X453] : (~r1(X452,X453) | ! [X454] : (~r1(X453,X454) | ~((p21(X454) & p22(X454)) | (~p21(X454) & ~p22(X454))))) | ~r1(X451,X452)))) | ~r1(X448,X449))) | ~r1(X446,X447)))) | ~r1(X443,X444)) | ~r1(X442,X443)) | ~r1(X441,X442)) | ~r1(X440,X441))) | ~r1(X438,X439))))) | ~r1(X434,X435)))) | ~r1(X431,X432)) | ~! [X455] : (~(! [X456] : (~r1(X455,X456) | p21(X456)) | ~! [X457] : (~(! [X458] : (~r1(X457,X458) | p20(X458)) | ~! [X459] : (~(! [X460] : (~r1(X459,X460) | p19(X460)) | ~! [X461] : (~(~! [X462] : (~r1(X461,X462) | ! [X463] : (~r1(X462,X463) | ! [X464] : (~r1(X463,X464) | ! [X465] : (! [X466] : (! [X467] : (! [X468] : (~r1(X467,X468) | ! [X469] : (! [X470] : (! [X471] : (~r1(X470,X471) | ! [X472] : (~r1(X471,X472) | ! [X473] : (! [X474] : (~r1(X473,X474) | ! [X475] : (! [X476] : (! [X477] : (! [X478] : (! [X479] : (~r1(X478,X479) | ! [X480] : (~r1(X479,X480) | ~((~p17(X480) & ~p18(X480)) | (p17(X480) & p18(X480))))) | ~r1(X477,X478)) | ~r1(X476,X477)) | ~r1(X475,X476)) | ~r1(X474,X475))) | ~r1(X472,X473)))) | ~r1(X469,X470)) | ~r1(X468,X469))) | ~r1(X466,X467)) | ~r1(X465,X466)) | ~r1(X464,X465))))) | ~! [X481] : (~r1(X461,X481) | ~(~! [X482] : (~r1(X481,X482) | ! [X483] : (! [X484] : (~r1(X483,X484) | ! [X485] : (! [X486] : (~r1(X485,X486) | ! [X487] : (~r1(X486,X487) | ! [X488] : (~r1(X487,X488) | ! [X489] : (~r1(X488,X489) | ! [X490] : (~r1(X489,X490) | ! [X491] : (~r1(X490,X491) | ! [X492] : (~r1(X491,X492) | ! [X493] : (! [X494] : (! [X495] : (~r1(X494,X495) | ! [X496] : (~r1(X495,X496) | ! [X497] : (~r1(X496,X497) | ! [X498] : (! [X499] : (~r1(X498,X499) | ~((~p17(X499) & ~p16(X499)) | (p16(X499) & p17(X499)))) | ~r1(X497,X498))))) | ~r1(X493,X494)) | ~r1(X492,X493))))))))) | ~r1(X484,X485))) | ~r1(X482,X483))) | ! [X500] : (p17(X500) | ~r1(X481,X500)) | ~! [X501] : (~r1(X481,X501) | ~(~! [X502] : (~r1(X501,X502) | ~(~! [X503] : (~r1(X502,X503) | ~(! [X504] : (~r1(X503,X504) | p14(X504)) | ~! [X505] : (~(! [X506] : (p13(X506) | ~r1(X505,X506)) | ~! [X507] : (~r1(X505,X507) | ~(~! [X508] : (~r1(X507,X508) | ! [X509] : (~r1(X508,X509) | ! [X510] : (! [X511] : (! [X512] : (! [X513] : (! [X514] : (~r1(X513,X514) | ! [X515] : (~r1(X514,X515) | ! [X516] : (! [X517] : (~r1(X516,X517) | ! [X518] : (~r1(X517,X518) | ! [X519] : (~r1(X518,X519) | ! [X520] : (~r1(X519,X520) | ~((~p12(X520) & ~p11(X520)) | (p12(X520) & p11(X520))))))) | ~r1(X515,X516)))) | ~r1(X512,X513)) | ~r1(X511,X512)) | ~r1(X510,X511)) | ~r1(X509,X510)))) | ! [X521] : (~r1(X507,X521) | p12(X521)) | ~! [X522] : (~r1(X507,X522) | ~(~! [X523] : (~(~! [X524] : (! [X525] : (! [X526] : (~r1(X525,X526) | ! [X527] : (~r1(X526,X527) | ! [X528] : (~r1(X527,X528) | ! [X529] : (~r1(X528,X529) | ! [X530] : (~r1(X529,X530) | ! [X531] : (! [X532] : (! [X533] : (! [X534] : (~r1(X533,X534) | ~((p10(X534) & p9(X534)) | (~p10(X534) & ~p9(X534)))) | ~r1(X532,X533)) | ~r1(X531,X532)) | ~r1(X530,X531))))))) | ~r1(X524,X525)) | ~r1(X523,X524)) | ! [X535] : (p10(X535) | ~r1(X523,X535)) | ~! [X536] : (~r1(X523,X536) | ~(! [X537] : (~r1(X536,X537) | p9(X537)) | ~! [X538] : (~r1(X536,X538) | ~(~! [X539] : (~r1(X538,X539) | ! [X540] : (! [X541] : (! [X542] : (! [X543] : (~r1(X542,X543) | ! [X544] : (! [X545] : (~r1(X544,X545) | ! [X546] : (! [X547] : (~((p7(X547) & p8(X547)) | (~p7(X547) & ~p8(X547))) | ~r1(X546,X547)) | ~r1(X545,X546))) | ~r1(X543,X544))) | ~r1(X541,X542)) | ~r1(X540,X541)) | ~r1(X539,X540))) | ~! [X548] : (~r1(X538,X548) | ~(~! [X549] : (! [X550] : (! [X551] : (~r1(X550,X551) | ! [X552] : (~r1(X551,X552) | ! [X553] : (~r1(X552,X553) | ! [X554] : (~r1(X553,X554) | ! [X555] : (! [X556] : (~((p7(X556) & p6(X556)) | (~p6(X556) & ~p7(X556))) | ~r1(X555,X556)) | ~r1(X554,X555)))))) | ~r1(X549,X550)) | ~r1(X548,X549)) | ! [X557] : (p7(X557) | ~r1(X548,X557)) | ~! [X558] : (~(~! [X559] : (~(~! [X560] : (~r1(X559,X560) | ~(~! [X561] : (! [X562] : (~r1(X561,X562) | ! [X563] : (~r1(X562,X563) | ! [X564] : (! [X565] : (~((p4(X565) & p3(X565)) | (~p4(X565) & ~p3(X565))) | ~r1(X564,X565)) | ~r1(X563,X564)))) | ~r1(X560,X561)) | ~! [X566] : (~(~! [X567] : (~r1(X566,X567) | ! [X568] : (! [X569] : (! [X570] : (~r1(X569,X570) | ~((~p2(X570) & ~p3(X570)) | (p2(X570) & p3(X570)))) | ~r1(X568,X569)) | ~r1(X567,X568))) | ~! [X571] : (! [X572] : (! [X573] : (~r1(X572,X573) | ! [X574] : (~r1(X573,X574) | ~((~p2(X574) & ~p1(X574)) | (p1(X574) & p2(X574))))) | ~r1(X571,X572)) | ~r1(X566,X571)) | ! [X575] : (p3(X575) | ~r1(X566,X575))) | ~r1(X560,X566)) | ! [X576] : (~r1(X560,X576) | p4(X576)))) | ! [X577] : (~r1(X559,X577) | p5(X577)) | ~! [X578] : (~r1(X559,X578) | ! [X579] : (! [X580] : (! [X581] : (~r1(X580,X581) | ! [X582] : (~r1(X581,X582) | ! [X583] : (~r1(X582,X583) | ~((~p4(X583) & ~p5(X583)) | (p5(X583) & p4(X583)))))) | ~r1(X579,X580)) | ~r1(X578,X579)))) | ~r1(X558,X559)) | ! [X584] : (p6(X584) | ~r1(X558,X584)) | ~! [X585] : (! [X586] : (~r1(X585,X586) | ! [X587] : (! [X588] : (! [X589] : (~r1(X588,X589) | ! [X590] : (~r1(X589,X590) | ! [X591] : (~r1(X590,X591) | ~((p5(X591) & p6(X591)) | (~p6(X591) & ~p5(X591)))))) | ~r1(X587,X588)) | ~r1(X586,X587))) | ~r1(X558,X585))) | ~r1(X548,X558)))) | ! [X592] : (~r1(X538,X592) | p8(X592)))) | ~! [X593] : (~r1(X536,X593) | ! [X594] : (~r1(X593,X594) | ! [X595] : (! [X596] : (! [X597] : (! [X598] : (! [X599] : (~r1(X598,X599) | ! [X600] : (! [X601] : (! [X602] : (~((~p8(X602) & ~p9(X602)) | (p9(X602) & p8(X602))) | ~r1(X601,X602)) | ~r1(X600,X601)) | ~r1(X599,X600))) | ~r1(X597,X598)) | ~r1(X596,X597)) | ~r1(X595,X596)) | ~r1(X594,X595))))))) | ~r1(X522,X523)) | ! [X603] : (~r1(X522,X603) | p11(X603)) | ~! [X604] : (~r1(X522,X604) | ! [X605] : (~r1(X604,X605) | ! [X606] : (~r1(X605,X606) | ! [X607] : (~r1(X606,X607) | ! [X608] : (~r1(X607,X608) | ! [X609] : (~r1(X608,X609) | ! [X610] : (~r1(X609,X610) | ! [X611] : (! [X612] : (! [X613] : (~r1(X612,X613) | ! [X614] : (! [X615] : (~r1(X614,X615) | ~((~p11(X615) & ~p10(X615)) | (p11(X615) & p10(X615)))) | ~r1(X613,X614))) | ~r1(X611,X612)) | ~r1(X610,X611))))))))))))) | ~! [X616] : (! [X617] : (! [X618] : (~r1(X617,X618) | ! [X619] : (! [X620] : (! [X621] : (! [X622] : (~r1(X621,X622) | ! [X623] : (! [X624] : (~r1(X623,X624) | ! [X625] : (~r1(X624,X625) | ! [X626] : (! [X627] : (! [X628] : (~r1(X627,X628) | ! [X629] : (~((~p13(X629) & ~p12(X629)) | (p13(X629) & p12(X629))) | ~r1(X628,X629))) | ~r1(X626,X627)) | ~r1(X625,X626)))) | ~r1(X622,X623))) | ~r1(X620,X621)) | ~r1(X619,X620)) | ~r1(X618,X619))) | ~r1(X616,X617)) | ~r1(X505,X616))) | ~r1(X503,X505)) | ~! [X630] : (~r1(X503,X630) | ! [X631] : (! [X632] : (~r1(X631,X632) | ! [X633] : (! [X634] : (~r1(X633,X634) | ! [X635] : (! [X636] : (! [X637] : (~r1(X636,X637) | ! [X638] : (~r1(X637,X638) | ! [X639] : (~r1(X638,X639) | ! [X640] : (~r1(X639,X640) | ! [X641] : (! [X642] : (~r1(X641,X642) | ! [X643] : (! [X644] : (~r1(X643,X644) | ~((~p14(X644) & ~p13(X644)) | (p14(X644) & p13(X644)))) | ~r1(X642,X643))) | ~r1(X640,X641)))))) | ~r1(X635,X636)) | ~r1(X634,X635))) | ~r1(X632,X633))) | ~r1(X630,X631))))) | ! [X645] : (p15(X645) | ~r1(X502,X645)) | ~! [X646] : (! [X647] : (! [X648] : (~r1(X647,X648) | ! [X649] : (! [X650] : (~r1(X649,X650) | ! [X651] : (~r1(X650,X651) | ! [X652] : (! [X653] : (! [X654] : (! [X655] : (~r1(X654,X655) | ! [X656] : (! [X657] : (~r1(X656,X657) | ! [X658] : (~r1(X657,X658) | ! [X659] : (! [X660] : (~r1(X659,X660) | ! [X661] : (~((p14(X661) & p15(X661)) | (~p14(X661) & ~p15(X661))) | ~r1(X660,X661))) | ~r1(X658,X659)))) | ~r1(X655,X656))) | ~r1(X653,X654)) | ~r1(X652,X653)) | ~r1(X651,X652)))) | ~r1(X648,X649))) | ~r1(X646,X647)) | ~r1(X502,X646)))) | ! [X662] : (p16(X662) | ~r1(X501,X662)) | ~! [X663] : (~r1(X501,X663) | ! [X664] : (! [X665] : (~r1(X664,X665) | ! [X666] : (! [X667] : (! [X668] : (! [X669] : (~r1(X668,X669) | ! [X670] : (! [X671] : (~r1(X670,X671) | ! [X672] : (! [X673] : (~r1(X672,X673) | ! [X674] : (! [X675] : (! [X676] : (! [X677] : (! [X678] : (~r1(X677,X678) | ! [X679] : (~r1(X678,X679) | ~((p15(X679) & p16(X679)) | (~p16(X679) & ~p15(X679))))) | ~r1(X676,X677)) | ~r1(X675,X676)) | ~r1(X674,X675)) | ~r1(X673,X674))) | ~r1(X671,X672))) | ~r1(X669,X670))) | ~r1(X667,X668)) | ~r1(X666,X667)) | ~r1(X665,X666))) | ~r1(X663,X664))))))) | ! [X680] : (p18(X680) | ~r1(X461,X680))) | ~r1(X459,X461)) | ~! [X681] : (! [X682] : (~r1(X681,X682) | ! [X683] : (! [X684] : (~r1(X683,X684) | ! [X685] : (~r1(X684,X685) | ! [X686] : (! [X687] : (~r1(X686,X687) | ! [X688] : (! [X689] : (~r1(X688,X689) | ! [X690] : (~r1(X689,X690) | ! [X691] : (~r1(X690,X691) | ! [X692] : (~r1(X691,X692) | ! [X693] : (! [X694] : (! [X695] : (! [X696] : (~r1(X695,X696) | ! [X697] : (! [X698] : (! [X699] : (~r1(X698,X699) | ! [X700] : (~((~p18(X700) & ~p19(X700)) | (p18(X700) & p19(X700))) | ~r1(X699,X700))) | ~r1(X697,X698)) | ~r1(X696,X697))) | ~r1(X694,X695)) | ~r1(X693,X694)) | ~r1(X692,X693)))))) | ~r1(X687,X688))) | ~r1(X685,X686)))) | ~r1(X682,X683))) | ~r1(X459,X681))) | ~r1(X457,X459)) | ~! [X701] : (! [X702] : (! [X703] : (~r1(X702,X703) | ! [X704] : (! [X705] : (! [X706] : (! [X707] : (! [X708] : (~r1(X707,X708) | ! [X709] : (! [X710] : (! [X711] : (! [X712] : (~r1(X711,X712) | ! [X713] : (~r1(X712,X713) | ! [X714] : (! [X715] : (~r1(X714,X715) | ! [X716] : (~r1(X715,X716) | ! [X717] : (~r1(X716,X717) | ! [X718] : (~r1(X717,X718) | ! [X719] : (~r1(X718,X719) | ! [X720] : (! [X721] : (~((p19(X721) & p20(X721)) | (~p19(X721) & ~p20(X721))) | ~r1(X720,X721)) | ~r1(X719,X720))))))) | ~r1(X713,X714)))) | ~r1(X710,X711)) | ~r1(X709,X710)) | ~r1(X708,X709))) | ~r1(X706,X707)) | ~r1(X705,X706)) | ~r1(X704,X705)) | ~r1(X703,X704))) | ~r1(X701,X702)) | ~r1(X457,X701))) | ~r1(X455,X457)) | ~! [X722] : (~r1(X455,X722) | ! [X723] : (~r1(X722,X723) | ! [X724] : (! [X725] : (~r1(X724,X725) | ! [X726] : (! [X727] : (~r1(X726,X727) | ! [X728] : (! [X729] : (! [X730] : (~r1(X729,X730) | ! [X731] : (! [X732] : (~r1(X731,X732) | ! [X733] : (! [X734] : (! [X735] : (~r1(X734,X735) | ! [X736] : (~r1(X735,X736) | ! [X737] : (! [X738] : (! [X739] : (~r1(X738,X739) | ! [X740] : (! [X741] : (~r1(X740,X741) | ! [X742] : (! [X743] : (~((p21(X743) & p20(X743)) | (~p20(X743) & ~p21(X743))) | ~r1(X742,X743)) | ~r1(X741,X742))) | ~r1(X739,X740))) | ~r1(X737,X738)) | ~r1(X736,X737)))) | ~r1(X733,X734)) | ~r1(X732,X733))) | ~r1(X730,X731))) | ~r1(X728,X729)) | ~r1(X727,X728))) | ~r1(X725,X726))) | ~r1(X723,X724))))) | ~r1(X431,X455)) | ! [X744] : (p22(X744) | ~r1(X431,X744)))) | ~! [X745] : (! [X746] : (! [X747] : (! [X748] : (! [X749] : (! [X750] : (! [X751] : (! [X752] : (~r1(X751,X752) | ! [X753] : (! [X754] : (! [X755] : (! [X756] : (! [X757] : (~r1(X756,X757) | ! [X758] : (! [X759] : (! [X760] : (! [X761] : (! [X762] : (! [X763] : (~r1(X762,X763) | ! [X764] : (~r1(X763,X764) | ! [X765] : (~r1(X764,X765) | ! [X766] : (~r1(X765,X766) | ! [X767] : (! [X768] : (~((p22(X768) & p23(X768)) | (~p22(X768) & ~p23(X768))) | ~r1(X767,X768)) | ~r1(X766,X767)))))) | ~r1(X761,X762)) | ~r1(X760,X761)) | ~r1(X759,X760)) | ~r1(X758,X759)) | ~r1(X757,X758))) | ~r1(X755,X756)) | ~r1(X754,X755)) | ~r1(X753,X754)) | ~r1(X752,X753))) | ~r1(X750,X751)) | ~r1(X749,X750)) | ~r1(X748,X749)) | ~r1(X747,X748)) | ~r1(X746,X747)) | ~r1(X745,X746)) | ~r1(X429,X745)))) | ~! [X769] : (! [X770] : (~r1(X769,X770) | ! [X771] : (! [X772] : (! [X773] : (! [X774] : (! [X775] : (! [X776] : (~r1(X775,X776) | ! [X777] : (~r1(X776,X777) | ! [X778] : (! [X779] : (! [X780] : (! [X781] : (! [X782] : (! [X783] : (! [X784] : (~r1(X783,X784) | ! [X785] : (! [X786] : (! [X787] : (~r1(X786,X787) | ! [X788] : (! [X789] : (~r1(X788,X789) | ! [X790] : (! [X791] : (~r1(X790,X791) | ! [X792] : (~r1(X791,X792) | ! [X793] : (~r1(X792,X793) | ~((~p23(X793) & ~p24(X793)) | (p24(X793) & p23(X793)))))) | ~r1(X789,X790))) | ~r1(X787,X788))) | ~r1(X785,X786)) | ~r1(X784,X785))) | ~r1(X782,X783)) | ~r1(X781,X782)) | ~r1(X780,X781)) | ~r1(X779,X780)) | ~r1(X778,X779)) | ~r1(X777,X778)))) | ~r1(X774,X775)) | ~r1(X773,X774)) | ~r1(X772,X773)) | ~r1(X771,X772)) | ~r1(X770,X771))) | ~r1(X427,X769))) | ~r1(X426,X427)) | ! [X794] : (p25(X794) | ~r1(X426,X794)) | ~! [X795] : (! [X796] : (~r1(X795,X796) | ! [X797] : (! [X798] : (~r1(X797,X798) | ! [X799] : (~r1(X798,X799) | ! [X800] : (~r1(X799,X800) | ! [X801] : (! [X802] : (~r1(X801,X802) | ! [X803] : (! [X804] : (~r1(X803,X804) | ! [X805] : (~r1(X804,X805) | ! [X806] : (~r1(X805,X806) | ! [X807] : (! [X808] : (! [X809] : (~r1(X808,X809) | ! [X810] : (! [X811] : (! [X812] : (! [X813] : (~r1(X812,X813) | ! [X814] : (~r1(X813,X814) | ! [X815] : (~r1(X814,X815) | ! [X816] : (~r1(X815,X816) | ! [X817] : (! [X818] : (~r1(X817,X818) | ! [X819] : (! [X820] : (~((p25(X820) & p24(X820)) | (~p25(X820) & ~p24(X820))) | ~r1(X819,X820)) | ~r1(X818,X819))) | ~r1(X816,X817)))))) | ~r1(X811,X812)) | ~r1(X810,X811)) | ~r1(X809,X810))) | ~r1(X807,X808)) | ~r1(X806,X807))))) | ~r1(X802,X803))) | ~r1(X800,X801))))) | ~r1(X796,X797))) | ~r1(X426,X795))) | ~r1(X398,X426)) | ! [X821] : (~r1(X398,X821) | p26(X821)))) | ~! [X822] : (! [X823] : (~r1(X822,X823) | ! [X824] : (~r1(X823,X824) | ! [X825] : (~r1(X824,X825) | ! [X826] : (~r1(X825,X826) | ! [X827] : (~r1(X826,X827) | ! [X828] : (! [X829] : (! [X830] : (! [X831] : (~r1(X830,X831) | ! [X832] : (~r1(X831,X832) | ! [X833] : (~r1(X832,X833) | ! [X834] : (! [X835] : (! [X836] : (~r1(X835,X836) | ! [X837] : (! [X838] : (! [X839] : (! [X840] : (~r1(X839,X840) | ! [X841] : (~r1(X840,X841) | ! [X842] : (~r1(X841,X842) | ! [X843] : (~r1(X842,X843) | ! [X844] : (! [X845] : (! [X846] : (! [X847] : (! [X848] : (! [X849] : (~r1(X848,X849) | ~((p26(X849) & p27(X849)) | (~p27(X849) & ~p26(X849)))) | ~r1(X847,X848)) | ~r1(X846,X847)) | ~r1(X845,X846)) | ~r1(X844,X845)) | ~r1(X843,X844)))))) | ~r1(X838,X839)) | ~r1(X837,X838)) | ~r1(X836,X837))) | ~r1(X834,X835)) | ~r1(X833,X834))))) | ~r1(X829,X830)) | ~r1(X828,X829)) | ~r1(X827,X828))))))) | ~r1(X396,X822))) | ~r1(X395,X396)) | ! [X850] : (p28(X850) | ~r1(X395,X850)) | ~! [X851] : (! [X852] : (! [X853] : (~r1(X852,X853) | ! [X854] : (! [X855] : (~r1(X854,X855) | ! [X856] : (~r1(X855,X856) | ! [X857] : (~r1(X856,X857) | ! [X858] : (! [X859] : (! [X860] : (~r1(X859,X860) | ! [X861] : (! [X862] : (! [X863] : (! [X864] : (~r1(X863,X864) | ! [X865] : (~r1(X864,X865) | ! [X866] : (~r1(X865,X866) | ! [X867] : (~r1(X866,X867) | ! [X868] : (! [X869] : (~r1(X868,X869) | ! [X870] : (! [X871] : (! [X872] : (~r1(X871,X872) | ! [X873] : (! [X874] : (~r1(X873,X874) | ! [X875] : (! [X876] : (! [X877] : (~r1(X876,X877) | ! [X878] : (! [X879] : (~((~p27(X879) & ~p28(X879)) | (p28(X879) & p27(X879))) | ~r1(X878,X879)) | ~r1(X877,X878))) | ~r1(X875,X876)) | ~r1(X874,X875))) | ~r1(X872,X873))) | ~r1(X870,X871)) | ~r1(X869,X870))) | ~r1(X867,X868)))))) | ~r1(X862,X863)) | ~r1(X861,X862)) | ~r1(X860,X861))) | ~r1(X858,X859)) | ~r1(X857,X858))))) | ~r1(X853,X854))) | ~r1(X851,X852)) | ~r1(X395,X851))) | ~r1(X364,X395)) | ! [X880] : (~r1(X364,X880) | p29(X880))) | ~r1(X362,X364)) | ~! [X881] : (! [X882] : (~r1(X881,X882) | ! [X883] : (! [X884] : (! [X885] : (! [X886] : (~r1(X885,X886) | ! [X887] : (~r1(X886,X887) | ! [X888] : (~r1(X887,X888) | ! [X889] : (~r1(X888,X889) | ! [X890] : (! [X891] : (~r1(X890,X891) | ! [X892] : (! [X893] : (! [X894] : (! [X895] : (~r1(X894,X895) | ! [X896] : (! [X897] : (~r1(X896,X897) | ! [X898] : (~r1(X897,X898) | ! [X899] : (~r1(X898,X899) | ! [X900] : (~r1(X899,X900) | ! [X901] : (! [X902] : (~r1(X901,X902) | ! [X903] : (! [X904] : (! [X905] : (~r1(X904,X905) | ! [X906] : (! [X907] : (! [X908] : (! [X909] : (! [X910] : (! [X911] : (~((p30(X911) & p29(X911)) | (~p29(X911) & ~p30(X911))) | ~r1(X910,X911)) | ~r1(X909,X910)) | ~r1(X908,X909)) | ~r1(X907,X908)) | ~r1(X906,X907)) | ~r1(X905,X906))) | ~r1(X903,X904)) | ~r1(X902,X903))) | ~r1(X900,X901)))))) | ~r1(X895,X896))) | ~r1(X893,X894)) | ~r1(X892,X893)) | ~r1(X891,X892))) | ~r1(X889,X890)))))) | ~r1(X884,X885)) | ~r1(X883,X884)) | ~r1(X882,X883))) | ~r1(X362,X881))) | ~r1(X328,X362))) | ~r1(X293,X328)))) | ! [X912] : (~r1(X292,X912) | p33(X912)) | ~! [X913] : (~r1(X292,X913) | ! [X914] : (~r1(X913,X914) | ! [X915] : (! [X916] : (~r1(X915,X916) | ! [X917] : (~r1(X916,X917) | ! [X918] : (~r1(X917,X918) | ! [X919] : (! [X920] : (~r1(X919,X920) | ! [X921] : (~r1(X920,X921) | ! [X922] : (! [X923] : (~r1(X922,X923) | ! [X924] : (~r1(X923,X924) | ! [X925] : (~r1(X924,X925) | ! [X926] : (! [X927] : (~r1(X926,X927) | ! [X928] : (~r1(X927,X928) | ! [X929] : (! [X930] : (! [X931] : (! [X932] : (! [X933] : (! [X934] : (! [X935] : (~r1(X934,X935) | ! [X936] : (~r1(X935,X936) | ! [X937] : (~r1(X936,X937) | ! [X938] : (! [X939] : (~r1(X938,X939) | ! [X940] : (! [X941] : (~r1(X940,X941) | ! [X942] : (~r1(X941,X942) | ! [X943] : (~r1(X942,X943) | ! [X944] : (! [X945] : (! [X946] : (~((~p33(X946) & ~p32(X946)) | (p32(X946) & p33(X946))) | ~r1(X945,X946)) | ~r1(X944,X945)) | ~r1(X943,X944))))) | ~r1(X939,X940))) | ~r1(X937,X938))))) | ~r1(X933,X934)) | ~r1(X932,X933)) | ~r1(X931,X932)) | ~r1(X930,X931)) | ~r1(X929,X930)) | ~r1(X928,X929)))) | ~r1(X925,X926))))) | ~r1(X921,X922)))) | ~r1(X918,X919))))) | ~r1(X914,X915))))) | ~r1(X256,X292)) | ! [X947] : (~r1(X256,X947) | p34(X947))) | ~r1(X255,X256)) | ! [X948] : (p35(X948) | ~r1(X255,X948)) | ~! [X949] : (~r1(X255,X949) | ! [X950] : (! [X951] : (~r1(X950,X951) | ! [X952] : (~r1(X951,X952) | ! [X953] : (~r1(X952,X953) | ! [X954] : (! [X955] : (! [X956] : (~r1(X955,X956) | ! [X957] : (! [X958] : (! [X959] : (~r1(X958,X959) | ! [X960] : (~r1(X959,X960) | ! [X961] : (! [X962] : (! [X963] : (! [X964] : (! [X965] : (~r1(X964,X965) | ! [X966] : (! [X967] : (! [X968] : (~r1(X967,X968) | ! [X969] : (! [X970] : (! [X971] : (~r1(X970,X971) | ! [X972] : (! [X973] : (~r1(X972,X973) | ! [X974] : (! [X975] : (! [X976] : (~r1(X975,X976) | ! [X977] : (! [X978] : (~r1(X977,X978) | ! [X979] : (~r1(X978,X979) | ! [X980] : (! [X981] : (~r1(X980,X981) | ! [X982] : (! [X983] : (~r1(X982,X983) | ! [X984] : (~r1(X983,X984) | ~((p34(X984) & p35(X984)) | (~p35(X984) & ~p34(X984))))) | ~r1(X981,X982))) | ~r1(X979,X980)))) | ~r1(X976,X977))) | ~r1(X974,X975)) | ~r1(X973,X974))) | ~r1(X971,X972))) | ~r1(X969,X970)) | ~r1(X968,X969))) | ~r1(X966,X967)) | ~r1(X965,X966))) | ~r1(X963,X964)) | ~r1(X962,X963)) | ~r1(X961,X962)) | ~r1(X960,X961)))) | ~r1(X957,X958)) | ~r1(X956,X957))) | ~r1(X954,X955)) | ~r1(X953,X954))))) | ~r1(X949,X950)))) | ~r1(X254,X255)) | ! [X985] : (~r1(X254,X985) | p36(X985)) | ~! [X986] : (! [X987] : (~r1(X986,X987) | ! [X988] : (~r1(X987,X988) | ! [X989] : (~r1(X988,X989) | ! [X990] : (~r1(X989,X990) | ! [X991] : (! [X992] : (! [X993] : (! [X994] : (~r1(X993,X994) | ! [X995] : (! [X996] : (~r1(X995,X996) | ! [X997] : (! [X998] : (~r1(X997,X998) | ! [X999] : (~r1(X998,X999) | ! [X1000] : (~r1(X999,X1000) | ! [X1001] : (! [X1002] : (! [X1003] : (~r1(X1002,X1003) | ! [X1004] : (! [X1005] : (! [X1006] : (~r1(X1005,X1006) | ! [X1007] : (~r1(X1006,X1007) | ! [X1008] : (~r1(X1007,X1008) | ! [X1009] : (! [X1010] : (! [X1011] : (~r1(X1010,X1011) | ! [X1012] : (~r1(X1011,X1012) | ! [X1013] : (~r1(X1012,X1013) | ! [X1014] : (! [X1015] : (~r1(X1014,X1015) | ! [X1016] : (~r1(X1015,X1016) | ! [X1017] : (! [X1018] : (! [X1019] : (~r1(X1018,X1019) | ! [X1020] : (~r1(X1019,X1020) | ! [X1021] : (! [X1022] : (~((p36(X1022) & p35(X1022)) | (~p35(X1022) & ~p36(X1022))) | ~r1(X1021,X1022)) | ~r1(X1020,X1021)))) | ~r1(X1017,X1018)) | ~r1(X1016,X1017)))) | ~r1(X1013,X1014))))) | ~r1(X1009,X1010)) | ~r1(X1008,X1009))))) | ~r1(X1004,X1005)) | ~r1(X1003,X1004))) | ~r1(X1001,X1002)) | ~r1(X1000,X1001))))) | ~r1(X996,X997))) | ~r1(X994,X995))) | ~r1(X992,X993)) | ~r1(X991,X992)) | ~r1(X990,X991)))))) | ~r1(X254,X986)))))) | ! [X1023] : (~r1(X213,X1023) | p38(X1023)) | ~! [X1024] : (~r1(X213,X1024) | ! [X1025] : (~r1(X1024,X1025) | ! [X1026] : (! [X1027] : (! [X1028] : (~r1(X1027,X1028) | ! [X1029] : (~r1(X1028,X1029) | ! [X1030] : (~r1(X1029,X1030) | ! [X1031] : (! [X1032] : (~r1(X1031,X1032) | ! [X1033] : (~r1(X1032,X1033) | ! [X1034] : (~r1(X1033,X1034) | ! [X1035] : (! [X1036] : (~r1(X1035,X1036) | ! [X1037] : (! [X1038] : (! [X1039] : (~r1(X1038,X1039) | ! [X1040] : (~r1(X1039,X1040) | ! [X1041] : (! [X1042] : (~r1(X1041,X1042) | ! [X1043] : (~r1(X1042,X1043) | ! [X1044] : (~r1(X1043,X1044) | ! [X1045] : (~r1(X1044,X1045) | ! [X1046] : (! [X1047] : (! [X1048] : (~r1(X1047,X1048) | ! [X1049] : (! [X1050] : (! [X1051] : (~r1(X1050,X1051) | ! [X1052] : (~r1(X1051,X1052) | ! [X1053] : (! [X1054] : (~r1(X1053,X1054) | ! [X1055] : (~r1(X1054,X1055) | ! [X1056] : (~r1(X1055,X1056) | ! [X1057] : (! [X1058] : (! [X1059] : (~r1(X1058,X1059) | ! [X1060] : (! [X1061] : (! [X1062] : (~r1(X1061,X1062) | ~((~p37(X1062) & ~p38(X1062)) | (p38(X1062) & p37(X1062)))) | ~r1(X1060,X1061)) | ~r1(X1059,X1060))) | ~r1(X1057,X1058)) | ~r1(X1056,X1057))))) | ~r1(X1052,X1053)))) | ~r1(X1049,X1050)) | ~r1(X1048,X1049))) | ~r1(X1046,X1047)) | ~r1(X1045,X1046)))))) | ~r1(X1040,X1041)))) | ~r1(X1037,X1038)) | ~r1(X1036,X1037))) | ~r1(X1034,X1035))))) | ~r1(X1030,X1031))))) | ~r1(X1026,X1027)) | ~r1(X1025,X1026)))))) | ! [X1063] : (~r1(X212,X1063) | p39(X1063)) | ~! [X1064] : (! [X1065] : (~r1(X1064,X1065) | ! [X1066] : (! [X1067] : (! [X1068] : (! [X1069] : (~r1(X1068,X1069) | ! [X1070] : (! [X1071] : (~r1(X1070,X1071) | ! [X1072] : (! [X1073] : (~r1(X1072,X1073) | ! [X1074] : (~r1(X1073,X1074) | ! [X1075] : (! [X1076] : (! [X1077] : (~r1(X1076,X1077) | ! [X1078] : (! [X1079] : (! [X1080] : (! [X1081] : (! [X1082] : (! [X1083] : (! [X1084] : (! [X1085] : (! [X1086] : (! [X1087] : (! [X1088] : (! [X1089] : (~r1(X1088,X1089) | ! [X1090] : (! [X1091] : (! [X1092] : (~r1(X1091,X1092) | ! [X1093] : (~r1(X1092,X1093) | ! [X1094] : (~r1(X1093,X1094) | ! [X1095] : (~r1(X1094,X1095) | ! [X1096] : (~r1(X1095,X1096) | ! [X1097] : (! [X1098] : (! [X1099] : (~r1(X1098,X1099) | ! [X1100] : (~r1(X1099,X1100) | ! [X1101] : (! [X1102] : (~r1(X1101,X1102) | ! [X1103] : (~((~p39(X1103) & ~p38(X1103)) | (p38(X1103) & p39(X1103))) | ~r1(X1102,X1103))) | ~r1(X1100,X1101)))) | ~r1(X1097,X1098)) | ~r1(X1096,X1097))))))) | ~r1(X1090,X1091)) | ~r1(X1089,X1090))) | ~r1(X1087,X1088)) | ~r1(X1086,X1087)) | ~r1(X1085,X1086)) | ~r1(X1084,X1085)) | ~r1(X1083,X1084)) | ~r1(X1082,X1083)) | ~r1(X1081,X1082)) | ~r1(X1080,X1081)) | ~r1(X1079,X1080)) | ~r1(X1078,X1079)) | ~r1(X1077,X1078))) | ~r1(X1075,X1076)) | ~r1(X1074,X1075)))) | ~r1(X1071,X1072))) | ~r1(X1069,X1070))) | ~r1(X1067,X1068)) | ~r1(X1066,X1067)) | ~r1(X1065,X1066))) | ~r1(X212,X1064)))) | ! [X1104] : (~r1(X170,X1104) | p40(X1104)))) | ~! [X1105] : (~r1(X168,X1105) | ! [X1106] : (~r1(X1105,X1106) | ! [X1107] : (~r1(X1106,X1107) | ! [X1108] : (~r1(X1107,X1108) | ! [X1109] : (~r1(X1108,X1109) | ! [X1110] : (~r1(X1109,X1110) | ! [X1111] : (! [X1112] : (~r1(X1111,X1112) | ! [X1113] : (! [X1114] : (~r1(X1113,X1114) | ! [X1115] : (~r1(X1114,X1115) | ! [X1116] : (~r1(X1115,X1116) | ! [X1117] : (! [X1118] : (! [X1119] : (~r1(X1118,X1119) | ! [X1120] : (~r1(X1119,X1120) | ! [X1121] : (~r1(X1120,X1121) | ! [X1122] : (~r1(X1121,X1122) | ! [X1123] : (! [X1124] : (! [X1125] : (! [X1126] : (~r1(X1125,X1126) | ! [X1127] : (! [X1128] : (! [X1129] : (~r1(X1128,X1129) | ! [X1130] : (~r1(X1129,X1130) | ! [X1131] : (! [X1132] : (~r1(X1131,X1132) | ! [X1133] : (! [X1134] : (! [X1135] : (~r1(X1134,X1135) | ! [X1136] : (! [X1137] : (! [X1138] : (! [X1139] : (~r1(X1138,X1139) | ! [X1140] : (! [X1141] : (! [X1142] : (~r1(X1141,X1142) | ! [X1143] : (! [X1144] : (~r1(X1143,X1144) | ! [X1145] : (~r1(X1144,X1145) | ! [X1146] : (~((~p40(X1146) & ~p41(X1146)) | (p41(X1146) & p40(X1146))) | ~r1(X1145,X1146)))) | ~r1(X1142,X1143))) | ~r1(X1140,X1141)) | ~r1(X1139,X1140))) | ~r1(X1137,X1138)) | ~r1(X1136,X1137)) | ~r1(X1135,X1136))) | ~r1(X1133,X1134)) | ~r1(X1132,X1133))) | ~r1(X1130,X1131)))) | ~r1(X1127,X1128)) | ~r1(X1126,X1127))) | ~r1(X1124,X1125)) | ~r1(X1123,X1124)) | ~r1(X1122,X1123)))))) | ~r1(X1117,X1118)) | ~r1(X1116,X1117))))) | ~r1(X1112,X1113))) | ~r1(X1110,X1111))))))))))) | ~r1(X121,X123)) | ~! [X1147] : (~r1(X121,X1147) | ! [X1148] : (! [X1149] : (~r1(X1148,X1149) | ! [X1150] : (! [X1151] : (! [X1152] : (~r1(X1151,X1152) | ! [X1153] : (! [X1154] : (! [X1155] : (~r1(X1154,X1155) | ! [X1156] : (! [X1157] : (! [X1158] : (~r1(X1157,X1158) | ! [X1159] : (~r1(X1158,X1159) | ! [X1160] : (~r1(X1159,X1160) | ! [X1161] : (! [X1162] : (~r1(X1161,X1162) | ! [X1163] : (~r1(X1162,X1163) | ! [X1164] : (~r1(X1163,X1164) | ! [X1165] : (~r1(X1164,X1165) | ! [X1166] : (! [X1167] : (~r1(X1166,X1167) | ! [X1168] : (! [X1169] : (~r1(X1168,X1169) | ! [X1170] : (~r1(X1169,X1170) | ! [X1171] : (! [X1172] : (~r1(X1171,X1172) | ! [X1173] : (! [X1174] : (~r1(X1173,X1174) | ! [X1175] : (! [X1176] : (! [X1177] : (~r1(X1176,X1177) | ! [X1178] : (~r1(X1177,X1178) | ! [X1179] : (~r1(X1178,X1179) | ! [X1180] : (! [X1181] : (! [X1182] : (! [X1183] : (! [X1184] : (~r1(X1183,X1184) | ! [X1185] : (! [X1186] : (~r1(X1185,X1186) | ! [X1187] : (~r1(X1186,X1187) | ! [X1188] : (! [X1189] : (~r1(X1188,X1189) | ! [X1190] : (~r1(X1189,X1190) | ~((p43(X1190) & p42(X1190)) | (~p43(X1190) & ~p42(X1190))))) | ~r1(X1187,X1188)))) | ~r1(X1184,X1185))) | ~r1(X1182,X1183)) | ~r1(X1181,X1182)) | ~r1(X1180,X1181)) | ~r1(X1179,X1180))))) | ~r1(X1175,X1176)) | ~r1(X1174,X1175))) | ~r1(X1172,X1173))) | ~r1(X1170,X1171)))) | ~r1(X1167,X1168))) | ~r1(X1165,X1166)))))) | ~r1(X1160,X1161))))) | ~r1(X1156,X1157)) | ~r1(X1155,X1156))) | ~r1(X1153,X1154)) | ~r1(X1152,X1153))) | ~r1(X1150,X1151)) | ~r1(X1149,X1150))) | ~r1(X1147,X1148))))) | ~! [X1191] : (~r1(X119,X1191) | ! [X1192] : (~r1(X1191,X1192) | ! [X1193] : (~r1(X1192,X1193) | ! [X1194] : (! [X1195] : (~r1(X1194,X1195) | ! [X1196] : (! [X1197] : (~r1(X1196,X1197) | ! [X1198] : (~r1(X1197,X1198) | ! [X1199] : (! [X1200] : (! [X1201] : (~r1(X1200,X1201) | ! [X1202] : (~r1(X1201,X1202) | ! [X1203] : (~r1(X1202,X1203) | ! [X1204] : (~r1(X1203,X1204) | ! [X1205] : (~r1(X1204,X1205) | ! [X1206] : (~r1(X1205,X1206) | ! [X1207] : (! [X1208] : (! [X1209] : (! [X1210] : (! [X1211] : (! [X1212] : (~r1(X1211,X1212) | ! [X1213] : (! [X1214] : (! [X1215] : (! [X1216] : (~r1(X1215,X1216) | ! [X1217] : (~r1(X1216,X1217) | ! [X1218] : (~r1(X1217,X1218) | ! [X1219] : (! [X1220] : (~r1(X1219,X1220) | ! [X1221] : (! [X1222] : (~r1(X1221,X1222) | ! [X1223] : (~r1(X1222,X1223) | ! [X1224] : (! [X1225] : (~r1(X1224,X1225) | ! [X1226] : (! [X1227] : (! [X1228] : (~r1(X1227,X1228) | ! [X1229] : (! [X1230] : (~r1(X1229,X1230) | ! [X1231] : (~r1(X1230,X1231) | ! [X1232] : (! [X1233] : (! [X1234] : (! [X1235] : (~r1(X1234,X1235) | ~((p43(X1235) & p44(X1235)) | (~p43(X1235) & ~p44(X1235)))) | ~r1(X1233,X1234)) | ~r1(X1232,X1233)) | ~r1(X1231,X1232)))) | ~r1(X1228,X1229))) | ~r1(X1226,X1227)) | ~r1(X1225,X1226))) | ~r1(X1223,X1224)))) | ~r1(X1220,X1221))) | ~r1(X1218,X1219))))) | ~r1(X1214,X1215)) | ~r1(X1213,X1214)) | ~r1(X1212,X1213))) | ~r1(X1210,X1211)) | ~r1(X1209,X1210)) | ~r1(X1208,X1209)) | ~r1(X1207,X1208)) | ~r1(X1206,X1207)))))))) | ~r1(X1199,X1200)) | ~r1(X1198,X1199)))) | ~r1(X1195,X1196))) | ~r1(X1193,X1194)))))) | ~r1(X117,X119)) | ~! [X1236] : (~r1(X117,X1236) | ! [X1237] : (! [X1238] : (! [X1239] : (~r1(X1238,X1239) | ! [X1240] : (~r1(X1239,X1240) | ! [X1241] : (~r1(X1240,X1241) | ! [X1242] : (~r1(X1241,X1242) | ! [X1243] : (~r1(X1242,X1243) | ! [X1244] : (~r1(X1243,X1244) | ! [X1245] : (~r1(X1244,X1245) | ! [X1246] : (! [X1247] : (! [X1248] : (~r1(X1247,X1248) | ! [X1249] : (! [X1250] : (~r1(X1249,X1250) | ! [X1251] : (! [X1252] : (! [X1253] : (! [X1254] : (~r1(X1253,X1254) | ! [X1255] : (! [X1256] : (! [X1257] : (! [X1258] : (~r1(X1257,X1258) | ! [X1259] : (! [X1260] : (! [X1261] : (~r1(X1260,X1261) | ! [X1262] : (! [X1263] : (! [X1264] : (~r1(X1263,X1264) | ! [X1265] : (~r1(X1264,X1265) | ! [X1266] : (! [X1267] : (! [X1268] : (~r1(X1267,X1268) | ! [X1269] : (~r1(X1268,X1269) | ! [X1270] : (~r1(X1269,X1270) | ! [X1271] : (~r1(X1270,X1271) | ! [X1272] : (~r1(X1271,X1272) | ! [X1273] : (! [X1274] : (~r1(X1273,X1274) | ! [X1275] : (~r1(X1274,X1275) | ! [X1276] : (~r1(X1275,X1276) | ! [X1277] : (! [X1278] : (! [X1279] : (~r1(X1278,X1279) | ! [X1280] : (! [X1281] : (~r1(X1280,X1281) | ~((~p45(X1281) & ~p44(X1281)) | (p44(X1281) & p45(X1281)))) | ~r1(X1279,X1280))) | ~r1(X1277,X1278)) | ~r1(X1276,X1277))))) | ~r1(X1272,X1273))))))) | ~r1(X1266,X1267)) | ~r1(X1265,X1266)))) | ~r1(X1262,X1263)) | ~r1(X1261,X1262))) | ~r1(X1259,X1260)) | ~r1(X1258,X1259))) | ~r1(X1256,X1257)) | ~r1(X1255,X1256)) | ~r1(X1254,X1255))) | ~r1(X1252,X1253)) | ~r1(X1251,X1252)) | ~r1(X1250,X1251))) | ~r1(X1248,X1249))) | ~r1(X1246,X1247)) | ~r1(X1245,X1246))))))))) | ~r1(X1237,X1238)) | ~r1(X1236,X1237)))) | ~r1(X115,X117)) | ~! [X1282] : (~r1(X115,X1282) | ! [X1283] : (~r1(X1282,X1283) | ! [X1284] : (! [X1285] : (~r1(X1284,X1285) | ! [X1286] : (! [X1287] : (! [X1288] : (! [X1289] : (! [X1290] : (~r1(X1289,X1290) | ! [X1291] : (~r1(X1290,X1291) | ! [X1292] : (! [X1293] : (~r1(X1292,X1293) | ! [X1294] : (! [X1295] : (~r1(X1294,X1295) | ! [X1296] : (~r1(X1295,X1296) | ! [X1297] : (~r1(X1296,X1297) | ! [X1298] : (! [X1299] : (! [X1300] : (~r1(X1299,X1300) | ! [X1301] : (~r1(X1300,X1301) | ! [X1302] : (~r1(X1301,X1302) | ! [X1303] : (! [X1304] : (~r1(X1303,X1304) | ! [X1305] : (~r1(X1304,X1305) | ! [X1306] : (~r1(X1305,X1306) | ! [X1307] : (! [X1308] : (~r1(X1307,X1308) | ! [X1309] : (~r1(X1308,X1309) | ! [X1310] : (~r1(X1309,X1310) | ! [X1311] : (! [X1312] : (! [X1313] : (~r1(X1312,X1313) | ! [X1314] : (~r1(X1313,X1314) | ! [X1315] : (! [X1316] : (~r1(X1315,X1316) | ! [X1317] : (! [X1318] : (! [X1319] : (! [X1320] : (! [X1321] : (! [X1322] : (~r1(X1321,X1322) | ! [X1323] : (~r1(X1322,X1323) | ! [X1324] : (! [X1325] : (~r1(X1324,X1325) | ! [X1326] : (~r1(X1325,X1326) | ! [X1327] : (~r1(X1326,X1327) | ! [X1328] : (~((~p46(X1328) & ~p45(X1328)) | (p46(X1328) & p45(X1328))) | ~r1(X1327,X1328))))) | ~r1(X1323,X1324)))) | ~r1(X1320,X1321)) | ~r1(X1319,X1320)) | ~r1(X1318,X1319)) | ~r1(X1317,X1318)) | ~r1(X1316,X1317))) | ~r1(X1314,X1315)))) | ~r1(X1311,X1312)) | ~r1(X1310,X1311))))) | ~r1(X1306,X1307))))) | ~r1(X1302,X1303))))) | ~r1(X1298,X1299)) | ~r1(X1297,X1298))))) | ~r1(X1293,X1294))) | ~r1(X1291,X1292)))) | ~r1(X1288,X1289)) | ~r1(X1287,X1288)) | ~r1(X1286,X1287)) | ~r1(X1285,X1286))) | ~r1(X1283,X1284))))) | ~r1(X113,X115)) | ~! [X1329] : (! [X1330] : (~r1(X1329,X1330) | ! [X1331] : (~r1(X1330,X1331) | ! [X1332] : (~r1(X1331,X1332) | ! [X1333] : (! [X1334] : (~r1(X1333,X1334) | ! [X1335] : (~r1(X1334,X1335) | ! [X1336] : (~r1(X1335,X1336) | ! [X1337] : (~r1(X1336,X1337) | ! [X1338] : (~r1(X1337,X1338) | ! [X1339] : (~r1(X1338,X1339) | ! [X1340] : (! [X1341] : (~r1(X1340,X1341) | ! [X1342] : (! [X1343] : (~r1(X1342,X1343) | ! [X1344] : (! [X1345] : (! [X1346] : (~r1(X1345,X1346) | ! [X1347] : (~r1(X1346,X1347) | ! [X1348] : (! [X1349] : (~r1(X1348,X1349) | ! [X1350] : (! [X1351] : (! [X1352] : (~r1(X1351,X1352) | ! [X1353] : (~r1(X1352,X1353) | ! [X1354] : (! [X1355] : (~r1(X1354,X1355) | ! [X1356] : (! [X1357] : (~r1(X1356,X1357) | ! [X1358] : (~r1(X1357,X1358) | ! [X1359] : (! [X1360] : (! [X1361] : (! [X1362] : (~r1(X1361,X1362) | ! [X1363] : (! [X1364] : (~r1(X1363,X1364) | ! [X1365] : (! [X1366] : (~r1(X1365,X1366) | ! [X1367] : (~r1(X1366,X1367) | ! [X1368] : (~r1(X1367,X1368) | ! [X1369] : (! [X1370] : (~r1(X1369,X1370) | ! [X1371] : (~r1(X1370,X1371) | ! [X1372] : (~r1(X1371,X1372) | ! [X1373] : (~r1(X1372,X1373) | ! [X1374] : (~r1(X1373,X1374) | ! [X1375] : (~r1(X1374,X1375) | ! [X1376] : (~((p47(X1376) & p46(X1376)) | (~p46(X1376) & ~p47(X1376))) | ~r1(X1375,X1376)))))))) | ~r1(X1368,X1369))))) | ~r1(X1364,X1365))) | ~r1(X1362,X1363))) | ~r1(X1360,X1361)) | ~r1(X1359,X1360)) | ~r1(X1358,X1359)))) | ~r1(X1355,X1356))) | ~r1(X1353,X1354)))) | ~r1(X1350,X1351)) | ~r1(X1349,X1350))) | ~r1(X1347,X1348)))) | ~r1(X1344,X1345)) | ~r1(X1343,X1344))) | ~r1(X1341,X1342))) | ~r1(X1339,X1340)))))))) | ~r1(X1332,X1333))))) | ~r1(X113,X1329))) | ~r1(X112,X113)) | ! [X1377] : (p48(X1377) | ~r1(X112,X1377)) | ~! [X1378] : (! [X1379] : (! [X1380] : (! [X1381] : (~r1(X1380,X1381) | ! [X1382] : (~r1(X1381,X1382) | ! [X1383] : (! [X1384] : (~r1(X1383,X1384) | ! [X1385] : (! [X1386] : (~r1(X1385,X1386) | ! [X1387] : (~r1(X1386,X1387) | ! [X1388] : (! [X1389] : (~r1(X1388,X1389) | ! [X1390] : (~r1(X1389,X1390) | ! [X1391] : (~r1(X1390,X1391) | ! [X1392] : (! [X1393] : (! [X1394] : (~r1(X1393,X1394) | ! [X1395] : (! [X1396] : (! [X1397] : (~r1(X1396,X1397) | ! [X1398] : (! [X1399] : (~r1(X1398,X1399) | ! [X1400] : (! [X1401] : (~r1(X1400,X1401) | ! [X1402] : (~r1(X1401,X1402) | ! [X1403] : (! [X1404] : (~r1(X1403,X1404) | ! [X1405] : (! [X1406] : (! [X1407] : (~r1(X1406,X1407) | ! [X1408] : (! [X1409] : (~r1(X1408,X1409) | ! [X1410] : (! [X1411] : (! [X1412] : (! [X1413] : (~r1(X1412,X1413) | ! [X1414] : (~r1(X1413,X1414) | ! [X1415] : (! [X1416] : (! [X1417] : (! [X1418] : (~r1(X1417,X1418) | ! [X1419] : (~r1(X1418,X1419) | ! [X1420] : (~r1(X1419,X1420) | ! [X1421] : (~r1(X1420,X1421) | ! [X1422] : (! [X1423] : (! [X1424] : (! [X1425] : (~r1(X1424,X1425) | ! [X1426] : (~((~p47(X1426) & ~p48(X1426)) | (p48(X1426) & p47(X1426))) | ~r1(X1425,X1426))) | ~r1(X1423,X1424)) | ~r1(X1422,X1423)) | ~r1(X1421,X1422)))))) | ~r1(X1416,X1417)) | ~r1(X1415,X1416)) | ~r1(X1414,X1415)))) | ~r1(X1411,X1412)) | ~r1(X1410,X1411)) | ~r1(X1409,X1410))) | ~r1(X1407,X1408))) | ~r1(X1405,X1406)) | ~r1(X1404,X1405))) | ~r1(X1402,X1403)))) | ~r1(X1399,X1400))) | ~r1(X1397,X1398))) | ~r1(X1395,X1396)) | ~r1(X1394,X1395))) | ~r1(X1392,X1393)) | ~r1(X1391,X1392))))) | ~r1(X1387,X1388)))) | ~r1(X1384,X1385))) | ~r1(X1382,X1383)))) | ~r1(X1379,X1380)) | ~r1(X1378,X1379)) | ~r1(X112,X1378))) | ~r1(X111,X112)) | ! [X1427] : (p49(X1427) | ~r1(X111,X1427)) | ~! [X1428] : (! [X1429] : (! [X1430] : (~r1(X1429,X1430) | ! [X1431] : (~r1(X1430,X1431) | ! [X1432] : (~r1(X1431,X1432) | ! [X1433] : (! [X1434] : (~r1(X1433,X1434) | ! [X1435] : (~r1(X1434,X1435) | ! [X1436] : (! [X1437] : (~r1(X1436,X1437) | ! [X1438] : (~r1(X1437,X1438) | ! [X1439] : (~r1(X1438,X1439) | ! [X1440] : (~r1(X1439,X1440) | ! [X1441] : (! [X1442] : (~r1(X1441,X1442) | ! [X1443] : (~r1(X1442,X1443) | ! [X1444] : (~r1(X1443,X1444) | ! [X1445] : (~r1(X1444,X1445) | ! [X1446] : (! [X1447] : (~r1(X1446,X1447) | ! [X1448] : (~r1(X1447,X1448) | ! [X1449] : (~r1(X1448,X1449) | ! [X1450] : (! [X1451] : (! [X1452] : (~r1(X1451,X1452) | ! [X1453] : (! [X1454] : (~r1(X1453,X1454) | ! [X1455] : (~r1(X1454,X1455) | ! [X1456] : (~r1(X1455,X1456) | ! [X1457] : (~r1(X1456,X1457) | ! [X1458] : (! [X1459] : (! [X1460] : (! [X1461] : (~r1(X1460,X1461) | ! [X1462] : (! [X1463] : (! [X1464] : (! [X1465] : (! [X1466] : (~r1(X1465,X1466) | ! [X1467] : (~r1(X1466,X1467) | ! [X1468] : (~r1(X1467,X1468) | ! [X1469] : (~r1(X1468,X1469) | ! [X1470] : (! [X1471] : (! [X1472] : (~r1(X1471,X1472) | ! [X1473] : (! [X1474] : (! [X1475] : (! [X1476] : (! [X1477] : (~r1(X1476,X1477) | ~((p49(X1477) & p48(X1477)) | (~p49(X1477) & ~p48(X1477)))) | ~r1(X1475,X1476)) | ~r1(X1474,X1475)) | ~r1(X1473,X1474)) | ~r1(X1472,X1473))) | ~r1(X1470,X1471)) | ~r1(X1469,X1470)))))) | ~r1(X1464,X1465)) | ~r1(X1463,X1464)) | ~r1(X1462,X1463)) | ~r1(X1461,X1462))) | ~r1(X1459,X1460)) | ~r1(X1458,X1459)) | ~r1(X1457,X1458)))))) | ~r1(X1452,X1453))) | ~r1(X1450,X1451)) | ~r1(X1449,X1450))))) | ~r1(X1445,X1446)))))) | ~r1(X1440,X1441)))))) | ~r1(X1435,X1436)))) | ~r1(X1432,X1433))))) | ~r1(X1428,X1429)) | ~r1(X111,X1428))) | ~r1(X109,X111)) | ~! [X1478] : (~r1(X109,X1478) | ! [X1479] : (! [X1480] : (! [X1481] : (! [X1482] : (! [X1483] : (~r1(X1482,X1483) | ! [X1484] : (! [X1485] : (~r1(X1484,X1485) | ! [X1486] : (! [X1487] : (! [X1488] : (~r1(X1487,X1488) | ! [X1489] : (~r1(X1488,X1489) | ! [X1490] : (~r1(X1489,X1490) | ! [X1491] : (~r1(X1490,X1491) | ! [X1492] : (~r1(X1491,X1492) | ! [X1493] : (! [X1494] : (~r1(X1493,X1494) | ! [X1495] : (~r1(X1494,X1495) | ! [X1496] : (! [X1497] : (! [X1498] : (! [X1499] : (! [X1500] : (! [X1501] : (~r1(X1500,X1501) | ! [X1502] : (! [X1503] : (~r1(X1502,X1503) | ! [X1504] : (~r1(X1503,X1504) | ! [X1505] : (! [X1506] : (! [X1507] : (! [X1508] : (! [X1509] : (~r1(X1508,X1509) | ! [X1510] : (~r1(X1509,X1510) | ! [X1511] : (~r1(X1510,X1511) | ! [X1512] : (~r1(X1511,X1512) | ! [X1513] : (~r1(X1512,X1513) | ! [X1514] : (! [X1515] : (! [X1516] : (~r1(X1515,X1516) | ! [X1517] : (~r1(X1516,X1517) | ! [X1518] : (~r1(X1517,X1518) | ! [X1519] : (! [X1520] : (! [X1521] : (! [X1522] : (! [X1523] : (! [X1524] : (! [X1525] : (~r1(X1524,X1525) | ! [X1526] : (~r1(X1525,X1526) | ! [X1527] : (~r1(X1526,X1527) | ! [X1528] : (~((~p49(X1528) & ~p50(X1528)) | (p49(X1528) & p50(X1528))) | ~r1(X1527,X1528))))) | ~r1(X1523,X1524)) | ~r1(X1522,X1523)) | ~r1(X1521,X1522)) | ~r1(X1520,X1521)) | ~r1(X1519,X1520)) | ~r1(X1518,X1519))))) | ~r1(X1514,X1515)) | ~r1(X1513,X1514))))))) | ~r1(X1507,X1508)) | ~r1(X1506,X1507)) | ~r1(X1505,X1506)) | ~r1(X1504,X1505)))) | ~r1(X1501,X1502))) | ~r1(X1499,X1500)) | ~r1(X1498,X1499)) | ~r1(X1497,X1498)) | ~r1(X1496,X1497)) | ~r1(X1495,X1496)))) | ~r1(X1492,X1493))))))) | ~r1(X1486,X1487)) | ~r1(X1485,X1486))) | ~r1(X1483,X1484))) | ~r1(X1481,X1482)) | ~r1(X1480,X1481)) | ~r1(X1479,X1480)) | ~r1(X1478,X1479)))) | ~r1(X56,X109)) | ! [X1529] : (~r1(X56,X1529) | p51(X1529))) | ~r1(X1,X56))) | ~r1(X0,X1)) | ! [X1530] : (! [X1531] : (~r1(X1530,X1531) | ! [X1532] : (! [X1533] : (~r1(X1532,X1533) | ! [X1534] : (~r1(X1533,X1534) | ! [X1535] : (~r1(X1534,X1535) | ! [X1536] : (~r1(X1535,X1536) | ! [X1537] : (~r1(X1536,X1537) | ! [X1538] : (! [X1539] : (~r1(X1538,X1539) | ! [X1540] : (~r1(X1539,X1540) | ! [X1541] : (! [X1542] : (! [X1543] : (! [X1544] : (! [X1545] : (~r1(X1544,X1545) | ! [X1546] : (! [X1547] : (~r1(X1546,X1547) | ! [X1548] : (! [X1549] : (! [X1550] : (! [X1551] : (~r1(X1550,X1551) | ! [X1552] : (~r1(X1551,X1552) | ! [X1553] : (~r1(X1552,X1553) | ! [X1554] : (~r1(X1553,X1554) | ! [X1555] : (~r1(X1554,X1555) | ! [X1556] : (! [X1557] : (~r1(X1556,X1557) | ! [X1558] : (! [X1559] : (~r1(X1558,X1559) | ! [X1560] : (~r1(X1559,X1560) | ! [X1561] : (~r1(X1560,X1561) | ! [X1562] : (~r1(X1561,X1562) | ! [X1563] : (~r1(X1562,X1563) | ! [X1564] : (! [X1565] : (! [X1566] : (! [X1567] : (! [X1568] : (! [X1569] : (! [X1570] : (~r1(X1569,X1570) | ! [X1571] : (~r1(X1570,X1571) | ! [X1572] : (! [X1573] : (~r1(X1572,X1573) | ! [X1574] : (~r1(X1573,X1574) | ! [X1575] : (~r1(X1574,X1575) | ! [X1576] : (~r1(X1575,X1576) | ! [X1577] : (! [X1578] : (! [X1579] : (! [X1580] : (~r1(X1579,X1580) | ! [X1581] : (~r1(X1580,X1581) | (p50(X1581) & p49(X1581) & p48(X1581) & p45(X1581) & p41(X1581) & p38(X1581) & p36(X1581) & p35(X1581) & p34(X1581) & p32(X1581) & p31(X1581) & p29(X1581) & p26(X1581) & p25(X1581) & p23(X1581) & p21(X1581) & p18(X1581) & p12(X1581) & p8(X1581) & p6(X1581) & p5(X1581) & p1(X1581) & p2(X1581) & p3(X1581) & p4(X1581) & p7(X1581) & p9(X1581) & p10(X1581) & p11(X1581) & p13(X1581) & p14(X1581) & p15(X1581) & p16(X1581) & p17(X1581) & p19(X1581) & p20(X1581) & p22(X1581) & p24(X1581) & p27(X1581) & p28(X1581) & p30(X1581) & p33(X1581) & p37(X1581) & p39(X1581) & p40(X1581) & p42(X1581) & p43(X1581) & p44(X1581) & p46(X1581) & p47(X1581) & p51(X1581) & p52(X1581)))) | ~r1(X1578,X1579)) | ~r1(X1577,X1578)) | ~r1(X1576,X1577)))))) | ~r1(X1571,X1572)))) | ~r1(X1568,X1569)) | ~r1(X1567,X1568)) | ~r1(X1566,X1567)) | ~r1(X1565,X1566)) | ~r1(X1564,X1565)) | ~r1(X1563,X1564))))))) | ~r1(X1557,X1558))) | ~r1(X1555,X1556))))))) | ~r1(X1549,X1550)) | ~r1(X1548,X1549)) | ~r1(X1547,X1548))) | ~r1(X1545,X1546))) | ~r1(X1543,X1544)) | ~r1(X1542,X1543)) | ~r1(X1541,X1542)) | ~r1(X1540,X1541)))) | ~r1(X1537,X1538))))))) | ~r1(X1531,X1532))) | ~r1(X0,X1530)) | ! [X1582] : ~r1(X0,X1582) | ! [X1583] : (~r1(X0,X1583) | ! [X1584] : (~r1(X1583,X1584) | ! [X1585] : (~r1(X1584,X1585) | ! [X1586] : (! [X1587] : (! [X1588] : (! [X1589] : (~r1(X1588,X1589) | ! [X1590] : (! [X1591] : (~r1(X1590,X1591) | ! [X1592] : (! [X1593] : (! [X1594] : (! [X1595] : (~r1(X1594,X1595) | ! [X1596] : (! [X1597] : (! [X1598] : (~r1(X1597,X1598) | ! [X1599] : (~r1(X1598,X1599) | ! [X1600] : (! [X1601] : (! [X1602] : (~r1(X1601,X1602) | ! [X1603] : (~r1(X1602,X1603) | ! [X1604] : (~r1(X1603,X1604) | ! [X1605] : (! [X1606] : (! [X1607] : (! [X1608] : (! [X1609] : (! [X1610] : (~r1(X1609,X1610) | ! [X1611] : (! [X1612] : (! [X1613] : (! [X1614] : (~r1(X1613,X1614) | ! [X1615] : (~r1(X1614,X1615) | ! [X1616] : (~r1(X1615,X1616) | ! [X1617] : (! [X1618] : (! [X1619] : (! [X1620] : (~r1(X1619,X1620) | ! [X1621] : (~r1(X1620,X1621) | ! [X1622] : (~r1(X1621,X1622) | ! [X1623] : (! [X1624] : (! [X1625] : (! [X1626] : (! [X1627] : (~r1(X1626,X1627) | ! [X1628] : (! [X1629] : (~r1(X1628,X1629) | ! [X1630] : (! [X1631] : (~r1(X1630,X1631) | ! [X1632] : (~r1(X1631,X1632) | ! [X1633] : (~r1(X1632,X1633) | ! [X1634] : ((~p98(X1634) & ~p96(X1634) & ~p94(X1634) & ~p92(X1634) & ~p90(X1634) & ~p88(X1634) & ~p80(X1634) & ~p78(X1634) & ~p76(X1634) & ~p74(X1634) & ~p72(X1634) & ~p70(X1634) & ~p68(X1634) & ~p62(X1634) & ~p60(X1634) & ~p58(X1634) & ~p56(X1634) & ~p54(X1634) & ~p52(X1634) & ~p48(X1634) & ~p46(X1634) & ~p42(X1634) & ~p38(X1634) & ~p28(X1634) & ~p26(X1634) & ~p24(X1634) & ~p22(X1634) & ~p20(X1634) & ~p18(X1634) & ~p14(X1634) & ~p8(X1634) & ~p6(X1634) & ~p4(X1634) & ~p2(X1634) & ~p10(X1634) & ~p12(X1634) & ~p16(X1634) & ~p30(X1634) & ~p32(X1634) & ~p34(X1634) & ~p36(X1634) & ~p40(X1634) & ~p44(X1634) & ~p50(X1634) & ~p64(X1634) & ~p66(X1634) & ~p82(X1634) & ~p84(X1634) & ~p86(X1634) & ~p100(X1634) & ~p102(X1634) & ~p104(X1634)) | ~r1(X1633,X1634))))) | ~r1(X1629,X1630))) | ~r1(X1627,X1628))) | ~r1(X1625,X1626)) | ~r1(X1624,X1625)) | ~r1(X1623,X1624)) | ~r1(X1622,X1623))))) | ~r1(X1618,X1619)) | ~r1(X1617,X1618)) | ~r1(X1616,X1617))))) | ~r1(X1612,X1613)) | ~r1(X1611,X1612)) | ~r1(X1610,X1611))) | ~r1(X1608,X1609)) | ~r1(X1607,X1608)) | ~r1(X1606,X1607)) | ~r1(X1605,X1606)) | ~r1(X1604,X1605))))) | ~r1(X1600,X1601)) | ~r1(X1599,X1600)))) | ~r1(X1596,X1597)) | ~r1(X1595,X1596))) | ~r1(X1593,X1594)) | ~r1(X1592,X1593)) | ~r1(X1591,X1592))) | ~r1(X1589,X1590))) | ~r1(X1587,X1588)) | ~r1(X1586,X1587)) | ~r1(X1585,X1586))))))), 23.28/23.17 inference(pure_predicate_removal,[],[f5])). 23.28/23.17 fof(f5,plain,( 23.28/23.17 ? [X0] : ~(~! [X1] : (~(~! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (~((p1(X54) & p51(X54)) | (~p1(X54) & ~p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ! [X55] : (p52(X55) | ~r1(X1,X55)) | ~! [X56] : (~(~! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (~((~p51(X108) & ~p50(X108)) | (p50(X108) & p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) | ~! [X109] : (~(! [X110] : (p50(X110) | ~r1(X109,X110)) | ~! [X111] : (~(~! [X112] : (~(~! [X113] : (~(! [X114] : (~r1(X113,X114) | p47(X114)) | ~! [X115] : (~(! [X116] : (p46(X116) | ~r1(X115,X116)) | ~! [X117] : (~(! [X118] : (p45(X118) | ~r1(X117,X118)) | ~! [X119] : (~(! [X120] : (~r1(X119,X120) | p44(X120)) | ~! [X121] : (~r1(X119,X121) | ~(! [X122] : (p43(X122) | ~r1(X121,X122)) | ~! [X123] : (~(~! [X124] : (~r1(X123,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (! [X130] : (! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (! [X134] : (~r1(X133,X134) | ! [X135] : (~r1(X134,X135) | ! [X136] : (! [X137] : (! [X138] : (! [X139] : (! [X140] : (~r1(X139,X140) | ! [X141] : (! [X142] : (! [X143] : (! [X144] : (! [X145] : (~r1(X144,X145) | ! [X146] : (! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (! [X165] : (! [X166] : (~r1(X165,X166) | ~((~p42(X166) & ~p41(X166)) | (p42(X166) & p41(X166)))) | ~r1(X164,X165)) | ~r1(X163,X164)) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160)) | ~r1(X158,X159)))) | ~r1(X155,X156)) | ~r1(X154,X155))))))) | ~r1(X148,X149)) | ~r1(X147,X148))) | ~r1(X145,X146))) | ~r1(X143,X144)) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141))) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137)) | ~r1(X135,X136)))) | ~r1(X132,X133)) | ~r1(X131,X132))) | ~r1(X129,X130)) | ~r1(X128,X129))))))) | ! [X167] : (p42(X167) | ~r1(X123,X167)) | ~! [X168] : (~r1(X123,X168) | ~(! [X169] : (p41(X169) | ~r1(X168,X169)) | ~! [X170] : (~r1(X168,X170) | ~(~! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (! [X174] : (! [X175] : (! [X176] : (! [X177] : (! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (! [X186] : (! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (~r1(X190,X191) | ! [X192] : (! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (~r1(X195,X196) | ! [X197] : (~r1(X196,X197) | ! [X198] : (! [X199] : (! [X200] : (~r1(X199,X200) | ! [X201] : (~r1(X200,X201) | ! [X202] : (! [X203] : (~r1(X202,X203) | ! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (~r1(X205,X206) | ! [X207] : (! [X208] : (~r1(X207,X208) | ! [X209] : (! [X210] : (~r1(X209,X210) | ! [X211] : (~r1(X210,X211) | ~((~p39(X211) & ~p40(X211)) | (p39(X211) & p40(X211))))) | ~r1(X208,X209))) | ~r1(X206,X207)))) | ~r1(X203,X204))) | ~r1(X201,X202)))) | ~r1(X198,X199)) | ~r1(X197,X198))))))) | ~r1(X191,X192))) | ~r1(X189,X190)))) | ~r1(X186,X187)) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184))) | ~r1(X181,X182)) | ~r1(X180,X181))) | ~r1(X178,X179)) | ~r1(X177,X178)) | ~r1(X176,X177)) | ~r1(X175,X176)) | ~r1(X174,X175)) | ~r1(X173,X174)) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~! [X212] : (~r1(X170,X212) | ~(~! [X213] : (~r1(X212,X213) | ~(~! [X214] : (~r1(X213,X214) | ~(~! [X215] : (! [X216] : (~r1(X215,X216) | ! [X217] : (~r1(X216,X217) | ! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (! [X221] : (! [X222] : (! [X223] : (~r1(X222,X223) | ! [X224] : (~r1(X223,X224) | ! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (~r1(X233,X234) | ! [X235] : (! [X236] : (~r1(X235,X236) | ! [X237] : (~r1(X236,X237) | ! [X238] : (~r1(X237,X238) | ! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~r1(X242,X243) | ! [X244] : (! [X245] : (! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (~r1(X251,X252) | ~((p36(X252) & p37(X252)) | (~p36(X252) & ~p37(X252))))) | ~r1(X249,X250))))) | ~r1(X245,X246)) | ~r1(X244,X245)) | ~r1(X243,X244)))))))))) | ~r1(X234,X235))))) | ~r1(X230,X231)))) | ~r1(X227,X228)) | ~r1(X226,X227)) | ~r1(X225,X226))))) | ~r1(X221,X222)) | ~r1(X220,X221)) | ~r1(X219,X220)) | ~r1(X218,X219))))) | ~r1(X214,X215)) | ! [X253] : (~r1(X214,X253) | p37(X253)) | ~! [X254] : (~r1(X214,X254) | ~(~! [X255] : (~(~! [X256] : (~(~! [X257] : (~r1(X256,X257) | ! [X258] : (! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (! [X263] : (~r1(X262,X263) | ! [X264] : (! [X265] : (~r1(X264,X265) | ! [X266] : (! [X267] : (! [X268] : (! [X269] : (~r1(X268,X269) | ! [X270] : (~r1(X269,X270) | ! [X271] : (~r1(X270,X271) | ! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (! [X280] : (~r1(X279,X280) | ! [X281] : (~r1(X280,X281) | ! [X282] : (! [X283] : (! [X284] : (~r1(X283,X284) | ! [X285] : (! [X286] : (! [X287] : (! [X288] : (! [X289] : (~r1(X288,X289) | ! [X290] : (~r1(X289,X290) | ! [X291] : (~((p34(X291) & p33(X291)) | (~p33(X291) & ~p34(X291))) | ~r1(X290,X291)))) | ~r1(X287,X288)) | ~r1(X286,X287)) | ~r1(X285,X286)) | ~r1(X284,X285))) | ~r1(X282,X283)) | ~r1(X281,X282)))) | ~r1(X278,X279)))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272))))) | ~r1(X267,X268)) | ~r1(X266,X267)) | ~r1(X265,X266))) | ~r1(X263,X264))) | ~r1(X261,X262)) | ~r1(X260,X261)))) | ~r1(X257,X258))) | ~! [X292] : (~(~! [X293] : (~r1(X292,X293) | ~(~! [X294] : (~r1(X293,X294) | ! [X295] : (! [X296] : (~r1(X295,X296) | ! [X297] : (! [X298] : (! [X299] : (~r1(X298,X299) | ! [X300] : (! [X301] : (! [X302] : (~r1(X301,X302) | ! [X303] : (~r1(X302,X303) | ! [X304] : (! [X305] : (~r1(X304,X305) | ! [X306] : (! [X307] : (~r1(X306,X307) | ! [X308] : (! [X309] : (! [X310] : (! [X311] : (! [X312] : (~r1(X311,X312) | ! [X313] : (~r1(X312,X313) | ! [X314] : (~r1(X313,X314) | ! [X315] : (! [X316] : (~r1(X315,X316) | ! [X317] : (! [X318] : (! [X319] : (! [X320] : (~r1(X319,X320) | ! [X321] : (! [X322] : (! [X323] : (~r1(X322,X323) | ! [X324] : (~r1(X323,X324) | ! [X325] : (~r1(X324,X325) | ! [X326] : (~r1(X325,X326) | ~((p31(X326) & p32(X326)) | (~p32(X326) & ~p31(X326))))))) | ~r1(X321,X322)) | ~r1(X320,X321))) | ~r1(X318,X319)) | ~r1(X317,X318)) | ~r1(X316,X317))) | ~r1(X314,X315))))) | ~r1(X310,X311)) | ~r1(X309,X310)) | ~r1(X308,X309)) | ~r1(X307,X308))) | ~r1(X305,X306))) | ~r1(X303,X304)))) | ~r1(X300,X301)) | ~r1(X299,X300))) | ~r1(X297,X298)) | ~r1(X296,X297))) | ~r1(X294,X295))) | ! [X327] : (p32(X327) | ~r1(X293,X327)) | ~! [X328] : (~(~! [X329] : (! [X330] : (! [X331] : (~r1(X330,X331) | ! [X332] : (! [X333] : (~r1(X332,X333) | ! [X334] : (~r1(X333,X334) | ! [X335] : (~r1(X334,X335) | ! [X336] : (~r1(X335,X336) | ! [X337] : (! [X338] : (~r1(X337,X338) | ! [X339] : (! [X340] : (~r1(X339,X340) | ! [X341] : (! [X342] : (~r1(X341,X342) | ! [X343] : (~r1(X342,X343) | ! [X344] : (! [X345] : (~r1(X344,X345) | ! [X346] : (! [X347] : (! [X348] : (! [X349] : (! [X350] : (! [X351] : (! [X352] : (! [X353] : (! [X354] : (~r1(X353,X354) | ! [X355] : (~r1(X354,X355) | ! [X356] : (~r1(X355,X356) | ! [X357] : (! [X358] : (~r1(X357,X358) | ! [X359] : (! [X360] : (~((p31(X360) & p30(X360)) | (~p30(X360) & ~p31(X360))) | ~r1(X359,X360)) | ~r1(X358,X359))) | ~r1(X356,X357))))) | ~r1(X352,X353)) | ~r1(X351,X352)) | ~r1(X350,X351)) | ~r1(X349,X350)) | ~r1(X348,X349)) | ~r1(X347,X348)) | ~r1(X346,X347)) | ~r1(X345,X346))) | ~r1(X343,X344)))) | ~r1(X340,X341))) | ~r1(X338,X339))) | ~r1(X336,X337)))))) | ~r1(X331,X332))) | ~r1(X329,X330)) | ~r1(X328,X329)) | ! [X361] : (~r1(X328,X361) | p31(X361)) | ~! [X362] : (~(! [X363] : (p30(X363) | ~r1(X362,X363)) | ~! [X364] : (~(~! [X365] : (! [X366] : (~r1(X365,X366) | ! [X367] : (! [X368] : (! [X369] : (! [X370] : (! [X371] : (! [X372] : (~r1(X371,X372) | ! [X373] : (~r1(X372,X373) | ! [X374] : (! [X375] : (~r1(X374,X375) | ! [X376] : (! [X377] : (~r1(X376,X377) | ! [X378] : (~r1(X377,X378) | ! [X379] : (! [X380] : (~r1(X379,X380) | ! [X381] : (! [X382] : (! [X383] : (~r1(X382,X383) | ! [X384] : (~r1(X383,X384) | ! [X385] : (~r1(X384,X385) | ! [X386] : (! [X387] : (! [X388] : (! [X389] : (~r1(X388,X389) | ! [X390] : (~r1(X389,X390) | ! [X391] : (! [X392] : (! [X393] : (! [X394] : (~((~p28(X394) & ~p29(X394)) | (p28(X394) & p29(X394))) | ~r1(X393,X394)) | ~r1(X392,X393)) | ~r1(X391,X392)) | ~r1(X390,X391)))) | ~r1(X387,X388)) | ~r1(X386,X387)) | ~r1(X385,X386))))) | ~r1(X381,X382)) | ~r1(X380,X381))) | ~r1(X378,X379)))) | ~r1(X375,X376))) | ~r1(X373,X374)))) | ~r1(X370,X371)) | ~r1(X369,X370)) | ~r1(X368,X369)) | ~r1(X367,X368)) | ~r1(X366,X367))) | ~r1(X364,X365)) | ~! [X395] : (~(~! [X396] : (~(! [X397] : (~r1(X396,X397) | p27(X397)) | ~! [X398] : (~r1(X396,X398) | ~(~! [X399] : (! [X400] : (~r1(X399,X400) | ! [X401] : (! [X402] : (! [X403] : (! [X404] : (! [X405] : (~r1(X404,X405) | ! [X406] : (~r1(X405,X406) | ! [X407] : (~r1(X406,X407) | ! [X408] : (~r1(X407,X408) | ! [X409] : (~r1(X408,X409) | ! [X410] : (~r1(X409,X410) | ! [X411] : (! [X412] : (~r1(X411,X412) | ! [X413] : (! [X414] : (~r1(X413,X414) | ! [X415] : (~r1(X414,X415) | ! [X416] : (~r1(X415,X416) | ! [X417] : (~r1(X416,X417) | ! [X418] : (! [X419] : (~r1(X418,X419) | ! [X420] : (! [X421] : (~r1(X420,X421) | ! [X422] : (! [X423] : (~r1(X422,X423) | ! [X424] : (~r1(X423,X424) | ! [X425] : (~r1(X424,X425) | ~((p25(X425) & p26(X425)) | (~p25(X425) & ~p26(X425)))))) | ~r1(X421,X422))) | ~r1(X419,X420))) | ~r1(X417,X418)))))) | ~r1(X412,X413))) | ~r1(X410,X411)))))))) | ~r1(X403,X404)) | ~r1(X402,X403)) | ~r1(X401,X402)) | ~r1(X400,X401))) | ~r1(X398,X399)) | ~! [X426] : (~(~! [X427] : (~(! [X428] : (~r1(X427,X428) | p24(X428)) | ~! [X429] : (~r1(X427,X429) | ~(! [X430] : (p23(X430) | ~r1(X429,X430)) | ~! [X431] : (~r1(X429,X431) | ~(~! [X432] : (! [X433] : (~r1(X432,X433) | ! [X434] : (~r1(X433,X434) | ! [X435] : (! [X436] : (~r1(X435,X436) | ! [X437] : (~r1(X436,X437) | ! [X438] : (~r1(X437,X438) | ! [X439] : (! [X440] : (~r1(X439,X440) | ! [X441] : (! [X442] : (! [X443] : (! [X444] : (! [X445] : (~r1(X444,X445) | ! [X446] : (~r1(X445,X446) | ! [X447] : (! [X448] : (~r1(X447,X448) | ! [X449] : (! [X450] : (~r1(X449,X450) | ! [X451] : (~r1(X450,X451) | ! [X452] : (! [X453] : (~r1(X452,X453) | ! [X454] : (~r1(X453,X454) | ~((p21(X454) & p22(X454)) | (~p21(X454) & ~p22(X454))))) | ~r1(X451,X452)))) | ~r1(X448,X449))) | ~r1(X446,X447)))) | ~r1(X443,X444)) | ~r1(X442,X443)) | ~r1(X441,X442)) | ~r1(X440,X441))) | ~r1(X438,X439))))) | ~r1(X434,X435)))) | ~r1(X431,X432)) | ~! [X455] : (~(! [X456] : (~r1(X455,X456) | p21(X456)) | ~! [X457] : (~(! [X458] : (~r1(X457,X458) | p20(X458)) | ~! [X459] : (~(! [X460] : (~r1(X459,X460) | p19(X460)) | ~! [X461] : (~(~! [X462] : (~r1(X461,X462) | ! [X463] : (~r1(X462,X463) | ! [X464] : (~r1(X463,X464) | ! [X465] : (! [X466] : (! [X467] : (! [X468] : (~r1(X467,X468) | ! [X469] : (! [X470] : (! [X471] : (~r1(X470,X471) | ! [X472] : (~r1(X471,X472) | ! [X473] : (! [X474] : (~r1(X473,X474) | ! [X475] : (! [X476] : (! [X477] : (! [X478] : (! [X479] : (~r1(X478,X479) | ! [X480] : (~r1(X479,X480) | ~((~p17(X480) & ~p18(X480)) | (p17(X480) & p18(X480))))) | ~r1(X477,X478)) | ~r1(X476,X477)) | ~r1(X475,X476)) | ~r1(X474,X475))) | ~r1(X472,X473)))) | ~r1(X469,X470)) | ~r1(X468,X469))) | ~r1(X466,X467)) | ~r1(X465,X466)) | ~r1(X464,X465))))) | ~! [X481] : (~r1(X461,X481) | ~(~! [X482] : (~r1(X481,X482) | ! [X483] : (! [X484] : (~r1(X483,X484) | ! [X485] : (! [X486] : (~r1(X485,X486) | ! [X487] : (~r1(X486,X487) | ! [X488] : (~r1(X487,X488) | ! [X489] : (~r1(X488,X489) | ! [X490] : (~r1(X489,X490) | ! [X491] : (~r1(X490,X491) | ! [X492] : (~r1(X491,X492) | ! [X493] : (! [X494] : (! [X495] : (~r1(X494,X495) | ! [X496] : (~r1(X495,X496) | ! [X497] : (~r1(X496,X497) | ! [X498] : (! [X499] : (~r1(X498,X499) | ~((~p17(X499) & ~p16(X499)) | (p16(X499) & p17(X499)))) | ~r1(X497,X498))))) | ~r1(X493,X494)) | ~r1(X492,X493))))))))) | ~r1(X484,X485))) | ~r1(X482,X483))) | ! [X500] : (p17(X500) | ~r1(X481,X500)) | ~! [X501] : (~r1(X481,X501) | ~(~! [X502] : (~r1(X501,X502) | ~(~! [X503] : (~r1(X502,X503) | ~(! [X504] : (~r1(X503,X504) | p14(X504)) | ~! [X505] : (~(! [X506] : (p13(X506) | ~r1(X505,X506)) | ~! [X507] : (~r1(X505,X507) | ~(~! [X508] : (~r1(X507,X508) | ! [X509] : (~r1(X508,X509) | ! [X510] : (! [X511] : (! [X512] : (! [X513] : (! [X514] : (~r1(X513,X514) | ! [X515] : (~r1(X514,X515) | ! [X516] : (! [X517] : (~r1(X516,X517) | ! [X518] : (~r1(X517,X518) | ! [X519] : (~r1(X518,X519) | ! [X520] : (~r1(X519,X520) | ~((~p12(X520) & ~p11(X520)) | (p12(X520) & p11(X520))))))) | ~r1(X515,X516)))) | ~r1(X512,X513)) | ~r1(X511,X512)) | ~r1(X510,X511)) | ~r1(X509,X510)))) | ! [X521] : (~r1(X507,X521) | p12(X521)) | ~! [X522] : (~r1(X507,X522) | ~(~! [X523] : (~(~! [X524] : (! [X525] : (! [X526] : (~r1(X525,X526) | ! [X527] : (~r1(X526,X527) | ! [X528] : (~r1(X527,X528) | ! [X529] : (~r1(X528,X529) | ! [X530] : (~r1(X529,X530) | ! [X531] : (! [X532] : (! [X533] : (! [X534] : (~r1(X533,X534) | ~((p10(X534) & p9(X534)) | (~p10(X534) & ~p9(X534)))) | ~r1(X532,X533)) | ~r1(X531,X532)) | ~r1(X530,X531))))))) | ~r1(X524,X525)) | ~r1(X523,X524)) | ! [X535] : (p10(X535) | ~r1(X523,X535)) | ~! [X536] : (~r1(X523,X536) | ~(! [X537] : (~r1(X536,X537) | p9(X537)) | ~! [X538] : (~r1(X536,X538) | ~(~! [X539] : (~r1(X538,X539) | ! [X540] : (! [X541] : (! [X542] : (! [X543] : (~r1(X542,X543) | ! [X544] : (! [X545] : (~r1(X544,X545) | ! [X546] : (! [X547] : (~((p7(X547) & p8(X547)) | (~p7(X547) & ~p8(X547))) | ~r1(X546,X547)) | ~r1(X545,X546))) | ~r1(X543,X544))) | ~r1(X541,X542)) | ~r1(X540,X541)) | ~r1(X539,X540))) | ~! [X548] : (~r1(X538,X548) | ~(~! [X549] : (! [X550] : (! [X551] : (~r1(X550,X551) | ! [X552] : (~r1(X551,X552) | ! [X553] : (~r1(X552,X553) | ! [X554] : (~r1(X553,X554) | ! [X555] : (! [X556] : (~((p7(X556) & p6(X556)) | (~p6(X556) & ~p7(X556))) | ~r1(X555,X556)) | ~r1(X554,X555)))))) | ~r1(X549,X550)) | ~r1(X548,X549)) | ! [X557] : (p7(X557) | ~r1(X548,X557)) | ~! [X558] : (~(~! [X559] : (~(~! [X560] : (~r1(X559,X560) | ~(~! [X561] : (! [X562] : (~r1(X561,X562) | ! [X563] : (~r1(X562,X563) | ! [X564] : (! [X565] : (~((p4(X565) & p3(X565)) | (~p4(X565) & ~p3(X565))) | ~r1(X564,X565)) | ~r1(X563,X564)))) | ~r1(X560,X561)) | ~! [X566] : (~(~! [X567] : (~r1(X566,X567) | ! [X568] : (! [X569] : (! [X570] : (~r1(X569,X570) | ~((~p2(X570) & ~p3(X570)) | (p2(X570) & p3(X570)))) | ~r1(X568,X569)) | ~r1(X567,X568))) | ~! [X571] : (! [X572] : (! [X573] : (~r1(X572,X573) | ! [X574] : (~r1(X573,X574) | ~((~p2(X574) & ~p1(X574)) | (p1(X574) & p2(X574))))) | ~r1(X571,X572)) | ~r1(X566,X571)) | ! [X575] : (p3(X575) | ~r1(X566,X575))) | ~r1(X560,X566)) | ! [X576] : (~r1(X560,X576) | p4(X576)))) | ! [X577] : (~r1(X559,X577) | p5(X577)) | ~! [X578] : (~r1(X559,X578) | ! [X579] : (! [X580] : (! [X581] : (~r1(X580,X581) | ! [X582] : (~r1(X581,X582) | ! [X583] : (~r1(X582,X583) | ~((~p4(X583) & ~p5(X583)) | (p5(X583) & p4(X583)))))) | ~r1(X579,X580)) | ~r1(X578,X579)))) | ~r1(X558,X559)) | ! [X584] : (p6(X584) | ~r1(X558,X584)) | ~! [X585] : (! [X586] : (~r1(X585,X586) | ! [X587] : (! [X588] : (! [X589] : (~r1(X588,X589) | ! [X590] : (~r1(X589,X590) | ! [X591] : (~r1(X590,X591) | ~((p5(X591) & p6(X591)) | (~p6(X591) & ~p5(X591)))))) | ~r1(X587,X588)) | ~r1(X586,X587))) | ~r1(X558,X585))) | ~r1(X548,X558)))) | ! [X592] : (~r1(X538,X592) | p8(X592)))) | ~! [X593] : (~r1(X536,X593) | ! [X594] : (~r1(X593,X594) | ! [X595] : (! [X596] : (! [X597] : (! [X598] : (! [X599] : (~r1(X598,X599) | ! [X600] : (! [X601] : (! [X602] : (~((~p8(X602) & ~p9(X602)) | (p9(X602) & p8(X602))) | ~r1(X601,X602)) | ~r1(X600,X601)) | ~r1(X599,X600))) | ~r1(X597,X598)) | ~r1(X596,X597)) | ~r1(X595,X596)) | ~r1(X594,X595))))))) | ~r1(X522,X523)) | ! [X603] : (~r1(X522,X603) | p11(X603)) | ~! [X604] : (~r1(X522,X604) | ! [X605] : (~r1(X604,X605) | ! [X606] : (~r1(X605,X606) | ! [X607] : (~r1(X606,X607) | ! [X608] : (~r1(X607,X608) | ! [X609] : (~r1(X608,X609) | ! [X610] : (~r1(X609,X610) | ! [X611] : (! [X612] : (! [X613] : (~r1(X612,X613) | ! [X614] : (! [X615] : (~r1(X614,X615) | ~((~p11(X615) & ~p10(X615)) | (p11(X615) & p10(X615)))) | ~r1(X613,X614))) | ~r1(X611,X612)) | ~r1(X610,X611))))))))))))) | ~! [X616] : (! [X617] : (! [X618] : (~r1(X617,X618) | ! [X619] : (! [X620] : (! [X621] : (! [X622] : (~r1(X621,X622) | ! [X623] : (! [X624] : (~r1(X623,X624) | ! [X625] : (~r1(X624,X625) | ! [X626] : (! [X627] : (! [X628] : (~r1(X627,X628) | ! [X629] : (~((~p13(X629) & ~p12(X629)) | (p13(X629) & p12(X629))) | ~r1(X628,X629))) | ~r1(X626,X627)) | ~r1(X625,X626)))) | ~r1(X622,X623))) | ~r1(X620,X621)) | ~r1(X619,X620)) | ~r1(X618,X619))) | ~r1(X616,X617)) | ~r1(X505,X616))) | ~r1(X503,X505)) | ~! [X630] : (~r1(X503,X630) | ! [X631] : (! [X632] : (~r1(X631,X632) | ! [X633] : (! [X634] : (~r1(X633,X634) | ! [X635] : (! [X636] : (! [X637] : (~r1(X636,X637) | ! [X638] : (~r1(X637,X638) | ! [X639] : (~r1(X638,X639) | ! [X640] : (~r1(X639,X640) | ! [X641] : (! [X642] : (~r1(X641,X642) | ! [X643] : (! [X644] : (~r1(X643,X644) | ~((~p14(X644) & ~p13(X644)) | (p14(X644) & p13(X644)))) | ~r1(X642,X643))) | ~r1(X640,X641)))))) | ~r1(X635,X636)) | ~r1(X634,X635))) | ~r1(X632,X633))) | ~r1(X630,X631))))) | ! [X645] : (p15(X645) | ~r1(X502,X645)) | ~! [X646] : (! [X647] : (! [X648] : (~r1(X647,X648) | ! [X649] : (! [X650] : (~r1(X649,X650) | ! [X651] : (~r1(X650,X651) | ! [X652] : (! [X653] : (! [X654] : (! [X655] : (~r1(X654,X655) | ! [X656] : (! [X657] : (~r1(X656,X657) | ! [X658] : (~r1(X657,X658) | ! [X659] : (! [X660] : (~r1(X659,X660) | ! [X661] : (~((p14(X661) & p15(X661)) | (~p14(X661) & ~p15(X661))) | ~r1(X660,X661))) | ~r1(X658,X659)))) | ~r1(X655,X656))) | ~r1(X653,X654)) | ~r1(X652,X653)) | ~r1(X651,X652)))) | ~r1(X648,X649))) | ~r1(X646,X647)) | ~r1(X502,X646)))) | ! [X662] : (p16(X662) | ~r1(X501,X662)) | ~! [X663] : (~r1(X501,X663) | ! [X664] : (! [X665] : (~r1(X664,X665) | ! [X666] : (! [X667] : (! [X668] : (! [X669] : (~r1(X668,X669) | ! [X670] : (! [X671] : (~r1(X670,X671) | ! [X672] : (! [X673] : (~r1(X672,X673) | ! [X674] : (! [X675] : (! [X676] : (! [X677] : (! [X678] : (~r1(X677,X678) | ! [X679] : (~r1(X678,X679) | ~((p15(X679) & p16(X679)) | (~p16(X679) & ~p15(X679))))) | ~r1(X676,X677)) | ~r1(X675,X676)) | ~r1(X674,X675)) | ~r1(X673,X674))) | ~r1(X671,X672))) | ~r1(X669,X670))) | ~r1(X667,X668)) | ~r1(X666,X667)) | ~r1(X665,X666))) | ~r1(X663,X664))))))) | ! [X680] : (p18(X680) | ~r1(X461,X680))) | ~r1(X459,X461)) | ~! [X681] : (! [X682] : (~r1(X681,X682) | ! [X683] : (! [X684] : (~r1(X683,X684) | ! [X685] : (~r1(X684,X685) | ! [X686] : (! [X687] : (~r1(X686,X687) | ! [X688] : (! [X689] : (~r1(X688,X689) | ! [X690] : (~r1(X689,X690) | ! [X691] : (~r1(X690,X691) | ! [X692] : (~r1(X691,X692) | ! [X693] : (! [X694] : (! [X695] : (! [X696] : (~r1(X695,X696) | ! [X697] : (! [X698] : (! [X699] : (~r1(X698,X699) | ! [X700] : (~((~p18(X700) & ~p19(X700)) | (p18(X700) & p19(X700))) | ~r1(X699,X700))) | ~r1(X697,X698)) | ~r1(X696,X697))) | ~r1(X694,X695)) | ~r1(X693,X694)) | ~r1(X692,X693)))))) | ~r1(X687,X688))) | ~r1(X685,X686)))) | ~r1(X682,X683))) | ~r1(X459,X681))) | ~r1(X457,X459)) | ~! [X701] : (! [X702] : (! [X703] : (~r1(X702,X703) | ! [X704] : (! [X705] : (! [X706] : (! [X707] : (! [X708] : (~r1(X707,X708) | ! [X709] : (! [X710] : (! [X711] : (! [X712] : (~r1(X711,X712) | ! [X713] : (~r1(X712,X713) | ! [X714] : (! [X715] : (~r1(X714,X715) | ! [X716] : (~r1(X715,X716) | ! [X717] : (~r1(X716,X717) | ! [X718] : (~r1(X717,X718) | ! [X719] : (~r1(X718,X719) | ! [X720] : (! [X721] : (~((p19(X721) & p20(X721)) | (~p19(X721) & ~p20(X721))) | ~r1(X720,X721)) | ~r1(X719,X720))))))) | ~r1(X713,X714)))) | ~r1(X710,X711)) | ~r1(X709,X710)) | ~r1(X708,X709))) | ~r1(X706,X707)) | ~r1(X705,X706)) | ~r1(X704,X705)) | ~r1(X703,X704))) | ~r1(X701,X702)) | ~r1(X457,X701))) | ~r1(X455,X457)) | ~! [X722] : (~r1(X455,X722) | ! [X723] : (~r1(X722,X723) | ! [X724] : (! [X725] : (~r1(X724,X725) | ! [X726] : (! [X727] : (~r1(X726,X727) | ! [X728] : (! [X729] : (! [X730] : (~r1(X729,X730) | ! [X731] : (! [X732] : (~r1(X731,X732) | ! [X733] : (! [X734] : (! [X735] : (~r1(X734,X735) | ! [X736] : (~r1(X735,X736) | ! [X737] : (! [X738] : (! [X739] : (~r1(X738,X739) | ! [X740] : (! [X741] : (~r1(X740,X741) | ! [X742] : (! [X743] : (~((p21(X743) & p20(X743)) | (~p20(X743) & ~p21(X743))) | ~r1(X742,X743)) | ~r1(X741,X742))) | ~r1(X739,X740))) | ~r1(X737,X738)) | ~r1(X736,X737)))) | ~r1(X733,X734)) | ~r1(X732,X733))) | ~r1(X730,X731))) | ~r1(X728,X729)) | ~r1(X727,X728))) | ~r1(X725,X726))) | ~r1(X723,X724))))) | ~r1(X431,X455)) | ! [X744] : (p22(X744) | ~r1(X431,X744)))) | ~! [X745] : (! [X746] : (! [X747] : (! [X748] : (! [X749] : (! [X750] : (! [X751] : (! [X752] : (~r1(X751,X752) | ! [X753] : (! [X754] : (! [X755] : (! [X756] : (! [X757] : (~r1(X756,X757) | ! [X758] : (! [X759] : (! [X760] : (! [X761] : (! [X762] : (! [X763] : (~r1(X762,X763) | ! [X764] : (~r1(X763,X764) | ! [X765] : (~r1(X764,X765) | ! [X766] : (~r1(X765,X766) | ! [X767] : (! [X768] : (~((p22(X768) & p23(X768)) | (~p22(X768) & ~p23(X768))) | ~r1(X767,X768)) | ~r1(X766,X767)))))) | ~r1(X761,X762)) | ~r1(X760,X761)) | ~r1(X759,X760)) | ~r1(X758,X759)) | ~r1(X757,X758))) | ~r1(X755,X756)) | ~r1(X754,X755)) | ~r1(X753,X754)) | ~r1(X752,X753))) | ~r1(X750,X751)) | ~r1(X749,X750)) | ~r1(X748,X749)) | ~r1(X747,X748)) | ~r1(X746,X747)) | ~r1(X745,X746)) | ~r1(X429,X745)))) | ~! [X769] : (! [X770] : (~r1(X769,X770) | ! [X771] : (! [X772] : (! [X773] : (! [X774] : (! [X775] : (! [X776] : (~r1(X775,X776) | ! [X777] : (~r1(X776,X777) | ! [X778] : (! [X779] : (! [X780] : (! [X781] : (! [X782] : (! [X783] : (! [X784] : (~r1(X783,X784) | ! [X785] : (! [X786] : (! [X787] : (~r1(X786,X787) | ! [X788] : (! [X789] : (~r1(X788,X789) | ! [X790] : (! [X791] : (~r1(X790,X791) | ! [X792] : (~r1(X791,X792) | ! [X793] : (~r1(X792,X793) | ~((~p23(X793) & ~p24(X793)) | (p24(X793) & p23(X793)))))) | ~r1(X789,X790))) | ~r1(X787,X788))) | ~r1(X785,X786)) | ~r1(X784,X785))) | ~r1(X782,X783)) | ~r1(X781,X782)) | ~r1(X780,X781)) | ~r1(X779,X780)) | ~r1(X778,X779)) | ~r1(X777,X778)))) | ~r1(X774,X775)) | ~r1(X773,X774)) | ~r1(X772,X773)) | ~r1(X771,X772)) | ~r1(X770,X771))) | ~r1(X427,X769))) | ~r1(X426,X427)) | ! [X794] : (p25(X794) | ~r1(X426,X794)) | ~! [X795] : (! [X796] : (~r1(X795,X796) | ! [X797] : (! [X798] : (~r1(X797,X798) | ! [X799] : (~r1(X798,X799) | ! [X800] : (~r1(X799,X800) | ! [X801] : (! [X802] : (~r1(X801,X802) | ! [X803] : (! [X804] : (~r1(X803,X804) | ! [X805] : (~r1(X804,X805) | ! [X806] : (~r1(X805,X806) | ! [X807] : (! [X808] : (! [X809] : (~r1(X808,X809) | ! [X810] : (! [X811] : (! [X812] : (! [X813] : (~r1(X812,X813) | ! [X814] : (~r1(X813,X814) | ! [X815] : (~r1(X814,X815) | ! [X816] : (~r1(X815,X816) | ! [X817] : (! [X818] : (~r1(X817,X818) | ! [X819] : (! [X820] : (~((p25(X820) & p24(X820)) | (~p25(X820) & ~p24(X820))) | ~r1(X819,X820)) | ~r1(X818,X819))) | ~r1(X816,X817)))))) | ~r1(X811,X812)) | ~r1(X810,X811)) | ~r1(X809,X810))) | ~r1(X807,X808)) | ~r1(X806,X807))))) | ~r1(X802,X803))) | ~r1(X800,X801))))) | ~r1(X796,X797))) | ~r1(X426,X795))) | ~r1(X398,X426)) | ! [X821] : (~r1(X398,X821) | p26(X821)))) | ~! [X822] : (! [X823] : (~r1(X822,X823) | ! [X824] : (~r1(X823,X824) | ! [X825] : (~r1(X824,X825) | ! [X826] : (~r1(X825,X826) | ! [X827] : (~r1(X826,X827) | ! [X828] : (! [X829] : (! [X830] : (! [X831] : (~r1(X830,X831) | ! [X832] : (~r1(X831,X832) | ! [X833] : (~r1(X832,X833) | ! [X834] : (! [X835] : (! [X836] : (~r1(X835,X836) | ! [X837] : (! [X838] : (! [X839] : (! [X840] : (~r1(X839,X840) | ! [X841] : (~r1(X840,X841) | ! [X842] : (~r1(X841,X842) | ! [X843] : (~r1(X842,X843) | ! [X844] : (! [X845] : (! [X846] : (! [X847] : (! [X848] : (! [X849] : (~r1(X848,X849) | ~((p26(X849) & p27(X849)) | (~p27(X849) & ~p26(X849)))) | ~r1(X847,X848)) | ~r1(X846,X847)) | ~r1(X845,X846)) | ~r1(X844,X845)) | ~r1(X843,X844)))))) | ~r1(X838,X839)) | ~r1(X837,X838)) | ~r1(X836,X837))) | ~r1(X834,X835)) | ~r1(X833,X834))))) | ~r1(X829,X830)) | ~r1(X828,X829)) | ~r1(X827,X828))))))) | ~r1(X396,X822))) | ~r1(X395,X396)) | ! [X850] : (p28(X850) | ~r1(X395,X850)) | ~! [X851] : (! [X852] : (! [X853] : (~r1(X852,X853) | ! [X854] : (! [X855] : (~r1(X854,X855) | ! [X856] : (~r1(X855,X856) | ! [X857] : (~r1(X856,X857) | ! [X858] : (! [X859] : (! [X860] : (~r1(X859,X860) | ! [X861] : (! [X862] : (! [X863] : (! [X864] : (~r1(X863,X864) | ! [X865] : (~r1(X864,X865) | ! [X866] : (~r1(X865,X866) | ! [X867] : (~r1(X866,X867) | ! [X868] : (! [X869] : (~r1(X868,X869) | ! [X870] : (! [X871] : (! [X872] : (~r1(X871,X872) | ! [X873] : (! [X874] : (~r1(X873,X874) | ! [X875] : (! [X876] : (! [X877] : (~r1(X876,X877) | ! [X878] : (! [X879] : (~((~p27(X879) & ~p28(X879)) | (p28(X879) & p27(X879))) | ~r1(X878,X879)) | ~r1(X877,X878))) | ~r1(X875,X876)) | ~r1(X874,X875))) | ~r1(X872,X873))) | ~r1(X870,X871)) | ~r1(X869,X870))) | ~r1(X867,X868)))))) | ~r1(X862,X863)) | ~r1(X861,X862)) | ~r1(X860,X861))) | ~r1(X858,X859)) | ~r1(X857,X858))))) | ~r1(X853,X854))) | ~r1(X851,X852)) | ~r1(X395,X851))) | ~r1(X364,X395)) | ! [X880] : (~r1(X364,X880) | p29(X880))) | ~r1(X362,X364)) | ~! [X881] : (! [X882] : (~r1(X881,X882) | ! [X883] : (! [X884] : (! [X885] : (! [X886] : (~r1(X885,X886) | ! [X887] : (~r1(X886,X887) | ! [X888] : (~r1(X887,X888) | ! [X889] : (~r1(X888,X889) | ! [X890] : (! [X891] : (~r1(X890,X891) | ! [X892] : (! [X893] : (! [X894] : (! [X895] : (~r1(X894,X895) | ! [X896] : (! [X897] : (~r1(X896,X897) | ! [X898] : (~r1(X897,X898) | ! [X899] : (~r1(X898,X899) | ! [X900] : (~r1(X899,X900) | ! [X901] : (! [X902] : (~r1(X901,X902) | ! [X903] : (! [X904] : (! [X905] : (~r1(X904,X905) | ! [X906] : (! [X907] : (! [X908] : (! [X909] : (! [X910] : (! [X911] : (~((p30(X911) & p29(X911)) | (~p29(X911) & ~p30(X911))) | ~r1(X910,X911)) | ~r1(X909,X910)) | ~r1(X908,X909)) | ~r1(X907,X908)) | ~r1(X906,X907)) | ~r1(X905,X906))) | ~r1(X903,X904)) | ~r1(X902,X903))) | ~r1(X900,X901)))))) | ~r1(X895,X896))) | ~r1(X893,X894)) | ~r1(X892,X893)) | ~r1(X891,X892))) | ~r1(X889,X890)))))) | ~r1(X884,X885)) | ~r1(X883,X884)) | ~r1(X882,X883))) | ~r1(X362,X881))) | ~r1(X328,X362))) | ~r1(X293,X328)))) | ! [X912] : (~r1(X292,X912) | p33(X912)) | ~! [X913] : (~r1(X292,X913) | ! [X914] : (~r1(X913,X914) | ! [X915] : (! [X916] : (~r1(X915,X916) | ! [X917] : (~r1(X916,X917) | ! [X918] : (~r1(X917,X918) | ! [X919] : (! [X920] : (~r1(X919,X920) | ! [X921] : (~r1(X920,X921) | ! [X922] : (! [X923] : (~r1(X922,X923) | ! [X924] : (~r1(X923,X924) | ! [X925] : (~r1(X924,X925) | ! [X926] : (! [X927] : (~r1(X926,X927) | ! [X928] : (~r1(X927,X928) | ! [X929] : (! [X930] : (! [X931] : (! [X932] : (! [X933] : (! [X934] : (! [X935] : (~r1(X934,X935) | ! [X936] : (~r1(X935,X936) | ! [X937] : (~r1(X936,X937) | ! [X938] : (! [X939] : (~r1(X938,X939) | ! [X940] : (! [X941] : (~r1(X940,X941) | ! [X942] : (~r1(X941,X942) | ! [X943] : (~r1(X942,X943) | ! [X944] : (! [X945] : (! [X946] : (~((~p33(X946) & ~p32(X946)) | (p32(X946) & p33(X946))) | ~r1(X945,X946)) | ~r1(X944,X945)) | ~r1(X943,X944))))) | ~r1(X939,X940))) | ~r1(X937,X938))))) | ~r1(X933,X934)) | ~r1(X932,X933)) | ~r1(X931,X932)) | ~r1(X930,X931)) | ~r1(X929,X930)) | ~r1(X928,X929)))) | ~r1(X925,X926))))) | ~r1(X921,X922)))) | ~r1(X918,X919))))) | ~r1(X914,X915))))) | ~r1(X256,X292)) | ! [X947] : (~r1(X256,X947) | p34(X947))) | ~r1(X255,X256)) | ! [X948] : (p35(X948) | ~r1(X255,X948)) | ~! [X949] : (~r1(X255,X949) | ! [X950] : (! [X951] : (~r1(X950,X951) | ! [X952] : (~r1(X951,X952) | ! [X953] : (~r1(X952,X953) | ! [X954] : (! [X955] : (! [X956] : (~r1(X955,X956) | ! [X957] : (! [X958] : (! [X959] : (~r1(X958,X959) | ! [X960] : (~r1(X959,X960) | ! [X961] : (! [X962] : (! [X963] : (! [X964] : (! [X965] : (~r1(X964,X965) | ! [X966] : (! [X967] : (! [X968] : (~r1(X967,X968) | ! [X969] : (! [X970] : (! [X971] : (~r1(X970,X971) | ! [X972] : (! [X973] : (~r1(X972,X973) | ! [X974] : (! [X975] : (! [X976] : (~r1(X975,X976) | ! [X977] : (! [X978] : (~r1(X977,X978) | ! [X979] : (~r1(X978,X979) | ! [X980] : (! [X981] : (~r1(X980,X981) | ! [X982] : (! [X983] : (~r1(X982,X983) | ! [X984] : (~r1(X983,X984) | ~((p34(X984) & p35(X984)) | (~p35(X984) & ~p34(X984))))) | ~r1(X981,X982))) | ~r1(X979,X980)))) | ~r1(X976,X977))) | ~r1(X974,X975)) | ~r1(X973,X974))) | ~r1(X971,X972))) | ~r1(X969,X970)) | ~r1(X968,X969))) | ~r1(X966,X967)) | ~r1(X965,X966))) | ~r1(X963,X964)) | ~r1(X962,X963)) | ~r1(X961,X962)) | ~r1(X960,X961)))) | ~r1(X957,X958)) | ~r1(X956,X957))) | ~r1(X954,X955)) | ~r1(X953,X954))))) | ~r1(X949,X950)))) | ~r1(X254,X255)) | ! [X985] : (~r1(X254,X985) | p36(X985)) | ~! [X986] : (! [X987] : (~r1(X986,X987) | ! [X988] : (~r1(X987,X988) | ! [X989] : (~r1(X988,X989) | ! [X990] : (~r1(X989,X990) | ! [X991] : (! [X992] : (! [X993] : (! [X994] : (~r1(X993,X994) | ! [X995] : (! [X996] : (~r1(X995,X996) | ! [X997] : (! [X998] : (~r1(X997,X998) | ! [X999] : (~r1(X998,X999) | ! [X1000] : (~r1(X999,X1000) | ! [X1001] : (! [X1002] : (! [X1003] : (~r1(X1002,X1003) | ! [X1004] : (! [X1005] : (! [X1006] : (~r1(X1005,X1006) | ! [X1007] : (~r1(X1006,X1007) | ! [X1008] : (~r1(X1007,X1008) | ! [X1009] : (! [X1010] : (! [X1011] : (~r1(X1010,X1011) | ! [X1012] : (~r1(X1011,X1012) | ! [X1013] : (~r1(X1012,X1013) | ! [X1014] : (! [X1015] : (~r1(X1014,X1015) | ! [X1016] : (~r1(X1015,X1016) | ! [X1017] : (! [X1018] : (! [X1019] : (~r1(X1018,X1019) | ! [X1020] : (~r1(X1019,X1020) | ! [X1021] : (! [X1022] : (~((p36(X1022) & p35(X1022)) | (~p35(X1022) & ~p36(X1022))) | ~r1(X1021,X1022)) | ~r1(X1020,X1021)))) | ~r1(X1017,X1018)) | ~r1(X1016,X1017)))) | ~r1(X1013,X1014))))) | ~r1(X1009,X1010)) | ~r1(X1008,X1009))))) | ~r1(X1004,X1005)) | ~r1(X1003,X1004))) | ~r1(X1001,X1002)) | ~r1(X1000,X1001))))) | ~r1(X996,X997))) | ~r1(X994,X995))) | ~r1(X992,X993)) | ~r1(X991,X992)) | ~r1(X990,X991)))))) | ~r1(X254,X986)))))) | ! [X1023] : (~r1(X213,X1023) | p38(X1023)) | ~! [X1024] : (~r1(X213,X1024) | ! [X1025] : (~r1(X1024,X1025) | ! [X1026] : (! [X1027] : (! [X1028] : (~r1(X1027,X1028) | ! [X1029] : (~r1(X1028,X1029) | ! [X1030] : (~r1(X1029,X1030) | ! [X1031] : (! [X1032] : (~r1(X1031,X1032) | ! [X1033] : (~r1(X1032,X1033) | ! [X1034] : (~r1(X1033,X1034) | ! [X1035] : (! [X1036] : (~r1(X1035,X1036) | ! [X1037] : (! [X1038] : (! [X1039] : (~r1(X1038,X1039) | ! [X1040] : (~r1(X1039,X1040) | ! [X1041] : (! [X1042] : (~r1(X1041,X1042) | ! [X1043] : (~r1(X1042,X1043) | ! [X1044] : (~r1(X1043,X1044) | ! [X1045] : (~r1(X1044,X1045) | ! [X1046] : (! [X1047] : (! [X1048] : (~r1(X1047,X1048) | ! [X1049] : (! [X1050] : (! [X1051] : (~r1(X1050,X1051) | ! [X1052] : (~r1(X1051,X1052) | ! [X1053] : (! [X1054] : (~r1(X1053,X1054) | ! [X1055] : (~r1(X1054,X1055) | ! [X1056] : (~r1(X1055,X1056) | ! [X1057] : (! [X1058] : (! [X1059] : (~r1(X1058,X1059) | ! [X1060] : (! [X1061] : (! [X1062] : (~r1(X1061,X1062) | ~((~p37(X1062) & ~p38(X1062)) | (p38(X1062) & p37(X1062)))) | ~r1(X1060,X1061)) | ~r1(X1059,X1060))) | ~r1(X1057,X1058)) | ~r1(X1056,X1057))))) | ~r1(X1052,X1053)))) | ~r1(X1049,X1050)) | ~r1(X1048,X1049))) | ~r1(X1046,X1047)) | ~r1(X1045,X1046)))))) | ~r1(X1040,X1041)))) | ~r1(X1037,X1038)) | ~r1(X1036,X1037))) | ~r1(X1034,X1035))))) | ~r1(X1030,X1031))))) | ~r1(X1026,X1027)) | ~r1(X1025,X1026)))))) | ! [X1063] : (~r1(X212,X1063) | p39(X1063)) | ~! [X1064] : (! [X1065] : (~r1(X1064,X1065) | ! [X1066] : (! [X1067] : (! [X1068] : (! [X1069] : (~r1(X1068,X1069) | ! [X1070] : (! [X1071] : (~r1(X1070,X1071) | ! [X1072] : (! [X1073] : (~r1(X1072,X1073) | ! [X1074] : (~r1(X1073,X1074) | ! [X1075] : (! [X1076] : (! [X1077] : (~r1(X1076,X1077) | ! [X1078] : (! [X1079] : (! [X1080] : (! [X1081] : (! [X1082] : (! [X1083] : (! [X1084] : (! [X1085] : (! [X1086] : (! [X1087] : (! [X1088] : (! [X1089] : (~r1(X1088,X1089) | ! [X1090] : (! [X1091] : (! [X1092] : (~r1(X1091,X1092) | ! [X1093] : (~r1(X1092,X1093) | ! [X1094] : (~r1(X1093,X1094) | ! [X1095] : (~r1(X1094,X1095) | ! [X1096] : (~r1(X1095,X1096) | ! [X1097] : (! [X1098] : (! [X1099] : (~r1(X1098,X1099) | ! [X1100] : (~r1(X1099,X1100) | ! [X1101] : (! [X1102] : (~r1(X1101,X1102) | ! [X1103] : (~((~p39(X1103) & ~p38(X1103)) | (p38(X1103) & p39(X1103))) | ~r1(X1102,X1103))) | ~r1(X1100,X1101)))) | ~r1(X1097,X1098)) | ~r1(X1096,X1097))))))) | ~r1(X1090,X1091)) | ~r1(X1089,X1090))) | ~r1(X1087,X1088)) | ~r1(X1086,X1087)) | ~r1(X1085,X1086)) | ~r1(X1084,X1085)) | ~r1(X1083,X1084)) | ~r1(X1082,X1083)) | ~r1(X1081,X1082)) | ~r1(X1080,X1081)) | ~r1(X1079,X1080)) | ~r1(X1078,X1079)) | ~r1(X1077,X1078))) | ~r1(X1075,X1076)) | ~r1(X1074,X1075)))) | ~r1(X1071,X1072))) | ~r1(X1069,X1070))) | ~r1(X1067,X1068)) | ~r1(X1066,X1067)) | ~r1(X1065,X1066))) | ~r1(X212,X1064)))) | ! [X1104] : (~r1(X170,X1104) | p40(X1104)))) | ~! [X1105] : (~r1(X168,X1105) | ! [X1106] : (~r1(X1105,X1106) | ! [X1107] : (~r1(X1106,X1107) | ! [X1108] : (~r1(X1107,X1108) | ! [X1109] : (~r1(X1108,X1109) | ! [X1110] : (~r1(X1109,X1110) | ! [X1111] : (! [X1112] : (~r1(X1111,X1112) | ! [X1113] : (! [X1114] : (~r1(X1113,X1114) | ! [X1115] : (~r1(X1114,X1115) | ! [X1116] : (~r1(X1115,X1116) | ! [X1117] : (! [X1118] : (! [X1119] : (~r1(X1118,X1119) | ! [X1120] : (~r1(X1119,X1120) | ! [X1121] : (~r1(X1120,X1121) | ! [X1122] : (~r1(X1121,X1122) | ! [X1123] : (! [X1124] : (! [X1125] : (! [X1126] : (~r1(X1125,X1126) | ! [X1127] : (! [X1128] : (! [X1129] : (~r1(X1128,X1129) | ! [X1130] : (~r1(X1129,X1130) | ! [X1131] : (! [X1132] : (~r1(X1131,X1132) | ! [X1133] : (! [X1134] : (! [X1135] : (~r1(X1134,X1135) | ! [X1136] : (! [X1137] : (! [X1138] : (! [X1139] : (~r1(X1138,X1139) | ! [X1140] : (! [X1141] : (! [X1142] : (~r1(X1141,X1142) | ! [X1143] : (! [X1144] : (~r1(X1143,X1144) | ! [X1145] : (~r1(X1144,X1145) | ! [X1146] : (~((~p40(X1146) & ~p41(X1146)) | (p41(X1146) & p40(X1146))) | ~r1(X1145,X1146)))) | ~r1(X1142,X1143))) | ~r1(X1140,X1141)) | ~r1(X1139,X1140))) | ~r1(X1137,X1138)) | ~r1(X1136,X1137)) | ~r1(X1135,X1136))) | ~r1(X1133,X1134)) | ~r1(X1132,X1133))) | ~r1(X1130,X1131)))) | ~r1(X1127,X1128)) | ~r1(X1126,X1127))) | ~r1(X1124,X1125)) | ~r1(X1123,X1124)) | ~r1(X1122,X1123)))))) | ~r1(X1117,X1118)) | ~r1(X1116,X1117))))) | ~r1(X1112,X1113))) | ~r1(X1110,X1111))))))))))) | ~r1(X121,X123)) | ~! [X1147] : (~r1(X121,X1147) | ! [X1148] : (! [X1149] : (~r1(X1148,X1149) | ! [X1150] : (! [X1151] : (! [X1152] : (~r1(X1151,X1152) | ! [X1153] : (! [X1154] : (! [X1155] : (~r1(X1154,X1155) | ! [X1156] : (! [X1157] : (! [X1158] : (~r1(X1157,X1158) | ! [X1159] : (~r1(X1158,X1159) | ! [X1160] : (~r1(X1159,X1160) | ! [X1161] : (! [X1162] : (~r1(X1161,X1162) | ! [X1163] : (~r1(X1162,X1163) | ! [X1164] : (~r1(X1163,X1164) | ! [X1165] : (~r1(X1164,X1165) | ! [X1166] : (! [X1167] : (~r1(X1166,X1167) | ! [X1168] : (! [X1169] : (~r1(X1168,X1169) | ! [X1170] : (~r1(X1169,X1170) | ! [X1171] : (! [X1172] : (~r1(X1171,X1172) | ! [X1173] : (! [X1174] : (~r1(X1173,X1174) | ! [X1175] : (! [X1176] : (! [X1177] : (~r1(X1176,X1177) | ! [X1178] : (~r1(X1177,X1178) | ! [X1179] : (~r1(X1178,X1179) | ! [X1180] : (! [X1181] : (! [X1182] : (! [X1183] : (! [X1184] : (~r1(X1183,X1184) | ! [X1185] : (! [X1186] : (~r1(X1185,X1186) | ! [X1187] : (~r1(X1186,X1187) | ! [X1188] : (! [X1189] : (~r1(X1188,X1189) | ! [X1190] : (~r1(X1189,X1190) | ~((p43(X1190) & p42(X1190)) | (~p43(X1190) & ~p42(X1190))))) | ~r1(X1187,X1188)))) | ~r1(X1184,X1185))) | ~r1(X1182,X1183)) | ~r1(X1181,X1182)) | ~r1(X1180,X1181)) | ~r1(X1179,X1180))))) | ~r1(X1175,X1176)) | ~r1(X1174,X1175))) | ~r1(X1172,X1173))) | ~r1(X1170,X1171)))) | ~r1(X1167,X1168))) | ~r1(X1165,X1166)))))) | ~r1(X1160,X1161))))) | ~r1(X1156,X1157)) | ~r1(X1155,X1156))) | ~r1(X1153,X1154)) | ~r1(X1152,X1153))) | ~r1(X1150,X1151)) | ~r1(X1149,X1150))) | ~r1(X1147,X1148))))) | ~! [X1191] : (~r1(X119,X1191) | ! [X1192] : (~r1(X1191,X1192) | ! [X1193] : (~r1(X1192,X1193) | ! [X1194] : (! [X1195] : (~r1(X1194,X1195) | ! [X1196] : (! [X1197] : (~r1(X1196,X1197) | ! [X1198] : (~r1(X1197,X1198) | ! [X1199] : (! [X1200] : (! [X1201] : (~r1(X1200,X1201) | ! [X1202] : (~r1(X1201,X1202) | ! [X1203] : (~r1(X1202,X1203) | ! [X1204] : (~r1(X1203,X1204) | ! [X1205] : (~r1(X1204,X1205) | ! [X1206] : (~r1(X1205,X1206) | ! [X1207] : (! [X1208] : (! [X1209] : (! [X1210] : (! [X1211] : (! [X1212] : (~r1(X1211,X1212) | ! [X1213] : (! [X1214] : (! [X1215] : (! [X1216] : (~r1(X1215,X1216) | ! [X1217] : (~r1(X1216,X1217) | ! [X1218] : (~r1(X1217,X1218) | ! [X1219] : (! [X1220] : (~r1(X1219,X1220) | ! [X1221] : (! [X1222] : (~r1(X1221,X1222) | ! [X1223] : (~r1(X1222,X1223) | ! [X1224] : (! [X1225] : (~r1(X1224,X1225) | ! [X1226] : (! [X1227] : (! [X1228] : (~r1(X1227,X1228) | ! [X1229] : (! [X1230] : (~r1(X1229,X1230) | ! [X1231] : (~r1(X1230,X1231) | ! [X1232] : (! [X1233] : (! [X1234] : (! [X1235] : (~r1(X1234,X1235) | ~((p43(X1235) & p44(X1235)) | (~p43(X1235) & ~p44(X1235)))) | ~r1(X1233,X1234)) | ~r1(X1232,X1233)) | ~r1(X1231,X1232)))) | ~r1(X1228,X1229))) | ~r1(X1226,X1227)) | ~r1(X1225,X1226))) | ~r1(X1223,X1224)))) | ~r1(X1220,X1221))) | ~r1(X1218,X1219))))) | ~r1(X1214,X1215)) | ~r1(X1213,X1214)) | ~r1(X1212,X1213))) | ~r1(X1210,X1211)) | ~r1(X1209,X1210)) | ~r1(X1208,X1209)) | ~r1(X1207,X1208)) | ~r1(X1206,X1207)))))))) | ~r1(X1199,X1200)) | ~r1(X1198,X1199)))) | ~r1(X1195,X1196))) | ~r1(X1193,X1194)))))) | ~r1(X117,X119)) | ~! [X1236] : (~r1(X117,X1236) | ! [X1237] : (! [X1238] : (! [X1239] : (~r1(X1238,X1239) | ! [X1240] : (~r1(X1239,X1240) | ! [X1241] : (~r1(X1240,X1241) | ! [X1242] : (~r1(X1241,X1242) | ! [X1243] : (~r1(X1242,X1243) | ! [X1244] : (~r1(X1243,X1244) | ! [X1245] : (~r1(X1244,X1245) | ! [X1246] : (! [X1247] : (! [X1248] : (~r1(X1247,X1248) | ! [X1249] : (! [X1250] : (~r1(X1249,X1250) | ! [X1251] : (! [X1252] : (! [X1253] : (! [X1254] : (~r1(X1253,X1254) | ! [X1255] : (! [X1256] : (! [X1257] : (! [X1258] : (~r1(X1257,X1258) | ! [X1259] : (! [X1260] : (! [X1261] : (~r1(X1260,X1261) | ! [X1262] : (! [X1263] : (! [X1264] : (~r1(X1263,X1264) | ! [X1265] : (~r1(X1264,X1265) | ! [X1266] : (! [X1267] : (! [X1268] : (~r1(X1267,X1268) | ! [X1269] : (~r1(X1268,X1269) | ! [X1270] : (~r1(X1269,X1270) | ! [X1271] : (~r1(X1270,X1271) | ! [X1272] : (~r1(X1271,X1272) | ! [X1273] : (! [X1274] : (~r1(X1273,X1274) | ! [X1275] : (~r1(X1274,X1275) | ! [X1276] : (~r1(X1275,X1276) | ! [X1277] : (! [X1278] : (! [X1279] : (~r1(X1278,X1279) | ! [X1280] : (! [X1281] : (~r1(X1280,X1281) | ~((~p45(X1281) & ~p44(X1281)) | (p44(X1281) & p45(X1281)))) | ~r1(X1279,X1280))) | ~r1(X1277,X1278)) | ~r1(X1276,X1277))))) | ~r1(X1272,X1273))))))) | ~r1(X1266,X1267)) | ~r1(X1265,X1266)))) | ~r1(X1262,X1263)) | ~r1(X1261,X1262))) | ~r1(X1259,X1260)) | ~r1(X1258,X1259))) | ~r1(X1256,X1257)) | ~r1(X1255,X1256)) | ~r1(X1254,X1255))) | ~r1(X1252,X1253)) | ~r1(X1251,X1252)) | ~r1(X1250,X1251))) | ~r1(X1248,X1249))) | ~r1(X1246,X1247)) | ~r1(X1245,X1246))))))))) | ~r1(X1237,X1238)) | ~r1(X1236,X1237)))) | ~r1(X115,X117)) | ~! [X1282] : (~r1(X115,X1282) | ! [X1283] : (~r1(X1282,X1283) | ! [X1284] : (! [X1285] : (~r1(X1284,X1285) | ! [X1286] : (! [X1287] : (! [X1288] : (! [X1289] : (! [X1290] : (~r1(X1289,X1290) | ! [X1291] : (~r1(X1290,X1291) | ! [X1292] : (! [X1293] : (~r1(X1292,X1293) | ! [X1294] : (! [X1295] : (~r1(X1294,X1295) | ! [X1296] : (~r1(X1295,X1296) | ! [X1297] : (~r1(X1296,X1297) | ! [X1298] : (! [X1299] : (! [X1300] : (~r1(X1299,X1300) | ! [X1301] : (~r1(X1300,X1301) | ! [X1302] : (~r1(X1301,X1302) | ! [X1303] : (! [X1304] : (~r1(X1303,X1304) | ! [X1305] : (~r1(X1304,X1305) | ! [X1306] : (~r1(X1305,X1306) | ! [X1307] : (! [X1308] : (~r1(X1307,X1308) | ! [X1309] : (~r1(X1308,X1309) | ! [X1310] : (~r1(X1309,X1310) | ! [X1311] : (! [X1312] : (! [X1313] : (~r1(X1312,X1313) | ! [X1314] : (~r1(X1313,X1314) | ! [X1315] : (! [X1316] : (~r1(X1315,X1316) | ! [X1317] : (! [X1318] : (! [X1319] : (! [X1320] : (! [X1321] : (! [X1322] : (~r1(X1321,X1322) | ! [X1323] : (~r1(X1322,X1323) | ! [X1324] : (! [X1325] : (~r1(X1324,X1325) | ! [X1326] : (~r1(X1325,X1326) | ! [X1327] : (~r1(X1326,X1327) | ! [X1328] : (~((~p46(X1328) & ~p45(X1328)) | (p46(X1328) & p45(X1328))) | ~r1(X1327,X1328))))) | ~r1(X1323,X1324)))) | ~r1(X1320,X1321)) | ~r1(X1319,X1320)) | ~r1(X1318,X1319)) | ~r1(X1317,X1318)) | ~r1(X1316,X1317))) | ~r1(X1314,X1315)))) | ~r1(X1311,X1312)) | ~r1(X1310,X1311))))) | ~r1(X1306,X1307))))) | ~r1(X1302,X1303))))) | ~r1(X1298,X1299)) | ~r1(X1297,X1298))))) | ~r1(X1293,X1294))) | ~r1(X1291,X1292)))) | ~r1(X1288,X1289)) | ~r1(X1287,X1288)) | ~r1(X1286,X1287)) | ~r1(X1285,X1286))) | ~r1(X1283,X1284))))) | ~r1(X113,X115)) | ~! [X1329] : (! [X1330] : (~r1(X1329,X1330) | ! [X1331] : (~r1(X1330,X1331) | ! [X1332] : (~r1(X1331,X1332) | ! [X1333] : (! [X1334] : (~r1(X1333,X1334) | ! [X1335] : (~r1(X1334,X1335) | ! [X1336] : (~r1(X1335,X1336) | ! [X1337] : (~r1(X1336,X1337) | ! [X1338] : (~r1(X1337,X1338) | ! [X1339] : (~r1(X1338,X1339) | ! [X1340] : (! [X1341] : (~r1(X1340,X1341) | ! [X1342] : (! [X1343] : (~r1(X1342,X1343) | ! [X1344] : (! [X1345] : (! [X1346] : (~r1(X1345,X1346) | ! [X1347] : (~r1(X1346,X1347) | ! [X1348] : (! [X1349] : (~r1(X1348,X1349) | ! [X1350] : (! [X1351] : (! [X1352] : (~r1(X1351,X1352) | ! [X1353] : (~r1(X1352,X1353) | ! [X1354] : (! [X1355] : (~r1(X1354,X1355) | ! [X1356] : (! [X1357] : (~r1(X1356,X1357) | ! [X1358] : (~r1(X1357,X1358) | ! [X1359] : (! [X1360] : (! [X1361] : (! [X1362] : (~r1(X1361,X1362) | ! [X1363] : (! [X1364] : (~r1(X1363,X1364) | ! [X1365] : (! [X1366] : (~r1(X1365,X1366) | ! [X1367] : (~r1(X1366,X1367) | ! [X1368] : (~r1(X1367,X1368) | ! [X1369] : (! [X1370] : (~r1(X1369,X1370) | ! [X1371] : (~r1(X1370,X1371) | ! [X1372] : (~r1(X1371,X1372) | ! [X1373] : (~r1(X1372,X1373) | ! [X1374] : (~r1(X1373,X1374) | ! [X1375] : (~r1(X1374,X1375) | ! [X1376] : (~((p47(X1376) & p46(X1376)) | (~p46(X1376) & ~p47(X1376))) | ~r1(X1375,X1376)))))))) | ~r1(X1368,X1369))))) | ~r1(X1364,X1365))) | ~r1(X1362,X1363))) | ~r1(X1360,X1361)) | ~r1(X1359,X1360)) | ~r1(X1358,X1359)))) | ~r1(X1355,X1356))) | ~r1(X1353,X1354)))) | ~r1(X1350,X1351)) | ~r1(X1349,X1350))) | ~r1(X1347,X1348)))) | ~r1(X1344,X1345)) | ~r1(X1343,X1344))) | ~r1(X1341,X1342))) | ~r1(X1339,X1340)))))))) | ~r1(X1332,X1333))))) | ~r1(X113,X1329))) | ~r1(X112,X113)) | ! [X1377] : (p48(X1377) | ~r1(X112,X1377)) | ~! [X1378] : (! [X1379] : (! [X1380] : (! [X1381] : (~r1(X1380,X1381) | ! [X1382] : (~r1(X1381,X1382) | ! [X1383] : (! [X1384] : (~r1(X1383,X1384) | ! [X1385] : (! [X1386] : (~r1(X1385,X1386) | ! [X1387] : (~r1(X1386,X1387) | ! [X1388] : (! [X1389] : (~r1(X1388,X1389) | ! [X1390] : (~r1(X1389,X1390) | ! [X1391] : (~r1(X1390,X1391) | ! [X1392] : (! [X1393] : (! [X1394] : (~r1(X1393,X1394) | ! [X1395] : (! [X1396] : (! [X1397] : (~r1(X1396,X1397) | ! [X1398] : (! [X1399] : (~r1(X1398,X1399) | ! [X1400] : (! [X1401] : (~r1(X1400,X1401) | ! [X1402] : (~r1(X1401,X1402) | ! [X1403] : (! [X1404] : (~r1(X1403,X1404) | ! [X1405] : (! [X1406] : (! [X1407] : (~r1(X1406,X1407) | ! [X1408] : (! [X1409] : (~r1(X1408,X1409) | ! [X1410] : (! [X1411] : (! [X1412] : (! [X1413] : (~r1(X1412,X1413) | ! [X1414] : (~r1(X1413,X1414) | ! [X1415] : (! [X1416] : (! [X1417] : (! [X1418] : (~r1(X1417,X1418) | ! [X1419] : (~r1(X1418,X1419) | ! [X1420] : (~r1(X1419,X1420) | ! [X1421] : (~r1(X1420,X1421) | ! [X1422] : (! [X1423] : (! [X1424] : (! [X1425] : (~r1(X1424,X1425) | ! [X1426] : (~((~p47(X1426) & ~p48(X1426)) | (p48(X1426) & p47(X1426))) | ~r1(X1425,X1426))) | ~r1(X1423,X1424)) | ~r1(X1422,X1423)) | ~r1(X1421,X1422)))))) | ~r1(X1416,X1417)) | ~r1(X1415,X1416)) | ~r1(X1414,X1415)))) | ~r1(X1411,X1412)) | ~r1(X1410,X1411)) | ~r1(X1409,X1410))) | ~r1(X1407,X1408))) | ~r1(X1405,X1406)) | ~r1(X1404,X1405))) | ~r1(X1402,X1403)))) | ~r1(X1399,X1400))) | ~r1(X1397,X1398))) | ~r1(X1395,X1396)) | ~r1(X1394,X1395))) | ~r1(X1392,X1393)) | ~r1(X1391,X1392))))) | ~r1(X1387,X1388)))) | ~r1(X1384,X1385))) | ~r1(X1382,X1383)))) | ~r1(X1379,X1380)) | ~r1(X1378,X1379)) | ~r1(X112,X1378))) | ~r1(X111,X112)) | ! [X1427] : (p49(X1427) | ~r1(X111,X1427)) | ~! [X1428] : (! [X1429] : (! [X1430] : (~r1(X1429,X1430) | ! [X1431] : (~r1(X1430,X1431) | ! [X1432] : (~r1(X1431,X1432) | ! [X1433] : (! [X1434] : (~r1(X1433,X1434) | ! [X1435] : (~r1(X1434,X1435) | ! [X1436] : (! [X1437] : (~r1(X1436,X1437) | ! [X1438] : (~r1(X1437,X1438) | ! [X1439] : (~r1(X1438,X1439) | ! [X1440] : (~r1(X1439,X1440) | ! [X1441] : (! [X1442] : (~r1(X1441,X1442) | ! [X1443] : (~r1(X1442,X1443) | ! [X1444] : (~r1(X1443,X1444) | ! [X1445] : (~r1(X1444,X1445) | ! [X1446] : (! [X1447] : (~r1(X1446,X1447) | ! [X1448] : (~r1(X1447,X1448) | ! [X1449] : (~r1(X1448,X1449) | ! [X1450] : (! [X1451] : (! [X1452] : (~r1(X1451,X1452) | ! [X1453] : (! [X1454] : (~r1(X1453,X1454) | ! [X1455] : (~r1(X1454,X1455) | ! [X1456] : (~r1(X1455,X1456) | ! [X1457] : (~r1(X1456,X1457) | ! [X1458] : (! [X1459] : (! [X1460] : (! [X1461] : (~r1(X1460,X1461) | ! [X1462] : (! [X1463] : (! [X1464] : (! [X1465] : (! [X1466] : (~r1(X1465,X1466) | ! [X1467] : (~r1(X1466,X1467) | ! [X1468] : (~r1(X1467,X1468) | ! [X1469] : (~r1(X1468,X1469) | ! [X1470] : (! [X1471] : (! [X1472] : (~r1(X1471,X1472) | ! [X1473] : (! [X1474] : (! [X1475] : (! [X1476] : (! [X1477] : (~r1(X1476,X1477) | ~((p49(X1477) & p48(X1477)) | (~p49(X1477) & ~p48(X1477)))) | ~r1(X1475,X1476)) | ~r1(X1474,X1475)) | ~r1(X1473,X1474)) | ~r1(X1472,X1473))) | ~r1(X1470,X1471)) | ~r1(X1469,X1470)))))) | ~r1(X1464,X1465)) | ~r1(X1463,X1464)) | ~r1(X1462,X1463)) | ~r1(X1461,X1462))) | ~r1(X1459,X1460)) | ~r1(X1458,X1459)) | ~r1(X1457,X1458)))))) | ~r1(X1452,X1453))) | ~r1(X1450,X1451)) | ~r1(X1449,X1450))))) | ~r1(X1445,X1446)))))) | ~r1(X1440,X1441)))))) | ~r1(X1435,X1436)))) | ~r1(X1432,X1433))))) | ~r1(X1428,X1429)) | ~r1(X111,X1428))) | ~r1(X109,X111)) | ~! [X1478] : (~r1(X109,X1478) | ! [X1479] : (! [X1480] : (! [X1481] : (! [X1482] : (! [X1483] : (~r1(X1482,X1483) | ! [X1484] : (! [X1485] : (~r1(X1484,X1485) | ! [X1486] : (! [X1487] : (! [X1488] : (~r1(X1487,X1488) | ! [X1489] : (~r1(X1488,X1489) | ! [X1490] : (~r1(X1489,X1490) | ! [X1491] : (~r1(X1490,X1491) | ! [X1492] : (~r1(X1491,X1492) | ! [X1493] : (! [X1494] : (~r1(X1493,X1494) | ! [X1495] : (~r1(X1494,X1495) | ! [X1496] : (! [X1497] : (! [X1498] : (! [X1499] : (! [X1500] : (! [X1501] : (~r1(X1500,X1501) | ! [X1502] : (! [X1503] : (~r1(X1502,X1503) | ! [X1504] : (~r1(X1503,X1504) | ! [X1505] : (! [X1506] : (! [X1507] : (! [X1508] : (! [X1509] : (~r1(X1508,X1509) | ! [X1510] : (~r1(X1509,X1510) | ! [X1511] : (~r1(X1510,X1511) | ! [X1512] : (~r1(X1511,X1512) | ! [X1513] : (~r1(X1512,X1513) | ! [X1514] : (! [X1515] : (! [X1516] : (~r1(X1515,X1516) | ! [X1517] : (~r1(X1516,X1517) | ! [X1518] : (~r1(X1517,X1518) | ! [X1519] : (! [X1520] : (! [X1521] : (! [X1522] : (! [X1523] : (! [X1524] : (! [X1525] : (~r1(X1524,X1525) | ! [X1526] : (~r1(X1525,X1526) | ! [X1527] : (~r1(X1526,X1527) | ! [X1528] : (~((~p49(X1528) & ~p50(X1528)) | (p49(X1528) & p50(X1528))) | ~r1(X1527,X1528))))) | ~r1(X1523,X1524)) | ~r1(X1522,X1523)) | ~r1(X1521,X1522)) | ~r1(X1520,X1521)) | ~r1(X1519,X1520)) | ~r1(X1518,X1519))))) | ~r1(X1514,X1515)) | ~r1(X1513,X1514))))))) | ~r1(X1507,X1508)) | ~r1(X1506,X1507)) | ~r1(X1505,X1506)) | ~r1(X1504,X1505)))) | ~r1(X1501,X1502))) | ~r1(X1499,X1500)) | ~r1(X1498,X1499)) | ~r1(X1497,X1498)) | ~r1(X1496,X1497)) | ~r1(X1495,X1496)))) | ~r1(X1492,X1493))))))) | ~r1(X1486,X1487)) | ~r1(X1485,X1486))) | ~r1(X1483,X1484))) | ~r1(X1481,X1482)) | ~r1(X1480,X1481)) | ~r1(X1479,X1480)) | ~r1(X1478,X1479)))) | ~r1(X56,X109)) | ! [X1529] : (~r1(X56,X1529) | p51(X1529))) | ~r1(X1,X56))) | ~r1(X0,X1)) | ! [X1530] : (! [X1531] : (~r1(X1530,X1531) | ! [X1532] : (! [X1533] : (~r1(X1532,X1533) | ! [X1534] : (~r1(X1533,X1534) | ! [X1535] : (~r1(X1534,X1535) | ! [X1536] : (~r1(X1535,X1536) | ! [X1537] : (~r1(X1536,X1537) | ! [X1538] : (! [X1539] : (~r1(X1538,X1539) | ! [X1540] : (~r1(X1539,X1540) | ! [X1541] : (! [X1542] : (! [X1543] : (! [X1544] : (! [X1545] : (~r1(X1544,X1545) | ! [X1546] : (! [X1547] : (~r1(X1546,X1547) | ! [X1548] : (! [X1549] : (! [X1550] : (! [X1551] : (~r1(X1550,X1551) | ! [X1552] : (~r1(X1551,X1552) | ! [X1553] : (~r1(X1552,X1553) | ! [X1554] : (~r1(X1553,X1554) | ! [X1555] : (~r1(X1554,X1555) | ! [X1556] : (! [X1557] : (~r1(X1556,X1557) | ! [X1558] : (! [X1559] : (~r1(X1558,X1559) | ! [X1560] : (~r1(X1559,X1560) | ! [X1561] : (~r1(X1560,X1561) | ! [X1562] : (~r1(X1561,X1562) | ! [X1563] : (~r1(X1562,X1563) | ! [X1564] : (! [X1565] : (! [X1566] : (! [X1567] : (! [X1568] : (! [X1569] : (! [X1570] : (~r1(X1569,X1570) | ! [X1571] : (~r1(X1570,X1571) | ! [X1572] : (! [X1573] : (~r1(X1572,X1573) | ! [X1574] : (~r1(X1573,X1574) | ! [X1575] : (~r1(X1574,X1575) | ! [X1576] : (~r1(X1575,X1576) | ! [X1577] : (! [X1578] : (! [X1579] : (! [X1580] : (~r1(X1579,X1580) | ! [X1581] : (~r1(X1580,X1581) | (p50(X1581) & p49(X1581) & p48(X1581) & p45(X1581) & p41(X1581) & p38(X1581) & p36(X1581) & p35(X1581) & p34(X1581) & p32(X1581) & p31(X1581) & p29(X1581) & p26(X1581) & p25(X1581) & p23(X1581) & p21(X1581) & p18(X1581) & p12(X1581) & p8(X1581) & p6(X1581) & p5(X1581) & p1(X1581) & p2(X1581) & p3(X1581) & p4(X1581) & p7(X1581) & p9(X1581) & p10(X1581) & p11(X1581) & p13(X1581) & p14(X1581) & p15(X1581) & p16(X1581) & p17(X1581) & p19(X1581) & p20(X1581) & p22(X1581) & p24(X1581) & p27(X1581) & p28(X1581) & p30(X1581) & p33(X1581) & p37(X1581) & p39(X1581) & p40(X1581) & p42(X1581) & p43(X1581) & p44(X1581) & p46(X1581) & p47(X1581) & p51(X1581) & p52(X1581)))) | ~r1(X1578,X1579)) | ~r1(X1577,X1578)) | ~r1(X1576,X1577)))))) | ~r1(X1571,X1572)))) | ~r1(X1568,X1569)) | ~r1(X1567,X1568)) | ~r1(X1566,X1567)) | ~r1(X1565,X1566)) | ~r1(X1564,X1565)) | ~r1(X1563,X1564))))))) | ~r1(X1557,X1558))) | ~r1(X1555,X1556))))))) | ~r1(X1549,X1550)) | ~r1(X1548,X1549)) | ~r1(X1547,X1548))) | ~r1(X1545,X1546))) | ~r1(X1543,X1544)) | ~r1(X1542,X1543)) | ~r1(X1541,X1542)) | ~r1(X1540,X1541)))) | ~r1(X1537,X1538))))))) | ~r1(X1531,X1532))) | ~r1(X0,X1530)) | ! [X1582] : (~r1(X0,X1582) | p53(X1582)) | ! [X1583] : (~r1(X0,X1583) | ! [X1584] : (~r1(X1583,X1584) | ! [X1585] : (~r1(X1584,X1585) | ! [X1586] : (! [X1587] : (! [X1588] : (! [X1589] : (~r1(X1588,X1589) | ! [X1590] : (! [X1591] : (~r1(X1590,X1591) | ! [X1592] : (! [X1593] : (! [X1594] : (! [X1595] : (~r1(X1594,X1595) | ! [X1596] : (! [X1597] : (! [X1598] : (~r1(X1597,X1598) | ! [X1599] : (~r1(X1598,X1599) | ! [X1600] : (! [X1601] : (! [X1602] : (~r1(X1601,X1602) | ! [X1603] : (~r1(X1602,X1603) | ! [X1604] : (~r1(X1603,X1604) | ! [X1605] : (! [X1606] : (! [X1607] : (! [X1608] : (! [X1609] : (! [X1610] : (~r1(X1609,X1610) | ! [X1611] : (! [X1612] : (! [X1613] : (! [X1614] : (~r1(X1613,X1614) | ! [X1615] : (~r1(X1614,X1615) | ! [X1616] : (~r1(X1615,X1616) | ! [X1617] : (! [X1618] : (! [X1619] : (! [X1620] : (~r1(X1619,X1620) | ! [X1621] : (~r1(X1620,X1621) | ! [X1622] : (~r1(X1621,X1622) | ! [X1623] : (! [X1624] : (! [X1625] : (! [X1626] : (! [X1627] : (~r1(X1626,X1627) | ! [X1628] : (! [X1629] : (~r1(X1628,X1629) | ! [X1630] : (! [X1631] : (~r1(X1630,X1631) | ! [X1632] : (~r1(X1631,X1632) | ! [X1633] : (~r1(X1632,X1633) | ! [X1634] : ((~p98(X1634) & ~p96(X1634) & ~p94(X1634) & ~p92(X1634) & ~p90(X1634) & ~p88(X1634) & ~p80(X1634) & ~p78(X1634) & ~p76(X1634) & ~p74(X1634) & ~p72(X1634) & ~p70(X1634) & ~p68(X1634) & ~p62(X1634) & ~p60(X1634) & ~p58(X1634) & ~p56(X1634) & ~p54(X1634) & ~p52(X1634) & ~p48(X1634) & ~p46(X1634) & ~p42(X1634) & ~p38(X1634) & ~p28(X1634) & ~p26(X1634) & ~p24(X1634) & ~p22(X1634) & ~p20(X1634) & ~p18(X1634) & ~p14(X1634) & ~p8(X1634) & ~p6(X1634) & ~p4(X1634) & ~p2(X1634) & ~p10(X1634) & ~p12(X1634) & ~p16(X1634) & ~p30(X1634) & ~p32(X1634) & ~p34(X1634) & ~p36(X1634) & ~p40(X1634) & ~p44(X1634) & ~p50(X1634) & ~p64(X1634) & ~p66(X1634) & ~p82(X1634) & ~p84(X1634) & ~p86(X1634) & ~p100(X1634) & ~p102(X1634) & ~p104(X1634)) | ~r1(X1633,X1634))))) | ~r1(X1629,X1630))) | ~r1(X1627,X1628))) | ~r1(X1625,X1626)) | ~r1(X1624,X1625)) | ~r1(X1623,X1624)) | ~r1(X1622,X1623))))) | ~r1(X1618,X1619)) | ~r1(X1617,X1618)) | ~r1(X1616,X1617))))) | ~r1(X1612,X1613)) | ~r1(X1611,X1612)) | ~r1(X1610,X1611))) | ~r1(X1608,X1609)) | ~r1(X1607,X1608)) | ~r1(X1606,X1607)) | ~r1(X1605,X1606)) | ~r1(X1604,X1605))))) | ~r1(X1600,X1601)) | ~r1(X1599,X1600)))) | ~r1(X1596,X1597)) | ~r1(X1595,X1596))) | ~r1(X1593,X1594)) | ~r1(X1592,X1593)) | ~r1(X1591,X1592))) | ~r1(X1589,X1590))) | ~r1(X1587,X1588)) | ~r1(X1586,X1587)) | ~r1(X1585,X1586))))))), 23.28/23.17 inference(flattening,[],[f4])). 23.28/23.17 fof(f4,plain,( 23.28/23.17 ~~? [X0] : ~(~! [X1] : (~(~! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (! [X48] : (~r1(X47,X48) | ! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (~((p1(X54) & p51(X54)) | (~p1(X54) & ~p51(X54))) | ~r1(X53,X54)))) | ~r1(X50,X51))) | ~r1(X48,X49))) | ~r1(X46,X47)) | ~r1(X45,X46)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)))) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ! [X55] : (p52(X55) | ~r1(X1,X55)) | ~! [X56] : (~(~! [X57] : (! [X58] : (~r1(X57,X58) | ! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (~r1(X60,X61) | ! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (~r1(X70,X71) | ! [X72] : (! [X73] : (! [X74] : (! [X75] : (! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (~r1(X78,X79) | ! [X80] : (~r1(X79,X80) | ! [X81] : (! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (! [X87] : (! [X88] : (! [X89] : (! [X90] : (~r1(X89,X90) | ! [X91] : (~r1(X90,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (~r1(X96,X97) | ! [X98] : (~r1(X97,X98) | ! [X99] : (~r1(X98,X99) | ! [X100] : (~r1(X99,X100) | ! [X101] : (~r1(X100,X101) | ! [X102] : (! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (~r1(X106,X107) | ! [X108] : (~((~p51(X108) & ~p50(X108)) | (p50(X108) & p51(X108))) | ~r1(X107,X108))))) | ~r1(X103,X104)) | ~r1(X102,X103)) | ~r1(X101,X102))))))) | ~r1(X95,X96)) | ~r1(X94,X95))) | ~r1(X92,X93))))) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87)) | ~r1(X85,X86)) | ~r1(X84,X85))))) | ~r1(X80,X81)))))) | ~r1(X75,X76)) | ~r1(X74,X75)) | ~r1(X73,X74)) | ~r1(X72,X73)) | ~r1(X71,X72))))) | ~r1(X67,X68)))) | ~r1(X64,X65))) | ~r1(X62,X63)) | ~r1(X61,X62))) | ~r1(X59,X60)))) | ~r1(X56,X57)) | ~! [X109] : (~(! [X110] : (p50(X110) | ~r1(X109,X110)) | ~! [X111] : (~(~! [X112] : (~(~! [X113] : (~(! [X114] : (~r1(X113,X114) | p47(X114)) | ~! [X115] : (~(! [X116] : (p46(X116) | ~r1(X115,X116)) | ~! [X117] : (~(! [X118] : (p45(X118) | ~r1(X117,X118)) | ~! [X119] : (~(! [X120] : (~r1(X119,X120) | p44(X120)) | ~! [X121] : (~r1(X119,X121) | ~(! [X122] : (p43(X122) | ~r1(X121,X122)) | ~! [X123] : (~(~! [X124] : (~r1(X123,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (! [X130] : (! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (! [X134] : (~r1(X133,X134) | ! [X135] : (~r1(X134,X135) | ! [X136] : (! [X137] : (! [X138] : (! [X139] : (! [X140] : (~r1(X139,X140) | ! [X141] : (! [X142] : (! [X143] : (! [X144] : (! [X145] : (~r1(X144,X145) | ! [X146] : (! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (! [X165] : (! [X166] : (~r1(X165,X166) | ~((~p42(X166) & ~p41(X166)) | (p42(X166) & p41(X166)))) | ~r1(X164,X165)) | ~r1(X163,X164)) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160)) | ~r1(X158,X159)))) | ~r1(X155,X156)) | ~r1(X154,X155))))))) | ~r1(X148,X149)) | ~r1(X147,X148))) | ~r1(X145,X146))) | ~r1(X143,X144)) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141))) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137)) | ~r1(X135,X136)))) | ~r1(X132,X133)) | ~r1(X131,X132))) | ~r1(X129,X130)) | ~r1(X128,X129))))))) | ! [X167] : (p42(X167) | ~r1(X123,X167)) | ~! [X168] : (~r1(X123,X168) | ~(! [X169] : (p41(X169) | ~r1(X168,X169)) | ~! [X170] : (~r1(X168,X170) | ~(~! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (! [X174] : (! [X175] : (! [X176] : (! [X177] : (! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (! [X186] : (! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (~r1(X190,X191) | ! [X192] : (! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (~r1(X195,X196) | ! [X197] : (~r1(X196,X197) | ! [X198] : (! [X199] : (! [X200] : (~r1(X199,X200) | ! [X201] : (~r1(X200,X201) | ! [X202] : (! [X203] : (~r1(X202,X203) | ! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (~r1(X205,X206) | ! [X207] : (! [X208] : (~r1(X207,X208) | ! [X209] : (! [X210] : (~r1(X209,X210) | ! [X211] : (~r1(X210,X211) | ~((~p39(X211) & ~p40(X211)) | (p39(X211) & p40(X211))))) | ~r1(X208,X209))) | ~r1(X206,X207)))) | ~r1(X203,X204))) | ~r1(X201,X202)))) | ~r1(X198,X199)) | ~r1(X197,X198))))))) | ~r1(X191,X192))) | ~r1(X189,X190)))) | ~r1(X186,X187)) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184))) | ~r1(X181,X182)) | ~r1(X180,X181))) | ~r1(X178,X179)) | ~r1(X177,X178)) | ~r1(X176,X177)) | ~r1(X175,X176)) | ~r1(X174,X175)) | ~r1(X173,X174)) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~! [X212] : (~r1(X170,X212) | ~(~! [X213] : (~r1(X212,X213) | ~(~! [X214] : (~r1(X213,X214) | ~(~! [X215] : (! [X216] : (~r1(X215,X216) | ! [X217] : (~r1(X216,X217) | ! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (! [X221] : (! [X222] : (! [X223] : (~r1(X222,X223) | ! [X224] : (~r1(X223,X224) | ! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (~r1(X233,X234) | ! [X235] : (! [X236] : (~r1(X235,X236) | ! [X237] : (~r1(X236,X237) | ! [X238] : (~r1(X237,X238) | ! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~r1(X242,X243) | ! [X244] : (! [X245] : (! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (~r1(X251,X252) | ~((p36(X252) & p37(X252)) | (~p36(X252) & ~p37(X252))))) | ~r1(X249,X250))))) | ~r1(X245,X246)) | ~r1(X244,X245)) | ~r1(X243,X244)))))))))) | ~r1(X234,X235))))) | ~r1(X230,X231)))) | ~r1(X227,X228)) | ~r1(X226,X227)) | ~r1(X225,X226))))) | ~r1(X221,X222)) | ~r1(X220,X221)) | ~r1(X219,X220)) | ~r1(X218,X219))))) | ~r1(X214,X215)) | ! [X253] : (~r1(X214,X253) | p37(X253)) | ~! [X254] : (~r1(X214,X254) | ~(~! [X255] : (~(~! [X256] : (~(~! [X257] : (~r1(X256,X257) | ! [X258] : (! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (! [X263] : (~r1(X262,X263) | ! [X264] : (! [X265] : (~r1(X264,X265) | ! [X266] : (! [X267] : (! [X268] : (! [X269] : (~r1(X268,X269) | ! [X270] : (~r1(X269,X270) | ! [X271] : (~r1(X270,X271) | ! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (! [X280] : (~r1(X279,X280) | ! [X281] : (~r1(X280,X281) | ! [X282] : (! [X283] : (! [X284] : (~r1(X283,X284) | ! [X285] : (! [X286] : (! [X287] : (! [X288] : (! [X289] : (~r1(X288,X289) | ! [X290] : (~r1(X289,X290) | ! [X291] : (~((p34(X291) & p33(X291)) | (~p33(X291) & ~p34(X291))) | ~r1(X290,X291)))) | ~r1(X287,X288)) | ~r1(X286,X287)) | ~r1(X285,X286)) | ~r1(X284,X285))) | ~r1(X282,X283)) | ~r1(X281,X282)))) | ~r1(X278,X279)))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272))))) | ~r1(X267,X268)) | ~r1(X266,X267)) | ~r1(X265,X266))) | ~r1(X263,X264))) | ~r1(X261,X262)) | ~r1(X260,X261)))) | ~r1(X257,X258))) | ~! [X292] : (~(~! [X293] : (~r1(X292,X293) | ~(~! [X294] : (~r1(X293,X294) | ! [X295] : (! [X296] : (~r1(X295,X296) | ! [X297] : (! [X298] : (! [X299] : (~r1(X298,X299) | ! [X300] : (! [X301] : (! [X302] : (~r1(X301,X302) | ! [X303] : (~r1(X302,X303) | ! [X304] : (! [X305] : (~r1(X304,X305) | ! [X306] : (! [X307] : (~r1(X306,X307) | ! [X308] : (! [X309] : (! [X310] : (! [X311] : (! [X312] : (~r1(X311,X312) | ! [X313] : (~r1(X312,X313) | ! [X314] : (~r1(X313,X314) | ! [X315] : (! [X316] : (~r1(X315,X316) | ! [X317] : (! [X318] : (! [X319] : (! [X320] : (~r1(X319,X320) | ! [X321] : (! [X322] : (! [X323] : (~r1(X322,X323) | ! [X324] : (~r1(X323,X324) | ! [X325] : (~r1(X324,X325) | ! [X326] : (~r1(X325,X326) | ~((p31(X326) & p32(X326)) | (~p32(X326) & ~p31(X326))))))) | ~r1(X321,X322)) | ~r1(X320,X321))) | ~r1(X318,X319)) | ~r1(X317,X318)) | ~r1(X316,X317))) | ~r1(X314,X315))))) | ~r1(X310,X311)) | ~r1(X309,X310)) | ~r1(X308,X309)) | ~r1(X307,X308))) | ~r1(X305,X306))) | ~r1(X303,X304)))) | ~r1(X300,X301)) | ~r1(X299,X300))) | ~r1(X297,X298)) | ~r1(X296,X297))) | ~r1(X294,X295))) | ! [X327] : (p32(X327) | ~r1(X293,X327)) | ~! [X328] : (~(~! [X329] : (! [X330] : (! [X331] : (~r1(X330,X331) | ! [X332] : (! [X333] : (~r1(X332,X333) | ! [X334] : (~r1(X333,X334) | ! [X335] : (~r1(X334,X335) | ! [X336] : (~r1(X335,X336) | ! [X337] : (! [X338] : (~r1(X337,X338) | ! [X339] : (! [X340] : (~r1(X339,X340) | ! [X341] : (! [X342] : (~r1(X341,X342) | ! [X343] : (~r1(X342,X343) | ! [X344] : (! [X345] : (~r1(X344,X345) | ! [X346] : (! [X347] : (! [X348] : (! [X349] : (! [X350] : (! [X351] : (! [X352] : (! [X353] : (! [X354] : (~r1(X353,X354) | ! [X355] : (~r1(X354,X355) | ! [X356] : (~r1(X355,X356) | ! [X357] : (! [X358] : (~r1(X357,X358) | ! [X359] : (! [X360] : (~((p31(X360) & p30(X360)) | (~p30(X360) & ~p31(X360))) | ~r1(X359,X360)) | ~r1(X358,X359))) | ~r1(X356,X357))))) | ~r1(X352,X353)) | ~r1(X351,X352)) | ~r1(X350,X351)) | ~r1(X349,X350)) | ~r1(X348,X349)) | ~r1(X347,X348)) | ~r1(X346,X347)) | ~r1(X345,X346))) | ~r1(X343,X344)))) | ~r1(X340,X341))) | ~r1(X338,X339))) | ~r1(X336,X337)))))) | ~r1(X331,X332))) | ~r1(X329,X330)) | ~r1(X328,X329)) | ! [X361] : (~r1(X328,X361) | p31(X361)) | ~! [X362] : (~(! [X363] : (p30(X363) | ~r1(X362,X363)) | ~! [X364] : (~(~! [X365] : (! [X366] : (~r1(X365,X366) | ! [X367] : (! [X368] : (! [X369] : (! [X370] : (! [X371] : (! [X372] : (~r1(X371,X372) | ! [X373] : (~r1(X372,X373) | ! [X374] : (! [X375] : (~r1(X374,X375) | ! [X376] : (! [X377] : (~r1(X376,X377) | ! [X378] : (~r1(X377,X378) | ! [X379] : (! [X380] : (~r1(X379,X380) | ! [X381] : (! [X382] : (! [X383] : (~r1(X382,X383) | ! [X384] : (~r1(X383,X384) | ! [X385] : (~r1(X384,X385) | ! [X386] : (! [X387] : (! [X388] : (! [X389] : (~r1(X388,X389) | ! [X390] : (~r1(X389,X390) | ! [X391] : (! [X392] : (! [X393] : (! [X394] : (~((~p28(X394) & ~p29(X394)) | (p28(X394) & p29(X394))) | ~r1(X393,X394)) | ~r1(X392,X393)) | ~r1(X391,X392)) | ~r1(X390,X391)))) | ~r1(X387,X388)) | ~r1(X386,X387)) | ~r1(X385,X386))))) | ~r1(X381,X382)) | ~r1(X380,X381))) | ~r1(X378,X379)))) | ~r1(X375,X376))) | ~r1(X373,X374)))) | ~r1(X370,X371)) | ~r1(X369,X370)) | ~r1(X368,X369)) | ~r1(X367,X368)) | ~r1(X366,X367))) | ~r1(X364,X365)) | ~! [X395] : (~(~! [X396] : (~(! [X397] : (~r1(X396,X397) | p27(X397)) | ~! [X398] : (~r1(X396,X398) | ~(~! [X399] : (! [X400] : (~r1(X399,X400) | ! [X401] : (! [X402] : (! [X403] : (! [X404] : (! [X405] : (~r1(X404,X405) | ! [X406] : (~r1(X405,X406) | ! [X407] : (~r1(X406,X407) | ! [X408] : (~r1(X407,X408) | ! [X409] : (~r1(X408,X409) | ! [X410] : (~r1(X409,X410) | ! [X411] : (! [X412] : (~r1(X411,X412) | ! [X413] : (! [X414] : (~r1(X413,X414) | ! [X415] : (~r1(X414,X415) | ! [X416] : (~r1(X415,X416) | ! [X417] : (~r1(X416,X417) | ! [X418] : (! [X419] : (~r1(X418,X419) | ! [X420] : (! [X421] : (~r1(X420,X421) | ! [X422] : (! [X423] : (~r1(X422,X423) | ! [X424] : (~r1(X423,X424) | ! [X425] : (~r1(X424,X425) | ~((p25(X425) & p26(X425)) | (~p25(X425) & ~p26(X425)))))) | ~r1(X421,X422))) | ~r1(X419,X420))) | ~r1(X417,X418)))))) | ~r1(X412,X413))) | ~r1(X410,X411)))))))) | ~r1(X403,X404)) | ~r1(X402,X403)) | ~r1(X401,X402)) | ~r1(X400,X401))) | ~r1(X398,X399)) | ~! [X426] : (~(~! [X427] : (~(! [X428] : (~r1(X427,X428) | p24(X428)) | ~! [X429] : (~r1(X427,X429) | ~(! [X430] : (p23(X430) | ~r1(X429,X430)) | ~! [X431] : (~r1(X429,X431) | ~(~! [X432] : (! [X433] : (~r1(X432,X433) | ! [X434] : (~r1(X433,X434) | ! [X435] : (! [X436] : (~r1(X435,X436) | ! [X437] : (~r1(X436,X437) | ! [X438] : (~r1(X437,X438) | ! [X439] : (! [X440] : (~r1(X439,X440) | ! [X441] : (! [X442] : (! [X443] : (! [X444] : (! [X445] : (~r1(X444,X445) | ! [X446] : (~r1(X445,X446) | ! [X447] : (! [X448] : (~r1(X447,X448) | ! [X449] : (! [X450] : (~r1(X449,X450) | ! [X451] : (~r1(X450,X451) | ! [X452] : (! [X453] : (~r1(X452,X453) | ! [X454] : (~r1(X453,X454) | ~((p21(X454) & p22(X454)) | (~p21(X454) & ~p22(X454))))) | ~r1(X451,X452)))) | ~r1(X448,X449))) | ~r1(X446,X447)))) | ~r1(X443,X444)) | ~r1(X442,X443)) | ~r1(X441,X442)) | ~r1(X440,X441))) | ~r1(X438,X439))))) | ~r1(X434,X435)))) | ~r1(X431,X432)) | ~! [X455] : (~(! [X456] : (~r1(X455,X456) | p21(X456)) | ~! [X457] : (~(! [X458] : (~r1(X457,X458) | p20(X458)) | ~! [X459] : (~(! [X460] : (~r1(X459,X460) | p19(X460)) | ~! [X461] : (~(~! [X462] : (~r1(X461,X462) | ! [X463] : (~r1(X462,X463) | ! [X464] : (~r1(X463,X464) | ! [X465] : (! [X466] : (! [X467] : (! [X468] : (~r1(X467,X468) | ! [X469] : (! [X470] : (! [X471] : (~r1(X470,X471) | ! [X472] : (~r1(X471,X472) | ! [X473] : (! [X474] : (~r1(X473,X474) | ! [X475] : (! [X476] : (! [X477] : (! [X478] : (! [X479] : (~r1(X478,X479) | ! [X480] : (~r1(X479,X480) | ~((~p17(X480) & ~p18(X480)) | (p17(X480) & p18(X480))))) | ~r1(X477,X478)) | ~r1(X476,X477)) | ~r1(X475,X476)) | ~r1(X474,X475))) | ~r1(X472,X473)))) | ~r1(X469,X470)) | ~r1(X468,X469))) | ~r1(X466,X467)) | ~r1(X465,X466)) | ~r1(X464,X465))))) | ~! [X481] : (~r1(X461,X481) | ~(~! [X482] : (~r1(X481,X482) | ! [X483] : (! [X484] : (~r1(X483,X484) | ! [X485] : (! [X486] : (~r1(X485,X486) | ! [X487] : (~r1(X486,X487) | ! [X488] : (~r1(X487,X488) | ! [X489] : (~r1(X488,X489) | ! [X490] : (~r1(X489,X490) | ! [X491] : (~r1(X490,X491) | ! [X492] : (~r1(X491,X492) | ! [X493] : (! [X494] : (! [X495] : (~r1(X494,X495) | ! [X496] : (~r1(X495,X496) | ! [X497] : (~r1(X496,X497) | ! [X498] : (! [X499] : (~r1(X498,X499) | ~((~p17(X499) & ~p16(X499)) | (p16(X499) & p17(X499)))) | ~r1(X497,X498))))) | ~r1(X493,X494)) | ~r1(X492,X493))))))))) | ~r1(X484,X485))) | ~r1(X482,X483))) | ! [X500] : (p17(X500) | ~r1(X481,X500)) | ~! [X501] : (~r1(X481,X501) | ~(~! [X502] : (~r1(X501,X502) | ~(~! [X503] : (~r1(X502,X503) | ~(! [X504] : (~r1(X503,X504) | p14(X504)) | ~! [X505] : (~(! [X506] : (p13(X506) | ~r1(X505,X506)) | ~! [X507] : (~r1(X505,X507) | ~(~! [X508] : (~r1(X507,X508) | ! [X509] : (~r1(X508,X509) | ! [X510] : (! [X511] : (! [X512] : (! [X513] : (! [X514] : (~r1(X513,X514) | ! [X515] : (~r1(X514,X515) | ! [X516] : (! [X517] : (~r1(X516,X517) | ! [X518] : (~r1(X517,X518) | ! [X519] : (~r1(X518,X519) | ! [X520] : (~r1(X519,X520) | ~((~p12(X520) & ~p11(X520)) | (p12(X520) & p11(X520))))))) | ~r1(X515,X516)))) | ~r1(X512,X513)) | ~r1(X511,X512)) | ~r1(X510,X511)) | ~r1(X509,X510)))) | ! [X521] : (~r1(X507,X521) | p12(X521)) | ~! [X522] : (~r1(X507,X522) | ~(~! [X523] : (~(~! [X524] : (! [X525] : (! [X526] : (~r1(X525,X526) | ! [X527] : (~r1(X526,X527) | ! [X528] : (~r1(X527,X528) | ! [X529] : (~r1(X528,X529) | ! [X530] : (~r1(X529,X530) | ! [X531] : (! [X532] : (! [X533] : (! [X534] : (~r1(X533,X534) | ~((p10(X534) & p9(X534)) | (~p10(X534) & ~p9(X534)))) | ~r1(X532,X533)) | ~r1(X531,X532)) | ~r1(X530,X531))))))) | ~r1(X524,X525)) | ~r1(X523,X524)) | ! [X535] : (p10(X535) | ~r1(X523,X535)) | ~! [X536] : (~r1(X523,X536) | ~(! [X537] : (~r1(X536,X537) | p9(X537)) | ~! [X538] : (~r1(X536,X538) | ~(~! [X539] : (~r1(X538,X539) | ! [X540] : (! [X541] : (! [X542] : (! [X543] : (~r1(X542,X543) | ! [X544] : (! [X545] : (~r1(X544,X545) | ! [X546] : (! [X547] : (~((p7(X547) & p8(X547)) | (~p7(X547) & ~p8(X547))) | ~r1(X546,X547)) | ~r1(X545,X546))) | ~r1(X543,X544))) | ~r1(X541,X542)) | ~r1(X540,X541)) | ~r1(X539,X540))) | ~! [X548] : (~r1(X538,X548) | ~(~! [X549] : (! [X550] : (! [X551] : (~r1(X550,X551) | ! [X552] : (~r1(X551,X552) | ! [X553] : (~r1(X552,X553) | ! [X554] : (~r1(X553,X554) | ! [X555] : (! [X556] : (~((p7(X556) & p6(X556)) | (~p6(X556) & ~p7(X556))) | ~r1(X555,X556)) | ~r1(X554,X555)))))) | ~r1(X549,X550)) | ~r1(X548,X549)) | ! [X557] : (p7(X557) | ~r1(X548,X557)) | ~! [X558] : (~(~! [X559] : (~(~! [X560] : (~r1(X559,X560) | ~(~! [X561] : (! [X562] : (~r1(X561,X562) | ! [X563] : (~r1(X562,X563) | ! [X564] : (! [X565] : (~((p4(X565) & p3(X565)) | (~p4(X565) & ~p3(X565))) | ~r1(X564,X565)) | ~r1(X563,X564)))) | ~r1(X560,X561)) | ~! [X566] : (~(~! [X567] : (~r1(X566,X567) | ! [X568] : (! [X569] : (! [X570] : (~r1(X569,X570) | ~((~p2(X570) & ~p3(X570)) | (p2(X570) & p3(X570)))) | ~r1(X568,X569)) | ~r1(X567,X568))) | ~! [X571] : (~~! [X572] : (! [X573] : (~r1(X572,X573) | ! [X574] : (~r1(X573,X574) | ~((~p2(X574) & ~p1(X574)) | (p1(X574) & p2(X574))))) | ~r1(X571,X572)) | ~r1(X566,X571)) | ! [X575] : (p3(X575) | ~r1(X566,X575))) | ~r1(X560,X566)) | ! [X576] : (~r1(X560,X576) | p4(X576)))) | ! [X577] : (~r1(X559,X577) | p5(X577)) | ~! [X578] : (~r1(X559,X578) | ! [X579] : (! [X580] : (! [X581] : (~r1(X580,X581) | ! [X582] : (~r1(X581,X582) | ! [X583] : (~r1(X582,X583) | ~((~p4(X583) & ~p5(X583)) | (p5(X583) & p4(X583)))))) | ~r1(X579,X580)) | ~r1(X578,X579)))) | ~r1(X558,X559)) | ! [X584] : (p6(X584) | ~r1(X558,X584)) | ~! [X585] : (! [X586] : (~r1(X585,X586) | ! [X587] : (! [X588] : (! [X589] : (~r1(X588,X589) | ! [X590] : (~r1(X589,X590) | ! [X591] : (~r1(X590,X591) | ~((p5(X591) & p6(X591)) | (~p6(X591) & ~p5(X591)))))) | ~r1(X587,X588)) | ~r1(X586,X587))) | ~r1(X558,X585))) | ~r1(X548,X558)))) | ! [X592] : (~r1(X538,X592) | p8(X592)))) | ~! [X593] : (~r1(X536,X593) | ! [X594] : (~r1(X593,X594) | ! [X595] : (! [X596] : (! [X597] : (! [X598] : (! [X599] : (~r1(X598,X599) | ! [X600] : (! [X601] : (! [X602] : (~((~p8(X602) & ~p9(X602)) | (p9(X602) & p8(X602))) | ~r1(X601,X602)) | ~r1(X600,X601)) | ~r1(X599,X600))) | ~r1(X597,X598)) | ~r1(X596,X597)) | ~r1(X595,X596)) | ~r1(X594,X595))))))) | ~r1(X522,X523)) | ! [X603] : (~r1(X522,X603) | p11(X603)) | ~! [X604] : (~r1(X522,X604) | ! [X605] : (~r1(X604,X605) | ! [X606] : (~r1(X605,X606) | ! [X607] : (~r1(X606,X607) | ! [X608] : (~r1(X607,X608) | ! [X609] : (~r1(X608,X609) | ! [X610] : (~r1(X609,X610) | ! [X611] : (! [X612] : (! [X613] : (~r1(X612,X613) | ! [X614] : (! [X615] : (~r1(X614,X615) | ~((~p11(X615) & ~p10(X615)) | (p11(X615) & p10(X615)))) | ~r1(X613,X614))) | ~r1(X611,X612)) | ~r1(X610,X611))))))))))))) | ~! [X616] : (! [X617] : (! [X618] : (~r1(X617,X618) | ! [X619] : (! [X620] : (! [X621] : (! [X622] : (~r1(X621,X622) | ! [X623] : (! [X624] : (~r1(X623,X624) | ! [X625] : (~r1(X624,X625) | ! [X626] : (! [X627] : (! [X628] : (~r1(X627,X628) | ! [X629] : (~((~p13(X629) & ~p12(X629)) | (p13(X629) & p12(X629))) | ~r1(X628,X629))) | ~r1(X626,X627)) | ~r1(X625,X626)))) | ~r1(X622,X623))) | ~r1(X620,X621)) | ~r1(X619,X620)) | ~r1(X618,X619))) | ~r1(X616,X617)) | ~r1(X505,X616))) | ~r1(X503,X505)) | ~! [X630] : (~r1(X503,X630) | ! [X631] : (! [X632] : (~r1(X631,X632) | ! [X633] : (! [X634] : (~r1(X633,X634) | ! [X635] : (! [X636] : (! [X637] : (~r1(X636,X637) | ! [X638] : (~r1(X637,X638) | ! [X639] : (~r1(X638,X639) | ! [X640] : (~r1(X639,X640) | ! [X641] : (! [X642] : (~r1(X641,X642) | ! [X643] : (! [X644] : (~r1(X643,X644) | ~((~p14(X644) & ~p13(X644)) | (p14(X644) & p13(X644)))) | ~r1(X642,X643))) | ~r1(X640,X641)))))) | ~r1(X635,X636)) | ~r1(X634,X635))) | ~r1(X632,X633))) | ~r1(X630,X631))))) | ! [X645] : (p15(X645) | ~r1(X502,X645)) | ~! [X646] : (! [X647] : (! [X648] : (~r1(X647,X648) | ! [X649] : (! [X650] : (~r1(X649,X650) | ! [X651] : (~r1(X650,X651) | ! [X652] : (! [X653] : (! [X654] : (! [X655] : (~r1(X654,X655) | ! [X656] : (! [X657] : (~r1(X656,X657) | ! [X658] : (~r1(X657,X658) | ! [X659] : (! [X660] : (~r1(X659,X660) | ! [X661] : (~((p14(X661) & p15(X661)) | (~p14(X661) & ~p15(X661))) | ~r1(X660,X661))) | ~r1(X658,X659)))) | ~r1(X655,X656))) | ~r1(X653,X654)) | ~r1(X652,X653)) | ~r1(X651,X652)))) | ~r1(X648,X649))) | ~r1(X646,X647)) | ~r1(X502,X646)))) | ! [X662] : (p16(X662) | ~r1(X501,X662)) | ~! [X663] : (~r1(X501,X663) | ! [X664] : (! [X665] : (~r1(X664,X665) | ! [X666] : (! [X667] : (! [X668] : (! [X669] : (~r1(X668,X669) | ! [X670] : (! [X671] : (~r1(X670,X671) | ! [X672] : (! [X673] : (~r1(X672,X673) | ! [X674] : (! [X675] : (! [X676] : (! [X677] : (! [X678] : (~r1(X677,X678) | ! [X679] : (~r1(X678,X679) | ~((p15(X679) & p16(X679)) | (~p16(X679) & ~p15(X679))))) | ~r1(X676,X677)) | ~r1(X675,X676)) | ~r1(X674,X675)) | ~r1(X673,X674))) | ~r1(X671,X672))) | ~r1(X669,X670))) | ~r1(X667,X668)) | ~r1(X666,X667)) | ~r1(X665,X666))) | ~r1(X663,X664))))))) | ! [X680] : (p18(X680) | ~r1(X461,X680))) | ~r1(X459,X461)) | ~! [X681] : (! [X682] : (~r1(X681,X682) | ! [X683] : (! [X684] : (~r1(X683,X684) | ! [X685] : (~r1(X684,X685) | ! [X686] : (! [X687] : (~r1(X686,X687) | ! [X688] : (! [X689] : (~r1(X688,X689) | ! [X690] : (~r1(X689,X690) | ! [X691] : (~r1(X690,X691) | ! [X692] : (~r1(X691,X692) | ! [X693] : (! [X694] : (! [X695] : (! [X696] : (~r1(X695,X696) | ! [X697] : (! [X698] : (! [X699] : (~r1(X698,X699) | ! [X700] : (~((~p18(X700) & ~p19(X700)) | (p18(X700) & p19(X700))) | ~r1(X699,X700))) | ~r1(X697,X698)) | ~r1(X696,X697))) | ~r1(X694,X695)) | ~r1(X693,X694)) | ~r1(X692,X693)))))) | ~r1(X687,X688))) | ~r1(X685,X686)))) | ~r1(X682,X683))) | ~r1(X459,X681))) | ~r1(X457,X459)) | ~! [X701] : (! [X702] : (! [X703] : (~r1(X702,X703) | ! [X704] : (! [X705] : (! [X706] : (! [X707] : (! [X708] : (~r1(X707,X708) | ! [X709] : (! [X710] : (! [X711] : (! [X712] : (~r1(X711,X712) | ! [X713] : (~r1(X712,X713) | ! [X714] : (! [X715] : (~r1(X714,X715) | ! [X716] : (~r1(X715,X716) | ! [X717] : (~r1(X716,X717) | ! [X718] : (~r1(X717,X718) | ! [X719] : (~r1(X718,X719) | ! [X720] : (! [X721] : (~((p19(X721) & p20(X721)) | (~p19(X721) & ~p20(X721))) | ~r1(X720,X721)) | ~r1(X719,X720))))))) | ~r1(X713,X714)))) | ~r1(X710,X711)) | ~r1(X709,X710)) | ~r1(X708,X709))) | ~r1(X706,X707)) | ~r1(X705,X706)) | ~r1(X704,X705)) | ~r1(X703,X704))) | ~r1(X701,X702)) | ~r1(X457,X701))) | ~r1(X455,X457)) | ~! [X722] : (~r1(X455,X722) | ! [X723] : (~r1(X722,X723) | ! [X724] : (! [X725] : (~r1(X724,X725) | ! [X726] : (! [X727] : (~r1(X726,X727) | ! [X728] : (! [X729] : (! [X730] : (~r1(X729,X730) | ! [X731] : (! [X732] : (~r1(X731,X732) | ! [X733] : (! [X734] : (! [X735] : (~r1(X734,X735) | ! [X736] : (~r1(X735,X736) | ! [X737] : (! [X738] : (! [X739] : (~r1(X738,X739) | ! [X740] : (! [X741] : (~r1(X740,X741) | ! [X742] : (! [X743] : (~((p21(X743) & p20(X743)) | (~p20(X743) & ~p21(X743))) | ~r1(X742,X743)) | ~r1(X741,X742))) | ~r1(X739,X740))) | ~r1(X737,X738)) | ~r1(X736,X737)))) | ~r1(X733,X734)) | ~r1(X732,X733))) | ~r1(X730,X731))) | ~r1(X728,X729)) | ~r1(X727,X728))) | ~r1(X725,X726))) | ~r1(X723,X724))))) | ~r1(X431,X455)) | ! [X744] : (p22(X744) | ~r1(X431,X744)))) | ~! [X745] : (! [X746] : (! [X747] : (! [X748] : (! [X749] : (! [X750] : (! [X751] : (! [X752] : (~r1(X751,X752) | ! [X753] : (! [X754] : (! [X755] : (! [X756] : (! [X757] : (~r1(X756,X757) | ! [X758] : (! [X759] : (! [X760] : (! [X761] : (! [X762] : (! [X763] : (~r1(X762,X763) | ! [X764] : (~r1(X763,X764) | ! [X765] : (~r1(X764,X765) | ! [X766] : (~r1(X765,X766) | ! [X767] : (! [X768] : (~((p22(X768) & p23(X768)) | (~p22(X768) & ~p23(X768))) | ~r1(X767,X768)) | ~r1(X766,X767)))))) | ~r1(X761,X762)) | ~r1(X760,X761)) | ~r1(X759,X760)) | ~r1(X758,X759)) | ~r1(X757,X758))) | ~r1(X755,X756)) | ~r1(X754,X755)) | ~r1(X753,X754)) | ~r1(X752,X753))) | ~r1(X750,X751)) | ~r1(X749,X750)) | ~r1(X748,X749)) | ~r1(X747,X748)) | ~r1(X746,X747)) | ~r1(X745,X746)) | ~r1(X429,X745)))) | ~! [X769] : (! [X770] : (~r1(X769,X770) | ! [X771] : (! [X772] : (! [X773] : (! [X774] : (! [X775] : (! [X776] : (~r1(X775,X776) | ! [X777] : (~r1(X776,X777) | ! [X778] : (! [X779] : (! [X780] : (! [X781] : (! [X782] : (! [X783] : (! [X784] : (~r1(X783,X784) | ! [X785] : (! [X786] : (! [X787] : (~r1(X786,X787) | ! [X788] : (! [X789] : (~r1(X788,X789) | ! [X790] : (! [X791] : (~r1(X790,X791) | ! [X792] : (~r1(X791,X792) | ! [X793] : (~r1(X792,X793) | ~((~p23(X793) & ~p24(X793)) | (p24(X793) & p23(X793)))))) | ~r1(X789,X790))) | ~r1(X787,X788))) | ~r1(X785,X786)) | ~r1(X784,X785))) | ~r1(X782,X783)) | ~r1(X781,X782)) | ~r1(X780,X781)) | ~r1(X779,X780)) | ~r1(X778,X779)) | ~r1(X777,X778)))) | ~r1(X774,X775)) | ~r1(X773,X774)) | ~r1(X772,X773)) | ~r1(X771,X772)) | ~r1(X770,X771))) | ~r1(X427,X769))) | ~r1(X426,X427)) | ! [X794] : (p25(X794) | ~r1(X426,X794)) | ~! [X795] : (! [X796] : (~r1(X795,X796) | ! [X797] : (! [X798] : (~r1(X797,X798) | ! [X799] : (~r1(X798,X799) | ! [X800] : (~r1(X799,X800) | ! [X801] : (! [X802] : (~r1(X801,X802) | ! [X803] : (! [X804] : (~r1(X803,X804) | ! [X805] : (~r1(X804,X805) | ! [X806] : (~r1(X805,X806) | ! [X807] : (! [X808] : (! [X809] : (~r1(X808,X809) | ! [X810] : (! [X811] : (! [X812] : (! [X813] : (~r1(X812,X813) | ! [X814] : (~r1(X813,X814) | ! [X815] : (~r1(X814,X815) | ! [X816] : (~r1(X815,X816) | ! [X817] : (! [X818] : (~r1(X817,X818) | ! [X819] : (! [X820] : (~((p25(X820) & p24(X820)) | (~p25(X820) & ~p24(X820))) | ~r1(X819,X820)) | ~r1(X818,X819))) | ~r1(X816,X817)))))) | ~r1(X811,X812)) | ~r1(X810,X811)) | ~r1(X809,X810))) | ~r1(X807,X808)) | ~r1(X806,X807))))) | ~r1(X802,X803))) | ~r1(X800,X801))))) | ~r1(X796,X797))) | ~r1(X426,X795))) | ~r1(X398,X426)) | ! [X821] : (~r1(X398,X821) | p26(X821)))) | ~! [X822] : (! [X823] : (~r1(X822,X823) | ! [X824] : (~r1(X823,X824) | ! [X825] : (~r1(X824,X825) | ! [X826] : (~r1(X825,X826) | ! [X827] : (~r1(X826,X827) | ! [X828] : (! [X829] : (! [X830] : (! [X831] : (~r1(X830,X831) | ! [X832] : (~r1(X831,X832) | ! [X833] : (~r1(X832,X833) | ! [X834] : (! [X835] : (! [X836] : (~r1(X835,X836) | ! [X837] : (! [X838] : (! [X839] : (! [X840] : (~r1(X839,X840) | ! [X841] : (~r1(X840,X841) | ! [X842] : (~r1(X841,X842) | ! [X843] : (~r1(X842,X843) | ! [X844] : (! [X845] : (! [X846] : (! [X847] : (! [X848] : (! [X849] : (~r1(X848,X849) | ~((p26(X849) & p27(X849)) | (~p27(X849) & ~p26(X849)))) | ~r1(X847,X848)) | ~r1(X846,X847)) | ~r1(X845,X846)) | ~r1(X844,X845)) | ~r1(X843,X844)))))) | ~r1(X838,X839)) | ~r1(X837,X838)) | ~r1(X836,X837))) | ~r1(X834,X835)) | ~r1(X833,X834))))) | ~r1(X829,X830)) | ~r1(X828,X829)) | ~r1(X827,X828))))))) | ~r1(X396,X822))) | ~r1(X395,X396)) | ! [X850] : (p28(X850) | ~r1(X395,X850)) | ~! [X851] : (! [X852] : (! [X853] : (~r1(X852,X853) | ! [X854] : (! [X855] : (~r1(X854,X855) | ! [X856] : (~r1(X855,X856) | ! [X857] : (~r1(X856,X857) | ! [X858] : (! [X859] : (! [X860] : (~r1(X859,X860) | ! [X861] : (! [X862] : (! [X863] : (! [X864] : (~r1(X863,X864) | ! [X865] : (~r1(X864,X865) | ! [X866] : (~r1(X865,X866) | ! [X867] : (~r1(X866,X867) | ! [X868] : (! [X869] : (~r1(X868,X869) | ! [X870] : (! [X871] : (! [X872] : (~r1(X871,X872) | ! [X873] : (! [X874] : (~r1(X873,X874) | ! [X875] : (! [X876] : (! [X877] : (~r1(X876,X877) | ! [X878] : (! [X879] : (~((~p27(X879) & ~p28(X879)) | (p28(X879) & p27(X879))) | ~r1(X878,X879)) | ~r1(X877,X878))) | ~r1(X875,X876)) | ~r1(X874,X875))) | ~r1(X872,X873))) | ~r1(X870,X871)) | ~r1(X869,X870))) | ~r1(X867,X868)))))) | ~r1(X862,X863)) | ~r1(X861,X862)) | ~r1(X860,X861))) | ~r1(X858,X859)) | ~r1(X857,X858))))) | ~r1(X853,X854))) | ~r1(X851,X852)) | ~r1(X395,X851))) | ~r1(X364,X395)) | ! [X880] : (~r1(X364,X880) | p29(X880))) | ~r1(X362,X364)) | ~! [X881] : (! [X882] : (~r1(X881,X882) | ! [X883] : (! [X884] : (! [X885] : (! [X886] : (~r1(X885,X886) | ! [X887] : (~r1(X886,X887) | ! [X888] : (~r1(X887,X888) | ! [X889] : (~r1(X888,X889) | ! [X890] : (! [X891] : (~r1(X890,X891) | ! [X892] : (! [X893] : (! [X894] : (! [X895] : (~r1(X894,X895) | ! [X896] : (! [X897] : (~r1(X896,X897) | ! [X898] : (~r1(X897,X898) | ! [X899] : (~r1(X898,X899) | ! [X900] : (~r1(X899,X900) | ! [X901] : (! [X902] : (~r1(X901,X902) | ! [X903] : (! [X904] : (! [X905] : (~r1(X904,X905) | ! [X906] : (! [X907] : (! [X908] : (! [X909] : (! [X910] : (! [X911] : (~((p30(X911) & p29(X911)) | (~p29(X911) & ~p30(X911))) | ~r1(X910,X911)) | ~r1(X909,X910)) | ~r1(X908,X909)) | ~r1(X907,X908)) | ~r1(X906,X907)) | ~r1(X905,X906))) | ~r1(X903,X904)) | ~r1(X902,X903))) | ~r1(X900,X901)))))) | ~r1(X895,X896))) | ~r1(X893,X894)) | ~r1(X892,X893)) | ~r1(X891,X892))) | ~r1(X889,X890)))))) | ~r1(X884,X885)) | ~r1(X883,X884)) | ~r1(X882,X883))) | ~r1(X362,X881))) | ~r1(X328,X362))) | ~r1(X293,X328)))) | ! [X912] : (~r1(X292,X912) | p33(X912)) | ~! [X913] : (~r1(X292,X913) | ! [X914] : (~r1(X913,X914) | ! [X915] : (! [X916] : (~r1(X915,X916) | ! [X917] : (~r1(X916,X917) | ! [X918] : (~r1(X917,X918) | ! [X919] : (! [X920] : (~r1(X919,X920) | ! [X921] : (~r1(X920,X921) | ! [X922] : (! [X923] : (~r1(X922,X923) | ! [X924] : (~r1(X923,X924) | ! [X925] : (~r1(X924,X925) | ! [X926] : (! [X927] : (~r1(X926,X927) | ! [X928] : (~r1(X927,X928) | ! [X929] : (! [X930] : (! [X931] : (! [X932] : (! [X933] : (! [X934] : (! [X935] : (~r1(X934,X935) | ! [X936] : (~r1(X935,X936) | ! [X937] : (~r1(X936,X937) | ! [X938] : (! [X939] : (~r1(X938,X939) | ! [X940] : (! [X941] : (~r1(X940,X941) | ! [X942] : (~r1(X941,X942) | ! [X943] : (~r1(X942,X943) | ! [X944] : (! [X945] : (! [X946] : (~((~p33(X946) & ~p32(X946)) | (p32(X946) & p33(X946))) | ~r1(X945,X946)) | ~r1(X944,X945)) | ~r1(X943,X944))))) | ~r1(X939,X940))) | ~r1(X937,X938))))) | ~r1(X933,X934)) | ~r1(X932,X933)) | ~r1(X931,X932)) | ~r1(X930,X931)) | ~r1(X929,X930)) | ~r1(X928,X929)))) | ~r1(X925,X926))))) | ~r1(X921,X922)))) | ~r1(X918,X919))))) | ~r1(X914,X915))))) | ~r1(X256,X292)) | ! [X947] : (~r1(X256,X947) | p34(X947))) | ~r1(X255,X256)) | ! [X948] : (p35(X948) | ~r1(X255,X948)) | ~! [X949] : (~r1(X255,X949) | ! [X950] : (! [X951] : (~r1(X950,X951) | ! [X952] : (~r1(X951,X952) | ! [X953] : (~r1(X952,X953) | ! [X954] : (! [X955] : (! [X956] : (~r1(X955,X956) | ! [X957] : (! [X958] : (! [X959] : (~r1(X958,X959) | ! [X960] : (~r1(X959,X960) | ! [X961] : (! [X962] : (! [X963] : (! [X964] : (! [X965] : (~r1(X964,X965) | ! [X966] : (! [X967] : (! [X968] : (~r1(X967,X968) | ! [X969] : (! [X970] : (! [X971] : (~r1(X970,X971) | ! [X972] : (! [X973] : (~r1(X972,X973) | ! [X974] : (! [X975] : (! [X976] : (~r1(X975,X976) | ! [X977] : (! [X978] : (~r1(X977,X978) | ! [X979] : (~r1(X978,X979) | ! [X980] : (! [X981] : (~r1(X980,X981) | ! [X982] : (! [X983] : (~r1(X982,X983) | ! [X984] : (~r1(X983,X984) | ~((p34(X984) & p35(X984)) | (~p35(X984) & ~p34(X984))))) | ~r1(X981,X982))) | ~r1(X979,X980)))) | ~r1(X976,X977))) | ~r1(X974,X975)) | ~r1(X973,X974))) | ~r1(X971,X972))) | ~r1(X969,X970)) | ~r1(X968,X969))) | ~r1(X966,X967)) | ~r1(X965,X966))) | ~r1(X963,X964)) | ~r1(X962,X963)) | ~r1(X961,X962)) | ~r1(X960,X961)))) | ~r1(X957,X958)) | ~r1(X956,X957))) | ~r1(X954,X955)) | ~r1(X953,X954))))) | ~r1(X949,X950)))) | ~r1(X254,X255)) | ! [X985] : (~r1(X254,X985) | p36(X985)) | ~! [X986] : (! [X987] : (~r1(X986,X987) | ! [X988] : (~r1(X987,X988) | ! [X989] : (~r1(X988,X989) | ! [X990] : (~r1(X989,X990) | ! [X991] : (! [X992] : (! [X993] : (! [X994] : (~r1(X993,X994) | ! [X995] : (! [X996] : (~r1(X995,X996) | ! [X997] : (! [X998] : (~r1(X997,X998) | ! [X999] : (~r1(X998,X999) | ! [X1000] : (~r1(X999,X1000) | ! [X1001] : (! [X1002] : (! [X1003] : (~r1(X1002,X1003) | ! [X1004] : (! [X1005] : (! [X1006] : (~r1(X1005,X1006) | ! [X1007] : (~r1(X1006,X1007) | ! [X1008] : (~r1(X1007,X1008) | ! [X1009] : (! [X1010] : (! [X1011] : (~r1(X1010,X1011) | ! [X1012] : (~r1(X1011,X1012) | ! [X1013] : (~r1(X1012,X1013) | ! [X1014] : (! [X1015] : (~r1(X1014,X1015) | ! [X1016] : (~r1(X1015,X1016) | ! [X1017] : (! [X1018] : (! [X1019] : (~r1(X1018,X1019) | ! [X1020] : (~r1(X1019,X1020) | ! [X1021] : (! [X1022] : (~((p36(X1022) & p35(X1022)) | (~p35(X1022) & ~p36(X1022))) | ~r1(X1021,X1022)) | ~r1(X1020,X1021)))) | ~r1(X1017,X1018)) | ~r1(X1016,X1017)))) | ~r1(X1013,X1014))))) | ~r1(X1009,X1010)) | ~r1(X1008,X1009))))) | ~r1(X1004,X1005)) | ~r1(X1003,X1004))) | ~r1(X1001,X1002)) | ~r1(X1000,X1001))))) | ~r1(X996,X997))) | ~r1(X994,X995))) | ~r1(X992,X993)) | ~r1(X991,X992)) | ~r1(X990,X991)))))) | ~r1(X254,X986)))))) | ! [X1023] : (~r1(X213,X1023) | p38(X1023)) | ~! [X1024] : (~r1(X213,X1024) | ! [X1025] : (~r1(X1024,X1025) | ! [X1026] : (! [X1027] : (! [X1028] : (~r1(X1027,X1028) | ! [X1029] : (~r1(X1028,X1029) | ! [X1030] : (~r1(X1029,X1030) | ! [X1031] : (! [X1032] : (~r1(X1031,X1032) | ! [X1033] : (~r1(X1032,X1033) | ! [X1034] : (~r1(X1033,X1034) | ! [X1035] : (! [X1036] : (~r1(X1035,X1036) | ! [X1037] : (! [X1038] : (! [X1039] : (~r1(X1038,X1039) | ! [X1040] : (~r1(X1039,X1040) | ! [X1041] : (! [X1042] : (~r1(X1041,X1042) | ! [X1043] : (~r1(X1042,X1043) | ! [X1044] : (~r1(X1043,X1044) | ! [X1045] : (~r1(X1044,X1045) | ! [X1046] : (! [X1047] : (! [X1048] : (~r1(X1047,X1048) | ! [X1049] : (! [X1050] : (! [X1051] : (~r1(X1050,X1051) | ! [X1052] : (~r1(X1051,X1052) | ! [X1053] : (! [X1054] : (~r1(X1053,X1054) | ! [X1055] : (~r1(X1054,X1055) | ! [X1056] : (~r1(X1055,X1056) | ! [X1057] : (! [X1058] : (! [X1059] : (~r1(X1058,X1059) | ! [X1060] : (! [X1061] : (! [X1062] : (~r1(X1061,X1062) | ~((~p37(X1062) & ~p38(X1062)) | (p38(X1062) & p37(X1062)))) | ~r1(X1060,X1061)) | ~r1(X1059,X1060))) | ~r1(X1057,X1058)) | ~r1(X1056,X1057))))) | ~r1(X1052,X1053)))) | ~r1(X1049,X1050)) | ~r1(X1048,X1049))) | ~r1(X1046,X1047)) | ~r1(X1045,X1046)))))) | ~r1(X1040,X1041)))) | ~r1(X1037,X1038)) | ~r1(X1036,X1037))) | ~r1(X1034,X1035))))) | ~r1(X1030,X1031))))) | ~r1(X1026,X1027)) | ~r1(X1025,X1026)))))) | ! [X1063] : (~r1(X212,X1063) | p39(X1063)) | ~! [X1064] : (! [X1065] : (~r1(X1064,X1065) | ! [X1066] : (! [X1067] : (! [X1068] : (! [X1069] : (~r1(X1068,X1069) | ! [X1070] : (! [X1071] : (~r1(X1070,X1071) | ! [X1072] : (! [X1073] : (~r1(X1072,X1073) | ! [X1074] : (~r1(X1073,X1074) | ! [X1075] : (! [X1076] : (! [X1077] : (~r1(X1076,X1077) | ! [X1078] : (! [X1079] : (! [X1080] : (! [X1081] : (! [X1082] : (! [X1083] : (! [X1084] : (! [X1085] : (! [X1086] : (! [X1087] : (! [X1088] : (! [X1089] : (~r1(X1088,X1089) | ! [X1090] : (! [X1091] : (! [X1092] : (~r1(X1091,X1092) | ! [X1093] : (~r1(X1092,X1093) | ! [X1094] : (~r1(X1093,X1094) | ! [X1095] : (~r1(X1094,X1095) | ! [X1096] : (~r1(X1095,X1096) | ! [X1097] : (! [X1098] : (! [X1099] : (~r1(X1098,X1099) | ! [X1100] : (~r1(X1099,X1100) | ! [X1101] : (! [X1102] : (~r1(X1101,X1102) | ! [X1103] : (~((~p39(X1103) & ~p38(X1103)) | (p38(X1103) & p39(X1103))) | ~r1(X1102,X1103))) | ~r1(X1100,X1101)))) | ~r1(X1097,X1098)) | ~r1(X1096,X1097))))))) | ~r1(X1090,X1091)) | ~r1(X1089,X1090))) | ~r1(X1087,X1088)) | ~r1(X1086,X1087)) | ~r1(X1085,X1086)) | ~r1(X1084,X1085)) | ~r1(X1083,X1084)) | ~r1(X1082,X1083)) | ~r1(X1081,X1082)) | ~r1(X1080,X1081)) | ~r1(X1079,X1080)) | ~r1(X1078,X1079)) | ~r1(X1077,X1078))) | ~r1(X1075,X1076)) | ~r1(X1074,X1075)))) | ~r1(X1071,X1072))) | ~r1(X1069,X1070))) | ~r1(X1067,X1068)) | ~r1(X1066,X1067)) | ~r1(X1065,X1066))) | ~r1(X212,X1064)))) | ! [X1104] : (~r1(X170,X1104) | p40(X1104)))) | ~! [X1105] : (~r1(X168,X1105) | ! [X1106] : (~r1(X1105,X1106) | ! [X1107] : (~r1(X1106,X1107) | ! [X1108] : (~r1(X1107,X1108) | ! [X1109] : (~r1(X1108,X1109) | ! [X1110] : (~r1(X1109,X1110) | ! [X1111] : (! [X1112] : (~r1(X1111,X1112) | ! [X1113] : (! [X1114] : (~r1(X1113,X1114) | ! [X1115] : (~r1(X1114,X1115) | ! [X1116] : (~r1(X1115,X1116) | ! [X1117] : (! [X1118] : (! [X1119] : (~r1(X1118,X1119) | ! [X1120] : (~r1(X1119,X1120) | ! [X1121] : (~r1(X1120,X1121) | ! [X1122] : (~r1(X1121,X1122) | ! [X1123] : (! [X1124] : (! [X1125] : (! [X1126] : (~r1(X1125,X1126) | ! [X1127] : (! [X1128] : (! [X1129] : (~r1(X1128,X1129) | ! [X1130] : (~r1(X1129,X1130) | ! [X1131] : (! [X1132] : (~r1(X1131,X1132) | ! [X1133] : (! [X1134] : (! [X1135] : (~r1(X1134,X1135) | ! [X1136] : (! [X1137] : (! [X1138] : (! [X1139] : (~r1(X1138,X1139) | ! [X1140] : (! [X1141] : (! [X1142] : (~r1(X1141,X1142) | ! [X1143] : (! [X1144] : (~r1(X1143,X1144) | ! [X1145] : (~r1(X1144,X1145) | ! [X1146] : (~((~p40(X1146) & ~p41(X1146)) | (p41(X1146) & p40(X1146))) | ~r1(X1145,X1146)))) | ~r1(X1142,X1143))) | ~r1(X1140,X1141)) | ~r1(X1139,X1140))) | ~r1(X1137,X1138)) | ~r1(X1136,X1137)) | ~r1(X1135,X1136))) | ~r1(X1133,X1134)) | ~r1(X1132,X1133))) | ~r1(X1130,X1131)))) | ~r1(X1127,X1128)) | ~r1(X1126,X1127))) | ~r1(X1124,X1125)) | ~r1(X1123,X1124)) | ~r1(X1122,X1123)))))) | ~r1(X1117,X1118)) | ~r1(X1116,X1117))))) | ~r1(X1112,X1113))) | ~r1(X1110,X1111))))))))))) | ~r1(X121,X123)) | ~! [X1147] : (~r1(X121,X1147) | ! [X1148] : (! [X1149] : (~r1(X1148,X1149) | ! [X1150] : (! [X1151] : (! [X1152] : (~r1(X1151,X1152) | ! [X1153] : (! [X1154] : (! [X1155] : (~r1(X1154,X1155) | ! [X1156] : (! [X1157] : (! [X1158] : (~r1(X1157,X1158) | ! [X1159] : (~r1(X1158,X1159) | ! [X1160] : (~r1(X1159,X1160) | ! [X1161] : (! [X1162] : (~r1(X1161,X1162) | ! [X1163] : (~r1(X1162,X1163) | ! [X1164] : (~r1(X1163,X1164) | ! [X1165] : (~r1(X1164,X1165) | ! [X1166] : (! [X1167] : (~r1(X1166,X1167) | ! [X1168] : (! [X1169] : (~r1(X1168,X1169) | ! [X1170] : (~r1(X1169,X1170) | ! [X1171] : (! [X1172] : (~r1(X1171,X1172) | ! [X1173] : (! [X1174] : (~r1(X1173,X1174) | ! [X1175] : (! [X1176] : (! [X1177] : (~r1(X1176,X1177) | ! [X1178] : (~r1(X1177,X1178) | ! [X1179] : (~r1(X1178,X1179) | ! [X1180] : (! [X1181] : (! [X1182] : (! [X1183] : (! [X1184] : (~r1(X1183,X1184) | ! [X1185] : (! [X1186] : (~r1(X1185,X1186) | ! [X1187] : (~r1(X1186,X1187) | ! [X1188] : (! [X1189] : (~r1(X1188,X1189) | ! [X1190] : (~r1(X1189,X1190) | ~((p43(X1190) & p42(X1190)) | (~p43(X1190) & ~p42(X1190))))) | ~r1(X1187,X1188)))) | ~r1(X1184,X1185))) | ~r1(X1182,X1183)) | ~r1(X1181,X1182)) | ~r1(X1180,X1181)) | ~r1(X1179,X1180))))) | ~r1(X1175,X1176)) | ~r1(X1174,X1175))) | ~r1(X1172,X1173))) | ~r1(X1170,X1171)))) | ~r1(X1167,X1168))) | ~r1(X1165,X1166)))))) | ~r1(X1160,X1161))))) | ~r1(X1156,X1157)) | ~r1(X1155,X1156))) | ~r1(X1153,X1154)) | ~r1(X1152,X1153))) | ~r1(X1150,X1151)) | ~r1(X1149,X1150))) | ~r1(X1147,X1148))))) | ~! [X1191] : (~r1(X119,X1191) | ! [X1192] : (~r1(X1191,X1192) | ! [X1193] : (~r1(X1192,X1193) | ! [X1194] : (! [X1195] : (~r1(X1194,X1195) | ! [X1196] : (! [X1197] : (~r1(X1196,X1197) | ! [X1198] : (~r1(X1197,X1198) | ! [X1199] : (! [X1200] : (! [X1201] : (~r1(X1200,X1201) | ! [X1202] : (~r1(X1201,X1202) | ! [X1203] : (~r1(X1202,X1203) | ! [X1204] : (~r1(X1203,X1204) | ! [X1205] : (~r1(X1204,X1205) | ! [X1206] : (~r1(X1205,X1206) | ! [X1207] : (! [X1208] : (! [X1209] : (! [X1210] : (! [X1211] : (! [X1212] : (~r1(X1211,X1212) | ! [X1213] : (! [X1214] : (! [X1215] : (! [X1216] : (~r1(X1215,X1216) | ! [X1217] : (~r1(X1216,X1217) | ! [X1218] : (~r1(X1217,X1218) | ! [X1219] : (! [X1220] : (~r1(X1219,X1220) | ! [X1221] : (! [X1222] : (~r1(X1221,X1222) | ! [X1223] : (~r1(X1222,X1223) | ! [X1224] : (! [X1225] : (~r1(X1224,X1225) | ! [X1226] : (! [X1227] : (! [X1228] : (~r1(X1227,X1228) | ! [X1229] : (! [X1230] : (~r1(X1229,X1230) | ! [X1231] : (~r1(X1230,X1231) | ! [X1232] : (! [X1233] : (! [X1234] : (! [X1235] : (~r1(X1234,X1235) | ~((p43(X1235) & p44(X1235)) | (~p43(X1235) & ~p44(X1235)))) | ~r1(X1233,X1234)) | ~r1(X1232,X1233)) | ~r1(X1231,X1232)))) | ~r1(X1228,X1229))) | ~r1(X1226,X1227)) | ~r1(X1225,X1226))) | ~r1(X1223,X1224)))) | ~r1(X1220,X1221))) | ~r1(X1218,X1219))))) | ~r1(X1214,X1215)) | ~r1(X1213,X1214)) | ~r1(X1212,X1213))) | ~r1(X1210,X1211)) | ~r1(X1209,X1210)) | ~r1(X1208,X1209)) | ~r1(X1207,X1208)) | ~r1(X1206,X1207)))))))) | ~r1(X1199,X1200)) | ~r1(X1198,X1199)))) | ~r1(X1195,X1196))) | ~r1(X1193,X1194)))))) | ~r1(X117,X119)) | ~! [X1236] : (~r1(X117,X1236) | ! [X1237] : (! [X1238] : (! [X1239] : (~r1(X1238,X1239) | ! [X1240] : (~r1(X1239,X1240) | ! [X1241] : (~r1(X1240,X1241) | ! [X1242] : (~r1(X1241,X1242) | ! [X1243] : (~r1(X1242,X1243) | ! [X1244] : (~r1(X1243,X1244) | ! [X1245] : (~r1(X1244,X1245) | ! [X1246] : (! [X1247] : (! [X1248] : (~r1(X1247,X1248) | ! [X1249] : (! [X1250] : (~r1(X1249,X1250) | ! [X1251] : (! [X1252] : (! [X1253] : (! [X1254] : (~r1(X1253,X1254) | ! [X1255] : (! [X1256] : (! [X1257] : (! [X1258] : (~r1(X1257,X1258) | ! [X1259] : (! [X1260] : (! [X1261] : (~r1(X1260,X1261) | ! [X1262] : (! [X1263] : (! [X1264] : (~r1(X1263,X1264) | ! [X1265] : (~r1(X1264,X1265) | ! [X1266] : (! [X1267] : (! [X1268] : (~r1(X1267,X1268) | ! [X1269] : (~r1(X1268,X1269) | ! [X1270] : (~r1(X1269,X1270) | ! [X1271] : (~r1(X1270,X1271) | ! [X1272] : (~r1(X1271,X1272) | ! [X1273] : (! [X1274] : (~r1(X1273,X1274) | ! [X1275] : (~r1(X1274,X1275) | ! [X1276] : (~r1(X1275,X1276) | ! [X1277] : (! [X1278] : (! [X1279] : (~r1(X1278,X1279) | ! [X1280] : (! [X1281] : (~r1(X1280,X1281) | ~((~p45(X1281) & ~p44(X1281)) | (p44(X1281) & p45(X1281)))) | ~r1(X1279,X1280))) | ~r1(X1277,X1278)) | ~r1(X1276,X1277))))) | ~r1(X1272,X1273))))))) | ~r1(X1266,X1267)) | ~r1(X1265,X1266)))) | ~r1(X1262,X1263)) | ~r1(X1261,X1262))) | ~r1(X1259,X1260)) | ~r1(X1258,X1259))) | ~r1(X1256,X1257)) | ~r1(X1255,X1256)) | ~r1(X1254,X1255))) | ~r1(X1252,X1253)) | ~r1(X1251,X1252)) | ~r1(X1250,X1251))) | ~r1(X1248,X1249))) | ~r1(X1246,X1247)) | ~r1(X1245,X1246))))))))) | ~r1(X1237,X1238)) | ~r1(X1236,X1237)))) | ~r1(X115,X117)) | ~! [X1282] : (~r1(X115,X1282) | ! [X1283] : (~r1(X1282,X1283) | ! [X1284] : (! [X1285] : (~r1(X1284,X1285) | ! [X1286] : (! [X1287] : (! [X1288] : (! [X1289] : (! [X1290] : (~r1(X1289,X1290) | ! [X1291] : (~r1(X1290,X1291) | ! [X1292] : (! [X1293] : (~r1(X1292,X1293) | ! [X1294] : (! [X1295] : (~r1(X1294,X1295) | ! [X1296] : (~r1(X1295,X1296) | ! [X1297] : (~r1(X1296,X1297) | ! [X1298] : (! [X1299] : (! [X1300] : (~r1(X1299,X1300) | ! [X1301] : (~r1(X1300,X1301) | ! [X1302] : (~r1(X1301,X1302) | ! [X1303] : (! [X1304] : (~r1(X1303,X1304) | ! [X1305] : (~r1(X1304,X1305) | ! [X1306] : (~r1(X1305,X1306) | ! [X1307] : (! [X1308] : (~r1(X1307,X1308) | ! [X1309] : (~r1(X1308,X1309) | ! [X1310] : (~r1(X1309,X1310) | ! [X1311] : (! [X1312] : (! [X1313] : (~r1(X1312,X1313) | ! [X1314] : (~r1(X1313,X1314) | ! [X1315] : (! [X1316] : (~r1(X1315,X1316) | ! [X1317] : (! [X1318] : (! [X1319] : (! [X1320] : (! [X1321] : (! [X1322] : (~r1(X1321,X1322) | ! [X1323] : (~r1(X1322,X1323) | ! [X1324] : (! [X1325] : (~r1(X1324,X1325) | ! [X1326] : (~r1(X1325,X1326) | ! [X1327] : (~r1(X1326,X1327) | ! [X1328] : (~((~p46(X1328) & ~p45(X1328)) | (p46(X1328) & p45(X1328))) | ~r1(X1327,X1328))))) | ~r1(X1323,X1324)))) | ~r1(X1320,X1321)) | ~r1(X1319,X1320)) | ~r1(X1318,X1319)) | ~r1(X1317,X1318)) | ~r1(X1316,X1317))) | ~r1(X1314,X1315)))) | ~r1(X1311,X1312)) | ~r1(X1310,X1311))))) | ~r1(X1306,X1307))))) | ~r1(X1302,X1303))))) | ~r1(X1298,X1299)) | ~r1(X1297,X1298))))) | ~r1(X1293,X1294))) | ~r1(X1291,X1292)))) | ~r1(X1288,X1289)) | ~r1(X1287,X1288)) | ~r1(X1286,X1287)) | ~r1(X1285,X1286))) | ~r1(X1283,X1284))))) | ~r1(X113,X115)) | ~! [X1329] : (! [X1330] : (~r1(X1329,X1330) | ! [X1331] : (~r1(X1330,X1331) | ! [X1332] : (~r1(X1331,X1332) | ! [X1333] : (! [X1334] : (~r1(X1333,X1334) | ! [X1335] : (~r1(X1334,X1335) | ! [X1336] : (~r1(X1335,X1336) | ! [X1337] : (~r1(X1336,X1337) | ! [X1338] : (~r1(X1337,X1338) | ! [X1339] : (~r1(X1338,X1339) | ! [X1340] : (! [X1341] : (~r1(X1340,X1341) | ! [X1342] : (! [X1343] : (~r1(X1342,X1343) | ! [X1344] : (! [X1345] : (! [X1346] : (~r1(X1345,X1346) | ! [X1347] : (~r1(X1346,X1347) | ! [X1348] : (! [X1349] : (~r1(X1348,X1349) | ! [X1350] : (! [X1351] : (! [X1352] : (~r1(X1351,X1352) | ! [X1353] : (~r1(X1352,X1353) | ! [X1354] : (! [X1355] : (~r1(X1354,X1355) | ! [X1356] : (! [X1357] : (~r1(X1356,X1357) | ! [X1358] : (~r1(X1357,X1358) | ! [X1359] : (! [X1360] : (! [X1361] : (! [X1362] : (~r1(X1361,X1362) | ! [X1363] : (! [X1364] : (~r1(X1363,X1364) | ! [X1365] : (! [X1366] : (~r1(X1365,X1366) | ! [X1367] : (~r1(X1366,X1367) | ! [X1368] : (~r1(X1367,X1368) | ! [X1369] : (! [X1370] : (~r1(X1369,X1370) | ! [X1371] : (~r1(X1370,X1371) | ! [X1372] : (~r1(X1371,X1372) | ! [X1373] : (~r1(X1372,X1373) | ! [X1374] : (~r1(X1373,X1374) | ! [X1375] : (~r1(X1374,X1375) | ! [X1376] : (~((p47(X1376) & p46(X1376)) | (~p46(X1376) & ~p47(X1376))) | ~r1(X1375,X1376)))))))) | ~r1(X1368,X1369))))) | ~r1(X1364,X1365))) | ~r1(X1362,X1363))) | ~r1(X1360,X1361)) | ~r1(X1359,X1360)) | ~r1(X1358,X1359)))) | ~r1(X1355,X1356))) | ~r1(X1353,X1354)))) | ~r1(X1350,X1351)) | ~r1(X1349,X1350))) | ~r1(X1347,X1348)))) | ~r1(X1344,X1345)) | ~r1(X1343,X1344))) | ~r1(X1341,X1342))) | ~r1(X1339,X1340)))))))) | ~r1(X1332,X1333))))) | ~r1(X113,X1329))) | ~r1(X112,X113)) | ! [X1377] : (p48(X1377) | ~r1(X112,X1377)) | ~! [X1378] : (! [X1379] : (! [X1380] : (! [X1381] : (~r1(X1380,X1381) | ! [X1382] : (~r1(X1381,X1382) | ! [X1383] : (! [X1384] : (~r1(X1383,X1384) | ! [X1385] : (! [X1386] : (~r1(X1385,X1386) | ! [X1387] : (~r1(X1386,X1387) | ! [X1388] : (! [X1389] : (~r1(X1388,X1389) | ! [X1390] : (~r1(X1389,X1390) | ! [X1391] : (~r1(X1390,X1391) | ! [X1392] : (! [X1393] : (! [X1394] : (~r1(X1393,X1394) | ! [X1395] : (! [X1396] : (! [X1397] : (~r1(X1396,X1397) | ! [X1398] : (! [X1399] : (~r1(X1398,X1399) | ! [X1400] : (! [X1401] : (~r1(X1400,X1401) | ! [X1402] : (~r1(X1401,X1402) | ! [X1403] : (! [X1404] : (~r1(X1403,X1404) | ! [X1405] : (! [X1406] : (! [X1407] : (~r1(X1406,X1407) | ! [X1408] : (! [X1409] : (~r1(X1408,X1409) | ! [X1410] : (! [X1411] : (! [X1412] : (! [X1413] : (~r1(X1412,X1413) | ! [X1414] : (~r1(X1413,X1414) | ! [X1415] : (! [X1416] : (! [X1417] : (! [X1418] : (~r1(X1417,X1418) | ! [X1419] : (~r1(X1418,X1419) | ! [X1420] : (~r1(X1419,X1420) | ! [X1421] : (~r1(X1420,X1421) | ! [X1422] : (! [X1423] : (! [X1424] : (! [X1425] : (~r1(X1424,X1425) | ! [X1426] : (~((~p47(X1426) & ~p48(X1426)) | (p48(X1426) & p47(X1426))) | ~r1(X1425,X1426))) | ~r1(X1423,X1424)) | ~r1(X1422,X1423)) | ~r1(X1421,X1422)))))) | ~r1(X1416,X1417)) | ~r1(X1415,X1416)) | ~r1(X1414,X1415)))) | ~r1(X1411,X1412)) | ~r1(X1410,X1411)) | ~r1(X1409,X1410))) | ~r1(X1407,X1408))) | ~r1(X1405,X1406)) | ~r1(X1404,X1405))) | ~r1(X1402,X1403)))) | ~r1(X1399,X1400))) | ~r1(X1397,X1398))) | ~r1(X1395,X1396)) | ~r1(X1394,X1395))) | ~r1(X1392,X1393)) | ~r1(X1391,X1392))))) | ~r1(X1387,X1388)))) | ~r1(X1384,X1385))) | ~r1(X1382,X1383)))) | ~r1(X1379,X1380)) | ~r1(X1378,X1379)) | ~r1(X112,X1378))) | ~r1(X111,X112)) | ! [X1427] : (p49(X1427) | ~r1(X111,X1427)) | ~! [X1428] : (! [X1429] : (! [X1430] : (~r1(X1429,X1430) | ! [X1431] : (~r1(X1430,X1431) | ! [X1432] : (~r1(X1431,X1432) | ! [X1433] : (! [X1434] : (~r1(X1433,X1434) | ! [X1435] : (~r1(X1434,X1435) | ! [X1436] : (! [X1437] : (~r1(X1436,X1437) | ! [X1438] : (~r1(X1437,X1438) | ! [X1439] : (~r1(X1438,X1439) | ! [X1440] : (~r1(X1439,X1440) | ! [X1441] : (! [X1442] : (~r1(X1441,X1442) | ! [X1443] : (~r1(X1442,X1443) | ! [X1444] : (~r1(X1443,X1444) | ! [X1445] : (~r1(X1444,X1445) | ! [X1446] : (! [X1447] : (~r1(X1446,X1447) | ! [X1448] : (~r1(X1447,X1448) | ! [X1449] : (~r1(X1448,X1449) | ! [X1450] : (! [X1451] : (! [X1452] : (~r1(X1451,X1452) | ! [X1453] : (! [X1454] : (~r1(X1453,X1454) | ! [X1455] : (~r1(X1454,X1455) | ! [X1456] : (~r1(X1455,X1456) | ! [X1457] : (~r1(X1456,X1457) | ! [X1458] : (! [X1459] : (! [X1460] : (! [X1461] : (~r1(X1460,X1461) | ! [X1462] : (! [X1463] : (! [X1464] : (! [X1465] : (! [X1466] : (~r1(X1465,X1466) | ! [X1467] : (~r1(X1466,X1467) | ! [X1468] : (~r1(X1467,X1468) | ! [X1469] : (~r1(X1468,X1469) | ! [X1470] : (! [X1471] : (! [X1472] : (~r1(X1471,X1472) | ! [X1473] : (! [X1474] : (! [X1475] : (! [X1476] : (! [X1477] : (~r1(X1476,X1477) | ~((p49(X1477) & p48(X1477)) | (~p49(X1477) & ~p48(X1477)))) | ~r1(X1475,X1476)) | ~r1(X1474,X1475)) | ~r1(X1473,X1474)) | ~r1(X1472,X1473))) | ~r1(X1470,X1471)) | ~r1(X1469,X1470)))))) | ~r1(X1464,X1465)) | ~r1(X1463,X1464)) | ~r1(X1462,X1463)) | ~r1(X1461,X1462))) | ~r1(X1459,X1460)) | ~r1(X1458,X1459)) | ~r1(X1457,X1458)))))) | ~r1(X1452,X1453))) | ~r1(X1450,X1451)) | ~r1(X1449,X1450))))) | ~r1(X1445,X1446)))))) | ~r1(X1440,X1441)))))) | ~r1(X1435,X1436)))) | ~r1(X1432,X1433))))) | ~r1(X1428,X1429)) | ~r1(X111,X1428))) | ~r1(X109,X111)) | ~! [X1478] : (~r1(X109,X1478) | ! [X1479] : (! [X1480] : (! [X1481] : (! [X1482] : (! [X1483] : (~r1(X1482,X1483) | ! [X1484] : (! [X1485] : (~r1(X1484,X1485) | ! [X1486] : (! [X1487] : (! [X1488] : (~r1(X1487,X1488) | ! [X1489] : (~r1(X1488,X1489) | ! [X1490] : (~r1(X1489,X1490) | ! [X1491] : (~r1(X1490,X1491) | ! [X1492] : (~r1(X1491,X1492) | ! [X1493] : (! [X1494] : (~r1(X1493,X1494) | ! [X1495] : (~r1(X1494,X1495) | ! [X1496] : (! [X1497] : (! [X1498] : (! [X1499] : (! [X1500] : (! [X1501] : (~r1(X1500,X1501) | ! [X1502] : (! [X1503] : (~r1(X1502,X1503) | ! [X1504] : (~r1(X1503,X1504) | ! [X1505] : (! [X1506] : (! [X1507] : (! [X1508] : (! [X1509] : (~r1(X1508,X1509) | ! [X1510] : (~r1(X1509,X1510) | ! [X1511] : (~r1(X1510,X1511) | ! [X1512] : (~r1(X1511,X1512) | ! [X1513] : (~r1(X1512,X1513) | ! [X1514] : (! [X1515] : (! [X1516] : (~r1(X1515,X1516) | ! [X1517] : (~r1(X1516,X1517) | ! [X1518] : (~r1(X1517,X1518) | ! [X1519] : (! [X1520] : (! [X1521] : (! [X1522] : (! [X1523] : (! [X1524] : (! [X1525] : (~r1(X1524,X1525) | ! [X1526] : (~r1(X1525,X1526) | ! [X1527] : (~r1(X1526,X1527) | ! [X1528] : (~((~p49(X1528) & ~p50(X1528)) | (p49(X1528) & p50(X1528))) | ~r1(X1527,X1528))))) | ~r1(X1523,X1524)) | ~r1(X1522,X1523)) | ~r1(X1521,X1522)) | ~r1(X1520,X1521)) | ~r1(X1519,X1520)) | ~r1(X1518,X1519))))) | ~r1(X1514,X1515)) | ~r1(X1513,X1514))))))) | ~r1(X1507,X1508)) | ~r1(X1506,X1507)) | ~r1(X1505,X1506)) | ~r1(X1504,X1505)))) | ~r1(X1501,X1502))) | ~r1(X1499,X1500)) | ~r1(X1498,X1499)) | ~r1(X1497,X1498)) | ~r1(X1496,X1497)) | ~r1(X1495,X1496)))) | ~r1(X1492,X1493))))))) | ~r1(X1486,X1487)) | ~r1(X1485,X1486))) | ~r1(X1483,X1484))) | ~r1(X1481,X1482)) | ~r1(X1480,X1481)) | ~r1(X1479,X1480)) | ~r1(X1478,X1479)))) | ~r1(X56,X109)) | ! [X1529] : (~r1(X56,X1529) | p51(X1529))) | ~r1(X1,X56))) | ~r1(X0,X1)) | ! [X1530] : (! [X1531] : (~r1(X1530,X1531) | ! [X1532] : (! [X1533] : (~r1(X1532,X1533) | ! [X1534] : (~r1(X1533,X1534) | ! [X1535] : (~r1(X1534,X1535) | ! [X1536] : (~r1(X1535,X1536) | ! [X1537] : (~r1(X1536,X1537) | ! [X1538] : (! [X1539] : (~r1(X1538,X1539) | ! [X1540] : (~r1(X1539,X1540) | ! [X1541] : (! [X1542] : (! [X1543] : (! [X1544] : (! [X1545] : (~r1(X1544,X1545) | ! [X1546] : (! [X1547] : (~r1(X1546,X1547) | ! [X1548] : (! [X1549] : (! [X1550] : (! [X1551] : (~r1(X1550,X1551) | ! [X1552] : (~r1(X1551,X1552) | ! [X1553] : (~r1(X1552,X1553) | ! [X1554] : (~r1(X1553,X1554) | ! [X1555] : (~r1(X1554,X1555) | ! [X1556] : (! [X1557] : (~r1(X1556,X1557) | ! [X1558] : (! [X1559] : (~r1(X1558,X1559) | ! [X1560] : (~r1(X1559,X1560) | ! [X1561] : (~r1(X1560,X1561) | ! [X1562] : (~r1(X1561,X1562) | ! [X1563] : (~r1(X1562,X1563) | ! [X1564] : (! [X1565] : (! [X1566] : (! [X1567] : (! [X1568] : (! [X1569] : (! [X1570] : (~r1(X1569,X1570) | ! [X1571] : (~r1(X1570,X1571) | ! [X1572] : (! [X1573] : (~r1(X1572,X1573) | ! [X1574] : (~r1(X1573,X1574) | ! [X1575] : (~r1(X1574,X1575) | ! [X1576] : (~r1(X1575,X1576) | ! [X1577] : (! [X1578] : (! [X1579] : (! [X1580] : (~r1(X1579,X1580) | ! [X1581] : (~r1(X1580,X1581) | (p50(X1581) & p49(X1581) & p48(X1581) & p45(X1581) & p41(X1581) & p38(X1581) & p36(X1581) & p35(X1581) & p34(X1581) & p32(X1581) & p31(X1581) & p29(X1581) & p26(X1581) & p25(X1581) & p23(X1581) & p21(X1581) & p18(X1581) & p12(X1581) & p8(X1581) & p6(X1581) & p5(X1581) & p1(X1581) & p2(X1581) & p3(X1581) & p4(X1581) & p7(X1581) & p9(X1581) & p10(X1581) & p11(X1581) & p13(X1581) & p14(X1581) & p15(X1581) & p16(X1581) & p17(X1581) & p19(X1581) & p20(X1581) & p22(X1581) & p24(X1581) & p27(X1581) & p28(X1581) & p30(X1581) & p33(X1581) & p37(X1581) & p39(X1581) & p40(X1581) & p42(X1581) & p43(X1581) & p44(X1581) & p46(X1581) & p47(X1581) & p51(X1581) & p52(X1581)))) | ~r1(X1578,X1579)) | ~r1(X1577,X1578)) | ~r1(X1576,X1577)))))) | ~r1(X1571,X1572)))) | ~r1(X1568,X1569)) | ~r1(X1567,X1568)) | ~r1(X1566,X1567)) | ~r1(X1565,X1566)) | ~r1(X1564,X1565)) | ~r1(X1563,X1564))))))) | ~r1(X1557,X1558))) | ~r1(X1555,X1556))))))) | ~r1(X1549,X1550)) | ~r1(X1548,X1549)) | ~r1(X1547,X1548))) | ~r1(X1545,X1546))) | ~r1(X1543,X1544)) | ~r1(X1542,X1543)) | ~r1(X1541,X1542)) | ~r1(X1540,X1541)))) | ~r1(X1537,X1538))))))) | ~r1(X1531,X1532))) | ~r1(X0,X1530)) | ! [X1582] : (~r1(X0,X1582) | p53(X1582)) | ! [X1583] : (~r1(X0,X1583) | ! [X1584] : (~r1(X1583,X1584) | ! [X1585] : (~r1(X1584,X1585) | ! [X1586] : (! [X1587] : (! [X1588] : (! [X1589] : (~r1(X1588,X1589) | ! [X1590] : (! [X1591] : (~r1(X1590,X1591) | ! [X1592] : (! [X1593] : (! [X1594] : (! [X1595] : (~r1(X1594,X1595) | ! [X1596] : (! [X1597] : (! [X1598] : (~r1(X1597,X1598) | ! [X1599] : (~r1(X1598,X1599) | ! [X1600] : (! [X1601] : (! [X1602] : (~r1(X1601,X1602) | ! [X1603] : (~r1(X1602,X1603) | ! [X1604] : (~r1(X1603,X1604) | ! [X1605] : (! [X1606] : (! [X1607] : (! [X1608] : (! [X1609] : (! [X1610] : (~r1(X1609,X1610) | ! [X1611] : (! [X1612] : (! [X1613] : (! [X1614] : (~r1(X1613,X1614) | ! [X1615] : (~r1(X1614,X1615) | ! [X1616] : (~r1(X1615,X1616) | ! [X1617] : (! [X1618] : (! [X1619] : (! [X1620] : (~r1(X1619,X1620) | ! [X1621] : (~r1(X1620,X1621) | ! [X1622] : (~r1(X1621,X1622) | ! [X1623] : (! [X1624] : (! [X1625] : (! [X1626] : (! [X1627] : (~r1(X1626,X1627) | ! [X1628] : (! [X1629] : (~r1(X1628,X1629) | ! [X1630] : (! [X1631] : (~r1(X1630,X1631) | ! [X1632] : (~r1(X1631,X1632) | ! [X1633] : (~r1(X1632,X1633) | ! [X1634] : ((~p98(X1634) & ~p96(X1634) & ~p94(X1634) & ~p92(X1634) & ~p90(X1634) & ~p88(X1634) & ~p80(X1634) & ~p78(X1634) & ~p76(X1634) & ~p74(X1634) & ~p72(X1634) & ~p70(X1634) & ~p68(X1634) & ~p62(X1634) & ~p60(X1634) & ~p58(X1634) & ~p56(X1634) & ~p54(X1634) & ~p52(X1634) & ~p48(X1634) & ~p46(X1634) & ~p42(X1634) & ~p38(X1634) & ~p28(X1634) & ~p26(X1634) & ~p24(X1634) & ~p22(X1634) & ~p20(X1634) & ~p18(X1634) & ~p14(X1634) & ~p8(X1634) & ~p6(X1634) & ~p4(X1634) & ~p2(X1634) & ~p10(X1634) & ~p12(X1634) & ~p16(X1634) & ~p30(X1634) & ~p32(X1634) & ~p34(X1634) & ~p36(X1634) & ~p40(X1634) & ~p44(X1634) & ~p50(X1634) & ~p64(X1634) & ~p66(X1634) & ~p82(X1634) & ~p84(X1634) & ~p86(X1634) & ~p100(X1634) & ~p102(X1634) & ~p104(X1634)) | ~r1(X1633,X1634))))) | ~r1(X1629,X1630))) | ~r1(X1627,X1628))) | ~r1(X1625,X1626)) | ~r1(X1624,X1625)) | ~r1(X1623,X1624)) | ~r1(X1622,X1623))))) | ~r1(X1618,X1619)) | ~r1(X1617,X1618)) | ~r1(X1616,X1617))))) | ~r1(X1612,X1613)) | ~r1(X1611,X1612)) | ~r1(X1610,X1611))) | ~r1(X1608,X1609)) | ~r1(X1607,X1608)) | ~r1(X1606,X1607)) | ~r1(X1605,X1606)) | ~r1(X1604,X1605))))) | ~r1(X1600,X1601)) | ~r1(X1599,X1600)))) | ~r1(X1596,X1597)) | ~r1(X1595,X1596))) | ~r1(X1593,X1594)) | ~r1(X1592,X1593)) | ~r1(X1591,X1592))) | ~r1(X1589,X1590))) | ~r1(X1587,X1588)) | ~r1(X1586,X1587)) | ~r1(X1585,X1586))))))), 23.28/23.17 inference(rectify,[],[f2])). 23.37/23.18 fof(f2,negated_conjecture,( 23.37/23.18 ~~? [X0] : ~(~! [X1] : (~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((p1(X0) & p51(X0)) | (~p1(X0) & ~p51(X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ! [X0] : (p52(X0) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p51(X0) & ~p50(X0)) | (p50(X0) & p51(X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~! [X1] : (~(! [X0] : (p50(X0) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (~(~! [X0] : (~(! [X1] : (~r1(X0,X1) | p47(X1)) | ~! [X1] : (~(! [X0] : (p46(X0) | ~r1(X1,X0)) | ~! [X0] : (~(! [X1] : (p45(X1) | ~r1(X0,X1)) | ~! [X1] : (~(! [X0] : (~r1(X1,X0) | p44(X0)) | ~! [X0] : (~r1(X1,X0) | ~(! [X1] : (p43(X1) | ~r1(X0,X1)) | ~! [X1] : (~(~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p42(X0) & ~p41(X0)) | (p42(X0) & p41(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ! [X0] : (p42(X0) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ~(! [X1] : (p41(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p39(X0) & ~p40(X0)) | (p39(X0) & p40(X0))))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p36(X0) & p37(X0)) | (~p36(X0) & ~p37(X0))))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))))))) | ~r1(X0,X1))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p37(X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~(~! [X1] : (~(~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((p34(X0) & p33(X0)) | (~p33(X0) & ~p34(X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~! [X0] : (~(~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p31(X0) & p32(X0)) | (~p32(X0) & ~p31(X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ! [X0] : (p32(X0) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p31(X0) & p30(X0)) | (~p30(X0) & ~p31(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p31(X1)) | ~! [X1] : (~(! [X0] : (p30(X0) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~((~p28(X0) & ~p29(X0)) | (p28(X0) & p29(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~! [X1] : (~(~! [X0] : (~(! [X1] : (~r1(X0,X1) | p27(X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p25(X0) & p26(X0)) | (~p25(X0) & ~p26(X0)))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)))))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (~(! [X0] : (~r1(X1,X0) | p24(X0)) | ~! [X0] : (~r1(X1,X0) | ~(! [X1] : (p23(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p21(X0) & p22(X0)) | (~p21(X0) & ~p22(X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~! [X0] : (~(! [X1] : (~r1(X0,X1) | p21(X1)) | ~! [X1] : (~(! [X0] : (~r1(X1,X0) | p20(X0)) | ~! [X0] : (~(! [X1] : (~r1(X0,X1) | p19(X1)) | ~! [X1] : (~(~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p17(X0) & ~p18(X0)) | (p17(X0) & p18(X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p17(X0) & ~p16(X0)) | (p16(X0) & p17(X0)))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))))))))) | ~r1(X1,X0))) | ~r1(X1,X0))) | ! [X1] : (p17(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (~r1(X0,X1) | ~(! [X0] : (~r1(X1,X0) | p14(X0)) | ~! [X0] : (~(! [X1] : (p13(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p12(X0) & ~p11(X0)) | (p12(X0) & p11(X0))))))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ! [X0] : (~r1(X1,X0) | p12(X0)) | ~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (~(~! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((p10(X0) & p9(X0)) | (~p10(X0) & ~p9(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ! [X0] : (p10(X0) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ~(! [X1] : (~r1(X0,X1) | p9(X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p7(X0) & p8(X0)) | (~p7(X0) & ~p8(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p7(X0) & p6(X0)) | (~p6(X0) & ~p7(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ! [X1] : (p7(X1) | ~r1(X0,X1)) | ~! [X1] : (~(~! [X0] : (~(~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p4(X0) & p3(X0)) | (~p4(X0) & ~p3(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p2(X0) & ~p3(X0)) | (p2(X0) & p3(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~! [X1] : (~~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p2(X0) & ~p1(X0)) | (p1(X0) & p2(X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ! [X1] : (p3(X1) | ~r1(X0,X1))) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | p4(X0)))) | ! [X1] : (~r1(X0,X1) | p5(X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p4(X0) & ~p5(X0)) | (p5(X0) & p4(X0)))))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X1,X0)) | ! [X0] : (p6(X0) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p5(X0) & p6(X0)) | (~p6(X0) & ~p5(X0)))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X0,X1)))) | ! [X0] : (~r1(X1,X0) | p8(X0)))) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~((~p8(X0) & ~p9(X0)) | (p9(X0) & p8(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p11(X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p11(X0) & ~p10(X0)) | (p11(X0) & p10(X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))))))))))) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p13(X0) & ~p12(X0)) | (p13(X0) & p12(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p14(X0) & ~p13(X0)) | (p14(X0) & p13(X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ! [X1] : (p15(X1) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((p14(X0) & p15(X0)) | (~p14(X0) & ~p15(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ! [X0] : (p16(X0) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p15(X0) & p16(X0)) | (~p16(X0) & ~p15(X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))))) | ! [X0] : (p18(X0) | ~r1(X1,X0))) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p18(X0) & ~p19(X0)) | (p18(X0) & p19(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p19(X0) & p20(X0)) | (~p19(X0) & ~p20(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p21(X0) & p20(X0)) | (~p20(X0) & ~p21(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X1,X0)) | ! [X0] : (p22(X0) | ~r1(X1,X0)))) | ~! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p22(X0) & p23(X0)) | (~p22(X0) & ~p23(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p23(X0) & ~p24(X0)) | (p24(X0) & p23(X0)))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X0,X1)) | ! [X1] : (p25(X1) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p25(X0) & p24(X0)) | (~p25(X0) & ~p24(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | p26(X0)))) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((p26(X0) & p27(X0)) | (~p27(X0) & ~p26(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1))) | ~r1(X1,X0)) | ! [X0] : (p28(X0) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((~p27(X0) & ~p28(X0)) | (p28(X0) & p27(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p29(X1))) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~((p30(X0) & p29(X0)) | (~p29(X0) & ~p30(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X0,X1))) | ~r1(X1,X0)))) | ! [X1] : (~r1(X0,X1) | p33(X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~((~p33(X0) & ~p32(X0)) | (p32(X0) & p33(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))))) | ~r1(X0,X1))))) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | p34(X0))) | ~r1(X0,X1)) | ! [X1] : (p35(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p34(X0) & p35(X0)) | (~p35(X0) & ~p34(X0))))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | p36(X0)) | ~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p36(X0) & p35(X0)) | (~p35(X0) & ~p36(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)))))) | ! [X0] : (~r1(X1,X0) | p38(X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p37(X0) & ~p38(X0)) | (p38(X0) & p37(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ! [X1] : (~r1(X0,X1) | p39(X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p39(X0) & ~p38(X0)) | (p38(X0) & p39(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ! [X0] : (~r1(X1,X0) | p40(X0)))) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p40(X0) & ~p41(X0)) | (p41(X0) & p40(X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))))))))))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p43(X0) & p42(X0)) | (~p43(X0) & ~p42(X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)))))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))))) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((p43(X0) & p44(X0)) | (~p43(X0) & ~p44(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p45(X0) & ~p44(X0)) | (p44(X0) & p45(X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))))))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p46(X0) & ~p45(X0)) | (p46(X0) & p45(X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))))) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((p47(X0) & p46(X0)) | (~p46(X0) & ~p47(X0))) | ~r1(X1,X0)))))))) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)))))))) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X1,X0)) | ! [X0] : (p48(X0) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p47(X0) & ~p48(X0)) | (p48(X0) & p47(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X0,X1)) | ! [X1] : (p49(X1) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((p49(X0) & p48(X0)) | (~p49(X0) & ~p48(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)))))) | ~r1(X1,X0)))))) | ~r1(X0,X1)))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p49(X0) & ~p50(X0)) | (p49(X0) & p50(X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p51(X1))) | ~r1(X1,X0))) | ~r1(X0,X1)) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | (p50(X0) & p49(X0) & p48(X0) & p45(X0) & p41(X0) & p38(X0) & p36(X0) & p35(X0) & p34(X0) & p32(X0) & p31(X0) & p29(X0) & p26(X0) & p25(X0) & p23(X0) & p21(X0) & p18(X0) & p12(X0) & p8(X0) & p6(X0) & p5(X0) & p1(X0) & p2(X0) & p3(X0) & p4(X0) & p7(X0) & p9(X0) & p10(X0) & p11(X0) & p13(X0) & p14(X0) & p15(X0) & p16(X0) & p17(X0) & p19(X0) & p20(X0) & p22(X0) & p24(X0) & p27(X0) & p28(X0) & p30(X0) & p33(X0) & p37(X0) & p39(X0) & p40(X0) & p42(X0) & p43(X0) & p44(X0) & p46(X0) & p47(X0) & p51(X0) & p52(X0)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1))) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p53(X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : ((~p98(X0) & ~p96(X0) & ~p94(X0) & ~p92(X0) & ~p90(X0) & ~p88(X0) & ~p80(X0) & ~p78(X0) & ~p76(X0) & ~p74(X0) & ~p72(X0) & ~p70(X0) & ~p68(X0) & ~p62(X0) & ~p60(X0) & ~p58(X0) & ~p56(X0) & ~p54(X0) & ~p52(X0) & ~p48(X0) & ~p46(X0) & ~p42(X0) & ~p38(X0) & ~p28(X0) & ~p26(X0) & ~p24(X0) & ~p22(X0) & ~p20(X0) & ~p18(X0) & ~p14(X0) & ~p8(X0) & ~p6(X0) & ~p4(X0) & ~p2(X0) & ~p10(X0) & ~p12(X0) & ~p16(X0) & ~p30(X0) & ~p32(X0) & ~p34(X0) & ~p36(X0) & ~p40(X0) & ~p44(X0) & ~p50(X0) & ~p64(X0) & ~p66(X0) & ~p82(X0) & ~p84(X0) & ~p86(X0) & ~p100(X0) & ~p102(X0) & ~p104(X0)) | ~r1(X1,X0))))) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))))), 23.37/23.18 inference(negated_conjecture,[],[f1])). 23.37/23.18 fof(f1,conjecture,( 23.37/23.18 ~? [X0] : ~(~! [X1] : (~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((p1(X0) & p51(X0)) | (~p1(X0) & ~p51(X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ! [X0] : (p52(X0) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p51(X0) & ~p50(X0)) | (p50(X0) & p51(X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~! [X1] : (~(! [X0] : (p50(X0) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (~(~! [X0] : (~(! [X1] : (~r1(X0,X1) | p47(X1)) | ~! [X1] : (~(! [X0] : (p46(X0) | ~r1(X1,X0)) | ~! [X0] : (~(! [X1] : (p45(X1) | ~r1(X0,X1)) | ~! [X1] : (~(! [X0] : (~r1(X1,X0) | p44(X0)) | ~! [X0] : (~r1(X1,X0) | ~(! [X1] : (p43(X1) | ~r1(X0,X1)) | ~! [X1] : (~(~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p42(X0) & ~p41(X0)) | (p42(X0) & p41(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ! [X0] : (p42(X0) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ~(! [X1] : (p41(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p39(X0) & ~p40(X0)) | (p39(X0) & p40(X0))))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p36(X0) & p37(X0)) | (~p36(X0) & ~p37(X0))))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))))))) | ~r1(X0,X1))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p37(X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~(~! [X1] : (~(~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((p34(X0) & p33(X0)) | (~p33(X0) & ~p34(X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~! [X0] : (~(~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p31(X0) & p32(X0)) | (~p32(X0) & ~p31(X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ! [X0] : (p32(X0) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p31(X0) & p30(X0)) | (~p30(X0) & ~p31(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p31(X1)) | ~! [X1] : (~(! [X0] : (p30(X0) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~((~p28(X0) & ~p29(X0)) | (p28(X0) & p29(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~! [X1] : (~(~! [X0] : (~(! [X1] : (~r1(X0,X1) | p27(X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p25(X0) & p26(X0)) | (~p25(X0) & ~p26(X0)))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)))))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (~(! [X0] : (~r1(X1,X0) | p24(X0)) | ~! [X0] : (~r1(X1,X0) | ~(! [X1] : (p23(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p21(X0) & p22(X0)) | (~p21(X0) & ~p22(X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~! [X0] : (~(! [X1] : (~r1(X0,X1) | p21(X1)) | ~! [X1] : (~(! [X0] : (~r1(X1,X0) | p20(X0)) | ~! [X0] : (~(! [X1] : (~r1(X0,X1) | p19(X1)) | ~! [X1] : (~(~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p17(X0) & ~p18(X0)) | (p17(X0) & p18(X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p17(X0) & ~p16(X0)) | (p16(X0) & p17(X0)))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))))))))) | ~r1(X1,X0))) | ~r1(X1,X0))) | ! [X1] : (p17(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (~r1(X0,X1) | ~(! [X0] : (~r1(X1,X0) | p14(X0)) | ~! [X0] : (~(! [X1] : (p13(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p12(X0) & ~p11(X0)) | (p12(X0) & p11(X0))))))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ! [X0] : (~r1(X1,X0) | p12(X0)) | ~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (~(~! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((p10(X0) & p9(X0)) | (~p10(X0) & ~p9(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ! [X0] : (p10(X0) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ~(! [X1] : (~r1(X0,X1) | p9(X1)) | ~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p7(X0) & p8(X0)) | (~p7(X0) & ~p8(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~! [X0] : (~r1(X1,X0) | ~(~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p7(X0) & p6(X0)) | (~p6(X0) & ~p7(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ! [X1] : (p7(X1) | ~r1(X0,X1)) | ~! [X1] : (~(~! [X0] : (~(~! [X1] : (~r1(X0,X1) | ~(~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p4(X0) & p3(X0)) | (~p4(X0) & ~p3(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~! [X0] : (~(~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p2(X0) & ~p3(X0)) | (p2(X0) & p3(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~! [X1] : (~~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p2(X0) & ~p1(X0)) | (p1(X0) & p2(X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ! [X1] : (p3(X1) | ~r1(X0,X1))) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | p4(X0)))) | ! [X1] : (~r1(X0,X1) | p5(X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p4(X0) & ~p5(X0)) | (p5(X0) & p4(X0)))))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X1,X0)) | ! [X0] : (p6(X0) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p5(X0) & p6(X0)) | (~p6(X0) & ~p5(X0)))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X0,X1)))) | ! [X0] : (~r1(X1,X0) | p8(X0)))) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~((~p8(X0) & ~p9(X0)) | (p9(X0) & p8(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p11(X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p11(X0) & ~p10(X0)) | (p11(X0) & p10(X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))))))))))) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p13(X0) & ~p12(X0)) | (p13(X0) & p12(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p14(X0) & ~p13(X0)) | (p14(X0) & p13(X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ! [X1] : (p15(X1) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((p14(X0) & p15(X0)) | (~p14(X0) & ~p15(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ! [X0] : (p16(X0) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p15(X0) & p16(X0)) | (~p16(X0) & ~p15(X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))))) | ! [X0] : (p18(X0) | ~r1(X1,X0))) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p18(X0) & ~p19(X0)) | (p18(X0) & p19(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p19(X0) & p20(X0)) | (~p19(X0) & ~p20(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p21(X0) & p20(X0)) | (~p20(X0) & ~p21(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X1,X0)) | ! [X0] : (p22(X0) | ~r1(X1,X0)))) | ~! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p22(X0) & p23(X0)) | (~p22(X0) & ~p23(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((~p23(X0) & ~p24(X0)) | (p24(X0) & p23(X0)))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X0,X1)) | ! [X1] : (p25(X1) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p25(X0) & p24(X0)) | (~p25(X0) & ~p24(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | p26(X0)))) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((p26(X0) & p27(X0)) | (~p27(X0) & ~p26(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1))) | ~r1(X1,X0)) | ! [X0] : (p28(X0) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((~p27(X0) & ~p28(X0)) | (p28(X0) & p27(X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p29(X1))) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~((p30(X0) & p29(X0)) | (~p29(X0) & ~p30(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X0,X1))) | ~r1(X1,X0)))) | ! [X1] : (~r1(X0,X1) | p33(X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~((~p33(X0) & ~p32(X0)) | (p32(X0) & p33(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))))) | ~r1(X0,X1))))) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | p34(X0))) | ~r1(X0,X1)) | ! [X1] : (p35(X1) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p34(X0) & p35(X0)) | (~p35(X0) & ~p34(X0))))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | p36(X0)) | ~! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~((p36(X0) & p35(X0)) | (~p35(X0) & ~p36(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)))))) | ! [X0] : (~r1(X1,X0) | p38(X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p37(X0) & ~p38(X0)) | (p38(X0) & p37(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ! [X1] : (~r1(X0,X1) | p39(X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p39(X0) & ~p38(X0)) | (p38(X0) & p39(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ! [X0] : (~r1(X1,X0) | p40(X0)))) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p40(X0) & ~p41(X0)) | (p41(X0) & p40(X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))))))))))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ~((p43(X0) & p42(X0)) | (~p43(X0) & ~p42(X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)))))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))))) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((p43(X0) & p44(X0)) | (~p43(X0) & ~p44(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ~((~p45(X0) & ~p44(X0)) | (p44(X0) & p45(X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))))))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p46(X0) & ~p45(X0)) | (p46(X0) & p45(X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))))) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((p47(X0) & p46(X0)) | (~p46(X0) & ~p47(X0))) | ~r1(X1,X0)))))))) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)))))))) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X1,X0)) | ! [X0] : (p48(X0) | ~r1(X1,X0)) | ~! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p47(X0) & ~p48(X0)) | (p48(X0) & p47(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X0,X1)) | ! [X1] : (p49(X1) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~((p49(X0) & p48(X0)) | (~p49(X0) & ~p48(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)))))) | ~r1(X1,X0)))))) | ~r1(X0,X1)))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~((~p49(X0) & ~p50(X0)) | (p49(X0) & p50(X0))) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0))))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p51(X1))) | ~r1(X1,X0))) | ~r1(X0,X1)) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | (p50(X0) & p49(X0) & p48(X0) & p45(X0) & p41(X0) & p38(X0) & p36(X0) & p35(X0) & p34(X0) & p32(X0) & p31(X0) & p29(X0) & p26(X0) & p25(X0) & p23(X0) & p21(X0) & p18(X0) & p12(X0) & p8(X0) & p6(X0) & p5(X0) & p1(X0) & p2(X0) & p3(X0) & p4(X0) & p7(X0) & p9(X0) & p10(X0) & p11(X0) & p13(X0) & p14(X0) & p15(X0) & p16(X0) & p17(X0) & p19(X0) & p20(X0) & p22(X0) & p24(X0) & p27(X0) & p28(X0) & p30(X0) & p33(X0) & p37(X0) & p39(X0) & p40(X0) & p42(X0) & p43(X0) & p44(X0) & p46(X0) & p47(X0) & p51(X0) & p52(X0)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1))) | ~r1(X0,X1))))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p53(X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : ((~p98(X0) & ~p96(X0) & ~p94(X0) & ~p92(X0) & ~p90(X0) & ~p88(X0) & ~p80(X0) & ~p78(X0) & ~p76(X0) & ~p74(X0) & ~p72(X0) & ~p70(X0) & ~p68(X0) & ~p62(X0) & ~p60(X0) & ~p58(X0) & ~p56(X0) & ~p54(X0) & ~p52(X0) & ~p48(X0) & ~p46(X0) & ~p42(X0) & ~p38(X0) & ~p28(X0) & ~p26(X0) & ~p24(X0) & ~p22(X0) & ~p20(X0) & ~p18(X0) & ~p14(X0) & ~p8(X0) & ~p6(X0) & ~p4(X0) & ~p2(X0) & ~p10(X0) & ~p12(X0) & ~p16(X0) & ~p30(X0) & ~p32(X0) & ~p34(X0) & ~p36(X0) & ~p40(X0) & ~p44(X0) & ~p50(X0) & ~p64(X0) & ~p66(X0) & ~p82(X0) & ~p84(X0) & ~p86(X0) & ~p100(X0) & ~p102(X0) & ~p104(X0)) | ~r1(X1,X0))))) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))))), 23.37/23.18 file('/export/starexec/sandbox2/benchmark/theBenchmark.p',main)). 23.37/23.18 fof(f82634,plain,( 23.37/23.18 sP3004(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f75383,f6316])). 23.37/23.18 fof(f75383,plain,( 23.37/23.18 sP3003(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f68586,f6314])). 23.37/23.18 fof(f68586,plain,( 23.37/23.18 sP3002(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f61536,f6312])). 23.37/23.18 fof(f61536,plain,( 23.37/23.18 sP3001(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f53717,f6310])). 23.37/23.18 fof(f53717,plain,( 23.37/23.18 sP3000(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f47256,f6308])). 23.37/23.18 fof(f47256,plain,( 23.37/23.18 sP2999(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f42509,f6306])). 23.37/23.18 fof(f42509,plain,( 23.37/23.18 sP2998(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f38144,f6304])). 23.37/23.18 fof(f38144,plain,( 23.37/23.18 sP2997(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f34145,f6302])). 23.37/23.18 fof(f34145,plain,( 23.37/23.18 sP2996(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f30481,f6300])). 23.37/23.18 fof(f30481,plain,( 23.37/23.18 sP2975(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f27166,f6258])). 23.37/23.18 fof(f27166,plain,( 23.37/23.18 sP2974(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f24169,f6256])). 23.37/23.18 fof(f24169,plain,( 23.37/23.18 sP2973(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f21474,f6254])). 23.37/23.18 fof(f21474,plain,( 23.37/23.18 sP2972(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f19050,f6252])). 23.37/23.18 fof(f19050,plain,( 23.37/23.18 sP2971(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f16489,f6250])). 23.37/23.18 fof(f16489,plain,( 23.37/23.18 sP2970(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14761,f6248])). 23.37/23.18 fof(f14761,plain,( 23.37/23.18 sP2969(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14706,f6246])). 23.37/23.18 fof(f14706,plain,( 23.37/23.18 sP2968(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14655,f6244])). 23.37/23.18 fof(f14655,plain,( 23.37/23.18 sP2967(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14608,f6242])). 23.37/23.18 fof(f14608,plain,( 23.37/23.18 sP2966(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14565,f6240])). 23.37/23.18 fof(f14565,plain,( 23.37/23.18 sP2965(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14526,f6238])). 23.37/23.18 fof(f14526,plain,( 23.37/23.18 sP2964(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14491,f6236])). 23.37/23.18 fof(f14491,plain,( 23.37/23.18 sP2963(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14460,f6234])). 23.37/23.18 fof(f14460,plain,( 23.37/23.18 sP2962(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14433,f6232])). 23.37/23.18 fof(f14433,plain,( 23.37/23.18 sP2961(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14410,f6230])). 23.37/23.18 fof(f14410,plain,( 23.37/23.18 sP2959(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14392,f6226])). 23.37/23.18 fof(f14392,plain,( 23.37/23.18 sP2958(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f656,f14379,f6224])). 23.37/23.18 fof(f14379,plain,( 23.37/23.18 sP2956(sK100)), 23.37/23.18 inference(unit_resulting_resolution,[],[f706,f655,f6220])). 23.37/23.18 fof(f655,plain,( 23.37/23.18 r1(sK96,sK99)), 23.37/23.18 inference(cnf_transformation,[],[f360])). 23.37/23.18 fof(f706,plain,( 23.37/23.18 r1(sK99,sK100)), 23.37/23.18 inference(cnf_transformation,[],[f360])). 23.37/23.18 fof(f656,plain,( 23.37/23.18 r1(sK100,sK101)), 23.37/23.18 inference(cnf_transformation,[],[f360])). 23.37/23.18 fof(f6452,plain,( 23.37/23.18 ~p50(sK48(sK101))), 23.37/23.18 inference(unit_resulting_resolution,[],[f656,f6435,f365])). 23.37/23.18 fof(f365,plain,( 23.37/23.18 ( ! [X0,X1] : (~p50(sK48(X1)) | ~r1(X0,X1) | ~sP47(X0)) )), 23.37/23.18 inference(cnf_transformation,[],[f62])). 23.37/23.18 fof(f62,plain,( 23.37/23.18 ! [X0] : (! [X1] : (((~p50(sK48(X1)) & r1(X1,sK48(X1))) & sP46(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (! [X23] : (! [X24] : (! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (! [X32] : (! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (~r1(X35,X36) | ! [X37] : (~r1(X36,X37) | ! [X38] : (~r1(X37,X38) | ! [X39] : (! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (! [X46] : (! [X47] : (! [X48] : (! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (~r1(X50,X51) | ! [X52] : (~r1(X51,X52) | ! [X53] : (((p49(X53) | p50(X53)) & (~p49(X53) | ~p50(X53))) | ~r1(X52,X53))))) | ~r1(X48,X49)) | ~r1(X47,X48)) | ~r1(X46,X47)) | ~r1(X45,X46)) | ~r1(X44,X45)) | ~r1(X43,X44))))) | ~r1(X39,X40)) | ~r1(X38,X39))))))) | ~r1(X32,X33)) | ~r1(X31,X32)) | ~r1(X30,X31)) | ~r1(X29,X30)))) | ~r1(X26,X27))) | ~r1(X24,X25)) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)))) | ~r1(X17,X18))))))) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4)))) | ~r1(X0,X1)) | ~sP47(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK48])],[f60,f61])). 23.37/23.18 fof(f61,plain,( 23.37/23.18 ! [X1] : (? [X2] : (~p50(X2) & r1(X1,X2)) => (~p50(sK48(X1)) & r1(X1,sK48(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f60,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((? [X2] : (~p50(X2) & r1(X1,X2)) & sP46(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (! [X23] : (! [X24] : (! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (! [X32] : (! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (~r1(X35,X36) | ! [X37] : (~r1(X36,X37) | ! [X38] : (~r1(X37,X38) | ! [X39] : (! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (! [X46] : (! [X47] : (! [X48] : (! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (~r1(X50,X51) | ! [X52] : (~r1(X51,X52) | ! [X53] : (((p49(X53) | p50(X53)) & (~p49(X53) | ~p50(X53))) | ~r1(X52,X53))))) | ~r1(X48,X49)) | ~r1(X47,X48)) | ~r1(X46,X47)) | ~r1(X45,X46)) | ~r1(X44,X45)) | ~r1(X43,X44))))) | ~r1(X39,X40)) | ~r1(X38,X39))))))) | ~r1(X32,X33)) | ~r1(X31,X32)) | ~r1(X30,X31)) | ~r1(X29,X30)))) | ~r1(X26,X27))) | ~r1(X24,X25)) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)))) | ~r1(X17,X18))))))) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4)))) | ~r1(X0,X1)) | ~sP47(X0))), 23.37/23.18 inference(rectify,[],[f59])). 23.37/23.18 fof(f59,plain,( 23.37/23.18 ! [X56] : (! [X109] : ((? [X110] : (~p50(X110) & r1(X109,X110)) & sP46(X109) & ! [X1478] : (~r1(X109,X1478) | ! [X1479] : (! [X1480] : (! [X1481] : (! [X1482] : (! [X1483] : (~r1(X1482,X1483) | ! [X1484] : (! [X1485] : (~r1(X1484,X1485) | ! [X1486] : (! [X1487] : (! [X1488] : (~r1(X1487,X1488) | ! [X1489] : (~r1(X1488,X1489) | ! [X1490] : (~r1(X1489,X1490) | ! [X1491] : (~r1(X1490,X1491) | ! [X1492] : (~r1(X1491,X1492) | ! [X1493] : (! [X1494] : (~r1(X1493,X1494) | ! [X1495] : (~r1(X1494,X1495) | ! [X1496] : (! [X1497] : (! [X1498] : (! [X1499] : (! [X1500] : (! [X1501] : (~r1(X1500,X1501) | ! [X1502] : (! [X1503] : (~r1(X1502,X1503) | ! [X1504] : (~r1(X1503,X1504) | ! [X1505] : (! [X1506] : (! [X1507] : (! [X1508] : (! [X1509] : (~r1(X1508,X1509) | ! [X1510] : (~r1(X1509,X1510) | ! [X1511] : (~r1(X1510,X1511) | ! [X1512] : (~r1(X1511,X1512) | ! [X1513] : (~r1(X1512,X1513) | ! [X1514] : (! [X1515] : (! [X1516] : (~r1(X1515,X1516) | ! [X1517] : (~r1(X1516,X1517) | ! [X1518] : (~r1(X1517,X1518) | ! [X1519] : (! [X1520] : (! [X1521] : (! [X1522] : (! [X1523] : (! [X1524] : (! [X1525] : (~r1(X1524,X1525) | ! [X1526] : (~r1(X1525,X1526) | ! [X1527] : (~r1(X1526,X1527) | ! [X1528] : (((p49(X1528) | p50(X1528)) & (~p49(X1528) | ~p50(X1528))) | ~r1(X1527,X1528))))) | ~r1(X1523,X1524)) | ~r1(X1522,X1523)) | ~r1(X1521,X1522)) | ~r1(X1520,X1521)) | ~r1(X1519,X1520)) | ~r1(X1518,X1519))))) | ~r1(X1514,X1515)) | ~r1(X1513,X1514))))))) | ~r1(X1507,X1508)) | ~r1(X1506,X1507)) | ~r1(X1505,X1506)) | ~r1(X1504,X1505)))) | ~r1(X1501,X1502))) | ~r1(X1499,X1500)) | ~r1(X1498,X1499)) | ~r1(X1497,X1498)) | ~r1(X1496,X1497)) | ~r1(X1495,X1496)))) | ~r1(X1492,X1493))))))) | ~r1(X1486,X1487)) | ~r1(X1485,X1486))) | ~r1(X1483,X1484))) | ~r1(X1481,X1482)) | ~r1(X1480,X1481)) | ~r1(X1479,X1480)) | ~r1(X1478,X1479)))) | ~r1(X56,X109)) | ~sP47(X56))), 23.37/23.18 inference(nnf_transformation,[],[f57])). 23.37/23.18 fof(f6435,plain,( 23.37/23.18 sP47(sK100)), 23.37/23.18 inference(unit_resulting_resolution,[],[f706,f655,f709])). 23.37/23.18 fof(f709,plain,( 23.37/23.18 ( ! [X56,X1] : (sP47(X56) | ~r1(X1,X56) | ~r1(sK96,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f360])). 23.37/23.18 fof(f485571,plain,( 23.37/23.18 ~sP2852(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f462196,f6016])). 23.37/23.18 fof(f6016,plain,( 23.37/23.18 ( ! [X52,X53] : (sP2854(X52) | ~sP2852(X53) | ~r1(X52,X53)) )), 23.37/23.18 inference(cnf_transformation,[],[f6016_D])). 23.37/23.18 fof(f6016_D,plain,( 23.37/23.18 ( ! [X52] : (( ! [X53] : (~sP2852(X53) | ~r1(X52,X53)) ) <=> ~sP2854(X52)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2854])])). 23.37/23.18 fof(f462196,plain,( 23.37/23.18 ~sP2854(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f438844,f6028])). 23.37/23.18 fof(f6028,plain,( 23.37/23.18 ( ! [X52,X51] : (sP2860(X51) | ~sP2854(X52) | ~r1(X51,X52)) )), 23.37/23.18 inference(cnf_transformation,[],[f6028_D])). 23.37/23.18 fof(f6028_D,plain,( 23.37/23.18 ( ! [X51] : (( ! [X52] : (~sP2854(X52) | ~r1(X51,X52)) ) <=> ~sP2860(X51)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2860])])). 23.37/23.18 fof(f438844,plain,( 23.37/23.18 ~sP2860(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f415927,f6030])). 23.37/23.18 fof(f6030,plain,( 23.37/23.18 ( ! [X50,X51] : (sP2861(X50) | ~sP2860(X51) | ~r1(X50,X51)) )), 23.37/23.18 inference(cnf_transformation,[],[f6030_D])). 23.37/23.18 fof(f6030_D,plain,( 23.37/23.18 ( ! [X50] : (( ! [X51] : (~sP2860(X51) | ~r1(X50,X51)) ) <=> ~sP2861(X50)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2861])])). 23.37/23.18 fof(f415927,plain,( 23.37/23.18 ~sP2861(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f393165,f6032])). 23.37/23.18 fof(f6032,plain,( 23.37/23.18 ( ! [X50,X49] : (sP2862(X49) | ~sP2861(X50) | ~r1(X49,X50)) )), 23.37/23.18 inference(cnf_transformation,[],[f6032_D])). 23.37/23.18 fof(f6032_D,plain,( 23.37/23.18 ( ! [X49] : (( ! [X50] : (~sP2861(X50) | ~r1(X49,X50)) ) <=> ~sP2862(X49)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2862])])). 23.37/23.18 fof(f393165,plain,( 23.37/23.18 ~sP2862(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f363995,f6052])). 23.37/23.18 fof(f6052,plain,( 23.37/23.18 ( ! [X48,X49] : (sP2872(X48) | ~sP2862(X49) | ~r1(X48,X49)) )), 23.37/23.18 inference(cnf_transformation,[],[f6052_D])). 23.37/23.18 fof(f6052_D,plain,( 23.37/23.18 ( ! [X48] : (( ! [X49] : (~sP2862(X49) | ~r1(X48,X49)) ) <=> ~sP2872(X48)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2872])])). 23.37/23.18 fof(f363995,plain,( 23.37/23.18 ~sP2872(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f331519,f6054])). 23.37/23.18 fof(f6054,plain,( 23.37/23.18 ( ! [X47,X48] : (sP2873(X47) | ~sP2872(X48) | ~r1(X47,X48)) )), 23.37/23.18 inference(cnf_transformation,[],[f6054_D])). 23.37/23.18 fof(f6054_D,plain,( 23.37/23.18 ( ! [X47] : (( ! [X48] : (~sP2872(X48) | ~r1(X47,X48)) ) <=> ~sP2873(X47)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2873])])). 23.37/23.18 fof(f331519,plain,( 23.37/23.18 ~sP2873(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f312213,f6056])). 23.37/23.18 fof(f6056,plain,( 23.37/23.18 ( ! [X47,X46] : (sP2874(X46) | ~sP2873(X47) | ~r1(X46,X47)) )), 23.37/23.18 inference(cnf_transformation,[],[f6056_D])). 23.37/23.18 fof(f6056_D,plain,( 23.37/23.18 ( ! [X46] : (( ! [X47] : (~sP2873(X47) | ~r1(X46,X47)) ) <=> ~sP2874(X46)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2874])])). 23.37/23.18 fof(f312213,plain,( 23.37/23.18 ~sP2874(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f293694,f6058])). 23.37/23.18 fof(f6058,plain,( 23.37/23.18 ( ! [X45,X46] : (sP2875(X45) | ~sP2874(X46) | ~r1(X45,X46)) )), 23.37/23.18 inference(cnf_transformation,[],[f6058_D])). 23.37/23.18 fof(f6058_D,plain,( 23.37/23.18 ( ! [X45] : (( ! [X46] : (~sP2874(X46) | ~r1(X45,X46)) ) <=> ~sP2875(X45)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2875])])). 23.37/23.18 fof(f293694,plain,( 23.37/23.18 ~sP2875(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f275929,f6060])). 23.37/23.18 fof(f6060,plain,( 23.37/23.18 ( ! [X45,X44] : (sP2876(X44) | ~sP2875(X45) | ~r1(X44,X45)) )), 23.37/23.18 inference(cnf_transformation,[],[f6060_D])). 23.37/23.18 fof(f6060_D,plain,( 23.37/23.18 ( ! [X44] : (( ! [X45] : (~sP2875(X45) | ~r1(X44,X45)) ) <=> ~sP2876(X44)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2876])])). 23.37/23.18 fof(f275929,plain,( 23.37/23.18 ~sP2876(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f258915,f6062])). 23.37/23.18 fof(f6062,plain,( 23.37/23.18 ( ! [X43,X44] : (sP2877(X43) | ~sP2876(X44) | ~r1(X43,X44)) )), 23.37/23.18 inference(cnf_transformation,[],[f6062_D])). 23.37/23.18 fof(f6062_D,plain,( 23.37/23.18 ( ! [X43] : (( ! [X44] : (~sP2876(X44) | ~r1(X43,X44)) ) <=> ~sP2877(X43)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2877])])). 23.37/23.18 fof(f258915,plain,( 23.37/23.18 ~sP2877(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f242631,f6064])). 23.37/23.18 fof(f6064,plain,( 23.37/23.18 ( ! [X43,X42] : (sP2878(X42) | ~sP2877(X43) | ~r1(X42,X43)) )), 23.37/23.18 inference(cnf_transformation,[],[f6064_D])). 23.37/23.18 fof(f6064_D,plain,( 23.37/23.18 ( ! [X42] : (( ! [X43] : (~sP2877(X43) | ~r1(X42,X43)) ) <=> ~sP2878(X42)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2878])])). 23.37/23.18 fof(f242631,plain,( 23.37/23.18 ~sP2878(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f227057,f6066])). 23.37/23.18 fof(f6066,plain,( 23.37/23.18 ( ! [X41,X42] : (sP2879(X41) | ~sP2878(X42) | ~r1(X41,X42)) )), 23.37/23.18 inference(cnf_transformation,[],[f6066_D])). 23.37/23.18 fof(f6066_D,plain,( 23.37/23.18 ( ! [X41] : (( ! [X42] : (~sP2878(X42) | ~r1(X41,X42)) ) <=> ~sP2879(X41)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2879])])). 23.37/23.18 fof(f227057,plain,( 23.37/23.18 ~sP2879(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f212185,f6068])). 23.37/23.18 fof(f6068,plain,( 23.37/23.18 ( ! [X41,X40] : (sP2880(X40) | ~sP2879(X41) | ~r1(X40,X41)) )), 23.37/23.18 inference(cnf_transformation,[],[f6068_D])). 23.37/23.18 fof(f6068_D,plain,( 23.37/23.18 ( ! [X40] : (( ! [X41] : (~sP2879(X41) | ~r1(X40,X41)) ) <=> ~sP2880(X40)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2880])])). 23.37/23.18 fof(f212185,plain,( 23.37/23.18 ~sP2880(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f197996,f6070])). 23.37/23.18 fof(f6070,plain,( 23.37/23.18 ( ! [X39,X40] : (sP2881(X39) | ~sP2880(X40) | ~r1(X39,X40)) )), 23.37/23.18 inference(cnf_transformation,[],[f6070_D])). 23.37/23.18 fof(f6070_D,plain,( 23.37/23.18 ( ! [X39] : (( ! [X40] : (~sP2880(X40) | ~r1(X39,X40)) ) <=> ~sP2881(X39)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2881])])). 23.37/23.18 fof(f197996,plain,( 23.37/23.18 ~sP2881(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f184475,f6072])). 23.37/23.18 fof(f6072,plain,( 23.37/23.18 ( ! [X39,X38] : (sP2882(X38) | ~sP2881(X39) | ~r1(X38,X39)) )), 23.37/23.18 inference(cnf_transformation,[],[f6072_D])). 23.37/23.18 fof(f6072_D,plain,( 23.37/23.18 ( ! [X38] : (( ! [X39] : (~sP2881(X39) | ~r1(X38,X39)) ) <=> ~sP2882(X38)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2882])])). 23.37/23.18 fof(f184475,plain,( 23.37/23.18 ~sP2882(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f171606,f6074])). 23.37/23.18 fof(f6074,plain,( 23.37/23.18 ( ! [X37,X38] : (sP2883(X37) | ~sP2882(X38) | ~r1(X37,X38)) )), 23.37/23.18 inference(cnf_transformation,[],[f6074_D])). 23.37/23.18 fof(f6074_D,plain,( 23.37/23.18 ( ! [X37] : (( ! [X38] : (~sP2882(X38) | ~r1(X37,X38)) ) <=> ~sP2883(X37)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2883])])). 23.37/23.18 fof(f171606,plain,( 23.37/23.18 ~sP2883(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f159371,f6076])). 23.37/23.18 fof(f6076,plain,( 23.37/23.18 ( ! [X37,X36] : (sP2884(X36) | ~sP2883(X37) | ~r1(X36,X37)) )), 23.37/23.18 inference(cnf_transformation,[],[f6076_D])). 23.37/23.18 fof(f6076_D,plain,( 23.37/23.18 ( ! [X36] : (( ! [X37] : (~sP2883(X37) | ~r1(X36,X37)) ) <=> ~sP2884(X36)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2884])])). 23.37/23.18 fof(f159371,plain,( 23.37/23.18 ~sP2884(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f147753,f6078])). 23.37/23.18 fof(f6078,plain,( 23.37/23.18 ( ! [X35,X36] : (sP2885(X35) | ~sP2884(X36) | ~r1(X35,X36)) )), 23.37/23.18 inference(cnf_transformation,[],[f6078_D])). 23.37/23.18 fof(f6078_D,plain,( 23.37/23.18 ( ! [X35] : (( ! [X36] : (~sP2884(X36) | ~r1(X35,X36)) ) <=> ~sP2885(X35)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2885])])). 23.37/23.18 fof(f147753,plain,( 23.37/23.18 ~sP2885(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f136738,f6080])). 23.37/23.18 fof(f6080,plain,( 23.37/23.18 ( ! [X35,X34] : (sP2886(X34) | ~sP2885(X35) | ~r1(X34,X35)) )), 23.37/23.18 inference(cnf_transformation,[],[f6080_D])). 23.37/23.18 fof(f6080_D,plain,( 23.37/23.18 ( ! [X34] : (( ! [X35] : (~sP2885(X35) | ~r1(X34,X35)) ) <=> ~sP2886(X34)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2886])])). 23.37/23.18 fof(f136738,plain,( 23.37/23.18 ~sP2886(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f126309,f6082])). 23.37/23.18 fof(f6082,plain,( 23.37/23.18 ( ! [X33,X34] : (sP2887(X33) | ~sP2886(X34) | ~r1(X33,X34)) )), 23.37/23.18 inference(cnf_transformation,[],[f6082_D])). 23.37/23.18 fof(f6082_D,plain,( 23.37/23.18 ( ! [X33] : (( ! [X34] : (~sP2886(X34) | ~r1(X33,X34)) ) <=> ~sP2887(X33)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2887])])). 23.37/23.18 fof(f126309,plain,( 23.37/23.18 ~sP2887(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f116451,f6084])). 23.37/23.18 fof(f6084,plain,( 23.37/23.18 ( ! [X33,X32] : (sP2888(X32) | ~sP2887(X33) | ~r1(X32,X33)) )), 23.37/23.18 inference(cnf_transformation,[],[f6084_D])). 23.37/23.18 fof(f6084_D,plain,( 23.37/23.18 ( ! [X32] : (( ! [X33] : (~sP2887(X33) | ~r1(X32,X33)) ) <=> ~sP2888(X32)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2888])])). 23.37/23.18 fof(f116451,plain,( 23.37/23.18 ~sP2888(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f107140,f6086])). 23.37/23.18 fof(f6086,plain,( 23.37/23.18 ( ! [X31,X32] : (sP2889(X31) | ~sP2888(X32) | ~r1(X31,X32)) )), 23.37/23.18 inference(cnf_transformation,[],[f6086_D])). 23.37/23.18 fof(f6086_D,plain,( 23.37/23.18 ( ! [X31] : (( ! [X32] : (~sP2888(X32) | ~r1(X31,X32)) ) <=> ~sP2889(X31)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2889])])). 23.37/23.18 fof(f107140,plain,( 23.37/23.18 ~sP2889(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f98372,f6088])). 23.37/23.18 fof(f6088,plain,( 23.37/23.18 ( ! [X30,X31] : (sP2890(X30) | ~sP2889(X31) | ~r1(X30,X31)) )), 23.37/23.18 inference(cnf_transformation,[],[f6088_D])). 23.37/23.18 fof(f6088_D,plain,( 23.37/23.18 ( ! [X30] : (( ! [X31] : (~sP2889(X31) | ~r1(X30,X31)) ) <=> ~sP2890(X30)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2890])])). 23.37/23.18 fof(f98372,plain,( 23.37/23.18 ~sP2890(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f90126,f6090])). 23.37/23.18 fof(f6090,plain,( 23.37/23.18 ( ! [X30,X29] : (sP2891(X29) | ~sP2890(X30) | ~r1(X29,X30)) )), 23.37/23.18 inference(cnf_transformation,[],[f6090_D])). 23.37/23.18 fof(f6090_D,plain,( 23.37/23.18 ( ! [X29] : (( ! [X30] : (~sP2890(X30) | ~r1(X29,X30)) ) <=> ~sP2891(X29)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2891])])). 23.37/23.18 fof(f90126,plain,( 23.37/23.18 ~sP2891(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f82388,f6092])). 23.37/23.18 fof(f6092,plain,( 23.37/23.18 ( ! [X28,X29] : (sP2892(X28) | ~sP2891(X29) | ~r1(X28,X29)) )), 23.37/23.18 inference(cnf_transformation,[],[f6092_D])). 23.37/23.18 fof(f6092_D,plain,( 23.37/23.18 ( ! [X28] : (( ! [X29] : (~sP2891(X29) | ~r1(X28,X29)) ) <=> ~sP2892(X28)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2892])])). 23.37/23.18 fof(f82388,plain,( 23.37/23.18 ~sP2892(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f75145,f6094])). 23.37/23.18 fof(f6094,plain,( 23.37/23.18 ( ! [X28,X27] : (sP2893(X27) | ~sP2892(X28) | ~r1(X27,X28)) )), 23.37/23.18 inference(cnf_transformation,[],[f6094_D])). 23.37/23.18 fof(f6094_D,plain,( 23.37/23.18 ( ! [X27] : (( ! [X28] : (~sP2892(X28) | ~r1(X27,X28)) ) <=> ~sP2893(X27)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2893])])). 23.37/23.18 fof(f75145,plain,( 23.37/23.18 ~sP2893(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f68356,f6096])). 23.37/23.18 fof(f6096,plain,( 23.37/23.18 ( ! [X26,X27] : (sP2894(X26) | ~sP2893(X27) | ~r1(X26,X27)) )), 23.37/23.18 inference(cnf_transformation,[],[f6096_D])). 23.37/23.18 fof(f6096_D,plain,( 23.37/23.18 ( ! [X26] : (( ! [X27] : (~sP2893(X27) | ~r1(X26,X27)) ) <=> ~sP2894(X26)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2894])])). 23.37/23.18 fof(f68356,plain,( 23.37/23.18 ~sP2894(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f61316,f6098])). 23.37/23.18 fof(f6098,plain,( 23.37/23.18 ( ! [X26,X25] : (sP2895(X25) | ~sP2894(X26) | ~r1(X25,X26)) )), 23.37/23.18 inference(cnf_transformation,[],[f6098_D])). 23.37/23.18 fof(f6098_D,plain,( 23.37/23.18 ( ! [X25] : (( ! [X26] : (~sP2894(X26) | ~r1(X25,X26)) ) <=> ~sP2895(X25)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2895])])). 23.37/23.18 fof(f61316,plain,( 23.37/23.18 ~sP2895(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f53511,f6100])). 23.37/23.18 fof(f6100,plain,( 23.37/23.18 ( ! [X24,X25] : (sP2896(X24) | ~sP2895(X25) | ~r1(X24,X25)) )), 23.37/23.18 inference(cnf_transformation,[],[f6100_D])). 23.37/23.18 fof(f6100_D,plain,( 23.37/23.18 ( ! [X24] : (( ! [X25] : (~sP2895(X25) | ~r1(X24,X25)) ) <=> ~sP2896(X24)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2896])])). 23.37/23.18 fof(f53511,plain,( 23.37/23.18 ~sP2896(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f47062,f6102])). 23.37/23.18 fof(f6102,plain,( 23.37/23.18 ( ! [X24,X23] : (sP2897(X23) | ~sP2896(X24) | ~r1(X23,X24)) )), 23.37/23.18 inference(cnf_transformation,[],[f6102_D])). 23.37/23.18 fof(f6102_D,plain,( 23.37/23.18 ( ! [X23] : (( ! [X24] : (~sP2896(X24) | ~r1(X23,X24)) ) <=> ~sP2897(X23)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2897])])). 23.37/23.18 fof(f47062,plain,( 23.37/23.18 ~sP2897(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f42323,f6104])). 23.37/23.18 fof(f6104,plain,( 23.37/23.18 ( ! [X23,X22] : (sP2898(X22) | ~sP2897(X23) | ~r1(X22,X23)) )), 23.37/23.18 inference(cnf_transformation,[],[f6104_D])). 23.37/23.18 fof(f6104_D,plain,( 23.37/23.18 ( ! [X22] : (( ! [X23] : (~sP2897(X23) | ~r1(X22,X23)) ) <=> ~sP2898(X22)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2898])])). 23.37/23.18 fof(f42323,plain,( 23.37/23.18 ~sP2898(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f37966,f6106])). 23.37/23.18 fof(f6106,plain,( 23.37/23.18 ( ! [X21,X22] : (sP2899(X21) | ~sP2898(X22) | ~r1(X21,X22)) )), 23.37/23.18 inference(cnf_transformation,[],[f6106_D])). 23.37/23.18 fof(f6106_D,plain,( 23.37/23.18 ( ! [X21] : (( ! [X22] : (~sP2898(X22) | ~r1(X21,X22)) ) <=> ~sP2899(X21)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2899])])). 23.37/23.18 fof(f37966,plain,( 23.37/23.18 ~sP2899(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f33975,f6108])). 23.37/23.18 fof(f6108,plain,( 23.37/23.18 ( ! [X21,X20] : (sP2900(X20) | ~sP2899(X21) | ~r1(X20,X21)) )), 23.37/23.18 inference(cnf_transformation,[],[f6108_D])). 23.37/23.18 fof(f6108_D,plain,( 23.37/23.18 ( ! [X20] : (( ! [X21] : (~sP2899(X21) | ~r1(X20,X21)) ) <=> ~sP2900(X20)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2900])])). 23.37/23.18 fof(f33975,plain,( 23.37/23.18 ~sP2900(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f30319,f6110])). 23.37/23.18 fof(f6110,plain,( 23.37/23.18 ( ! [X19,X20] : (sP2901(X19) | ~sP2900(X20) | ~r1(X19,X20)) )), 23.37/23.18 inference(cnf_transformation,[],[f6110_D])). 23.37/23.18 fof(f6110_D,plain,( 23.37/23.18 ( ! [X19] : (( ! [X20] : (~sP2900(X20) | ~r1(X19,X20)) ) <=> ~sP2901(X19)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2901])])). 23.37/23.18 fof(f30319,plain,( 23.37/23.18 ~sP2901(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f27012,f6112])). 23.37/23.18 fof(f6112,plain,( 23.37/23.18 ( ! [X19,X18] : (sP2902(X18) | ~sP2901(X19) | ~r1(X18,X19)) )), 23.37/23.18 inference(cnf_transformation,[],[f6112_D])). 23.37/23.18 fof(f6112_D,plain,( 23.37/23.18 ( ! [X18] : (( ! [X19] : (~sP2901(X19) | ~r1(X18,X19)) ) <=> ~sP2902(X18)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2902])])). 23.37/23.18 fof(f27012,plain,( 23.37/23.18 ~sP2902(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f24023,f6114])). 23.37/23.18 fof(f6114,plain,( 23.37/23.18 ( ! [X17,X18] : (sP2903(X17) | ~sP2902(X18) | ~r1(X17,X18)) )), 23.37/23.18 inference(cnf_transformation,[],[f6114_D])). 23.37/23.18 fof(f6114_D,plain,( 23.37/23.18 ( ! [X17] : (( ! [X18] : (~sP2902(X18) | ~r1(X17,X18)) ) <=> ~sP2903(X17)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2903])])). 23.37/23.18 fof(f24023,plain,( 23.37/23.18 ~sP2903(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f21336,f6115])). 23.37/23.18 fof(f6115,plain,( 23.37/23.18 ( ! [X17,X16] : (~sP2903(X17) | ~sP2871(X16) | ~r1(X16,X17)) )), 23.37/23.18 inference(general_splitting,[],[f6113,f6114_D])). 23.37/23.18 fof(f6113,plain,( 23.37/23.18 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2902(X18)) )), 23.37/23.18 inference(general_splitting,[],[f6111,f6112_D])). 23.37/23.18 fof(f6111,plain,( 23.37/23.18 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2901(X19)) )), 23.37/23.18 inference(general_splitting,[],[f6109,f6110_D])). 23.37/23.18 fof(f6109,plain,( 23.37/23.18 ( ! [X19,X17,X20,X18,X16] : (~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2900(X20)) )), 23.37/23.18 inference(general_splitting,[],[f6107,f6108_D])). 23.37/23.18 fof(f6107,plain,( 23.37/23.18 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X19,X20) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2899(X21)) )), 23.37/23.18 inference(general_splitting,[],[f6105,f6106_D])). 23.37/23.18 fof(f6105,plain,( 23.37/23.18 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2898(X22)) )), 23.37/23.18 inference(general_splitting,[],[f6103,f6104_D])). 23.37/23.18 fof(f6103,plain,( 23.37/23.18 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2897(X23)) )), 23.37/23.18 inference(general_splitting,[],[f6101,f6102_D])). 23.37/23.18 fof(f6101,plain,( 23.37/23.18 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2896(X24)) )), 23.37/23.18 inference(general_splitting,[],[f6099,f6100_D])). 23.37/23.18 fof(f6099,plain,( 23.37/23.18 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2895(X25)) )), 23.37/23.18 inference(general_splitting,[],[f6097,f6098_D])). 23.37/23.18 fof(f6097,plain,( 23.37/23.18 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2894(X26)) )), 23.37/23.18 inference(general_splitting,[],[f6095,f6096_D])). 23.37/23.18 fof(f6095,plain,( 23.37/23.18 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2893(X27)) )), 23.37/23.18 inference(general_splitting,[],[f6093,f6094_D])). 23.37/23.18 fof(f6093,plain,( 23.37/23.18 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2892(X28)) )), 23.37/23.18 inference(general_splitting,[],[f6091,f6092_D])). 23.37/23.18 fof(f6091,plain,( 23.37/23.18 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2891(X29)) )), 23.37/23.18 inference(general_splitting,[],[f6089,f6090_D])). 23.37/23.18 fof(f6089,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2890(X30)) )), 23.37/23.18 inference(general_splitting,[],[f6087,f6088_D])). 23.37/23.18 fof(f6087,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2889(X31)) )), 23.37/23.18 inference(general_splitting,[],[f6085,f6086_D])). 23.37/23.18 fof(f6085,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2888(X32)) )), 23.37/23.18 inference(general_splitting,[],[f6083,f6084_D])). 23.37/23.18 fof(f6083,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2887(X33)) )), 23.37/23.18 inference(general_splitting,[],[f6081,f6082_D])). 23.37/23.18 fof(f6081,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2886(X34)) )), 23.37/23.18 inference(general_splitting,[],[f6079,f6080_D])). 23.37/23.18 fof(f6079,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2885(X35)) )), 23.37/23.18 inference(general_splitting,[],[f6077,f6078_D])). 23.37/23.18 fof(f6077,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2884(X36)) )), 23.37/23.18 inference(general_splitting,[],[f6075,f6076_D])). 23.37/23.18 fof(f6075,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2883(X37)) )), 23.37/23.18 inference(general_splitting,[],[f6073,f6074_D])). 23.37/23.18 fof(f6073,plain,( 23.37/23.18 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2882(X38)) )), 23.37/23.18 inference(general_splitting,[],[f6071,f6072_D])). 23.37/23.18 fof(f6071,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2881(X39)) )), 23.37/23.18 inference(general_splitting,[],[f6069,f6070_D])). 23.37/23.18 fof(f6069,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2880(X40)) )), 23.37/23.18 inference(general_splitting,[],[f6067,f6068_D])). 23.37/23.18 fof(f6067,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2879(X41)) )), 23.37/23.18 inference(general_splitting,[],[f6065,f6066_D])). 23.37/23.18 fof(f6065,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2878(X42)) )), 23.37/23.18 inference(general_splitting,[],[f6063,f6064_D])). 23.37/23.18 fof(f6063,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2877(X43)) )), 23.37/23.18 inference(general_splitting,[],[f6061,f6062_D])). 23.37/23.18 fof(f6061,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2876(X44)) )), 23.37/23.18 inference(general_splitting,[],[f6059,f6060_D])). 23.37/23.18 fof(f6059,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2875(X45)) )), 23.37/23.18 inference(general_splitting,[],[f6057,f6058_D])). 23.37/23.18 fof(f6057,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2874(X46)) )), 23.37/23.18 inference(general_splitting,[],[f6055,f6056_D])). 23.37/23.18 fof(f6055,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2873(X47)) )), 23.37/23.18 inference(general_splitting,[],[f6053,f6054_D])). 23.37/23.18 fof(f6053,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2871(X16) | ~sP2872(X48)) )), 23.37/23.18 inference(general_splitting,[],[f6051,f6052_D])). 23.37/23.18 fof(f6051,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X49,X16] : (~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2862(X49) | ~sP2871(X16)) )), 23.37/23.18 inference(general_splitting,[],[f6049,f6050_D])). 23.37/23.18 fof(f6050,plain,( 23.37/23.18 ( ! [X15,X16] : (sP2871(X16) | ~sP2870(X15) | ~r1(X15,X16)) )), 23.37/23.18 inference(cnf_transformation,[],[f6050_D])). 23.37/23.18 fof(f6050_D,plain,( 23.37/23.18 ( ! [X16] : (( ! [X15] : (~sP2870(X15) | ~r1(X15,X16)) ) <=> ~sP2871(X16)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2871])])). 23.37/23.18 fof(f6049,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2862(X49) | ~sP2870(X15)) )), 23.37/23.18 inference(general_splitting,[],[f6047,f6048_D])). 23.37/23.18 fof(f6048,plain,( 23.37/23.18 ( ! [X14,X15] : (sP2870(X15) | ~sP2869(X14) | ~r1(X14,X15)) )), 23.37/23.18 inference(cnf_transformation,[],[f6048_D])). 23.37/23.18 fof(f6048_D,plain,( 23.37/23.18 ( ! [X15] : (( ! [X14] : (~sP2869(X14) | ~r1(X14,X15)) ) <=> ~sP2870(X15)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2870])])). 23.37/23.18 fof(f6047,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2862(X49) | ~sP2869(X14)) )), 23.37/23.18 inference(general_splitting,[],[f6045,f6046_D])). 23.37/23.18 fof(f6046,plain,( 23.37/23.18 ( ! [X14,X13] : (sP2869(X14) | ~sP2868(X13) | ~r1(X13,X14)) )), 23.37/23.18 inference(cnf_transformation,[],[f6046_D])). 23.37/23.18 fof(f6046_D,plain,( 23.37/23.18 ( ! [X14] : (( ! [X13] : (~sP2868(X13) | ~r1(X13,X14)) ) <=> ~sP2869(X14)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2869])])). 23.37/23.18 fof(f6045,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~sP2862(X49) | ~sP2868(X13)) )), 23.37/23.18 inference(general_splitting,[],[f6043,f6044_D])). 23.37/23.18 fof(f6044,plain,( 23.37/23.18 ( ! [X12,X13] : (sP2868(X13) | ~sP2867(X12) | ~r1(X12,X13)) )), 23.37/23.18 inference(cnf_transformation,[],[f6044_D])). 23.37/23.18 fof(f6044_D,plain,( 23.37/23.18 ( ! [X13] : (( ! [X12] : (~sP2867(X12) | ~r1(X12,X13)) ) <=> ~sP2868(X13)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2868])])). 23.37/23.18 fof(f6043,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2862(X49) | ~sP2867(X12)) )), 23.37/23.18 inference(general_splitting,[],[f6041,f6042_D])). 23.37/23.18 fof(f6042,plain,( 23.37/23.18 ( ! [X12,X11] : (sP2867(X12) | ~sP2866(X11) | ~r1(X11,X12)) )), 23.37/23.18 inference(cnf_transformation,[],[f6042_D])). 23.37/23.18 fof(f6042_D,plain,( 23.37/23.18 ( ! [X12] : (( ! [X11] : (~sP2866(X11) | ~r1(X11,X12)) ) <=> ~sP2867(X12)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2867])])). 23.37/23.18 fof(f6041,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2862(X49) | ~sP2866(X11)) )), 23.37/23.18 inference(general_splitting,[],[f6039,f6040_D])). 23.37/23.18 fof(f6040,plain,( 23.37/23.18 ( ! [X10,X11] : (sP2866(X11) | ~sP2865(X10) | ~r1(X10,X11)) )), 23.37/23.18 inference(cnf_transformation,[],[f6040_D])). 23.37/23.18 fof(f6040_D,plain,( 23.37/23.18 ( ! [X11] : (( ! [X10] : (~sP2865(X10) | ~r1(X10,X11)) ) <=> ~sP2866(X11)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2866])])). 23.37/23.18 fof(f6039,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~sP2862(X49) | ~sP2865(X10)) )), 23.37/23.18 inference(general_splitting,[],[f6037,f6038_D])). 23.37/23.18 fof(f6038,plain,( 23.37/23.18 ( ! [X10,X9] : (sP2865(X10) | ~sP2864(X9) | ~r1(X9,X10)) )), 23.37/23.18 inference(cnf_transformation,[],[f6038_D])). 23.37/23.18 fof(f6038_D,plain,( 23.37/23.18 ( ! [X10] : (( ! [X9] : (~sP2864(X9) | ~r1(X9,X10)) ) <=> ~sP2865(X10)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2865])])). 23.37/23.18 fof(f6037,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2862(X49) | ~sP2864(X9)) )), 23.37/23.18 inference(general_splitting,[],[f6035,f6036_D])). 23.37/23.18 fof(f6036,plain,( 23.37/23.18 ( ! [X8,X9] : (sP2864(X9) | ~sP2863(X8) | ~r1(X8,X9)) )), 23.37/23.18 inference(cnf_transformation,[],[f6036_D])). 23.37/23.18 fof(f6036_D,plain,( 23.37/23.18 ( ! [X9] : (( ! [X8] : (~sP2863(X8) | ~r1(X8,X9)) ) <=> ~sP2864(X9)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2864])])). 23.37/23.18 fof(f6035,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2862(X49) | ~sP2863(X8)) )), 23.37/23.18 inference(general_splitting,[],[f6033,f6034_D])). 23.37/23.18 fof(f6034,plain,( 23.37/23.18 ( ! [X8,X7] : (sP2863(X8) | ~sP2859(X7) | ~r1(X7,X8)) )), 23.37/23.18 inference(cnf_transformation,[],[f6034_D])). 23.37/23.18 fof(f6034_D,plain,( 23.37/23.18 ( ! [X8] : (( ! [X7] : (~sP2859(X7) | ~r1(X7,X8)) ) <=> ~sP2863(X8)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2863])])). 23.37/23.18 fof(f6033,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2859(X7) | ~sP2862(X49)) )), 23.37/23.18 inference(general_splitting,[],[f6031,f6032_D])). 23.37/23.18 fof(f6031,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2859(X7) | ~sP2861(X50)) )), 23.37/23.18 inference(general_splitting,[],[f6029,f6030_D])). 23.37/23.18 fof(f6029,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2859(X7) | ~sP2860(X51)) )), 23.37/23.18 inference(general_splitting,[],[f6027,f6028_D])). 23.37/23.18 fof(f6027,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2854(X52) | ~sP2859(X7)) )), 23.37/23.18 inference(general_splitting,[],[f6025,f6026_D])). 23.37/23.18 fof(f6026,plain,( 23.37/23.18 ( ! [X6,X7] : (sP2859(X7) | ~sP2858(X6) | ~r1(X6,X7)) )), 23.37/23.18 inference(cnf_transformation,[],[f6026_D])). 23.37/23.18 fof(f6026_D,plain,( 23.37/23.18 ( ! [X7] : (( ! [X6] : (~sP2858(X6) | ~r1(X6,X7)) ) <=> ~sP2859(X7)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2859])])). 23.37/23.18 fof(f6025,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X6,X7) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2854(X52) | ~sP2858(X6)) )), 23.37/23.18 inference(general_splitting,[],[f6023,f6024_D])). 23.37/23.18 fof(f6024,plain,( 23.37/23.18 ( ! [X6,X5] : (sP2858(X6) | ~sP2857(X5) | ~r1(X5,X6)) )), 23.37/23.18 inference(cnf_transformation,[],[f6024_D])). 23.37/23.18 fof(f6024_D,plain,( 23.37/23.18 ( ! [X6] : (( ! [X5] : (~sP2857(X5) | ~r1(X5,X6)) ) <=> ~sP2858(X6)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2858])])). 23.37/23.18 fof(f6023,plain,( 23.37/23.18 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X6,X7) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP2854(X52) | ~sP2857(X5)) )), 23.37/23.18 inference(general_splitting,[],[f6021,f6022_D])). 23.37/23.18 fof(f6022,plain,( 23.37/23.18 ( ! [X4,X5] : (sP2857(X5) | ~sP2856(X4) | ~r1(X4,X5)) )), 23.37/23.18 inference(cnf_transformation,[],[f6022_D])). 23.37/23.18 fof(f6022_D,plain,( 23.37/23.18 ( ! [X5] : (( ! [X4] : (~sP2856(X4) | ~r1(X4,X5)) ) <=> ~sP2857(X5)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2857])])). 23.37/23.18 fof(f6021,plain,( 23.37/23.18 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X6,X7) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2854(X52) | ~sP2856(X4)) )), 23.37/23.18 inference(general_splitting,[],[f6019,f6020_D])). 23.37/23.18 fof(f6020,plain,( 23.37/23.18 ( ! [X4,X3] : (sP2856(X4) | ~sP2855(X3) | ~r1(X3,X4)) )), 23.37/23.18 inference(cnf_transformation,[],[f6020_D])). 23.37/23.18 fof(f6020_D,plain,( 23.37/23.18 ( ! [X4] : (( ! [X3] : (~sP2855(X3) | ~r1(X3,X4)) ) <=> ~sP2856(X4)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2856])])). 23.37/23.18 fof(f6019,plain,( 23.37/23.18 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X3,X4) | ~r1(X6,X7) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2854(X52) | ~sP2855(X3)) )), 23.37/23.18 inference(general_splitting,[],[f6017,f6018_D])). 23.37/23.18 fof(f6018,plain,( 23.37/23.18 ( ! [X2,X3] : (sP2855(X3) | ~sP2853(X2) | ~r1(X2,X3)) )), 23.37/23.18 inference(cnf_transformation,[],[f6018_D])). 23.37/23.18 fof(f6018_D,plain,( 23.37/23.18 ( ! [X3] : (( ! [X2] : (~sP2853(X2) | ~r1(X2,X3)) ) <=> ~sP2855(X3)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2855])])). 23.37/23.18 fof(f6017,plain,( 23.37/23.18 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X2,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2853(X2) | ~sP2854(X52)) )), 23.37/23.18 inference(general_splitting,[],[f6015,f6016_D])). 23.37/23.18 fof(f6015,plain,( 23.37/23.18 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X53,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X2,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X52,X53) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2852(X53) | ~sP2853(X2)) )), 23.37/23.18 inference(general_splitting,[],[f6013,f6014_D])). 23.37/23.18 fof(f6014,plain,( 23.37/23.18 ( ! [X2,X1] : (sP2853(X2) | ~r1(sK96,X1) | ~r1(X1,X2)) )), 23.37/23.18 inference(cnf_transformation,[],[f6014_D])). 23.37/23.18 fof(f6014_D,plain,( 23.37/23.18 ( ! [X2] : (( ! [X1] : (~r1(sK96,X1) | ~r1(X1,X2)) ) <=> ~sP2853(X2)) )), 23.37/23.18 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2853])])). 23.37/23.18 fof(f6013,plain,( 23.37/23.18 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X53,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X2,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X52,X53) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X2) | ~r1(sK96,X1) | ~sP2852(X53)) )), 23.37/23.18 inference(general_splitting,[],[f714,f6012_D])). 23.37/23.18 fof(f714,plain,( 23.37/23.18 ( ! [X28,X4,X33,X12,X41,X54,X17,X25,X38,X1,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X53,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X2,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X47,X48) | ~r1(X49,X50) | ~r1(X51,X52) | ~r1(X52,X53) | ~p1(X54) | ~p51(X54) | ~r1(X53,X54) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X2) | ~r1(sK96,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f360])). 23.37/23.18 fof(f21336,plain,( 23.37/23.18 sP2871(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f18920,f6050])). 23.37/23.18 fof(f18920,plain,( 23.37/23.18 sP2870(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f16367,f6048])). 23.37/23.18 fof(f16367,plain,( 23.37/23.18 sP2869(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f14182,f6046])). 23.37/23.18 fof(f14182,plain,( 23.37/23.18 sP2868(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f12649,f6044])). 23.37/23.18 fof(f12649,plain,( 23.37/23.18 sP2867(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f11067,f6042])). 23.37/23.18 fof(f11067,plain,( 23.37/23.18 sP2866(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f9991,f6040])). 23.37/23.18 fof(f9991,plain,( 23.37/23.18 sP2865(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f9137,f6038])). 23.37/23.18 fof(f9137,plain,( 23.37/23.18 sP2864(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f9098,f6036])). 23.37/23.18 fof(f9098,plain,( 23.37/23.18 sP2863(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f9063,f6034])). 23.37/23.18 fof(f9063,plain,( 23.37/23.18 sP2859(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f9032,f6026])). 23.37/23.18 fof(f9032,plain,( 23.37/23.18 sP2858(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f9005,f6024])). 23.37/23.18 fof(f9005,plain,( 23.37/23.18 sP2857(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f8982,f6022])). 23.37/23.18 fof(f8982,plain,( 23.37/23.18 sP2856(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f8964,f6020])). 23.37/23.18 fof(f8964,plain,( 23.37/23.18 sP2855(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f656,f8951,f6018])). 23.37/23.18 fof(f8951,plain,( 23.37/23.18 sP2853(sK100)), 23.37/23.18 inference(unit_resulting_resolution,[],[f706,f655,f6014])). 23.37/23.18 fof(f472132,plain,( 23.37/23.18 sP2847(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f448763,f6002])). 23.37/23.18 fof(f448763,plain,( 23.37/23.18 sP2846(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f425613,f6000])). 23.37/23.18 fof(f425613,plain,( 23.37/23.18 sP2845(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f402779,f5998])). 23.37/23.18 fof(f402779,plain,( 23.37/23.18 sP2844(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f378097,f5996])). 23.37/23.18 fof(f378097,plain,( 23.37/23.18 sP0(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f342623,f593])). 23.37/23.18 fof(f593,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP1(X0) | sP0(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f246])). 23.37/23.18 fof(f246,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (((~p4(X6) | ~p3(X6)) & (p4(X6) | p3(X6))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) & sP0(X1) & (r1(X1,sK94(X1)) & ~p4(sK94(X1))))) | ~sP1(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK94])],[f244,f245])). 23.37/23.18 fof(f245,plain,( 23.37/23.18 ! [X1] : (? [X7] : (r1(X1,X7) & ~p4(X7)) => (r1(X1,sK94(X1)) & ~p4(sK94(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f244,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (((~p4(X6) | ~p3(X6)) & (p4(X6) | p3(X6))) | ~r1(X5,X6)) | ~r1(X4,X5)))) | ~r1(X1,X2)) & sP0(X1) & ? [X7] : (r1(X1,X7) & ~p4(X7)))) | ~sP1(X0))), 23.37/23.18 inference(rectify,[],[f243])). 23.37/23.18 fof(f243,plain,( 23.37/23.18 ! [X559] : (! [X560] : (~r1(X559,X560) | (! [X561] : (! [X562] : (~r1(X561,X562) | ! [X563] : (~r1(X562,X563) | ! [X564] : (! [X565] : (((~p4(X565) | ~p3(X565)) & (p4(X565) | p3(X565))) | ~r1(X564,X565)) | ~r1(X563,X564)))) | ~r1(X560,X561)) & sP0(X560) & ? [X576] : (r1(X560,X576) & ~p4(X576)))) | ~sP1(X559))), 23.37/23.18 inference(nnf_transformation,[],[f11])). 23.37/23.18 fof(f342623,plain,( 23.37/23.18 sP1(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f320579,f590])). 23.37/23.18 fof(f590,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP2(X0) | ~r1(X0,X1) | sP1(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f242])). 23.37/23.18 fof(f242,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((sP1(X1) & (r1(X1,sK93(X1)) & ~p5(sK93(X1))) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ((p4(X8) | p5(X8)) & (~p5(X8) | ~p4(X8)))))) | ~r1(X4,X5)) | ~r1(X3,X4)))) | ~r1(X0,X1)) | ~sP2(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK93])],[f240,f241])). 23.37/23.18 fof(f241,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p5(X2)) => (r1(X1,sK93(X1)) & ~p5(sK93(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f240,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((sP1(X1) & ? [X2] : (r1(X1,X2) & ~p5(X2)) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ((p4(X8) | p5(X8)) & (~p5(X8) | ~p4(X8)))))) | ~r1(X4,X5)) | ~r1(X3,X4)))) | ~r1(X0,X1)) | ~sP2(X0))), 23.37/23.18 inference(rectify,[],[f239])). 23.37/23.18 fof(f239,plain,( 23.37/23.18 ! [X558] : (! [X559] : ((sP1(X559) & ? [X577] : (r1(X559,X577) & ~p5(X577)) & ! [X578] : (~r1(X559,X578) | ! [X579] : (! [X580] : (! [X581] : (~r1(X580,X581) | ! [X582] : (~r1(X581,X582) | ! [X583] : (~r1(X582,X583) | ((p4(X583) | p5(X583)) & (~p5(X583) | ~p4(X583)))))) | ~r1(X579,X580)) | ~r1(X578,X579)))) | ~r1(X558,X559)) | ~sP2(X558))), 23.37/23.18 inference(nnf_transformation,[],[f12])). 23.37/23.18 fof(f320579,plain,( 23.37/23.18 sP2(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f301688,f585])). 23.37/23.18 fof(f585,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP3(X0) | ~r1(X0,X1) | sP2(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f238])). 23.37/23.18 fof(f301688,plain,( 23.37/23.18 sP3(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f283575,f576])). 23.37/23.18 fof(f576,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP4(X0) | sP3(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f234])). 23.37/23.18 fof(f283575,plain,( 23.37/23.18 sP4(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f266216,f573])). 23.37/23.18 fof(f573,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP5(X0) | sP4(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f230])). 23.37/23.18 fof(f230,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (((~p7(X10) | ~p8(X10)) & (p7(X10) | p8(X10))) | ~r1(X9,X10)) | ~r1(X8,X9))) | ~r1(X6,X7))) | ~r1(X4,X5)) | ~r1(X3,X4)) | ~r1(X2,X3))) & sP4(X1) & (r1(X1,sK90(X1)) & ~p8(sK90(X1))))) | ~sP5(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK90])],[f228,f229])). 23.37/23.18 fof(f229,plain,( 23.37/23.18 ! [X1] : (? [X11] : (r1(X1,X11) & ~p8(X11)) => (r1(X1,sK90(X1)) & ~p8(sK90(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f228,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (((~p7(X10) | ~p8(X10)) & (p7(X10) | p8(X10))) | ~r1(X9,X10)) | ~r1(X8,X9))) | ~r1(X6,X7))) | ~r1(X4,X5)) | ~r1(X3,X4)) | ~r1(X2,X3))) & sP4(X1) & ? [X11] : (r1(X1,X11) & ~p8(X11)))) | ~sP5(X0))), 23.37/23.18 inference(rectify,[],[f227])). 23.37/23.18 fof(f227,plain,( 23.37/23.18 ! [X536] : (! [X538] : (~r1(X536,X538) | (! [X539] : (~r1(X538,X539) | ! [X540] : (! [X541] : (! [X542] : (! [X543] : (~r1(X542,X543) | ! [X544] : (! [X545] : (~r1(X544,X545) | ! [X546] : (! [X547] : (((~p7(X547) | ~p8(X547)) & (p7(X547) | p8(X547))) | ~r1(X546,X547)) | ~r1(X545,X546))) | ~r1(X543,X544))) | ~r1(X541,X542)) | ~r1(X540,X541)) | ~r1(X539,X540))) & sP4(X538) & ? [X592] : (r1(X538,X592) & ~p8(X592)))) | ~sP5(X536))), 23.37/23.18 inference(nnf_transformation,[],[f15])). 23.37/23.18 fof(f266216,plain,( 23.37/23.18 sP5(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f249592,f568])). 23.37/23.18 fof(f568,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP6(X0) | sP5(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f226])). 23.37/23.18 fof(f226,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | ((r1(X1,sK89(X1)) & ~p9(sK89(X1))) & sP5(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (((p8(X12) | p9(X12)) & (~p9(X12) | ~p8(X12))) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)))))) | ~sP6(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK89])],[f224,f225])). 23.37/23.18 fof(f225,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p9(X2)) => (r1(X1,sK89(X1)) & ~p9(sK89(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f224,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (? [X2] : (r1(X1,X2) & ~p9(X2)) & sP5(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (((p8(X12) | p9(X12)) & (~p9(X12) | ~p8(X12))) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)))))) | ~sP6(X0))), 23.37/23.18 inference(rectify,[],[f223])). 23.37/23.18 fof(f223,plain,( 23.37/23.18 ! [X523] : (! [X536] : (~r1(X523,X536) | (? [X537] : (r1(X536,X537) & ~p9(X537)) & sP5(X536) & ! [X593] : (~r1(X536,X593) | ! [X594] : (~r1(X593,X594) | ! [X595] : (! [X596] : (! [X597] : (! [X598] : (! [X599] : (~r1(X598,X599) | ! [X600] : (! [X601] : (! [X602] : (((p8(X602) | p9(X602)) & (~p9(X602) | ~p8(X602))) | ~r1(X601,X602)) | ~r1(X600,X601)) | ~r1(X599,X600))) | ~r1(X597,X598)) | ~r1(X596,X597)) | ~r1(X595,X596)) | ~r1(X594,X595)))))) | ~sP6(X523))), 23.37/23.18 inference(nnf_transformation,[],[f16])). 23.37/23.18 fof(f249592,plain,( 23.37/23.18 sP6(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f233702,f561])). 23.37/23.18 fof(f561,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP7(X0) | ~r1(X0,X1) | sP6(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f222])). 23.37/23.18 fof(f222,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ((~p10(X12) | ~p9(X12)) & (p10(X12) | p9(X12)))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9))))))) | ~r1(X2,X3)) | ~r1(X1,X2)) & (~p10(sK88(X1)) & r1(X1,sK88(X1))) & sP6(X1)) | ~r1(X0,X1)) | ~sP7(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK88])],[f220,f221])). 23.37/23.18 fof(f221,plain,( 23.37/23.18 ! [X1] : (? [X13] : (~p10(X13) & r1(X1,X13)) => (~p10(sK88(X1)) & r1(X1,sK88(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f220,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ((~p10(X12) | ~p9(X12)) & (p10(X12) | p9(X12)))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9))))))) | ~r1(X2,X3)) | ~r1(X1,X2)) & ? [X13] : (~p10(X13) & r1(X1,X13)) & sP6(X1)) | ~r1(X0,X1)) | ~sP7(X0))), 23.37/23.18 inference(rectify,[],[f219])). 23.37/23.18 fof(f219,plain,( 23.37/23.18 ! [X522] : (! [X523] : ((! [X524] : (! [X525] : (! [X526] : (~r1(X525,X526) | ! [X527] : (~r1(X526,X527) | ! [X528] : (~r1(X527,X528) | ! [X529] : (~r1(X528,X529) | ! [X530] : (~r1(X529,X530) | ! [X531] : (! [X532] : (! [X533] : (! [X534] : (~r1(X533,X534) | ((~p10(X534) | ~p9(X534)) & (p10(X534) | p9(X534)))) | ~r1(X532,X533)) | ~r1(X531,X532)) | ~r1(X530,X531))))))) | ~r1(X524,X525)) | ~r1(X523,X524)) & ? [X535] : (~p10(X535) & r1(X523,X535)) & sP6(X523)) | ~r1(X522,X523)) | ~sP7(X522))), 23.37/23.18 inference(nnf_transformation,[],[f17])). 23.37/23.18 fof(f233702,plain,( 23.37/23.18 sP7(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f218502,f560])). 23.37/23.18 fof(f560,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP8(X0) | sP7(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f218])). 23.37/23.18 fof(f218,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP7(X1) & (r1(X1,sK87(X1)) & ~p11(sK87(X1))) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ((p11(X14) | p10(X14)) & (~p11(X14) | ~p10(X14)))) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10))))))))))) | ~sP8(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK87])],[f216,f217])). 23.37/23.18 fof(f217,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p11(X2)) => (r1(X1,sK87(X1)) & ~p11(sK87(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f216,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP7(X1) & ? [X2] : (r1(X1,X2) & ~p11(X2)) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ((p11(X14) | p10(X14)) & (~p11(X14) | ~p10(X14)))) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10))))))))))) | ~sP8(X0))), 23.37/23.18 inference(rectify,[],[f215])). 23.37/23.18 fof(f215,plain,( 23.37/23.18 ! [X507] : (! [X522] : (~r1(X507,X522) | (sP7(X522) & ? [X603] : (r1(X522,X603) & ~p11(X603)) & ! [X604] : (~r1(X522,X604) | ! [X605] : (~r1(X604,X605) | ! [X606] : (~r1(X605,X606) | ! [X607] : (~r1(X606,X607) | ! [X608] : (~r1(X607,X608) | ! [X609] : (~r1(X608,X609) | ! [X610] : (~r1(X609,X610) | ! [X611] : (! [X612] : (! [X613] : (~r1(X612,X613) | ! [X614] : (! [X615] : (~r1(X614,X615) | ((p11(X615) | p10(X615)) & (~p11(X615) | ~p10(X615)))) | ~r1(X613,X614))) | ~r1(X611,X612)) | ~r1(X610,X611))))))))))) | ~sP8(X507))), 23.37/23.18 inference(nnf_transformation,[],[f18])). 23.37/23.18 fof(f218502,plain,( 23.37/23.18 sP8(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f204001,f551])). 23.37/23.18 fof(f551,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP9(X0) | sP8(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f214])). 23.37/23.18 fof(f214,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (~r1(X1,X2) | ! [X3] : (~r1(X2,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ((p12(X14) | p11(X14)) & (~p12(X14) | ~p11(X14))))))) | ~r1(X9,X10)))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4)))) & (r1(X1,sK86(X1)) & ~p12(sK86(X1))) & sP8(X1))) | ~sP9(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK86])],[f212,f213])). 23.37/23.18 fof(f213,plain,( 23.37/23.18 ! [X1] : (? [X15] : (r1(X1,X15) & ~p12(X15)) => (r1(X1,sK86(X1)) & ~p12(sK86(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f212,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (~r1(X1,X2) | ! [X3] : (~r1(X2,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ((p12(X14) | p11(X14)) & (~p12(X14) | ~p11(X14))))))) | ~r1(X9,X10)))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4)))) & ? [X15] : (r1(X1,X15) & ~p12(X15)) & sP8(X1))) | ~sP9(X0))), 23.37/23.18 inference(rectify,[],[f211])). 23.37/23.18 fof(f211,plain,( 23.37/23.18 ! [X505] : (! [X507] : (~r1(X505,X507) | (! [X508] : (~r1(X507,X508) | ! [X509] : (~r1(X508,X509) | ! [X510] : (! [X511] : (! [X512] : (! [X513] : (! [X514] : (~r1(X513,X514) | ! [X515] : (~r1(X514,X515) | ! [X516] : (! [X517] : (~r1(X516,X517) | ! [X518] : (~r1(X517,X518) | ! [X519] : (~r1(X518,X519) | ! [X520] : (~r1(X519,X520) | ((p12(X520) | p11(X520)) & (~p12(X520) | ~p11(X520))))))) | ~r1(X515,X516)))) | ~r1(X512,X513)) | ~r1(X511,X512)) | ~r1(X510,X511)) | ~r1(X509,X510)))) & ? [X521] : (r1(X507,X521) & ~p12(X521)) & sP8(X507))) | ~sP9(X505))), 23.37/23.18 inference(nnf_transformation,[],[f19])). 23.37/23.18 fof(f204001,plain,( 23.37/23.18 sP9(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f190173,f548])). 23.37/23.18 fof(f548,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP10(X0) | ~r1(X0,X1) | sP9(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f210])). 23.37/23.18 fof(f190173,plain,( 23.37/23.18 sP10(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f177010,f543])). 23.37/23.18 fof(f543,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP11(X0) | sP10(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f206])). 23.37/23.18 fof(f206,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | ((r1(X1,sK84(X1)) & ~p14(sK84(X1))) & sP10(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ((p14(X17) | p13(X17)) & (~p14(X17) | ~p13(X17)))) | ~r1(X15,X16))) | ~r1(X13,X14)))))) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6))) | ~r1(X3,X4))))) | ~sP11(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK84])],[f204,f205])). 23.37/23.18 fof(f205,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p14(X2)) => (r1(X1,sK84(X1)) & ~p14(sK84(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f204,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (? [X2] : (r1(X1,X2) & ~p14(X2)) & sP10(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ((p14(X17) | p13(X17)) & (~p14(X17) | ~p13(X17)))) | ~r1(X15,X16))) | ~r1(X13,X14)))))) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6))) | ~r1(X3,X4))))) | ~sP11(X0))), 23.37/23.18 inference(rectify,[],[f203])). 23.37/23.18 fof(f203,plain,( 23.37/23.18 ! [X502] : (! [X503] : (~r1(X502,X503) | (? [X504] : (r1(X503,X504) & ~p14(X504)) & sP10(X503) & ! [X630] : (~r1(X503,X630) | ! [X631] : (! [X632] : (~r1(X631,X632) | ! [X633] : (! [X634] : (~r1(X633,X634) | ! [X635] : (! [X636] : (! [X637] : (~r1(X636,X637) | ! [X638] : (~r1(X637,X638) | ! [X639] : (~r1(X638,X639) | ! [X640] : (~r1(X639,X640) | ! [X641] : (! [X642] : (~r1(X641,X642) | ! [X643] : (! [X644] : (~r1(X643,X644) | ((p14(X644) | p13(X644)) & (~p14(X644) | ~p13(X644)))) | ~r1(X642,X643))) | ~r1(X640,X641)))))) | ~r1(X635,X636)) | ~r1(X634,X635))) | ~r1(X632,X633))) | ~r1(X630,X631))))) | ~sP11(X502))), 23.37/23.18 inference(nnf_transformation,[],[f21])). 23.37/23.18 fof(f177010,plain,( 23.37/23.18 sP11(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f164487,f540])). 23.37/23.18 fof(f540,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP12(X0) | sP11(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f202])). 23.37/23.18 fof(f202,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP11(X1) & (~p15(sK83(X1)) & r1(X1,sK83(X1))) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (((~p14(X18) | ~p15(X18)) & (p14(X18) | p15(X18))) | ~r1(X17,X18))) | ~r1(X15,X16)))) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)))) | ~r1(X5,X6))) | ~r1(X3,X4)) | ~r1(X1,X3)))) | ~sP12(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK83])],[f200,f201])). 23.37/23.18 fof(f201,plain,( 23.37/23.18 ! [X1] : (? [X2] : (~p15(X2) & r1(X1,X2)) => (~p15(sK83(X1)) & r1(X1,sK83(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f200,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP11(X1) & ? [X2] : (~p15(X2) & r1(X1,X2)) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (((~p14(X18) | ~p15(X18)) & (p14(X18) | p15(X18))) | ~r1(X17,X18))) | ~r1(X15,X16)))) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9)))) | ~r1(X5,X6))) | ~r1(X3,X4)) | ~r1(X1,X3)))) | ~sP12(X0))), 23.37/23.18 inference(rectify,[],[f199])). 23.37/23.18 fof(f199,plain,( 23.37/23.18 ! [X501] : (! [X502] : (~r1(X501,X502) | (sP11(X502) & ? [X645] : (~p15(X645) & r1(X502,X645)) & ! [X646] : (! [X647] : (! [X648] : (~r1(X647,X648) | ! [X649] : (! [X650] : (~r1(X649,X650) | ! [X651] : (~r1(X650,X651) | ! [X652] : (! [X653] : (! [X654] : (! [X655] : (~r1(X654,X655) | ! [X656] : (! [X657] : (~r1(X656,X657) | ! [X658] : (~r1(X657,X658) | ! [X659] : (! [X660] : (~r1(X659,X660) | ! [X661] : (((~p14(X661) | ~p15(X661)) & (p14(X661) | p15(X661))) | ~r1(X660,X661))) | ~r1(X658,X659)))) | ~r1(X655,X656))) | ~r1(X653,X654)) | ~r1(X652,X653)) | ~r1(X651,X652)))) | ~r1(X648,X649))) | ~r1(X646,X647)) | ~r1(X502,X646)))) | ~sP12(X501))), 23.37/23.18 inference(nnf_transformation,[],[f22])). 23.37/23.18 fof(f164487,plain,( 23.37/23.18 sP12(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f152586,f535])). 23.37/23.18 fof(f535,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP13(X0) | sP12(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f198])). 23.37/23.18 fof(f198,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP12(X1) & (~p16(sK82(X1)) & r1(X1,sK82(X1))) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ((~p15(X19) | ~p16(X19)) & (p16(X19) | p15(X19))))) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)) | ~r1(X13,X14))) | ~r1(X11,X12))) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6))) | ~r1(X3,X4))))) | ~sP13(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK82])],[f196,f197])). 23.37/23.18 fof(f197,plain,( 23.37/23.18 ! [X1] : (? [X2] : (~p16(X2) & r1(X1,X2)) => (~p16(sK82(X1)) & r1(X1,sK82(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f196,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP12(X1) & ? [X2] : (~p16(X2) & r1(X1,X2)) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ((~p15(X19) | ~p16(X19)) & (p16(X19) | p15(X19))))) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)) | ~r1(X13,X14))) | ~r1(X11,X12))) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6))) | ~r1(X3,X4))))) | ~sP13(X0))), 23.37/23.18 inference(rectify,[],[f195])). 23.37/23.18 fof(f195,plain,( 23.37/23.18 ! [X481] : (! [X501] : (~r1(X481,X501) | (sP12(X501) & ? [X662] : (~p16(X662) & r1(X501,X662)) & ! [X663] : (~r1(X501,X663) | ! [X664] : (! [X665] : (~r1(X664,X665) | ! [X666] : (! [X667] : (! [X668] : (! [X669] : (~r1(X668,X669) | ! [X670] : (! [X671] : (~r1(X670,X671) | ! [X672] : (! [X673] : (~r1(X672,X673) | ! [X674] : (! [X675] : (! [X676] : (! [X677] : (! [X678] : (~r1(X677,X678) | ! [X679] : (~r1(X678,X679) | ((~p15(X679) | ~p16(X679)) & (p16(X679) | p15(X679))))) | ~r1(X676,X677)) | ~r1(X675,X676)) | ~r1(X674,X675)) | ~r1(X673,X674))) | ~r1(X671,X672))) | ~r1(X669,X670))) | ~r1(X667,X668)) | ~r1(X666,X667)) | ~r1(X665,X666))) | ~r1(X663,X664))))) | ~sP13(X481))), 23.37/23.18 inference(nnf_transformation,[],[f23])). 23.37/23.18 fof(f152586,plain,( 23.37/23.18 sP13(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f141303,f526])). 23.37/23.18 fof(f526,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP14(X0) | sP13(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f194])). 23.37/23.18 fof(f194,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (~r1(X18,X19) | ((p17(X19) | p16(X19)) & (~p16(X19) | ~p17(X19)))) | ~r1(X17,X18))))) | ~r1(X13,X14)) | ~r1(X12,X13))))))))) | ~r1(X4,X5))) | ~r1(X2,X3))) & (~p17(sK81(X1)) & r1(X1,sK81(X1))) & sP13(X1))) | ~sP14(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK81])],[f192,f193])). 23.37/23.18 fof(f193,plain,( 23.37/23.18 ! [X1] : (? [X20] : (~p17(X20) & r1(X1,X20)) => (~p17(sK81(X1)) & r1(X1,sK81(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f192,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (~r1(X18,X19) | ((p17(X19) | p16(X19)) & (~p16(X19) | ~p17(X19)))) | ~r1(X17,X18))))) | ~r1(X13,X14)) | ~r1(X12,X13))))))))) | ~r1(X4,X5))) | ~r1(X2,X3))) & ? [X20] : (~p17(X20) & r1(X1,X20)) & sP13(X1))) | ~sP14(X0))), 23.37/23.18 inference(rectify,[],[f191])). 23.37/23.18 fof(f191,plain,( 23.37/23.18 ! [X461] : (! [X481] : (~r1(X461,X481) | (! [X482] : (~r1(X481,X482) | ! [X483] : (! [X484] : (~r1(X483,X484) | ! [X485] : (! [X486] : (~r1(X485,X486) | ! [X487] : (~r1(X486,X487) | ! [X488] : (~r1(X487,X488) | ! [X489] : (~r1(X488,X489) | ! [X490] : (~r1(X489,X490) | ! [X491] : (~r1(X490,X491) | ! [X492] : (~r1(X491,X492) | ! [X493] : (! [X494] : (! [X495] : (~r1(X494,X495) | ! [X496] : (~r1(X495,X496) | ! [X497] : (~r1(X496,X497) | ! [X498] : (! [X499] : (~r1(X498,X499) | ((p17(X499) | p16(X499)) & (~p16(X499) | ~p17(X499)))) | ~r1(X497,X498))))) | ~r1(X493,X494)) | ~r1(X492,X493))))))))) | ~r1(X484,X485))) | ~r1(X482,X483))) & ? [X500] : (~p17(X500) & r1(X481,X500)) & sP13(X481))) | ~sP14(X461))), 23.37/23.18 inference(nnf_transformation,[],[f24])). 23.37/23.18 fof(f141303,plain,( 23.37/23.18 sP14(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f130605,f523])). 23.37/23.18 fof(f523,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP15(X0) | ~r1(X0,X1) | sP14(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f190])). 23.37/23.18 fof(f190,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((! [X2] : (~r1(X1,X2) | ! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ((p17(X20) | p18(X20)) & (~p17(X20) | ~p18(X20))))) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15))) | ~r1(X12,X13)))) | ~r1(X9,X10)) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))))) & sP14(X1) & (~p18(sK80(X1)) & r1(X1,sK80(X1)))) | ~r1(X0,X1)) | ~sP15(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK80])],[f188,f189])). 23.37/23.18 fof(f189,plain,( 23.37/23.18 ! [X1] : (? [X21] : (~p18(X21) & r1(X1,X21)) => (~p18(sK80(X1)) & r1(X1,sK80(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f188,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((! [X2] : (~r1(X1,X2) | ! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ((p17(X20) | p18(X20)) & (~p17(X20) | ~p18(X20))))) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15))) | ~r1(X12,X13)))) | ~r1(X9,X10)) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))))) & sP14(X1) & ? [X21] : (~p18(X21) & r1(X1,X21))) | ~r1(X0,X1)) | ~sP15(X0))), 23.37/23.18 inference(rectify,[],[f187])). 23.37/23.18 fof(f187,plain,( 23.37/23.18 ! [X459] : (! [X461] : ((! [X462] : (~r1(X461,X462) | ! [X463] : (~r1(X462,X463) | ! [X464] : (~r1(X463,X464) | ! [X465] : (! [X466] : (! [X467] : (! [X468] : (~r1(X467,X468) | ! [X469] : (! [X470] : (! [X471] : (~r1(X470,X471) | ! [X472] : (~r1(X471,X472) | ! [X473] : (! [X474] : (~r1(X473,X474) | ! [X475] : (! [X476] : (! [X477] : (! [X478] : (! [X479] : (~r1(X478,X479) | ! [X480] : (~r1(X479,X480) | ((p17(X480) | p18(X480)) & (~p17(X480) | ~p18(X480))))) | ~r1(X477,X478)) | ~r1(X476,X477)) | ~r1(X475,X476)) | ~r1(X474,X475))) | ~r1(X472,X473)))) | ~r1(X469,X470)) | ~r1(X468,X469))) | ~r1(X466,X467)) | ~r1(X465,X466)) | ~r1(X464,X465))))) & sP14(X461) & ? [X680] : (~p18(X680) & r1(X461,X680))) | ~r1(X459,X461)) | ~sP15(X459))), 23.37/23.18 inference(nnf_transformation,[],[f25])). 23.37/23.18 fof(f130605,plain,( 23.37/23.18 sP15(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f120491,f518])). 23.37/23.18 fof(f518,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP16(X0) | ~r1(X0,X1) | sP15(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f186])). 23.37/23.18 fof(f186,plain,( 23.37/23.18 ! [X0] : (! [X1] : (((r1(X1,sK79(X1)) & ~p19(sK79(X1))) & sP15(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (((p18(X22) | p19(X22)) & (~p18(X22) | ~p19(X22))) | ~r1(X21,X22))) | ~r1(X19,X20)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)))))) | ~r1(X9,X10))) | ~r1(X7,X8)))) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP16(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK79])],[f184,f185])). 23.37/23.18 fof(f185,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p19(X2)) => (r1(X1,sK79(X1)) & ~p19(sK79(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f184,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((? [X2] : (r1(X1,X2) & ~p19(X2)) & sP15(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (((p18(X22) | p19(X22)) & (~p18(X22) | ~p19(X22))) | ~r1(X21,X22))) | ~r1(X19,X20)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)))))) | ~r1(X9,X10))) | ~r1(X7,X8)))) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP16(X0))), 23.37/23.18 inference(rectify,[],[f183])). 23.37/23.18 fof(f183,plain,( 23.37/23.18 ! [X457] : (! [X459] : ((? [X460] : (r1(X459,X460) & ~p19(X460)) & sP15(X459) & ! [X681] : (! [X682] : (~r1(X681,X682) | ! [X683] : (! [X684] : (~r1(X683,X684) | ! [X685] : (~r1(X684,X685) | ! [X686] : (! [X687] : (~r1(X686,X687) | ! [X688] : (! [X689] : (~r1(X688,X689) | ! [X690] : (~r1(X689,X690) | ! [X691] : (~r1(X690,X691) | ! [X692] : (~r1(X691,X692) | ! [X693] : (! [X694] : (! [X695] : (! [X696] : (~r1(X695,X696) | ! [X697] : (! [X698] : (! [X699] : (~r1(X698,X699) | ! [X700] : (((p18(X700) | p19(X700)) & (~p18(X700) | ~p19(X700))) | ~r1(X699,X700))) | ~r1(X697,X698)) | ~r1(X696,X697))) | ~r1(X694,X695)) | ~r1(X693,X694)) | ~r1(X692,X693)))))) | ~r1(X687,X688))) | ~r1(X685,X686)))) | ~r1(X682,X683))) | ~r1(X459,X681))) | ~r1(X457,X459)) | ~sP16(X457))), 23.37/23.18 inference(nnf_transformation,[],[f26])). 23.37/23.18 fof(f120491,plain,( 23.37/23.18 sP16(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f110931,f513])). 23.37/23.18 fof(f513,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP17(X0) | ~r1(X0,X1) | sP16(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f182])). 23.37/23.18 fof(f182,plain,( 23.37/23.18 ! [X0] : (! [X1] : (((r1(X1,sK78(X1)) & ~p20(sK78(X1))) & sP16(X1) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (((~p19(X23) | ~p20(X23)) & (p19(X23) | p20(X23))) | ~r1(X22,X23)) | ~r1(X21,X22))))))) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6))) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP17(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK78])],[f180,f181])). 23.37/23.18 fof(f181,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p20(X2)) => (r1(X1,sK78(X1)) & ~p20(sK78(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f180,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((? [X2] : (r1(X1,X2) & ~p20(X2)) & sP16(X1) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (((~p19(X23) | ~p20(X23)) & (p19(X23) | p20(X23))) | ~r1(X22,X23)) | ~r1(X21,X22))))))) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6))) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP17(X0))), 23.37/23.18 inference(rectify,[],[f179])). 23.37/23.18 fof(f179,plain,( 23.37/23.18 ! [X455] : (! [X457] : ((? [X458] : (r1(X457,X458) & ~p20(X458)) & sP16(X457) & ! [X701] : (! [X702] : (! [X703] : (~r1(X702,X703) | ! [X704] : (! [X705] : (! [X706] : (! [X707] : (! [X708] : (~r1(X707,X708) | ! [X709] : (! [X710] : (! [X711] : (! [X712] : (~r1(X711,X712) | ! [X713] : (~r1(X712,X713) | ! [X714] : (! [X715] : (~r1(X714,X715) | ! [X716] : (~r1(X715,X716) | ! [X717] : (~r1(X716,X717) | ! [X718] : (~r1(X717,X718) | ! [X719] : (~r1(X718,X719) | ! [X720] : (! [X721] : (((~p19(X721) | ~p20(X721)) & (p19(X721) | p20(X721))) | ~r1(X720,X721)) | ~r1(X719,X720))))))) | ~r1(X713,X714)))) | ~r1(X710,X711)) | ~r1(X709,X710)) | ~r1(X708,X709))) | ~r1(X706,X707)) | ~r1(X705,X706)) | ~r1(X704,X705)) | ~r1(X703,X704))) | ~r1(X701,X702)) | ~r1(X457,X701))) | ~r1(X455,X457)) | ~sP17(X455))), 23.37/23.18 inference(nnf_transformation,[],[f27])). 23.37/23.18 fof(f110931,plain,( 23.37/23.18 sP17(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f101927,f508])). 23.37/23.18 fof(f508,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP18(X0) | ~r1(X0,X1) | sP17(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f178])). 23.37/23.18 fof(f178,plain,( 23.37/23.18 ! [X0] : (! [X1] : (((r1(X1,sK77(X1)) & ~p21(sK77(X1))) & sP17(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (((~p21(X24) | ~p20(X24)) & (p20(X24) | p21(X24))) | ~r1(X23,X24)) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)))) | ~r1(X14,X15)) | ~r1(X13,X14))) | ~r1(X11,X12))) | ~r1(X9,X10)) | ~r1(X8,X9))) | ~r1(X6,X7))) | ~r1(X4,X5))))) | ~r1(X0,X1)) | ~sP18(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK77])],[f176,f177])). 23.37/23.18 fof(f177,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p21(X2)) => (r1(X1,sK77(X1)) & ~p21(sK77(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f176,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((? [X2] : (r1(X1,X2) & ~p21(X2)) & sP17(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (((~p21(X24) | ~p20(X24)) & (p20(X24) | p21(X24))) | ~r1(X23,X24)) | ~r1(X22,X23))) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18)))) | ~r1(X14,X15)) | ~r1(X13,X14))) | ~r1(X11,X12))) | ~r1(X9,X10)) | ~r1(X8,X9))) | ~r1(X6,X7))) | ~r1(X4,X5))))) | ~r1(X0,X1)) | ~sP18(X0))), 23.37/23.18 inference(rectify,[],[f175])). 23.37/23.18 fof(f175,plain,( 23.37/23.18 ! [X431] : (! [X455] : ((? [X456] : (r1(X455,X456) & ~p21(X456)) & sP17(X455) & ! [X722] : (~r1(X455,X722) | ! [X723] : (~r1(X722,X723) | ! [X724] : (! [X725] : (~r1(X724,X725) | ! [X726] : (! [X727] : (~r1(X726,X727) | ! [X728] : (! [X729] : (! [X730] : (~r1(X729,X730) | ! [X731] : (! [X732] : (~r1(X731,X732) | ! [X733] : (! [X734] : (! [X735] : (~r1(X734,X735) | ! [X736] : (~r1(X735,X736) | ! [X737] : (! [X738] : (! [X739] : (~r1(X738,X739) | ! [X740] : (! [X741] : (~r1(X740,X741) | ! [X742] : (! [X743] : (((~p21(X743) | ~p20(X743)) & (p20(X743) | p21(X743))) | ~r1(X742,X743)) | ~r1(X741,X742))) | ~r1(X739,X740))) | ~r1(X737,X738)) | ~r1(X736,X737)))) | ~r1(X733,X734)) | ~r1(X732,X733))) | ~r1(X730,X731))) | ~r1(X728,X729)) | ~r1(X727,X728))) | ~r1(X725,X726))) | ~r1(X723,X724))))) | ~r1(X431,X455)) | ~sP18(X431))), 23.37/23.18 inference(nnf_transformation,[],[f28])). 23.37/23.18 fof(f101927,plain,( 23.37/23.18 sP18(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f93446,f503])). 23.37/23.18 fof(f503,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP19(X0) | sP18(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f174])). 23.37/23.18 fof(f174,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ((~p21(X24) | ~p22(X24)) & (p21(X24) | p22(X24))))) | ~r1(X21,X22)))) | ~r1(X18,X19))) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9))))) | ~r1(X4,X5)))) | ~r1(X1,X2)) & sP18(X1) & (~p22(sK76(X1)) & r1(X1,sK76(X1))))) | ~sP19(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK76])],[f172,f173])). 23.37/23.18 fof(f173,plain,( 23.37/23.18 ! [X1] : (? [X25] : (~p22(X25) & r1(X1,X25)) => (~p22(sK76(X1)) & r1(X1,sK76(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f172,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ((~p21(X24) | ~p22(X24)) & (p21(X24) | p22(X24))))) | ~r1(X21,X22)))) | ~r1(X18,X19))) | ~r1(X16,X17)))) | ~r1(X13,X14)) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9))))) | ~r1(X4,X5)))) | ~r1(X1,X2)) & sP18(X1) & ? [X25] : (~p22(X25) & r1(X1,X25)))) | ~sP19(X0))), 23.37/23.18 inference(rectify,[],[f171])). 23.37/23.18 fof(f171,plain,( 23.37/23.18 ! [X429] : (! [X431] : (~r1(X429,X431) | (! [X432] : (! [X433] : (~r1(X432,X433) | ! [X434] : (~r1(X433,X434) | ! [X435] : (! [X436] : (~r1(X435,X436) | ! [X437] : (~r1(X436,X437) | ! [X438] : (~r1(X437,X438) | ! [X439] : (! [X440] : (~r1(X439,X440) | ! [X441] : (! [X442] : (! [X443] : (! [X444] : (! [X445] : (~r1(X444,X445) | ! [X446] : (~r1(X445,X446) | ! [X447] : (! [X448] : (~r1(X447,X448) | ! [X449] : (! [X450] : (~r1(X449,X450) | ! [X451] : (~r1(X450,X451) | ! [X452] : (! [X453] : (~r1(X452,X453) | ! [X454] : (~r1(X453,X454) | ((~p21(X454) | ~p22(X454)) & (p21(X454) | p22(X454))))) | ~r1(X451,X452)))) | ~r1(X448,X449))) | ~r1(X446,X447)))) | ~r1(X443,X444)) | ~r1(X442,X443)) | ~r1(X441,X442)) | ~r1(X440,X441))) | ~r1(X438,X439))))) | ~r1(X434,X435)))) | ~r1(X431,X432)) & sP18(X431) & ? [X744] : (~p22(X744) & r1(X431,X744)))) | ~sP19(X429))), 23.37/23.18 inference(nnf_transformation,[],[f29])). 23.37/23.18 fof(f93446,plain,( 23.37/23.18 sP19(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f85482,f498])). 23.37/23.18 fof(f498,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP20(X0) | sP19(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f170])). 23.37/23.18 fof(f170,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | ((~p23(sK75(X1)) & r1(X1,sK75(X1))) & sP19(X1) & ! [X3] : (! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (((~p22(X26) | ~p23(X26)) & (p22(X26) | p23(X26))) | ~r1(X25,X26)) | ~r1(X24,X25)))))) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16))) | ~r1(X13,X14)) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4)) | ~r1(X1,X3)))) | ~sP20(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK75])],[f168,f169])). 23.37/23.18 fof(f169,plain,( 23.37/23.18 ! [X1] : (? [X2] : (~p23(X2) & r1(X1,X2)) => (~p23(sK75(X1)) & r1(X1,sK75(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f168,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (? [X2] : (~p23(X2) & r1(X1,X2)) & sP19(X1) & ! [X3] : (! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (((~p22(X26) | ~p23(X26)) & (p22(X26) | p23(X26))) | ~r1(X25,X26)) | ~r1(X24,X25)))))) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16))) | ~r1(X13,X14)) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4)) | ~r1(X1,X3)))) | ~sP20(X0))), 23.37/23.18 inference(rectify,[],[f167])). 23.37/23.18 fof(f167,plain,( 23.37/23.18 ! [X427] : (! [X429] : (~r1(X427,X429) | (? [X430] : (~p23(X430) & r1(X429,X430)) & sP19(X429) & ! [X745] : (! [X746] : (! [X747] : (! [X748] : (! [X749] : (! [X750] : (! [X751] : (! [X752] : (~r1(X751,X752) | ! [X753] : (! [X754] : (! [X755] : (! [X756] : (! [X757] : (~r1(X756,X757) | ! [X758] : (! [X759] : (! [X760] : (! [X761] : (! [X762] : (! [X763] : (~r1(X762,X763) | ! [X764] : (~r1(X763,X764) | ! [X765] : (~r1(X764,X765) | ! [X766] : (~r1(X765,X766) | ! [X767] : (! [X768] : (((~p22(X768) | ~p23(X768)) & (p22(X768) | p23(X768))) | ~r1(X767,X768)) | ~r1(X766,X767)))))) | ~r1(X761,X762)) | ~r1(X760,X761)) | ~r1(X759,X760)) | ~r1(X758,X759)) | ~r1(X757,X758))) | ~r1(X755,X756)) | ~r1(X754,X755)) | ~r1(X753,X754)) | ~r1(X752,X753))) | ~r1(X750,X751)) | ~r1(X749,X750)) | ~r1(X748,X749)) | ~r1(X747,X748)) | ~r1(X746,X747)) | ~r1(X745,X746)) | ~r1(X429,X745)))) | ~sP20(X427))), 23.37/23.18 inference(nnf_transformation,[],[f30])). 23.37/23.18 fof(f85482,plain,( 23.37/23.18 sP20(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f78027,f493])). 23.37/23.18 fof(f493,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP21(X0) | ~r1(X0,X1) | sP20(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f166])). 23.37/23.18 fof(f166,plain,( 23.37/23.18 ! [X0] : (! [X1] : (((r1(X1,sK74(X1)) & ~p24(sK74(X1))) & sP20(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (! [X15] : (! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ((p23(X27) | p24(X27)) & (~p24(X27) | ~p23(X27)))))) | ~r1(X23,X24))) | ~r1(X21,X22))) | ~r1(X19,X20)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)) | ~r1(X13,X14)) | ~r1(X12,X13)) | ~r1(X11,X12)))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP21(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK74])],[f164,f165])). 23.37/23.18 fof(f165,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p24(X2)) => (r1(X1,sK74(X1)) & ~p24(sK74(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f164,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((? [X2] : (r1(X1,X2) & ~p24(X2)) & sP20(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (! [X15] : (! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ((p23(X27) | p24(X27)) & (~p24(X27) | ~p23(X27)))))) | ~r1(X23,X24))) | ~r1(X21,X22))) | ~r1(X19,X20)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)) | ~r1(X13,X14)) | ~r1(X12,X13)) | ~r1(X11,X12)))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP21(X0))), 23.37/23.18 inference(rectify,[],[f163])). 23.37/23.18 fof(f163,plain,( 23.37/23.18 ! [X426] : (! [X427] : ((? [X428] : (r1(X427,X428) & ~p24(X428)) & sP20(X427) & ! [X769] : (! [X770] : (~r1(X769,X770) | ! [X771] : (! [X772] : (! [X773] : (! [X774] : (! [X775] : (! [X776] : (~r1(X775,X776) | ! [X777] : (~r1(X776,X777) | ! [X778] : (! [X779] : (! [X780] : (! [X781] : (! [X782] : (! [X783] : (! [X784] : (~r1(X783,X784) | ! [X785] : (! [X786] : (! [X787] : (~r1(X786,X787) | ! [X788] : (! [X789] : (~r1(X788,X789) | ! [X790] : (! [X791] : (~r1(X790,X791) | ! [X792] : (~r1(X791,X792) | ! [X793] : (~r1(X792,X793) | ((p23(X793) | p24(X793)) & (~p24(X793) | ~p23(X793)))))) | ~r1(X789,X790))) | ~r1(X787,X788))) | ~r1(X785,X786)) | ~r1(X784,X785))) | ~r1(X782,X783)) | ~r1(X781,X782)) | ~r1(X780,X781)) | ~r1(X779,X780)) | ~r1(X778,X779)) | ~r1(X777,X778)))) | ~r1(X774,X775)) | ~r1(X773,X774)) | ~r1(X772,X773)) | ~r1(X771,X772)) | ~r1(X770,X771))) | ~r1(X427,X769))) | ~r1(X426,X427)) | ~sP21(X426))), 23.37/23.18 inference(nnf_transformation,[],[f31])). 23.37/23.18 fof(f78027,plain,( 23.37/23.18 sP21(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f71035,f490])). 23.37/23.18 fof(f490,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP22(X0) | ~r1(X0,X1) | sP21(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f162])). 23.37/23.18 fof(f162,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((sP21(X1) & (~p25(sK73(X1)) & r1(X1,sK73(X1))) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (((~p25(X28) | ~p24(X28)) & (p25(X28) | p24(X28))) | ~r1(X27,X28)) | ~r1(X26,X27))) | ~r1(X24,X25)))))) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16)) | ~r1(X14,X15))))) | ~r1(X10,X11))) | ~r1(X8,X9))))) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP22(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK73])],[f160,f161])). 23.37/23.18 fof(f161,plain,( 23.37/23.18 ! [X1] : (? [X2] : (~p25(X2) & r1(X1,X2)) => (~p25(sK73(X1)) & r1(X1,sK73(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f160,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((sP21(X1) & ? [X2] : (~p25(X2) & r1(X1,X2)) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (((~p25(X28) | ~p24(X28)) & (p25(X28) | p24(X28))) | ~r1(X27,X28)) | ~r1(X26,X27))) | ~r1(X24,X25)))))) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16)) | ~r1(X14,X15))))) | ~r1(X10,X11))) | ~r1(X8,X9))))) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP22(X0))), 23.37/23.18 inference(rectify,[],[f159])). 23.37/23.18 fof(f159,plain,( 23.37/23.18 ! [X398] : (! [X426] : ((sP21(X426) & ? [X794] : (~p25(X794) & r1(X426,X794)) & ! [X795] : (! [X796] : (~r1(X795,X796) | ! [X797] : (! [X798] : (~r1(X797,X798) | ! [X799] : (~r1(X798,X799) | ! [X800] : (~r1(X799,X800) | ! [X801] : (! [X802] : (~r1(X801,X802) | ! [X803] : (! [X804] : (~r1(X803,X804) | ! [X805] : (~r1(X804,X805) | ! [X806] : (~r1(X805,X806) | ! [X807] : (! [X808] : (! [X809] : (~r1(X808,X809) | ! [X810] : (! [X811] : (! [X812] : (! [X813] : (~r1(X812,X813) | ! [X814] : (~r1(X813,X814) | ! [X815] : (~r1(X814,X815) | ! [X816] : (~r1(X815,X816) | ! [X817] : (! [X818] : (~r1(X817,X818) | ! [X819] : (! [X820] : (((~p25(X820) | ~p24(X820)) & (p25(X820) | p24(X820))) | ~r1(X819,X820)) | ~r1(X818,X819))) | ~r1(X816,X817)))))) | ~r1(X811,X812)) | ~r1(X810,X811)) | ~r1(X809,X810))) | ~r1(X807,X808)) | ~r1(X806,X807))))) | ~r1(X802,X803))) | ~r1(X800,X801))))) | ~r1(X796,X797))) | ~r1(X426,X795))) | ~r1(X398,X426)) | ~sP22(X398))), 23.37/23.18 inference(nnf_transformation,[],[f32])). 23.37/23.18 fof(f71035,plain,( 23.37/23.18 sP22(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f64510,f483])). 23.37/23.18 fof(f483,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP23(X0) | sP22(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f158])). 23.37/23.18 fof(f158,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ((~p25(X28) | ~p26(X28)) & (p25(X28) | p26(X28)))))) | ~r1(X24,X25))) | ~r1(X22,X23))) | ~r1(X20,X21)))))) | ~r1(X15,X16))) | ~r1(X13,X14)))))))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4))) | ~r1(X1,X2)) & sP22(X1) & (r1(X1,sK72(X1)) & ~p26(sK72(X1))))) | ~sP23(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK72])],[f156,f157])). 23.37/23.18 fof(f157,plain,( 23.37/23.18 ! [X1] : (? [X29] : (r1(X1,X29) & ~p26(X29)) => (r1(X1,sK72(X1)) & ~p26(sK72(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f156,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ((~p25(X28) | ~p26(X28)) & (p25(X28) | p26(X28)))))) | ~r1(X24,X25))) | ~r1(X22,X23))) | ~r1(X20,X21)))))) | ~r1(X15,X16))) | ~r1(X13,X14)))))))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4))) | ~r1(X1,X2)) & sP22(X1) & ? [X29] : (r1(X1,X29) & ~p26(X29)))) | ~sP23(X0))), 23.37/23.18 inference(rectify,[],[f155])). 23.37/23.18 fof(f155,plain,( 23.37/23.18 ! [X396] : (! [X398] : (~r1(X396,X398) | (! [X399] : (! [X400] : (~r1(X399,X400) | ! [X401] : (! [X402] : (! [X403] : (! [X404] : (! [X405] : (~r1(X404,X405) | ! [X406] : (~r1(X405,X406) | ! [X407] : (~r1(X406,X407) | ! [X408] : (~r1(X407,X408) | ! [X409] : (~r1(X408,X409) | ! [X410] : (~r1(X409,X410) | ! [X411] : (! [X412] : (~r1(X411,X412) | ! [X413] : (! [X414] : (~r1(X413,X414) | ! [X415] : (~r1(X414,X415) | ! [X416] : (~r1(X415,X416) | ! [X417] : (~r1(X416,X417) | ! [X418] : (! [X419] : (~r1(X418,X419) | ! [X420] : (! [X421] : (~r1(X420,X421) | ! [X422] : (! [X423] : (~r1(X422,X423) | ! [X424] : (~r1(X423,X424) | ! [X425] : (~r1(X424,X425) | ((~p25(X425) | ~p26(X425)) & (p25(X425) | p26(X425)))))) | ~r1(X421,X422))) | ~r1(X419,X420))) | ~r1(X417,X418)))))) | ~r1(X412,X413))) | ~r1(X410,X411)))))))) | ~r1(X403,X404)) | ~r1(X402,X403)) | ~r1(X401,X402)) | ~r1(X400,X401))) | ~r1(X398,X399)) & sP22(X398) & ? [X821] : (r1(X398,X821) & ~p26(X821)))) | ~sP23(X396))), 23.37/23.18 inference(nnf_transformation,[],[f33])). 23.37/23.18 fof(f64510,plain,( 23.37/23.18 sP23(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f56444,f478])). 23.37/23.18 fof(f478,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP24(X0) | ~r1(X0,X1) | sP23(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f154])). 23.37/23.18 fof(f154,plain,( 23.37/23.18 ! [X0] : (! [X1] : (((r1(X1,sK71(X1)) & ~p27(sK71(X1))) & sP23(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ((~p26(X30) | ~p27(X30)) & (p27(X30) | p26(X30)))) | ~r1(X28,X29)) | ~r1(X27,X28)) | ~r1(X26,X27)) | ~r1(X25,X26)) | ~r1(X24,X25)))))) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16)) | ~r1(X14,X15))))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9))))))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP24(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK71])],[f152,f153])). 23.37/23.18 fof(f153,plain,( 23.37/23.18 ! [X1] : (? [X2] : (r1(X1,X2) & ~p27(X2)) => (r1(X1,sK71(X1)) & ~p27(sK71(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f152,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((? [X2] : (r1(X1,X2) & ~p27(X2)) & sP23(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ((~p26(X30) | ~p27(X30)) & (p27(X30) | p26(X30)))) | ~r1(X28,X29)) | ~r1(X27,X28)) | ~r1(X26,X27)) | ~r1(X25,X26)) | ~r1(X24,X25)))))) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16)) | ~r1(X14,X15))))) | ~r1(X10,X11)) | ~r1(X9,X10)) | ~r1(X8,X9))))))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP24(X0))), 23.37/23.18 inference(rectify,[],[f151])). 23.37/23.18 fof(f151,plain,( 23.37/23.18 ! [X395] : (! [X396] : ((? [X397] : (r1(X396,X397) & ~p27(X397)) & sP23(X396) & ! [X822] : (! [X823] : (~r1(X822,X823) | ! [X824] : (~r1(X823,X824) | ! [X825] : (~r1(X824,X825) | ! [X826] : (~r1(X825,X826) | ! [X827] : (~r1(X826,X827) | ! [X828] : (! [X829] : (! [X830] : (! [X831] : (~r1(X830,X831) | ! [X832] : (~r1(X831,X832) | ! [X833] : (~r1(X832,X833) | ! [X834] : (! [X835] : (! [X836] : (~r1(X835,X836) | ! [X837] : (! [X838] : (! [X839] : (! [X840] : (~r1(X839,X840) | ! [X841] : (~r1(X840,X841) | ! [X842] : (~r1(X841,X842) | ! [X843] : (~r1(X842,X843) | ! [X844] : (! [X845] : (! [X846] : (! [X847] : (! [X848] : (! [X849] : (~r1(X848,X849) | ((~p26(X849) | ~p27(X849)) & (p27(X849) | p26(X849)))) | ~r1(X847,X848)) | ~r1(X846,X847)) | ~r1(X845,X846)) | ~r1(X844,X845)) | ~r1(X843,X844)))))) | ~r1(X838,X839)) | ~r1(X837,X838)) | ~r1(X836,X837))) | ~r1(X834,X835)) | ~r1(X833,X834))))) | ~r1(X829,X830)) | ~r1(X828,X829)) | ~r1(X827,X828))))))) | ~r1(X396,X822))) | ~r1(X395,X396)) | ~sP24(X395))), 23.37/23.18 inference(nnf_transformation,[],[f34])). 23.37/23.18 fof(f56444,plain,( 23.37/23.18 sP24(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f49745,f475])). 23.37/23.18 fof(f475,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP25(X0) | ~r1(X0,X1) | sP24(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f150])). 23.37/23.18 fof(f150,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((sP24(X1) & (~p28(sK70(X1)) & r1(X1,sK70(X1))) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (((p27(X31) | p28(X31)) & (~p28(X31) | ~p27(X31))) | ~r1(X30,X31)) | ~r1(X29,X30))) | ~r1(X27,X28)) | ~r1(X26,X27))) | ~r1(X24,X25))) | ~r1(X22,X23)) | ~r1(X21,X22))) | ~r1(X19,X20)))))) | ~r1(X14,X15)) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10))))) | ~r1(X5,X6))) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP25(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK70])],[f148,f149])). 23.37/23.18 fof(f149,plain,( 23.37/23.18 ! [X1] : (? [X2] : (~p28(X2) & r1(X1,X2)) => (~p28(sK70(X1)) & r1(X1,sK70(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f148,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((sP24(X1) & ? [X2] : (~p28(X2) & r1(X1,X2)) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (((p27(X31) | p28(X31)) & (~p28(X31) | ~p27(X31))) | ~r1(X30,X31)) | ~r1(X29,X30))) | ~r1(X27,X28)) | ~r1(X26,X27))) | ~r1(X24,X25))) | ~r1(X22,X23)) | ~r1(X21,X22))) | ~r1(X19,X20)))))) | ~r1(X14,X15)) | ~r1(X13,X14)) | ~r1(X12,X13))) | ~r1(X10,X11)) | ~r1(X9,X10))))) | ~r1(X5,X6))) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP25(X0))), 23.37/23.18 inference(rectify,[],[f147])). 23.37/23.18 fof(f147,plain,( 23.37/23.18 ! [X364] : (! [X395] : ((sP24(X395) & ? [X850] : (~p28(X850) & r1(X395,X850)) & ! [X851] : (! [X852] : (! [X853] : (~r1(X852,X853) | ! [X854] : (! [X855] : (~r1(X854,X855) | ! [X856] : (~r1(X855,X856) | ! [X857] : (~r1(X856,X857) | ! [X858] : (! [X859] : (! [X860] : (~r1(X859,X860) | ! [X861] : (! [X862] : (! [X863] : (! [X864] : (~r1(X863,X864) | ! [X865] : (~r1(X864,X865) | ! [X866] : (~r1(X865,X866) | ! [X867] : (~r1(X866,X867) | ! [X868] : (! [X869] : (~r1(X868,X869) | ! [X870] : (! [X871] : (! [X872] : (~r1(X871,X872) | ! [X873] : (! [X874] : (~r1(X873,X874) | ! [X875] : (! [X876] : (! [X877] : (~r1(X876,X877) | ! [X878] : (! [X879] : (((p27(X879) | p28(X879)) & (~p28(X879) | ~p27(X879))) | ~r1(X878,X879)) | ~r1(X877,X878))) | ~r1(X875,X876)) | ~r1(X874,X875))) | ~r1(X872,X873))) | ~r1(X870,X871)) | ~r1(X869,X870))) | ~r1(X867,X868)))))) | ~r1(X862,X863)) | ~r1(X861,X862)) | ~r1(X860,X861))) | ~r1(X858,X859)) | ~r1(X857,X858))))) | ~r1(X853,X854))) | ~r1(X851,X852)) | ~r1(X395,X851))) | ~r1(X364,X395)) | ~sP25(X364))), 23.37/23.18 inference(nnf_transformation,[],[f35])). 23.37/23.18 fof(f49745,plain,( 23.37/23.18 sP25(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f44217,f468])). 23.37/23.18 fof(f468,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP26(X0) | ~r1(X0,X1) | sP25(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f146])). 23.37/23.18 fof(f146,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (! [X31] : (((p28(X31) | p29(X31)) & (~p28(X31) | ~p29(X31))) | ~r1(X30,X31)) | ~r1(X29,X30)) | ~r1(X28,X29)) | ~r1(X27,X28)))) | ~r1(X24,X25)) | ~r1(X23,X24)) | ~r1(X22,X23))))) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16)))) | ~r1(X12,X13))) | ~r1(X10,X11)))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4))) | ~r1(X1,X2)) & sP25(X1) & (r1(X1,sK69(X1)) & ~p29(sK69(X1)))) | ~r1(X0,X1)) | ~sP26(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK69])],[f144,f145])). 23.37/23.18 fof(f145,plain,( 23.37/23.18 ! [X1] : (? [X32] : (r1(X1,X32) & ~p29(X32)) => (r1(X1,sK69(X1)) & ~p29(sK69(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f144,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (! [X31] : (((p28(X31) | p29(X31)) & (~p28(X31) | ~p29(X31))) | ~r1(X30,X31)) | ~r1(X29,X30)) | ~r1(X28,X29)) | ~r1(X27,X28)))) | ~r1(X24,X25)) | ~r1(X23,X24)) | ~r1(X22,X23))))) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16)))) | ~r1(X12,X13))) | ~r1(X10,X11)))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4))) | ~r1(X1,X2)) & sP25(X1) & ? [X32] : (r1(X1,X32) & ~p29(X32))) | ~r1(X0,X1)) | ~sP26(X0))), 23.37/23.18 inference(rectify,[],[f143])). 23.37/23.18 fof(f143,plain,( 23.37/23.18 ! [X362] : (! [X364] : ((! [X365] : (! [X366] : (~r1(X365,X366) | ! [X367] : (! [X368] : (! [X369] : (! [X370] : (! [X371] : (! [X372] : (~r1(X371,X372) | ! [X373] : (~r1(X372,X373) | ! [X374] : (! [X375] : (~r1(X374,X375) | ! [X376] : (! [X377] : (~r1(X376,X377) | ! [X378] : (~r1(X377,X378) | ! [X379] : (! [X380] : (~r1(X379,X380) | ! [X381] : (! [X382] : (! [X383] : (~r1(X382,X383) | ! [X384] : (~r1(X383,X384) | ! [X385] : (~r1(X384,X385) | ! [X386] : (! [X387] : (! [X388] : (! [X389] : (~r1(X388,X389) | ! [X390] : (~r1(X389,X390) | ! [X391] : (! [X392] : (! [X393] : (! [X394] : (((p28(X394) | p29(X394)) & (~p28(X394) | ~p29(X394))) | ~r1(X393,X394)) | ~r1(X392,X393)) | ~r1(X391,X392)) | ~r1(X390,X391)))) | ~r1(X387,X388)) | ~r1(X386,X387)) | ~r1(X385,X386))))) | ~r1(X381,X382)) | ~r1(X380,X381))) | ~r1(X378,X379)))) | ~r1(X375,X376))) | ~r1(X373,X374)))) | ~r1(X370,X371)) | ~r1(X369,X370)) | ~r1(X368,X369)) | ~r1(X367,X368)) | ~r1(X366,X367))) | ~r1(X364,X365)) & sP25(X364) & ? [X880] : (r1(X364,X880) & ~p29(X880))) | ~r1(X362,X364)) | ~sP26(X362))), 23.37/23.18 inference(nnf_transformation,[],[f36])). 23.37/23.18 fof(f44217,plain,( 23.37/23.18 sP26(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f39692,f463])). 23.37/23.18 fof(f463,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP27(X0) | ~r1(X0,X1) | sP26(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f142])). 23.37/23.18 fof(f142,plain,( 23.37/23.18 ! [X0] : (! [X1] : (((~p30(sK68(X1)) & r1(X1,sK68(X1))) & sP26(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (! [X31] : (! [X32] : (! [X33] : (((~p30(X33) | ~p29(X33)) & (p29(X33) | p30(X33))) | ~r1(X32,X33)) | ~r1(X31,X32)) | ~r1(X30,X31)) | ~r1(X29,X30)) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)) | ~r1(X24,X25))) | ~r1(X22,X23)))))) | ~r1(X17,X18))) | ~r1(X15,X16)) | ~r1(X14,X15)) | ~r1(X13,X14))) | ~r1(X11,X12)))))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP27(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK68])],[f140,f141])). 23.37/23.18 fof(f141,plain,( 23.37/23.18 ! [X1] : (? [X2] : (~p30(X2) & r1(X1,X2)) => (~p30(sK68(X1)) & r1(X1,sK68(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f140,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((? [X2] : (~p30(X2) & r1(X1,X2)) & sP26(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (! [X31] : (! [X32] : (! [X33] : (((~p30(X33) | ~p29(X33)) & (p29(X33) | p30(X33))) | ~r1(X32,X33)) | ~r1(X31,X32)) | ~r1(X30,X31)) | ~r1(X29,X30)) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)) | ~r1(X24,X25))) | ~r1(X22,X23)))))) | ~r1(X17,X18))) | ~r1(X15,X16)) | ~r1(X14,X15)) | ~r1(X13,X14))) | ~r1(X11,X12)))))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP27(X0))), 23.37/23.18 inference(rectify,[],[f139])). 23.37/23.18 fof(f139,plain,( 23.37/23.18 ! [X328] : (! [X362] : ((? [X363] : (~p30(X363) & r1(X362,X363)) & sP26(X362) & ! [X881] : (! [X882] : (~r1(X881,X882) | ! [X883] : (! [X884] : (! [X885] : (! [X886] : (~r1(X885,X886) | ! [X887] : (~r1(X886,X887) | ! [X888] : (~r1(X887,X888) | ! [X889] : (~r1(X888,X889) | ! [X890] : (! [X891] : (~r1(X890,X891) | ! [X892] : (! [X893] : (! [X894] : (! [X895] : (~r1(X894,X895) | ! [X896] : (! [X897] : (~r1(X896,X897) | ! [X898] : (~r1(X897,X898) | ! [X899] : (~r1(X898,X899) | ! [X900] : (~r1(X899,X900) | ! [X901] : (! [X902] : (~r1(X901,X902) | ! [X903] : (! [X904] : (! [X905] : (~r1(X904,X905) | ! [X906] : (! [X907] : (! [X908] : (! [X909] : (! [X910] : (! [X911] : (((~p30(X911) | ~p29(X911)) & (p29(X911) | p30(X911))) | ~r1(X910,X911)) | ~r1(X909,X910)) | ~r1(X908,X909)) | ~r1(X907,X908)) | ~r1(X906,X907)) | ~r1(X905,X906))) | ~r1(X903,X904)) | ~r1(X902,X903))) | ~r1(X900,X901)))))) | ~r1(X895,X896))) | ~r1(X893,X894)) | ~r1(X892,X893)) | ~r1(X891,X892))) | ~r1(X889,X890)))))) | ~r1(X884,X885)) | ~r1(X883,X884)) | ~r1(X882,X883))) | ~r1(X362,X881))) | ~r1(X328,X362)) | ~sP27(X328))), 23.37/23.18 inference(nnf_transformation,[],[f37])). 23.37/23.18 fof(f39692,plain,( 23.37/23.18 sP27(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f35541,f456])). 23.37/23.18 fof(f456,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP28(X0) | ~r1(X0,X1) | sP27(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f138])). 23.37/23.18 fof(f138,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (! [X24] : (! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (((~p31(X33) | ~p30(X33)) & (p30(X33) | p31(X33))) | ~r1(X32,X33)) | ~r1(X31,X32))) | ~r1(X29,X30))))) | ~r1(X25,X26)) | ~r1(X24,X25)) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19))) | ~r1(X16,X17)))) | ~r1(X13,X14))) | ~r1(X11,X12))) | ~r1(X9,X10)))))) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2)) & (r1(X1,sK67(X1)) & ~p31(sK67(X1))) & sP27(X1)) | ~r1(X0,X1)) | ~sP28(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK67])],[f136,f137])). 23.37/23.18 fof(f137,plain,( 23.37/23.18 ! [X1] : (? [X34] : (r1(X1,X34) & ~p31(X34)) => (r1(X1,sK67(X1)) & ~p31(sK67(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f136,plain,( 23.37/23.18 ! [X0] : (! [X1] : ((! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (! [X24] : (! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (((~p31(X33) | ~p30(X33)) & (p30(X33) | p31(X33))) | ~r1(X32,X33)) | ~r1(X31,X32))) | ~r1(X29,X30))))) | ~r1(X25,X26)) | ~r1(X24,X25)) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19))) | ~r1(X16,X17)))) | ~r1(X13,X14))) | ~r1(X11,X12))) | ~r1(X9,X10)))))) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2)) & ? [X34] : (r1(X1,X34) & ~p31(X34)) & sP27(X1)) | ~r1(X0,X1)) | ~sP28(X0))), 23.37/23.18 inference(rectify,[],[f135])). 23.37/23.18 fof(f135,plain,( 23.37/23.18 ! [X293] : (! [X328] : ((! [X329] : (! [X330] : (! [X331] : (~r1(X330,X331) | ! [X332] : (! [X333] : (~r1(X332,X333) | ! [X334] : (~r1(X333,X334) | ! [X335] : (~r1(X334,X335) | ! [X336] : (~r1(X335,X336) | ! [X337] : (! [X338] : (~r1(X337,X338) | ! [X339] : (! [X340] : (~r1(X339,X340) | ! [X341] : (! [X342] : (~r1(X341,X342) | ! [X343] : (~r1(X342,X343) | ! [X344] : (! [X345] : (~r1(X344,X345) | ! [X346] : (! [X347] : (! [X348] : (! [X349] : (! [X350] : (! [X351] : (! [X352] : (! [X353] : (! [X354] : (~r1(X353,X354) | ! [X355] : (~r1(X354,X355) | ! [X356] : (~r1(X355,X356) | ! [X357] : (! [X358] : (~r1(X357,X358) | ! [X359] : (! [X360] : (((~p31(X360) | ~p30(X360)) & (p30(X360) | p31(X360))) | ~r1(X359,X360)) | ~r1(X358,X359))) | ~r1(X356,X357))))) | ~r1(X352,X353)) | ~r1(X351,X352)) | ~r1(X350,X351)) | ~r1(X349,X350)) | ~r1(X348,X349)) | ~r1(X347,X348)) | ~r1(X346,X347)) | ~r1(X345,X346))) | ~r1(X343,X344)))) | ~r1(X340,X341))) | ~r1(X338,X339))) | ~r1(X336,X337)))))) | ~r1(X331,X332))) | ~r1(X329,X330)) | ~r1(X328,X329)) & ? [X361] : (r1(X328,X361) & ~p31(X361)) & sP27(X328)) | ~r1(X293,X328)) | ~sP28(X293))), 23.37/23.18 inference(nnf_transformation,[],[f38])). 23.37/23.18 fof(f35541,plain,( 23.37/23.18 sP28(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f31752,f451])). 23.37/23.18 fof(f451,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP29(X0) | sP28(X1) | ~r1(X0,X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f134])). 23.37/23.18 fof(f134,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ((~p31(X34) | ~p32(X34)) & (p32(X34) | p31(X34))))))) | ~r1(X29,X30)) | ~r1(X28,X29))) | ~r1(X26,X27)) | ~r1(X25,X26)) | ~r1(X24,X25))) | ~r1(X22,X23))))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16))) | ~r1(X13,X14))) | ~r1(X11,X12)))) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3))) & (~p32(sK66(X1)) & r1(X1,sK66(X1))) & sP28(X1))) | ~sP29(X0))), 23.37/23.18 inference(skolemisation,[status(esa),new_symbols(skolem,[sK66])],[f132,f133])). 23.37/23.18 fof(f133,plain,( 23.37/23.18 ! [X1] : (? [X35] : (~p32(X35) & r1(X1,X35)) => (~p32(sK66(X1)) & r1(X1,sK66(X1))))), 23.37/23.18 introduced(choice_axiom,[])). 23.37/23.18 fof(f132,plain,( 23.37/23.18 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ((~p31(X34) | ~p32(X34)) & (p32(X34) | p31(X34))))))) | ~r1(X29,X30)) | ~r1(X28,X29))) | ~r1(X26,X27)) | ~r1(X25,X26)) | ~r1(X24,X25))) | ~r1(X22,X23))))) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16))) | ~r1(X13,X14))) | ~r1(X11,X12)))) | ~r1(X8,X9)) | ~r1(X7,X8))) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3))) & ? [X35] : (~p32(X35) & r1(X1,X35)) & sP28(X1))) | ~sP29(X0))), 23.37/23.18 inference(rectify,[],[f131])). 23.37/23.18 fof(f131,plain,( 23.37/23.18 ! [X292] : (! [X293] : (~r1(X292,X293) | (! [X294] : (~r1(X293,X294) | ! [X295] : (! [X296] : (~r1(X295,X296) | ! [X297] : (! [X298] : (! [X299] : (~r1(X298,X299) | ! [X300] : (! [X301] : (! [X302] : (~r1(X301,X302) | ! [X303] : (~r1(X302,X303) | ! [X304] : (! [X305] : (~r1(X304,X305) | ! [X306] : (! [X307] : (~r1(X306,X307) | ! [X308] : (! [X309] : (! [X310] : (! [X311] : (! [X312] : (~r1(X311,X312) | ! [X313] : (~r1(X312,X313) | ! [X314] : (~r1(X313,X314) | ! [X315] : (! [X316] : (~r1(X315,X316) | ! [X317] : (! [X318] : (! [X319] : (! [X320] : (~r1(X319,X320) | ! [X321] : (! [X322] : (! [X323] : (~r1(X322,X323) | ! [X324] : (~r1(X323,X324) | ! [X325] : (~r1(X324,X325) | ! [X326] : (~r1(X325,X326) | ((~p31(X326) | ~p32(X326)) & (p32(X326) | p31(X326))))))) | ~r1(X321,X322)) | ~r1(X320,X321))) | ~r1(X318,X319)) | ~r1(X317,X318)) | ~r1(X316,X317))) | ~r1(X314,X315))))) | ~r1(X310,X311)) | ~r1(X309,X310)) | ~r1(X308,X309)) | ~r1(X307,X308))) | ~r1(X305,X306))) | ~r1(X303,X304)))) | ~r1(X300,X301)) | ~r1(X299,X300))) | ~r1(X297,X298)) | ~r1(X296,X297))) | ~r1(X294,X295))) & ? [X327] : (~p32(X327) & r1(X293,X327)) & sP28(X293))) | ~sP29(X292))), 23.37/23.18 inference(nnf_transformation,[],[f39])). 23.37/23.18 fof(f31752,plain,( 23.37/23.18 sP29(sK101)), 23.37/23.18 inference(unit_resulting_resolution,[],[f715,f28286,f450])). 23.37/23.18 fof(f450,plain,( 23.37/23.18 ( ! [X0,X1] : (~sP30(X0) | ~r1(X0,X1) | sP29(X1)) )), 23.37/23.18 inference(cnf_transformation,[],[f130])). 23.37/23.19 fof(f130,plain,( 23.37/23.19 ! [X0] : (! [X1] : ((sP29(X1) & (r1(X1,sK65(X1)) & ~p33(sK65(X1))) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (! [X35] : (! [X36] : (((p33(X36) | p32(X36)) & (~p32(X36) | ~p33(X36))) | ~r1(X35,X36)) | ~r1(X34,X35)) | ~r1(X33,X34))))) | ~r1(X29,X30))) | ~r1(X27,X28))))) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19)))) | ~r1(X15,X16))))) | ~r1(X11,X12)))) | ~r1(X8,X9))))) | ~r1(X4,X5))))) | ~r1(X0,X1)) | ~sP30(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK65])],[f128,f129])). 23.37/23.19 fof(f129,plain,( 23.37/23.19 ! [X1] : (? [X2] : (r1(X1,X2) & ~p33(X2)) => (r1(X1,sK65(X1)) & ~p33(sK65(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f128,plain,( 23.37/23.19 ! [X0] : (! [X1] : ((sP29(X1) & ? [X2] : (r1(X1,X2) & ~p33(X2)) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (! [X35] : (! [X36] : (((p33(X36) | p32(X36)) & (~p32(X36) | ~p33(X36))) | ~r1(X35,X36)) | ~r1(X34,X35)) | ~r1(X33,X34))))) | ~r1(X29,X30))) | ~r1(X27,X28))))) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19)))) | ~r1(X15,X16))))) | ~r1(X11,X12)))) | ~r1(X8,X9))))) | ~r1(X4,X5))))) | ~r1(X0,X1)) | ~sP30(X0))), 23.37/23.19 inference(rectify,[],[f127])). 23.37/23.19 fof(f127,plain,( 23.37/23.19 ! [X256] : (! [X292] : ((sP29(X292) & ? [X912] : (r1(X292,X912) & ~p33(X912)) & ! [X913] : (~r1(X292,X913) | ! [X914] : (~r1(X913,X914) | ! [X915] : (! [X916] : (~r1(X915,X916) | ! [X917] : (~r1(X916,X917) | ! [X918] : (~r1(X917,X918) | ! [X919] : (! [X920] : (~r1(X919,X920) | ! [X921] : (~r1(X920,X921) | ! [X922] : (! [X923] : (~r1(X922,X923) | ! [X924] : (~r1(X923,X924) | ! [X925] : (~r1(X924,X925) | ! [X926] : (! [X927] : (~r1(X926,X927) | ! [X928] : (~r1(X927,X928) | ! [X929] : (! [X930] : (! [X931] : (! [X932] : (! [X933] : (! [X934] : (! [X935] : (~r1(X934,X935) | ! [X936] : (~r1(X935,X936) | ! [X937] : (~r1(X936,X937) | ! [X938] : (! [X939] : (~r1(X938,X939) | ! [X940] : (! [X941] : (~r1(X940,X941) | ! [X942] : (~r1(X941,X942) | ! [X943] : (~r1(X942,X943) | ! [X944] : (! [X945] : (! [X946] : (((p33(X946) | p32(X946)) & (~p32(X946) | ~p33(X946))) | ~r1(X945,X946)) | ~r1(X944,X945)) | ~r1(X943,X944))))) | ~r1(X939,X940))) | ~r1(X937,X938))))) | ~r1(X933,X934)) | ~r1(X932,X933)) | ~r1(X931,X932)) | ~r1(X930,X931)) | ~r1(X929,X930)) | ~r1(X928,X929)))) | ~r1(X925,X926))))) | ~r1(X921,X922)))) | ~r1(X918,X919))))) | ~r1(X914,X915))))) | ~r1(X256,X292)) | ~sP30(X256))), 23.37/23.19 inference(nnf_transformation,[],[f40])). 23.37/23.19 fof(f28286,plain,( 23.37/23.19 sP30(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f25161,f443])). 23.37/23.19 fof(f443,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP31(X0) | ~r1(X0,X1) | sP30(X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f126])). 23.37/23.19 fof(f126,plain,( 23.37/23.19 ! [X0] : (! [X1] : ((! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (! [X32] : (! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (((~p34(X36) | ~p33(X36)) & (p33(X36) | p34(X36))) | ~r1(X35,X36)))) | ~r1(X32,X33)) | ~r1(X31,X32)) | ~r1(X30,X31)) | ~r1(X29,X30))) | ~r1(X27,X28)) | ~r1(X26,X27)))) | ~r1(X23,X24)))) | ~r1(X20,X21)))) | ~r1(X17,X18)) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6)))) | ~r1(X2,X3))) & sP30(X1) & (r1(X1,sK64(X1)) & ~p34(sK64(X1)))) | ~r1(X0,X1)) | ~sP31(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK64])],[f124,f125])). 23.37/23.19 fof(f125,plain,( 23.37/23.19 ! [X1] : (? [X37] : (r1(X1,X37) & ~p34(X37)) => (r1(X1,sK64(X1)) & ~p34(sK64(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f124,plain,( 23.37/23.19 ! [X0] : (! [X1] : ((! [X2] : (~r1(X1,X2) | ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (! [X32] : (! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (((~p34(X36) | ~p33(X36)) & (p33(X36) | p34(X36))) | ~r1(X35,X36)))) | ~r1(X32,X33)) | ~r1(X31,X32)) | ~r1(X30,X31)) | ~r1(X29,X30))) | ~r1(X27,X28)) | ~r1(X26,X27)))) | ~r1(X23,X24)))) | ~r1(X20,X21)))) | ~r1(X17,X18)) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6)))) | ~r1(X2,X3))) & sP30(X1) & ? [X37] : (r1(X1,X37) & ~p34(X37))) | ~r1(X0,X1)) | ~sP31(X0))), 23.37/23.19 inference(rectify,[],[f123])). 23.37/23.19 fof(f123,plain,( 23.37/23.19 ! [X255] : (! [X256] : ((! [X257] : (~r1(X256,X257) | ! [X258] : (! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (! [X263] : (~r1(X262,X263) | ! [X264] : (! [X265] : (~r1(X264,X265) | ! [X266] : (! [X267] : (! [X268] : (! [X269] : (~r1(X268,X269) | ! [X270] : (~r1(X269,X270) | ! [X271] : (~r1(X270,X271) | ! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (! [X280] : (~r1(X279,X280) | ! [X281] : (~r1(X280,X281) | ! [X282] : (! [X283] : (! [X284] : (~r1(X283,X284) | ! [X285] : (! [X286] : (! [X287] : (! [X288] : (! [X289] : (~r1(X288,X289) | ! [X290] : (~r1(X289,X290) | ! [X291] : (((~p34(X291) | ~p33(X291)) & (p33(X291) | p34(X291))) | ~r1(X290,X291)))) | ~r1(X287,X288)) | ~r1(X286,X287)) | ~r1(X285,X286)) | ~r1(X284,X285))) | ~r1(X282,X283)) | ~r1(X281,X282)))) | ~r1(X278,X279)))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272))))) | ~r1(X267,X268)) | ~r1(X266,X267)) | ~r1(X265,X266))) | ~r1(X263,X264))) | ~r1(X261,X262)) | ~r1(X260,X261)))) | ~r1(X257,X258))) & sP30(X256) & ? [X947] : (r1(X256,X947) & ~p34(X947))) | ~r1(X255,X256)) | ~sP31(X255))), 23.37/23.19 inference(nnf_transformation,[],[f41])). 23.37/23.19 fof(f25161,plain,( 23.37/23.19 sP31(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f22346,f440])). 23.37/23.19 fof(f440,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP32(X0) | ~r1(X0,X1) | sP31(X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f122])). 23.37/23.19 fof(f122,plain,( 23.37/23.19 ! [X0] : (! [X1] : ((sP31(X1) & (~p35(sK63(X1)) & r1(X1,sK63(X1))) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (~r1(X37,X38) | ((~p34(X38) | ~p35(X38)) & (p35(X38) | p34(X38))))) | ~r1(X35,X36))) | ~r1(X33,X34)))) | ~r1(X30,X31))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26))) | ~r1(X23,X24)) | ~r1(X22,X23))) | ~r1(X20,X21)) | ~r1(X19,X20))) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)))) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9)) | ~r1(X7,X8))))) | ~r1(X3,X4)))) | ~r1(X0,X1)) | ~sP32(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK63])],[f120,f121])). 23.37/23.19 fof(f121,plain,( 23.37/23.19 ! [X1] : (? [X2] : (~p35(X2) & r1(X1,X2)) => (~p35(sK63(X1)) & r1(X1,sK63(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f120,plain,( 23.37/23.19 ! [X0] : (! [X1] : ((sP31(X1) & ? [X2] : (~p35(X2) & r1(X1,X2)) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (~r1(X37,X38) | ((~p34(X38) | ~p35(X38)) & (p35(X38) | p34(X38))))) | ~r1(X35,X36))) | ~r1(X33,X34)))) | ~r1(X30,X31))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26))) | ~r1(X23,X24)) | ~r1(X22,X23))) | ~r1(X20,X21)) | ~r1(X19,X20))) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)))) | ~r1(X11,X12)) | ~r1(X10,X11))) | ~r1(X8,X9)) | ~r1(X7,X8))))) | ~r1(X3,X4)))) | ~r1(X0,X1)) | ~sP32(X0))), 23.37/23.19 inference(rectify,[],[f119])). 23.37/23.19 fof(f119,plain,( 23.37/23.19 ! [X254] : (! [X255] : ((sP31(X255) & ? [X948] : (~p35(X948) & r1(X255,X948)) & ! [X949] : (~r1(X255,X949) | ! [X950] : (! [X951] : (~r1(X950,X951) | ! [X952] : (~r1(X951,X952) | ! [X953] : (~r1(X952,X953) | ! [X954] : (! [X955] : (! [X956] : (~r1(X955,X956) | ! [X957] : (! [X958] : (! [X959] : (~r1(X958,X959) | ! [X960] : (~r1(X959,X960) | ! [X961] : (! [X962] : (! [X963] : (! [X964] : (! [X965] : (~r1(X964,X965) | ! [X966] : (! [X967] : (! [X968] : (~r1(X967,X968) | ! [X969] : (! [X970] : (! [X971] : (~r1(X970,X971) | ! [X972] : (! [X973] : (~r1(X972,X973) | ! [X974] : (! [X975] : (! [X976] : (~r1(X975,X976) | ! [X977] : (! [X978] : (~r1(X977,X978) | ! [X979] : (~r1(X978,X979) | ! [X980] : (! [X981] : (~r1(X980,X981) | ! [X982] : (! [X983] : (~r1(X982,X983) | ! [X984] : (~r1(X983,X984) | ((~p34(X984) | ~p35(X984)) & (p35(X984) | p34(X984))))) | ~r1(X981,X982))) | ~r1(X979,X980)))) | ~r1(X976,X977))) | ~r1(X974,X975)) | ~r1(X973,X974))) | ~r1(X971,X972))) | ~r1(X969,X970)) | ~r1(X968,X969))) | ~r1(X966,X967)) | ~r1(X965,X966))) | ~r1(X963,X964)) | ~r1(X962,X963)) | ~r1(X961,X962)) | ~r1(X960,X961)))) | ~r1(X957,X958)) | ~r1(X956,X957))) | ~r1(X954,X955)) | ~r1(X953,X954))))) | ~r1(X949,X950)))) | ~r1(X254,X255)) | ~sP32(X254))), 23.37/23.19 inference(nnf_transformation,[],[f42])). 23.37/23.19 fof(f22346,plain,( 23.37/23.19 sP32(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f19821,f435])). 23.37/23.19 fof(f435,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP33(X0) | sP32(X1) | ~r1(X0,X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f118])). 23.37/23.19 fof(f118,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP32(X1) & (r1(X1,sK62(X1)) & ~p36(sK62(X1))) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (! [X35] : (! [X36] : (~r1(X35,X36) | ! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (((~p36(X39) | ~p35(X39)) & (p35(X39) | p36(X39))) | ~r1(X38,X39)) | ~r1(X37,X38)))) | ~r1(X34,X35)) | ~r1(X33,X34)))) | ~r1(X30,X31))))) | ~r1(X26,X27)) | ~r1(X25,X26))))) | ~r1(X21,X22)) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18))))) | ~r1(X13,X14))) | ~r1(X11,X12))) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8)))))) | ~r1(X1,X3)))) | ~sP33(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK62])],[f116,f117])). 23.37/23.19 fof(f117,plain,( 23.37/23.19 ! [X1] : (? [X2] : (r1(X1,X2) & ~p36(X2)) => (r1(X1,sK62(X1)) & ~p36(sK62(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f116,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP32(X1) & ? [X2] : (r1(X1,X2) & ~p36(X2)) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (! [X35] : (! [X36] : (~r1(X35,X36) | ! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (((~p36(X39) | ~p35(X39)) & (p35(X39) | p36(X39))) | ~r1(X38,X39)) | ~r1(X37,X38)))) | ~r1(X34,X35)) | ~r1(X33,X34)))) | ~r1(X30,X31))))) | ~r1(X26,X27)) | ~r1(X25,X26))))) | ~r1(X21,X22)) | ~r1(X20,X21))) | ~r1(X18,X19)) | ~r1(X17,X18))))) | ~r1(X13,X14))) | ~r1(X11,X12))) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8)))))) | ~r1(X1,X3)))) | ~sP33(X0))), 23.37/23.19 inference(rectify,[],[f115])). 23.37/23.19 fof(f115,plain,( 23.37/23.19 ! [X214] : (! [X254] : (~r1(X214,X254) | (sP32(X254) & ? [X985] : (r1(X254,X985) & ~p36(X985)) & ! [X986] : (! [X987] : (~r1(X986,X987) | ! [X988] : (~r1(X987,X988) | ! [X989] : (~r1(X988,X989) | ! [X990] : (~r1(X989,X990) | ! [X991] : (! [X992] : (! [X993] : (! [X994] : (~r1(X993,X994) | ! [X995] : (! [X996] : (~r1(X995,X996) | ! [X997] : (! [X998] : (~r1(X997,X998) | ! [X999] : (~r1(X998,X999) | ! [X1000] : (~r1(X999,X1000) | ! [X1001] : (! [X1002] : (! [X1003] : (~r1(X1002,X1003) | ! [X1004] : (! [X1005] : (! [X1006] : (~r1(X1005,X1006) | ! [X1007] : (~r1(X1006,X1007) | ! [X1008] : (~r1(X1007,X1008) | ! [X1009] : (! [X1010] : (! [X1011] : (~r1(X1010,X1011) | ! [X1012] : (~r1(X1011,X1012) | ! [X1013] : (~r1(X1012,X1013) | ! [X1014] : (! [X1015] : (~r1(X1014,X1015) | ! [X1016] : (~r1(X1015,X1016) | ! [X1017] : (! [X1018] : (! [X1019] : (~r1(X1018,X1019) | ! [X1020] : (~r1(X1019,X1020) | ! [X1021] : (! [X1022] : (((~p36(X1022) | ~p35(X1022)) & (p35(X1022) | p36(X1022))) | ~r1(X1021,X1022)) | ~r1(X1020,X1021)))) | ~r1(X1017,X1018)) | ~r1(X1016,X1017)))) | ~r1(X1013,X1014))))) | ~r1(X1009,X1010)) | ~r1(X1008,X1009))))) | ~r1(X1004,X1005)) | ~r1(X1003,X1004))) | ~r1(X1001,X1002)) | ~r1(X1000,X1001))))) | ~r1(X996,X997))) | ~r1(X994,X995))) | ~r1(X992,X993)) | ~r1(X991,X992)) | ~r1(X990,X991)))))) | ~r1(X254,X986)))) | ~sP33(X214))), 23.37/23.19 inference(nnf_transformation,[],[f43])). 23.37/23.19 fof(f19821,plain,( 23.37/23.19 sP33(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f17567,f426])). 23.37/23.19 fof(f426,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP34(X0) | sP33(X1) | ~r1(X0,X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f114])). 23.37/23.19 fof(f114,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (~r1(X35,X36) | ! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (~r1(X38,X39) | ((~p36(X39) | ~p37(X39)) & (p36(X39) | p37(X39))))) | ~r1(X36,X37))))) | ~r1(X32,X33)) | ~r1(X31,X32)) | ~r1(X30,X31)))))))))) | ~r1(X21,X22))))) | ~r1(X17,X18)))) | ~r1(X14,X15)) | ~r1(X13,X14)) | ~r1(X12,X13))))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6))))) | ~r1(X1,X2)) & (r1(X1,sK61(X1)) & ~p37(sK61(X1))) & sP33(X1))) | ~sP34(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK61])],[f112,f113])). 23.37/23.19 fof(f113,plain,( 23.37/23.19 ! [X1] : (? [X40] : (r1(X1,X40) & ~p37(X40)) => (r1(X1,sK61(X1)) & ~p37(sK61(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f112,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (~r1(X35,X36) | ! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (~r1(X38,X39) | ((~p36(X39) | ~p37(X39)) & (p36(X39) | p37(X39))))) | ~r1(X36,X37))))) | ~r1(X32,X33)) | ~r1(X31,X32)) | ~r1(X30,X31)))))))))) | ~r1(X21,X22))))) | ~r1(X17,X18)))) | ~r1(X14,X15)) | ~r1(X13,X14)) | ~r1(X12,X13))))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6))))) | ~r1(X1,X2)) & ? [X40] : (r1(X1,X40) & ~p37(X40)) & sP33(X1))) | ~sP34(X0))), 23.37/23.19 inference(rectify,[],[f111])). 23.37/23.19 fof(f111,plain,( 23.37/23.19 ! [X213] : (! [X214] : (~r1(X213,X214) | (! [X215] : (! [X216] : (~r1(X215,X216) | ! [X217] : (~r1(X216,X217) | ! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (! [X221] : (! [X222] : (! [X223] : (~r1(X222,X223) | ! [X224] : (~r1(X223,X224) | ! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (~r1(X233,X234) | ! [X235] : (! [X236] : (~r1(X235,X236) | ! [X237] : (~r1(X236,X237) | ! [X238] : (~r1(X237,X238) | ! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~r1(X242,X243) | ! [X244] : (! [X245] : (! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (~r1(X251,X252) | ((~p36(X252) | ~p37(X252)) & (p36(X252) | p37(X252))))) | ~r1(X249,X250))))) | ~r1(X245,X246)) | ~r1(X244,X245)) | ~r1(X243,X244)))))))))) | ~r1(X234,X235))))) | ~r1(X230,X231)))) | ~r1(X227,X228)) | ~r1(X226,X227)) | ~r1(X225,X226))))) | ~r1(X221,X222)) | ~r1(X220,X221)) | ~r1(X219,X220)) | ~r1(X218,X219))))) | ~r1(X214,X215)) & ? [X253] : (r1(X214,X253) & ~p37(X253)) & sP33(X214))) | ~sP34(X213))), 23.37/23.19 inference(nnf_transformation,[],[f44])). 23.37/23.19 fof(f17567,plain,( 23.37/23.19 sP34(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f15164,f425])). 23.37/23.19 fof(f425,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP35(X0) | sP34(X1) | ~r1(X0,X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f110])). 23.37/23.19 fof(f110,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP34(X1) & (r1(X1,sK60(X1)) & ~p38(sK60(X1))) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (! [X40] : (! [X41] : (~r1(X40,X41) | ((p37(X41) | p38(X41)) & (~p38(X41) | ~p37(X41)))) | ~r1(X39,X40)) | ~r1(X38,X39))) | ~r1(X36,X37)) | ~r1(X35,X36))))) | ~r1(X31,X32)))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)) | ~r1(X24,X25)))))) | ~r1(X19,X20)))) | ~r1(X16,X17)) | ~r1(X15,X16))) | ~r1(X13,X14))))) | ~r1(X9,X10))))) | ~r1(X5,X6)) | ~r1(X4,X5)))))) | ~sP35(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK60])],[f108,f109])). 23.37/23.19 fof(f109,plain,( 23.37/23.19 ! [X1] : (? [X2] : (r1(X1,X2) & ~p38(X2)) => (r1(X1,sK60(X1)) & ~p38(sK60(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f108,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP34(X1) & ? [X2] : (r1(X1,X2) & ~p38(X2)) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (! [X40] : (! [X41] : (~r1(X40,X41) | ((p37(X41) | p38(X41)) & (~p38(X41) | ~p37(X41)))) | ~r1(X39,X40)) | ~r1(X38,X39))) | ~r1(X36,X37)) | ~r1(X35,X36))))) | ~r1(X31,X32)))) | ~r1(X28,X29)) | ~r1(X27,X28))) | ~r1(X25,X26)) | ~r1(X24,X25)))))) | ~r1(X19,X20)))) | ~r1(X16,X17)) | ~r1(X15,X16))) | ~r1(X13,X14))))) | ~r1(X9,X10))))) | ~r1(X5,X6)) | ~r1(X4,X5)))))) | ~sP35(X0))), 23.37/23.19 inference(rectify,[],[f107])). 23.37/23.19 fof(f107,plain,( 23.37/23.19 ! [X212] : (! [X213] : (~r1(X212,X213) | (sP34(X213) & ? [X1023] : (r1(X213,X1023) & ~p38(X1023)) & ! [X1024] : (~r1(X213,X1024) | ! [X1025] : (~r1(X1024,X1025) | ! [X1026] : (! [X1027] : (! [X1028] : (~r1(X1027,X1028) | ! [X1029] : (~r1(X1028,X1029) | ! [X1030] : (~r1(X1029,X1030) | ! [X1031] : (! [X1032] : (~r1(X1031,X1032) | ! [X1033] : (~r1(X1032,X1033) | ! [X1034] : (~r1(X1033,X1034) | ! [X1035] : (! [X1036] : (~r1(X1035,X1036) | ! [X1037] : (! [X1038] : (! [X1039] : (~r1(X1038,X1039) | ! [X1040] : (~r1(X1039,X1040) | ! [X1041] : (! [X1042] : (~r1(X1041,X1042) | ! [X1043] : (~r1(X1042,X1043) | ! [X1044] : (~r1(X1043,X1044) | ! [X1045] : (~r1(X1044,X1045) | ! [X1046] : (! [X1047] : (! [X1048] : (~r1(X1047,X1048) | ! [X1049] : (! [X1050] : (! [X1051] : (~r1(X1050,X1051) | ! [X1052] : (~r1(X1051,X1052) | ! [X1053] : (! [X1054] : (~r1(X1053,X1054) | ! [X1055] : (~r1(X1054,X1055) | ! [X1056] : (~r1(X1055,X1056) | ! [X1057] : (! [X1058] : (! [X1059] : (~r1(X1058,X1059) | ! [X1060] : (! [X1061] : (! [X1062] : (~r1(X1061,X1062) | ((p37(X1062) | p38(X1062)) & (~p38(X1062) | ~p37(X1062)))) | ~r1(X1060,X1061)) | ~r1(X1059,X1060))) | ~r1(X1057,X1058)) | ~r1(X1056,X1057))))) | ~r1(X1052,X1053)))) | ~r1(X1049,X1050)) | ~r1(X1048,X1049))) | ~r1(X1046,X1047)) | ~r1(X1045,X1046)))))) | ~r1(X1040,X1041)))) | ~r1(X1037,X1038)) | ~r1(X1036,X1037))) | ~r1(X1034,X1035))))) | ~r1(X1030,X1031))))) | ~r1(X1026,X1027)) | ~r1(X1025,X1026)))))) | ~sP35(X212))), 23.37/23.19 inference(nnf_transformation,[],[f45])). 23.37/23.19 fof(f15164,plain,( 23.37/23.19 sP35(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f13121,f420])). 23.37/23.19 fof(f420,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP36(X0) | sP35(X1) | ~r1(X0,X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f106])). 23.37/23.19 fof(f106,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP35(X1) & (r1(X1,sK59(X1)) & ~p39(sK59(X1))) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (! [X24] : (! [X25] : (! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (~r1(X38,X39) | ! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (((p39(X42) | p38(X42)) & (~p38(X42) | ~p39(X42))) | ~r1(X41,X42))) | ~r1(X39,X40)))) | ~r1(X36,X37)) | ~r1(X35,X36))))))) | ~r1(X29,X30)) | ~r1(X28,X29))) | ~r1(X26,X27)) | ~r1(X25,X26)) | ~r1(X24,X25)) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17))) | ~r1(X14,X15)) | ~r1(X13,X14)))) | ~r1(X10,X11))) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X1,X3)))) | ~sP36(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK59])],[f104,f105])). 23.37/23.19 fof(f105,plain,( 23.37/23.19 ! [X1] : (? [X2] : (r1(X1,X2) & ~p39(X2)) => (r1(X1,sK59(X1)) & ~p39(sK59(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f104,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (sP35(X1) & ? [X2] : (r1(X1,X2) & ~p39(X2)) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (! [X24] : (! [X25] : (! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (~r1(X38,X39) | ! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (((p39(X42) | p38(X42)) & (~p38(X42) | ~p39(X42))) | ~r1(X41,X42))) | ~r1(X39,X40)))) | ~r1(X36,X37)) | ~r1(X35,X36))))))) | ~r1(X29,X30)) | ~r1(X28,X29))) | ~r1(X26,X27)) | ~r1(X25,X26)) | ~r1(X24,X25)) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18)) | ~r1(X16,X17))) | ~r1(X14,X15)) | ~r1(X13,X14)))) | ~r1(X10,X11))) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X1,X3)))) | ~sP36(X0))), 23.37/23.19 inference(rectify,[],[f103])). 23.37/23.19 fof(f103,plain,( 23.37/23.19 ! [X170] : (! [X212] : (~r1(X170,X212) | (sP35(X212) & ? [X1063] : (r1(X212,X1063) & ~p39(X1063)) & ! [X1064] : (! [X1065] : (~r1(X1064,X1065) | ! [X1066] : (! [X1067] : (! [X1068] : (! [X1069] : (~r1(X1068,X1069) | ! [X1070] : (! [X1071] : (~r1(X1070,X1071) | ! [X1072] : (! [X1073] : (~r1(X1072,X1073) | ! [X1074] : (~r1(X1073,X1074) | ! [X1075] : (! [X1076] : (! [X1077] : (~r1(X1076,X1077) | ! [X1078] : (! [X1079] : (! [X1080] : (! [X1081] : (! [X1082] : (! [X1083] : (! [X1084] : (! [X1085] : (! [X1086] : (! [X1087] : (! [X1088] : (! [X1089] : (~r1(X1088,X1089) | ! [X1090] : (! [X1091] : (! [X1092] : (~r1(X1091,X1092) | ! [X1093] : (~r1(X1092,X1093) | ! [X1094] : (~r1(X1093,X1094) | ! [X1095] : (~r1(X1094,X1095) | ! [X1096] : (~r1(X1095,X1096) | ! [X1097] : (! [X1098] : (! [X1099] : (~r1(X1098,X1099) | ! [X1100] : (~r1(X1099,X1100) | ! [X1101] : (! [X1102] : (~r1(X1101,X1102) | ! [X1103] : (((p39(X1103) | p38(X1103)) & (~p38(X1103) | ~p39(X1103))) | ~r1(X1102,X1103))) | ~r1(X1100,X1101)))) | ~r1(X1097,X1098)) | ~r1(X1096,X1097))))))) | ~r1(X1090,X1091)) | ~r1(X1089,X1090))) | ~r1(X1087,X1088)) | ~r1(X1086,X1087)) | ~r1(X1085,X1086)) | ~r1(X1084,X1085)) | ~r1(X1083,X1084)) | ~r1(X1082,X1083)) | ~r1(X1081,X1082)) | ~r1(X1080,X1081)) | ~r1(X1079,X1080)) | ~r1(X1078,X1079)) | ~r1(X1077,X1078))) | ~r1(X1075,X1076)) | ~r1(X1074,X1075)))) | ~r1(X1071,X1072))) | ~r1(X1069,X1070))) | ~r1(X1067,X1068)) | ~r1(X1066,X1067)) | ~r1(X1065,X1066))) | ~r1(X212,X1064)))) | ~sP36(X170))), 23.37/23.19 inference(nnf_transformation,[],[f46])). 23.37/23.19 fof(f13121,plain,( 23.37/23.19 sP36(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f11406,f413])). 23.37/23.19 fof(f413,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP37(X0) | sP36(X1) | ~r1(X0,X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f102])). 23.37/23.19 fof(f102,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (~r1(X35,X36) | ! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (~r1(X38,X39) | ! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ((p39(X42) | p40(X42)) & (~p39(X42) | ~p40(X42))))) | ~r1(X39,X40))) | ~r1(X37,X38)))) | ~r1(X34,X35))) | ~r1(X32,X33)))) | ~r1(X29,X30)) | ~r1(X28,X29))))))) | ~r1(X22,X23))) | ~r1(X20,X21)))) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4))) | ~r1(X1,X2)) & sP36(X1) & (r1(X1,sK58(X1)) & ~p40(sK58(X1))))) | ~sP37(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK58])],[f100,f101])). 23.37/23.19 fof(f101,plain,( 23.37/23.19 ! [X1] : (? [X43] : (r1(X1,X43) & ~p40(X43)) => (r1(X1,sK58(X1)) & ~p40(sK58(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f100,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (~r1(X35,X36) | ! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (~r1(X38,X39) | ! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ((p39(X42) | p40(X42)) & (~p39(X42) | ~p40(X42))))) | ~r1(X39,X40))) | ~r1(X37,X38)))) | ~r1(X34,X35))) | ~r1(X32,X33)))) | ~r1(X29,X30)) | ~r1(X28,X29))))))) | ~r1(X22,X23))) | ~r1(X20,X21)))) | ~r1(X17,X18)) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5)) | ~r1(X3,X4))) | ~r1(X1,X2)) & sP36(X1) & ? [X43] : (r1(X1,X43) & ~p40(X43)))) | ~sP37(X0))), 23.37/23.19 inference(rectify,[],[f99])). 23.37/23.19 fof(f99,plain,( 23.37/23.19 ! [X168] : (! [X170] : (~r1(X168,X170) | (! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (! [X174] : (! [X175] : (! [X176] : (! [X177] : (! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (! [X186] : (! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (~r1(X190,X191) | ! [X192] : (! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (~r1(X195,X196) | ! [X197] : (~r1(X196,X197) | ! [X198] : (! [X199] : (! [X200] : (~r1(X199,X200) | ! [X201] : (~r1(X200,X201) | ! [X202] : (! [X203] : (~r1(X202,X203) | ! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (~r1(X205,X206) | ! [X207] : (! [X208] : (~r1(X207,X208) | ! [X209] : (! [X210] : (~r1(X209,X210) | ! [X211] : (~r1(X210,X211) | ((p39(X211) | p40(X211)) & (~p39(X211) | ~p40(X211))))) | ~r1(X208,X209))) | ~r1(X206,X207)))) | ~r1(X203,X204))) | ~r1(X201,X202)))) | ~r1(X198,X199)) | ~r1(X197,X198))))))) | ~r1(X191,X192))) | ~r1(X189,X190)))) | ~r1(X186,X187)) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184))) | ~r1(X181,X182)) | ~r1(X180,X181))) | ~r1(X178,X179)) | ~r1(X177,X178)) | ~r1(X176,X177)) | ~r1(X175,X176)) | ~r1(X174,X175)) | ~r1(X173,X174)) | ~r1(X172,X173))) | ~r1(X170,X171)) & sP36(X170) & ? [X1104] : (r1(X170,X1104) & ~p40(X1104)))) | ~sP37(X168))), 23.37/23.19 inference(nnf_transformation,[],[f47])). 23.37/23.19 fof(f11406,plain,( 23.37/23.19 sP37(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f10262,f408])). 23.37/23.19 fof(f408,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP38(X0) | sP37(X1) | ~r1(X0,X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f98])). 23.37/23.19 fof(f98,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | ((~p41(sK57(X1)) & r1(X1,sK57(X1))) & sP37(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (((p40(X44) | p41(X44)) & (~p41(X44) | ~p40(X44))) | ~r1(X43,X44)))) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35)) | ~r1(X33,X34))) | ~r1(X31,X32)) | ~r1(X30,X31))) | ~r1(X28,X29)))) | ~r1(X25,X26)) | ~r1(X24,X25))) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)))))) | ~r1(X15,X16)) | ~r1(X14,X15))))) | ~r1(X10,X11))) | ~r1(X8,X9)))))))))) | ~sP38(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK57])],[f96,f97])). 23.37/23.19 fof(f97,plain,( 23.37/23.19 ! [X1] : (? [X2] : (~p41(X2) & r1(X1,X2)) => (~p41(sK57(X1)) & r1(X1,sK57(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f96,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (? [X2] : (~p41(X2) & r1(X1,X2)) & sP37(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (! [X35] : (! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (((p40(X44) | p41(X44)) & (~p41(X44) | ~p40(X44))) | ~r1(X43,X44)))) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)) | ~r1(X34,X35)) | ~r1(X33,X34))) | ~r1(X31,X32)) | ~r1(X30,X31))) | ~r1(X28,X29)))) | ~r1(X25,X26)) | ~r1(X24,X25))) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)))))) | ~r1(X15,X16)) | ~r1(X14,X15))))) | ~r1(X10,X11))) | ~r1(X8,X9)))))))))) | ~sP38(X0))), 23.37/23.19 inference(rectify,[],[f95])). 23.37/23.19 fof(f95,plain,( 23.37/23.19 ! [X123] : (! [X168] : (~r1(X123,X168) | (? [X169] : (~p41(X169) & r1(X168,X169)) & sP37(X168) & ! [X1105] : (~r1(X168,X1105) | ! [X1106] : (~r1(X1105,X1106) | ! [X1107] : (~r1(X1106,X1107) | ! [X1108] : (~r1(X1107,X1108) | ! [X1109] : (~r1(X1108,X1109) | ! [X1110] : (~r1(X1109,X1110) | ! [X1111] : (! [X1112] : (~r1(X1111,X1112) | ! [X1113] : (! [X1114] : (~r1(X1113,X1114) | ! [X1115] : (~r1(X1114,X1115) | ! [X1116] : (~r1(X1115,X1116) | ! [X1117] : (! [X1118] : (! [X1119] : (~r1(X1118,X1119) | ! [X1120] : (~r1(X1119,X1120) | ! [X1121] : (~r1(X1120,X1121) | ! [X1122] : (~r1(X1121,X1122) | ! [X1123] : (! [X1124] : (! [X1125] : (! [X1126] : (~r1(X1125,X1126) | ! [X1127] : (! [X1128] : (! [X1129] : (~r1(X1128,X1129) | ! [X1130] : (~r1(X1129,X1130) | ! [X1131] : (! [X1132] : (~r1(X1131,X1132) | ! [X1133] : (! [X1134] : (! [X1135] : (~r1(X1134,X1135) | ! [X1136] : (! [X1137] : (! [X1138] : (! [X1139] : (~r1(X1138,X1139) | ! [X1140] : (! [X1141] : (! [X1142] : (~r1(X1141,X1142) | ! [X1143] : (! [X1144] : (~r1(X1143,X1144) | ! [X1145] : (~r1(X1144,X1145) | ! [X1146] : (((p40(X1146) | p41(X1146)) & (~p41(X1146) | ~p40(X1146))) | ~r1(X1145,X1146)))) | ~r1(X1142,X1143))) | ~r1(X1140,X1141)) | ~r1(X1139,X1140))) | ~r1(X1137,X1138)) | ~r1(X1136,X1137)) | ~r1(X1135,X1136))) | ~r1(X1133,X1134)) | ~r1(X1132,X1133))) | ~r1(X1130,X1131)))) | ~r1(X1127,X1128)) | ~r1(X1126,X1127))) | ~r1(X1124,X1125)) | ~r1(X1123,X1124)) | ~r1(X1122,X1123)))))) | ~r1(X1117,X1118)) | ~r1(X1116,X1117))))) | ~r1(X1112,X1113))) | ~r1(X1110,X1111)))))))))) | ~sP38(X123))), 23.37/23.19 inference(nnf_transformation,[],[f48])). 23.37/23.19 fof(f10262,plain,( 23.37/23.19 sP38(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f9304,f401])). 23.37/23.19 fof(f401,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP39(X0) | ~r1(X0,X1) | sP38(X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f94])). 23.37/23.19 fof(f94,plain,( 23.37/23.19 ! [X0] : (! [X1] : ((! [X2] : (~r1(X1,X2) | ! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (! [X35] : (~r1(X34,X35) | ! [X36] : (~r1(X35,X36) | ! [X37] : (! [X38] : (! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ((p42(X44) | p41(X44)) & (~p42(X44) | ~p41(X44)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37)))) | ~r1(X33,X34)) | ~r1(X32,X33))))))) | ~r1(X26,X27)) | ~r1(X25,X26))) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)) | ~r1(X13,X14)))) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7))))))) & (~p42(sK56(X1)) & r1(X1,sK56(X1))) & sP38(X1)) | ~r1(X0,X1)) | ~sP39(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK56])],[f92,f93])). 23.37/23.19 fof(f93,plain,( 23.37/23.19 ! [X1] : (? [X45] : (~p42(X45) & r1(X1,X45)) => (~p42(sK56(X1)) & r1(X1,sK56(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f92,plain,( 23.37/23.19 ! [X0] : (! [X1] : ((! [X2] : (~r1(X1,X2) | ! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (! [X35] : (~r1(X34,X35) | ! [X36] : (~r1(X35,X36) | ! [X37] : (! [X38] : (! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (! [X44] : (~r1(X43,X44) | ((p42(X44) | p41(X44)) & (~p42(X44) | ~p41(X44)))) | ~r1(X42,X43)) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37)))) | ~r1(X33,X34)) | ~r1(X32,X33))))))) | ~r1(X26,X27)) | ~r1(X25,X26))) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)) | ~r1(X14,X15)) | ~r1(X13,X14)))) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7))))))) & ? [X45] : (~p42(X45) & r1(X1,X45)) & sP38(X1)) | ~r1(X0,X1)) | ~sP39(X0))), 23.37/23.19 inference(rectify,[],[f91])). 23.37/23.19 fof(f91,plain,( 23.37/23.19 ! [X121] : (! [X123] : ((! [X124] : (~r1(X123,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (! [X130] : (! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (! [X134] : (~r1(X133,X134) | ! [X135] : (~r1(X134,X135) | ! [X136] : (! [X137] : (! [X138] : (! [X139] : (! [X140] : (~r1(X139,X140) | ! [X141] : (! [X142] : (! [X143] : (! [X144] : (! [X145] : (~r1(X144,X145) | ! [X146] : (! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (! [X165] : (! [X166] : (~r1(X165,X166) | ((p42(X166) | p41(X166)) & (~p42(X166) | ~p41(X166)))) | ~r1(X164,X165)) | ~r1(X163,X164)) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160)) | ~r1(X158,X159)))) | ~r1(X155,X156)) | ~r1(X154,X155))))))) | ~r1(X148,X149)) | ~r1(X147,X148))) | ~r1(X145,X146))) | ~r1(X143,X144)) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141))) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137)) | ~r1(X135,X136)))) | ~r1(X132,X133)) | ~r1(X131,X132))) | ~r1(X129,X130)) | ~r1(X128,X129))))))) & ? [X167] : (~p42(X167) & r1(X123,X167)) & sP38(X123)) | ~r1(X121,X123)) | ~sP39(X121))), 23.37/23.19 inference(nnf_transformation,[],[f49])). 23.37/23.19 fof(f9304,plain,( 23.37/23.19 sP39(sK101)), 23.37/23.19 inference(unit_resulting_resolution,[],[f715,f8339,f398])). 23.37/23.19 fof(f398,plain,( 23.37/23.19 ( ! [X0,X1] : (~sP40(X0) | sP39(X1) | ~r1(X0,X1)) )), 23.37/23.19 inference(cnf_transformation,[],[f90])). 23.37/23.19 fof(f90,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | ((~p43(sK55(X1)) & r1(X1,sK55(X1))) & sP39(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (~r1(X45,X46) | ((~p43(X46) | ~p42(X46)) & (p43(X46) | p42(X46))))) | ~r1(X43,X44)))) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37)) | ~r1(X35,X36))))) | ~r1(X31,X32)) | ~r1(X30,X31))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) | ~r1(X21,X22)))))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6))) | ~r1(X3,X4))))) | ~sP40(X0))), 23.37/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK55])],[f88,f89])). 23.37/23.19 fof(f89,plain,( 23.37/23.19 ! [X1] : (? [X2] : (~p43(X2) & r1(X1,X2)) => (~p43(sK55(X1)) & r1(X1,sK55(X1))))), 23.37/23.19 introduced(choice_axiom,[])). 23.37/23.19 fof(f88,plain,( 23.37/23.19 ! [X0] : (! [X1] : (~r1(X0,X1) | (? [X2] : (~p43(X2) & r1(X1,X2)) & sP39(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (~r1(X45,X46) | ((~p43(X46) | ~p42(X46)) & (p43(X46) | p42(X46))))) | ~r1(X43,X44)))) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37)) | ~r1(X35,X36))))) | ~r1(X31,X32)) | ~r1(X30,X31))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) | ~r1(X21,X22)))))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)) | ~r1(X8,X9))) | ~r1(X6,X7)) | ~r1(X5,X6))) | ~r1(X3,X4))))) | ~sP40(X0))), 23.37/23.19 inference(rectify,[],[f87])). 23.38/23.19 fof(f87,plain,( 23.38/23.19 ! [X119] : (! [X121] : (~r1(X119,X121) | (? [X122] : (~p43(X122) & r1(X121,X122)) & sP39(X121) & ! [X1147] : (~r1(X121,X1147) | ! [X1148] : (! [X1149] : (~r1(X1148,X1149) | ! [X1150] : (! [X1151] : (! [X1152] : (~r1(X1151,X1152) | ! [X1153] : (! [X1154] : (! [X1155] : (~r1(X1154,X1155) | ! [X1156] : (! [X1157] : (! [X1158] : (~r1(X1157,X1158) | ! [X1159] : (~r1(X1158,X1159) | ! [X1160] : (~r1(X1159,X1160) | ! [X1161] : (! [X1162] : (~r1(X1161,X1162) | ! [X1163] : (~r1(X1162,X1163) | ! [X1164] : (~r1(X1163,X1164) | ! [X1165] : (~r1(X1164,X1165) | ! [X1166] : (! [X1167] : (~r1(X1166,X1167) | ! [X1168] : (! [X1169] : (~r1(X1168,X1169) | ! [X1170] : (~r1(X1169,X1170) | ! [X1171] : (! [X1172] : (~r1(X1171,X1172) | ! [X1173] : (! [X1174] : (~r1(X1173,X1174) | ! [X1175] : (! [X1176] : (! [X1177] : (~r1(X1176,X1177) | ! [X1178] : (~r1(X1177,X1178) | ! [X1179] : (~r1(X1178,X1179) | ! [X1180] : (! [X1181] : (! [X1182] : (! [X1183] : (! [X1184] : (~r1(X1183,X1184) | ! [X1185] : (! [X1186] : (~r1(X1185,X1186) | ! [X1187] : (~r1(X1186,X1187) | ! [X1188] : (! [X1189] : (~r1(X1188,X1189) | ! [X1190] : (~r1(X1189,X1190) | ((~p43(X1190) | ~p42(X1190)) & (p43(X1190) | p42(X1190))))) | ~r1(X1187,X1188)))) | ~r1(X1184,X1185))) | ~r1(X1182,X1183)) | ~r1(X1181,X1182)) | ~r1(X1180,X1181)) | ~r1(X1179,X1180))))) | ~r1(X1175,X1176)) | ~r1(X1174,X1175))) | ~r1(X1172,X1173))) | ~r1(X1170,X1171)))) | ~r1(X1167,X1168))) | ~r1(X1165,X1166)))))) | ~r1(X1160,X1161))))) | ~r1(X1156,X1157)) | ~r1(X1155,X1156))) | ~r1(X1153,X1154)) | ~r1(X1152,X1153))) | ~r1(X1150,X1151)) | ~r1(X1149,X1150))) | ~r1(X1147,X1148))))) | ~sP40(X119))), 23.38/23.19 inference(nnf_transformation,[],[f50])). 23.38/23.19 fof(f8339,plain,( 23.38/23.19 sP40(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f7742,f393])). 23.38/23.19 fof(f393,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP41(X0) | ~r1(X0,X1) | sP40(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f86])). 23.38/23.19 fof(f86,plain,( 23.38/23.19 ! [X0] : (! [X1] : (((r1(X1,sK54(X1)) & ~p44(sK54(X1))) & sP40(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (! [X46] : (! [X47] : (~r1(X46,X47) | ((~p43(X47) | ~p44(X47)) & (p43(X47) | p44(X47)))) | ~r1(X45,X46)) | ~r1(X44,X45)) | ~r1(X43,X44)))) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)))) | ~r1(X32,X33))) | ~r1(X30,X31))))) | ~r1(X26,X27)) | ~r1(X25,X26)) | ~r1(X24,X25))) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19)))))))) | ~r1(X11,X12)) | ~r1(X10,X11)))) | ~r1(X7,X8))) | ~r1(X5,X6)))))) | ~r1(X0,X1)) | ~sP41(X0))), 23.38/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK54])],[f84,f85])). 23.38/23.19 fof(f85,plain,( 23.38/23.19 ! [X1] : (? [X2] : (r1(X1,X2) & ~p44(X2)) => (r1(X1,sK54(X1)) & ~p44(sK54(X1))))), 23.38/23.19 introduced(choice_axiom,[])). 23.38/23.19 fof(f84,plain,( 23.38/23.19 ! [X0] : (! [X1] : ((? [X2] : (r1(X1,X2) & ~p44(X2)) & sP40(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (! [X22] : (! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (! [X46] : (! [X47] : (~r1(X46,X47) | ((~p43(X47) | ~p44(X47)) & (p43(X47) | p44(X47)))) | ~r1(X45,X46)) | ~r1(X44,X45)) | ~r1(X43,X44)))) | ~r1(X40,X41))) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)))) | ~r1(X32,X33))) | ~r1(X30,X31))))) | ~r1(X26,X27)) | ~r1(X25,X26)) | ~r1(X24,X25))) | ~r1(X22,X23)) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X19,X20)) | ~r1(X18,X19)))))))) | ~r1(X11,X12)) | ~r1(X10,X11)))) | ~r1(X7,X8))) | ~r1(X5,X6)))))) | ~r1(X0,X1)) | ~sP41(X0))), 23.38/23.19 inference(rectify,[],[f83])). 23.38/23.19 fof(f83,plain,( 23.38/23.19 ! [X117] : (! [X119] : ((? [X120] : (r1(X119,X120) & ~p44(X120)) & sP40(X119) & ! [X1191] : (~r1(X119,X1191) | ! [X1192] : (~r1(X1191,X1192) | ! [X1193] : (~r1(X1192,X1193) | ! [X1194] : (! [X1195] : (~r1(X1194,X1195) | ! [X1196] : (! [X1197] : (~r1(X1196,X1197) | ! [X1198] : (~r1(X1197,X1198) | ! [X1199] : (! [X1200] : (! [X1201] : (~r1(X1200,X1201) | ! [X1202] : (~r1(X1201,X1202) | ! [X1203] : (~r1(X1202,X1203) | ! [X1204] : (~r1(X1203,X1204) | ! [X1205] : (~r1(X1204,X1205) | ! [X1206] : (~r1(X1205,X1206) | ! [X1207] : (! [X1208] : (! [X1209] : (! [X1210] : (! [X1211] : (! [X1212] : (~r1(X1211,X1212) | ! [X1213] : (! [X1214] : (! [X1215] : (! [X1216] : (~r1(X1215,X1216) | ! [X1217] : (~r1(X1216,X1217) | ! [X1218] : (~r1(X1217,X1218) | ! [X1219] : (! [X1220] : (~r1(X1219,X1220) | ! [X1221] : (! [X1222] : (~r1(X1221,X1222) | ! [X1223] : (~r1(X1222,X1223) | ! [X1224] : (! [X1225] : (~r1(X1224,X1225) | ! [X1226] : (! [X1227] : (! [X1228] : (~r1(X1227,X1228) | ! [X1229] : (! [X1230] : (~r1(X1229,X1230) | ! [X1231] : (~r1(X1230,X1231) | ! [X1232] : (! [X1233] : (! [X1234] : (! [X1235] : (~r1(X1234,X1235) | ((~p43(X1235) | ~p44(X1235)) & (p43(X1235) | p44(X1235)))) | ~r1(X1233,X1234)) | ~r1(X1232,X1233)) | ~r1(X1231,X1232)))) | ~r1(X1228,X1229))) | ~r1(X1226,X1227)) | ~r1(X1225,X1226))) | ~r1(X1223,X1224)))) | ~r1(X1220,X1221))) | ~r1(X1218,X1219))))) | ~r1(X1214,X1215)) | ~r1(X1213,X1214)) | ~r1(X1212,X1213))) | ~r1(X1210,X1211)) | ~r1(X1209,X1210)) | ~r1(X1208,X1209)) | ~r1(X1207,X1208)) | ~r1(X1206,X1207)))))))) | ~r1(X1199,X1200)) | ~r1(X1198,X1199)))) | ~r1(X1195,X1196))) | ~r1(X1193,X1194)))))) | ~r1(X117,X119)) | ~sP41(X117))), 23.38/23.19 inference(nnf_transformation,[],[f51])). 23.38/23.19 fof(f7742,plain,( 23.38/23.19 sP41(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f7279,f388])). 23.38/23.19 fof(f388,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP42(X0) | ~r1(X0,X1) | sP41(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f82])). 23.38/23.19 fof(f82,plain,( 23.38/23.19 ! [X0] : (! [X1] : (((~p45(sK53(X1)) & r1(X1,sK53(X1))) & sP41(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (! [X35] : (~r1(X34,X35) | ! [X36] : (~r1(X35,X36) | ! [X37] : (~r1(X36,X37) | ! [X38] : (~r1(X37,X38) | ! [X39] : (~r1(X38,X39) | ! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (! [X46] : (~r1(X45,X46) | ! [X47] : (! [X48] : (~r1(X47,X48) | ((p45(X48) | p44(X48)) & (~p44(X48) | ~p45(X48)))) | ~r1(X46,X47))) | ~r1(X44,X45)) | ~r1(X43,X44))))) | ~r1(X39,X40))))))) | ~r1(X33,X34)) | ~r1(X32,X33)))) | ~r1(X29,X30)) | ~r1(X28,X29))) | ~r1(X26,X27)) | ~r1(X25,X26))) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22))) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16))) | ~r1(X13,X14)) | ~r1(X12,X13))))))))) | ~r1(X4,X5)) | ~r1(X3,X4)))) | ~r1(X0,X1)) | ~sP42(X0))), 23.38/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK53])],[f80,f81])). 23.38/23.19 fof(f81,plain,( 23.38/23.19 ! [X1] : (? [X2] : (~p45(X2) & r1(X1,X2)) => (~p45(sK53(X1)) & r1(X1,sK53(X1))))), 23.38/23.19 introduced(choice_axiom,[])). 23.38/23.19 fof(f80,plain,( 23.38/23.19 ! [X0] : (! [X1] : ((? [X2] : (~p45(X2) & r1(X1,X2)) & sP41(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (! [X35] : (~r1(X34,X35) | ! [X36] : (~r1(X35,X36) | ! [X37] : (~r1(X36,X37) | ! [X38] : (~r1(X37,X38) | ! [X39] : (~r1(X38,X39) | ! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (! [X46] : (~r1(X45,X46) | ! [X47] : (! [X48] : (~r1(X47,X48) | ((p45(X48) | p44(X48)) & (~p44(X48) | ~p45(X48)))) | ~r1(X46,X47))) | ~r1(X44,X45)) | ~r1(X43,X44))))) | ~r1(X39,X40))))))) | ~r1(X33,X34)) | ~r1(X32,X33)))) | ~r1(X29,X30)) | ~r1(X28,X29))) | ~r1(X26,X27)) | ~r1(X25,X26))) | ~r1(X23,X24)) | ~r1(X22,X23)) | ~r1(X21,X22))) | ~r1(X19,X20)) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16))) | ~r1(X13,X14)) | ~r1(X12,X13))))))))) | ~r1(X4,X5)) | ~r1(X3,X4)))) | ~r1(X0,X1)) | ~sP42(X0))), 23.38/23.19 inference(rectify,[],[f79])). 23.38/23.19 fof(f79,plain,( 23.38/23.19 ! [X115] : (! [X117] : ((? [X118] : (~p45(X118) & r1(X117,X118)) & sP41(X117) & ! [X1236] : (~r1(X117,X1236) | ! [X1237] : (! [X1238] : (! [X1239] : (~r1(X1238,X1239) | ! [X1240] : (~r1(X1239,X1240) | ! [X1241] : (~r1(X1240,X1241) | ! [X1242] : (~r1(X1241,X1242) | ! [X1243] : (~r1(X1242,X1243) | ! [X1244] : (~r1(X1243,X1244) | ! [X1245] : (~r1(X1244,X1245) | ! [X1246] : (! [X1247] : (! [X1248] : (~r1(X1247,X1248) | ! [X1249] : (! [X1250] : (~r1(X1249,X1250) | ! [X1251] : (! [X1252] : (! [X1253] : (! [X1254] : (~r1(X1253,X1254) | ! [X1255] : (! [X1256] : (! [X1257] : (! [X1258] : (~r1(X1257,X1258) | ! [X1259] : (! [X1260] : (! [X1261] : (~r1(X1260,X1261) | ! [X1262] : (! [X1263] : (! [X1264] : (~r1(X1263,X1264) | ! [X1265] : (~r1(X1264,X1265) | ! [X1266] : (! [X1267] : (! [X1268] : (~r1(X1267,X1268) | ! [X1269] : (~r1(X1268,X1269) | ! [X1270] : (~r1(X1269,X1270) | ! [X1271] : (~r1(X1270,X1271) | ! [X1272] : (~r1(X1271,X1272) | ! [X1273] : (! [X1274] : (~r1(X1273,X1274) | ! [X1275] : (~r1(X1274,X1275) | ! [X1276] : (~r1(X1275,X1276) | ! [X1277] : (! [X1278] : (! [X1279] : (~r1(X1278,X1279) | ! [X1280] : (! [X1281] : (~r1(X1280,X1281) | ((p45(X1281) | p44(X1281)) & (~p44(X1281) | ~p45(X1281)))) | ~r1(X1279,X1280))) | ~r1(X1277,X1278)) | ~r1(X1276,X1277))))) | ~r1(X1272,X1273))))))) | ~r1(X1266,X1267)) | ~r1(X1265,X1266)))) | ~r1(X1262,X1263)) | ~r1(X1261,X1262))) | ~r1(X1259,X1260)) | ~r1(X1258,X1259))) | ~r1(X1256,X1257)) | ~r1(X1255,X1256)) | ~r1(X1254,X1255))) | ~r1(X1252,X1253)) | ~r1(X1251,X1252)) | ~r1(X1250,X1251))) | ~r1(X1248,X1249))) | ~r1(X1246,X1247)) | ~r1(X1245,X1246))))))))) | ~r1(X1237,X1238)) | ~r1(X1236,X1237)))) | ~r1(X115,X117)) | ~sP42(X115))), 23.38/23.19 inference(nnf_transformation,[],[f52])). 23.38/23.19 fof(f7279,plain,( 23.38/23.19 sP42(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f6934,f383])). 23.38/23.19 fof(f383,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP43(X0) | ~r1(X0,X1) | sP42(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f78])). 23.38/23.19 fof(f78,plain,( 23.38/23.19 ! [X0] : (! [X1] : (((~p46(sK52(X1)) & r1(X1,sK52(X1))) & sP42(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (~r1(X43,X44) | ! [X45] : (! [X46] : (~r1(X45,X46) | ! [X47] : (~r1(X46,X47) | ! [X48] : (~r1(X47,X48) | ! [X49] : (((p46(X49) | p45(X49)) & (~p46(X49) | ~p45(X49))) | ~r1(X48,X49))))) | ~r1(X44,X45)))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)))) | ~r1(X32,X33)) | ~r1(X31,X32))))) | ~r1(X27,X28))))) | ~r1(X23,X24))))) | ~r1(X19,X20)) | ~r1(X18,X19))))) | ~r1(X14,X15))) | ~r1(X12,X13)))) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5))))) | ~r1(X0,X1)) | ~sP43(X0))), 23.38/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK52])],[f76,f77])). 23.38/23.19 fof(f77,plain,( 23.38/23.19 ! [X1] : (? [X2] : (~p46(X2) & r1(X1,X2)) => (~p46(sK52(X1)) & r1(X1,sK52(X1))))), 23.38/23.19 introduced(choice_axiom,[])). 23.38/23.19 fof(f76,plain,( 23.38/23.19 ! [X0] : (! [X1] : ((? [X2] : (~p46(X2) & r1(X1,X2)) & sP42(X1) & ! [X3] : (~r1(X1,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : (! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (! [X16] : (~r1(X15,X16) | ! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (! [X21] : (~r1(X20,X21) | ! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (~r1(X34,X35) | ! [X36] : (! [X37] : (~r1(X36,X37) | ! [X38] : (! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (~r1(X43,X44) | ! [X45] : (! [X46] : (~r1(X45,X46) | ! [X47] : (~r1(X46,X47) | ! [X48] : (~r1(X47,X48) | ! [X49] : (((p46(X49) | p45(X49)) & (~p46(X49) | ~p45(X49))) | ~r1(X48,X49))))) | ~r1(X44,X45)))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38))) | ~r1(X35,X36)))) | ~r1(X32,X33)) | ~r1(X31,X32))))) | ~r1(X27,X28))))) | ~r1(X23,X24))))) | ~r1(X19,X20)) | ~r1(X18,X19))))) | ~r1(X14,X15))) | ~r1(X12,X13)))) | ~r1(X9,X10)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5))))) | ~r1(X0,X1)) | ~sP43(X0))), 23.38/23.19 inference(rectify,[],[f75])). 23.38/23.19 fof(f75,plain,( 23.38/23.19 ! [X113] : (! [X115] : ((? [X116] : (~p46(X116) & r1(X115,X116)) & sP42(X115) & ! [X1282] : (~r1(X115,X1282) | ! [X1283] : (~r1(X1282,X1283) | ! [X1284] : (! [X1285] : (~r1(X1284,X1285) | ! [X1286] : (! [X1287] : (! [X1288] : (! [X1289] : (! [X1290] : (~r1(X1289,X1290) | ! [X1291] : (~r1(X1290,X1291) | ! [X1292] : (! [X1293] : (~r1(X1292,X1293) | ! [X1294] : (! [X1295] : (~r1(X1294,X1295) | ! [X1296] : (~r1(X1295,X1296) | ! [X1297] : (~r1(X1296,X1297) | ! [X1298] : (! [X1299] : (! [X1300] : (~r1(X1299,X1300) | ! [X1301] : (~r1(X1300,X1301) | ! [X1302] : (~r1(X1301,X1302) | ! [X1303] : (! [X1304] : (~r1(X1303,X1304) | ! [X1305] : (~r1(X1304,X1305) | ! [X1306] : (~r1(X1305,X1306) | ! [X1307] : (! [X1308] : (~r1(X1307,X1308) | ! [X1309] : (~r1(X1308,X1309) | ! [X1310] : (~r1(X1309,X1310) | ! [X1311] : (! [X1312] : (! [X1313] : (~r1(X1312,X1313) | ! [X1314] : (~r1(X1313,X1314) | ! [X1315] : (! [X1316] : (~r1(X1315,X1316) | ! [X1317] : (! [X1318] : (! [X1319] : (! [X1320] : (! [X1321] : (! [X1322] : (~r1(X1321,X1322) | ! [X1323] : (~r1(X1322,X1323) | ! [X1324] : (! [X1325] : (~r1(X1324,X1325) | ! [X1326] : (~r1(X1325,X1326) | ! [X1327] : (~r1(X1326,X1327) | ! [X1328] : (((p46(X1328) | p45(X1328)) & (~p46(X1328) | ~p45(X1328))) | ~r1(X1327,X1328))))) | ~r1(X1323,X1324)))) | ~r1(X1320,X1321)) | ~r1(X1319,X1320)) | ~r1(X1318,X1319)) | ~r1(X1317,X1318)) | ~r1(X1316,X1317))) | ~r1(X1314,X1315)))) | ~r1(X1311,X1312)) | ~r1(X1310,X1311))))) | ~r1(X1306,X1307))))) | ~r1(X1302,X1303))))) | ~r1(X1298,X1299)) | ~r1(X1297,X1298))))) | ~r1(X1293,X1294))) | ~r1(X1291,X1292)))) | ~r1(X1288,X1289)) | ~r1(X1287,X1288)) | ~r1(X1286,X1287)) | ~r1(X1285,X1286))) | ~r1(X1283,X1284))))) | ~r1(X113,X115)) | ~sP43(X113))), 23.38/23.19 inference(nnf_transformation,[],[f53])). 23.38/23.19 fof(f6934,plain,( 23.38/23.19 sP43(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f6695,f378])). 23.38/23.19 fof(f378,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP44(X0) | ~r1(X0,X1) | sP43(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f74])). 23.38/23.19 fof(f74,plain,( 23.38/23.19 ! [X0] : (! [X1] : (((r1(X1,sK51(X1)) & ~p47(sK51(X1))) & sP43(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (! [X35] : (! [X36] : (~r1(X35,X36) | ! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (~r1(X45,X46) | ! [X47] : (~r1(X46,X47) | ! [X48] : (~r1(X47,X48) | ! [X49] : (~r1(X48,X49) | ! [X50] : (((~p47(X50) | ~p46(X50)) & (p46(X50) | p47(X50))) | ~r1(X49,X50)))))))) | ~r1(X42,X43))))) | ~r1(X38,X39))) | ~r1(X36,X37))) | ~r1(X34,X35)) | ~r1(X33,X34)) | ~r1(X32,X33)))) | ~r1(X29,X30))) | ~r1(X27,X28)))) | ~r1(X24,X25)) | ~r1(X23,X24))) | ~r1(X21,X22)))) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16))) | ~r1(X13,X14)))))))) | ~r1(X6,X7))))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP44(X0))), 23.38/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK51])],[f72,f73])). 23.38/23.19 fof(f73,plain,( 23.38/23.19 ! [X1] : (? [X2] : (r1(X1,X2) & ~p47(X2)) => (r1(X1,sK51(X1)) & ~p47(sK51(X1))))), 23.38/23.19 introduced(choice_axiom,[])). 23.38/23.19 fof(f72,plain,( 23.38/23.19 ! [X0] : (! [X1] : ((? [X2] : (r1(X1,X2) & ~p47(X2)) & sP43(X1) & ! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (! [X35] : (! [X36] : (~r1(X35,X36) | ! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (! [X40] : (~r1(X39,X40) | ! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ! [X43] : (! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (~r1(X45,X46) | ! [X47] : (~r1(X46,X47) | ! [X48] : (~r1(X47,X48) | ! [X49] : (~r1(X48,X49) | ! [X50] : (((~p47(X50) | ~p46(X50)) & (p46(X50) | p47(X50))) | ~r1(X49,X50)))))))) | ~r1(X42,X43))))) | ~r1(X38,X39))) | ~r1(X36,X37))) | ~r1(X34,X35)) | ~r1(X33,X34)) | ~r1(X32,X33)))) | ~r1(X29,X30))) | ~r1(X27,X28)))) | ~r1(X24,X25)) | ~r1(X23,X24))) | ~r1(X21,X22)))) | ~r1(X18,X19)) | ~r1(X17,X18))) | ~r1(X15,X16))) | ~r1(X13,X14)))))))) | ~r1(X6,X7))))) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP44(X0))), 23.38/23.19 inference(rectify,[],[f71])). 23.38/23.19 fof(f71,plain,( 23.38/23.19 ! [X112] : (! [X113] : ((? [X114] : (r1(X113,X114) & ~p47(X114)) & sP43(X113) & ! [X1329] : (! [X1330] : (~r1(X1329,X1330) | ! [X1331] : (~r1(X1330,X1331) | ! [X1332] : (~r1(X1331,X1332) | ! [X1333] : (! [X1334] : (~r1(X1333,X1334) | ! [X1335] : (~r1(X1334,X1335) | ! [X1336] : (~r1(X1335,X1336) | ! [X1337] : (~r1(X1336,X1337) | ! [X1338] : (~r1(X1337,X1338) | ! [X1339] : (~r1(X1338,X1339) | ! [X1340] : (! [X1341] : (~r1(X1340,X1341) | ! [X1342] : (! [X1343] : (~r1(X1342,X1343) | ! [X1344] : (! [X1345] : (! [X1346] : (~r1(X1345,X1346) | ! [X1347] : (~r1(X1346,X1347) | ! [X1348] : (! [X1349] : (~r1(X1348,X1349) | ! [X1350] : (! [X1351] : (! [X1352] : (~r1(X1351,X1352) | ! [X1353] : (~r1(X1352,X1353) | ! [X1354] : (! [X1355] : (~r1(X1354,X1355) | ! [X1356] : (! [X1357] : (~r1(X1356,X1357) | ! [X1358] : (~r1(X1357,X1358) | ! [X1359] : (! [X1360] : (! [X1361] : (! [X1362] : (~r1(X1361,X1362) | ! [X1363] : (! [X1364] : (~r1(X1363,X1364) | ! [X1365] : (! [X1366] : (~r1(X1365,X1366) | ! [X1367] : (~r1(X1366,X1367) | ! [X1368] : (~r1(X1367,X1368) | ! [X1369] : (! [X1370] : (~r1(X1369,X1370) | ! [X1371] : (~r1(X1370,X1371) | ! [X1372] : (~r1(X1371,X1372) | ! [X1373] : (~r1(X1372,X1373) | ! [X1374] : (~r1(X1373,X1374) | ! [X1375] : (~r1(X1374,X1375) | ! [X1376] : (((~p47(X1376) | ~p46(X1376)) & (p46(X1376) | p47(X1376))) | ~r1(X1375,X1376)))))))) | ~r1(X1368,X1369))))) | ~r1(X1364,X1365))) | ~r1(X1362,X1363))) | ~r1(X1360,X1361)) | ~r1(X1359,X1360)) | ~r1(X1358,X1359)))) | ~r1(X1355,X1356))) | ~r1(X1353,X1354)))) | ~r1(X1350,X1351)) | ~r1(X1349,X1350))) | ~r1(X1347,X1348)))) | ~r1(X1344,X1345)) | ~r1(X1343,X1344))) | ~r1(X1341,X1342))) | ~r1(X1339,X1340)))))))) | ~r1(X1332,X1333))))) | ~r1(X113,X1329))) | ~r1(X112,X113)) | ~sP44(X112))), 23.38/23.19 inference(nnf_transformation,[],[f54])). 23.38/23.19 fof(f6695,plain,( 23.38/23.19 sP44(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f6538,f375])). 23.38/23.19 fof(f375,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP45(X0) | ~r1(X0,X1) | sP44(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f70])). 23.38/23.19 fof(f70,plain,( 23.38/23.19 ! [X0] : (! [X1] : ((sP44(X1) & (~p48(sK50(X1)) & r1(X1,sK50(X1))) & ! [X3] : (! [X4] : (! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (~r1(X38,X39) | ! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (~r1(X45,X46) | ! [X47] : (! [X48] : (! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (((p47(X51) | p48(X51)) & (~p48(X51) | ~p47(X51))) | ~r1(X50,X51))) | ~r1(X48,X49)) | ~r1(X47,X48)) | ~r1(X46,X47)))))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)))) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))) | ~r1(X30,X31)) | ~r1(X29,X30))) | ~r1(X27,X28)))) | ~r1(X24,X25))) | ~r1(X22,X23))) | ~r1(X20,X21)) | ~r1(X19,X20))) | ~r1(X17,X18)) | ~r1(X16,X17))))) | ~r1(X12,X13)))) | ~r1(X9,X10))) | ~r1(X7,X8)))) | ~r1(X4,X5)) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP45(X0))), 23.38/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK50])],[f68,f69])). 23.38/23.19 fof(f69,plain,( 23.38/23.19 ! [X1] : (? [X2] : (~p48(X2) & r1(X1,X2)) => (~p48(sK50(X1)) & r1(X1,sK50(X1))))), 23.38/23.19 introduced(choice_axiom,[])). 23.38/23.19 fof(f68,plain,( 23.38/23.19 ! [X0] : (! [X1] : ((sP44(X1) & ? [X2] : (~p48(X2) & r1(X1,X2)) & ! [X3] : (! [X4] : (! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | ! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | ! [X20] : (! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (! [X31] : (! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (! [X38] : (~r1(X37,X38) | ! [X39] : (~r1(X38,X39) | ! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (~r1(X43,X44) | ! [X45] : (~r1(X44,X45) | ! [X46] : (~r1(X45,X46) | ! [X47] : (! [X48] : (! [X49] : (! [X50] : (~r1(X49,X50) | ! [X51] : (((p47(X51) | p48(X51)) & (~p48(X51) | ~p47(X51))) | ~r1(X50,X51))) | ~r1(X48,X49)) | ~r1(X47,X48)) | ~r1(X46,X47)))))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)))) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35))) | ~r1(X32,X33))) | ~r1(X30,X31)) | ~r1(X29,X30))) | ~r1(X27,X28)))) | ~r1(X24,X25))) | ~r1(X22,X23))) | ~r1(X20,X21)) | ~r1(X19,X20))) | ~r1(X17,X18)) | ~r1(X16,X17))))) | ~r1(X12,X13)))) | ~r1(X9,X10))) | ~r1(X7,X8)))) | ~r1(X4,X5)) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP45(X0))), 23.38/23.19 inference(rectify,[],[f67])). 23.38/23.19 fof(f67,plain,( 23.38/23.19 ! [X111] : (! [X112] : ((sP44(X112) & ? [X1377] : (~p48(X1377) & r1(X112,X1377)) & ! [X1378] : (! [X1379] : (! [X1380] : (! [X1381] : (~r1(X1380,X1381) | ! [X1382] : (~r1(X1381,X1382) | ! [X1383] : (! [X1384] : (~r1(X1383,X1384) | ! [X1385] : (! [X1386] : (~r1(X1385,X1386) | ! [X1387] : (~r1(X1386,X1387) | ! [X1388] : (! [X1389] : (~r1(X1388,X1389) | ! [X1390] : (~r1(X1389,X1390) | ! [X1391] : (~r1(X1390,X1391) | ! [X1392] : (! [X1393] : (! [X1394] : (~r1(X1393,X1394) | ! [X1395] : (! [X1396] : (! [X1397] : (~r1(X1396,X1397) | ! [X1398] : (! [X1399] : (~r1(X1398,X1399) | ! [X1400] : (! [X1401] : (~r1(X1400,X1401) | ! [X1402] : (~r1(X1401,X1402) | ! [X1403] : (! [X1404] : (~r1(X1403,X1404) | ! [X1405] : (! [X1406] : (! [X1407] : (~r1(X1406,X1407) | ! [X1408] : (! [X1409] : (~r1(X1408,X1409) | ! [X1410] : (! [X1411] : (! [X1412] : (! [X1413] : (~r1(X1412,X1413) | ! [X1414] : (~r1(X1413,X1414) | ! [X1415] : (! [X1416] : (! [X1417] : (! [X1418] : (~r1(X1417,X1418) | ! [X1419] : (~r1(X1418,X1419) | ! [X1420] : (~r1(X1419,X1420) | ! [X1421] : (~r1(X1420,X1421) | ! [X1422] : (! [X1423] : (! [X1424] : (! [X1425] : (~r1(X1424,X1425) | ! [X1426] : (((p47(X1426) | p48(X1426)) & (~p48(X1426) | ~p47(X1426))) | ~r1(X1425,X1426))) | ~r1(X1423,X1424)) | ~r1(X1422,X1423)) | ~r1(X1421,X1422)))))) | ~r1(X1416,X1417)) | ~r1(X1415,X1416)) | ~r1(X1414,X1415)))) | ~r1(X1411,X1412)) | ~r1(X1410,X1411)) | ~r1(X1409,X1410))) | ~r1(X1407,X1408))) | ~r1(X1405,X1406)) | ~r1(X1404,X1405))) | ~r1(X1402,X1403)))) | ~r1(X1399,X1400))) | ~r1(X1397,X1398))) | ~r1(X1395,X1396)) | ~r1(X1394,X1395))) | ~r1(X1392,X1393)) | ~r1(X1391,X1392))))) | ~r1(X1387,X1388)))) | ~r1(X1384,X1385))) | ~r1(X1382,X1383)))) | ~r1(X1379,X1380)) | ~r1(X1378,X1379)) | ~r1(X112,X1378))) | ~r1(X111,X112)) | ~sP45(X111))), 23.38/23.19 inference(nnf_transformation,[],[f55])). 23.38/23.19 fof(f6538,plain,( 23.38/23.19 sP45(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f6448,f370])). 23.38/23.19 fof(f370,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP46(X0) | ~r1(X0,X1) | sP45(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f66])). 23.38/23.19 fof(f66,plain,( 23.38/23.19 ! [X0] : (! [X1] : ((sP45(X1) & (~p49(sK49(X1)) & r1(X1,sK49(X1))) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (! [X35] : (! [X36] : (~r1(X35,X36) | ! [X37] : (! [X38] : (! [X39] : (! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (~r1(X43,X44) | ! [X45] : (! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (! [X49] : (! [X50] : (! [X51] : (! [X52] : (~r1(X51,X52) | ((~p49(X52) | ~p48(X52)) & (p49(X52) | p48(X52)))) | ~r1(X50,X51)) | ~r1(X49,X50)) | ~r1(X48,X49)) | ~r1(X47,X48))) | ~r1(X45,X46)) | ~r1(X44,X45)))))) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37))) | ~r1(X34,X35)) | ~r1(X33,X34)) | ~r1(X32,X33)))))) | ~r1(X27,X28))) | ~r1(X25,X26)) | ~r1(X24,X25))))) | ~r1(X20,X21)))))) | ~r1(X15,X16)))))) | ~r1(X10,X11)))) | ~r1(X7,X8))))) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP46(X0))), 23.38/23.19 inference(skolemisation,[status(esa),new_symbols(skolem,[sK49])],[f64,f65])). 23.38/23.19 fof(f65,plain,( 23.38/23.19 ! [X1] : (? [X2] : (~p49(X2) & r1(X1,X2)) => (~p49(sK49(X1)) & r1(X1,sK49(X1))))), 23.38/23.19 introduced(choice_axiom,[])). 23.38/23.19 fof(f64,plain,( 23.38/23.19 ! [X0] : (! [X1] : ((sP45(X1) & ? [X2] : (~p49(X2) & r1(X1,X2)) & ! [X3] : (! [X4] : (! [X5] : (~r1(X4,X5) | ! [X6] : (~r1(X5,X6) | ! [X7] : (~r1(X6,X7) | ! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (~r1(X9,X10) | ! [X11] : (! [X12] : (~r1(X11,X12) | ! [X13] : (~r1(X12,X13) | ! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (~r1(X16,X17) | ! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (~r1(X19,X20) | ! [X21] : (! [X22] : (~r1(X21,X22) | ! [X23] : (~r1(X22,X23) | ! [X24] : (~r1(X23,X24) | ! [X25] : (! [X26] : (! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (! [X34] : (! [X35] : (! [X36] : (~r1(X35,X36) | ! [X37] : (! [X38] : (! [X39] : (! [X40] : (! [X41] : (~r1(X40,X41) | ! [X42] : (~r1(X41,X42) | ! [X43] : (~r1(X42,X43) | ! [X44] : (~r1(X43,X44) | ! [X45] : (! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (! [X49] : (! [X50] : (! [X51] : (! [X52] : (~r1(X51,X52) | ((~p49(X52) | ~p48(X52)) & (p49(X52) | p48(X52)))) | ~r1(X50,X51)) | ~r1(X49,X50)) | ~r1(X48,X49)) | ~r1(X47,X48))) | ~r1(X45,X46)) | ~r1(X44,X45)))))) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37))) | ~r1(X34,X35)) | ~r1(X33,X34)) | ~r1(X32,X33)))))) | ~r1(X27,X28))) | ~r1(X25,X26)) | ~r1(X24,X25))))) | ~r1(X20,X21)))))) | ~r1(X15,X16)))))) | ~r1(X10,X11)))) | ~r1(X7,X8))))) | ~r1(X3,X4)) | ~r1(X1,X3))) | ~r1(X0,X1)) | ~sP46(X0))), 23.38/23.19 inference(rectify,[],[f63])). 23.38/23.19 fof(f63,plain,( 23.38/23.19 ! [X109] : (! [X111] : ((sP45(X111) & ? [X1427] : (~p49(X1427) & r1(X111,X1427)) & ! [X1428] : (! [X1429] : (! [X1430] : (~r1(X1429,X1430) | ! [X1431] : (~r1(X1430,X1431) | ! [X1432] : (~r1(X1431,X1432) | ! [X1433] : (! [X1434] : (~r1(X1433,X1434) | ! [X1435] : (~r1(X1434,X1435) | ! [X1436] : (! [X1437] : (~r1(X1436,X1437) | ! [X1438] : (~r1(X1437,X1438) | ! [X1439] : (~r1(X1438,X1439) | ! [X1440] : (~r1(X1439,X1440) | ! [X1441] : (! [X1442] : (~r1(X1441,X1442) | ! [X1443] : (~r1(X1442,X1443) | ! [X1444] : (~r1(X1443,X1444) | ! [X1445] : (~r1(X1444,X1445) | ! [X1446] : (! [X1447] : (~r1(X1446,X1447) | ! [X1448] : (~r1(X1447,X1448) | ! [X1449] : (~r1(X1448,X1449) | ! [X1450] : (! [X1451] : (! [X1452] : (~r1(X1451,X1452) | ! [X1453] : (! [X1454] : (~r1(X1453,X1454) | ! [X1455] : (~r1(X1454,X1455) | ! [X1456] : (~r1(X1455,X1456) | ! [X1457] : (~r1(X1456,X1457) | ! [X1458] : (! [X1459] : (! [X1460] : (! [X1461] : (~r1(X1460,X1461) | ! [X1462] : (! [X1463] : (! [X1464] : (! [X1465] : (! [X1466] : (~r1(X1465,X1466) | ! [X1467] : (~r1(X1466,X1467) | ! [X1468] : (~r1(X1467,X1468) | ! [X1469] : (~r1(X1468,X1469) | ! [X1470] : (! [X1471] : (! [X1472] : (~r1(X1471,X1472) | ! [X1473] : (! [X1474] : (! [X1475] : (! [X1476] : (! [X1477] : (~r1(X1476,X1477) | ((~p49(X1477) | ~p48(X1477)) & (p49(X1477) | p48(X1477)))) | ~r1(X1475,X1476)) | ~r1(X1474,X1475)) | ~r1(X1473,X1474)) | ~r1(X1472,X1473))) | ~r1(X1470,X1471)) | ~r1(X1469,X1470)))))) | ~r1(X1464,X1465)) | ~r1(X1463,X1464)) | ~r1(X1462,X1463)) | ~r1(X1461,X1462))) | ~r1(X1459,X1460)) | ~r1(X1458,X1459)) | ~r1(X1457,X1458)))))) | ~r1(X1452,X1453))) | ~r1(X1450,X1451)) | ~r1(X1449,X1450))))) | ~r1(X1445,X1446)))))) | ~r1(X1440,X1441)))))) | ~r1(X1435,X1436)))) | ~r1(X1432,X1433))))) | ~r1(X1428,X1429)) | ~r1(X111,X1428))) | ~r1(X109,X111)) | ~sP46(X109))), 23.38/23.19 inference(nnf_transformation,[],[f56])). 23.38/23.19 fof(f6448,plain,( 23.38/23.19 sP46(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f656,f6435,f363])). 23.38/23.19 fof(f363,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP47(X0) | ~r1(X0,X1) | sP46(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f62])). 23.38/23.19 fof(f472129,plain,( 23.38/23.19 ~sP2841(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448760,f5992])). 23.38/23.19 fof(f5992,plain,( 23.38/23.19 ( ! [X4,X3] : (~sP2841(X4) | ~r1(X3,X4) | sP2842(X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5992_D])). 23.38/23.19 fof(f5992_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X4] : (~sP2841(X4) | ~r1(X3,X4)) ) <=> ~sP2842(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2842])])). 23.38/23.19 fof(f448760,plain,( 23.38/23.19 ~sP2842(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425610,f5994])). 23.38/23.19 fof(f5994,plain,( 23.38/23.19 ( ! [X2,X3] : (~sP2842(X3) | ~r1(X2,X3) | sP2843(X2)) )), 23.38/23.19 inference(cnf_transformation,[],[f5994_D])). 23.38/23.19 fof(f5994_D,plain,( 23.38/23.19 ( ! [X2] : (( ! [X3] : (~sP2842(X3) | ~r1(X2,X3)) ) <=> ~sP2843(X2)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2843])])). 23.38/23.19 fof(f425610,plain,( 23.38/23.19 ~sP2843(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402776,f5995])). 23.38/23.19 fof(f5995,plain,( 23.38/23.19 ( ! [X2,X1] : (~sP2843(X2) | ~sP2840(X1) | ~r1(X1,X2)) )), 23.38/23.19 inference(general_splitting,[],[f5993,f5994_D])). 23.38/23.19 fof(f5993,plain,( 23.38/23.19 ( ! [X2,X3,X1] : (~r1(X1,X2) | ~r1(X2,X3) | ~sP2840(X1) | ~sP2842(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5991,f5992_D])). 23.38/23.19 fof(f5991,plain,( 23.38/23.19 ( ! [X4,X2,X3,X1] : (~r1(X1,X2) | ~r1(X3,X4) | ~r1(X2,X3) | ~sP2840(X1) | ~sP2841(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5989,f5990_D])). 23.38/23.19 fof(f5989,plain,( 23.38/23.19 ( ! [X4,X2,X5,X3,X1] : (~r1(X1,X2) | ~r1(X4,X5) | ~p2(X5) | ~p3(X5) | ~r1(X3,X4) | ~r1(X2,X3) | ~sP2840(X1)) )), 23.38/23.19 inference(general_splitting,[],[f600,f5988_D])). 23.38/23.19 fof(f5988,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2840(X1) | ~sP0(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5988_D])). 23.38/23.19 fof(f5988_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP0(X0) | ~r1(X0,X1)) ) <=> ~sP2840(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2840])])). 23.38/23.19 fof(f600,plain,( 23.38/23.19 ( ! [X4,X2,X0,X5,X3,X1] : (~r1(X1,X2) | ~r1(X4,X5) | ~p2(X5) | ~p3(X5) | ~r1(X3,X4) | ~r1(X2,X3) | ~r1(X0,X1) | ~sP0(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f250])). 23.38/23.19 fof(f402776,plain,( 23.38/23.19 sP2840(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378097,f5988])). 23.38/23.19 fof(f472141,plain,( 23.38/23.19 ~sP2831(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448772,f5974])). 23.38/23.19 fof(f5974,plain,( 23.38/23.19 ( ! [X4,X5] : (~sP2831(X5) | ~r1(X4,X5) | sP2833(X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5974_D])). 23.38/23.19 fof(f5974_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X5] : (~sP2831(X5) | ~r1(X4,X5)) ) <=> ~sP2833(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2833])])). 23.38/23.19 fof(f448772,plain,( 23.38/23.19 ~sP2833(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425622,f5976])). 23.38/23.19 fof(f5976,plain,( 23.38/23.19 ( ! [X4,X3] : (~sP2833(X4) | ~r1(X3,X4) | sP2834(X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5976_D])). 23.38/23.19 fof(f5976_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X4] : (~sP2833(X4) | ~r1(X3,X4)) ) <=> ~sP2834(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2834])])). 23.38/23.19 fof(f425622,plain,( 23.38/23.19 ~sP2834(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402788,f5978])). 23.38/23.19 fof(f5978,plain,( 23.38/23.19 ( ! [X2,X3] : (~sP2834(X3) | ~r1(X2,X3) | sP2835(X2)) )), 23.38/23.19 inference(cnf_transformation,[],[f5978_D])). 23.38/23.19 fof(f5978_D,plain,( 23.38/23.19 ( ! [X2] : (( ! [X3] : (~sP2834(X3) | ~r1(X2,X3)) ) <=> ~sP2835(X2)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2835])])). 23.38/23.19 fof(f402788,plain,( 23.38/23.19 ~sP2835(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378103,f5979])). 23.38/23.19 fof(f5979,plain,( 23.38/23.19 ( ! [X2,X1] : (~sP2835(X2) | ~sP2832(X1) | ~r1(X1,X2)) )), 23.38/23.19 inference(general_splitting,[],[f5977,f5978_D])). 23.38/23.19 fof(f5977,plain,( 23.38/23.19 ( ! [X2,X3,X1] : (~r1(X2,X3) | ~r1(X1,X2) | ~sP2832(X1) | ~sP2834(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5975,f5976_D])). 23.38/23.19 fof(f5975,plain,( 23.38/23.19 ( ! [X4,X2,X3,X1] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X1,X2) | ~sP2832(X1) | ~sP2833(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5973,f5974_D])). 23.38/23.19 fof(f5973,plain,( 23.38/23.19 ( ! [X4,X2,X5,X3,X1] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X1,X2) | ~sP2831(X5) | ~sP2832(X1)) )), 23.38/23.19 inference(general_splitting,[],[f5971,f5972_D])). 23.38/23.19 fof(f5972,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2832(X1) | ~sP1(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5972_D])). 23.38/23.19 fof(f5972_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP1(X0) | ~r1(X0,X1)) ) <=> ~sP2832(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2832])])). 23.38/23.19 fof(f5971,plain,( 23.38/23.19 ( ! [X4,X2,X0,X5,X3,X1] : (~r1(X0,X1) | ~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X1,X2) | ~sP1(X0) | ~sP2831(X5)) )), 23.38/23.19 inference(general_splitting,[],[f594,f5970_D])). 23.38/23.19 fof(f594,plain,( 23.38/23.19 ( ! [X6,X4,X2,X0,X5,X3,X1] : (~r1(X0,X1) | ~r1(X2,X3) | ~r1(X3,X4) | p4(X6) | p3(X6) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X2) | ~sP1(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f246])). 23.38/23.19 fof(f378103,plain,( 23.38/23.19 sP2832(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342623,f5972])). 23.38/23.19 fof(f472147,plain,( 23.38/23.19 ~sP2821(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448778,f5952])). 23.38/23.19 fof(f5952,plain,( 23.38/23.19 ( ! [X6,X7] : (~sP2821(X7) | ~r1(X6,X7) | sP2822(X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5952_D])). 23.38/23.19 fof(f5952_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X7] : (~sP2821(X7) | ~r1(X6,X7)) ) <=> ~sP2822(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2822])])). 23.38/23.19 fof(f448778,plain,( 23.38/23.19 ~sP2822(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425628,f5954])). 23.38/23.19 fof(f5954,plain,( 23.38/23.19 ( ! [X6,X5] : (~sP2822(X6) | ~r1(X5,X6) | sP2823(X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5954_D])). 23.38/23.19 fof(f5954_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X6] : (~sP2822(X6) | ~r1(X5,X6)) ) <=> ~sP2823(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2823])])). 23.38/23.19 fof(f425628,plain,( 23.38/23.19 ~sP2823(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402794,f5956])). 23.38/23.19 fof(f5956,plain,( 23.38/23.19 ( ! [X4,X5] : (~sP2823(X5) | ~r1(X4,X5) | sP2824(X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5956_D])). 23.38/23.19 fof(f5956_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X5] : (~sP2823(X5) | ~r1(X4,X5)) ) <=> ~sP2824(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2824])])). 23.38/23.19 fof(f402794,plain,( 23.38/23.19 ~sP2824(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378109,f5958])). 23.38/23.19 fof(f5958,plain,( 23.38/23.19 ( ! [X4,X3] : (~sP2824(X4) | ~r1(X3,X4) | sP2825(X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5958_D])). 23.38/23.19 fof(f5958_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X4] : (~sP2824(X4) | ~r1(X3,X4)) ) <=> ~sP2825(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2825])])). 23.38/23.19 fof(f378109,plain,( 23.38/23.19 ~sP2825(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342629,f5959])). 23.38/23.19 fof(f5959,plain,( 23.38/23.19 ( ! [X3,X1] : (~sP2825(X3) | ~sP2820(X1) | ~r1(X1,X3)) )), 23.38/23.19 inference(general_splitting,[],[f5957,f5958_D])). 23.38/23.19 fof(f5957,plain,( 23.38/23.19 ( ! [X4,X3,X1] : (~r1(X1,X3) | ~r1(X3,X4) | ~sP2820(X1) | ~sP2824(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5955,f5956_D])). 23.38/23.19 fof(f5955,plain,( 23.38/23.19 ( ! [X4,X5,X3,X1] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2820(X1) | ~sP2823(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5953,f5954_D])). 23.38/23.19 fof(f5953,plain,( 23.38/23.19 ( ! [X6,X4,X5,X3,X1] : (~r1(X1,X3) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2820(X1) | ~sP2822(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5951,f5952_D])). 23.38/23.19 fof(f5951,plain,( 23.38/23.19 ( ! [X6,X4,X7,X5,X3,X1] : (~r1(X1,X3) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2820(X1) | ~sP2821(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5949,f5950_D])). 23.38/23.19 fof(f5949,plain,( 23.38/23.19 ( ! [X6,X4,X8,X7,X5,X3,X1] : (~r1(X1,X3) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~p5(X8) | ~p4(X8) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2820(X1)) )), 23.38/23.19 inference(general_splitting,[],[f586,f5948_D])). 23.38/23.19 fof(f5948,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2820(X1) | ~sP2(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5948_D])). 23.38/23.19 fof(f5948_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP2(X0) | ~r1(X0,X1)) ) <=> ~sP2820(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2820])])). 23.38/23.19 fof(f586,plain,( 23.38/23.19 ( ! [X6,X4,X0,X8,X7,X5,X3,X1] : (~r1(X1,X3) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~p5(X8) | ~p4(X8) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X0,X1) | ~sP2(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f242])). 23.38/23.19 fof(f342629,plain,( 23.38/23.19 sP2820(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320579,f5948])). 23.38/23.19 fof(f472153,plain,( 23.38/23.19 sP2813(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448784,f5934])). 23.38/23.19 fof(f448784,plain,( 23.38/23.19 sP2812(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425634,f5932])). 23.38/23.19 fof(f425634,plain,( 23.38/23.19 sP2811(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402800,f5930])). 23.38/23.19 fof(f402800,plain,( 23.38/23.19 sP2810(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378115,f5928])). 23.38/23.19 fof(f378115,plain,( 23.38/23.19 sP2809(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342635,f5926])). 23.38/23.19 fof(f342635,plain,( 23.38/23.19 sP2808(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320583,f5924])). 23.38/23.19 fof(f320583,plain,( 23.38/23.19 sP2807(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301688,f5922])). 23.38/23.19 fof(f472156,plain,( 23.38/23.19 sP2791(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448787,f5890])). 23.38/23.19 fof(f448787,plain,( 23.38/23.19 sP2790(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425637,f5888])). 23.38/23.19 fof(f425637,plain,( 23.38/23.19 sP2789(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402803,f5886])). 23.38/23.19 fof(f402803,plain,( 23.38/23.19 sP2788(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378118,f5884])). 23.38/23.19 fof(f378118,plain,( 23.38/23.19 sP2787(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342638,f5882])). 23.38/23.19 fof(f342638,plain,( 23.38/23.19 sP2786(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320585,f5880])). 23.38/23.19 fof(f320585,plain,( 23.38/23.19 sP2785(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301694,f5878])). 23.38/23.19 fof(f301694,plain,( 23.38/23.19 sP2784(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283575,f5876])). 23.38/23.19 fof(f472165,plain,( 23.38/23.19 ~sP2776(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448796,f5875])). 23.38/23.19 fof(f5875,plain,( 23.38/23.19 ( ! [X8,X9] : (~sP2783(X8) | ~sP2776(X9) | ~r1(X8,X9)) )), 23.38/23.19 inference(general_splitting,[],[f5873,f5874_D])). 23.38/23.19 fof(f5874,plain,( 23.38/23.19 ( ! [X8,X7] : (~sP2782(X7) | ~r1(X7,X8) | sP2783(X8)) )), 23.38/23.19 inference(cnf_transformation,[],[f5874_D])). 23.38/23.19 fof(f5874_D,plain,( 23.38/23.19 ( ! [X8] : (( ! [X7] : (~sP2782(X7) | ~r1(X7,X8)) ) <=> ~sP2783(X8)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2783])])). 23.38/23.19 fof(f5873,plain,( 23.38/23.19 ( ! [X8,X7,X9] : (~r1(X7,X8) | ~r1(X8,X9) | ~sP2776(X9) | ~sP2782(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5871,f5872_D])). 23.38/23.19 fof(f5872,plain,( 23.38/23.19 ( ! [X6,X7] : (~sP2781(X6) | ~r1(X6,X7) | sP2782(X7)) )), 23.38/23.19 inference(cnf_transformation,[],[f5872_D])). 23.38/23.19 fof(f5872_D,plain,( 23.38/23.19 ( ! [X7] : (( ! [X6] : (~sP2781(X6) | ~r1(X6,X7)) ) <=> ~sP2782(X7)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2782])])). 23.38/23.19 fof(f5871,plain,( 23.38/23.19 ( ! [X6,X8,X7,X9] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP2776(X9) | ~sP2781(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5869,f5870_D])). 23.38/23.19 fof(f5870,plain,( 23.38/23.19 ( ! [X6,X5] : (~sP2780(X5) | ~r1(X5,X6) | sP2781(X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5870_D])). 23.38/23.19 fof(f5870_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X5] : (~sP2780(X5) | ~r1(X5,X6)) ) <=> ~sP2781(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2781])])). 23.38/23.19 fof(f5869,plain,( 23.38/23.19 ( ! [X6,X8,X7,X5,X9] : (~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP2776(X9) | ~sP2780(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5867,f5868_D])). 23.38/23.19 fof(f5868,plain,( 23.38/23.19 ( ! [X4,X5] : (~sP2779(X4) | ~r1(X4,X5) | sP2780(X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5868_D])). 23.38/23.19 fof(f5868_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X4] : (~sP2779(X4) | ~r1(X4,X5)) ) <=> ~sP2780(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2780])])). 23.38/23.19 fof(f5867,plain,( 23.38/23.19 ( ! [X6,X4,X8,X7,X5,X9] : (~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~sP2776(X9) | ~sP2779(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5865,f5866_D])). 23.38/23.19 fof(f5866,plain,( 23.38/23.19 ( ! [X4,X3] : (~sP2778(X3) | ~r1(X3,X4) | sP2779(X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5866_D])). 23.38/23.19 fof(f5866_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X3] : (~sP2778(X3) | ~r1(X3,X4)) ) <=> ~sP2779(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2779])])). 23.38/23.19 fof(f5865,plain,( 23.38/23.19 ( ! [X6,X4,X8,X7,X5,X3,X9] : (~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2776(X9) | ~sP2778(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5863,f5864_D])). 23.38/23.19 fof(f5864,plain,( 23.38/23.19 ( ! [X2,X3] : (~sP2777(X2) | ~r1(X2,X3) | sP2778(X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5864_D])). 23.38/23.19 fof(f5864_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X2] : (~sP2777(X2) | ~r1(X2,X3)) ) <=> ~sP2778(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2778])])). 23.38/23.19 fof(f5863,plain,( 23.38/23.19 ( ! [X6,X4,X2,X8,X7,X5,X3,X9] : (~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X2,X3) | ~sP2776(X9) | ~sP2777(X2)) )), 23.38/23.19 inference(general_splitting,[],[f5861,f5862_D])). 23.38/23.19 fof(f5862,plain,( 23.38/23.19 ( ! [X2,X1] : (~sP2775(X1) | ~r1(X1,X2) | sP2777(X2)) )), 23.38/23.19 inference(cnf_transformation,[],[f5862_D])). 23.38/23.19 fof(f5862_D,plain,( 23.38/23.19 ( ! [X2] : (( ! [X1] : (~sP2775(X1) | ~r1(X1,X2)) ) <=> ~sP2777(X2)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2777])])). 23.38/23.19 fof(f5861,plain,( 23.38/23.19 ( ! [X6,X4,X2,X8,X7,X5,X3,X1,X9] : (~r1(X1,X2) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X2,X3) | ~sP2775(X1) | ~sP2776(X9)) )), 23.38/23.19 inference(general_splitting,[],[f5859,f5860_D])). 23.38/23.19 fof(f5859,plain,( 23.38/23.19 ( ! [X6,X4,X2,X10,X8,X7,X5,X3,X1,X9] : (~r1(X1,X2) | ~r1(X5,X6) | ~r1(X7,X8) | p7(X10) | p8(X10) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X2,X3) | ~sP2775(X1)) )), 23.38/23.19 inference(general_splitting,[],[f574,f5858_D])). 23.38/23.19 fof(f5858,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP5(X0) | ~r1(X0,X1) | sP2775(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5858_D])). 23.38/23.19 fof(f5858_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP5(X0) | ~r1(X0,X1)) ) <=> ~sP2775(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2775])])). 23.38/23.19 fof(f574,plain,( 23.38/23.19 ( ! [X6,X4,X2,X0,X10,X8,X7,X5,X3,X1,X9] : (~r1(X0,X1) | ~r1(X1,X2) | ~r1(X5,X6) | ~r1(X7,X8) | p7(X10) | p8(X10) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X2,X3) | ~sP5(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f230])). 23.38/23.19 fof(f448796,plain,( 23.38/23.19 sP2783(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425646,f5874])). 23.38/23.19 fof(f425646,plain,( 23.38/23.19 sP2782(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402812,f5872])). 23.38/23.19 fof(f402812,plain,( 23.38/23.19 sP2781(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378127,f5870])). 23.38/23.19 fof(f378127,plain,( 23.38/23.19 sP2780(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342647,f5868])). 23.38/23.19 fof(f342647,plain,( 23.38/23.19 sP2779(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320591,f5866])). 23.38/23.19 fof(f320591,plain,( 23.38/23.19 sP2778(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301700,f5864])). 23.38/23.19 fof(f301700,plain,( 23.38/23.19 sP2777(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283579,f5862])). 23.38/23.19 fof(f283579,plain,( 23.38/23.19 sP2775(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266216,f5858])). 23.38/23.19 fof(f472171,plain,( 23.38/23.19 ~sP2757(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448802,f5838])). 23.38/23.19 fof(f5838,plain,( 23.38/23.19 ( ! [X10,X11] : (~sP2757(X11) | ~r1(X10,X11) | sP2765(X10)) )), 23.38/23.19 inference(cnf_transformation,[],[f5838_D])). 23.38/23.19 fof(f5838_D,plain,( 23.38/23.19 ( ! [X10] : (( ! [X11] : (~sP2757(X11) | ~r1(X10,X11)) ) <=> ~sP2765(X10)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2765])])). 23.38/23.19 fof(f448802,plain,( 23.38/23.19 ~sP2765(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425652,f5839])). 23.38/23.19 fof(f5839,plain,( 23.38/23.19 ( ! [X10,X9] : (~sP2765(X10) | ~sP2764(X9) | ~r1(X9,X10)) )), 23.38/23.19 inference(general_splitting,[],[f5837,f5838_D])). 23.38/23.19 fof(f5837,plain,( 23.38/23.19 ( ! [X10,X11,X9] : (~r1(X10,X11) | ~r1(X9,X10) | ~sP2757(X11) | ~sP2764(X9)) )), 23.38/23.19 inference(general_splitting,[],[f5835,f5836_D])). 23.38/23.19 fof(f5836,plain,( 23.38/23.19 ( ! [X8,X9] : (sP2764(X9) | ~sP2763(X8) | ~r1(X8,X9)) )), 23.38/23.19 inference(cnf_transformation,[],[f5836_D])). 23.38/23.19 fof(f5836_D,plain,( 23.38/23.19 ( ! [X9] : (( ! [X8] : (~sP2763(X8) | ~r1(X8,X9)) ) <=> ~sP2764(X9)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2764])])). 23.38/23.19 fof(f5835,plain,( 23.38/23.19 ( ! [X10,X8,X11,X9] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2757(X11) | ~sP2763(X8)) )), 23.38/23.19 inference(general_splitting,[],[f5833,f5834_D])). 23.38/23.19 fof(f5834,plain,( 23.38/23.19 ( ! [X8,X7] : (sP2763(X8) | ~sP2762(X7) | ~r1(X7,X8)) )), 23.38/23.19 inference(cnf_transformation,[],[f5834_D])). 23.38/23.19 fof(f5834_D,plain,( 23.38/23.19 ( ! [X8] : (( ! [X7] : (~sP2762(X7) | ~r1(X7,X8)) ) <=> ~sP2763(X8)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2763])])). 23.38/23.19 fof(f5833,plain,( 23.38/23.19 ( ! [X10,X8,X7,X11,X9] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP2757(X11) | ~sP2762(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5831,f5832_D])). 23.38/23.19 fof(f5832,plain,( 23.38/23.19 ( ! [X6,X7] : (sP2762(X7) | ~sP2761(X6) | ~r1(X6,X7)) )), 23.38/23.19 inference(cnf_transformation,[],[f5832_D])). 23.38/23.19 fof(f5832_D,plain,( 23.38/23.19 ( ! [X7] : (( ! [X6] : (~sP2761(X6) | ~r1(X6,X7)) ) <=> ~sP2762(X7)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2762])])). 23.38/23.19 fof(f5831,plain,( 23.38/23.19 ( ! [X6,X10,X8,X7,X11,X9] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP2757(X11) | ~sP2761(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5829,f5830_D])). 23.38/23.19 fof(f5830,plain,( 23.38/23.19 ( ! [X6,X5] : (sP2761(X6) | ~sP2760(X5) | ~r1(X5,X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5830_D])). 23.38/23.19 fof(f5830_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X5] : (~sP2760(X5) | ~r1(X5,X6)) ) <=> ~sP2761(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2761])])). 23.38/23.19 fof(f5829,plain,( 23.38/23.19 ( ! [X6,X10,X8,X7,X5,X11,X9] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2757(X11) | ~sP2760(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5827,f5828_D])). 23.38/23.19 fof(f5828,plain,( 23.38/23.19 ( ! [X4,X5] : (sP2760(X5) | ~sP2759(X4) | ~r1(X4,X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5828_D])). 23.38/23.19 fof(f5828_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X4] : (~sP2759(X4) | ~r1(X4,X5)) ) <=> ~sP2760(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2760])])). 23.38/23.19 fof(f5827,plain,( 23.38/23.19 ( ! [X6,X4,X10,X8,X7,X5,X11,X9] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2757(X11) | ~sP2759(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5825,f5826_D])). 23.38/23.19 fof(f5826,plain,( 23.38/23.19 ( ! [X4,X3] : (sP2759(X4) | ~sP2758(X3) | ~r1(X3,X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5826_D])). 23.38/23.19 fof(f5826_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X3] : (~sP2758(X3) | ~r1(X3,X4)) ) <=> ~sP2759(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2759])])). 23.38/23.19 fof(f5825,plain,( 23.38/23.19 ( ! [X6,X4,X10,X8,X7,X5,X3,X11,X9] : (~r1(X3,X4) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2757(X11) | ~sP2758(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5823,f5824_D])). 23.38/23.19 fof(f5824,plain,( 23.38/23.19 ( ! [X3,X1] : (sP2758(X3) | ~sP2756(X1) | ~r1(X1,X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5824_D])). 23.38/23.19 fof(f5824_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X1] : (~sP2756(X1) | ~r1(X1,X3)) ) <=> ~sP2758(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2758])])). 23.38/23.19 fof(f5823,plain,( 23.38/23.19 ( ! [X6,X4,X10,X8,X7,X5,X3,X1,X11,X9] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2756(X1) | ~sP2757(X11)) )), 23.38/23.19 inference(general_splitting,[],[f5821,f5822_D])). 23.38/23.19 fof(f5821,plain,( 23.38/23.19 ( ! [X6,X4,X12,X10,X8,X7,X5,X3,X1,X11,X9] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X8,X9) | ~p9(X12) | ~p8(X12) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2756(X1)) )), 23.38/23.19 inference(general_splitting,[],[f566,f5820_D])). 23.38/23.19 fof(f5820,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2756(X1) | ~sP6(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5820_D])). 23.38/23.19 fof(f5820_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP6(X0) | ~r1(X0,X1)) ) <=> ~sP2756(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2756])])). 23.38/23.19 fof(f566,plain,( 23.38/23.19 ( ! [X6,X4,X0,X12,X10,X8,X7,X5,X3,X1,X11,X9] : (~r1(X0,X1) | ~r1(X1,X3) | ~r1(X3,X4) | ~r1(X8,X9) | ~p9(X12) | ~p8(X12) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP6(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f226])). 23.38/23.19 fof(f425652,plain,( 23.38/23.19 sP2764(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402818,f5836])). 23.38/23.19 fof(f402818,plain,( 23.38/23.19 sP2763(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378133,f5834])). 23.38/23.19 fof(f378133,plain,( 23.38/23.19 sP2762(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342653,f5832])). 23.38/23.19 fof(f342653,plain,( 23.38/23.19 sP2761(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320595,f5830])). 23.38/23.19 fof(f320595,plain,( 23.38/23.19 sP2760(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301704,f5828])). 23.38/23.19 fof(f301704,plain,( 23.38/23.19 sP2759(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283583,f5826])). 23.38/23.19 fof(f283583,plain,( 23.38/23.19 sP2758(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266224,f5824])). 23.38/23.19 fof(f266224,plain,( 23.38/23.19 sP2756(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f249592,f5820])). 23.38/23.19 fof(f472177,plain,( 23.38/23.19 ~sP2736(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448808,f5798])). 23.38/23.19 fof(f5798,plain,( 23.38/23.19 ( ! [X10,X11] : (~sP2736(X11) | ~r1(X10,X11) | sP2745(X10)) )), 23.38/23.19 inference(cnf_transformation,[],[f5798_D])). 23.38/23.19 fof(f5798_D,plain,( 23.38/23.19 ( ! [X10] : (( ! [X11] : (~sP2736(X11) | ~r1(X10,X11)) ) <=> ~sP2745(X10)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2745])])). 23.38/23.19 fof(f448808,plain,( 23.38/23.19 ~sP2745(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425658,f5799])). 23.38/23.19 fof(f5799,plain,( 23.38/23.19 ( ! [X10,X9] : (~sP2745(X10) | ~sP2744(X9) | ~r1(X9,X10)) )), 23.38/23.19 inference(general_splitting,[],[f5797,f5798_D])). 23.38/23.19 fof(f5797,plain,( 23.38/23.19 ( ! [X10,X11,X9] : (~r1(X10,X11) | ~r1(X9,X10) | ~sP2736(X11) | ~sP2744(X9)) )), 23.38/23.19 inference(general_splitting,[],[f5795,f5796_D])). 23.38/23.19 fof(f5796,plain,( 23.38/23.19 ( ! [X8,X9] : (sP2744(X9) | ~sP2743(X8) | ~r1(X8,X9)) )), 23.38/23.19 inference(cnf_transformation,[],[f5796_D])). 23.38/23.19 fof(f5796_D,plain,( 23.38/23.19 ( ! [X9] : (( ! [X8] : (~sP2743(X8) | ~r1(X8,X9)) ) <=> ~sP2744(X9)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2744])])). 23.38/23.19 fof(f5795,plain,( 23.38/23.19 ( ! [X10,X8,X11,X9] : (~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2736(X11) | ~sP2743(X8)) )), 23.38/23.19 inference(general_splitting,[],[f5793,f5794_D])). 23.38/23.19 fof(f5794,plain,( 23.38/23.19 ( ! [X8,X7] : (sP2743(X8) | ~sP2742(X7) | ~r1(X7,X8)) )), 23.38/23.19 inference(cnf_transformation,[],[f5794_D])). 23.38/23.19 fof(f5794_D,plain,( 23.38/23.19 ( ! [X8] : (( ! [X7] : (~sP2742(X7) | ~r1(X7,X8)) ) <=> ~sP2743(X8)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2743])])). 23.38/23.19 fof(f5793,plain,( 23.38/23.19 ( ! [X10,X8,X7,X11,X9] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2736(X11) | ~sP2742(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5791,f5792_D])). 23.38/23.19 fof(f5792,plain,( 23.38/23.19 ( ! [X6,X7] : (sP2742(X7) | ~sP2741(X6) | ~r1(X6,X7)) )), 23.38/23.19 inference(cnf_transformation,[],[f5792_D])). 23.38/23.19 fof(f5792_D,plain,( 23.38/23.19 ( ! [X7] : (( ! [X6] : (~sP2741(X6) | ~r1(X6,X7)) ) <=> ~sP2742(X7)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2742])])). 23.38/23.19 fof(f5791,plain,( 23.38/23.19 ( ! [X6,X10,X8,X7,X11,X9] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2736(X11) | ~sP2741(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5789,f5790_D])). 23.38/23.19 fof(f5790,plain,( 23.38/23.19 ( ! [X6,X5] : (sP2741(X6) | ~sP2740(X5) | ~r1(X5,X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5790_D])). 23.38/23.19 fof(f5790_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X5] : (~sP2740(X5) | ~r1(X5,X6)) ) <=> ~sP2741(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2741])])). 23.38/23.19 fof(f5789,plain,( 23.38/23.19 ( ! [X6,X10,X8,X7,X5,X11,X9] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2736(X11) | ~sP2740(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5787,f5788_D])). 23.38/23.19 fof(f5788,plain,( 23.38/23.19 ( ! [X4,X5] : (sP2740(X5) | ~sP2739(X4) | ~r1(X4,X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5788_D])). 23.38/23.19 fof(f5788_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X4] : (~sP2739(X4) | ~r1(X4,X5)) ) <=> ~sP2740(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2740])])). 23.38/23.19 fof(f5787,plain,( 23.38/23.19 ( ! [X6,X4,X10,X8,X7,X5,X11,X9] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2736(X11) | ~sP2739(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5785,f5786_D])). 23.38/23.19 fof(f5786,plain,( 23.38/23.19 ( ! [X4,X3] : (sP2739(X4) | ~sP2738(X3) | ~r1(X3,X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5786_D])). 23.38/23.19 fof(f5786_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X3] : (~sP2738(X3) | ~r1(X3,X4)) ) <=> ~sP2739(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2739])])). 23.38/23.19 fof(f5785,plain,( 23.38/23.19 ( ! [X6,X4,X10,X8,X7,X5,X3,X11,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2736(X11) | ~sP2738(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5783,f5784_D])). 23.38/23.19 fof(f5784,plain,( 23.38/23.19 ( ! [X2,X3] : (sP2738(X3) | ~sP2737(X2) | ~r1(X2,X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5784_D])). 23.38/23.19 fof(f5784_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X2] : (~sP2737(X2) | ~r1(X2,X3)) ) <=> ~sP2738(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2738])])). 23.38/23.19 fof(f5783,plain,( 23.38/23.19 ( ! [X6,X4,X2,X10,X8,X7,X5,X3,X11,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X2,X3) | ~sP2736(X11) | ~sP2737(X2)) )), 23.38/23.19 inference(general_splitting,[],[f5781,f5782_D])). 23.38/23.19 fof(f5782,plain,( 23.38/23.19 ( ! [X2,X1] : (sP2737(X2) | ~sP2735(X1) | ~r1(X1,X2)) )), 23.38/23.19 inference(cnf_transformation,[],[f5782_D])). 23.38/23.19 fof(f5782_D,plain,( 23.38/23.19 ( ! [X2] : (( ! [X1] : (~sP2735(X1) | ~r1(X1,X2)) ) <=> ~sP2737(X2)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2737])])). 23.38/23.19 fof(f5781,plain,( 23.38/23.19 ( ! [X6,X4,X2,X10,X8,X7,X5,X3,X1,X11,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X2,X3) | ~r1(X1,X2) | ~sP2735(X1) | ~sP2736(X11)) )), 23.38/23.19 inference(general_splitting,[],[f5779,f5780_D])). 23.38/23.19 fof(f5779,plain,( 23.38/23.19 ( ! [X6,X4,X2,X12,X10,X8,X7,X5,X3,X1,X11,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | p10(X12) | p9(X12) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X2,X3) | ~r1(X1,X2) | ~sP2735(X1)) )), 23.38/23.19 inference(general_splitting,[],[f564,f5778_D])). 23.38/23.19 fof(f5778,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2735(X1) | ~sP7(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5778_D])). 23.38/23.19 fof(f5778_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP7(X0) | ~r1(X0,X1)) ) <=> ~sP2735(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2735])])). 23.38/23.19 fof(f564,plain,( 23.38/23.19 ( ! [X6,X4,X2,X0,X12,X10,X8,X7,X5,X3,X1,X11,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | p10(X12) | p9(X12) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X2,X3) | ~r1(X1,X2) | ~r1(X0,X1) | ~sP7(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f222])). 23.38/23.19 fof(f425658,plain,( 23.38/23.19 sP2744(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402824,f5796])). 23.38/23.19 fof(f402824,plain,( 23.38/23.19 sP2743(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378139,f5794])). 23.38/23.19 fof(f378139,plain,( 23.38/23.19 sP2742(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342659,f5792])). 23.38/23.19 fof(f342659,plain,( 23.38/23.19 sP2741(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320599,f5790])). 23.38/23.19 fof(f320599,plain,( 23.38/23.19 sP2740(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301708,f5788])). 23.38/23.19 fof(f301708,plain,( 23.38/23.19 sP2739(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283587,f5786])). 23.38/23.19 fof(f283587,plain,( 23.38/23.19 sP2738(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266228,f5784])). 23.38/23.19 fof(f266228,plain,( 23.38/23.19 sP2737(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f249600,f5782])). 23.38/23.19 fof(f249600,plain,( 23.38/23.19 sP2735(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f233702,f5778])). 23.38/23.19 fof(f472183,plain,( 23.38/23.19 ~sP2713(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448814,f5750])). 23.38/23.19 fof(f5750,plain,( 23.38/23.19 ( ! [X12,X13] : (~sP2713(X13) | ~r1(X12,X13) | sP2721(X12)) )), 23.38/23.19 inference(cnf_transformation,[],[f5750_D])). 23.38/23.19 fof(f5750_D,plain,( 23.38/23.19 ( ! [X12] : (( ! [X13] : (~sP2713(X13) | ~r1(X12,X13)) ) <=> ~sP2721(X12)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2721])])). 23.38/23.19 fof(f448814,plain,( 23.38/23.19 ~sP2721(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425664,f5752])). 23.38/23.19 fof(f5752,plain,( 23.38/23.19 ( ! [X12,X11] : (~sP2721(X12) | ~r1(X11,X12) | sP2722(X11)) )), 23.38/23.19 inference(cnf_transformation,[],[f5752_D])). 23.38/23.19 fof(f5752_D,plain,( 23.38/23.19 ( ! [X11] : (( ! [X12] : (~sP2721(X12) | ~r1(X11,X12)) ) <=> ~sP2722(X11)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2722])])). 23.38/23.19 fof(f425664,plain,( 23.38/23.19 ~sP2722(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402830,f5754])). 23.38/23.19 fof(f5754,plain,( 23.38/23.19 ( ! [X10,X11] : (~sP2722(X11) | ~r1(X10,X11) | sP2723(X10)) )), 23.38/23.19 inference(cnf_transformation,[],[f5754_D])). 23.38/23.19 fof(f5754_D,plain,( 23.38/23.19 ( ! [X10] : (( ! [X11] : (~sP2722(X11) | ~r1(X10,X11)) ) <=> ~sP2723(X10)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2723])])). 23.38/23.19 fof(f402830,plain,( 23.38/23.19 ~sP2723(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378145,f5755])). 23.38/23.19 fof(f5755,plain,( 23.38/23.19 ( ! [X10,X9] : (~sP2723(X10) | ~sP2720(X9) | ~r1(X9,X10)) )), 23.38/23.19 inference(general_splitting,[],[f5753,f5754_D])). 23.38/23.19 fof(f5753,plain,( 23.38/23.19 ( ! [X10,X11,X9] : (~r1(X10,X11) | ~r1(X9,X10) | ~sP2720(X9) | ~sP2722(X11)) )), 23.38/23.19 inference(general_splitting,[],[f5751,f5752_D])). 23.38/23.19 fof(f5751,plain,( 23.38/23.19 ( ! [X12,X10,X11,X9] : (~r1(X11,X12) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2720(X9) | ~sP2721(X12)) )), 23.38/23.19 inference(general_splitting,[],[f5749,f5750_D])). 23.38/23.19 fof(f5749,plain,( 23.38/23.19 ( ! [X12,X10,X13,X11,X9] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2713(X13) | ~sP2720(X9)) )), 23.38/23.19 inference(general_splitting,[],[f5747,f5748_D])). 23.38/23.19 fof(f5748,plain,( 23.38/23.19 ( ! [X8,X9] : (sP2720(X9) | ~sP2719(X8) | ~r1(X8,X9)) )), 23.38/23.19 inference(cnf_transformation,[],[f5748_D])). 23.38/23.19 fof(f5748_D,plain,( 23.38/23.19 ( ! [X9] : (( ! [X8] : (~sP2719(X8) | ~r1(X8,X9)) ) <=> ~sP2720(X9)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2720])])). 23.38/23.19 fof(f5747,plain,( 23.38/23.19 ( ! [X12,X10,X8,X13,X11,X9] : (~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2713(X13) | ~sP2719(X8)) )), 23.38/23.19 inference(general_splitting,[],[f5745,f5746_D])). 23.38/23.19 fof(f5746,plain,( 23.38/23.19 ( ! [X8,X7] : (sP2719(X8) | ~sP2718(X7) | ~r1(X7,X8)) )), 23.38/23.19 inference(cnf_transformation,[],[f5746_D])). 23.38/23.19 fof(f5746_D,plain,( 23.38/23.19 ( ! [X8] : (( ! [X7] : (~sP2718(X7) | ~r1(X7,X8)) ) <=> ~sP2719(X8)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2719])])). 23.38/23.19 fof(f5745,plain,( 23.38/23.19 ( ! [X12,X10,X8,X7,X13,X11,X9] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2713(X13) | ~sP2718(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5743,f5744_D])). 23.38/23.19 fof(f5744,plain,( 23.38/23.19 ( ! [X6,X7] : (sP2718(X7) | ~sP2717(X6) | ~r1(X6,X7)) )), 23.38/23.19 inference(cnf_transformation,[],[f5744_D])). 23.38/23.19 fof(f5744_D,plain,( 23.38/23.19 ( ! [X7] : (( ! [X6] : (~sP2717(X6) | ~r1(X6,X7)) ) <=> ~sP2718(X7)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2718])])). 23.38/23.19 fof(f5743,plain,( 23.38/23.19 ( ! [X6,X12,X10,X8,X7,X13,X11,X9] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2713(X13) | ~sP2717(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5741,f5742_D])). 23.38/23.19 fof(f5742,plain,( 23.38/23.19 ( ! [X6,X5] : (sP2717(X6) | ~sP2716(X5) | ~r1(X5,X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5742_D])). 23.38/23.19 fof(f5742_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X5] : (~sP2716(X5) | ~r1(X5,X6)) ) <=> ~sP2717(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2717])])). 23.38/23.19 fof(f5741,plain,( 23.38/23.19 ( ! [X6,X12,X10,X8,X7,X5,X13,X11,X9] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2713(X13) | ~sP2716(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5739,f5740_D])). 23.38/23.19 fof(f5740,plain,( 23.38/23.19 ( ! [X4,X5] : (sP2716(X5) | ~sP2715(X4) | ~r1(X4,X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5740_D])). 23.38/23.19 fof(f5740_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X4] : (~sP2715(X4) | ~r1(X4,X5)) ) <=> ~sP2716(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2716])])). 23.38/23.19 fof(f5739,plain,( 23.38/23.19 ( ! [X6,X4,X12,X10,X8,X7,X5,X13,X11,X9] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2713(X13) | ~sP2715(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5737,f5738_D])). 23.38/23.19 fof(f5738,plain,( 23.38/23.19 ( ! [X4,X3] : (sP2715(X4) | ~sP2714(X3) | ~r1(X3,X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5738_D])). 23.38/23.19 fof(f5738_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X3] : (~sP2714(X3) | ~r1(X3,X4)) ) <=> ~sP2715(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2715])])). 23.38/23.19 fof(f5737,plain,( 23.38/23.19 ( ! [X6,X4,X12,X10,X8,X7,X5,X3,X13,X11,X9] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2713(X13) | ~sP2714(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5735,f5736_D])). 23.38/23.19 fof(f5736,plain,( 23.38/23.19 ( ! [X3,X1] : (sP2714(X3) | ~sP2712(X1) | ~r1(X1,X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5736_D])). 23.38/23.19 fof(f5736_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X1] : (~sP2712(X1) | ~r1(X1,X3)) ) <=> ~sP2714(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2714])])). 23.38/23.19 fof(f5735,plain,( 23.38/23.19 ( ! [X6,X4,X12,X10,X8,X7,X5,X3,X1,X13,X11,X9] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2712(X1) | ~sP2713(X13)) )), 23.38/23.19 inference(general_splitting,[],[f5733,f5734_D])). 23.38/23.19 fof(f5733,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X7,X5,X3,X1,X13,X11,X9] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X13,X14) | ~p11(X14) | ~p10(X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2712(X1)) )), 23.38/23.19 inference(general_splitting,[],[f556,f5732_D])). 23.38/23.19 fof(f5732,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2712(X1) | ~sP8(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5732_D])). 23.38/23.19 fof(f5732_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP8(X0) | ~r1(X0,X1)) ) <=> ~sP2712(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2712])])). 23.38/23.19 fof(f556,plain,( 23.38/23.19 ( ! [X6,X4,X0,X14,X12,X10,X8,X7,X5,X3,X1,X13,X11,X9] : (~r1(X0,X1) | ~r1(X1,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X13,X14) | ~p11(X14) | ~p10(X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP8(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f218])). 23.38/23.19 fof(f378145,plain,( 23.38/23.19 sP2720(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342665,f5748])). 23.38/23.19 fof(f342665,plain,( 23.38/23.19 sP2719(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320603,f5746])). 23.38/23.19 fof(f320603,plain,( 23.38/23.19 sP2718(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301712,f5744])). 23.38/23.19 fof(f301712,plain,( 23.38/23.19 sP2717(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283591,f5742])). 23.38/23.19 fof(f283591,plain,( 23.38/23.19 sP2716(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266232,f5740])). 23.38/23.19 fof(f266232,plain,( 23.38/23.19 sP2715(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f249604,f5738])). 23.38/23.19 fof(f249604,plain,( 23.38/23.19 sP2714(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f233706,f5736])). 23.38/23.19 fof(f233706,plain,( 23.38/23.19 sP2712(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f218502,f5732])). 23.38/23.19 fof(f472186,plain,( 23.38/23.19 ~sP2675(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448817,f5676])). 23.38/23.19 fof(f5676,plain,( 23.38/23.19 ( ! [X12,X13] : (~sP2675(X13) | ~r1(X12,X13) | sP2684(X12)) )), 23.38/23.19 inference(cnf_transformation,[],[f5676_D])). 23.38/23.19 fof(f5676_D,plain,( 23.38/23.19 ( ! [X12] : (( ! [X13] : (~sP2675(X13) | ~r1(X12,X13)) ) <=> ~sP2684(X12)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2684])])). 23.38/23.19 fof(f448817,plain,( 23.38/23.19 ~sP2684(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425667,f5678])). 23.38/23.19 fof(f5678,plain,( 23.38/23.19 ( ! [X12,X11] : (~sP2684(X12) | ~r1(X11,X12) | sP2685(X11)) )), 23.38/23.19 inference(cnf_transformation,[],[f5678_D])). 23.38/23.19 fof(f5678_D,plain,( 23.38/23.19 ( ! [X11] : (( ! [X12] : (~sP2684(X12) | ~r1(X11,X12)) ) <=> ~sP2685(X11)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2685])])). 23.38/23.19 fof(f425667,plain,( 23.38/23.19 ~sP2685(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402833,f5680])). 23.38/23.19 fof(f5680,plain,( 23.38/23.19 ( ! [X10,X11] : (~sP2685(X11) | ~r1(X10,X11) | sP2686(X10)) )), 23.38/23.19 inference(cnf_transformation,[],[f5680_D])). 23.38/23.19 fof(f5680_D,plain,( 23.38/23.19 ( ! [X10] : (( ! [X11] : (~sP2685(X11) | ~r1(X10,X11)) ) <=> ~sP2686(X10)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2686])])). 23.38/23.19 fof(f402833,plain,( 23.38/23.19 ~sP2686(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378148,f5681])). 23.38/23.19 fof(f5681,plain,( 23.38/23.19 ( ! [X10,X9] : (~sP2686(X10) | ~sP2683(X9) | ~r1(X9,X10)) )), 23.38/23.19 inference(general_splitting,[],[f5679,f5680_D])). 23.38/23.19 fof(f5679,plain,( 23.38/23.19 ( ! [X10,X11,X9] : (~r1(X10,X11) | ~r1(X9,X10) | ~sP2683(X9) | ~sP2685(X11)) )), 23.38/23.19 inference(general_splitting,[],[f5677,f5678_D])). 23.38/23.19 fof(f5677,plain,( 23.38/23.19 ( ! [X12,X10,X11,X9] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP2683(X9) | ~sP2684(X12)) )), 23.38/23.19 inference(general_splitting,[],[f5675,f5676_D])). 23.38/23.19 fof(f5675,plain,( 23.38/23.19 ( ! [X12,X10,X13,X11,X9] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP2675(X13) | ~sP2683(X9)) )), 23.38/23.19 inference(general_splitting,[],[f5673,f5674_D])). 23.38/23.19 fof(f5674,plain,( 23.38/23.19 ( ! [X8,X9] : (sP2683(X9) | ~sP2682(X8) | ~r1(X8,X9)) )), 23.38/23.19 inference(cnf_transformation,[],[f5674_D])). 23.38/23.19 fof(f5674_D,plain,( 23.38/23.19 ( ! [X9] : (( ! [X8] : (~sP2682(X8) | ~r1(X8,X9)) ) <=> ~sP2683(X9)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2683])])). 23.38/23.19 fof(f5673,plain,( 23.38/23.19 ( ! [X12,X10,X8,X13,X11,X9] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP2675(X13) | ~sP2682(X8)) )), 23.38/23.19 inference(general_splitting,[],[f5671,f5672_D])). 23.38/23.19 fof(f5672,plain,( 23.38/23.19 ( ! [X8,X7] : (sP2682(X8) | ~sP2681(X7) | ~r1(X7,X8)) )), 23.38/23.19 inference(cnf_transformation,[],[f5672_D])). 23.38/23.19 fof(f5672_D,plain,( 23.38/23.19 ( ! [X8] : (( ! [X7] : (~sP2681(X7) | ~r1(X7,X8)) ) <=> ~sP2682(X8)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2682])])). 23.38/23.19 fof(f5671,plain,( 23.38/23.19 ( ! [X12,X10,X8,X7,X13,X11,X9] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP2675(X13) | ~sP2681(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5669,f5670_D])). 23.38/23.19 fof(f5670,plain,( 23.38/23.19 ( ! [X6,X7] : (sP2681(X7) | ~sP2680(X6) | ~r1(X6,X7)) )), 23.38/23.19 inference(cnf_transformation,[],[f5670_D])). 23.38/23.19 fof(f5670_D,plain,( 23.38/23.19 ( ! [X7] : (( ! [X6] : (~sP2680(X6) | ~r1(X6,X7)) ) <=> ~sP2681(X7)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2681])])). 23.38/23.19 fof(f5669,plain,( 23.38/23.19 ( ! [X6,X12,X10,X8,X7,X13,X11,X9] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X6,X7) | ~sP2675(X13) | ~sP2680(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5667,f5668_D])). 23.38/23.19 fof(f5668,plain,( 23.38/23.19 ( ! [X6,X5] : (sP2680(X6) | ~sP2679(X5) | ~r1(X5,X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5668_D])). 23.38/23.19 fof(f5668_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X5] : (~sP2679(X5) | ~r1(X5,X6)) ) <=> ~sP2680(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2680])])). 23.38/23.19 fof(f5667,plain,( 23.38/23.19 ( ! [X6,X12,X10,X8,X7,X5,X13,X11,X9] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2675(X13) | ~sP2679(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5665,f5666_D])). 23.38/23.19 fof(f5666,plain,( 23.38/23.19 ( ! [X4,X5] : (sP2679(X5) | ~sP2678(X4) | ~r1(X4,X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5666_D])). 23.38/23.19 fof(f5666_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X4] : (~sP2678(X4) | ~r1(X4,X5)) ) <=> ~sP2679(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2679])])). 23.38/23.19 fof(f5665,plain,( 23.38/23.19 ( ! [X6,X4,X12,X10,X8,X7,X5,X13,X11,X9] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2675(X13) | ~sP2678(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5663,f5664_D])). 23.38/23.19 fof(f5664,plain,( 23.38/23.19 ( ! [X4,X3] : (sP2678(X4) | ~sP2677(X3) | ~r1(X3,X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5664_D])). 23.38/23.19 fof(f5664_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X3] : (~sP2677(X3) | ~r1(X3,X4)) ) <=> ~sP2678(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2678])])). 23.38/23.19 fof(f5663,plain,( 23.38/23.19 ( ! [X6,X4,X12,X10,X8,X7,X5,X3,X13,X11,X9] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2675(X13) | ~sP2677(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5661,f5662_D])). 23.38/23.19 fof(f5662,plain,( 23.38/23.19 ( ! [X2,X3] : (sP2677(X3) | ~sP2676(X2) | ~r1(X2,X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5662_D])). 23.38/23.19 fof(f5662_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X2] : (~sP2676(X2) | ~r1(X2,X3)) ) <=> ~sP2677(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2677])])). 23.38/23.19 fof(f5661,plain,( 23.38/23.19 ( ! [X6,X4,X2,X12,X10,X8,X7,X5,X3,X13,X11,X9] : (~r1(X2,X3) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2675(X13) | ~sP2676(X2)) )), 23.38/23.19 inference(general_splitting,[],[f5659,f5660_D])). 23.38/23.19 fof(f5660,plain,( 23.38/23.19 ( ! [X2,X1] : (sP2676(X2) | ~sP2674(X1) | ~r1(X1,X2)) )), 23.38/23.19 inference(cnf_transformation,[],[f5660_D])). 23.38/23.19 fof(f5660_D,plain,( 23.38/23.19 ( ! [X2] : (( ! [X1] : (~sP2674(X1) | ~r1(X1,X2)) ) <=> ~sP2676(X2)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2676])])). 23.38/23.19 fof(f5659,plain,( 23.38/23.19 ( ! [X6,X4,X2,X12,X10,X8,X7,X5,X3,X1,X13,X11,X9] : (~r1(X1,X2) | ~r1(X2,X3) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2674(X1) | ~sP2675(X13)) )), 23.38/23.19 inference(general_splitting,[],[f5657,f5658_D])). 23.38/23.19 fof(f5657,plain,( 23.38/23.19 ( ! [X6,X4,X2,X14,X12,X10,X8,X7,X5,X3,X1,X13,X11,X9] : (~r1(X1,X2) | ~r1(X2,X3) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | p12(X14) | p11(X14) | ~r1(X9,X10) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2674(X1)) )), 23.38/23.19 inference(general_splitting,[],[f555,f5656_D])). 23.38/23.19 fof(f5656,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2674(X1) | ~sP9(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5656_D])). 23.38/23.19 fof(f5656_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP9(X0) | ~r1(X0,X1)) ) <=> ~sP2674(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2674])])). 23.38/23.19 fof(f555,plain,( 23.38/23.19 ( ! [X6,X4,X2,X0,X14,X12,X10,X8,X7,X5,X3,X1,X13,X11,X9] : (~r1(X0,X1) | ~r1(X1,X2) | ~r1(X2,X3) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | p12(X14) | p11(X14) | ~r1(X9,X10) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP9(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f214])). 23.38/23.19 fof(f378148,plain,( 23.38/23.19 sP2683(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342668,f5674])). 23.38/23.19 fof(f342668,plain,( 23.38/23.19 sP2682(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320605,f5672])). 23.38/23.19 fof(f320605,plain,( 23.38/23.19 sP2681(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301714,f5670])). 23.38/23.19 fof(f301714,plain,( 23.38/23.19 sP2680(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283593,f5668])). 23.38/23.19 fof(f283593,plain,( 23.38/23.19 sP2679(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266234,f5666])). 23.38/23.19 fof(f266234,plain,( 23.38/23.19 sP2678(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f249606,f5664])). 23.38/23.19 fof(f249606,plain,( 23.38/23.19 sP2677(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f233708,f5662])). 23.38/23.19 fof(f233708,plain,( 23.38/23.19 sP2676(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f218508,f5660])). 23.38/23.19 fof(f218508,plain,( 23.38/23.19 sP2674(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f204001,f5656])). 23.38/23.19 fof(f472195,plain,( 23.38/23.19 sP2673(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448826,f5654])). 23.38/23.19 fof(f448826,plain,( 23.38/23.19 sP2672(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425676,f5652])). 23.38/23.19 fof(f425676,plain,( 23.38/23.19 sP2671(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402842,f5650])). 23.38/23.19 fof(f402842,plain,( 23.38/23.19 sP2670(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378157,f5648])). 23.38/23.19 fof(f378157,plain,( 23.38/23.19 sP2669(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342677,f5646])). 23.38/23.19 fof(f342677,plain,( 23.38/23.19 sP2668(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320611,f5644])). 23.38/23.19 fof(f320611,plain,( 23.38/23.19 sP2667(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301720,f5642])). 23.38/23.19 fof(f301720,plain,( 23.38/23.19 sP2666(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283599,f5640])). 23.38/23.19 fof(f283599,plain,( 23.38/23.19 sP2665(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266240,f5638])). 23.38/23.19 fof(f266240,plain,( 23.38/23.19 sP2664(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f249612,f5636])). 23.38/23.19 fof(f249612,plain,( 23.38/23.19 sP2663(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f233714,f5634])). 23.38/23.19 fof(f233714,plain,( 23.38/23.19 sP2662(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f218514,f5632])). 23.38/23.19 fof(f218514,plain,( 23.38/23.19 sP2661(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f204009,f5630])). 23.38/23.19 fof(f204009,plain,( 23.38/23.19 sP2660(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f190173,f5628])). 23.38/23.19 fof(f472198,plain,( 23.38/23.19 ~sP2617(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448829,f5569])). 23.38/23.19 fof(f5569,plain,( 23.38/23.19 ( ! [X15,X16] : (~sP2630(X15) | ~sP2617(X16) | ~r1(X15,X16)) )), 23.38/23.19 inference(general_splitting,[],[f5567,f5568_D])). 23.38/23.19 fof(f5568,plain,( 23.38/23.19 ( ! [X14,X15] : (~sP2629(X14) | ~r1(X14,X15) | sP2630(X15)) )), 23.38/23.19 inference(cnf_transformation,[],[f5568_D])). 23.38/23.19 fof(f5568_D,plain,( 23.38/23.19 ( ! [X15] : (( ! [X14] : (~sP2629(X14) | ~r1(X14,X15)) ) <=> ~sP2630(X15)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2630])])). 23.38/23.19 fof(f5567,plain,( 23.38/23.19 ( ! [X14,X15,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~sP2617(X16) | ~sP2629(X14)) )), 23.38/23.19 inference(general_splitting,[],[f5565,f5566_D])). 23.38/23.19 fof(f5566,plain,( 23.38/23.19 ( ! [X14,X13] : (~sP2628(X13) | ~r1(X13,X14) | sP2629(X14)) )), 23.38/23.19 inference(cnf_transformation,[],[f5566_D])). 23.38/23.19 fof(f5566_D,plain,( 23.38/23.19 ( ! [X14] : (( ! [X13] : (~sP2628(X13) | ~r1(X13,X14)) ) <=> ~sP2629(X14)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2629])])). 23.38/23.19 fof(f5565,plain,( 23.38/23.19 ( ! [X14,X15,X13,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2617(X16) | ~sP2628(X13)) )), 23.38/23.19 inference(general_splitting,[],[f5563,f5564_D])). 23.38/23.19 fof(f5564,plain,( 23.38/23.19 ( ! [X12,X13] : (~sP2627(X12) | ~r1(X12,X13) | sP2628(X13)) )), 23.38/23.19 inference(cnf_transformation,[],[f5564_D])). 23.38/23.19 fof(f5564_D,plain,( 23.38/23.19 ( ! [X13] : (( ! [X12] : (~sP2627(X12) | ~r1(X12,X13)) ) <=> ~sP2628(X13)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2628])])). 23.38/23.19 fof(f5563,plain,( 23.38/23.19 ( ! [X14,X12,X15,X13,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2617(X16) | ~sP2627(X12)) )), 23.38/23.19 inference(general_splitting,[],[f5561,f5562_D])). 23.38/23.19 fof(f5562,plain,( 23.38/23.19 ( ! [X12,X11] : (~sP2626(X11) | ~r1(X11,X12) | sP2627(X12)) )), 23.38/23.19 inference(cnf_transformation,[],[f5562_D])). 23.38/23.19 fof(f5562_D,plain,( 23.38/23.19 ( ! [X12] : (( ! [X11] : (~sP2626(X11) | ~r1(X11,X12)) ) <=> ~sP2627(X12)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2627])])). 23.38/23.19 fof(f5561,plain,( 23.38/23.19 ( ! [X14,X12,X15,X13,X11,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2617(X16) | ~sP2626(X11)) )), 23.38/23.19 inference(general_splitting,[],[f5559,f5560_D])). 23.38/23.19 fof(f5560,plain,( 23.38/23.19 ( ! [X10,X11] : (~sP2625(X10) | ~r1(X10,X11) | sP2626(X11)) )), 23.38/23.19 inference(cnf_transformation,[],[f5560_D])). 23.38/23.19 fof(f5560_D,plain,( 23.38/23.19 ( ! [X11] : (( ! [X10] : (~sP2625(X10) | ~r1(X10,X11)) ) <=> ~sP2626(X11)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2626])])). 23.38/23.19 fof(f5559,plain,( 23.38/23.19 ( ! [X14,X12,X10,X15,X13,X11,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2617(X16) | ~sP2625(X10)) )), 23.38/23.19 inference(general_splitting,[],[f5557,f5558_D])). 23.38/23.19 fof(f5558,plain,( 23.38/23.19 ( ! [X10,X9] : (~sP2624(X9) | ~r1(X9,X10) | sP2625(X10)) )), 23.38/23.19 inference(cnf_transformation,[],[f5558_D])). 23.38/23.19 fof(f5558_D,plain,( 23.38/23.19 ( ! [X10] : (( ! [X9] : (~sP2624(X9) | ~r1(X9,X10)) ) <=> ~sP2625(X10)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2625])])). 23.38/23.19 fof(f5557,plain,( 23.38/23.19 ( ! [X14,X12,X10,X15,X13,X11,X9,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2617(X16) | ~sP2624(X9)) )), 23.38/23.19 inference(general_splitting,[],[f5555,f5556_D])). 23.38/23.19 fof(f5556,plain,( 23.38/23.19 ( ! [X8,X9] : (~sP2623(X8) | ~r1(X8,X9) | sP2624(X9)) )), 23.38/23.19 inference(cnf_transformation,[],[f5556_D])). 23.38/23.19 fof(f5556_D,plain,( 23.38/23.19 ( ! [X9] : (( ! [X8] : (~sP2623(X8) | ~r1(X8,X9)) ) <=> ~sP2624(X9)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2624])])). 23.38/23.19 fof(f5555,plain,( 23.38/23.19 ( ! [X14,X12,X10,X8,X15,X13,X11,X9,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~sP2617(X16) | ~sP2623(X8)) )), 23.38/23.19 inference(general_splitting,[],[f5553,f5554_D])). 23.38/23.19 fof(f5554,plain,( 23.38/23.19 ( ! [X8,X7] : (~sP2622(X7) | ~r1(X7,X8) | sP2623(X8)) )), 23.38/23.19 inference(cnf_transformation,[],[f5554_D])). 23.38/23.19 fof(f5554_D,plain,( 23.38/23.19 ( ! [X8] : (( ! [X7] : (~sP2622(X7) | ~r1(X7,X8)) ) <=> ~sP2623(X8)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2623])])). 23.38/23.19 fof(f5553,plain,( 23.38/23.19 ( ! [X14,X12,X10,X8,X7,X15,X13,X11,X9,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2617(X16) | ~sP2622(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5551,f5552_D])). 23.38/23.19 fof(f5552,plain,( 23.38/23.19 ( ! [X6,X7] : (~sP2621(X6) | ~r1(X6,X7) | sP2622(X7)) )), 23.38/23.19 inference(cnf_transformation,[],[f5552_D])). 23.38/23.19 fof(f5552_D,plain,( 23.38/23.19 ( ! [X7] : (( ! [X6] : (~sP2621(X6) | ~r1(X6,X7)) ) <=> ~sP2622(X7)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2622])])). 23.38/23.19 fof(f5551,plain,( 23.38/23.19 ( ! [X6,X14,X12,X10,X8,X7,X15,X13,X11,X9,X16] : (~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2617(X16) | ~sP2621(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5549,f5550_D])). 23.38/23.19 fof(f5550,plain,( 23.38/23.19 ( ! [X6,X5] : (~sP2620(X5) | ~r1(X5,X6) | sP2621(X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5550_D])). 23.38/23.19 fof(f5550_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X5] : (~sP2620(X5) | ~r1(X5,X6)) ) <=> ~sP2621(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2621])])). 23.38/23.19 fof(f5549,plain,( 23.38/23.19 ( ! [X6,X14,X12,X10,X8,X7,X5,X15,X13,X11,X9,X16] : (~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP2617(X16) | ~sP2620(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5547,f5548_D])). 23.38/23.19 fof(f5548,plain,( 23.38/23.19 ( ! [X4,X5] : (~sP2619(X4) | ~r1(X4,X5) | sP2620(X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5548_D])). 23.38/23.19 fof(f5548_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X4] : (~sP2619(X4) | ~r1(X4,X5)) ) <=> ~sP2620(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2620])])). 23.38/23.19 fof(f5547,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X7,X5,X15,X13,X11,X9,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP2617(X16) | ~sP2619(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5545,f5546_D])). 23.38/23.19 fof(f5546,plain,( 23.38/23.19 ( ! [X4,X3] : (~sP2618(X3) | ~r1(X3,X4) | sP2619(X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5546_D])). 23.38/23.19 fof(f5546_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X3] : (~sP2618(X3) | ~r1(X3,X4)) ) <=> ~sP2619(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2619])])). 23.38/23.19 fof(f5545,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X7,X5,X3,X15,X13,X11,X9,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2617(X16) | ~sP2618(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5543,f5544_D])). 23.38/23.19 fof(f5544,plain,( 23.38/23.19 ( ! [X3,X1] : (~sP2616(X1) | ~r1(X1,X3) | sP2618(X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5544_D])). 23.38/23.19 fof(f5544_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X1] : (~sP2616(X1) | ~r1(X1,X3)) ) <=> ~sP2618(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2618])])). 23.38/23.19 fof(f5543,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X7,X5,X3,X1,X15,X13,X11,X9,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2616(X1) | ~sP2617(X16)) )), 23.38/23.19 inference(general_splitting,[],[f5541,f5542_D])). 23.38/23.19 fof(f5541,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X3,X1,X15,X13,X11,X9,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | p14(X17) | p13(X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2616(X1)) )), 23.38/23.19 inference(general_splitting,[],[f542,f5540_D])). 23.38/23.19 fof(f5540,plain,( 23.38/23.19 ( ! [X0,X1] : (~sP11(X0) | ~r1(X0,X1) | sP2616(X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5540_D])). 23.38/23.19 fof(f5540_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP11(X0) | ~r1(X0,X1)) ) <=> ~sP2616(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2616])])). 23.38/23.19 fof(f542,plain,( 23.38/23.19 ( ! [X6,X4,X0,X14,X12,X10,X8,X17,X7,X5,X3,X1,X15,X13,X11,X9,X16] : (~r1(X0,X1) | ~r1(X1,X3) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | p14(X17) | p13(X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP11(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f206])). 23.38/23.19 fof(f448829,plain,( 23.38/23.19 sP2630(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425679,f5568])). 23.38/23.19 fof(f425679,plain,( 23.38/23.19 sP2629(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402845,f5566])). 23.38/23.19 fof(f402845,plain,( 23.38/23.19 sP2628(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378160,f5564])). 23.38/23.19 fof(f378160,plain,( 23.38/23.19 sP2627(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342680,f5562])). 23.38/23.19 fof(f342680,plain,( 23.38/23.19 sP2626(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320613,f5560])). 23.38/23.19 fof(f320613,plain,( 23.38/23.19 sP2625(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301722,f5558])). 23.38/23.19 fof(f301722,plain,( 23.38/23.19 sP2624(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283601,f5556])). 23.38/23.19 fof(f283601,plain,( 23.38/23.19 sP2623(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266242,f5554])). 23.38/23.19 fof(f266242,plain,( 23.38/23.19 sP2622(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f249614,f5552])). 23.38/23.19 fof(f249614,plain,( 23.38/23.19 sP2621(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f233716,f5550])). 23.38/23.19 fof(f233716,plain,( 23.38/23.19 sP2620(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f218516,f5548])). 23.38/23.19 fof(f218516,plain,( 23.38/23.19 sP2619(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f204011,f5546])). 23.38/23.19 fof(f204011,plain,( 23.38/23.19 sP2618(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f190179,f5544])). 23.38/23.19 fof(f190179,plain,( 23.38/23.19 sP2616(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f177010,f5540])). 23.38/23.19 fof(f472204,plain,( 23.38/23.19 ~sP2599(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448835,f5507])). 23.38/23.19 fof(f5507,plain,( 23.38/23.19 ( ! [X17,X16] : (~sP2599(X17) | ~sP2598(X16) | ~r1(X16,X17)) )), 23.38/23.19 inference(general_splitting,[],[f5505,f5506_D])). 23.38/23.19 fof(f5505,plain,( 23.38/23.19 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~sP2598(X16)) )), 23.38/23.19 inference(general_splitting,[],[f5503,f5504_D])). 23.38/23.19 fof(f5504,plain,( 23.38/23.19 ( ! [X15,X16] : (sP2598(X16) | ~sP2597(X15) | ~r1(X15,X16)) )), 23.38/23.19 inference(cnf_transformation,[],[f5504_D])). 23.38/23.19 fof(f5504_D,plain,( 23.38/23.19 ( ! [X16] : (( ! [X15] : (~sP2597(X15) | ~r1(X15,X16)) ) <=> ~sP2598(X16)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2598])])). 23.38/23.19 fof(f5503,plain,( 23.38/23.19 ( ! [X17,X15,X18,X16] : (~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP2597(X15)) )), 23.38/23.19 inference(general_splitting,[],[f5501,f5502_D])). 23.38/23.19 fof(f5502,plain,( 23.38/23.19 ( ! [X14,X15] : (sP2597(X15) | ~sP2596(X14) | ~r1(X14,X15)) )), 23.38/23.19 inference(cnf_transformation,[],[f5502_D])). 23.38/23.19 fof(f5502_D,plain,( 23.38/23.19 ( ! [X15] : (( ! [X14] : (~sP2596(X14) | ~r1(X14,X15)) ) <=> ~sP2597(X15)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2597])])). 23.38/23.19 fof(f5501,plain,( 23.38/23.19 ( ! [X14,X17,X15,X18,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP2596(X14)) )), 23.38/23.19 inference(general_splitting,[],[f5499,f5500_D])). 23.38/23.19 fof(f5500,plain,( 23.38/23.19 ( ! [X14,X13] : (sP2596(X14) | ~sP2595(X13) | ~r1(X13,X14)) )), 23.38/23.19 inference(cnf_transformation,[],[f5500_D])). 23.38/23.19 fof(f5500_D,plain,( 23.38/23.19 ( ! [X14] : (( ! [X13] : (~sP2595(X13) | ~r1(X13,X14)) ) <=> ~sP2596(X14)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2596])])). 23.38/23.19 fof(f5499,plain,( 23.38/23.19 ( ! [X14,X17,X15,X13,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP2595(X13)) )), 23.38/23.19 inference(general_splitting,[],[f5497,f5498_D])). 23.38/23.19 fof(f5498,plain,( 23.38/23.19 ( ! [X12,X13] : (sP2595(X13) | ~sP2594(X12) | ~r1(X12,X13)) )), 23.38/23.19 inference(cnf_transformation,[],[f5498_D])). 23.38/23.19 fof(f5498_D,plain,( 23.38/23.19 ( ! [X13] : (( ! [X12] : (~sP2594(X12) | ~r1(X12,X13)) ) <=> ~sP2595(X13)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2595])])). 23.38/23.19 fof(f5497,plain,( 23.38/23.19 ( ! [X14,X12,X17,X15,X13,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~sP2594(X12)) )), 23.38/23.19 inference(general_splitting,[],[f5495,f5496_D])). 23.38/23.19 fof(f5496,plain,( 23.38/23.19 ( ! [X12,X11] : (sP2594(X12) | ~sP2593(X11) | ~r1(X11,X12)) )), 23.38/23.19 inference(cnf_transformation,[],[f5496_D])). 23.38/23.19 fof(f5496_D,plain,( 23.38/23.19 ( ! [X12] : (( ! [X11] : (~sP2593(X11) | ~r1(X11,X12)) ) <=> ~sP2594(X12)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2594])])). 23.38/23.19 fof(f5495,plain,( 23.38/23.19 ( ! [X14,X12,X17,X15,X13,X11,X18,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~sP2593(X11)) )), 23.38/23.19 inference(general_splitting,[],[f5493,f5494_D])). 23.38/23.19 fof(f5494,plain,( 23.38/23.19 ( ! [X10,X11] : (sP2593(X11) | ~sP2592(X10) | ~r1(X10,X11)) )), 23.38/23.19 inference(cnf_transformation,[],[f5494_D])). 23.38/23.19 fof(f5494_D,plain,( 23.38/23.19 ( ! [X11] : (( ! [X10] : (~sP2592(X10) | ~r1(X10,X11)) ) <=> ~sP2593(X11)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2593])])). 23.38/23.19 fof(f5493,plain,( 23.38/23.19 ( ! [X14,X12,X10,X17,X15,X13,X11,X18,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~sP2592(X10)) )), 23.38/23.19 inference(general_splitting,[],[f5491,f5492_D])). 23.38/23.19 fof(f5492,plain,( 23.38/23.19 ( ! [X10,X9] : (sP2592(X10) | ~sP2591(X9) | ~r1(X9,X10)) )), 23.38/23.19 inference(cnf_transformation,[],[f5492_D])). 23.38/23.19 fof(f5492_D,plain,( 23.38/23.19 ( ! [X10] : (( ! [X9] : (~sP2591(X9) | ~r1(X9,X10)) ) <=> ~sP2592(X10)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2592])])). 23.38/23.19 fof(f5491,plain,( 23.38/23.19 ( ! [X14,X12,X10,X17,X15,X13,X11,X9,X18,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2591(X9)) )), 23.38/23.19 inference(general_splitting,[],[f5489,f5490_D])). 23.38/23.19 fof(f5490,plain,( 23.38/23.19 ( ! [X8,X9] : (sP2591(X9) | ~sP2590(X8) | ~r1(X8,X9)) )), 23.38/23.19 inference(cnf_transformation,[],[f5490_D])). 23.38/23.19 fof(f5490_D,plain,( 23.38/23.19 ( ! [X9] : (( ! [X8] : (~sP2590(X8) | ~r1(X8,X9)) ) <=> ~sP2591(X9)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2591])])). 23.38/23.19 fof(f5489,plain,( 23.38/23.19 ( ! [X14,X12,X10,X8,X17,X15,X13,X11,X9,X18,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2590(X8)) )), 23.38/23.19 inference(general_splitting,[],[f5487,f5488_D])). 23.38/23.19 fof(f5488,plain,( 23.38/23.19 ( ! [X8,X7] : (sP2590(X8) | ~sP2589(X7) | ~r1(X7,X8)) )), 23.38/23.19 inference(cnf_transformation,[],[f5488_D])). 23.38/23.19 fof(f5488_D,plain,( 23.38/23.19 ( ! [X8] : (( ! [X7] : (~sP2589(X7) | ~r1(X7,X8)) ) <=> ~sP2590(X8)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2590])])). 23.38/23.19 fof(f5487,plain,( 23.38/23.19 ( ! [X14,X12,X10,X8,X17,X7,X15,X13,X11,X9,X18,X16] : (~r1(X7,X8) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2589(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5485,f5486_D])). 23.38/23.19 fof(f5486,plain,( 23.38/23.19 ( ! [X6,X7] : (sP2589(X7) | ~sP2588(X6) | ~r1(X6,X7)) )), 23.38/23.19 inference(cnf_transformation,[],[f5486_D])). 23.38/23.19 fof(f5486_D,plain,( 23.38/23.19 ( ! [X7] : (( ! [X6] : (~sP2588(X6) | ~r1(X6,X7)) ) <=> ~sP2589(X7)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2589])])). 23.38/23.19 fof(f5485,plain,( 23.38/23.19 ( ! [X6,X14,X12,X10,X8,X17,X7,X15,X13,X11,X9,X18,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2588(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5483,f5484_D])). 23.38/23.19 fof(f5484,plain,( 23.38/23.19 ( ! [X6,X5] : (sP2588(X6) | ~sP2587(X5) | ~r1(X5,X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5484_D])). 23.38/23.19 fof(f5484_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X5] : (~sP2587(X5) | ~r1(X5,X6)) ) <=> ~sP2588(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2588])])). 23.38/23.19 fof(f5483,plain,( 23.38/23.19 ( ! [X6,X14,X12,X10,X8,X17,X7,X5,X15,X13,X11,X9,X18,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X5,X6) | ~sP2587(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5481,f5482_D])). 23.38/23.19 fof(f5482,plain,( 23.38/23.19 ( ! [X4,X5] : (sP2587(X5) | ~sP2586(X4) | ~r1(X4,X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5482_D])). 23.38/23.19 fof(f5482_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X4] : (~sP2586(X4) | ~r1(X4,X5)) ) <=> ~sP2587(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2587])])). 23.38/23.19 fof(f5481,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X15,X13,X11,X9,X18,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X5,X6) | ~sP2586(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5479,f5480_D])). 23.38/23.19 fof(f5480,plain,( 23.38/23.19 ( ! [X4,X3] : (sP2586(X4) | ~sP2585(X3) | ~r1(X3,X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5480_D])). 23.38/23.19 fof(f5480_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X3] : (~sP2585(X3) | ~r1(X3,X4)) ) <=> ~sP2586(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2586])])). 23.38/23.19 fof(f5479,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X3,X15,X13,X11,X9,X18,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2585(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5477,f5478_D])). 23.38/23.19 fof(f5478,plain,( 23.38/23.19 ( ! [X3,X1] : (sP2585(X3) | ~sP2584(X1) | ~r1(X1,X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5478_D])). 23.38/23.19 fof(f5478_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X1] : (~sP2584(X1) | ~r1(X1,X3)) ) <=> ~sP2585(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2585])])). 23.38/23.19 fof(f5477,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X3,X1,X15,X13,X11,X9,X18,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP2584(X1)) )), 23.38/23.19 inference(general_splitting,[],[f537,f5476_D])). 23.38/23.19 fof(f5476,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2584(X1) | ~sP12(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5476_D])). 23.38/23.19 fof(f5476_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP12(X0) | ~r1(X0,X1)) ) <=> ~sP2584(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2584])])). 23.38/23.19 fof(f537,plain,( 23.38/23.19 ( ! [X6,X4,X0,X14,X12,X10,X8,X17,X7,X5,X3,X1,X15,X13,X11,X9,X18,X16] : (~r1(X0,X1) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~p14(X18) | ~p15(X18) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP12(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f202])). 23.38/23.19 fof(f448835,plain,( 23.38/23.19 sP2598(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425685,f5504])). 23.38/23.19 fof(f425685,plain,( 23.38/23.19 sP2597(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402851,f5502])). 23.38/23.19 fof(f402851,plain,( 23.38/23.19 sP2596(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378166,f5500])). 23.38/23.19 fof(f378166,plain,( 23.38/23.19 sP2595(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342686,f5498])). 23.38/23.19 fof(f342686,plain,( 23.38/23.19 sP2594(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320617,f5496])). 23.38/23.19 fof(f320617,plain,( 23.38/23.19 sP2593(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301726,f5494])). 23.38/23.19 fof(f301726,plain,( 23.38/23.19 sP2592(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283605,f5492])). 23.38/23.19 fof(f283605,plain,( 23.38/23.19 sP2591(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266246,f5490])). 23.38/23.19 fof(f266246,plain,( 23.38/23.19 sP2590(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f249618,f5488])). 23.38/23.19 fof(f249618,plain,( 23.38/23.19 sP2589(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f233720,f5486])). 23.38/23.19 fof(f233720,plain,( 23.38/23.19 sP2588(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f218520,f5484])). 23.38/23.19 fof(f218520,plain,( 23.38/23.19 sP2587(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f204015,f5482])). 23.38/23.19 fof(f204015,plain,( 23.38/23.19 sP2586(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f190183,f5480])). 23.38/23.19 fof(f190183,plain,( 23.38/23.19 sP2585(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f177012,f5478])). 23.38/23.19 fof(f177012,plain,( 23.38/23.19 sP2584(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f164487,f5476])). 23.38/23.19 fof(f472213,plain,( 23.38/23.19 ~sP2568(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448844,f5474])). 23.38/23.19 fof(f5474,plain,( 23.38/23.19 ( ! [X17,X18] : (~sP2568(X18) | ~r1(X17,X18) | sP2583(X17)) )), 23.38/23.19 inference(cnf_transformation,[],[f5474_D])). 23.38/23.19 fof(f5474_D,plain,( 23.38/23.19 ( ! [X17] : (( ! [X18] : (~sP2568(X18) | ~r1(X17,X18)) ) <=> ~sP2583(X17)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2583])])). 23.38/23.19 fof(f448844,plain,( 23.38/23.19 ~sP2583(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425694,f5475])). 23.38/23.19 fof(f5475,plain,( 23.38/23.19 ( ! [X17,X16] : (~sP2583(X17) | ~sP2582(X16) | ~r1(X16,X17)) )), 23.38/23.19 inference(general_splitting,[],[f5473,f5474_D])). 23.38/23.19 fof(f5473,plain,( 23.38/23.19 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP2568(X18) | ~sP2582(X16)) )), 23.38/23.19 inference(general_splitting,[],[f5471,f5472_D])). 23.38/23.19 fof(f5472,plain,( 23.38/23.19 ( ! [X15,X16] : (sP2582(X16) | ~sP2581(X15) | ~r1(X15,X16)) )), 23.38/23.19 inference(cnf_transformation,[],[f5472_D])). 23.38/23.19 fof(f5472_D,plain,( 23.38/23.19 ( ! [X16] : (( ! [X15] : (~sP2581(X15) | ~r1(X15,X16)) ) <=> ~sP2582(X16)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2582])])). 23.38/23.19 fof(f5471,plain,( 23.38/23.19 ( ! [X17,X15,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP2568(X18) | ~sP2581(X15)) )), 23.38/23.19 inference(general_splitting,[],[f5469,f5470_D])). 23.38/23.19 fof(f5470,plain,( 23.38/23.19 ( ! [X14,X15] : (sP2581(X15) | ~sP2580(X14) | ~r1(X14,X15)) )), 23.38/23.19 inference(cnf_transformation,[],[f5470_D])). 23.38/23.19 fof(f5470_D,plain,( 23.38/23.19 ( ! [X15] : (( ! [X14] : (~sP2580(X14) | ~r1(X14,X15)) ) <=> ~sP2581(X15)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2581])])). 23.38/23.19 fof(f5469,plain,( 23.38/23.19 ( ! [X14,X17,X15,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2568(X18) | ~sP2580(X14)) )), 23.38/23.19 inference(general_splitting,[],[f5467,f5468_D])). 23.38/23.19 fof(f5468,plain,( 23.38/23.19 ( ! [X14,X13] : (sP2580(X14) | ~sP2579(X13) | ~r1(X13,X14)) )), 23.38/23.19 inference(cnf_transformation,[],[f5468_D])). 23.38/23.19 fof(f5468_D,plain,( 23.38/23.19 ( ! [X14] : (( ! [X13] : (~sP2579(X13) | ~r1(X13,X14)) ) <=> ~sP2580(X14)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2580])])). 23.38/23.19 fof(f5467,plain,( 23.38/23.19 ( ! [X14,X17,X15,X13,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP2568(X18) | ~sP2579(X13)) )), 23.38/23.19 inference(general_splitting,[],[f5465,f5466_D])). 23.38/23.19 fof(f5466,plain,( 23.38/23.19 ( ! [X12,X13] : (sP2579(X13) | ~sP2578(X12) | ~r1(X12,X13)) )), 23.38/23.19 inference(cnf_transformation,[],[f5466_D])). 23.38/23.19 fof(f5466_D,plain,( 23.38/23.19 ( ! [X13] : (( ! [X12] : (~sP2578(X12) | ~r1(X12,X13)) ) <=> ~sP2579(X13)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2579])])). 23.38/23.19 fof(f5465,plain,( 23.38/23.19 ( ! [X14,X12,X17,X15,X13,X18,X16] : (~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP2568(X18) | ~sP2578(X12)) )), 23.38/23.19 inference(general_splitting,[],[f5463,f5464_D])). 23.38/23.19 fof(f5464,plain,( 23.38/23.19 ( ! [X12,X11] : (sP2578(X12) | ~sP2577(X11) | ~r1(X11,X12)) )), 23.38/23.19 inference(cnf_transformation,[],[f5464_D])). 23.38/23.19 fof(f5464_D,plain,( 23.38/23.19 ( ! [X12] : (( ! [X11] : (~sP2577(X11) | ~r1(X11,X12)) ) <=> ~sP2578(X12)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2578])])). 23.38/23.19 fof(f5463,plain,( 23.38/23.19 ( ! [X14,X12,X17,X15,X13,X11,X18,X16] : (~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP2568(X18) | ~sP2577(X11)) )), 23.38/23.19 inference(general_splitting,[],[f5461,f5462_D])). 23.38/23.19 fof(f5462,plain,( 23.38/23.19 ( ! [X10,X11] : (sP2577(X11) | ~sP2576(X10) | ~r1(X10,X11)) )), 23.38/23.19 inference(cnf_transformation,[],[f5462_D])). 23.38/23.19 fof(f5462_D,plain,( 23.38/23.19 ( ! [X11] : (( ! [X10] : (~sP2576(X10) | ~r1(X10,X11)) ) <=> ~sP2577(X11)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2577])])). 23.38/23.19 fof(f5461,plain,( 23.38/23.19 ( ! [X14,X12,X10,X17,X15,X13,X11,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP2568(X18) | ~sP2576(X10)) )), 23.38/23.19 inference(general_splitting,[],[f5459,f5460_D])). 23.38/23.19 fof(f5460,plain,( 23.38/23.19 ( ! [X10,X9] : (sP2576(X10) | ~sP2575(X9) | ~r1(X9,X10)) )), 23.38/23.19 inference(cnf_transformation,[],[f5460_D])). 23.38/23.19 fof(f5460_D,plain,( 23.38/23.19 ( ! [X10] : (( ! [X9] : (~sP2575(X9) | ~r1(X9,X10)) ) <=> ~sP2576(X10)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2576])])). 23.38/23.19 fof(f5459,plain,( 23.38/23.19 ( ! [X14,X12,X10,X17,X15,X13,X11,X9,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP2568(X18) | ~sP2575(X9)) )), 23.38/23.19 inference(general_splitting,[],[f5457,f5458_D])). 23.38/23.19 fof(f5458,plain,( 23.38/23.19 ( ! [X8,X9] : (sP2575(X9) | ~sP2574(X8) | ~r1(X8,X9)) )), 23.38/23.19 inference(cnf_transformation,[],[f5458_D])). 23.38/23.19 fof(f5458_D,plain,( 23.38/23.19 ( ! [X9] : (( ! [X8] : (~sP2574(X8) | ~r1(X8,X9)) ) <=> ~sP2575(X9)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2575])])). 23.38/23.19 fof(f5457,plain,( 23.38/23.19 ( ! [X14,X12,X10,X8,X17,X15,X13,X11,X9,X18,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP2568(X18) | ~sP2574(X8)) )), 23.38/23.19 inference(general_splitting,[],[f5455,f5456_D])). 23.38/23.19 fof(f5456,plain,( 23.38/23.19 ( ! [X8,X7] : (sP2574(X8) | ~sP2573(X7) | ~r1(X7,X8)) )), 23.38/23.19 inference(cnf_transformation,[],[f5456_D])). 23.38/23.19 fof(f5456_D,plain,( 23.38/23.19 ( ! [X8] : (( ! [X7] : (~sP2573(X7) | ~r1(X7,X8)) ) <=> ~sP2574(X8)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2574])])). 23.38/23.19 fof(f5455,plain,( 23.38/23.19 ( ! [X14,X12,X10,X8,X17,X7,X15,X13,X11,X9,X18,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP2568(X18) | ~sP2573(X7)) )), 23.38/23.19 inference(general_splitting,[],[f5453,f5454_D])). 23.38/23.19 fof(f5454,plain,( 23.38/23.19 ( ! [X6,X7] : (sP2573(X7) | ~sP2572(X6) | ~r1(X6,X7)) )), 23.38/23.19 inference(cnf_transformation,[],[f5454_D])). 23.38/23.19 fof(f5454_D,plain,( 23.38/23.19 ( ! [X7] : (( ! [X6] : (~sP2572(X6) | ~r1(X6,X7)) ) <=> ~sP2573(X7)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2573])])). 23.38/23.19 fof(f5453,plain,( 23.38/23.19 ( ! [X6,X14,X12,X10,X8,X17,X7,X15,X13,X11,X9,X18,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP2568(X18) | ~sP2572(X6)) )), 23.38/23.19 inference(general_splitting,[],[f5451,f5452_D])). 23.38/23.19 fof(f5452,plain,( 23.38/23.19 ( ! [X6,X5] : (sP2572(X6) | ~sP2571(X5) | ~r1(X5,X6)) )), 23.38/23.19 inference(cnf_transformation,[],[f5452_D])). 23.38/23.19 fof(f5452_D,plain,( 23.38/23.19 ( ! [X6] : (( ! [X5] : (~sP2571(X5) | ~r1(X5,X6)) ) <=> ~sP2572(X6)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2572])])). 23.38/23.19 fof(f5451,plain,( 23.38/23.19 ( ! [X6,X14,X12,X10,X8,X17,X7,X5,X15,X13,X11,X9,X18,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2568(X18) | ~sP2571(X5)) )), 23.38/23.19 inference(general_splitting,[],[f5449,f5450_D])). 23.38/23.19 fof(f5450,plain,( 23.38/23.19 ( ! [X4,X5] : (sP2571(X5) | ~sP2570(X4) | ~r1(X4,X5)) )), 23.38/23.19 inference(cnf_transformation,[],[f5450_D])). 23.38/23.19 fof(f5450_D,plain,( 23.38/23.19 ( ! [X5] : (( ! [X4] : (~sP2570(X4) | ~r1(X4,X5)) ) <=> ~sP2571(X5)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2571])])). 23.38/23.19 fof(f5449,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X15,X13,X11,X9,X18,X16] : (~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2568(X18) | ~sP2570(X4)) )), 23.38/23.19 inference(general_splitting,[],[f5447,f5448_D])). 23.38/23.19 fof(f5448,plain,( 23.38/23.19 ( ! [X4,X3] : (sP2570(X4) | ~sP2569(X3) | ~r1(X3,X4)) )), 23.38/23.19 inference(cnf_transformation,[],[f5448_D])). 23.38/23.19 fof(f5448_D,plain,( 23.38/23.19 ( ! [X4] : (( ! [X3] : (~sP2569(X3) | ~r1(X3,X4)) ) <=> ~sP2570(X4)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2570])])). 23.38/23.19 fof(f5447,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X3,X15,X13,X11,X9,X18,X16] : (~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2568(X18) | ~sP2569(X3)) )), 23.38/23.19 inference(general_splitting,[],[f5445,f5446_D])). 23.38/23.19 fof(f5446,plain,( 23.38/23.19 ( ! [X3,X1] : (sP2569(X3) | ~sP2567(X1) | ~r1(X1,X3)) )), 23.38/23.19 inference(cnf_transformation,[],[f5446_D])). 23.38/23.19 fof(f5446_D,plain,( 23.38/23.19 ( ! [X3] : (( ! [X1] : (~sP2567(X1) | ~r1(X1,X3)) ) <=> ~sP2569(X3)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2569])])). 23.38/23.19 fof(f5445,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X3,X1,X15,X13,X11,X9,X18,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2567(X1) | ~sP2568(X18)) )), 23.38/23.19 inference(general_splitting,[],[f5443,f5444_D])). 23.38/23.19 fof(f5443,plain,( 23.38/23.19 ( ! [X6,X4,X14,X12,X10,X8,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X18,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X18,X19) | p16(X19) | p15(X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2567(X1)) )), 23.38/23.19 inference(general_splitting,[],[f531,f5442_D])). 23.38/23.19 fof(f5442,plain,( 23.38/23.19 ( ! [X0,X1] : (sP2567(X1) | ~sP13(X0) | ~r1(X0,X1)) )), 23.38/23.19 inference(cnf_transformation,[],[f5442_D])). 23.38/23.19 fof(f5442_D,plain,( 23.38/23.19 ( ! [X1] : (( ! [X0] : (~sP13(X0) | ~r1(X0,X1)) ) <=> ~sP2567(X1)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2567])])). 23.38/23.19 fof(f531,plain,( 23.38/23.19 ( ! [X6,X4,X0,X14,X12,X10,X8,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X18,X16] : (~r1(X0,X1) | ~r1(X1,X3) | ~r1(X4,X5) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X18,X19) | p16(X19) | p15(X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP13(X0)) )), 23.38/23.19 inference(cnf_transformation,[],[f198])). 23.38/23.19 fof(f425694,plain,( 23.38/23.19 sP2582(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f402860,f5472])). 23.38/23.19 fof(f402860,plain,( 23.38/23.19 sP2581(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f378175,f5470])). 23.38/23.19 fof(f378175,plain,( 23.38/23.19 sP2580(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f342695,f5468])). 23.38/23.19 fof(f342695,plain,( 23.38/23.19 sP2579(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f320623,f5466])). 23.38/23.19 fof(f320623,plain,( 23.38/23.19 sP2578(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f301732,f5464])). 23.38/23.19 fof(f301732,plain,( 23.38/23.19 sP2577(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f283611,f5462])). 23.38/23.19 fof(f283611,plain,( 23.38/23.19 sP2576(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f266252,f5460])). 23.38/23.19 fof(f266252,plain,( 23.38/23.19 sP2575(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f249624,f5458])). 23.38/23.19 fof(f249624,plain,( 23.38/23.19 sP2574(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f233726,f5456])). 23.38/23.19 fof(f233726,plain,( 23.38/23.19 sP2573(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f218526,f5454])). 23.38/23.19 fof(f218526,plain,( 23.38/23.19 sP2572(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f204021,f5452])). 23.38/23.19 fof(f204021,plain,( 23.38/23.19 sP2571(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f190189,f5450])). 23.38/23.19 fof(f190189,plain,( 23.38/23.19 sP2570(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f177018,f5448])). 23.38/23.19 fof(f177018,plain,( 23.38/23.19 sP2569(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f164491,f5446])). 23.38/23.19 fof(f164491,plain,( 23.38/23.19 sP2567(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f152586,f5442])). 23.38/23.19 fof(f472219,plain,( 23.38/23.19 ~sP2533(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f448850,f5406])). 23.38/23.19 fof(f5406,plain,( 23.38/23.19 ( ! [X17,X18] : (~sP2533(X18) | ~r1(X17,X18) | sP2549(X17)) )), 23.38/23.19 inference(cnf_transformation,[],[f5406_D])). 23.38/23.19 fof(f5406_D,plain,( 23.38/23.19 ( ! [X17] : (( ! [X18] : (~sP2533(X18) | ~r1(X17,X18)) ) <=> ~sP2549(X17)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2549])])). 23.38/23.19 fof(f448850,plain,( 23.38/23.19 ~sP2549(sK101)), 23.38/23.19 inference(unit_resulting_resolution,[],[f715,f425700,f5407])). 23.38/23.19 fof(f5407,plain,( 23.38/23.19 ( ! [X17,X16] : (~sP2549(X17) | ~sP2548(X16) | ~r1(X16,X17)) )), 23.38/23.19 inference(general_splitting,[],[f5405,f5406_D])). 23.38/23.19 fof(f5405,plain,( 23.38/23.19 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP2533(X18) | ~sP2548(X16)) )), 23.38/23.19 inference(general_splitting,[],[f5403,f5404_D])). 23.38/23.19 fof(f5404,plain,( 23.38/23.19 ( ! [X15,X16] : (sP2548(X16) | ~sP2547(X15) | ~r1(X15,X16)) )), 23.38/23.19 inference(cnf_transformation,[],[f5404_D])). 23.38/23.19 fof(f5404_D,plain,( 23.38/23.19 ( ! [X16] : (( ! [X15] : (~sP2547(X15) | ~r1(X15,X16)) ) <=> ~sP2548(X16)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2548])])). 23.38/23.19 fof(f5403,plain,( 23.38/23.19 ( ! [X17,X15,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~sP2533(X18) | ~sP2547(X15)) )), 23.38/23.19 inference(general_splitting,[],[f5401,f5402_D])). 23.38/23.19 fof(f5402,plain,( 23.38/23.19 ( ! [X14,X15] : (sP2547(X15) | ~sP2546(X14) | ~r1(X14,X15)) )), 23.38/23.19 inference(cnf_transformation,[],[f5402_D])). 23.38/23.19 fof(f5402_D,plain,( 23.38/23.19 ( ! [X15] : (( ! [X14] : (~sP2546(X14) | ~r1(X14,X15)) ) <=> ~sP2547(X15)) )), 23.38/23.19 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2547])])). 23.38/23.19 fof(f5401,plain,( 23.38/23.19 ( ! [X14,X17,X15,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~sP2533(X18) | ~sP2546(X14)) )), 23.38/23.19 inference(general_splitting,[],[f5399,f5400_D])). 23.38/23.19 fof(f5400,plain,( 23.38/23.19 ( ! [X14,X13] : (sP2546(X14) | ~sP2545(X13) | ~r1(X13,X14)) )), 23.38/23.19 inference(cnf_transformation,[],[f5400_D])). 23.38/23.20 fof(f5400_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP2545(X13) | ~r1(X13,X14)) ) <=> ~sP2546(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2546])])). 23.38/23.20 fof(f5399,plain,( 23.38/23.20 ( ! [X14,X17,X15,X13,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~sP2533(X18) | ~sP2545(X13)) )), 23.38/23.20 inference(general_splitting,[],[f5397,f5398_D])). 23.38/23.20 fof(f5398,plain,( 23.38/23.20 ( ! [X12,X13] : (sP2545(X13) | ~sP2544(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f5398_D])). 23.38/23.20 fof(f5398_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP2544(X12) | ~r1(X12,X13)) ) <=> ~sP2545(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2545])])). 23.38/23.20 fof(f5397,plain,( 23.38/23.20 ( ! [X14,X12,X17,X15,X13,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2533(X18) | ~sP2544(X12)) )), 23.38/23.20 inference(general_splitting,[],[f5395,f5396_D])). 23.38/23.20 fof(f5396,plain,( 23.38/23.20 ( ! [X12,X11] : (sP2544(X12) | ~sP2543(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f5396_D])). 23.38/23.20 fof(f5396_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP2543(X11) | ~r1(X11,X12)) ) <=> ~sP2544(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2544])])). 23.38/23.20 fof(f5395,plain,( 23.38/23.20 ( ! [X14,X12,X17,X15,X13,X11,X18,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2533(X18) | ~sP2543(X11)) )), 23.38/23.20 inference(general_splitting,[],[f5393,f5394_D])). 23.38/23.20 fof(f5394,plain,( 23.38/23.20 ( ! [X10,X11] : (sP2543(X11) | ~sP2542(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f5394_D])). 23.38/23.20 fof(f5394_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP2542(X10) | ~r1(X10,X11)) ) <=> ~sP2543(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2543])])). 23.38/23.20 fof(f5393,plain,( 23.38/23.20 ( ! [X14,X12,X10,X17,X15,X13,X11,X18,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2533(X18) | ~sP2542(X10)) )), 23.38/23.20 inference(general_splitting,[],[f5391,f5392_D])). 23.38/23.20 fof(f5392,plain,( 23.38/23.20 ( ! [X10,X9] : (sP2542(X10) | ~sP2541(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f5392_D])). 23.38/23.20 fof(f5392_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP2541(X9) | ~r1(X9,X10)) ) <=> ~sP2542(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2542])])). 23.38/23.20 fof(f5391,plain,( 23.38/23.20 ( ! [X14,X12,X10,X17,X15,X13,X11,X9,X18,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2533(X18) | ~sP2541(X9)) )), 23.38/23.20 inference(general_splitting,[],[f5389,f5390_D])). 23.38/23.20 fof(f5390,plain,( 23.38/23.20 ( ! [X8,X9] : (sP2541(X9) | ~sP2540(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f5390_D])). 23.38/23.20 fof(f5390_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP2540(X8) | ~r1(X8,X9)) ) <=> ~sP2541(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2541])])). 23.38/23.20 fof(f5389,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X17,X15,X13,X11,X9,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2533(X18) | ~sP2540(X8)) )), 23.38/23.20 inference(general_splitting,[],[f5387,f5388_D])). 23.38/23.20 fof(f5388,plain,( 23.38/23.20 ( ! [X8,X7] : (sP2540(X8) | ~sP2539(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f5388_D])). 23.38/23.20 fof(f5388_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP2539(X7) | ~r1(X7,X8)) ) <=> ~sP2540(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2540])])). 23.38/23.20 fof(f5387,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X17,X7,X15,X13,X11,X9,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2533(X18) | ~sP2539(X7)) )), 23.38/23.20 inference(general_splitting,[],[f5385,f5386_D])). 23.38/23.20 fof(f5386,plain,( 23.38/23.20 ( ! [X6,X7] : (sP2539(X7) | ~sP2538(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f5386_D])). 23.38/23.20 fof(f5386_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP2538(X6) | ~r1(X6,X7)) ) <=> ~sP2539(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2539])])). 23.38/23.20 fof(f5385,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X17,X7,X15,X13,X11,X9,X18,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2533(X18) | ~sP2538(X6)) )), 23.38/23.20 inference(general_splitting,[],[f5383,f5384_D])). 23.38/23.20 fof(f5384,plain,( 23.38/23.20 ( ! [X6,X5] : (sP2538(X6) | ~sP2537(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f5384_D])). 23.38/23.20 fof(f5384_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP2537(X5) | ~r1(X5,X6)) ) <=> ~sP2538(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2538])])). 23.38/23.20 fof(f5383,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X17,X7,X5,X15,X13,X11,X9,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2533(X18) | ~sP2537(X5)) )), 23.38/23.20 inference(general_splitting,[],[f5381,f5382_D])). 23.38/23.20 fof(f5382,plain,( 23.38/23.20 ( ! [X4,X5] : (sP2537(X5) | ~sP2536(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f5382_D])). 23.38/23.20 fof(f5382_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP2536(X4) | ~r1(X4,X5)) ) <=> ~sP2537(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2537])])). 23.38/23.20 fof(f5381,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X15,X13,X11,X9,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~sP2533(X18) | ~sP2536(X4)) )), 23.38/23.20 inference(general_splitting,[],[f5379,f5380_D])). 23.38/23.20 fof(f5380,plain,( 23.38/23.20 ( ! [X4,X3] : (sP2536(X4) | ~sP2535(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f5380_D])). 23.38/23.20 fof(f5380_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP2535(X3) | ~r1(X3,X4)) ) <=> ~sP2536(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2536])])). 23.38/23.20 fof(f5379,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X17,X7,X5,X3,X15,X13,X11,X9,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~sP2533(X18) | ~sP2535(X3)) )), 23.38/23.20 inference(general_splitting,[],[f5377,f5378_D])). 23.38/23.20 fof(f5378,plain,( 23.38/23.20 ( ! [X2,X3] : (sP2535(X3) | ~sP2534(X2) | ~r1(X2,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f5378_D])). 23.38/23.20 fof(f5378_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X2] : (~sP2534(X2) | ~r1(X2,X3)) ) <=> ~sP2535(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2535])])). 23.38/23.20 fof(f5377,plain,( 23.38/23.20 ( ! [X6,X4,X2,X14,X12,X10,X8,X17,X7,X5,X3,X15,X13,X11,X9,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP2533(X18) | ~sP2534(X2)) )), 23.38/23.20 inference(general_splitting,[],[f5375,f5376_D])). 23.38/23.20 fof(f5376,plain,( 23.38/23.20 ( ! [X2,X1] : (sP2534(X2) | ~sP2532(X1) | ~r1(X1,X2)) )), 23.38/23.20 inference(cnf_transformation,[],[f5376_D])). 23.38/23.20 fof(f5376_D,plain,( 23.38/23.20 ( ! [X2] : (( ! [X1] : (~sP2532(X1) | ~r1(X1,X2)) ) <=> ~sP2534(X2)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2534])])). 23.38/23.20 fof(f5375,plain,( 23.38/23.20 ( ! [X6,X4,X2,X14,X12,X10,X8,X17,X7,X5,X3,X1,X15,X13,X11,X9,X18,X16] : (~r1(X1,X2) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP2532(X1) | ~sP2533(X18)) )), 23.38/23.20 inference(general_splitting,[],[f5373,f5374_D])). 23.38/23.20 fof(f5373,plain,( 23.38/23.20 ( ! [X6,X4,X2,X14,X12,X10,X8,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X18,X16] : (~r1(X1,X2) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~p16(X19) | ~p17(X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP2532(X1)) )), 23.38/23.20 inference(general_splitting,[],[f529,f5372_D])). 23.38/23.20 fof(f5372,plain,( 23.38/23.20 ( ! [X0,X1] : (sP2532(X1) | ~sP14(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f5372_D])). 23.38/23.20 fof(f5372_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP14(X0) | ~r1(X0,X1)) ) <=> ~sP2532(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2532])])). 23.38/23.20 fof(f529,plain,( 23.38/23.20 ( ! [X6,X4,X2,X0,X14,X12,X10,X8,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X18,X16] : (~r1(X0,X1) | ~r1(X1,X2) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~p16(X19) | ~p17(X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP14(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f194])). 23.38/23.20 fof(f425700,plain,( 23.38/23.20 sP2548(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f402866,f5404])). 23.38/23.20 fof(f402866,plain,( 23.38/23.20 sP2547(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378181,f5402])). 23.38/23.20 fof(f378181,plain,( 23.38/23.20 sP2546(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342701,f5400])). 23.38/23.20 fof(f342701,plain,( 23.38/23.20 sP2545(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320627,f5398])). 23.38/23.20 fof(f320627,plain,( 23.38/23.20 sP2544(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301736,f5396])). 23.38/23.20 fof(f301736,plain,( 23.38/23.20 sP2543(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f283615,f5394])). 23.38/23.20 fof(f283615,plain,( 23.38/23.20 sP2542(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266256,f5392])). 23.38/23.20 fof(f266256,plain,( 23.38/23.20 sP2541(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f249628,f5390])). 23.38/23.20 fof(f249628,plain,( 23.38/23.20 sP2540(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f233730,f5388])). 23.38/23.20 fof(f233730,plain,( 23.38/23.20 sP2539(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f218530,f5386])). 23.38/23.20 fof(f218530,plain,( 23.38/23.20 sP2538(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204025,f5384])). 23.38/23.20 fof(f204025,plain,( 23.38/23.20 sP2537(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190193,f5382])). 23.38/23.20 fof(f190193,plain,( 23.38/23.20 sP2536(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177022,f5380])). 23.38/23.20 fof(f177022,plain,( 23.38/23.20 sP2535(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f164495,f5378])). 23.38/23.20 fof(f164495,plain,( 23.38/23.20 sP2534(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f152594,f5376])). 23.38/23.20 fof(f152594,plain,( 23.38/23.20 sP2532(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141303,f5372])). 23.38/23.20 fof(f472222,plain,( 23.38/23.20 ~sP2492(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f448853,f5294])). 23.38/23.20 fof(f5294,plain,( 23.38/23.20 ( ! [X19,X18] : (~sP2492(X19) | ~r1(X18,X19) | sP2493(X18)) )), 23.38/23.20 inference(cnf_transformation,[],[f5294_D])). 23.38/23.20 fof(f5294_D,plain,( 23.38/23.20 ( ! [X18] : (( ! [X19] : (~sP2492(X19) | ~r1(X18,X19)) ) <=> ~sP2493(X18)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2493])])). 23.38/23.20 fof(f448853,plain,( 23.38/23.20 ~sP2493(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f425703,f5296])). 23.38/23.20 fof(f5296,plain,( 23.38/23.20 ( ! [X17,X18] : (~sP2493(X18) | ~r1(X17,X18) | sP2494(X17)) )), 23.38/23.20 inference(cnf_transformation,[],[f5296_D])). 23.38/23.20 fof(f5296_D,plain,( 23.38/23.20 ( ! [X17] : (( ! [X18] : (~sP2493(X18) | ~r1(X17,X18)) ) <=> ~sP2494(X17)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2494])])). 23.38/23.20 fof(f425703,plain,( 23.38/23.20 ~sP2494(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f402869,f5297])). 23.38/23.20 fof(f5297,plain,( 23.38/23.20 ( ! [X17,X16] : (~sP2494(X17) | ~sP2491(X16) | ~r1(X16,X17)) )), 23.38/23.20 inference(general_splitting,[],[f5295,f5296_D])). 23.38/23.20 fof(f5295,plain,( 23.38/23.20 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP2491(X16) | ~sP2493(X18)) )), 23.38/23.20 inference(general_splitting,[],[f5293,f5294_D])). 23.38/23.20 fof(f5293,plain,( 23.38/23.20 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2491(X16) | ~sP2492(X19)) )), 23.38/23.20 inference(general_splitting,[],[f5291,f5292_D])). 23.38/23.20 fof(f5291,plain,( 23.38/23.20 ( ! [X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2491(X16)) )), 23.38/23.20 inference(general_splitting,[],[f5289,f5290_D])). 23.38/23.20 fof(f5290,plain,( 23.38/23.20 ( ! [X15,X16] : (sP2491(X16) | ~sP2490(X15) | ~r1(X15,X16)) )), 23.38/23.20 inference(cnf_transformation,[],[f5290_D])). 23.38/23.20 fof(f5290_D,plain,( 23.38/23.20 ( ! [X16] : (( ! [X15] : (~sP2490(X15) | ~r1(X15,X16)) ) <=> ~sP2491(X16)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2491])])). 23.38/23.20 fof(f5289,plain,( 23.38/23.20 ( ! [X19,X17,X15,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP2490(X15)) )), 23.38/23.20 inference(general_splitting,[],[f5287,f5288_D])). 23.38/23.20 fof(f5288,plain,( 23.38/23.20 ( ! [X14,X15] : (sP2490(X15) | ~sP2489(X14) | ~r1(X14,X15)) )), 23.38/23.20 inference(cnf_transformation,[],[f5288_D])). 23.38/23.20 fof(f5288_D,plain,( 23.38/23.20 ( ! [X15] : (( ! [X14] : (~sP2489(X14) | ~r1(X14,X15)) ) <=> ~sP2490(X15)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2490])])). 23.38/23.20 fof(f5287,plain,( 23.38/23.20 ( ! [X14,X19,X17,X15,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2489(X14)) )), 23.38/23.20 inference(general_splitting,[],[f5285,f5286_D])). 23.38/23.20 fof(f5286,plain,( 23.38/23.20 ( ! [X14,X13] : (sP2489(X14) | ~sP2488(X13) | ~r1(X13,X14)) )), 23.38/23.20 inference(cnf_transformation,[],[f5286_D])). 23.38/23.20 fof(f5286_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP2488(X13) | ~r1(X13,X14)) ) <=> ~sP2489(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2489])])). 23.38/23.20 fof(f5285,plain,( 23.38/23.20 ( ! [X14,X19,X17,X15,X13,X20,X18,X16] : (~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2488(X13)) )), 23.38/23.20 inference(general_splitting,[],[f5283,f5284_D])). 23.38/23.20 fof(f5284,plain,( 23.38/23.20 ( ! [X12,X13] : (sP2488(X13) | ~sP2487(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f5284_D])). 23.38/23.20 fof(f5284_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP2487(X12) | ~r1(X12,X13)) ) <=> ~sP2488(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2488])])). 23.38/23.20 fof(f5283,plain,( 23.38/23.20 ( ! [X14,X12,X19,X17,X15,X13,X20,X18,X16] : (~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~sP2487(X12)) )), 23.38/23.20 inference(general_splitting,[],[f5281,f5282_D])). 23.38/23.20 fof(f5282,plain,( 23.38/23.20 ( ! [X12,X11] : (sP2487(X12) | ~sP2486(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f5282_D])). 23.38/23.20 fof(f5282_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP2486(X11) | ~r1(X11,X12)) ) <=> ~sP2487(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2487])])). 23.38/23.20 fof(f5281,plain,( 23.38/23.20 ( ! [X14,X12,X19,X17,X15,X13,X11,X20,X18,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~sP2486(X11)) )), 23.38/23.20 inference(general_splitting,[],[f5279,f5280_D])). 23.38/23.20 fof(f5280,plain,( 23.38/23.20 ( ! [X10,X11] : (sP2486(X11) | ~sP2485(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f5280_D])). 23.38/23.20 fof(f5280_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP2485(X10) | ~r1(X10,X11)) ) <=> ~sP2486(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2486])])). 23.38/23.20 fof(f5279,plain,( 23.38/23.20 ( ! [X14,X12,X10,X19,X17,X15,X13,X11,X20,X18,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~sP2485(X10)) )), 23.38/23.20 inference(general_splitting,[],[f5277,f5278_D])). 23.38/23.20 fof(f5278,plain,( 23.38/23.20 ( ! [X10,X9] : (sP2485(X10) | ~sP2484(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f5278_D])). 23.38/23.20 fof(f5278_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP2484(X9) | ~r1(X9,X10)) ) <=> ~sP2485(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2485])])). 23.38/23.20 fof(f5277,plain,( 23.38/23.20 ( ! [X14,X12,X10,X19,X17,X15,X13,X11,X9,X20,X18,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP2484(X9)) )), 23.38/23.20 inference(general_splitting,[],[f5275,f5276_D])). 23.38/23.20 fof(f5276,plain,( 23.38/23.20 ( ! [X8,X9] : (sP2484(X9) | ~sP2483(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f5276_D])). 23.38/23.20 fof(f5276_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP2483(X8) | ~r1(X8,X9)) ) <=> ~sP2484(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2484])])). 23.38/23.20 fof(f5275,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X19,X17,X15,X13,X11,X9,X20,X18,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2483(X8)) )), 23.38/23.20 inference(general_splitting,[],[f5273,f5274_D])). 23.38/23.20 fof(f5274,plain,( 23.38/23.20 ( ! [X8,X7] : (sP2483(X8) | ~sP2482(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f5274_D])). 23.38/23.20 fof(f5274_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP2482(X7) | ~r1(X7,X8)) ) <=> ~sP2483(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2483])])). 23.38/23.20 fof(f5273,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X19,X17,X7,X15,X13,X11,X9,X20,X18,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2482(X7)) )), 23.38/23.20 inference(general_splitting,[],[f5271,f5272_D])). 23.38/23.20 fof(f5272,plain,( 23.38/23.20 ( ! [X6,X7] : (sP2482(X7) | ~sP2481(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f5272_D])). 23.38/23.20 fof(f5272_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP2481(X6) | ~r1(X6,X7)) ) <=> ~sP2482(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2482])])). 23.38/23.20 fof(f5271,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X19,X17,X7,X15,X13,X11,X9,X20,X18,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP2481(X6)) )), 23.38/23.20 inference(general_splitting,[],[f5269,f5270_D])). 23.38/23.20 fof(f5270,plain,( 23.38/23.20 ( ! [X6,X5] : (sP2481(X6) | ~sP2480(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f5270_D])). 23.38/23.20 fof(f5270_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP2480(X5) | ~r1(X5,X6)) ) <=> ~sP2481(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2481])])). 23.38/23.20 fof(f5269,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X19,X17,X7,X5,X15,X13,X11,X9,X20,X18,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2480(X5)) )), 23.38/23.20 inference(general_splitting,[],[f5267,f5268_D])). 23.38/23.20 fof(f5268,plain,( 23.38/23.20 ( ! [X4,X5] : (sP2480(X5) | ~sP2479(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f5268_D])). 23.38/23.20 fof(f5268_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP2479(X4) | ~r1(X4,X5)) ) <=> ~sP2480(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2480])])). 23.38/23.20 fof(f5267,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X19,X17,X7,X5,X15,X13,X11,X9,X20,X18,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2479(X4)) )), 23.38/23.20 inference(general_splitting,[],[f5265,f5266_D])). 23.38/23.20 fof(f5266,plain,( 23.38/23.20 ( ! [X4,X3] : (sP2479(X4) | ~sP2478(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f5266_D])). 23.38/23.20 fof(f5266_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP2478(X3) | ~r1(X3,X4)) ) <=> ~sP2479(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2479])])). 23.38/23.20 fof(f5265,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X19,X17,X7,X5,X3,X15,X13,X11,X9,X20,X18,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2478(X3)) )), 23.38/23.20 inference(general_splitting,[],[f5263,f5264_D])). 23.38/23.20 fof(f5264,plain,( 23.38/23.20 ( ! [X2,X3] : (sP2478(X3) | ~sP2477(X2) | ~r1(X2,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f5264_D])). 23.38/23.20 fof(f5264_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X2] : (~sP2477(X2) | ~r1(X2,X3)) ) <=> ~sP2478(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2478])])). 23.38/23.20 fof(f5263,plain,( 23.38/23.20 ( ! [X6,X4,X2,X14,X12,X10,X8,X19,X17,X7,X5,X3,X15,X13,X11,X9,X20,X18,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2477(X2)) )), 23.38/23.20 inference(general_splitting,[],[f5261,f5262_D])). 23.38/23.20 fof(f5262,plain,( 23.38/23.20 ( ! [X2,X1] : (sP2477(X2) | ~sP2476(X1) | ~r1(X1,X2)) )), 23.38/23.20 inference(cnf_transformation,[],[f5262_D])). 23.38/23.20 fof(f5262_D,plain,( 23.38/23.20 ( ! [X2] : (( ! [X1] : (~sP2476(X1) | ~r1(X1,X2)) ) <=> ~sP2477(X2)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2477])])). 23.38/23.20 fof(f5261,plain,( 23.38/23.20 ( ! [X6,X4,X2,X14,X12,X10,X8,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X20,X18,X16] : (~r1(X1,X2) | ~r1(X2,X3) | ~r1(X3,X4) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2476(X1)) )), 23.38/23.20 inference(general_splitting,[],[f525,f5260_D])). 23.38/23.20 fof(f5260,plain,( 23.38/23.20 ( ! [X0,X1] : (sP2476(X1) | ~sP15(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f5260_D])). 23.38/23.20 fof(f5260_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP15(X0) | ~r1(X0,X1)) ) <=> ~sP2476(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2476])])). 23.38/23.20 fof(f525,plain,( 23.38/23.20 ( ! [X6,X4,X2,X0,X14,X12,X10,X8,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X20,X18,X16] : (~r1(X1,X2) | ~r1(X2,X3) | ~r1(X3,X4) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | p17(X20) | p18(X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X0,X1) | ~sP15(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f190])). 23.38/23.20 fof(f402869,plain,( 23.38/23.20 sP2491(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378184,f5290])). 23.38/23.20 fof(f378184,plain,( 23.38/23.20 sP2490(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342704,f5288])). 23.38/23.20 fof(f342704,plain,( 23.38/23.20 sP2489(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320629,f5286])). 23.38/23.20 fof(f320629,plain,( 23.38/23.20 sP2488(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301738,f5284])). 23.38/23.20 fof(f301738,plain,( 23.38/23.20 sP2487(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f283617,f5282])). 23.38/23.20 fof(f283617,plain,( 23.38/23.20 sP2486(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266258,f5280])). 23.38/23.20 fof(f266258,plain,( 23.38/23.20 sP2485(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f249630,f5278])). 23.38/23.20 fof(f249630,plain,( 23.38/23.20 sP2484(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f233732,f5276])). 23.38/23.20 fof(f233732,plain,( 23.38/23.20 sP2483(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f218532,f5274])). 23.38/23.20 fof(f218532,plain,( 23.38/23.20 sP2482(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204027,f5272])). 23.38/23.20 fof(f204027,plain,( 23.38/23.20 sP2481(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190195,f5270])). 23.38/23.20 fof(f190195,plain,( 23.38/23.20 sP2480(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177024,f5268])). 23.38/23.20 fof(f177024,plain,( 23.38/23.20 sP2479(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f164497,f5266])). 23.38/23.20 fof(f164497,plain,( 23.38/23.20 sP2478(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f152596,f5264])). 23.38/23.20 fof(f152596,plain,( 23.38/23.20 sP2477(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141305,f5262])). 23.38/23.20 fof(f141305,plain,( 23.38/23.20 sP2476(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f130605,f5260])). 23.38/23.20 fof(f472231,plain,( 23.38/23.20 ~sP2471(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f448862,f5252])). 23.38/23.20 fof(f5252,plain,( 23.38/23.20 ( ! [X21,X20] : (~sP2471(X21) | ~r1(X20,X21) | sP2472(X20)) )), 23.38/23.20 inference(cnf_transformation,[],[f5252_D])). 23.38/23.20 fof(f5252_D,plain,( 23.38/23.20 ( ! [X20] : (( ! [X21] : (~sP2471(X21) | ~r1(X20,X21)) ) <=> ~sP2472(X20)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2472])])). 23.38/23.20 fof(f448862,plain,( 23.38/23.20 ~sP2472(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f425712,f5254])). 23.38/23.20 fof(f5254,plain,( 23.38/23.20 ( ! [X19,X20] : (~sP2472(X20) | ~r1(X19,X20) | sP2473(X19)) )), 23.38/23.20 inference(cnf_transformation,[],[f5254_D])). 23.38/23.20 fof(f5254_D,plain,( 23.38/23.20 ( ! [X19] : (( ! [X20] : (~sP2472(X20) | ~r1(X19,X20)) ) <=> ~sP2473(X19)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2473])])). 23.38/23.20 fof(f425712,plain,( 23.38/23.20 ~sP2473(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f402878,f5256])). 23.38/23.20 fof(f5256,plain,( 23.38/23.20 ( ! [X19,X18] : (~sP2473(X19) | ~r1(X18,X19) | sP2474(X18)) )), 23.38/23.20 inference(cnf_transformation,[],[f5256_D])). 23.38/23.20 fof(f5256_D,plain,( 23.38/23.20 ( ! [X18] : (( ! [X19] : (~sP2473(X19) | ~r1(X18,X19)) ) <=> ~sP2474(X18)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2474])])). 23.38/23.20 fof(f402878,plain,( 23.38/23.20 ~sP2474(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378193,f5258])). 23.38/23.20 fof(f5258,plain,( 23.38/23.20 ( ! [X17,X18] : (~sP2474(X18) | ~r1(X17,X18) | sP2475(X17)) )), 23.38/23.20 inference(cnf_transformation,[],[f5258_D])). 23.38/23.20 fof(f5258_D,plain,( 23.38/23.20 ( ! [X17] : (( ! [X18] : (~sP2474(X18) | ~r1(X17,X18)) ) <=> ~sP2475(X17)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2475])])). 23.38/23.20 fof(f378193,plain,( 23.38/23.20 ~sP2475(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342713,f5259])). 23.38/23.20 fof(f5259,plain,( 23.38/23.20 ( ! [X17,X16] : (~sP2475(X17) | ~sP2470(X16) | ~r1(X16,X17)) )), 23.38/23.20 inference(general_splitting,[],[f5257,f5258_D])). 23.38/23.20 fof(f5257,plain,( 23.38/23.20 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP2470(X16) | ~sP2474(X18)) )), 23.38/23.20 inference(general_splitting,[],[f5255,f5256_D])). 23.38/23.20 fof(f5255,plain,( 23.38/23.20 ( ! [X19,X17,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2470(X16) | ~sP2473(X19)) )), 23.38/23.20 inference(general_splitting,[],[f5253,f5254_D])). 23.38/23.20 fof(f5253,plain,( 23.38/23.20 ( ! [X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2470(X16) | ~sP2472(X20)) )), 23.38/23.20 inference(general_splitting,[],[f5251,f5252_D])). 23.38/23.20 fof(f5251,plain,( 23.38/23.20 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2470(X16) | ~sP2471(X21)) )), 23.38/23.20 inference(general_splitting,[],[f5249,f5250_D])). 23.38/23.20 fof(f5249,plain,( 23.38/23.20 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2470(X16)) )), 23.38/23.20 inference(general_splitting,[],[f5247,f5248_D])). 23.38/23.20 fof(f5248,plain,( 23.38/23.20 ( ! [X15,X16] : (sP2470(X16) | ~sP2469(X15) | ~r1(X15,X16)) )), 23.38/23.20 inference(cnf_transformation,[],[f5248_D])). 23.38/23.20 fof(f5248_D,plain,( 23.38/23.20 ( ! [X16] : (( ! [X15] : (~sP2469(X15) | ~r1(X15,X16)) ) <=> ~sP2470(X16)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2470])])). 23.38/23.20 fof(f5247,plain,( 23.38/23.20 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP2469(X15)) )), 23.38/23.20 inference(general_splitting,[],[f5245,f5246_D])). 23.38/23.20 fof(f5246,plain,( 23.38/23.20 ( ! [X14,X15] : (sP2469(X15) | ~sP2468(X14) | ~r1(X14,X15)) )), 23.38/23.20 inference(cnf_transformation,[],[f5246_D])). 23.38/23.20 fof(f5246_D,plain,( 23.38/23.20 ( ! [X15] : (( ! [X14] : (~sP2468(X14) | ~r1(X14,X15)) ) <=> ~sP2469(X15)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2469])])). 23.38/23.20 fof(f5245,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2468(X14)) )), 23.38/23.20 inference(general_splitting,[],[f5243,f5244_D])). 23.38/23.20 fof(f5244,plain,( 23.38/23.20 ( ! [X14,X13] : (sP2468(X14) | ~sP2467(X13) | ~r1(X13,X14)) )), 23.38/23.20 inference(cnf_transformation,[],[f5244_D])). 23.38/23.20 fof(f5244_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP2467(X13) | ~r1(X13,X14)) ) <=> ~sP2468(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2468])])). 23.38/23.20 fof(f5243,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2467(X13)) )), 23.38/23.20 inference(general_splitting,[],[f5241,f5242_D])). 23.38/23.20 fof(f5242,plain,( 23.38/23.20 ( ! [X12,X13] : (sP2467(X13) | ~sP2466(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f5242_D])). 23.38/23.20 fof(f5242_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP2466(X12) | ~r1(X12,X13)) ) <=> ~sP2467(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2467])])). 23.38/23.20 fof(f5241,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2466(X12)) )), 23.38/23.20 inference(general_splitting,[],[f5239,f5240_D])). 23.38/23.20 fof(f5240,plain,( 23.38/23.20 ( ! [X12,X11] : (sP2466(X12) | ~sP2465(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f5240_D])). 23.38/23.20 fof(f5240_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP2465(X11) | ~r1(X11,X12)) ) <=> ~sP2466(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2466])])). 23.38/23.20 fof(f5239,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2465(X11)) )), 23.38/23.20 inference(general_splitting,[],[f5237,f5238_D])). 23.38/23.20 fof(f5238,plain,( 23.38/23.20 ( ! [X10,X11] : (sP2465(X11) | ~sP2464(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f5238_D])). 23.38/23.20 fof(f5238_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP2464(X10) | ~r1(X10,X11)) ) <=> ~sP2465(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2465])])). 23.38/23.20 fof(f5237,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2464(X10)) )), 23.38/23.20 inference(general_splitting,[],[f5235,f5236_D])). 23.38/23.20 fof(f5236,plain,( 23.38/23.20 ( ! [X10,X9] : (sP2464(X10) | ~sP2463(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f5236_D])). 23.38/23.20 fof(f5236_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP2463(X9) | ~r1(X9,X10)) ) <=> ~sP2464(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2464])])). 23.38/23.20 fof(f5235,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~sP2463(X9)) )), 23.38/23.20 inference(general_splitting,[],[f5233,f5234_D])). 23.38/23.20 fof(f5234,plain,( 23.38/23.20 ( ! [X8,X9] : (sP2463(X9) | ~sP2462(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f5234_D])). 23.38/23.20 fof(f5234_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP2462(X8) | ~r1(X8,X9)) ) <=> ~sP2463(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2463])])). 23.38/23.20 fof(f5233,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~sP2462(X8)) )), 23.38/23.20 inference(general_splitting,[],[f5231,f5232_D])). 23.38/23.20 fof(f5232,plain,( 23.38/23.20 ( ! [X8,X7] : (sP2462(X8) | ~sP2461(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f5232_D])). 23.38/23.20 fof(f5232_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP2461(X7) | ~r1(X7,X8)) ) <=> ~sP2462(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2462])])). 23.38/23.20 fof(f5231,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP2461(X7)) )), 23.38/23.20 inference(general_splitting,[],[f5229,f5230_D])). 23.38/23.20 fof(f5230,plain,( 23.38/23.20 ( ! [X6,X7] : (sP2461(X7) | ~sP2460(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f5230_D])). 23.38/23.20 fof(f5230_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP2460(X6) | ~r1(X6,X7)) ) <=> ~sP2461(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2461])])). 23.38/23.20 fof(f5229,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP2460(X6)) )), 23.38/23.20 inference(general_splitting,[],[f5227,f5228_D])). 23.38/23.20 fof(f5228,plain,( 23.38/23.20 ( ! [X6,X5] : (sP2460(X6) | ~sP2459(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f5228_D])). 23.38/23.20 fof(f5228_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP2459(X5) | ~r1(X5,X6)) ) <=> ~sP2460(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2460])])). 23.38/23.20 fof(f5227,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP2459(X5)) )), 23.38/23.20 inference(general_splitting,[],[f5225,f5226_D])). 23.38/23.20 fof(f5226,plain,( 23.38/23.20 ( ! [X4,X5] : (sP2459(X5) | ~sP2458(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f5226_D])). 23.38/23.20 fof(f5226_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP2458(X4) | ~r1(X4,X5)) ) <=> ~sP2459(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2459])])). 23.38/23.20 fof(f5225,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~sP2458(X4)) )), 23.38/23.20 inference(general_splitting,[],[f5223,f5224_D])). 23.38/23.20 fof(f5224,plain,( 23.38/23.20 ( ! [X4,X3] : (sP2458(X4) | ~sP2457(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f5224_D])). 23.38/23.20 fof(f5224_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP2457(X3) | ~r1(X3,X4)) ) <=> ~sP2458(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2458])])). 23.38/23.20 fof(f5223,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~sP2457(X3)) )), 23.38/23.20 inference(general_splitting,[],[f5221,f5222_D])). 23.38/23.20 fof(f5222,plain,( 23.38/23.20 ( ! [X3,X1] : (sP2457(X3) | ~sP2456(X1) | ~r1(X1,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f5222_D])). 23.38/23.20 fof(f5222_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X1] : (~sP2456(X1) | ~r1(X1,X3)) ) <=> ~sP2457(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2457])])). 23.38/23.20 fof(f5221,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~r1(X1,X3) | ~sP2456(X1)) )), 23.38/23.20 inference(general_splitting,[],[f516,f5220_D])). 23.38/23.20 fof(f5220,plain,( 23.38/23.20 ( ! [X0,X1] : (sP2456(X1) | ~sP16(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f5220_D])). 23.38/23.20 fof(f5220_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP16(X0) | ~r1(X0,X1)) ) <=> ~sP2456(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2456])])). 23.38/23.20 fof(f516,plain,( 23.38/23.20 ( ! [X6,X4,X0,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X17,X18) | ~r1(X20,X21) | ~p18(X22) | ~p19(X22) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP16(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f186])). 23.38/23.20 fof(f342713,plain,( 23.38/23.20 sP2470(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320635,f5248])). 23.38/23.20 fof(f320635,plain,( 23.38/23.20 sP2469(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301744,f5246])). 23.38/23.20 fof(f301744,plain,( 23.38/23.20 sP2468(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f283623,f5244])). 23.38/23.20 fof(f283623,plain,( 23.38/23.20 sP2467(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266264,f5242])). 23.38/23.20 fof(f266264,plain,( 23.38/23.20 sP2466(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f249636,f5240])). 23.38/23.20 fof(f249636,plain,( 23.38/23.20 sP2465(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f233738,f5238])). 23.38/23.20 fof(f233738,plain,( 23.38/23.20 sP2464(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f218538,f5236])). 23.38/23.20 fof(f218538,plain,( 23.38/23.20 sP2463(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204033,f5234])). 23.38/23.20 fof(f204033,plain,( 23.38/23.20 sP2462(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190201,f5232])). 23.38/23.20 fof(f190201,plain,( 23.38/23.20 sP2461(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177030,f5230])). 23.38/23.20 fof(f177030,plain,( 23.38/23.20 sP2460(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f164503,f5228])). 23.38/23.20 fof(f164503,plain,( 23.38/23.20 sP2459(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f152602,f5226])). 23.38/23.20 fof(f152602,plain,( 23.38/23.20 sP2458(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141311,f5224])). 23.38/23.20 fof(f141311,plain,( 23.38/23.20 sP2457(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f130613,f5222])). 23.38/23.20 fof(f130613,plain,( 23.38/23.20 sP2456(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f120491,f5220])). 23.38/23.20 fof(f472237,plain,( 23.38/23.20 ~sP2416(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f448868,f5170])). 23.38/23.20 fof(f5170,plain,( 23.38/23.20 ( ! [X21,X22] : (~sP2416(X22) | ~r1(X21,X22) | sP2431(X21)) )), 23.38/23.20 inference(cnf_transformation,[],[f5170_D])). 23.38/23.20 fof(f5170_D,plain,( 23.38/23.20 ( ! [X21] : (( ! [X22] : (~sP2416(X22) | ~r1(X21,X22)) ) <=> ~sP2431(X21)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2431])])). 23.38/23.20 fof(f448868,plain,( 23.38/23.20 ~sP2431(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f425718,f5172])). 23.38/23.20 fof(f5172,plain,( 23.38/23.20 ( ! [X21,X20] : (~sP2431(X21) | ~r1(X20,X21) | sP2432(X20)) )), 23.38/23.20 inference(cnf_transformation,[],[f5172_D])). 23.38/23.20 fof(f5172_D,plain,( 23.38/23.20 ( ! [X20] : (( ! [X21] : (~sP2431(X21) | ~r1(X20,X21)) ) <=> ~sP2432(X20)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2432])])). 23.38/23.20 fof(f425718,plain,( 23.38/23.20 ~sP2432(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f402884,f5174])). 23.38/23.20 fof(f5174,plain,( 23.38/23.20 ( ! [X19,X20] : (~sP2432(X20) | ~r1(X19,X20) | sP2433(X19)) )), 23.38/23.20 inference(cnf_transformation,[],[f5174_D])). 23.38/23.20 fof(f5174_D,plain,( 23.38/23.20 ( ! [X19] : (( ! [X20] : (~sP2432(X20) | ~r1(X19,X20)) ) <=> ~sP2433(X19)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2433])])). 23.38/23.20 fof(f402884,plain,( 23.38/23.20 ~sP2433(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378199,f5176])). 23.38/23.20 fof(f5176,plain,( 23.38/23.20 ( ! [X19,X18] : (~sP2433(X19) | ~r1(X18,X19) | sP2434(X18)) )), 23.38/23.20 inference(cnf_transformation,[],[f5176_D])). 23.38/23.20 fof(f5176_D,plain,( 23.38/23.20 ( ! [X18] : (( ! [X19] : (~sP2433(X19) | ~r1(X18,X19)) ) <=> ~sP2434(X18)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2434])])). 23.38/23.20 fof(f378199,plain,( 23.38/23.20 ~sP2434(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342719,f5178])). 23.38/23.20 fof(f5178,plain,( 23.38/23.20 ( ! [X17,X18] : (~sP2434(X18) | ~r1(X17,X18) | sP2435(X17)) )), 23.38/23.20 inference(cnf_transformation,[],[f5178_D])). 23.38/23.20 fof(f5178_D,plain,( 23.38/23.20 ( ! [X17] : (( ! [X18] : (~sP2434(X18) | ~r1(X17,X18)) ) <=> ~sP2435(X17)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2435])])). 23.38/23.20 fof(f342719,plain,( 23.38/23.20 ~sP2435(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320639,f5179])). 23.38/23.20 fof(f5179,plain,( 23.38/23.20 ( ! [X17,X16] : (~sP2435(X17) | ~sP2430(X16) | ~r1(X16,X17)) )), 23.38/23.20 inference(general_splitting,[],[f5177,f5178_D])). 23.38/23.20 fof(f5177,plain,( 23.38/23.20 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP2430(X16) | ~sP2434(X18)) )), 23.38/23.20 inference(general_splitting,[],[f5175,f5176_D])). 23.38/23.20 fof(f5175,plain,( 23.38/23.20 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~sP2430(X16) | ~sP2433(X19)) )), 23.38/23.20 inference(general_splitting,[],[f5173,f5174_D])). 23.38/23.20 fof(f5173,plain,( 23.38/23.20 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~sP2430(X16) | ~sP2432(X20)) )), 23.38/23.20 inference(general_splitting,[],[f5171,f5172_D])). 23.38/23.20 fof(f5171,plain,( 23.38/23.20 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~sP2430(X16) | ~sP2431(X21)) )), 23.38/23.20 inference(general_splitting,[],[f5169,f5170_D])). 23.38/23.20 fof(f5169,plain,( 23.38/23.20 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~sP2416(X22) | ~sP2430(X16)) )), 23.38/23.20 inference(general_splitting,[],[f5167,f5168_D])). 23.38/23.20 fof(f5168,plain,( 23.38/23.20 ( ! [X15,X16] : (sP2430(X16) | ~sP2429(X15) | ~r1(X15,X16)) )), 23.38/23.20 inference(cnf_transformation,[],[f5168_D])). 23.38/23.20 fof(f5168_D,plain,( 23.38/23.20 ( ! [X16] : (( ! [X15] : (~sP2429(X15) | ~r1(X15,X16)) ) <=> ~sP2430(X16)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2430])])). 23.38/23.20 fof(f5167,plain,( 23.38/23.20 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~sP2416(X22) | ~sP2429(X15)) )), 23.38/23.20 inference(general_splitting,[],[f5165,f5166_D])). 23.38/23.20 fof(f5166,plain,( 23.38/23.20 ( ! [X14,X15] : (sP2429(X15) | ~sP2428(X14) | ~r1(X14,X15)) )), 23.38/23.20 inference(cnf_transformation,[],[f5166_D])). 23.38/23.20 fof(f5166_D,plain,( 23.38/23.20 ( ! [X15] : (( ! [X14] : (~sP2428(X14) | ~r1(X14,X15)) ) <=> ~sP2429(X15)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2429])])). 23.38/23.20 fof(f5165,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~sP2416(X22) | ~sP2428(X14)) )), 23.38/23.20 inference(general_splitting,[],[f5163,f5164_D])). 23.38/23.20 fof(f5164,plain,( 23.38/23.20 ( ! [X14,X13] : (sP2428(X14) | ~sP2427(X13) | ~r1(X13,X14)) )), 23.38/23.20 inference(cnf_transformation,[],[f5164_D])). 23.38/23.20 fof(f5164_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP2427(X13) | ~r1(X13,X14)) ) <=> ~sP2428(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2428])])). 23.38/23.20 fof(f5163,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~sP2416(X22) | ~sP2427(X13)) )), 23.38/23.20 inference(general_splitting,[],[f5161,f5162_D])). 23.38/23.20 fof(f5162,plain,( 23.38/23.20 ( ! [X12,X13] : (sP2427(X13) | ~sP2426(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f5162_D])). 23.38/23.20 fof(f5162_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP2426(X12) | ~r1(X12,X13)) ) <=> ~sP2427(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2427])])). 23.38/23.20 fof(f5161,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~sP2416(X22) | ~sP2426(X12)) )), 23.38/23.20 inference(general_splitting,[],[f5159,f5160_D])). 23.38/23.20 fof(f5160,plain,( 23.38/23.20 ( ! [X12,X11] : (sP2426(X12) | ~sP2425(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f5160_D])). 23.38/23.20 fof(f5160_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP2425(X11) | ~r1(X11,X12)) ) <=> ~sP2426(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2426])])). 23.38/23.20 fof(f5159,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP2416(X22) | ~sP2425(X11)) )), 23.38/23.20 inference(general_splitting,[],[f5157,f5158_D])). 23.38/23.20 fof(f5158,plain,( 23.38/23.20 ( ! [X10,X11] : (sP2425(X11) | ~sP2424(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f5158_D])). 23.38/23.20 fof(f5158_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP2424(X10) | ~r1(X10,X11)) ) <=> ~sP2425(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2425])])). 23.38/23.20 fof(f5157,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP2416(X22) | ~sP2424(X10)) )), 23.38/23.20 inference(general_splitting,[],[f5155,f5156_D])). 23.38/23.20 fof(f5156,plain,( 23.38/23.20 ( ! [X10,X9] : (sP2424(X10) | ~sP2423(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f5156_D])). 23.38/23.20 fof(f5156_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP2423(X9) | ~r1(X9,X10)) ) <=> ~sP2424(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2424])])). 23.38/23.20 fof(f5155,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP2416(X22) | ~sP2423(X9)) )), 23.38/23.20 inference(general_splitting,[],[f5153,f5154_D])). 23.38/23.20 fof(f5154,plain,( 23.38/23.20 ( ! [X8,X9] : (sP2423(X9) | ~sP2422(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f5154_D])). 23.38/23.20 fof(f5154_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP2422(X8) | ~r1(X8,X9)) ) <=> ~sP2423(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2423])])). 23.38/23.20 fof(f5153,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2416(X22) | ~sP2422(X8)) )), 23.38/23.20 inference(general_splitting,[],[f5151,f5152_D])). 23.38/23.20 fof(f5152,plain,( 23.38/23.20 ( ! [X8,X7] : (sP2422(X8) | ~sP2421(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f5152_D])). 23.38/23.20 fof(f5152_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP2421(X7) | ~r1(X7,X8)) ) <=> ~sP2422(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2422])])). 23.38/23.20 fof(f5151,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2416(X22) | ~sP2421(X7)) )), 23.38/23.20 inference(general_splitting,[],[f5149,f5150_D])). 23.38/23.20 fof(f5150,plain,( 23.38/23.20 ( ! [X6,X7] : (sP2421(X7) | ~sP2420(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f5150_D])). 23.38/23.20 fof(f5150_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP2420(X6) | ~r1(X6,X7)) ) <=> ~sP2421(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2421])])). 23.38/23.20 fof(f5149,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP2416(X22) | ~sP2420(X6)) )), 23.38/23.20 inference(general_splitting,[],[f5147,f5148_D])). 23.38/23.20 fof(f5148,plain,( 23.38/23.20 ( ! [X6,X5] : (sP2420(X6) | ~sP2419(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f5148_D])). 23.38/23.20 fof(f5148_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP2419(X5) | ~r1(X5,X6)) ) <=> ~sP2420(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2420])])). 23.38/23.20 fof(f5147,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2416(X22) | ~sP2419(X5)) )), 23.38/23.20 inference(general_splitting,[],[f5145,f5146_D])). 23.38/23.20 fof(f5146,plain,( 23.38/23.20 ( ! [X4,X5] : (sP2419(X5) | ~sP2418(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f5146_D])). 23.38/23.20 fof(f5146_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP2418(X4) | ~r1(X4,X5)) ) <=> ~sP2419(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2419])])). 23.38/23.20 fof(f5145,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2416(X22) | ~sP2418(X4)) )), 23.38/23.20 inference(general_splitting,[],[f5143,f5144_D])). 23.38/23.20 fof(f5144,plain,( 23.38/23.20 ( ! [X4,X3] : (sP2418(X4) | ~sP2417(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f5144_D])). 23.38/23.20 fof(f5144_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP2417(X3) | ~r1(X3,X4)) ) <=> ~sP2418(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2418])])). 23.38/23.20 fof(f5143,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP2416(X22) | ~sP2417(X3)) )), 23.38/23.20 inference(general_splitting,[],[f5141,f5142_D])). 23.38/23.20 fof(f5142,plain,( 23.38/23.20 ( ! [X3,X1] : (sP2417(X3) | ~sP2415(X1) | ~r1(X1,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f5142_D])). 23.38/23.20 fof(f5142_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X1] : (~sP2415(X1) | ~r1(X1,X3)) ) <=> ~sP2417(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2417])])). 23.38/23.20 fof(f5141,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP2415(X1) | ~sP2416(X22)) )), 23.38/23.20 inference(general_splitting,[],[f5139,f5140_D])). 23.38/23.20 fof(f5139,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X23,X21,X19,X17,X8,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | p19(X23) | p20(X23) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP2415(X1)) )), 23.38/23.20 inference(general_splitting,[],[f511,f5138_D])). 23.38/23.20 fof(f5138,plain,( 23.38/23.20 ( ! [X0,X1] : (sP2415(X1) | ~sP17(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f5138_D])). 23.38/23.20 fof(f5138_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP17(X0) | ~r1(X0,X1)) ) <=> ~sP2415(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2415])])). 23.38/23.20 fof(f511,plain,( 23.38/23.20 ( ! [X6,X4,X0,X14,X12,X10,X23,X21,X19,X17,X8,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | p19(X23) | p20(X23) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP17(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f182])). 23.38/23.20 fof(f320639,plain,( 23.38/23.20 sP2430(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301748,f5168])). 23.38/23.20 fof(f301748,plain,( 23.38/23.20 sP2429(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f283627,f5166])). 23.38/23.20 fof(f283627,plain,( 23.38/23.20 sP2428(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266268,f5164])). 23.38/23.20 fof(f266268,plain,( 23.38/23.20 sP2427(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f249640,f5162])). 23.38/23.20 fof(f249640,plain,( 23.38/23.20 sP2426(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f233742,f5160])). 23.38/23.20 fof(f233742,plain,( 23.38/23.20 sP2425(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f218542,f5158])). 23.38/23.20 fof(f218542,plain,( 23.38/23.20 sP2424(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204037,f5156])). 23.38/23.20 fof(f204037,plain,( 23.38/23.20 sP2423(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190205,f5154])). 23.38/23.20 fof(f190205,plain,( 23.38/23.20 sP2422(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177034,f5152])). 23.38/23.20 fof(f177034,plain,( 23.38/23.20 sP2421(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f164507,f5150])). 23.38/23.20 fof(f164507,plain,( 23.38/23.20 sP2420(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f152606,f5148])). 23.38/23.20 fof(f152606,plain,( 23.38/23.20 sP2419(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141315,f5146])). 23.38/23.20 fof(f141315,plain,( 23.38/23.20 sP2418(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f130617,f5144])). 23.38/23.20 fof(f130617,plain,( 23.38/23.20 sP2417(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f120499,f5142])). 23.38/23.20 fof(f120499,plain,( 23.38/23.20 sP2415(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f110931,f5138])). 23.38/23.20 fof(f472240,plain,( 23.38/23.20 ~sP2350(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f448871,f5012])). 23.38/23.20 fof(f5012,plain,( 23.38/23.20 ( ! [X23,X22] : (~sP2350(X23) | ~r1(X22,X23) | sP2352(X22)) )), 23.38/23.20 inference(cnf_transformation,[],[f5012_D])). 23.38/23.20 fof(f5012_D,plain,( 23.38/23.20 ( ! [X22] : (( ! [X23] : (~sP2350(X23) | ~r1(X22,X23)) ) <=> ~sP2352(X22)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2352])])). 23.38/23.20 fof(f448871,plain,( 23.38/23.20 ~sP2352(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f425721,f5042])). 23.38/23.20 fof(f5042,plain,( 23.38/23.20 ( ! [X21,X22] : (~sP2352(X22) | ~r1(X21,X22) | sP2367(X21)) )), 23.38/23.20 inference(cnf_transformation,[],[f5042_D])). 23.38/23.20 fof(f5042_D,plain,( 23.38/23.20 ( ! [X21] : (( ! [X22] : (~sP2352(X22) | ~r1(X21,X22)) ) <=> ~sP2367(X21)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2367])])). 23.38/23.20 fof(f425721,plain,( 23.38/23.20 ~sP2367(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f402887,f5044])). 23.38/23.20 fof(f5044,plain,( 23.38/23.20 ( ! [X21,X20] : (~sP2367(X21) | ~r1(X20,X21) | sP2368(X20)) )), 23.38/23.20 inference(cnf_transformation,[],[f5044_D])). 23.38/23.20 fof(f5044_D,plain,( 23.38/23.20 ( ! [X20] : (( ! [X21] : (~sP2367(X21) | ~r1(X20,X21)) ) <=> ~sP2368(X20)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2368])])). 23.38/23.20 fof(f402887,plain,( 23.38/23.20 ~sP2368(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378202,f5046])). 23.38/23.20 fof(f5046,plain,( 23.38/23.20 ( ! [X19,X20] : (~sP2368(X20) | ~r1(X19,X20) | sP2369(X19)) )), 23.38/23.20 inference(cnf_transformation,[],[f5046_D])). 23.38/23.20 fof(f5046_D,plain,( 23.38/23.20 ( ! [X19] : (( ! [X20] : (~sP2368(X20) | ~r1(X19,X20)) ) <=> ~sP2369(X19)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2369])])). 23.38/23.20 fof(f378202,plain,( 23.38/23.20 ~sP2369(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342722,f5048])). 23.38/23.20 fof(f5048,plain,( 23.38/23.20 ( ! [X19,X18] : (~sP2369(X19) | ~r1(X18,X19) | sP2370(X18)) )), 23.38/23.20 inference(cnf_transformation,[],[f5048_D])). 23.38/23.20 fof(f5048_D,plain,( 23.38/23.20 ( ! [X18] : (( ! [X19] : (~sP2369(X19) | ~r1(X18,X19)) ) <=> ~sP2370(X18)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2370])])). 23.38/23.20 fof(f342722,plain,( 23.38/23.20 ~sP2370(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320641,f5050])). 23.38/23.20 fof(f5050,plain,( 23.38/23.20 ( ! [X17,X18] : (~sP2370(X18) | ~r1(X17,X18) | sP2371(X17)) )), 23.38/23.20 inference(cnf_transformation,[],[f5050_D])). 23.38/23.20 fof(f5050_D,plain,( 23.38/23.20 ( ! [X17] : (( ! [X18] : (~sP2370(X18) | ~r1(X17,X18)) ) <=> ~sP2371(X17)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2371])])). 23.38/23.20 fof(f320641,plain,( 23.38/23.20 ~sP2371(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301750,f5051])). 23.38/23.20 fof(f5051,plain,( 23.38/23.20 ( ! [X17,X16] : (~sP2371(X17) | ~sP2366(X16) | ~r1(X16,X17)) )), 23.38/23.20 inference(general_splitting,[],[f5049,f5050_D])). 23.38/23.20 fof(f5049,plain,( 23.38/23.20 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP2366(X16) | ~sP2370(X18)) )), 23.38/23.20 inference(general_splitting,[],[f5047,f5048_D])). 23.38/23.20 fof(f5047,plain,( 23.38/23.20 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2366(X16) | ~sP2369(X19)) )), 23.38/23.20 inference(general_splitting,[],[f5045,f5046_D])). 23.38/23.20 fof(f5045,plain,( 23.38/23.20 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2366(X16) | ~sP2368(X20)) )), 23.38/23.20 inference(general_splitting,[],[f5043,f5044_D])). 23.38/23.20 fof(f5043,plain,( 23.38/23.20 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2366(X16) | ~sP2367(X21)) )), 23.38/23.20 inference(general_splitting,[],[f5041,f5042_D])). 23.38/23.20 fof(f5041,plain,( 23.38/23.20 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2352(X22) | ~sP2366(X16)) )), 23.38/23.20 inference(general_splitting,[],[f5039,f5040_D])). 23.38/23.20 fof(f5040,plain,( 23.38/23.20 ( ! [X15,X16] : (sP2366(X16) | ~sP2365(X15) | ~r1(X15,X16)) )), 23.38/23.20 inference(cnf_transformation,[],[f5040_D])). 23.38/23.20 fof(f5040_D,plain,( 23.38/23.20 ( ! [X16] : (( ! [X15] : (~sP2365(X15) | ~r1(X15,X16)) ) <=> ~sP2366(X16)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2366])])). 23.38/23.20 fof(f5039,plain,( 23.38/23.20 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2352(X22) | ~sP2365(X15)) )), 23.38/23.20 inference(general_splitting,[],[f5037,f5038_D])). 23.38/23.20 fof(f5038,plain,( 23.38/23.20 ( ! [X14,X15] : (sP2365(X15) | ~sP2364(X14) | ~r1(X14,X15)) )), 23.38/23.20 inference(cnf_transformation,[],[f5038_D])). 23.38/23.20 fof(f5038_D,plain,( 23.38/23.20 ( ! [X15] : (( ! [X14] : (~sP2364(X14) | ~r1(X14,X15)) ) <=> ~sP2365(X15)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2365])])). 23.38/23.20 fof(f5037,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~sP2352(X22) | ~sP2364(X14)) )), 23.38/23.20 inference(general_splitting,[],[f5035,f5036_D])). 23.38/23.20 fof(f5036,plain,( 23.38/23.20 ( ! [X14,X13] : (sP2364(X14) | ~sP2363(X13) | ~r1(X13,X14)) )), 23.38/23.20 inference(cnf_transformation,[],[f5036_D])). 23.38/23.20 fof(f5036_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP2363(X13) | ~r1(X13,X14)) ) <=> ~sP2364(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2364])])). 23.38/23.20 fof(f5035,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP2352(X22) | ~sP2363(X13)) )), 23.38/23.20 inference(general_splitting,[],[f5033,f5034_D])). 23.38/23.20 fof(f5034,plain,( 23.38/23.20 ( ! [X12,X13] : (sP2363(X13) | ~sP2362(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f5034_D])). 23.38/23.20 fof(f5034_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP2362(X12) | ~r1(X12,X13)) ) <=> ~sP2363(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2363])])). 23.38/23.20 fof(f5033,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP2352(X22) | ~sP2362(X12)) )), 23.38/23.20 inference(general_splitting,[],[f5031,f5032_D])). 23.38/23.20 fof(f5032,plain,( 23.38/23.20 ( ! [X12,X11] : (sP2362(X12) | ~sP2361(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f5032_D])). 23.38/23.20 fof(f5032_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP2361(X11) | ~r1(X11,X12)) ) <=> ~sP2362(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2362])])). 23.38/23.20 fof(f5031,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP2352(X22) | ~sP2361(X11)) )), 23.38/23.20 inference(general_splitting,[],[f5029,f5030_D])). 23.38/23.20 fof(f5030,plain,( 23.38/23.20 ( ! [X10,X11] : (sP2361(X11) | ~sP2360(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f5030_D])). 23.38/23.20 fof(f5030_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP2360(X10) | ~r1(X10,X11)) ) <=> ~sP2361(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2361])])). 23.38/23.20 fof(f5029,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP2352(X22) | ~sP2360(X10)) )), 23.38/23.20 inference(general_splitting,[],[f5027,f5028_D])). 23.38/23.20 fof(f5028,plain,( 23.38/23.20 ( ! [X10,X9] : (sP2360(X10) | ~sP2359(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f5028_D])). 23.38/23.20 fof(f5028_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP2359(X9) | ~r1(X9,X10)) ) <=> ~sP2360(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2360])])). 23.38/23.20 fof(f5027,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP2352(X22) | ~sP2359(X9)) )), 23.38/23.20 inference(general_splitting,[],[f5025,f5026_D])). 23.38/23.20 fof(f5026,plain,( 23.38/23.20 ( ! [X8,X9] : (sP2359(X9) | ~sP2358(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f5026_D])). 23.38/23.20 fof(f5026_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP2358(X8) | ~r1(X8,X9)) ) <=> ~sP2359(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2359])])). 23.38/23.20 fof(f5025,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2352(X22) | ~sP2358(X8)) )), 23.38/23.20 inference(general_splitting,[],[f5023,f5024_D])). 23.38/23.20 fof(f5024,plain,( 23.38/23.20 ( ! [X8,X7] : (sP2358(X8) | ~sP2357(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f5024_D])). 23.38/23.20 fof(f5024_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP2357(X7) | ~r1(X7,X8)) ) <=> ~sP2358(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2358])])). 23.38/23.20 fof(f5023,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2352(X22) | ~sP2357(X7)) )), 23.38/23.20 inference(general_splitting,[],[f5021,f5022_D])). 23.38/23.20 fof(f5022,plain,( 23.38/23.20 ( ! [X6,X7] : (sP2357(X7) | ~sP2356(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f5022_D])). 23.38/23.20 fof(f5022_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP2356(X6) | ~r1(X6,X7)) ) <=> ~sP2357(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2357])])). 23.38/23.20 fof(f5021,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP2352(X22) | ~sP2356(X6)) )), 23.38/23.20 inference(general_splitting,[],[f5019,f5020_D])). 23.38/23.20 fof(f5020,plain,( 23.38/23.20 ( ! [X6,X5] : (sP2356(X6) | ~sP2355(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f5020_D])). 23.38/23.20 fof(f5020_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP2355(X5) | ~r1(X5,X6)) ) <=> ~sP2356(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2356])])). 23.38/23.20 fof(f5019,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP2352(X22) | ~sP2355(X5)) )), 23.38/23.20 inference(general_splitting,[],[f5017,f5018_D])). 23.38/23.20 fof(f5018,plain,( 23.38/23.20 ( ! [X4,X5] : (sP2355(X5) | ~sP2354(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f5018_D])). 23.38/23.20 fof(f5018_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP2354(X4) | ~r1(X4,X5)) ) <=> ~sP2355(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2355])])). 23.38/23.20 fof(f5017,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~sP2352(X22) | ~sP2354(X4)) )), 23.38/23.20 inference(general_splitting,[],[f5015,f5016_D])). 23.38/23.20 fof(f5016,plain,( 23.38/23.20 ( ! [X4,X3] : (sP2354(X4) | ~sP2353(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f5016_D])). 23.38/23.20 fof(f5016_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP2353(X3) | ~r1(X3,X4)) ) <=> ~sP2354(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2354])])). 23.38/23.20 fof(f5015,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~sP2352(X22) | ~sP2353(X3)) )), 23.38/23.20 inference(general_splitting,[],[f5013,f5014_D])). 23.38/23.20 fof(f5014,plain,( 23.38/23.20 ( ! [X3,X1] : (sP2353(X3) | ~sP2351(X1) | ~r1(X1,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f5014_D])). 23.38/23.20 fof(f5014_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X1] : (~sP2351(X1) | ~r1(X1,X3)) ) <=> ~sP2353(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2353])])). 23.38/23.20 fof(f5013,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~sP2351(X1) | ~sP2352(X22)) )), 23.38/23.20 inference(general_splitting,[],[f5011,f5012_D])). 23.38/23.20 fof(f5011,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~sP2350(X23) | ~sP2351(X1)) )), 23.38/23.20 inference(general_splitting,[],[f5009,f5010_D])). 23.38/23.20 fof(f5010,plain,( 23.38/23.20 ( ! [X0,X1] : (sP2351(X1) | ~sP18(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f5010_D])). 23.38/23.20 fof(f5010_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP18(X0) | ~r1(X0,X1)) ) <=> ~sP2351(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2351])])). 23.38/23.20 fof(f5009,plain,( 23.38/23.20 ( ! [X6,X4,X0,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X0,X1) | ~sP18(X0) | ~sP2350(X23)) )), 23.38/23.20 inference(general_splitting,[],[f507,f5008_D])). 23.38/23.20 fof(f507,plain,( 23.38/23.20 ( ! [X24,X4,X0,X12,X8,X21,X17,X5,X1,X13,X9,X22,X18,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~p21(X24) | ~p20(X24) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X0,X1) | ~sP18(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f178])). 23.38/23.20 fof(f301750,plain,( 23.38/23.20 sP2366(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f283629,f5040])). 23.38/23.20 fof(f283629,plain,( 23.38/23.20 sP2365(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266270,f5038])). 23.38/23.20 fof(f266270,plain,( 23.38/23.20 sP2364(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f249642,f5036])). 23.38/23.20 fof(f249642,plain,( 23.38/23.20 sP2363(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f233744,f5034])). 23.38/23.20 fof(f233744,plain,( 23.38/23.20 sP2362(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f218544,f5032])). 23.38/23.20 fof(f218544,plain,( 23.38/23.20 sP2361(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204039,f5030])). 23.38/23.20 fof(f204039,plain,( 23.38/23.20 sP2360(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190207,f5028])). 23.38/23.20 fof(f190207,plain,( 23.38/23.20 sP2359(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177036,f5026])). 23.38/23.20 fof(f177036,plain,( 23.38/23.20 sP2358(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f164509,f5024])). 23.38/23.20 fof(f164509,plain,( 23.38/23.20 sP2357(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f152608,f5022])). 23.38/23.20 fof(f152608,plain,( 23.38/23.20 sP2356(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141317,f5020])). 23.38/23.20 fof(f141317,plain,( 23.38/23.20 sP2355(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f130619,f5018])). 23.38/23.20 fof(f130619,plain,( 23.38/23.20 sP2354(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f120501,f5016])). 23.38/23.20 fof(f120501,plain,( 23.38/23.20 sP2353(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f110937,f5014])). 23.38/23.20 fof(f110937,plain,( 23.38/23.20 sP2351(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f101927,f5010])). 23.38/23.20 fof(f472249,plain,( 23.38/23.20 ~sP2327(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f448880,f4966])). 23.38/23.20 fof(f4966,plain,( 23.38/23.20 ( ! [X23,X22] : (~sP2327(X23) | ~r1(X22,X23) | sP2329(X22)) )), 23.38/23.20 inference(cnf_transformation,[],[f4966_D])). 23.38/23.20 fof(f4966_D,plain,( 23.38/23.20 ( ! [X22] : (( ! [X23] : (~sP2327(X23) | ~r1(X22,X23)) ) <=> ~sP2329(X22)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2329])])). 23.38/23.20 fof(f448880,plain,( 23.38/23.20 ~sP2329(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f425730,f4998])). 23.38/23.20 fof(f4998,plain,( 23.38/23.20 ( ! [X21,X22] : (~sP2329(X22) | ~r1(X21,X22) | sP2345(X21)) )), 23.38/23.20 inference(cnf_transformation,[],[f4998_D])). 23.38/23.20 fof(f4998_D,plain,( 23.38/23.20 ( ! [X21] : (( ! [X22] : (~sP2329(X22) | ~r1(X21,X22)) ) <=> ~sP2345(X21)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2345])])). 23.38/23.20 fof(f425730,plain,( 23.38/23.20 ~sP2345(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f402896,f5000])). 23.38/23.20 fof(f5000,plain,( 23.38/23.20 ( ! [X21,X20] : (~sP2345(X21) | ~r1(X20,X21) | sP2346(X20)) )), 23.38/23.20 inference(cnf_transformation,[],[f5000_D])). 23.38/23.20 fof(f5000_D,plain,( 23.38/23.20 ( ! [X20] : (( ! [X21] : (~sP2345(X21) | ~r1(X20,X21)) ) <=> ~sP2346(X20)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2346])])). 23.38/23.20 fof(f402896,plain,( 23.38/23.20 ~sP2346(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378211,f5002])). 23.38/23.20 fof(f5002,plain,( 23.38/23.20 ( ! [X19,X20] : (~sP2346(X20) | ~r1(X19,X20) | sP2347(X19)) )), 23.38/23.20 inference(cnf_transformation,[],[f5002_D])). 23.38/23.20 fof(f5002_D,plain,( 23.38/23.20 ( ! [X19] : (( ! [X20] : (~sP2346(X20) | ~r1(X19,X20)) ) <=> ~sP2347(X19)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2347])])). 23.38/23.20 fof(f378211,plain,( 23.38/23.20 ~sP2347(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342731,f5004])). 23.38/23.20 fof(f5004,plain,( 23.38/23.20 ( ! [X19,X18] : (~sP2347(X19) | ~r1(X18,X19) | sP2348(X18)) )), 23.38/23.20 inference(cnf_transformation,[],[f5004_D])). 23.38/23.20 fof(f5004_D,plain,( 23.38/23.20 ( ! [X18] : (( ! [X19] : (~sP2347(X19) | ~r1(X18,X19)) ) <=> ~sP2348(X18)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2348])])). 23.38/23.20 fof(f342731,plain,( 23.38/23.20 ~sP2348(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320647,f5006])). 23.38/23.20 fof(f5006,plain,( 23.38/23.20 ( ! [X17,X18] : (~sP2348(X18) | ~r1(X17,X18) | sP2349(X17)) )), 23.38/23.20 inference(cnf_transformation,[],[f5006_D])). 23.38/23.20 fof(f5006_D,plain,( 23.38/23.20 ( ! [X17] : (( ! [X18] : (~sP2348(X18) | ~r1(X17,X18)) ) <=> ~sP2349(X17)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2349])])). 23.38/23.20 fof(f320647,plain,( 23.38/23.20 ~sP2349(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301756,f5007])). 23.38/23.20 fof(f5007,plain,( 23.38/23.20 ( ! [X17,X16] : (~sP2349(X17) | ~sP2344(X16) | ~r1(X16,X17)) )), 23.38/23.20 inference(general_splitting,[],[f5005,f5006_D])). 23.38/23.20 fof(f5005,plain,( 23.38/23.20 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP2344(X16) | ~sP2348(X18)) )), 23.38/23.20 inference(general_splitting,[],[f5003,f5004_D])). 23.38/23.20 fof(f5003,plain,( 23.38/23.20 ( ! [X19,X17,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2344(X16) | ~sP2347(X19)) )), 23.38/23.20 inference(general_splitting,[],[f5001,f5002_D])). 23.38/23.20 fof(f5001,plain,( 23.38/23.20 ( ! [X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2344(X16) | ~sP2346(X20)) )), 23.38/23.20 inference(general_splitting,[],[f4999,f5000_D])). 23.38/23.20 fof(f4999,plain,( 23.38/23.20 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2344(X16) | ~sP2345(X21)) )), 23.38/23.20 inference(general_splitting,[],[f4997,f4998_D])). 23.38/23.20 fof(f4997,plain,( 23.38/23.20 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2329(X22) | ~sP2344(X16)) )), 23.38/23.20 inference(general_splitting,[],[f4995,f4996_D])). 23.38/23.20 fof(f4996,plain,( 23.38/23.20 ( ! [X15,X16] : (sP2344(X16) | ~sP2343(X15) | ~r1(X15,X16)) )), 23.38/23.20 inference(cnf_transformation,[],[f4996_D])). 23.38/23.20 fof(f4996_D,plain,( 23.38/23.20 ( ! [X16] : (( ! [X15] : (~sP2343(X15) | ~r1(X15,X16)) ) <=> ~sP2344(X16)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2344])])). 23.38/23.20 fof(f4995,plain,( 23.38/23.20 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2329(X22) | ~sP2343(X15)) )), 23.38/23.20 inference(general_splitting,[],[f4993,f4994_D])). 23.38/23.20 fof(f4994,plain,( 23.38/23.20 ( ! [X14,X15] : (sP2343(X15) | ~sP2342(X14) | ~r1(X14,X15)) )), 23.38/23.20 inference(cnf_transformation,[],[f4994_D])). 23.38/23.20 fof(f4994_D,plain,( 23.38/23.20 ( ! [X15] : (( ! [X14] : (~sP2342(X14) | ~r1(X14,X15)) ) <=> ~sP2343(X15)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2343])])). 23.38/23.20 fof(f4993,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2329(X22) | ~sP2342(X14)) )), 23.38/23.20 inference(general_splitting,[],[f4991,f4992_D])). 23.38/23.20 fof(f4992,plain,( 23.38/23.20 ( ! [X14,X13] : (sP2342(X14) | ~sP2341(X13) | ~r1(X13,X14)) )), 23.38/23.20 inference(cnf_transformation,[],[f4992_D])). 23.38/23.20 fof(f4992_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP2341(X13) | ~r1(X13,X14)) ) <=> ~sP2342(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2342])])). 23.38/23.20 fof(f4991,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~sP2329(X22) | ~sP2341(X13)) )), 23.38/23.20 inference(general_splitting,[],[f4989,f4990_D])). 23.38/23.20 fof(f4990,plain,( 23.38/23.20 ( ! [X12,X13] : (sP2341(X13) | ~sP2340(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f4990_D])). 23.38/23.20 fof(f4990_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP2340(X12) | ~r1(X12,X13)) ) <=> ~sP2341(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2341])])). 23.38/23.20 fof(f4989,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2329(X22) | ~sP2340(X12)) )), 23.38/23.20 inference(general_splitting,[],[f4987,f4988_D])). 23.38/23.20 fof(f4988,plain,( 23.38/23.20 ( ! [X12,X11] : (sP2340(X12) | ~sP2339(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f4988_D])). 23.38/23.20 fof(f4988_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP2339(X11) | ~r1(X11,X12)) ) <=> ~sP2340(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2340])])). 23.38/23.20 fof(f4987,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP2329(X22) | ~sP2339(X11)) )), 23.38/23.20 inference(general_splitting,[],[f4985,f4986_D])). 23.38/23.20 fof(f4986,plain,( 23.38/23.20 ( ! [X10,X11] : (sP2339(X11) | ~sP2338(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f4986_D])). 23.38/23.20 fof(f4986_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP2338(X10) | ~r1(X10,X11)) ) <=> ~sP2339(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2339])])). 23.38/23.20 fof(f4985,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP2329(X22) | ~sP2338(X10)) )), 23.38/23.20 inference(general_splitting,[],[f4983,f4984_D])). 23.38/23.20 fof(f4984,plain,( 23.38/23.20 ( ! [X10,X9] : (sP2338(X10) | ~sP2337(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f4984_D])). 23.38/23.20 fof(f4984_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP2337(X9) | ~r1(X9,X10)) ) <=> ~sP2338(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2338])])). 23.38/23.20 fof(f4983,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP2329(X22) | ~sP2337(X9)) )), 23.38/23.20 inference(general_splitting,[],[f4981,f4982_D])). 23.38/23.20 fof(f4982,plain,( 23.38/23.20 ( ! [X8,X9] : (sP2337(X9) | ~sP2336(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f4982_D])). 23.38/23.20 fof(f4982_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP2336(X8) | ~r1(X8,X9)) ) <=> ~sP2337(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2337])])). 23.38/23.20 fof(f4981,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2329(X22) | ~sP2336(X8)) )), 23.38/23.20 inference(general_splitting,[],[f4979,f4980_D])). 23.38/23.20 fof(f4980,plain,( 23.38/23.20 ( ! [X8,X7] : (sP2336(X8) | ~sP2335(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f4980_D])). 23.38/23.20 fof(f4980_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP2335(X7) | ~r1(X7,X8)) ) <=> ~sP2336(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2336])])). 23.38/23.20 fof(f4979,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2329(X22) | ~sP2335(X7)) )), 23.38/23.20 inference(general_splitting,[],[f4977,f4978_D])). 23.38/23.20 fof(f4978,plain,( 23.38/23.20 ( ! [X6,X7] : (sP2335(X7) | ~sP2334(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f4978_D])). 23.38/23.20 fof(f4978_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP2334(X6) | ~r1(X6,X7)) ) <=> ~sP2335(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2335])])). 23.38/23.20 fof(f4977,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2329(X22) | ~sP2334(X6)) )), 23.38/23.20 inference(general_splitting,[],[f4975,f4976_D])). 23.38/23.20 fof(f4976,plain,( 23.38/23.20 ( ! [X6,X5] : (sP2334(X6) | ~sP2333(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f4976_D])). 23.38/23.20 fof(f4976_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP2333(X5) | ~r1(X5,X6)) ) <=> ~sP2334(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2334])])). 23.38/23.20 fof(f4975,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2329(X22) | ~sP2333(X5)) )), 23.38/23.20 inference(general_splitting,[],[f4973,f4974_D])). 23.38/23.20 fof(f4974,plain,( 23.38/23.20 ( ! [X4,X5] : (sP2333(X5) | ~sP2332(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f4974_D])). 23.38/23.20 fof(f4974_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP2332(X4) | ~r1(X4,X5)) ) <=> ~sP2333(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2333])])). 23.38/23.20 fof(f4973,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2329(X22) | ~sP2332(X4)) )), 23.38/23.20 inference(general_splitting,[],[f4971,f4972_D])). 23.38/23.20 fof(f4972,plain,( 23.38/23.20 ( ! [X4,X3] : (sP2332(X4) | ~sP2331(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f4972_D])). 23.38/23.20 fof(f4972_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP2331(X3) | ~r1(X3,X4)) ) <=> ~sP2332(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2332])])). 23.38/23.20 fof(f4971,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2329(X22) | ~sP2331(X3)) )), 23.38/23.20 inference(general_splitting,[],[f4969,f4970_D])). 23.38/23.20 fof(f4970,plain,( 23.38/23.20 ( ! [X2,X3] : (sP2331(X3) | ~sP2330(X2) | ~r1(X2,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f4970_D])). 23.38/23.20 fof(f4970_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X2] : (~sP2330(X2) | ~r1(X2,X3)) ) <=> ~sP2331(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2331])])). 23.38/23.20 fof(f4969,plain,( 23.38/23.20 ( ! [X6,X4,X2,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2329(X22) | ~sP2330(X2)) )), 23.38/23.20 inference(general_splitting,[],[f4967,f4968_D])). 23.38/23.20 fof(f4968,plain,( 23.38/23.20 ( ! [X2,X1] : (sP2330(X2) | ~sP2328(X1) | ~r1(X1,X2)) )), 23.38/23.20 inference(cnf_transformation,[],[f4968_D])). 23.38/23.20 fof(f4968_D,plain,( 23.38/23.20 ( ! [X2] : (( ! [X1] : (~sP2328(X1) | ~r1(X1,X2)) ) <=> ~sP2330(X2)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2330])])). 23.38/23.20 fof(f4967,plain,( 23.38/23.20 ( ! [X6,X4,X2,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~r1(X1,X2) | ~sP2328(X1) | ~sP2329(X22)) )), 23.38/23.20 inference(general_splitting,[],[f4965,f4966_D])). 23.38/23.20 fof(f4965,plain,( 23.38/23.20 ( ! [X6,X4,X2,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X1,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~r1(X1,X2) | ~sP2327(X23) | ~sP2328(X1)) )), 23.38/23.20 inference(general_splitting,[],[f4963,f4964_D])). 23.38/23.20 fof(f4964,plain,( 23.38/23.20 ( ! [X0,X1] : (sP2328(X1) | ~sP19(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f4964_D])). 23.38/23.20 fof(f4964_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP19(X0) | ~r1(X0,X1)) ) <=> ~sP2328(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2328])])). 23.38/23.20 fof(f4963,plain,( 23.38/23.20 ( ! [X4,X0,X12,X8,X21,X17,X5,X1,X13,X9,X22,X18,X6,X2,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X0,X1) | ~r1(X2,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~r1(X1,X2) | ~sP19(X0) | ~sP2327(X23)) )), 23.38/23.20 inference(general_splitting,[],[f504,f4962_D])). 23.38/23.20 fof(f504,plain,( 23.38/23.20 ( ! [X24,X4,X0,X12,X8,X21,X17,X5,X1,X13,X9,X22,X18,X6,X2,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X0,X1) | ~r1(X2,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | p21(X24) | p22(X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~r1(X1,X2) | ~sP19(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f174])). 23.38/23.20 fof(f301756,plain,( 23.38/23.20 sP2344(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f283635,f4996])). 23.38/23.20 fof(f283635,plain,( 23.38/23.20 sP2343(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266276,f4994])). 23.38/23.20 fof(f266276,plain,( 23.38/23.20 sP2342(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f249648,f4992])). 23.38/23.20 fof(f249648,plain,( 23.38/23.20 sP2341(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f233750,f4990])). 23.38/23.20 fof(f233750,plain,( 23.38/23.20 sP2340(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f218550,f4988])). 23.38/23.20 fof(f218550,plain,( 23.38/23.20 sP2339(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204045,f4986])). 23.38/23.20 fof(f204045,plain,( 23.38/23.20 sP2338(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190213,f4984])). 23.38/23.20 fof(f190213,plain,( 23.38/23.20 sP2337(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177042,f4982])). 23.38/23.20 fof(f177042,plain,( 23.38/23.20 sP2336(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f164515,f4980])). 23.38/23.20 fof(f164515,plain,( 23.38/23.20 sP2335(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f152614,f4978])). 23.38/23.20 fof(f152614,plain,( 23.38/23.20 sP2334(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141323,f4976])). 23.38/23.20 fof(f141323,plain,( 23.38/23.20 sP2333(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f130625,f4974])). 23.38/23.20 fof(f130625,plain,( 23.38/23.20 sP2332(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f120507,f4972])). 23.38/23.20 fof(f120507,plain,( 23.38/23.20 sP2331(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f110943,f4970])). 23.38/23.20 fof(f110943,plain,( 23.38/23.20 sP2330(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f101931,f4968])). 23.38/23.20 fof(f101931,plain,( 23.38/23.20 sP2328(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f93446,f4964])). 23.38/23.20 fof(f472252,plain,( 23.38/23.20 ~sP2258(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f448883,f4826])). 23.38/23.20 fof(f4826,plain,( 23.38/23.20 ( ! [X24,X25] : (~sP2258(X25) | ~r1(X24,X25) | sP2259(X24)) )), 23.38/23.20 inference(cnf_transformation,[],[f4826_D])). 23.38/23.20 fof(f4826_D,plain,( 23.38/23.20 ( ! [X24] : (( ! [X25] : (~sP2258(X25) | ~r1(X24,X25)) ) <=> ~sP2259(X24)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2259])])). 23.38/23.20 fof(f448883,plain,( 23.38/23.20 ~sP2259(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f425733,f4828])). 23.38/23.20 fof(f4828,plain,( 23.38/23.20 ( ! [X24,X23] : (~sP2259(X24) | ~r1(X23,X24) | sP2260(X23)) )), 23.38/23.20 inference(cnf_transformation,[],[f4828_D])). 23.38/23.20 fof(f4828_D,plain,( 23.38/23.20 ( ! [X23] : (( ! [X24] : (~sP2259(X24) | ~r1(X23,X24)) ) <=> ~sP2260(X23)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2260])])). 23.38/23.20 fof(f425733,plain,( 23.38/23.20 ~sP2260(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f402899,f4830])). 23.38/23.20 fof(f4830,plain,( 23.38/23.20 ( ! [X23,X22] : (~sP2260(X23) | ~r1(X22,X23) | sP2261(X22)) )), 23.38/23.20 inference(cnf_transformation,[],[f4830_D])). 23.38/23.20 fof(f4830_D,plain,( 23.38/23.20 ( ! [X22] : (( ! [X23] : (~sP2260(X23) | ~r1(X22,X23)) ) <=> ~sP2261(X22)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2261])])). 23.38/23.20 fof(f402899,plain,( 23.38/23.20 ~sP2261(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378214,f4858])). 23.38/23.20 fof(f4858,plain,( 23.38/23.20 ( ! [X21,X22] : (~sP2261(X22) | ~r1(X21,X22) | sP2275(X21)) )), 23.38/23.20 inference(cnf_transformation,[],[f4858_D])). 23.38/23.20 fof(f4858_D,plain,( 23.38/23.20 ( ! [X21] : (( ! [X22] : (~sP2261(X22) | ~r1(X21,X22)) ) <=> ~sP2275(X21)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2275])])). 23.38/23.20 fof(f378214,plain,( 23.38/23.20 ~sP2275(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342734,f4860])). 23.38/23.20 fof(f4860,plain,( 23.38/23.20 ( ! [X21,X20] : (~sP2275(X21) | ~r1(X20,X21) | sP2276(X20)) )), 23.38/23.20 inference(cnf_transformation,[],[f4860_D])). 23.38/23.20 fof(f4860_D,plain,( 23.38/23.20 ( ! [X20] : (( ! [X21] : (~sP2275(X21) | ~r1(X20,X21)) ) <=> ~sP2276(X20)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2276])])). 23.38/23.20 fof(f342734,plain,( 23.38/23.20 ~sP2276(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320649,f4862])). 23.38/23.20 fof(f4862,plain,( 23.38/23.20 ( ! [X19,X20] : (~sP2276(X20) | ~r1(X19,X20) | sP2277(X19)) )), 23.38/23.20 inference(cnf_transformation,[],[f4862_D])). 23.38/23.20 fof(f4862_D,plain,( 23.38/23.20 ( ! [X19] : (( ! [X20] : (~sP2276(X20) | ~r1(X19,X20)) ) <=> ~sP2277(X19)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2277])])). 23.38/23.20 fof(f320649,plain,( 23.38/23.20 ~sP2277(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301758,f4864])). 23.38/23.20 fof(f4864,plain,( 23.38/23.20 ( ! [X19,X18] : (~sP2277(X19) | ~r1(X18,X19) | sP2278(X18)) )), 23.38/23.20 inference(cnf_transformation,[],[f4864_D])). 23.38/23.20 fof(f4864_D,plain,( 23.38/23.20 ( ! [X18] : (( ! [X19] : (~sP2277(X19) | ~r1(X18,X19)) ) <=> ~sP2278(X18)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2278])])). 23.38/23.20 fof(f301758,plain,( 23.38/23.20 ~sP2278(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f283637,f4866])). 23.38/23.20 fof(f4866,plain,( 23.38/23.20 ( ! [X17,X18] : (~sP2278(X18) | ~r1(X17,X18) | sP2279(X17)) )), 23.38/23.20 inference(cnf_transformation,[],[f4866_D])). 23.38/23.20 fof(f4866_D,plain,( 23.38/23.20 ( ! [X17] : (( ! [X18] : (~sP2278(X18) | ~r1(X17,X18)) ) <=> ~sP2279(X17)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2279])])). 23.38/23.20 fof(f283637,plain,( 23.38/23.20 ~sP2279(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266278,f4867])). 23.38/23.20 fof(f4867,plain,( 23.38/23.20 ( ! [X17,X16] : (~sP2279(X17) | ~sP2274(X16) | ~r1(X16,X17)) )), 23.38/23.20 inference(general_splitting,[],[f4865,f4866_D])). 23.38/23.20 fof(f4865,plain,( 23.38/23.20 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP2274(X16) | ~sP2278(X18)) )), 23.38/23.20 inference(general_splitting,[],[f4863,f4864_D])). 23.38/23.20 fof(f4863,plain,( 23.38/23.20 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2274(X16) | ~sP2277(X19)) )), 23.38/23.20 inference(general_splitting,[],[f4861,f4862_D])). 23.38/23.20 fof(f4861,plain,( 23.38/23.20 ( ! [X19,X17,X20,X18,X16] : (~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2274(X16) | ~sP2276(X20)) )), 23.38/23.20 inference(general_splitting,[],[f4859,f4860_D])). 23.38/23.20 fof(f4859,plain,( 23.38/23.20 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2274(X16) | ~sP2275(X21)) )), 23.38/23.20 inference(general_splitting,[],[f4857,f4858_D])). 23.38/23.20 fof(f4857,plain,( 23.38/23.20 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP2261(X22) | ~sP2274(X16)) )), 23.38/23.20 inference(general_splitting,[],[f4855,f4856_D])). 23.38/23.20 fof(f4856,plain,( 23.38/23.20 ( ! [X15,X16] : (sP2274(X16) | ~sP2273(X15) | ~r1(X15,X16)) )), 23.38/23.20 inference(cnf_transformation,[],[f4856_D])). 23.38/23.20 fof(f4856_D,plain,( 23.38/23.20 ( ! [X16] : (( ! [X15] : (~sP2273(X15) | ~r1(X15,X16)) ) <=> ~sP2274(X16)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2274])])). 23.38/23.20 fof(f4855,plain,( 23.38/23.20 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP2261(X22) | ~sP2273(X15)) )), 23.38/23.20 inference(general_splitting,[],[f4853,f4854_D])). 23.38/23.20 fof(f4854,plain,( 23.38/23.20 ( ! [X14,X15] : (sP2273(X15) | ~sP2272(X14) | ~r1(X14,X15)) )), 23.38/23.20 inference(cnf_transformation,[],[f4854_D])). 23.38/23.20 fof(f4854_D,plain,( 23.38/23.20 ( ! [X15] : (( ! [X14] : (~sP2272(X14) | ~r1(X14,X15)) ) <=> ~sP2273(X15)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2273])])). 23.38/23.20 fof(f4853,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP2261(X22) | ~sP2272(X14)) )), 23.38/23.20 inference(general_splitting,[],[f4851,f4852_D])). 23.38/23.20 fof(f4852,plain,( 23.38/23.20 ( ! [X14,X13] : (sP2272(X14) | ~sP2271(X13) | ~r1(X13,X14)) )), 23.38/23.20 inference(cnf_transformation,[],[f4852_D])). 23.38/23.20 fof(f4852_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP2271(X13) | ~r1(X13,X14)) ) <=> ~sP2272(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2272])])). 23.38/23.20 fof(f4851,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2261(X22) | ~sP2271(X13)) )), 23.38/23.20 inference(general_splitting,[],[f4849,f4850_D])). 23.38/23.20 fof(f4850,plain,( 23.38/23.20 ( ! [X12,X13] : (sP2271(X13) | ~sP2270(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f4850_D])). 23.38/23.20 fof(f4850_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP2270(X12) | ~r1(X12,X13)) ) <=> ~sP2271(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2271])])). 23.38/23.20 fof(f4849,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2261(X22) | ~sP2270(X12)) )), 23.38/23.20 inference(general_splitting,[],[f4847,f4848_D])). 23.38/23.20 fof(f4848,plain,( 23.38/23.20 ( ! [X12,X11] : (sP2270(X12) | ~sP2269(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f4848_D])). 23.38/23.20 fof(f4848_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP2269(X11) | ~r1(X11,X12)) ) <=> ~sP2270(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2270])])). 23.38/23.20 fof(f4847,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP2261(X22) | ~sP2269(X11)) )), 23.38/23.20 inference(general_splitting,[],[f4845,f4846_D])). 23.38/23.20 fof(f4846,plain,( 23.38/23.20 ( ! [X10,X11] : (sP2269(X11) | ~sP2268(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f4846_D])). 23.38/23.20 fof(f4846_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP2268(X10) | ~r1(X10,X11)) ) <=> ~sP2269(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2269])])). 23.38/23.20 fof(f4845,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP2261(X22) | ~sP2268(X10)) )), 23.38/23.20 inference(general_splitting,[],[f4843,f4844_D])). 23.38/23.20 fof(f4844,plain,( 23.38/23.20 ( ! [X10,X9] : (sP2268(X10) | ~sP2267(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f4844_D])). 23.38/23.20 fof(f4844_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP2267(X9) | ~r1(X9,X10)) ) <=> ~sP2268(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2268])])). 23.38/23.20 fof(f4843,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP2261(X22) | ~sP2267(X9)) )), 23.38/23.20 inference(general_splitting,[],[f4841,f4842_D])). 23.38/23.20 fof(f4842,plain,( 23.38/23.20 ( ! [X8,X9] : (sP2267(X9) | ~sP2266(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f4842_D])). 23.38/23.20 fof(f4842_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP2266(X8) | ~r1(X8,X9)) ) <=> ~sP2267(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2267])])). 23.38/23.20 fof(f4841,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2261(X22) | ~sP2266(X8)) )), 23.38/23.20 inference(general_splitting,[],[f4839,f4840_D])). 23.38/23.20 fof(f4840,plain,( 23.38/23.20 ( ! [X8,X7] : (sP2266(X8) | ~sP2265(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f4840_D])). 23.38/23.20 fof(f4840_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP2265(X7) | ~r1(X7,X8)) ) <=> ~sP2266(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2266])])). 23.38/23.20 fof(f4839,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2261(X22) | ~sP2265(X7)) )), 23.38/23.20 inference(general_splitting,[],[f4837,f4838_D])). 23.38/23.20 fof(f4838,plain,( 23.38/23.20 ( ! [X6,X7] : (sP2265(X7) | ~sP2264(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f4838_D])). 23.38/23.20 fof(f4838_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP2264(X6) | ~r1(X6,X7)) ) <=> ~sP2265(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2265])])). 23.38/23.20 fof(f4837,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP2261(X22) | ~sP2264(X6)) )), 23.38/23.20 inference(general_splitting,[],[f4835,f4836_D])). 23.38/23.20 fof(f4836,plain,( 23.38/23.20 ( ! [X6,X5] : (sP2264(X6) | ~sP2263(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f4836_D])). 23.38/23.20 fof(f4836_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP2263(X5) | ~r1(X5,X6)) ) <=> ~sP2264(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2264])])). 23.38/23.20 fof(f4835,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2261(X22) | ~sP2263(X5)) )), 23.38/23.20 inference(general_splitting,[],[f4833,f4834_D])). 23.38/23.20 fof(f4834,plain,( 23.38/23.20 ( ! [X4,X5] : (sP2263(X5) | ~sP2262(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f4834_D])). 23.38/23.20 fof(f4834_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP2262(X4) | ~r1(X4,X5)) ) <=> ~sP2263(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2263])])). 23.38/23.20 fof(f4833,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2261(X22) | ~sP2262(X4)) )), 23.38/23.20 inference(general_splitting,[],[f4831,f4832_D])). 23.38/23.20 fof(f4832,plain,( 23.38/23.20 ( ! [X4,X3] : (sP2262(X4) | ~sP2257(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f4832_D])). 23.38/23.20 fof(f4832_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP2257(X3) | ~r1(X3,X4)) ) <=> ~sP2262(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2262])])). 23.38/23.20 fof(f4831,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2257(X3) | ~sP2261(X22)) )), 23.38/23.20 inference(general_splitting,[],[f4829,f4830_D])). 23.38/23.20 fof(f4829,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X23,X21,X19,X17,X8,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2257(X3) | ~sP2260(X23)) )), 23.38/23.20 inference(general_splitting,[],[f4827,f4828_D])). 23.38/23.20 fof(f4827,plain,( 23.38/23.20 ( ! [X24,X6,X4,X14,X12,X10,X23,X21,X19,X17,X8,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2257(X3) | ~sP2259(X24)) )), 23.38/23.20 inference(general_splitting,[],[f4825,f4826_D])). 23.38/23.20 fof(f4825,plain,( 23.38/23.20 ( ! [X24,X6,X4,X14,X12,X10,X23,X21,X19,X17,X8,X25,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2257(X3) | ~sP2258(X25)) )), 23.38/23.20 inference(general_splitting,[],[f4823,f4824_D])). 23.38/23.20 fof(f4823,plain,( 23.38/23.20 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~p22(X26) | ~p23(X26) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2257(X3)) )), 23.38/23.20 inference(general_splitting,[],[f4821,f4822_D])). 23.38/23.20 fof(f4822,plain,( 23.38/23.20 ( ! [X3,X1] : (sP2257(X3) | ~sP2256(X1) | ~r1(X1,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f4822_D])). 23.38/23.20 fof(f4822_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X1] : (~sP2256(X1) | ~r1(X1,X3)) ) <=> ~sP2257(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2257])])). 23.38/23.20 fof(f4821,plain,( 23.38/23.20 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~p22(X26) | ~p23(X26) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP2256(X1)) )), 23.38/23.20 inference(general_splitting,[],[f497,f4820_D])). 23.38/23.20 fof(f4820,plain,( 23.38/23.20 ( ! [X0,X1] : (sP2256(X1) | ~sP20(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f4820_D])). 23.38/23.20 fof(f4820_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP20(X0) | ~r1(X0,X1)) ) <=> ~sP2256(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2256])])). 23.38/23.20 fof(f497,plain,( 23.38/23.20 ( ! [X24,X4,X0,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X0,X1) | ~r1(X9,X10) | ~r1(X14,X15) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~p22(X26) | ~p23(X26) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP20(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f170])). 23.38/23.20 fof(f266278,plain,( 23.38/23.20 sP2274(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f249650,f4856])). 23.38/23.20 fof(f249650,plain,( 23.38/23.20 sP2273(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f233752,f4854])). 23.38/23.20 fof(f233752,plain,( 23.38/23.20 sP2272(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f218552,f4852])). 23.38/23.20 fof(f218552,plain,( 23.38/23.20 sP2271(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204047,f4850])). 23.38/23.20 fof(f204047,plain,( 23.38/23.20 sP2270(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190215,f4848])). 23.38/23.20 fof(f190215,plain,( 23.38/23.20 sP2269(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177044,f4846])). 23.38/23.20 fof(f177044,plain,( 23.38/23.20 sP2268(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f164517,f4844])). 23.38/23.20 fof(f164517,plain,( 23.38/23.20 sP2267(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f152616,f4842])). 23.38/23.20 fof(f152616,plain,( 23.38/23.20 sP2266(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141325,f4840])). 23.38/23.20 fof(f141325,plain,( 23.38/23.20 sP2265(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f130627,f4838])). 23.38/23.20 fof(f130627,plain,( 23.38/23.20 sP2264(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f120509,f4836])). 23.38/23.20 fof(f120509,plain,( 23.38/23.20 sP2263(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f110945,f4834])). 23.38/23.20 fof(f110945,plain,( 23.38/23.20 sP2262(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f101933,f4832])). 23.38/23.20 fof(f101933,plain,( 23.38/23.20 sP2257(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f93452,f4822])). 23.38/23.20 fof(f93452,plain,( 23.38/23.20 sP2256(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f85482,f4820])). 23.38/23.20 fof(f6450,plain,( 23.38/23.20 r1(sK101,sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f656,f6435,f364])). 23.38/23.20 fof(f364,plain,( 23.38/23.20 ( ! [X0,X1] : (~sP47(X0) | ~r1(X0,X1) | r1(X1,sK48(X1))) )), 23.38/23.20 inference(cnf_transformation,[],[f62])). 23.38/23.20 fof(f472258,plain,( 23.38/23.20 ~sP2208(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f448889,f4726])). 23.38/23.20 fof(f4726,plain,( 23.38/23.20 ( ! [X26,X25] : (~sP2208(X26) | ~r1(X25,X26) | sP2209(X25)) )), 23.38/23.20 inference(cnf_transformation,[],[f4726_D])). 23.38/23.20 fof(f4726_D,plain,( 23.38/23.20 ( ! [X25] : (( ! [X26] : (~sP2208(X26) | ~r1(X25,X26)) ) <=> ~sP2209(X25)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2209])])). 23.38/23.20 fof(f448889,plain,( 23.38/23.20 ~sP2209(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f425739,f4728])). 23.38/23.20 fof(f4728,plain,( 23.38/23.20 ( ! [X24,X25] : (~sP2209(X25) | ~r1(X24,X25) | sP2210(X24)) )), 23.38/23.20 inference(cnf_transformation,[],[f4728_D])). 23.38/23.20 fof(f4728_D,plain,( 23.38/23.20 ( ! [X24] : (( ! [X25] : (~sP2209(X25) | ~r1(X24,X25)) ) <=> ~sP2210(X24)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2210])])). 23.38/23.20 fof(f425739,plain,( 23.38/23.20 ~sP2210(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f402905,f4730])). 23.38/23.20 fof(f4730,plain,( 23.38/23.20 ( ! [X24,X23] : (~sP2210(X24) | ~r1(X23,X24) | sP2211(X23)) )), 23.38/23.20 inference(cnf_transformation,[],[f4730_D])). 23.38/23.20 fof(f4730_D,plain,( 23.38/23.20 ( ! [X23] : (( ! [X24] : (~sP2210(X24) | ~r1(X23,X24)) ) <=> ~sP2211(X23)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2211])])). 23.38/23.20 fof(f402905,plain,( 23.38/23.20 ~sP2211(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378220,f4732])). 23.38/23.20 fof(f4732,plain,( 23.38/23.20 ( ! [X23,X22] : (~sP2211(X23) | ~r1(X22,X23) | sP2212(X22)) )), 23.38/23.20 inference(cnf_transformation,[],[f4732_D])). 23.38/23.20 fof(f4732_D,plain,( 23.38/23.20 ( ! [X22] : (( ! [X23] : (~sP2211(X23) | ~r1(X22,X23)) ) <=> ~sP2212(X22)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2212])])). 23.38/23.20 fof(f378220,plain,( 23.38/23.20 ~sP2212(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342740,f4760])). 23.38/23.20 fof(f4760,plain,( 23.38/23.20 ( ! [X21,X22] : (~sP2212(X22) | ~r1(X21,X22) | sP2226(X21)) )), 23.38/23.20 inference(cnf_transformation,[],[f4760_D])). 23.38/23.20 fof(f4760_D,plain,( 23.38/23.20 ( ! [X21] : (( ! [X22] : (~sP2212(X22) | ~r1(X21,X22)) ) <=> ~sP2226(X21)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2226])])). 23.38/23.20 fof(f342740,plain,( 23.38/23.20 ~sP2226(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320653,f4762])). 23.38/23.20 fof(f4762,plain,( 23.38/23.20 ( ! [X21,X20] : (~sP2226(X21) | ~r1(X20,X21) | sP2227(X20)) )), 23.38/23.20 inference(cnf_transformation,[],[f4762_D])). 23.38/23.20 fof(f4762_D,plain,( 23.38/23.20 ( ! [X20] : (( ! [X21] : (~sP2226(X21) | ~r1(X20,X21)) ) <=> ~sP2227(X20)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2227])])). 23.38/23.20 fof(f320653,plain,( 23.38/23.20 ~sP2227(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301762,f4764])). 23.38/23.20 fof(f4764,plain,( 23.38/23.20 ( ! [X19,X20] : (~sP2227(X20) | ~r1(X19,X20) | sP2228(X19)) )), 23.38/23.20 inference(cnf_transformation,[],[f4764_D])). 23.38/23.20 fof(f4764_D,plain,( 23.38/23.20 ( ! [X19] : (( ! [X20] : (~sP2227(X20) | ~r1(X19,X20)) ) <=> ~sP2228(X19)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2228])])). 23.38/23.20 fof(f301762,plain,( 23.38/23.20 ~sP2228(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f283641,f4766])). 23.38/23.20 fof(f4766,plain,( 23.38/23.20 ( ! [X19,X18] : (~sP2228(X19) | ~r1(X18,X19) | sP2229(X18)) )), 23.38/23.20 inference(cnf_transformation,[],[f4766_D])). 23.38/23.20 fof(f4766_D,plain,( 23.38/23.20 ( ! [X18] : (( ! [X19] : (~sP2228(X19) | ~r1(X18,X19)) ) <=> ~sP2229(X18)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2229])])). 23.38/23.20 fof(f283641,plain,( 23.38/23.20 ~sP2229(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266282,f4768])). 23.38/23.20 fof(f4768,plain,( 23.38/23.20 ( ! [X17,X18] : (~sP2229(X18) | ~r1(X17,X18) | sP2230(X17)) )), 23.38/23.20 inference(cnf_transformation,[],[f4768_D])). 23.38/23.20 fof(f4768_D,plain,( 23.38/23.20 ( ! [X17] : (( ! [X18] : (~sP2229(X18) | ~r1(X17,X18)) ) <=> ~sP2230(X17)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2230])])). 23.38/23.20 fof(f266282,plain,( 23.38/23.20 ~sP2230(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f249654,f4769])). 23.38/23.20 fof(f4769,plain,( 23.38/23.20 ( ! [X17,X16] : (~sP2230(X17) | ~sP2225(X16) | ~r1(X16,X17)) )), 23.38/23.20 inference(general_splitting,[],[f4767,f4768_D])). 23.38/23.20 fof(f4767,plain,( 23.38/23.20 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP2225(X16) | ~sP2229(X18)) )), 23.38/23.20 inference(general_splitting,[],[f4765,f4766_D])). 23.38/23.20 fof(f4765,plain,( 23.38/23.20 ( ! [X19,X17,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2225(X16) | ~sP2228(X19)) )), 23.38/23.20 inference(general_splitting,[],[f4763,f4764_D])). 23.38/23.20 fof(f4763,plain,( 23.38/23.20 ( ! [X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2225(X16) | ~sP2227(X20)) )), 23.38/23.20 inference(general_splitting,[],[f4761,f4762_D])). 23.38/23.20 fof(f4761,plain,( 23.38/23.20 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2225(X16) | ~sP2226(X21)) )), 23.38/23.20 inference(general_splitting,[],[f4759,f4760_D])). 23.38/23.20 fof(f4759,plain,( 23.38/23.20 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP2212(X22) | ~sP2225(X16)) )), 23.38/23.20 inference(general_splitting,[],[f4757,f4758_D])). 23.38/23.20 fof(f4758,plain,( 23.38/23.20 ( ! [X15,X16] : (sP2225(X16) | ~sP2224(X15) | ~r1(X15,X16)) )), 23.38/23.20 inference(cnf_transformation,[],[f4758_D])). 23.38/23.20 fof(f4758_D,plain,( 23.38/23.20 ( ! [X16] : (( ! [X15] : (~sP2224(X15) | ~r1(X15,X16)) ) <=> ~sP2225(X16)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2225])])). 23.38/23.20 fof(f4757,plain,( 23.38/23.20 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP2212(X22) | ~sP2224(X15)) )), 23.38/23.20 inference(general_splitting,[],[f4755,f4756_D])). 23.38/23.20 fof(f4756,plain,( 23.38/23.20 ( ! [X14,X15] : (sP2224(X15) | ~sP2223(X14) | ~r1(X14,X15)) )), 23.38/23.20 inference(cnf_transformation,[],[f4756_D])). 23.38/23.20 fof(f4756_D,plain,( 23.38/23.20 ( ! [X15] : (( ! [X14] : (~sP2223(X14) | ~r1(X14,X15)) ) <=> ~sP2224(X15)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2224])])). 23.38/23.20 fof(f4755,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2212(X22) | ~sP2223(X14)) )), 23.38/23.20 inference(general_splitting,[],[f4753,f4754_D])). 23.38/23.20 fof(f4754,plain,( 23.38/23.20 ( ! [X14,X13] : (sP2223(X14) | ~sP2222(X13) | ~r1(X13,X14)) )), 23.38/23.20 inference(cnf_transformation,[],[f4754_D])). 23.38/23.20 fof(f4754_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP2222(X13) | ~r1(X13,X14)) ) <=> ~sP2223(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2223])])). 23.38/23.20 fof(f4753,plain,( 23.38/23.20 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP2212(X22) | ~sP2222(X13)) )), 23.38/23.20 inference(general_splitting,[],[f4751,f4752_D])). 23.38/23.20 fof(f4752,plain,( 23.38/23.20 ( ! [X12,X13] : (sP2222(X13) | ~sP2221(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f4752_D])). 23.38/23.20 fof(f4752_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP2221(X12) | ~r1(X12,X13)) ) <=> ~sP2222(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2222])])). 23.38/23.20 fof(f4751,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP2212(X22) | ~sP2221(X12)) )), 23.38/23.20 inference(general_splitting,[],[f4749,f4750_D])). 23.38/23.20 fof(f4750,plain,( 23.38/23.20 ( ! [X12,X11] : (sP2221(X12) | ~sP2220(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f4750_D])). 23.38/23.20 fof(f4750_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP2220(X11) | ~r1(X11,X12)) ) <=> ~sP2221(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2221])])). 23.38/23.20 fof(f4749,plain,( 23.38/23.20 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP2212(X22) | ~sP2220(X11)) )), 23.38/23.20 inference(general_splitting,[],[f4747,f4748_D])). 23.38/23.20 fof(f4748,plain,( 23.38/23.20 ( ! [X10,X11] : (sP2220(X11) | ~sP2219(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f4748_D])). 23.38/23.20 fof(f4748_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP2219(X10) | ~r1(X10,X11)) ) <=> ~sP2220(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2220])])). 23.38/23.20 fof(f4747,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP2212(X22) | ~sP2219(X10)) )), 23.38/23.20 inference(general_splitting,[],[f4745,f4746_D])). 23.38/23.20 fof(f4746,plain,( 23.38/23.20 ( ! [X10,X9] : (sP2219(X10) | ~sP2218(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f4746_D])). 23.38/23.20 fof(f4746_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP2218(X9) | ~r1(X9,X10)) ) <=> ~sP2219(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2219])])). 23.38/23.20 fof(f4745,plain,( 23.38/23.20 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP2212(X22) | ~sP2218(X9)) )), 23.38/23.20 inference(general_splitting,[],[f4743,f4744_D])). 23.38/23.20 fof(f4744,plain,( 23.38/23.20 ( ! [X8,X9] : (sP2218(X9) | ~sP2217(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f4744_D])). 23.38/23.20 fof(f4744_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP2217(X8) | ~r1(X8,X9)) ) <=> ~sP2218(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2218])])). 23.38/23.20 fof(f4743,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~sP2212(X22) | ~sP2217(X8)) )), 23.38/23.20 inference(general_splitting,[],[f4741,f4742_D])). 23.38/23.20 fof(f4742,plain,( 23.38/23.20 ( ! [X8,X7] : (sP2217(X8) | ~sP2216(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f4742_D])). 23.38/23.20 fof(f4742_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP2216(X7) | ~r1(X7,X8)) ) <=> ~sP2217(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2217])])). 23.38/23.20 fof(f4741,plain,( 23.38/23.20 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP2212(X22) | ~sP2216(X7)) )), 23.38/23.20 inference(general_splitting,[],[f4739,f4740_D])). 23.38/23.20 fof(f4740,plain,( 23.38/23.20 ( ! [X6,X7] : (sP2216(X7) | ~sP2215(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f4740_D])). 23.38/23.20 fof(f4740_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP2215(X6) | ~r1(X6,X7)) ) <=> ~sP2216(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2216])])). 23.38/23.20 fof(f4739,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP2212(X22) | ~sP2215(X6)) )), 23.38/23.20 inference(general_splitting,[],[f4737,f4738_D])). 23.38/23.20 fof(f4738,plain,( 23.38/23.20 ( ! [X6,X5] : (sP2215(X6) | ~sP2214(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f4738_D])). 23.38/23.20 fof(f4738_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP2214(X5) | ~r1(X5,X6)) ) <=> ~sP2215(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2215])])). 23.38/23.20 fof(f4737,plain,( 23.38/23.20 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2212(X22) | ~sP2214(X5)) )), 23.38/23.20 inference(general_splitting,[],[f4735,f4736_D])). 23.38/23.20 fof(f4736,plain,( 23.38/23.20 ( ! [X4,X5] : (sP2214(X5) | ~sP2213(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f4736_D])). 23.38/23.20 fof(f4736_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP2213(X4) | ~r1(X4,X5)) ) <=> ~sP2214(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2214])])). 23.38/23.20 fof(f4735,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2212(X22) | ~sP2213(X4)) )), 23.38/23.20 inference(general_splitting,[],[f4733,f4734_D])). 23.38/23.20 fof(f4734,plain,( 23.38/23.20 ( ! [X4,X3] : (sP2213(X4) | ~sP2207(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f4734_D])). 23.38/23.20 fof(f4734_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP2207(X3) | ~r1(X3,X4)) ) <=> ~sP2213(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2213])])). 23.38/23.20 fof(f4733,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2207(X3) | ~sP2212(X22)) )), 23.38/23.20 inference(general_splitting,[],[f4731,f4732_D])). 23.38/23.20 fof(f4731,plain,( 23.38/23.20 ( ! [X6,X4,X14,X12,X10,X23,X21,X19,X17,X8,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2207(X3) | ~sP2211(X23)) )), 23.38/23.20 inference(general_splitting,[],[f4729,f4730_D])). 23.38/23.20 fof(f4729,plain,( 23.38/23.20 ( ! [X24,X6,X4,X14,X12,X10,X23,X21,X19,X17,X8,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2207(X3) | ~sP2210(X24)) )), 23.38/23.20 inference(general_splitting,[],[f4727,f4728_D])). 23.38/23.20 fof(f4727,plain,( 23.38/23.20 ( ! [X24,X6,X4,X14,X12,X10,X23,X21,X19,X17,X8,X25,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2207(X3) | ~sP2209(X25)) )), 23.38/23.20 inference(general_splitting,[],[f4725,f4726_D])). 23.38/23.20 fof(f4725,plain,( 23.38/23.20 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2207(X3) | ~sP2208(X26)) )), 23.38/23.20 inference(general_splitting,[],[f4723,f4724_D])). 23.38/23.20 fof(f4723,plain,( 23.38/23.20 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | p23(X27) | p24(X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2207(X3)) )), 23.38/23.20 inference(general_splitting,[],[f4721,f4722_D])). 23.38/23.20 fof(f4722,plain,( 23.38/23.20 ( ! [X3,X1] : (sP2207(X3) | ~sP2206(X1) | ~r1(X1,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f4722_D])). 23.38/23.20 fof(f4722_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X1] : (~sP2206(X1) | ~r1(X1,X3)) ) <=> ~sP2207(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2207])])). 23.38/23.20 fof(f4721,plain,( 23.38/23.20 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | p23(X27) | p24(X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~sP2206(X1)) )), 23.38/23.20 inference(general_splitting,[],[f492,f4720_D])). 23.38/23.20 fof(f4720,plain,( 23.38/23.20 ( ! [X0,X1] : (sP2206(X1) | ~sP21(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f4720_D])). 23.38/23.20 fof(f4720_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP21(X0) | ~r1(X0,X1)) ) <=> ~sP2206(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2206])])). 23.38/23.20 fof(f492,plain,( 23.38/23.20 ( ! [X24,X4,X0,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | p23(X27) | p24(X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP21(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f166])). 23.38/23.20 fof(f249654,plain,( 23.38/23.20 sP2225(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f233756,f4758])). 23.38/23.20 fof(f233756,plain,( 23.38/23.20 sP2224(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f218556,f4756])). 23.38/23.20 fof(f218556,plain,( 23.38/23.20 sP2223(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204051,f4754])). 23.38/23.20 fof(f204051,plain,( 23.38/23.20 sP2222(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190219,f4752])). 23.38/23.20 fof(f190219,plain,( 23.38/23.20 sP2221(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177048,f4750])). 23.38/23.20 fof(f177048,plain,( 23.38/23.20 sP2220(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f164521,f4748])). 23.38/23.20 fof(f164521,plain,( 23.38/23.20 sP2219(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f152620,f4746])). 23.38/23.20 fof(f152620,plain,( 23.38/23.20 sP2218(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141329,f4744])). 23.38/23.20 fof(f141329,plain,( 23.38/23.20 sP2217(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f130631,f4742])). 23.38/23.20 fof(f130631,plain,( 23.38/23.20 sP2216(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f120513,f4740])). 23.38/23.20 fof(f120513,plain,( 23.38/23.20 sP2215(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f110949,f4738])). 23.38/23.20 fof(f110949,plain,( 23.38/23.20 sP2214(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f101937,f4736])). 23.38/23.20 fof(f101937,plain,( 23.38/23.20 sP2213(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f93456,f4734])). 23.38/23.20 fof(f93456,plain,( 23.38/23.20 sP2207(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f85488,f4722])). 23.38/23.20 fof(f85488,plain,( 23.38/23.20 sP2206(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f78027,f4720])). 23.38/23.20 fof(f663893,plain,( 23.38/23.20 p25(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472273,f6450,f663701,f4562])). 23.38/23.20 fof(f4562,plain,( 23.38/23.20 ( ! [X28,X27] : (p25(X28) | ~r1(X27,X28) | p26(X28) | sP2127(X27)) )), 23.38/23.20 inference(cnf_transformation,[],[f4562_D])). 23.38/23.20 fof(f4562_D,plain,( 23.38/23.20 ( ! [X27] : (( ! [X28] : (p25(X28) | ~r1(X27,X28) | p26(X28)) ) <=> ~sP2127(X27)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2127])])). 23.38/23.20 fof(f663701,plain,( 23.38/23.20 ~p26(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472276,f6450,f663509,f4400])). 23.38/23.20 fof(f4400,plain,( 23.38/23.20 ( ! [X30,X29] : (~p26(X30) | ~r1(X29,X30) | ~p27(X30) | sP2046(X29)) )), 23.38/23.20 inference(cnf_transformation,[],[f4400_D])). 23.38/23.20 fof(f4400_D,plain,( 23.38/23.20 ( ! [X29] : (( ! [X30] : (~p26(X30) | ~r1(X29,X30) | ~p27(X30)) ) <=> ~sP2046(X29)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2046])])). 23.38/23.20 fof(f663509,plain,( 23.38/23.20 p27(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472282,f6450,f663317,f4284])). 23.38/23.20 fof(f4284,plain,( 23.38/23.20 ( ! [X30,X31] : (p27(X31) | p28(X31) | ~r1(X30,X31) | sP1988(X30)) )), 23.38/23.20 inference(cnf_transformation,[],[f4284_D])). 23.38/23.20 fof(f4284_D,plain,( 23.38/23.20 ( ! [X30] : (( ! [X31] : (p27(X31) | p28(X31) | ~r1(X30,X31)) ) <=> ~sP1988(X30)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1988])])). 23.38/23.20 fof(f663317,plain,( 23.38/23.20 ~p28(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472291,f6450,f663125,f4226])). 23.38/23.20 fof(f4226,plain,( 23.38/23.20 ( ! [X30,X31] : (~p29(X31) | ~p28(X31) | ~r1(X30,X31) | sP1959(X30)) )), 23.38/23.20 inference(cnf_transformation,[],[f4226_D])). 23.38/23.20 fof(f4226_D,plain,( 23.38/23.20 ( ! [X30] : (( ! [X31] : (~p29(X31) | ~p28(X31) | ~r1(X30,X31)) ) <=> ~sP1959(X30)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1959])])). 23.38/23.20 fof(f663125,plain,( 23.38/23.20 p29(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472297,f6450,f662933,f4098])). 23.38/23.20 fof(f4098,plain,( 23.38/23.20 ( ! [X33,X32] : (p30(X33) | p29(X33) | ~r1(X32,X33) | sP1895(X32)) )), 23.38/23.20 inference(cnf_transformation,[],[f4098_D])). 23.38/23.20 fof(f4098_D,plain,( 23.38/23.20 ( ! [X32] : (( ! [X33] : (p30(X33) | p29(X33) | ~r1(X32,X33)) ) <=> ~sP1895(X32)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1895])])). 23.38/23.20 fof(f662933,plain,( 23.38/23.20 ~p30(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472300,f6450,f662741,f3908])). 23.38/23.20 fof(f3908,plain,( 23.38/23.20 ( ! [X33,X32] : (~r1(X32,X33) | ~p30(X33) | ~p31(X33) | sP1800(X32)) )), 23.38/23.20 inference(cnf_transformation,[],[f3908_D])). 23.38/23.20 fof(f3908_D,plain,( 23.38/23.20 ( ! [X32] : (( ! [X33] : (~r1(X32,X33) | ~p30(X33) | ~p31(X33)) ) <=> ~sP1800(X32)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1800])])). 23.38/23.20 fof(f662741,plain,( 23.38/23.20 p31(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472309,f6450,f662549,f3844])). 23.38/23.20 fof(f3844,plain,( 23.38/23.20 ( ! [X33,X34] : (p31(X34) | p32(X34) | ~r1(X33,X34) | sP1768(X33)) )), 23.38/23.20 inference(cnf_transformation,[],[f3844_D])). 23.38/23.20 fof(f3844_D,plain,( 23.38/23.20 ( ! [X33] : (( ! [X34] : (p31(X34) | p32(X34) | ~r1(X33,X34)) ) <=> ~sP1768(X33)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1768])])). 23.38/23.20 fof(f662549,plain,( 23.38/23.20 ~p32(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472315,f6450,f662357,f3712])). 23.38/23.20 fof(f3712,plain,( 23.38/23.20 ( ! [X35,X36] : (~p33(X36) | ~p32(X36) | ~r1(X35,X36) | sP1702(X35)) )), 23.38/23.20 inference(cnf_transformation,[],[f3712_D])). 23.38/23.20 fof(f3712_D,plain,( 23.38/23.20 ( ! [X35] : (( ! [X36] : (~p33(X36) | ~p32(X36) | ~r1(X35,X36)) ) <=> ~sP1702(X35)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1702])])). 23.38/23.20 fof(f662357,plain,( 23.38/23.20 p33(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472321,f6450,f662165,f3576])). 23.38/23.20 fof(f3576,plain,( 23.38/23.20 ( ! [X35,X36] : (p34(X36) | p33(X36) | ~r1(X35,X36) | sP1634(X35)) )), 23.38/23.20 inference(cnf_transformation,[],[f3576_D])). 23.38/23.20 fof(f3576_D,plain,( 23.38/23.20 ( ! [X35] : (( ! [X36] : (p34(X36) | p33(X36) | ~r1(X35,X36)) ) <=> ~sP1634(X35)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1634])])). 23.38/23.20 fof(f662165,plain,( 23.38/23.20 ~p34(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472324,f6450,f661973,f3358])). 23.38/23.20 fof(f3358,plain,( 23.38/23.20 ( ! [X37,X38] : (~r1(X37,X38) | ~p34(X38) | ~p35(X38) | sP1525(X37)) )), 23.38/23.20 inference(cnf_transformation,[],[f3358_D])). 23.38/23.20 fof(f3358_D,plain,( 23.38/23.20 ( ! [X37] : (( ! [X38] : (~r1(X37,X38) | ~p34(X38) | ~p35(X38)) ) <=> ~sP1525(X37)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1525])])). 23.38/23.20 fof(f661973,plain,( 23.38/23.20 p35(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472333,f6450,f661781,f3286])). 23.38/23.20 fof(f3286,plain,( 23.38/23.20 ( ! [X39,X38] : (p35(X39) | p36(X39) | ~r1(X38,X39) | sP1489(X38)) )), 23.38/23.20 inference(cnf_transformation,[],[f3286_D])). 23.38/23.20 fof(f3286_D,plain,( 23.38/23.20 ( ! [X38] : (( ! [X39] : (p35(X39) | p36(X39) | ~r1(X38,X39)) ) <=> ~sP1489(X38)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1489])])). 23.38/23.20 fof(f661781,plain,( 23.38/23.20 ~p36(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472336,f6450,f661589,f3060])). 23.38/23.20 fof(f3060,plain,( 23.38/23.20 ( ! [X39,X38] : (~p36(X39) | ~r1(X38,X39) | ~p37(X39) | sP1376(X38)) )), 23.38/23.20 inference(cnf_transformation,[],[f3060_D])). 23.38/23.20 fof(f3060_D,plain,( 23.38/23.20 ( ! [X38] : (( ! [X39] : (~p36(X39) | ~r1(X38,X39) | ~p37(X39)) ) <=> ~sP1376(X38)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1376])])). 23.38/23.20 fof(f661589,plain,( 23.38/23.20 p37(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472342,f6450,f661397,f2902])). 23.38/23.20 fof(f2902,plain,( 23.38/23.20 ( ! [X41,X40] : (p37(X41) | ~r1(X40,X41) | p38(X41) | sP1297(X40)) )), 23.38/23.20 inference(cnf_transformation,[],[f2902_D])). 23.38/23.20 fof(f2902_D,plain,( 23.38/23.20 ( ! [X40] : (( ! [X41] : (p37(X41) | ~r1(X40,X41) | p38(X41)) ) <=> ~sP1297(X40)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1297])])). 23.38/23.20 fof(f661397,plain,( 23.38/23.20 ~p38(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472351,f6450,f661205,f2824])). 23.38/23.20 fof(f2824,plain,( 23.38/23.20 ( ! [X41,X42] : (~p39(X42) | ~p38(X42) | ~r1(X41,X42) | sP1258(X41)) )), 23.38/23.20 inference(cnf_transformation,[],[f2824_D])). 23.38/23.20 fof(f2824_D,plain,( 23.38/23.20 ( ! [X41] : (( ! [X42] : (~p39(X42) | ~p38(X42) | ~r1(X41,X42)) ) <=> ~sP1258(X41)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1258])])). 23.38/23.20 fof(f661205,plain,( 23.38/23.20 p39(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472354,f6450,f661013,f2580])). 23.38/23.20 fof(f2580,plain,( 23.38/23.20 ( ! [X41,X42] : (p40(X42) | p39(X42) | ~r1(X41,X42) | sP1136(X41)) )), 23.38/23.20 inference(cnf_transformation,[],[f2580_D])). 23.38/23.20 fof(f2580_D,plain,( 23.38/23.20 ( ! [X41] : (( ! [X42] : (p40(X42) | p39(X42) | ~r1(X41,X42)) ) <=> ~sP1136(X41)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1136])])). 23.38/23.20 fof(f661013,plain,( 23.38/23.20 ~p40(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472363,f6450,f660821,f2512])). 23.38/23.20 fof(f2512,plain,( 23.38/23.20 ( ! [X43,X44] : (~p41(X44) | ~p40(X44) | ~r1(X43,X44) | sP1102(X43)) )), 23.38/23.20 inference(cnf_transformation,[],[f2512_D])). 23.38/23.20 fof(f2512_D,plain,( 23.38/23.20 ( ! [X43] : (( ! [X44] : (~p41(X44) | ~p40(X44) | ~r1(X43,X44)) ) <=> ~sP1102(X43)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1102])])). 23.38/23.20 fof(f660821,plain,( 23.38/23.20 p41(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472366,f6450,f660629,f2258])). 23.38/23.20 fof(f2258,plain,( 23.38/23.20 ( ! [X43,X44] : (p42(X44) | ~r1(X43,X44) | p41(X44) | sP975(X43)) )), 23.38/23.20 inference(cnf_transformation,[],[f2258_D])). 23.38/23.20 fof(f2258_D,plain,( 23.38/23.20 ( ! [X43] : (( ! [X44] : (p42(X44) | ~r1(X43,X44) | p41(X44)) ) <=> ~sP975(X43)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP975])])). 23.38/23.20 fof(f660629,plain,( 23.38/23.20 ~p42(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472372,f6450,f660437,f2064])). 23.38/23.20 fof(f2064,plain,( 23.38/23.20 ( ! [X45,X46] : (~r1(X45,X46) | ~p43(X46) | ~p42(X46) | sP878(X45)) )), 23.38/23.20 inference(cnf_transformation,[],[f2064_D])). 23.38/23.20 fof(f2064_D,plain,( 23.38/23.20 ( ! [X45] : (( ! [X46] : (~r1(X45,X46) | ~p43(X46) | ~p42(X46)) ) <=> ~sP878(X45)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP878])])). 23.38/23.20 fof(f660437,plain,( 23.38/23.20 p43(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472381,f6450,f660245,f1974])). 23.38/23.20 fof(f1974,plain,( 23.38/23.20 ( ! [X47,X46] : (p43(X47) | ~r1(X46,X47) | p44(X47) | sP833(X46)) )), 23.38/23.20 inference(cnf_transformation,[],[f1974_D])). 23.38/23.20 fof(f1974_D,plain,( 23.38/23.20 ( ! [X46] : (( ! [X47] : (p43(X47) | ~r1(X46,X47) | p44(X47)) ) <=> ~sP833(X46)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP833])])). 23.38/23.20 fof(f660245,plain,( 23.38/23.20 ~p44(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472387,f6450,f660052,f1792])). 23.38/23.20 fof(f1792,plain,( 23.38/23.20 ( ! [X47,X48] : (~p45(X48) | ~p44(X48) | ~r1(X47,X48) | sP742(X47)) )), 23.38/23.20 inference(cnf_transformation,[],[f1792_D])). 23.38/23.20 fof(f1792_D,plain,( 23.38/23.20 ( ! [X47] : (( ! [X48] : (~p45(X48) | ~p44(X48) | ~r1(X47,X48)) ) <=> ~sP742(X47)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP742])])). 23.38/23.20 fof(f660052,plain,( 23.38/23.20 p45(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472390,f6450,f659860,f1538])). 23.38/23.20 fof(f1538,plain,( 23.38/23.20 ( ! [X48,X49] : (p46(X49) | p45(X49) | ~r1(X48,X49) | sP615(X48)) )), 23.38/23.20 inference(cnf_transformation,[],[f1538_D])). 23.38/23.20 fof(f1538_D,plain,( 23.38/23.20 ( ! [X48] : (( ! [X49] : (p46(X49) | p45(X49) | ~r1(X48,X49)) ) <=> ~sP615(X48)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP615])])). 23.38/23.20 fof(f659860,plain,( 23.38/23.20 ~p46(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472396,f6450,f659668,f1320])). 23.38/23.20 fof(f1320,plain,( 23.38/23.20 ( ! [X50,X49] : (~r1(X49,X50) | ~p46(X50) | ~p47(X50) | sP506(X49)) )), 23.38/23.20 inference(cnf_transformation,[],[f1320_D])). 23.38/23.20 fof(f1320_D,plain,( 23.38/23.20 ( ! [X49] : (( ! [X50] : (~r1(X49,X50) | ~p46(X50) | ~p47(X50)) ) <=> ~sP506(X49)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP506])])). 23.38/23.20 fof(f659668,plain,( 23.38/23.20 p47(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472402,f6450,f659476,f1120])). 23.38/23.20 fof(f1120,plain,( 23.38/23.20 ( ! [X50,X51] : (p47(X51) | p48(X51) | ~r1(X50,X51) | sP406(X50)) )), 23.38/23.20 inference(cnf_transformation,[],[f1120_D])). 23.38/23.20 fof(f1120_D,plain,( 23.38/23.20 ( ! [X50] : (( ! [X51] : (p47(X51) | p48(X51) | ~r1(X50,X51)) ) <=> ~sP406(X50)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP406])])). 23.38/23.20 fof(f659476,plain,( 23.38/23.20 ~p48(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f472505,f6450,f486412,f932])). 23.38/23.20 fof(f932,plain,( 23.38/23.20 ( ! [X52,X51] : (~p48(X52) | ~p49(X52) | ~r1(X51,X52) | sP312(X51)) )), 23.38/23.20 inference(cnf_transformation,[],[f932_D])). 23.38/23.20 fof(f932_D,plain,( 23.38/23.20 ( ! [X51] : (( ! [X52] : (~p48(X52) | ~p49(X52) | ~r1(X51,X52)) ) <=> ~sP312(X51)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP312])])). 23.38/23.20 fof(f486412,plain,( 23.38/23.20 p49(sK48(sK101))), 23.38/23.20 inference(unit_resulting_resolution,[],[f6452,f6450,f473089,f716])). 23.38/23.20 fof(f716,plain,( 23.38/23.20 ( ! [X52,X53] : (p49(X53) | p50(X53) | ~r1(X52,X53) | sP204(X52)) )), 23.38/23.20 inference(cnf_transformation,[],[f716_D])). 23.38/23.20 fof(f716_D,plain,( 23.38/23.20 ( ! [X52] : (( ! [X53] : (p49(X53) | p50(X53) | ~r1(X52,X53)) ) <=> ~sP204(X52)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP204])])). 23.38/23.20 fof(f473089,plain,( 23.38/23.20 ~sP204(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f449717,f730])). 23.38/23.20 fof(f730,plain,( 23.38/23.20 ( ! [X52,X51] : (~sP204(X52) | ~r1(X51,X52) | sP211(X51)) )), 23.38/23.20 inference(cnf_transformation,[],[f730_D])). 23.38/23.20 fof(f730_D,plain,( 23.38/23.20 ( ! [X51] : (( ! [X52] : (~sP204(X52) | ~r1(X51,X52)) ) <=> ~sP211(X51)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP211])])). 23.38/23.20 fof(f449717,plain,( 23.38/23.20 ~sP211(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f426588,f732])). 23.38/23.20 fof(f732,plain,( 23.38/23.20 ( ! [X50,X51] : (~sP211(X51) | ~r1(X50,X51) | sP212(X50)) )), 23.38/23.20 inference(cnf_transformation,[],[f732_D])). 23.38/23.20 fof(f732_D,plain,( 23.38/23.20 ( ! [X50] : (( ! [X51] : (~sP211(X51) | ~r1(X50,X51)) ) <=> ~sP212(X50)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP212])])). 23.38/23.20 fof(f426588,plain,( 23.38/23.20 ~sP212(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f403729,f734])). 23.38/23.20 fof(f734,plain,( 23.38/23.20 ( ! [X50,X49] : (~sP212(X50) | ~r1(X49,X50) | sP213(X49)) )), 23.38/23.20 inference(cnf_transformation,[],[f734_D])). 23.38/23.20 fof(f734_D,plain,( 23.38/23.20 ( ! [X49] : (( ! [X50] : (~sP212(X50) | ~r1(X49,X50)) ) <=> ~sP213(X49)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP213])])). 23.38/23.20 fof(f403729,plain,( 23.38/23.20 ~sP213(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f379026,f754])). 23.38/23.20 fof(f754,plain,( 23.38/23.20 ( ! [X48,X49] : (~sP213(X49) | ~r1(X48,X49) | sP223(X48)) )), 23.38/23.20 inference(cnf_transformation,[],[f754_D])). 23.38/23.20 fof(f754_D,plain,( 23.38/23.20 ( ! [X48] : (( ! [X49] : (~sP213(X49) | ~r1(X48,X49)) ) <=> ~sP223(X48)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP223])])). 23.38/23.20 fof(f379026,plain,( 23.38/23.20 ~sP223(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f343439,f756])). 23.38/23.20 fof(f756,plain,( 23.38/23.20 ( ! [X47,X48] : (~sP223(X48) | ~r1(X47,X48) | sP224(X47)) )), 23.38/23.20 inference(cnf_transformation,[],[f756_D])). 23.38/23.20 fof(f756_D,plain,( 23.38/23.20 ( ! [X47] : (( ! [X48] : (~sP223(X48) | ~r1(X47,X48)) ) <=> ~sP224(X47)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP224])])). 23.38/23.20 fof(f343439,plain,( 23.38/23.20 ~sP224(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f321288,f758])). 23.38/23.20 fof(f758,plain,( 23.38/23.20 ( ! [X47,X46] : (~sP224(X47) | ~r1(X46,X47) | sP225(X46)) )), 23.38/23.20 inference(cnf_transformation,[],[f758_D])). 23.38/23.20 fof(f758_D,plain,( 23.38/23.20 ( ! [X46] : (( ! [X47] : (~sP224(X47) | ~r1(X46,X47)) ) <=> ~sP225(X46)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP225])])). 23.38/23.20 fof(f321288,plain,( 23.38/23.20 ~sP225(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f302385,f760])). 23.38/23.20 fof(f760,plain,( 23.38/23.20 ( ! [X45,X46] : (~sP225(X46) | ~r1(X45,X46) | sP226(X45)) )), 23.38/23.20 inference(cnf_transformation,[],[f760_D])). 23.38/23.20 fof(f760_D,plain,( 23.38/23.20 ( ! [X45] : (( ! [X46] : (~sP225(X46) | ~r1(X45,X46)) ) <=> ~sP226(X45)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP226])])). 23.38/23.20 fof(f302385,plain,( 23.38/23.20 ~sP226(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f284252,f762])). 23.38/23.20 fof(f762,plain,( 23.38/23.20 ( ! [X45,X44] : (~sP226(X45) | ~r1(X44,X45) | sP227(X44)) )), 23.38/23.20 inference(cnf_transformation,[],[f762_D])). 23.38/23.20 fof(f762_D,plain,( 23.38/23.20 ( ! [X44] : (( ! [X45] : (~sP226(X45) | ~r1(X44,X45)) ) <=> ~sP227(X44)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP227])])). 23.38/23.20 fof(f284252,plain,( 23.38/23.20 ~sP227(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f266881,f764])). 23.38/23.20 fof(f764,plain,( 23.38/23.20 ( ! [X43,X44] : (~sP227(X44) | ~r1(X43,X44) | sP228(X43)) )), 23.38/23.20 inference(cnf_transformation,[],[f764_D])). 23.38/23.20 fof(f764_D,plain,( 23.38/23.20 ( ! [X43] : (( ! [X44] : (~sP227(X44) | ~r1(X43,X44)) ) <=> ~sP228(X43)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP228])])). 23.38/23.20 fof(f266881,plain,( 23.38/23.20 ~sP228(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f250241,f766])). 23.38/23.20 fof(f766,plain,( 23.38/23.20 ( ! [X43,X42] : (~sP228(X43) | ~r1(X42,X43) | sP229(X42)) )), 23.38/23.20 inference(cnf_transformation,[],[f766_D])). 23.38/23.20 fof(f766_D,plain,( 23.38/23.20 ( ! [X42] : (( ! [X43] : (~sP228(X43) | ~r1(X42,X43)) ) <=> ~sP229(X42)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP229])])). 23.38/23.20 fof(f250241,plain,( 23.38/23.20 ~sP229(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f234331,f768])). 23.38/23.20 fof(f768,plain,( 23.38/23.20 ( ! [X41,X42] : (~sP229(X42) | ~r1(X41,X42) | sP230(X41)) )), 23.38/23.20 inference(cnf_transformation,[],[f768_D])). 23.38/23.20 fof(f768_D,plain,( 23.38/23.20 ( ! [X41] : (( ! [X42] : (~sP229(X42) | ~r1(X41,X42)) ) <=> ~sP230(X41)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP230])])). 23.38/23.20 fof(f234331,plain,( 23.38/23.20 ~sP230(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f219120,f770])). 23.38/23.20 fof(f770,plain,( 23.38/23.20 ( ! [X41,X40] : (~sP230(X41) | ~r1(X40,X41) | sP231(X40)) )), 23.38/23.20 inference(cnf_transformation,[],[f770_D])). 23.38/23.20 fof(f770_D,plain,( 23.38/23.20 ( ! [X40] : (( ! [X41] : (~sP230(X41) | ~r1(X40,X41)) ) <=> ~sP231(X40)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP231])])). 23.38/23.20 fof(f219120,plain,( 23.38/23.20 ~sP231(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f204602,f772])). 23.38/23.20 fof(f772,plain,( 23.38/23.20 ( ! [X39,X40] : (~sP231(X40) | ~r1(X39,X40) | sP232(X39)) )), 23.38/23.20 inference(cnf_transformation,[],[f772_D])). 23.38/23.20 fof(f772_D,plain,( 23.38/23.20 ( ! [X39] : (( ! [X40] : (~sP231(X40) | ~r1(X39,X40)) ) <=> ~sP232(X39)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP232])])). 23.38/23.20 fof(f204602,plain,( 23.38/23.20 ~sP232(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f190758,f774])). 23.38/23.20 fof(f774,plain,( 23.38/23.20 ( ! [X39,X38] : (~sP232(X39) | ~r1(X38,X39) | sP233(X38)) )), 23.38/23.20 inference(cnf_transformation,[],[f774_D])). 23.38/23.20 fof(f774_D,plain,( 23.38/23.20 ( ! [X38] : (( ! [X39] : (~sP232(X39) | ~r1(X38,X39)) ) <=> ~sP233(X38)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP233])])). 23.38/23.20 fof(f190758,plain,( 23.38/23.20 ~sP233(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f177577,f776])). 23.38/23.20 fof(f776,plain,( 23.38/23.20 ( ! [X37,X38] : (~sP233(X38) | ~r1(X37,X38) | sP234(X37)) )), 23.38/23.20 inference(cnf_transformation,[],[f776_D])). 23.38/23.20 fof(f776_D,plain,( 23.38/23.20 ( ! [X37] : (( ! [X38] : (~sP233(X38) | ~r1(X37,X38)) ) <=> ~sP234(X37)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP234])])). 23.38/23.20 fof(f177577,plain,( 23.38/23.20 ~sP234(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f165036,f778])). 23.38/23.20 fof(f778,plain,( 23.38/23.20 ( ! [X37,X36] : (~sP234(X37) | ~r1(X36,X37) | sP235(X36)) )), 23.38/23.20 inference(cnf_transformation,[],[f778_D])). 23.38/23.20 fof(f778_D,plain,( 23.38/23.20 ( ! [X36] : (( ! [X37] : (~sP234(X37) | ~r1(X36,X37)) ) <=> ~sP235(X36)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP235])])). 23.38/23.20 fof(f165036,plain,( 23.38/23.20 ~sP235(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f153123,f780])). 23.38/23.20 fof(f780,plain,( 23.38/23.20 ( ! [X35,X36] : (~sP235(X36) | ~r1(X35,X36) | sP236(X35)) )), 23.38/23.20 inference(cnf_transformation,[],[f780_D])). 23.38/23.20 fof(f780_D,plain,( 23.38/23.20 ( ! [X35] : (( ! [X36] : (~sP235(X36) | ~r1(X35,X36)) ) <=> ~sP236(X35)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP236])])). 23.38/23.20 fof(f153123,plain,( 23.38/23.20 ~sP236(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f141820,f782])). 23.38/23.20 fof(f782,plain,( 23.38/23.20 ( ! [X35,X34] : (~sP236(X35) | ~r1(X34,X35) | sP237(X34)) )), 23.38/23.20 inference(cnf_transformation,[],[f782_D])). 23.38/23.20 fof(f782_D,plain,( 23.38/23.20 ( ! [X34] : (( ! [X35] : (~sP236(X35) | ~r1(X34,X35)) ) <=> ~sP237(X34)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP237])])). 23.38/23.20 fof(f141820,plain,( 23.38/23.20 ~sP237(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f131112,f784])). 23.38/23.20 fof(f784,plain,( 23.38/23.20 ( ! [X33,X34] : (~sP237(X34) | ~r1(X33,X34) | sP238(X33)) )), 23.38/23.20 inference(cnf_transformation,[],[f784_D])). 23.38/23.20 fof(f784_D,plain,( 23.38/23.20 ( ! [X33] : (( ! [X34] : (~sP237(X34) | ~r1(X33,X34)) ) <=> ~sP238(X33)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP238])])). 23.38/23.20 fof(f131112,plain,( 23.38/23.20 ~sP238(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f120980,f786])). 23.38/23.20 fof(f786,plain,( 23.38/23.20 ( ! [X33,X32] : (~sP238(X33) | ~r1(X32,X33) | sP239(X32)) )), 23.38/23.20 inference(cnf_transformation,[],[f786_D])). 23.38/23.20 fof(f786_D,plain,( 23.38/23.20 ( ! [X32] : (( ! [X33] : (~sP238(X33) | ~r1(X32,X33)) ) <=> ~sP239(X32)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP239])])). 23.38/23.20 fof(f120980,plain,( 23.38/23.20 ~sP239(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f111404,f788])). 23.38/23.20 fof(f788,plain,( 23.38/23.20 ( ! [X31,X32] : (~sP239(X32) | ~r1(X31,X32) | sP240(X31)) )), 23.38/23.20 inference(cnf_transformation,[],[f788_D])). 23.38/23.20 fof(f788_D,plain,( 23.38/23.20 ( ! [X31] : (( ! [X32] : (~sP239(X32) | ~r1(X31,X32)) ) <=> ~sP240(X31)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP240])])). 23.38/23.20 fof(f111404,plain,( 23.38/23.20 ~sP240(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f102380,f790])). 23.38/23.20 fof(f790,plain,( 23.38/23.20 ( ! [X30,X31] : (~sP240(X31) | ~r1(X30,X31) | sP241(X30)) )), 23.38/23.20 inference(cnf_transformation,[],[f790_D])). 23.38/23.20 fof(f790_D,plain,( 23.38/23.20 ( ! [X30] : (( ! [X31] : (~sP240(X31) | ~r1(X30,X31)) ) <=> ~sP241(X30)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP241])])). 23.38/23.20 fof(f102380,plain,( 23.38/23.20 ~sP241(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f93887,f792])). 23.38/23.20 fof(f792,plain,( 23.38/23.20 ( ! [X30,X29] : (~sP241(X30) | ~r1(X29,X30) | sP242(X29)) )), 23.38/23.20 inference(cnf_transformation,[],[f792_D])). 23.38/23.20 fof(f792_D,plain,( 23.38/23.20 ( ! [X29] : (( ! [X30] : (~sP241(X30) | ~r1(X29,X30)) ) <=> ~sP242(X29)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP242])])). 23.38/23.20 fof(f93887,plain,( 23.38/23.20 ~sP242(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f85912,f794])). 23.38/23.20 fof(f794,plain,( 23.38/23.20 ( ! [X28,X29] : (~sP242(X29) | ~r1(X28,X29) | sP243(X28)) )), 23.38/23.20 inference(cnf_transformation,[],[f794_D])). 23.38/23.20 fof(f794_D,plain,( 23.38/23.20 ( ! [X28] : (( ! [X29] : (~sP242(X29) | ~r1(X28,X29)) ) <=> ~sP243(X28)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP243])])). 23.38/23.20 fof(f85912,plain,( 23.38/23.20 ~sP243(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f78432,f796])). 23.38/23.20 fof(f796,plain,( 23.38/23.20 ( ! [X28,X27] : (~sP243(X28) | ~r1(X27,X28) | sP244(X27)) )), 23.38/23.20 inference(cnf_transformation,[],[f796_D])). 23.38/23.20 fof(f796_D,plain,( 23.38/23.20 ( ! [X27] : (( ! [X28] : (~sP243(X28) | ~r1(X27,X28)) ) <=> ~sP244(X27)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP244])])). 23.38/23.20 fof(f78432,plain,( 23.38/23.20 ~sP244(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f71429,f798])). 23.38/23.20 fof(f798,plain,( 23.38/23.20 ( ! [X26,X27] : (~sP244(X27) | ~r1(X26,X27) | sP245(X26)) )), 23.38/23.20 inference(cnf_transformation,[],[f798_D])). 23.38/23.20 fof(f798_D,plain,( 23.38/23.20 ( ! [X26] : (( ! [X27] : (~sP244(X27) | ~r1(X26,X27)) ) <=> ~sP245(X26)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP245])])). 23.38/23.20 fof(f71429,plain,( 23.38/23.20 ~sP245(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f64887,f800])). 23.38/23.20 fof(f800,plain,( 23.38/23.20 ( ! [X26,X25] : (~sP245(X26) | ~r1(X25,X26) | sP246(X25)) )), 23.38/23.20 inference(cnf_transformation,[],[f800_D])). 23.38/23.20 fof(f800_D,plain,( 23.38/23.20 ( ! [X25] : (( ! [X26] : (~sP245(X26) | ~r1(X25,X26)) ) <=> ~sP246(X25)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP246])])). 23.38/23.20 fof(f64887,plain,( 23.38/23.20 ~sP246(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f56801,f802])). 23.38/23.20 fof(f802,plain,( 23.38/23.20 ( ! [X24,X25] : (~sP246(X25) | ~r1(X24,X25) | sP247(X24)) )), 23.38/23.20 inference(cnf_transformation,[],[f802_D])). 23.38/23.20 fof(f802_D,plain,( 23.38/23.20 ( ! [X24] : (( ! [X25] : (~sP246(X25) | ~r1(X24,X25)) ) <=> ~sP247(X24)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP247])])). 23.38/23.20 fof(f56801,plain,( 23.38/23.20 ~sP247(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f50086,f804])). 23.38/23.20 fof(f804,plain,( 23.38/23.20 ( ! [X24,X23] : (~sP247(X24) | ~r1(X23,X24) | sP248(X23)) )), 23.38/23.20 inference(cnf_transformation,[],[f804_D])). 23.38/23.20 fof(f804_D,plain,( 23.38/23.20 ( ! [X23] : (( ! [X24] : (~sP247(X24) | ~r1(X23,X24)) ) <=> ~sP248(X23)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP248])])). 23.38/23.20 fof(f50086,plain,( 23.38/23.20 ~sP248(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f44503,f806])). 23.38/23.20 fof(f806,plain,( 23.38/23.20 ( ! [X23,X22] : (~sP248(X23) | ~r1(X22,X23) | sP249(X22)) )), 23.38/23.20 inference(cnf_transformation,[],[f806_D])). 23.38/23.20 fof(f806_D,plain,( 23.38/23.20 ( ! [X22] : (( ! [X23] : (~sP248(X23) | ~r1(X22,X23)) ) <=> ~sP249(X22)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP249])])). 23.38/23.20 fof(f44503,plain,( 23.38/23.20 ~sP249(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f39964,f808])). 23.38/23.20 fof(f808,plain,( 23.38/23.20 ( ! [X21,X22] : (~sP249(X22) | ~r1(X21,X22) | sP250(X21)) )), 23.38/23.20 inference(cnf_transformation,[],[f808_D])). 23.38/23.20 fof(f808_D,plain,( 23.38/23.20 ( ! [X21] : (( ! [X22] : (~sP249(X22) | ~r1(X21,X22)) ) <=> ~sP250(X21)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP250])])). 23.38/23.20 fof(f39964,plain,( 23.38/23.20 ~sP250(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f35799,f810])). 23.38/23.20 fof(f810,plain,( 23.38/23.20 ( ! [X21,X20] : (~sP250(X21) | ~r1(X20,X21) | sP251(X20)) )), 23.38/23.20 inference(cnf_transformation,[],[f810_D])). 23.38/23.20 fof(f810_D,plain,( 23.38/23.20 ( ! [X20] : (( ! [X21] : (~sP250(X21) | ~r1(X20,X21)) ) <=> ~sP251(X20)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP251])])). 23.38/23.20 fof(f35799,plain,( 23.38/23.20 ~sP251(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f31992,f812])). 23.38/23.20 fof(f812,plain,( 23.38/23.20 ( ! [X19,X20] : (~sP251(X20) | ~r1(X19,X20) | sP252(X19)) )), 23.38/23.20 inference(cnf_transformation,[],[f812_D])). 23.38/23.20 fof(f812_D,plain,( 23.38/23.20 ( ! [X19] : (( ! [X20] : (~sP251(X20) | ~r1(X19,X20)) ) <=> ~sP252(X19)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP252])])). 23.38/23.20 fof(f31992,plain,( 23.38/23.20 ~sP252(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f28512,f814])). 23.38/23.20 fof(f814,plain,( 23.38/23.20 ( ! [X19,X18] : (~sP252(X19) | ~r1(X18,X19) | sP253(X18)) )), 23.38/23.20 inference(cnf_transformation,[],[f814_D])). 23.38/23.20 fof(f814_D,plain,( 23.38/23.20 ( ! [X18] : (( ! [X19] : (~sP252(X19) | ~r1(X18,X19)) ) <=> ~sP253(X18)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP253])])). 23.38/23.20 fof(f28512,plain,( 23.38/23.20 ~sP253(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f25373,f816])). 23.38/23.20 fof(f816,plain,( 23.38/23.20 ( ! [X17,X18] : (~sP253(X18) | ~r1(X17,X18) | sP254(X17)) )), 23.38/23.20 inference(cnf_transformation,[],[f816_D])). 23.38/23.20 fof(f816_D,plain,( 23.38/23.20 ( ! [X17] : (( ! [X18] : (~sP253(X18) | ~r1(X17,X18)) ) <=> ~sP254(X17)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP254])])). 23.38/23.20 fof(f25373,plain,( 23.38/23.20 ~sP254(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f22544,f817])). 23.38/23.20 fof(f817,plain,( 23.38/23.20 ( ! [X17,X16] : (~sP254(X17) | ~sP222(X16) | ~r1(X16,X17)) )), 23.38/23.20 inference(general_splitting,[],[f815,f816_D])). 23.38/23.20 fof(f815,plain,( 23.38/23.20 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP222(X16) | ~sP253(X18)) )), 23.38/23.20 inference(general_splitting,[],[f813,f814_D])). 23.38/23.20 fof(f813,plain,( 23.38/23.20 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP222(X16) | ~sP252(X19)) )), 23.38/23.20 inference(general_splitting,[],[f811,f812_D])). 23.38/23.20 fof(f811,plain,( 23.38/23.20 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X17,X18) | ~sP222(X16) | ~sP251(X20)) )), 23.38/23.20 inference(general_splitting,[],[f809,f810_D])). 23.38/23.20 fof(f809,plain,( 23.38/23.20 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP250(X21)) )), 23.38/23.20 inference(general_splitting,[],[f807,f808_D])). 23.38/23.20 fof(f807,plain,( 23.38/23.20 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP249(X22)) )), 23.38/23.20 inference(general_splitting,[],[f805,f806_D])). 23.38/23.20 fof(f805,plain,( 23.38/23.20 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP248(X23)) )), 23.38/23.20 inference(general_splitting,[],[f803,f804_D])). 23.38/23.20 fof(f803,plain,( 23.38/23.20 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP247(X24)) )), 23.38/23.20 inference(general_splitting,[],[f801,f802_D])). 23.38/23.20 fof(f801,plain,( 23.38/23.20 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP246(X25)) )), 23.38/23.20 inference(general_splitting,[],[f799,f800_D])). 23.38/23.20 fof(f799,plain,( 23.38/23.20 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP245(X26)) )), 23.38/23.20 inference(general_splitting,[],[f797,f798_D])). 23.38/23.20 fof(f797,plain,( 23.38/23.20 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP244(X27)) )), 23.38/23.20 inference(general_splitting,[],[f795,f796_D])). 23.38/23.20 fof(f795,plain,( 23.38/23.20 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP243(X28)) )), 23.38/23.20 inference(general_splitting,[],[f793,f794_D])). 23.38/23.20 fof(f793,plain,( 23.38/23.20 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP242(X29)) )), 23.38/23.20 inference(general_splitting,[],[f791,f792_D])). 23.38/23.20 fof(f791,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP241(X30)) )), 23.38/23.20 inference(general_splitting,[],[f789,f790_D])). 23.38/23.20 fof(f789,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP240(X31)) )), 23.38/23.20 inference(general_splitting,[],[f787,f788_D])). 23.38/23.20 fof(f787,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP239(X32)) )), 23.38/23.20 inference(general_splitting,[],[f785,f786_D])). 23.38/23.20 fof(f785,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP238(X33)) )), 23.38/23.20 inference(general_splitting,[],[f783,f784_D])). 23.38/23.20 fof(f783,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP237(X34)) )), 23.38/23.20 inference(general_splitting,[],[f781,f782_D])). 23.38/23.20 fof(f781,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP236(X35)) )), 23.38/23.20 inference(general_splitting,[],[f779,f780_D])). 23.38/23.20 fof(f779,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP235(X36)) )), 23.38/23.20 inference(general_splitting,[],[f777,f778_D])). 23.38/23.20 fof(f777,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP234(X37)) )), 23.38/23.20 inference(general_splitting,[],[f775,f776_D])). 23.38/23.20 fof(f775,plain,( 23.38/23.20 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP233(X38)) )), 23.38/23.20 inference(general_splitting,[],[f773,f774_D])). 23.38/23.20 fof(f773,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP232(X39)) )), 23.38/23.20 inference(general_splitting,[],[f771,f772_D])). 23.38/23.20 fof(f771,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP231(X40)) )), 23.38/23.20 inference(general_splitting,[],[f769,f770_D])). 23.38/23.20 fof(f769,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP230(X41)) )), 23.38/23.20 inference(general_splitting,[],[f767,f768_D])). 23.38/23.20 fof(f767,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP229(X42)) )), 23.38/23.20 inference(general_splitting,[],[f765,f766_D])). 23.38/23.20 fof(f765,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP228(X43)) )), 23.38/23.20 inference(general_splitting,[],[f763,f764_D])). 23.38/23.20 fof(f763,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP227(X44)) )), 23.38/23.20 inference(general_splitting,[],[f761,f762_D])). 23.38/23.20 fof(f761,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP226(X45)) )), 23.38/23.20 inference(general_splitting,[],[f759,f760_D])). 23.38/23.20 fof(f759,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP225(X46)) )), 23.38/23.20 inference(general_splitting,[],[f757,f758_D])). 23.38/23.20 fof(f757,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP224(X47)) )), 23.38/23.20 inference(general_splitting,[],[f755,f756_D])). 23.38/23.20 fof(f755,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP222(X16) | ~sP223(X48)) )), 23.38/23.20 inference(general_splitting,[],[f753,f754_D])). 23.38/23.20 fof(f753,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X49,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP213(X49) | ~sP222(X16)) )), 23.38/23.20 inference(general_splitting,[],[f751,f752_D])). 23.38/23.20 fof(f752,plain,( 23.38/23.20 ( ! [X15,X16] : (sP222(X16) | ~sP221(X15) | ~r1(X15,X16)) )), 23.38/23.20 inference(cnf_transformation,[],[f752_D])). 23.38/23.20 fof(f752_D,plain,( 23.38/23.20 ( ! [X16] : (( ! [X15] : (~sP221(X15) | ~r1(X15,X16)) ) <=> ~sP222(X16)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP222])])). 23.38/23.20 fof(f751,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP213(X49) | ~sP221(X15)) )), 23.38/23.20 inference(general_splitting,[],[f749,f750_D])). 23.38/23.20 fof(f750,plain,( 23.38/23.20 ( ! [X14,X15] : (sP221(X15) | ~sP220(X14) | ~r1(X14,X15)) )), 23.38/23.20 inference(cnf_transformation,[],[f750_D])). 23.38/23.20 fof(f750_D,plain,( 23.38/23.20 ( ! [X15] : (( ! [X14] : (~sP220(X14) | ~r1(X14,X15)) ) <=> ~sP221(X15)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP221])])). 23.38/23.20 fof(f749,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP213(X49) | ~sP220(X14)) )), 23.38/23.20 inference(general_splitting,[],[f747,f748_D])). 23.38/23.20 fof(f748,plain,( 23.38/23.20 ( ! [X14,X13] : (sP220(X14) | ~sP219(X13) | ~r1(X13,X14)) )), 23.38/23.20 inference(cnf_transformation,[],[f748_D])). 23.38/23.20 fof(f748_D,plain,( 23.38/23.20 ( ! [X14] : (( ! [X13] : (~sP219(X13) | ~r1(X13,X14)) ) <=> ~sP220(X14)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP220])])). 23.38/23.20 fof(f747,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP213(X49) | ~sP219(X13)) )), 23.38/23.20 inference(general_splitting,[],[f745,f746_D])). 23.38/23.20 fof(f746,plain,( 23.38/23.20 ( ! [X12,X13] : (sP219(X13) | ~sP218(X12) | ~r1(X12,X13)) )), 23.38/23.20 inference(cnf_transformation,[],[f746_D])). 23.38/23.20 fof(f746_D,plain,( 23.38/23.20 ( ! [X13] : (( ! [X12] : (~sP218(X12) | ~r1(X12,X13)) ) <=> ~sP219(X13)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP219])])). 23.38/23.20 fof(f745,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP213(X49) | ~sP218(X12)) )), 23.38/23.20 inference(general_splitting,[],[f743,f744_D])). 23.38/23.20 fof(f744,plain,( 23.38/23.20 ( ! [X12,X11] : (sP218(X12) | ~sP217(X11) | ~r1(X11,X12)) )), 23.38/23.20 inference(cnf_transformation,[],[f744_D])). 23.38/23.20 fof(f744_D,plain,( 23.38/23.20 ( ! [X12] : (( ! [X11] : (~sP217(X11) | ~r1(X11,X12)) ) <=> ~sP218(X12)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP218])])). 23.38/23.20 fof(f743,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~sP213(X49) | ~sP217(X11)) )), 23.38/23.20 inference(general_splitting,[],[f741,f742_D])). 23.38/23.20 fof(f742,plain,( 23.38/23.20 ( ! [X10,X11] : (sP217(X11) | ~sP216(X10) | ~r1(X10,X11)) )), 23.38/23.20 inference(cnf_transformation,[],[f742_D])). 23.38/23.20 fof(f742_D,plain,( 23.38/23.20 ( ! [X11] : (( ! [X10] : (~sP216(X10) | ~r1(X10,X11)) ) <=> ~sP217(X11)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP217])])). 23.38/23.20 fof(f741,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP213(X49) | ~sP216(X10)) )), 23.38/23.20 inference(general_splitting,[],[f739,f740_D])). 23.38/23.20 fof(f740,plain,( 23.38/23.20 ( ! [X10,X9] : (sP216(X10) | ~sP215(X9) | ~r1(X9,X10)) )), 23.38/23.20 inference(cnf_transformation,[],[f740_D])). 23.38/23.20 fof(f740_D,plain,( 23.38/23.20 ( ! [X10] : (( ! [X9] : (~sP215(X9) | ~r1(X9,X10)) ) <=> ~sP216(X10)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP216])])). 23.38/23.20 fof(f739,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP213(X49) | ~sP215(X9)) )), 23.38/23.20 inference(general_splitting,[],[f737,f738_D])). 23.38/23.20 fof(f738,plain,( 23.38/23.20 ( ! [X8,X9] : (sP215(X9) | ~sP214(X8) | ~r1(X8,X9)) )), 23.38/23.20 inference(cnf_transformation,[],[f738_D])). 23.38/23.20 fof(f738_D,plain,( 23.38/23.20 ( ! [X9] : (( ! [X8] : (~sP214(X8) | ~r1(X8,X9)) ) <=> ~sP215(X9)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP215])])). 23.38/23.20 fof(f737,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP213(X49) | ~sP214(X8)) )), 23.38/23.20 inference(general_splitting,[],[f735,f736_D])). 23.38/23.20 fof(f736,plain,( 23.38/23.20 ( ! [X8,X7] : (sP214(X8) | ~sP210(X7) | ~r1(X7,X8)) )), 23.38/23.20 inference(cnf_transformation,[],[f736_D])). 23.38/23.20 fof(f736_D,plain,( 23.38/23.20 ( ! [X8] : (( ! [X7] : (~sP210(X7) | ~r1(X7,X8)) ) <=> ~sP214(X8)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP214])])). 23.38/23.20 fof(f735,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP210(X7) | ~sP213(X49)) )), 23.38/23.20 inference(general_splitting,[],[f733,f734_D])). 23.38/23.20 fof(f733,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP210(X7) | ~sP212(X50)) )), 23.38/23.20 inference(general_splitting,[],[f731,f732_D])). 23.38/23.20 fof(f731,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP210(X7) | ~sP211(X51)) )), 23.38/23.20 inference(general_splitting,[],[f729,f730_D])). 23.38/23.20 fof(f729,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X51,X52) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP204(X52) | ~sP210(X7)) )), 23.38/23.20 inference(general_splitting,[],[f727,f728_D])). 23.38/23.20 fof(f728,plain,( 23.38/23.20 ( ! [X6,X7] : (sP210(X7) | ~sP209(X6) | ~r1(X6,X7)) )), 23.38/23.20 inference(cnf_transformation,[],[f728_D])). 23.38/23.20 fof(f728_D,plain,( 23.38/23.20 ( ! [X7] : (( ! [X6] : (~sP209(X6) | ~r1(X6,X7)) ) <=> ~sP210(X7)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP210])])). 23.38/23.20 fof(f727,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X51,X52) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP204(X52) | ~sP209(X6)) )), 23.38/23.20 inference(general_splitting,[],[f725,f726_D])). 23.38/23.20 fof(f726,plain,( 23.38/23.20 ( ! [X6,X5] : (sP209(X6) | ~sP208(X5) | ~r1(X5,X6)) )), 23.38/23.20 inference(cnf_transformation,[],[f726_D])). 23.38/23.20 fof(f726_D,plain,( 23.38/23.20 ( ! [X6] : (( ! [X5] : (~sP208(X5) | ~r1(X5,X6)) ) <=> ~sP209(X6)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP209])])). 23.38/23.20 fof(f725,plain,( 23.38/23.20 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X51,X52) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP204(X52) | ~sP208(X5)) )), 23.38/23.20 inference(general_splitting,[],[f723,f724_D])). 23.38/23.20 fof(f724,plain,( 23.38/23.20 ( ! [X4,X5] : (sP208(X5) | ~sP207(X4) | ~r1(X4,X5)) )), 23.38/23.20 inference(cnf_transformation,[],[f724_D])). 23.38/23.20 fof(f724_D,plain,( 23.38/23.20 ( ! [X5] : (( ! [X4] : (~sP207(X4) | ~r1(X4,X5)) ) <=> ~sP208(X5)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP208])])). 23.38/23.20 fof(f723,plain,( 23.38/23.20 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X51,X52) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP204(X52) | ~sP207(X4)) )), 23.38/23.20 inference(general_splitting,[],[f721,f722_D])). 23.38/23.20 fof(f722,plain,( 23.38/23.20 ( ! [X4,X3] : (sP207(X4) | ~sP206(X3) | ~r1(X3,X4)) )), 23.38/23.20 inference(cnf_transformation,[],[f722_D])). 23.38/23.20 fof(f722_D,plain,( 23.38/23.20 ( ! [X4] : (( ! [X3] : (~sP206(X3) | ~r1(X3,X4)) ) <=> ~sP207(X4)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP207])])). 23.38/23.20 fof(f721,plain,( 23.38/23.20 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X51,X52) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP204(X52) | ~sP206(X3)) )), 23.38/23.20 inference(general_splitting,[],[f719,f720_D])). 23.38/23.20 fof(f720,plain,( 23.38/23.20 ( ! [X3,X1] : (sP206(X3) | ~sP205(X1) | ~r1(X1,X3)) )), 23.38/23.20 inference(cnf_transformation,[],[f720_D])). 23.38/23.20 fof(f720_D,plain,( 23.38/23.20 ( ! [X3] : (( ! [X1] : (~sP205(X1) | ~r1(X1,X3)) ) <=> ~sP206(X3)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP206])])). 23.38/23.20 fof(f719,plain,( 23.38/23.20 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X1,X3) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X51,X52) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP204(X52) | ~sP205(X1)) )), 23.38/23.20 inference(general_splitting,[],[f717,f718_D])). 23.38/23.20 fof(f718,plain,( 23.38/23.20 ( ! [X0,X1] : (sP205(X1) | ~sP47(X0) | ~r1(X0,X1)) )), 23.38/23.20 inference(cnf_transformation,[],[f718_D])). 23.38/23.20 fof(f718_D,plain,( 23.38/23.20 ( ! [X1] : (( ! [X0] : (~sP47(X0) | ~r1(X0,X1)) ) <=> ~sP205(X1)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP205])])). 23.38/23.20 fof(f717,plain,( 23.38/23.20 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X0,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X1,X3) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X51,X52) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X0,X1) | ~sP47(X0) | ~sP204(X52)) )), 23.38/23.20 inference(general_splitting,[],[f362,f716_D])). 23.38/23.20 fof(f362,plain,( 23.38/23.20 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X53,X16,X24,X37,X0,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X1,X3) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X49,X50) | ~r1(X50,X51) | ~r1(X51,X52) | p49(X53) | p50(X53) | ~r1(X52,X53) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X0,X1) | ~sP47(X0)) )), 23.38/23.20 inference(cnf_transformation,[],[f62])). 23.38/23.20 fof(f22544,plain,( 23.38/23.20 sP222(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f20009,f752])). 23.38/23.20 fof(f20009,plain,( 23.38/23.20 sP221(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f17737,f750])). 23.38/23.20 fof(f17737,plain,( 23.38/23.20 sP220(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f15320,f748])). 23.38/23.20 fof(f15320,plain,( 23.38/23.20 sP219(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f13263,f746])). 23.38/23.20 fof(f13263,plain,( 23.38/23.20 sP218(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f11538,f744])). 23.38/23.20 fof(f11538,plain,( 23.38/23.20 sP217(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f10380,f742])). 23.38/23.20 fof(f10380,plain,( 23.38/23.20 sP216(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f9408,f740])). 23.38/23.20 fof(f9408,plain,( 23.38/23.20 sP215(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f8429,f738])). 23.38/23.20 fof(f8429,plain,( 23.38/23.20 sP214(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f7818,f736])). 23.38/23.20 fof(f7818,plain,( 23.38/23.20 sP210(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f7341,f728])). 23.38/23.20 fof(f7341,plain,( 23.38/23.20 sP209(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f6982,f726])). 23.38/23.20 fof(f6982,plain,( 23.38/23.20 sP208(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f6725,f724])). 23.38/23.20 fof(f6725,plain,( 23.38/23.20 sP207(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f6554,f722])). 23.38/23.20 fof(f6554,plain,( 23.38/23.20 sP206(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f6454,f720])). 23.38/23.20 fof(f6454,plain,( 23.38/23.20 sP205(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f656,f6435,f718])). 23.38/23.20 fof(f472505,plain,( 23.38/23.20 ~sP312(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f449135,f934])). 23.38/23.20 fof(f934,plain,( 23.38/23.20 ( ! [X50,X51] : (~sP312(X51) | ~r1(X50,X51) | sP313(X50)) )), 23.38/23.20 inference(cnf_transformation,[],[f934_D])). 23.38/23.20 fof(f934_D,plain,( 23.38/23.20 ( ! [X50] : (( ! [X51] : (~sP312(X51) | ~r1(X50,X51)) ) <=> ~sP313(X50)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP313])])). 23.38/23.20 fof(f449135,plain,( 23.38/23.20 ~sP313(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f425983,f936])). 23.38/23.20 fof(f936,plain,( 23.38/23.20 ( ! [X50,X49] : (~sP313(X50) | ~r1(X49,X50) | sP314(X49)) )), 23.38/23.20 inference(cnf_transformation,[],[f936_D])). 23.38/23.20 fof(f936_D,plain,( 23.38/23.20 ( ! [X49] : (( ! [X50] : (~sP313(X50) | ~r1(X49,X50)) ) <=> ~sP314(X49)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP314])])). 23.38/23.20 fof(f425983,plain,( 23.38/23.20 ~sP314(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f403147,f956])). 23.38/23.20 fof(f956,plain,( 23.38/23.20 ( ! [X48,X49] : (~sP314(X49) | ~r1(X48,X49) | sP324(X48)) )), 23.38/23.20 inference(cnf_transformation,[],[f956_D])). 23.38/23.20 fof(f956_D,plain,( 23.38/23.20 ( ! [X48] : (( ! [X49] : (~sP314(X49) | ~r1(X48,X49)) ) <=> ~sP324(X48)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP324])])). 23.38/23.20 fof(f403147,plain,( 23.38/23.20 ~sP324(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f378460,f958])). 23.38/23.20 fof(f958,plain,( 23.38/23.20 ( ! [X47,X48] : (~sP324(X48) | ~r1(X47,X48) | sP325(X47)) )), 23.38/23.20 inference(cnf_transformation,[],[f958_D])). 23.38/23.20 fof(f958_D,plain,( 23.38/23.20 ( ! [X47] : (( ! [X48] : (~sP324(X48) | ~r1(X47,X48)) ) <=> ~sP325(X47)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP325])])). 23.38/23.20 fof(f378460,plain,( 23.38/23.20 ~sP325(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f342978,f960])). 23.38/23.20 fof(f960,plain,( 23.38/23.20 ( ! [X47,X46] : (~sP325(X47) | ~r1(X46,X47) | sP326(X46)) )), 23.38/23.20 inference(cnf_transformation,[],[f960_D])). 23.38/23.20 fof(f960_D,plain,( 23.38/23.20 ( ! [X46] : (( ! [X47] : (~sP325(X47) | ~r1(X46,X47)) ) <=> ~sP326(X46)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP326])])). 23.38/23.20 fof(f342978,plain,( 23.38/23.20 ~sP326(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f320839,f962])). 23.38/23.20 fof(f962,plain,( 23.38/23.20 ( ! [X45,X46] : (~sP326(X46) | ~r1(X45,X46) | sP327(X45)) )), 23.38/23.20 inference(cnf_transformation,[],[f962_D])). 23.38/23.20 fof(f962_D,plain,( 23.38/23.20 ( ! [X45] : (( ! [X46] : (~sP326(X46) | ~r1(X45,X46)) ) <=> ~sP327(X45)) )), 23.38/23.20 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP327])])). 23.38/23.20 fof(f320839,plain,( 23.38/23.20 ~sP327(sK101)), 23.38/23.20 inference(unit_resulting_resolution,[],[f715,f301946,f964])). 23.38/23.20 fof(f964,plain,( 23.38/23.20 ( ! [X45,X44] : (~sP327(X45) | ~r1(X44,X45) | sP328(X44)) )), 23.38/23.21 inference(cnf_transformation,[],[f964_D])). 23.38/23.21 fof(f964_D,plain,( 23.38/23.21 ( ! [X44] : (( ! [X45] : (~sP327(X45) | ~r1(X44,X45)) ) <=> ~sP328(X44)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP328])])). 23.38/23.21 fof(f301946,plain,( 23.38/23.21 ~sP328(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f283823,f966])). 23.38/23.21 fof(f966,plain,( 23.38/23.21 ( ! [X43,X44] : (~sP328(X44) | ~r1(X43,X44) | sP329(X43)) )), 23.38/23.21 inference(cnf_transformation,[],[f966_D])). 23.38/23.21 fof(f966_D,plain,( 23.38/23.21 ( ! [X43] : (( ! [X44] : (~sP328(X44) | ~r1(X43,X44)) ) <=> ~sP329(X43)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP329])])). 23.38/23.21 fof(f283823,plain,( 23.38/23.21 ~sP329(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f266462,f968])). 23.38/23.21 fof(f968,plain,( 23.38/23.21 ( ! [X43,X42] : (~sP329(X43) | ~r1(X42,X43) | sP330(X42)) )), 23.38/23.21 inference(cnf_transformation,[],[f968_D])). 23.38/23.21 fof(f968_D,plain,( 23.38/23.21 ( ! [X42] : (( ! [X43] : (~sP329(X43) | ~r1(X42,X43)) ) <=> ~sP330(X42)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP330])])). 23.38/23.21 fof(f266462,plain,( 23.38/23.21 ~sP330(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f249832,f970])). 23.38/23.21 fof(f970,plain,( 23.38/23.21 ( ! [X41,X42] : (~sP330(X42) | ~r1(X41,X42) | sP331(X41)) )), 23.38/23.21 inference(cnf_transformation,[],[f970_D])). 23.38/23.21 fof(f970_D,plain,( 23.38/23.21 ( ! [X41] : (( ! [X42] : (~sP330(X42) | ~r1(X41,X42)) ) <=> ~sP331(X41)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP331])])). 23.38/23.21 fof(f249832,plain,( 23.38/23.21 ~sP331(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f233932,f972])). 23.38/23.21 fof(f972,plain,( 23.38/23.21 ( ! [X41,X40] : (~sP331(X41) | ~r1(X40,X41) | sP332(X40)) )), 23.38/23.21 inference(cnf_transformation,[],[f972_D])). 23.38/23.21 fof(f972_D,plain,( 23.38/23.21 ( ! [X40] : (( ! [X41] : (~sP331(X41) | ~r1(X40,X41)) ) <=> ~sP332(X40)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP332])])). 23.38/23.21 fof(f233932,plain,( 23.38/23.21 ~sP332(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f218730,f974])). 23.38/23.21 fof(f974,plain,( 23.38/23.21 ( ! [X39,X40] : (~sP332(X40) | ~r1(X39,X40) | sP333(X39)) )), 23.38/23.21 inference(cnf_transformation,[],[f974_D])). 23.38/23.21 fof(f974_D,plain,( 23.38/23.21 ( ! [X39] : (( ! [X40] : (~sP332(X40) | ~r1(X39,X40)) ) <=> ~sP333(X39)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP333])])). 23.38/23.21 fof(f218730,plain,( 23.38/23.21 ~sP333(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f204223,f976])). 23.38/23.21 fof(f976,plain,( 23.38/23.21 ( ! [X39,X38] : (~sP333(X39) | ~r1(X38,X39) | sP334(X38)) )), 23.38/23.21 inference(cnf_transformation,[],[f976_D])). 23.38/23.21 fof(f976_D,plain,( 23.38/23.21 ( ! [X38] : (( ! [X39] : (~sP333(X39) | ~r1(X38,X39)) ) <=> ~sP334(X38)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP334])])). 23.38/23.21 fof(f204223,plain,( 23.38/23.21 ~sP334(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f190389,f978])). 23.38/23.21 fof(f978,plain,( 23.38/23.21 ( ! [X37,X38] : (~sP334(X38) | ~r1(X37,X38) | sP335(X37)) )), 23.38/23.21 inference(cnf_transformation,[],[f978_D])). 23.38/23.21 fof(f978_D,plain,( 23.38/23.21 ( ! [X37] : (( ! [X38] : (~sP334(X38) | ~r1(X37,X38)) ) <=> ~sP335(X37)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP335])])). 23.38/23.21 fof(f190389,plain,( 23.38/23.21 ~sP335(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f177216,f980])). 23.38/23.21 fof(f980,plain,( 23.38/23.21 ( ! [X37,X36] : (~sP335(X37) | ~r1(X36,X37) | sP336(X36)) )), 23.38/23.21 inference(cnf_transformation,[],[f980_D])). 23.38/23.21 fof(f980_D,plain,( 23.38/23.21 ( ! [X36] : (( ! [X37] : (~sP335(X37) | ~r1(X36,X37)) ) <=> ~sP336(X36)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP336])])). 23.38/23.21 fof(f177216,plain,( 23.38/23.21 ~sP336(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f164687,f982])). 23.38/23.21 fof(f982,plain,( 23.38/23.21 ( ! [X35,X36] : (~sP336(X36) | ~r1(X35,X36) | sP337(X35)) )), 23.38/23.21 inference(cnf_transformation,[],[f982_D])). 23.38/23.21 fof(f982_D,plain,( 23.38/23.21 ( ! [X35] : (( ! [X36] : (~sP336(X36) | ~r1(X35,X36)) ) <=> ~sP337(X35)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP337])])). 23.38/23.21 fof(f164687,plain,( 23.38/23.21 ~sP337(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f152784,f984])). 23.38/23.21 fof(f984,plain,( 23.38/23.21 ( ! [X35,X34] : (~sP337(X35) | ~r1(X34,X35) | sP338(X34)) )), 23.38/23.21 inference(cnf_transformation,[],[f984_D])). 23.38/23.21 fof(f984_D,plain,( 23.38/23.21 ( ! [X34] : (( ! [X35] : (~sP337(X35) | ~r1(X34,X35)) ) <=> ~sP338(X34)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP338])])). 23.38/23.21 fof(f152784,plain,( 23.38/23.21 ~sP338(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f141491,f986])). 23.38/23.21 fof(f986,plain,( 23.38/23.21 ( ! [X33,X34] : (~sP338(X34) | ~r1(X33,X34) | sP339(X33)) )), 23.38/23.21 inference(cnf_transformation,[],[f986_D])). 23.38/23.21 fof(f986_D,plain,( 23.38/23.21 ( ! [X33] : (( ! [X34] : (~sP338(X34) | ~r1(X33,X34)) ) <=> ~sP339(X33)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP339])])). 23.38/23.21 fof(f141491,plain,( 23.38/23.21 ~sP339(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f130791,f988])). 23.38/23.21 fof(f988,plain,( 23.38/23.21 ( ! [X33,X32] : (~sP339(X33) | ~r1(X32,X33) | sP340(X32)) )), 23.38/23.21 inference(cnf_transformation,[],[f988_D])). 23.38/23.21 fof(f988_D,plain,( 23.38/23.21 ( ! [X32] : (( ! [X33] : (~sP339(X33) | ~r1(X32,X33)) ) <=> ~sP340(X32)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP340])])). 23.38/23.21 fof(f130791,plain,( 23.38/23.21 ~sP340(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f120671,f990])). 23.38/23.21 fof(f990,plain,( 23.38/23.21 ( ! [X31,X32] : (~sP340(X32) | ~r1(X31,X32) | sP341(X31)) )), 23.38/23.21 inference(cnf_transformation,[],[f990_D])). 23.38/23.21 fof(f990_D,plain,( 23.38/23.21 ( ! [X31] : (( ! [X32] : (~sP340(X32) | ~r1(X31,X32)) ) <=> ~sP341(X31)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP341])])). 23.38/23.21 fof(f120671,plain,( 23.38/23.21 ~sP341(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f111105,f992])). 23.38/23.21 fof(f992,plain,( 23.38/23.21 ( ! [X30,X31] : (~sP341(X31) | ~r1(X30,X31) | sP342(X30)) )), 23.38/23.21 inference(cnf_transformation,[],[f992_D])). 23.38/23.21 fof(f992_D,plain,( 23.38/23.21 ( ! [X30] : (( ! [X31] : (~sP341(X31) | ~r1(X30,X31)) ) <=> ~sP342(X30)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP342])])). 23.38/23.21 fof(f111105,plain,( 23.38/23.21 ~sP342(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f102091,f994])). 23.38/23.21 fof(f994,plain,( 23.38/23.21 ( ! [X30,X29] : (~sP342(X30) | ~r1(X29,X30) | sP343(X29)) )), 23.38/23.21 inference(cnf_transformation,[],[f994_D])). 23.38/23.21 fof(f994_D,plain,( 23.38/23.21 ( ! [X29] : (( ! [X30] : (~sP342(X30) | ~r1(X29,X30)) ) <=> ~sP343(X29)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP343])])). 23.38/23.21 fof(f102091,plain,( 23.38/23.21 ~sP343(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f93608,f996])). 23.38/23.21 fof(f996,plain,( 23.38/23.21 ( ! [X28,X29] : (~sP343(X29) | ~r1(X28,X29) | sP344(X28)) )), 23.38/23.21 inference(cnf_transformation,[],[f996_D])). 23.38/23.21 fof(f996_D,plain,( 23.38/23.21 ( ! [X28] : (( ! [X29] : (~sP343(X29) | ~r1(X28,X29)) ) <=> ~sP344(X28)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP344])])). 23.38/23.21 fof(f93608,plain,( 23.38/23.21 ~sP344(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f85638,f998])). 23.38/23.21 fof(f998,plain,( 23.38/23.21 ( ! [X28,X27] : (~sP344(X28) | ~r1(X27,X28) | sP345(X27)) )), 23.38/23.21 inference(cnf_transformation,[],[f998_D])). 23.38/23.21 fof(f998_D,plain,( 23.38/23.21 ( ! [X27] : (( ! [X28] : (~sP344(X28) | ~r1(X27,X28)) ) <=> ~sP345(X27)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP345])])). 23.38/23.21 fof(f85638,plain,( 23.38/23.21 ~sP345(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f78173,f1000])). 23.38/23.21 fof(f1000,plain,( 23.38/23.21 ( ! [X26,X27] : (~sP345(X27) | ~r1(X26,X27) | sP346(X26)) )), 23.38/23.21 inference(cnf_transformation,[],[f1000_D])). 23.38/23.21 fof(f1000_D,plain,( 23.38/23.21 ( ! [X26] : (( ! [X27] : (~sP345(X27) | ~r1(X26,X27)) ) <=> ~sP346(X26)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP346])])). 23.38/23.21 fof(f78173,plain,( 23.38/23.21 ~sP346(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f71175,f1002])). 23.38/23.21 fof(f1002,plain,( 23.38/23.21 ( ! [X26,X25] : (~sP346(X26) | ~r1(X25,X26) | sP347(X25)) )), 23.38/23.21 inference(cnf_transformation,[],[f1002_D])). 23.38/23.21 fof(f1002_D,plain,( 23.38/23.21 ( ! [X25] : (( ! [X26] : (~sP346(X26) | ~r1(X25,X26)) ) <=> ~sP347(X25)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP347])])). 23.38/23.21 fof(f71175,plain,( 23.38/23.21 ~sP347(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f64648,f1004])). 23.38/23.21 fof(f1004,plain,( 23.38/23.21 ( ! [X24,X25] : (~sP347(X25) | ~r1(X24,X25) | sP348(X24)) )), 23.38/23.21 inference(cnf_transformation,[],[f1004_D])). 23.38/23.21 fof(f1004_D,plain,( 23.38/23.21 ( ! [X24] : (( ! [X25] : (~sP347(X25) | ~r1(X24,X25)) ) <=> ~sP348(X24)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP348])])). 23.38/23.21 fof(f64648,plain,( 23.38/23.21 ~sP348(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f56572,f1006])). 23.38/23.21 fof(f1006,plain,( 23.38/23.21 ( ! [X24,X23] : (~sP348(X24) | ~r1(X23,X24) | sP349(X23)) )), 23.38/23.21 inference(cnf_transformation,[],[f1006_D])). 23.38/23.21 fof(f1006_D,plain,( 23.38/23.21 ( ! [X23] : (( ! [X24] : (~sP348(X24) | ~r1(X23,X24)) ) <=> ~sP349(X23)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP349])])). 23.38/23.21 fof(f56572,plain,( 23.38/23.21 ~sP349(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f49867,f1008])). 23.38/23.21 fof(f1008,plain,( 23.38/23.21 ( ! [X23,X22] : (~sP349(X23) | ~r1(X22,X23) | sP350(X22)) )), 23.38/23.21 inference(cnf_transformation,[],[f1008_D])). 23.38/23.21 fof(f1008_D,plain,( 23.38/23.21 ( ! [X22] : (( ! [X23] : (~sP349(X23) | ~r1(X22,X23)) ) <=> ~sP350(X22)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP350])])). 23.38/23.21 fof(f49867,plain,( 23.38/23.21 ~sP350(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f44337,f1010])). 23.38/23.21 fof(f1010,plain,( 23.38/23.21 ( ! [X21,X22] : (~sP350(X22) | ~r1(X21,X22) | sP351(X21)) )), 23.38/23.21 inference(cnf_transformation,[],[f1010_D])). 23.38/23.21 fof(f1010_D,plain,( 23.38/23.21 ( ! [X21] : (( ! [X22] : (~sP350(X22) | ~r1(X21,X22)) ) <=> ~sP351(X21)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP351])])). 23.38/23.21 fof(f44337,plain,( 23.38/23.21 ~sP351(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f39806,f1012])). 23.38/23.21 fof(f1012,plain,( 23.38/23.21 ( ! [X21,X20] : (~sP351(X21) | ~r1(X20,X21) | sP352(X20)) )), 23.38/23.21 inference(cnf_transformation,[],[f1012_D])). 23.38/23.21 fof(f1012_D,plain,( 23.38/23.21 ( ! [X20] : (( ! [X21] : (~sP351(X21) | ~r1(X20,X21)) ) <=> ~sP352(X20)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP352])])). 23.38/23.21 fof(f39806,plain,( 23.38/23.21 ~sP352(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f35649,f1014])). 23.38/23.21 fof(f1014,plain,( 23.38/23.21 ( ! [X19,X20] : (~sP352(X20) | ~r1(X19,X20) | sP353(X19)) )), 23.38/23.21 inference(cnf_transformation,[],[f1014_D])). 23.38/23.21 fof(f1014_D,plain,( 23.38/23.21 ( ! [X19] : (( ! [X20] : (~sP352(X20) | ~r1(X19,X20)) ) <=> ~sP353(X19)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP353])])). 23.38/23.21 fof(f35649,plain,( 23.38/23.21 ~sP353(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f31850,f1016])). 23.38/23.21 fof(f1016,plain,( 23.38/23.21 ( ! [X19,X18] : (~sP353(X19) | ~r1(X18,X19) | sP354(X18)) )), 23.38/23.21 inference(cnf_transformation,[],[f1016_D])). 23.38/23.21 fof(f1016_D,plain,( 23.38/23.21 ( ! [X18] : (( ! [X19] : (~sP353(X19) | ~r1(X18,X19)) ) <=> ~sP354(X18)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP354])])). 23.38/23.21 fof(f31850,plain,( 23.38/23.21 ~sP354(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f28378,f1018])). 23.38/23.21 fof(f1018,plain,( 23.38/23.21 ( ! [X17,X18] : (~sP354(X18) | ~r1(X17,X18) | sP355(X17)) )), 23.38/23.21 inference(cnf_transformation,[],[f1018_D])). 23.38/23.21 fof(f1018_D,plain,( 23.38/23.21 ( ! [X17] : (( ! [X18] : (~sP354(X18) | ~r1(X17,X18)) ) <=> ~sP355(X17)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP355])])). 23.38/23.21 fof(f28378,plain,( 23.38/23.21 ~sP355(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f25247,f1019])). 23.38/23.21 fof(f1019,plain,( 23.38/23.21 ( ! [X17,X16] : (~sP355(X17) | ~sP323(X16) | ~r1(X16,X17)) )), 23.38/23.21 inference(general_splitting,[],[f1017,f1018_D])). 23.38/23.21 fof(f1017,plain,( 23.38/23.21 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP323(X16) | ~sP354(X18)) )), 23.38/23.21 inference(general_splitting,[],[f1015,f1016_D])). 23.38/23.21 fof(f1015,plain,( 23.38/23.21 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~sP323(X16) | ~sP353(X19)) )), 23.38/23.21 inference(general_splitting,[],[f1013,f1014_D])). 23.38/23.21 fof(f1013,plain,( 23.38/23.21 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~sP323(X16) | ~sP352(X20)) )), 23.38/23.21 inference(general_splitting,[],[f1011,f1012_D])). 23.38/23.21 fof(f1011,plain,( 23.38/23.21 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~sP323(X16) | ~sP351(X21)) )), 23.38/23.21 inference(general_splitting,[],[f1009,f1010_D])). 23.38/23.21 fof(f1009,plain,( 23.38/23.21 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP323(X16) | ~sP350(X22)) )), 23.38/23.21 inference(general_splitting,[],[f1007,f1008_D])). 23.38/23.21 fof(f1007,plain,( 23.38/23.21 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~sP323(X16) | ~sP349(X23)) )), 23.38/23.21 inference(general_splitting,[],[f1005,f1006_D])). 23.38/23.21 fof(f1005,plain,( 23.38/23.21 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X20,X21) | ~sP323(X16) | ~sP348(X24)) )), 23.38/23.21 inference(general_splitting,[],[f1003,f1004_D])). 23.38/23.21 fof(f1003,plain,( 23.38/23.21 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP347(X25)) )), 23.38/23.21 inference(general_splitting,[],[f1001,f1002_D])). 23.38/23.21 fof(f1001,plain,( 23.38/23.21 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP346(X26)) )), 23.38/23.21 inference(general_splitting,[],[f999,f1000_D])). 23.38/23.21 fof(f999,plain,( 23.38/23.21 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP345(X27)) )), 23.38/23.21 inference(general_splitting,[],[f997,f998_D])). 23.38/23.21 fof(f997,plain,( 23.38/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP344(X28)) )), 23.38/23.21 inference(general_splitting,[],[f995,f996_D])). 23.38/23.21 fof(f995,plain,( 23.38/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP343(X29)) )), 23.38/23.21 inference(general_splitting,[],[f993,f994_D])). 23.38/23.21 fof(f993,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP342(X30)) )), 23.38/23.21 inference(general_splitting,[],[f991,f992_D])). 23.38/23.21 fof(f991,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP341(X31)) )), 23.38/23.21 inference(general_splitting,[],[f989,f990_D])). 23.38/23.21 fof(f989,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP340(X32)) )), 23.38/23.21 inference(general_splitting,[],[f987,f988_D])). 23.38/23.21 fof(f987,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP339(X33)) )), 23.38/23.21 inference(general_splitting,[],[f985,f986_D])). 23.38/23.21 fof(f985,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP338(X34)) )), 23.38/23.21 inference(general_splitting,[],[f983,f984_D])). 23.38/23.21 fof(f983,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP337(X35)) )), 23.38/23.21 inference(general_splitting,[],[f981,f982_D])). 23.38/23.21 fof(f981,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP336(X36)) )), 23.38/23.21 inference(general_splitting,[],[f979,f980_D])). 23.38/23.21 fof(f979,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP335(X37)) )), 23.38/23.21 inference(general_splitting,[],[f977,f978_D])). 23.38/23.21 fof(f977,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP334(X38)) )), 23.38/23.21 inference(general_splitting,[],[f975,f976_D])). 23.38/23.21 fof(f975,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP333(X39)) )), 23.38/23.21 inference(general_splitting,[],[f973,f974_D])). 23.38/23.21 fof(f973,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP332(X40)) )), 23.38/23.21 inference(general_splitting,[],[f971,f972_D])). 23.38/23.21 fof(f971,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP331(X41)) )), 23.38/23.21 inference(general_splitting,[],[f969,f970_D])). 23.38/23.21 fof(f969,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP330(X42)) )), 23.38/23.21 inference(general_splitting,[],[f967,f968_D])). 23.38/23.21 fof(f967,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP329(X43)) )), 23.38/23.21 inference(general_splitting,[],[f965,f966_D])). 23.38/23.21 fof(f965,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP328(X44)) )), 23.38/23.21 inference(general_splitting,[],[f963,f964_D])). 23.38/23.21 fof(f963,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP327(X45)) )), 23.38/23.21 inference(general_splitting,[],[f961,f962_D])). 23.38/23.21 fof(f961,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP326(X46)) )), 23.38/23.21 inference(general_splitting,[],[f959,f960_D])). 23.38/23.21 fof(f959,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP325(X47)) )), 23.38/23.21 inference(general_splitting,[],[f957,f958_D])). 23.38/23.21 fof(f957,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP323(X16) | ~sP324(X48)) )), 23.38/23.21 inference(general_splitting,[],[f955,f956_D])). 23.38/23.21 fof(f955,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X49,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~sP314(X49) | ~sP323(X16)) )), 23.38/23.21 inference(general_splitting,[],[f953,f954_D])). 23.38/23.21 fof(f954,plain,( 23.38/23.21 ( ! [X15,X16] : (sP323(X16) | ~sP322(X15) | ~r1(X15,X16)) )), 23.38/23.21 inference(cnf_transformation,[],[f954_D])). 23.38/23.21 fof(f954_D,plain,( 23.38/23.21 ( ! [X16] : (( ! [X15] : (~sP322(X15) | ~r1(X15,X16)) ) <=> ~sP323(X16)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP323])])). 23.38/23.21 fof(f953,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~sP314(X49) | ~sP322(X15)) )), 23.38/23.21 inference(general_splitting,[],[f951,f952_D])). 23.38/23.21 fof(f952,plain,( 23.38/23.21 ( ! [X14,X15] : (sP322(X15) | ~sP321(X14) | ~r1(X14,X15)) )), 23.38/23.21 inference(cnf_transformation,[],[f952_D])). 23.38/23.21 fof(f952_D,plain,( 23.38/23.21 ( ! [X15] : (( ! [X14] : (~sP321(X14) | ~r1(X14,X15)) ) <=> ~sP322(X15)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP322])])). 23.38/23.21 fof(f951,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~sP314(X49) | ~sP321(X14)) )), 23.38/23.21 inference(general_splitting,[],[f949,f950_D])). 23.38/23.21 fof(f950,plain,( 23.38/23.21 ( ! [X14,X13] : (sP321(X14) | ~sP320(X13) | ~r1(X13,X14)) )), 23.38/23.21 inference(cnf_transformation,[],[f950_D])). 23.38/23.21 fof(f950_D,plain,( 23.38/23.21 ( ! [X14] : (( ! [X13] : (~sP320(X13) | ~r1(X13,X14)) ) <=> ~sP321(X14)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP321])])). 23.38/23.21 fof(f949,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~sP314(X49) | ~sP320(X13)) )), 23.38/23.21 inference(general_splitting,[],[f947,f948_D])). 23.38/23.21 fof(f948,plain,( 23.38/23.21 ( ! [X12,X13] : (sP320(X13) | ~sP319(X12) | ~r1(X12,X13)) )), 23.38/23.21 inference(cnf_transformation,[],[f948_D])). 23.38/23.21 fof(f948_D,plain,( 23.38/23.21 ( ! [X13] : (( ! [X12] : (~sP319(X12) | ~r1(X12,X13)) ) <=> ~sP320(X13)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP320])])). 23.38/23.21 fof(f947,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~sP314(X49) | ~sP319(X12)) )), 23.38/23.21 inference(general_splitting,[],[f945,f946_D])). 23.38/23.21 fof(f946,plain,( 23.38/23.21 ( ! [X12,X11] : (sP319(X12) | ~sP318(X11) | ~r1(X11,X12)) )), 23.38/23.21 inference(cnf_transformation,[],[f946_D])). 23.38/23.21 fof(f946_D,plain,( 23.38/23.21 ( ! [X12] : (( ! [X11] : (~sP318(X11) | ~r1(X11,X12)) ) <=> ~sP319(X12)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP319])])). 23.38/23.21 fof(f945,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~sP314(X49) | ~sP318(X11)) )), 23.38/23.21 inference(general_splitting,[],[f943,f944_D])). 23.38/23.21 fof(f944,plain,( 23.38/23.21 ( ! [X10,X11] : (sP318(X11) | ~sP317(X10) | ~r1(X10,X11)) )), 23.38/23.21 inference(cnf_transformation,[],[f944_D])). 23.38/23.21 fof(f944_D,plain,( 23.38/23.21 ( ! [X11] : (( ! [X10] : (~sP317(X10) | ~r1(X10,X11)) ) <=> ~sP318(X11)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP318])])). 23.38/23.21 fof(f943,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~sP314(X49) | ~sP317(X10)) )), 23.38/23.21 inference(general_splitting,[],[f941,f942_D])). 23.38/23.21 fof(f942,plain,( 23.38/23.21 ( ! [X10,X9] : (sP317(X10) | ~sP316(X9) | ~r1(X9,X10)) )), 23.38/23.21 inference(cnf_transformation,[],[f942_D])). 23.38/23.21 fof(f942_D,plain,( 23.38/23.21 ( ! [X10] : (( ! [X9] : (~sP316(X9) | ~r1(X9,X10)) ) <=> ~sP317(X10)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP317])])). 23.38/23.21 fof(f941,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~sP314(X49) | ~sP316(X9)) )), 23.38/23.21 inference(general_splitting,[],[f939,f940_D])). 23.38/23.21 fof(f940,plain,( 23.38/23.21 ( ! [X8,X9] : (sP316(X9) | ~sP315(X8) | ~r1(X8,X9)) )), 23.38/23.21 inference(cnf_transformation,[],[f940_D])). 23.38/23.21 fof(f940_D,plain,( 23.38/23.21 ( ! [X9] : (( ! [X8] : (~sP315(X8) | ~r1(X8,X9)) ) <=> ~sP316(X9)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP316])])). 23.38/23.21 fof(f939,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~sP314(X49) | ~sP315(X8)) )), 23.38/23.21 inference(general_splitting,[],[f937,f938_D])). 23.38/23.21 fof(f938,plain,( 23.38/23.21 ( ! [X8,X7] : (sP315(X8) | ~sP311(X7) | ~r1(X7,X8)) )), 23.38/23.21 inference(cnf_transformation,[],[f938_D])). 23.38/23.21 fof(f938_D,plain,( 23.38/23.21 ( ! [X8] : (( ! [X7] : (~sP311(X7) | ~r1(X7,X8)) ) <=> ~sP315(X8)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP315])])). 23.38/23.21 fof(f937,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP311(X7) | ~sP314(X49)) )), 23.38/23.21 inference(general_splitting,[],[f935,f936_D])). 23.38/23.21 fof(f935,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP311(X7) | ~sP313(X50)) )), 23.38/23.21 inference(general_splitting,[],[f933,f934_D])). 23.38/23.21 fof(f933,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X50,X51) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP311(X7) | ~sP312(X51)) )), 23.38/23.21 inference(general_splitting,[],[f931,f932_D])). 23.38/23.21 fof(f931,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X51,X52) | ~p49(X52) | ~p48(X52) | ~r1(X50,X51) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP311(X7)) )), 23.38/23.21 inference(general_splitting,[],[f929,f930_D])). 23.38/23.21 fof(f930,plain,( 23.38/23.21 ( ! [X6,X7] : (sP311(X7) | ~sP310(X6) | ~r1(X6,X7)) )), 23.38/23.21 inference(cnf_transformation,[],[f930_D])). 23.38/23.21 fof(f930_D,plain,( 23.38/23.21 ( ! [X7] : (( ! [X6] : (~sP310(X6) | ~r1(X6,X7)) ) <=> ~sP311(X7)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP311])])). 23.38/23.21 fof(f929,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X51,X52) | ~p49(X52) | ~p48(X52) | ~r1(X50,X51) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP310(X6)) )), 23.38/23.21 inference(general_splitting,[],[f927,f928_D])). 23.38/23.21 fof(f928,plain,( 23.38/23.21 ( ! [X6,X5] : (sP310(X6) | ~sP309(X5) | ~r1(X5,X6)) )), 23.38/23.21 inference(cnf_transformation,[],[f928_D])). 23.38/23.21 fof(f928_D,plain,( 23.38/23.21 ( ! [X6] : (( ! [X5] : (~sP309(X5) | ~r1(X5,X6)) ) <=> ~sP310(X6)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP310])])). 23.38/23.21 fof(f927,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X51,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X52,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X51,X52) | ~p49(X52) | ~p48(X52) | ~r1(X50,X51) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP309(X5)) )), 23.38/23.21 inference(general_splitting,[],[f925,f926_D])). 23.38/23.21 fof(f926,plain,( 23.38/23.21 ( ! [X4,X5] : (sP309(X5) | ~sP308(X4) | ~r1(X4,X5)) )), 23.38/23.21 inference(cnf_transformation,[],[f926_D])). 23.38/23.21 fof(f926_D,plain,( 23.38/23.21 ( ! [X5] : (( ! [X4] : (~sP308(X4) | ~r1(X4,X5)) ) <=> ~sP309(X5)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP309])])). 23.38/23.21 fof(f925,plain,( 23.38/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X51,X52) | ~p49(X52) | ~p48(X52) | ~r1(X50,X51) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP308(X4)) )), 23.38/23.21 inference(general_splitting,[],[f923,f924_D])). 23.38/23.21 fof(f924,plain,( 23.38/23.21 ( ! [X4,X3] : (sP308(X4) | ~sP307(X3) | ~r1(X3,X4)) )), 23.38/23.21 inference(cnf_transformation,[],[f924_D])). 23.38/23.21 fof(f924_D,plain,( 23.38/23.21 ( ! [X4] : (( ! [X3] : (~sP307(X3) | ~r1(X3,X4)) ) <=> ~sP308(X4)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP308])])). 23.38/23.21 fof(f923,plain,( 23.38/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X51,X52) | ~p49(X52) | ~p48(X52) | ~r1(X50,X51) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP307(X3)) )), 23.38/23.21 inference(general_splitting,[],[f921,f922_D])). 23.38/23.21 fof(f922,plain,( 23.38/23.21 ( ! [X3,X1] : (sP307(X3) | ~sP306(X1) | ~r1(X1,X3)) )), 23.38/23.21 inference(cnf_transformation,[],[f922_D])). 23.38/23.21 fof(f922_D,plain,( 23.38/23.21 ( ! [X3] : (( ! [X1] : (~sP306(X1) | ~r1(X1,X3)) ) <=> ~sP307(X3)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP307])])). 23.38/23.21 fof(f921,plain,( 23.38/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X51,X52) | ~p49(X52) | ~p48(X52) | ~r1(X50,X51) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP306(X1)) )), 23.38/23.21 inference(general_splitting,[],[f367,f920_D])). 23.38/23.21 fof(f920,plain,( 23.38/23.21 ( ! [X0,X1] : (sP306(X1) | ~sP46(X0) | ~r1(X0,X1)) )), 23.38/23.21 inference(cnf_transformation,[],[f920_D])). 23.38/23.21 fof(f920_D,plain,( 23.38/23.21 ( ! [X1] : (( ! [X0] : (~sP46(X0) | ~r1(X0,X1)) ) <=> ~sP306(X1)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP306])])). 23.38/23.21 fof(f367,plain,( 23.38/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X0,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X52,X31,X7,X36,X15,X44,X20,X49] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X46,X47) | ~r1(X51,X52) | ~p49(X52) | ~p48(X52) | ~r1(X50,X51) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X3,X4) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP46(X0)) )), 23.38/23.21 inference(cnf_transformation,[],[f66])). 23.38/23.21 fof(f25247,plain,( 23.38/23.21 sP323(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f22426,f954])). 23.38/23.21 fof(f22426,plain,( 23.38/23.21 sP322(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f19899,f952])). 23.38/23.21 fof(f19899,plain,( 23.38/23.21 sP321(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f17635,f950])). 23.38/23.21 fof(f17635,plain,( 23.38/23.21 sP320(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f15226,f948])). 23.38/23.21 fof(f15226,plain,( 23.38/23.21 sP319(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f13177,f946])). 23.38/23.21 fof(f13177,plain,( 23.38/23.21 sP318(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f11460,f944])). 23.38/23.21 fof(f11460,plain,( 23.38/23.21 sP317(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f10310,f942])). 23.38/23.21 fof(f10310,plain,( 23.38/23.21 sP316(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f9346,f940])). 23.38/23.21 fof(f9346,plain,( 23.38/23.21 sP315(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f8375,f938])). 23.38/23.21 fof(f8375,plain,( 23.38/23.21 sP311(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f7772,f930])). 23.38/23.21 fof(f7772,plain,( 23.38/23.21 sP310(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f7303,f928])). 23.38/23.21 fof(f7303,plain,( 23.38/23.21 sP309(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f6952,f926])). 23.38/23.21 fof(f6952,plain,( 23.38/23.21 sP308(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f6703,f924])). 23.38/23.21 fof(f6703,plain,( 23.38/23.21 sP307(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f6540,f922])). 23.38/23.21 fof(f6540,plain,( 23.38/23.21 sP306(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f6448,f920])). 23.38/23.21 fof(f472402,plain,( 23.38/23.21 ~sP406(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f449033,f1126])). 23.38/23.21 fof(f1126,plain,( 23.38/23.21 ( ! [X50,X49] : (~sP406(X50) | ~r1(X49,X50) | sP409(X49)) )), 23.38/23.21 inference(cnf_transformation,[],[f1126_D])). 23.38/23.21 fof(f1126_D,plain,( 23.38/23.21 ( ! [X49] : (( ! [X50] : (~sP406(X50) | ~r1(X49,X50)) ) <=> ~sP409(X49)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP409])])). 23.38/23.21 fof(f449033,plain,( 23.38/23.21 ~sP409(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f425883,f1154])). 23.38/23.21 fof(f1154,plain,( 23.38/23.21 ( ! [X48,X49] : (~sP409(X49) | ~r1(X48,X49) | sP423(X48)) )), 23.38/23.21 inference(cnf_transformation,[],[f1154_D])). 23.38/23.21 fof(f1154_D,plain,( 23.38/23.21 ( ! [X48] : (( ! [X49] : (~sP409(X49) | ~r1(X48,X49)) ) <=> ~sP423(X48)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP423])])). 23.38/23.21 fof(f425883,plain,( 23.38/23.21 ~sP423(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f403049,f1156])). 23.38/23.21 fof(f1156,plain,( 23.38/23.21 ( ! [X47,X48] : (~sP423(X48) | ~r1(X47,X48) | sP424(X47)) )), 23.38/23.21 inference(cnf_transformation,[],[f1156_D])). 23.38/23.21 fof(f1156_D,plain,( 23.38/23.21 ( ! [X47] : (( ! [X48] : (~sP423(X48) | ~r1(X47,X48)) ) <=> ~sP424(X47)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP424])])). 23.38/23.21 fof(f403049,plain,( 23.38/23.21 ~sP424(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f378364,f1158])). 23.38/23.21 fof(f1158,plain,( 23.38/23.21 ( ! [X47,X46] : (~sP424(X47) | ~r1(X46,X47) | sP425(X46)) )), 23.38/23.21 inference(cnf_transformation,[],[f1158_D])). 23.38/23.21 fof(f1158_D,plain,( 23.38/23.21 ( ! [X46] : (( ! [X47] : (~sP424(X47) | ~r1(X46,X47)) ) <=> ~sP425(X46)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP425])])). 23.38/23.21 fof(f378364,plain,( 23.38/23.21 ~sP425(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f342884,f1160])). 23.38/23.21 fof(f1160,plain,( 23.38/23.21 ( ! [X45,X46] : (~sP425(X46) | ~r1(X45,X46) | sP426(X45)) )), 23.38/23.21 inference(cnf_transformation,[],[f1160_D])). 23.38/23.21 fof(f1160_D,plain,( 23.38/23.21 ( ! [X45] : (( ! [X46] : (~sP425(X46) | ~r1(X45,X46)) ) <=> ~sP426(X45)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP426])])). 23.38/23.21 fof(f342884,plain,( 23.38/23.21 ~sP426(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f320749,f1162])). 23.38/23.21 fof(f1162,plain,( 23.38/23.21 ( ! [X45,X44] : (~sP426(X45) | ~r1(X44,X45) | sP427(X44)) )), 23.38/23.21 inference(cnf_transformation,[],[f1162_D])). 23.38/23.21 fof(f1162_D,plain,( 23.38/23.21 ( ! [X44] : (( ! [X45] : (~sP426(X45) | ~r1(X44,X45)) ) <=> ~sP427(X44)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP427])])). 23.38/23.21 fof(f320749,plain,( 23.38/23.21 ~sP427(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f301858,f1164])). 23.38/23.21 fof(f1164,plain,( 23.38/23.21 ( ! [X43,X44] : (~sP427(X44) | ~r1(X43,X44) | sP428(X43)) )), 23.38/23.21 inference(cnf_transformation,[],[f1164_D])). 23.38/23.21 fof(f1164_D,plain,( 23.38/23.21 ( ! [X43] : (( ! [X44] : (~sP427(X44) | ~r1(X43,X44)) ) <=> ~sP428(X43)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP428])])). 23.38/23.21 fof(f301858,plain,( 23.38/23.21 ~sP428(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f283737,f1166])). 23.38/23.21 fof(f1166,plain,( 23.38/23.21 ( ! [X43,X42] : (~sP428(X43) | ~r1(X42,X43) | sP429(X42)) )), 23.38/23.21 inference(cnf_transformation,[],[f1166_D])). 23.38/23.21 fof(f1166_D,plain,( 23.38/23.21 ( ! [X42] : (( ! [X43] : (~sP428(X43) | ~r1(X42,X43)) ) <=> ~sP429(X42)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP429])])). 23.38/23.21 fof(f283737,plain,( 23.38/23.21 ~sP429(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f266378,f1168])). 23.38/23.21 fof(f1168,plain,( 23.38/23.21 ( ! [X41,X42] : (~sP429(X42) | ~r1(X41,X42) | sP430(X41)) )), 23.38/23.21 inference(cnf_transformation,[],[f1168_D])). 23.38/23.21 fof(f1168_D,plain,( 23.38/23.21 ( ! [X41] : (( ! [X42] : (~sP429(X42) | ~r1(X41,X42)) ) <=> ~sP430(X41)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP430])])). 23.38/23.21 fof(f266378,plain,( 23.38/23.21 ~sP430(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f249750,f1170])). 23.38/23.21 fof(f1170,plain,( 23.38/23.21 ( ! [X41,X40] : (~sP430(X41) | ~r1(X40,X41) | sP431(X40)) )), 23.38/23.21 inference(cnf_transformation,[],[f1170_D])). 23.38/23.21 fof(f1170_D,plain,( 23.38/23.21 ( ! [X40] : (( ! [X41] : (~sP430(X41) | ~r1(X40,X41)) ) <=> ~sP431(X40)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP431])])). 23.38/23.21 fof(f249750,plain,( 23.38/23.21 ~sP431(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f233852,f1172])). 23.38/23.21 fof(f1172,plain,( 23.38/23.21 ( ! [X39,X40] : (~sP431(X40) | ~r1(X39,X40) | sP432(X39)) )), 23.38/23.21 inference(cnf_transformation,[],[f1172_D])). 23.38/23.21 fof(f1172_D,plain,( 23.38/23.21 ( ! [X39] : (( ! [X40] : (~sP431(X40) | ~r1(X39,X40)) ) <=> ~sP432(X39)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP432])])). 23.38/23.21 fof(f233852,plain,( 23.38/23.21 ~sP432(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f218652,f1174])). 23.38/23.21 fof(f1174,plain,( 23.38/23.21 ( ! [X39,X38] : (~sP432(X39) | ~r1(X38,X39) | sP433(X38)) )), 23.38/23.21 inference(cnf_transformation,[],[f1174_D])). 23.38/23.21 fof(f1174_D,plain,( 23.38/23.21 ( ! [X38] : (( ! [X39] : (~sP432(X39) | ~r1(X38,X39)) ) <=> ~sP433(X38)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP433])])). 23.38/23.21 fof(f218652,plain,( 23.38/23.21 ~sP433(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f204147,f1176])). 23.38/23.21 fof(f1176,plain,( 23.38/23.21 ( ! [X37,X38] : (~sP433(X38) | ~r1(X37,X38) | sP434(X37)) )), 23.38/23.21 inference(cnf_transformation,[],[f1176_D])). 23.38/23.21 fof(f1176_D,plain,( 23.38/23.21 ( ! [X37] : (( ! [X38] : (~sP433(X38) | ~r1(X37,X38)) ) <=> ~sP434(X37)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP434])])). 23.38/23.21 fof(f204147,plain,( 23.38/23.21 ~sP434(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f190315,f1178])). 23.38/23.21 fof(f1178,plain,( 23.38/23.21 ( ! [X37,X36] : (~sP434(X37) | ~r1(X36,X37) | sP435(X36)) )), 23.38/23.21 inference(cnf_transformation,[],[f1178_D])). 23.38/23.21 fof(f1178_D,plain,( 23.38/23.21 ( ! [X36] : (( ! [X37] : (~sP434(X37) | ~r1(X36,X37)) ) <=> ~sP435(X36)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP435])])). 23.38/23.21 fof(f190315,plain,( 23.38/23.21 ~sP435(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f177144,f1180])). 23.38/23.21 fof(f1180,plain,( 23.38/23.21 ( ! [X35,X36] : (~sP435(X36) | ~r1(X35,X36) | sP436(X35)) )), 23.38/23.21 inference(cnf_transformation,[],[f1180_D])). 23.38/23.21 fof(f1180_D,plain,( 23.38/23.21 ( ! [X35] : (( ! [X36] : (~sP435(X36) | ~r1(X35,X36)) ) <=> ~sP436(X35)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP436])])). 23.38/23.21 fof(f177144,plain,( 23.38/23.21 ~sP436(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f164617,f1182])). 23.38/23.21 fof(f1182,plain,( 23.38/23.21 ( ! [X35,X34] : (~sP436(X35) | ~r1(X34,X35) | sP437(X34)) )), 23.38/23.21 inference(cnf_transformation,[],[f1182_D])). 23.38/23.21 fof(f1182_D,plain,( 23.38/23.21 ( ! [X34] : (( ! [X35] : (~sP436(X35) | ~r1(X34,X35)) ) <=> ~sP437(X34)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP437])])). 23.38/23.21 fof(f164617,plain,( 23.38/23.21 ~sP437(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f152716,f1184])). 23.38/23.21 fof(f1184,plain,( 23.38/23.21 ( ! [X33,X34] : (~sP437(X34) | ~r1(X33,X34) | sP438(X33)) )), 23.38/23.21 inference(cnf_transformation,[],[f1184_D])). 23.38/23.21 fof(f1184_D,plain,( 23.38/23.21 ( ! [X33] : (( ! [X34] : (~sP437(X34) | ~r1(X33,X34)) ) <=> ~sP438(X33)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP438])])). 23.38/23.21 fof(f152716,plain,( 23.38/23.21 ~sP438(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f141425,f1186])). 23.38/23.21 fof(f1186,plain,( 23.38/23.21 ( ! [X33,X32] : (~sP438(X33) | ~r1(X32,X33) | sP439(X32)) )), 23.38/23.21 inference(cnf_transformation,[],[f1186_D])). 23.38/23.21 fof(f1186_D,plain,( 23.38/23.21 ( ! [X32] : (( ! [X33] : (~sP438(X33) | ~r1(X32,X33)) ) <=> ~sP439(X32)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP439])])). 23.38/23.21 fof(f141425,plain,( 23.38/23.21 ~sP439(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f130727,f1188])). 23.38/23.21 fof(f1188,plain,( 23.38/23.21 ( ! [X31,X32] : (~sP439(X32) | ~r1(X31,X32) | sP440(X31)) )), 23.38/23.21 inference(cnf_transformation,[],[f1188_D])). 23.38/23.21 fof(f1188_D,plain,( 23.38/23.21 ( ! [X31] : (( ! [X32] : (~sP439(X32) | ~r1(X31,X32)) ) <=> ~sP440(X31)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP440])])). 23.38/23.21 fof(f130727,plain,( 23.38/23.21 ~sP440(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f120609,f1190])). 23.38/23.21 fof(f1190,plain,( 23.38/23.21 ( ! [X30,X31] : (~sP440(X31) | ~r1(X30,X31) | sP441(X30)) )), 23.38/23.21 inference(cnf_transformation,[],[f1190_D])). 23.38/23.21 fof(f1190_D,plain,( 23.38/23.21 ( ! [X30] : (( ! [X31] : (~sP440(X31) | ~r1(X30,X31)) ) <=> ~sP441(X30)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP441])])). 23.38/23.21 fof(f120609,plain,( 23.38/23.21 ~sP441(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f111045,f1192])). 23.38/23.21 fof(f1192,plain,( 23.38/23.21 ( ! [X30,X29] : (~sP441(X30) | ~r1(X29,X30) | sP442(X29)) )), 23.38/23.21 inference(cnf_transformation,[],[f1192_D])). 23.38/23.21 fof(f1192_D,plain,( 23.38/23.21 ( ! [X29] : (( ! [X30] : (~sP441(X30) | ~r1(X29,X30)) ) <=> ~sP442(X29)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP442])])). 23.38/23.21 fof(f111045,plain,( 23.38/23.21 ~sP442(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f102033,f1194])). 23.38/23.21 fof(f1194,plain,( 23.38/23.21 ( ! [X28,X29] : (~sP442(X29) | ~r1(X28,X29) | sP443(X28)) )), 23.38/23.21 inference(cnf_transformation,[],[f1194_D])). 23.38/23.21 fof(f1194_D,plain,( 23.38/23.21 ( ! [X28] : (( ! [X29] : (~sP442(X29) | ~r1(X28,X29)) ) <=> ~sP443(X28)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP443])])). 23.38/23.21 fof(f102033,plain,( 23.38/23.21 ~sP443(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f93552,f1196])). 23.38/23.21 fof(f1196,plain,( 23.38/23.21 ( ! [X28,X27] : (~sP443(X28) | ~r1(X27,X28) | sP444(X27)) )), 23.38/23.21 inference(cnf_transformation,[],[f1196_D])). 23.38/23.21 fof(f1196_D,plain,( 23.38/23.21 ( ! [X27] : (( ! [X28] : (~sP443(X28) | ~r1(X27,X28)) ) <=> ~sP444(X27)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP444])])). 23.38/23.21 fof(f93552,plain,( 23.38/23.21 ~sP444(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f85584,f1198])). 23.38/23.21 fof(f1198,plain,( 23.38/23.21 ( ! [X26,X27] : (~sP444(X27) | ~r1(X26,X27) | sP445(X26)) )), 23.38/23.21 inference(cnf_transformation,[],[f1198_D])). 23.38/23.21 fof(f1198_D,plain,( 23.38/23.21 ( ! [X26] : (( ! [X27] : (~sP444(X27) | ~r1(X26,X27)) ) <=> ~sP445(X26)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP445])])). 23.38/23.21 fof(f85584,plain,( 23.38/23.21 ~sP445(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f78121,f1200])). 23.38/23.21 fof(f1200,plain,( 23.38/23.21 ( ! [X26,X25] : (~sP445(X26) | ~r1(X25,X26) | sP446(X25)) )), 23.38/23.21 inference(cnf_transformation,[],[f1200_D])). 23.38/23.21 fof(f1200_D,plain,( 23.38/23.21 ( ! [X25] : (( ! [X26] : (~sP445(X26) | ~r1(X25,X26)) ) <=> ~sP446(X25)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP446])])). 23.38/23.21 fof(f78121,plain,( 23.38/23.21 ~sP446(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f71125,f1202])). 23.38/23.21 fof(f1202,plain,( 23.38/23.21 ( ! [X24,X25] : (~sP446(X25) | ~r1(X24,X25) | sP447(X24)) )), 23.38/23.21 inference(cnf_transformation,[],[f1202_D])). 23.38/23.21 fof(f1202_D,plain,( 23.38/23.21 ( ! [X24] : (( ! [X25] : (~sP446(X25) | ~r1(X24,X25)) ) <=> ~sP447(X24)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP447])])). 23.38/23.21 fof(f71125,plain,( 23.38/23.21 ~sP447(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f64600,f1204])). 23.38/23.21 fof(f1204,plain,( 23.38/23.21 ( ! [X24,X23] : (~sP447(X24) | ~r1(X23,X24) | sP448(X23)) )), 23.38/23.21 inference(cnf_transformation,[],[f1204_D])). 23.38/23.21 fof(f1204_D,plain,( 23.38/23.21 ( ! [X23] : (( ! [X24] : (~sP447(X24) | ~r1(X23,X24)) ) <=> ~sP448(X23)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP448])])). 23.38/23.21 fof(f64600,plain,( 23.38/23.21 ~sP448(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f56526,f1206])). 23.38/23.21 fof(f1206,plain,( 23.38/23.21 ( ! [X23,X22] : (~sP448(X23) | ~r1(X22,X23) | sP449(X22)) )), 23.38/23.21 inference(cnf_transformation,[],[f1206_D])). 23.38/23.21 fof(f1206_D,plain,( 23.38/23.21 ( ! [X22] : (( ! [X23] : (~sP448(X23) | ~r1(X22,X23)) ) <=> ~sP449(X22)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP449])])). 23.38/23.21 fof(f56526,plain,( 23.38/23.21 ~sP449(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f49823,f1208])). 23.38/23.21 fof(f1208,plain,( 23.38/23.21 ( ! [X21,X22] : (~sP449(X22) | ~r1(X21,X22) | sP450(X21)) )), 23.38/23.21 inference(cnf_transformation,[],[f1208_D])). 23.38/23.21 fof(f1208_D,plain,( 23.38/23.21 ( ! [X21] : (( ! [X22] : (~sP449(X22) | ~r1(X21,X22)) ) <=> ~sP450(X21)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP450])])). 23.38/23.21 fof(f49823,plain,( 23.38/23.21 ~sP450(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f44295,f1210])). 23.38/23.21 fof(f1210,plain,( 23.38/23.21 ( ! [X21,X20] : (~sP450(X21) | ~r1(X20,X21) | sP451(X20)) )), 23.38/23.21 inference(cnf_transformation,[],[f1210_D])). 23.38/23.21 fof(f1210_D,plain,( 23.38/23.21 ( ! [X20] : (( ! [X21] : (~sP450(X21) | ~r1(X20,X21)) ) <=> ~sP451(X20)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP451])])). 23.38/23.21 fof(f44295,plain,( 23.38/23.21 ~sP451(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f39766,f1212])). 23.38/23.21 fof(f1212,plain,( 23.38/23.21 ( ! [X19,X20] : (~sP451(X20) | ~r1(X19,X20) | sP452(X19)) )), 23.38/23.21 inference(cnf_transformation,[],[f1212_D])). 23.38/23.21 fof(f1212_D,plain,( 23.38/23.21 ( ! [X19] : (( ! [X20] : (~sP451(X20) | ~r1(X19,X20)) ) <=> ~sP452(X19)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP452])])). 23.38/23.21 fof(f39766,plain,( 23.38/23.21 ~sP452(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f35611,f1214])). 23.38/23.21 fof(f1214,plain,( 23.38/23.21 ( ! [X19,X18] : (~sP452(X19) | ~r1(X18,X19) | sP453(X18)) )), 23.38/23.21 inference(cnf_transformation,[],[f1214_D])). 23.38/23.21 fof(f1214_D,plain,( 23.38/23.21 ( ! [X18] : (( ! [X19] : (~sP452(X19) | ~r1(X18,X19)) ) <=> ~sP453(X18)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP453])])). 23.38/23.21 fof(f35611,plain,( 23.38/23.21 ~sP453(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f31814,f1216])). 23.38/23.21 fof(f1216,plain,( 23.38/23.21 ( ! [X17,X18] : (~sP453(X18) | ~r1(X17,X18) | sP454(X17)) )), 23.38/23.21 inference(cnf_transformation,[],[f1216_D])). 23.38/23.21 fof(f1216_D,plain,( 23.38/23.21 ( ! [X17] : (( ! [X18] : (~sP453(X18) | ~r1(X17,X18)) ) <=> ~sP454(X17)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP454])])). 23.38/23.21 fof(f31814,plain,( 23.38/23.21 ~sP454(sK101)), 23.38/23.21 inference(unit_resulting_resolution,[],[f715,f28344,f1217])). 23.38/23.21 fof(f1217,plain,( 23.38/23.21 ( ! [X17,X16] : (~sP454(X17) | ~sP422(X16) | ~r1(X16,X17)) )), 23.38/23.21 inference(general_splitting,[],[f1215,f1216_D])). 23.38/23.21 fof(f1215,plain,( 23.38/23.21 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP453(X18)) )), 23.38/23.21 inference(general_splitting,[],[f1213,f1214_D])). 23.38/23.21 fof(f1213,plain,( 23.38/23.21 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP452(X19)) )), 23.38/23.21 inference(general_splitting,[],[f1211,f1212_D])). 23.38/23.21 fof(f1211,plain,( 23.38/23.21 ( ! [X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP451(X20)) )), 23.38/23.21 inference(general_splitting,[],[f1209,f1210_D])). 23.38/23.21 fof(f1209,plain,( 23.38/23.21 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP450(X21)) )), 23.38/23.21 inference(general_splitting,[],[f1207,f1208_D])). 23.38/23.21 fof(f1207,plain,( 23.38/23.21 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP449(X22)) )), 23.38/23.21 inference(general_splitting,[],[f1205,f1206_D])). 23.38/23.21 fof(f1205,plain,( 23.38/23.21 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP448(X23)) )), 23.38/23.21 inference(general_splitting,[],[f1203,f1204_D])). 23.38/23.21 fof(f1203,plain,( 23.38/23.21 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP447(X24)) )), 23.38/23.21 inference(general_splitting,[],[f1201,f1202_D])). 23.38/23.21 fof(f1201,plain,( 23.38/23.21 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP446(X25)) )), 23.38/23.21 inference(general_splitting,[],[f1199,f1200_D])). 23.38/23.21 fof(f1199,plain,( 23.38/23.21 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP445(X26)) )), 23.38/23.21 inference(general_splitting,[],[f1197,f1198_D])). 23.38/23.21 fof(f1197,plain,( 23.38/23.21 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP444(X27)) )), 23.38/23.21 inference(general_splitting,[],[f1195,f1196_D])). 23.38/23.21 fof(f1195,plain,( 23.38/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP443(X28)) )), 23.38/23.21 inference(general_splitting,[],[f1193,f1194_D])). 23.38/23.21 fof(f1193,plain,( 23.38/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP442(X29)) )), 23.38/23.21 inference(general_splitting,[],[f1191,f1192_D])). 23.38/23.21 fof(f1191,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP441(X30)) )), 23.38/23.21 inference(general_splitting,[],[f1189,f1190_D])). 23.38/23.21 fof(f1189,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP440(X31)) )), 23.38/23.21 inference(general_splitting,[],[f1187,f1188_D])). 23.38/23.21 fof(f1187,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP439(X32)) )), 23.38/23.21 inference(general_splitting,[],[f1185,f1186_D])). 23.38/23.21 fof(f1185,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP438(X33)) )), 23.38/23.21 inference(general_splitting,[],[f1183,f1184_D])). 23.38/23.21 fof(f1183,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP437(X34)) )), 23.38/23.21 inference(general_splitting,[],[f1181,f1182_D])). 23.38/23.21 fof(f1181,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP436(X35)) )), 23.38/23.21 inference(general_splitting,[],[f1179,f1180_D])). 23.38/23.21 fof(f1179,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP435(X36)) )), 23.38/23.21 inference(general_splitting,[],[f1177,f1178_D])). 23.38/23.21 fof(f1177,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP434(X37)) )), 23.38/23.21 inference(general_splitting,[],[f1175,f1176_D])). 23.38/23.21 fof(f1175,plain,( 23.38/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP433(X38)) )), 23.38/23.21 inference(general_splitting,[],[f1173,f1174_D])). 23.38/23.21 fof(f1173,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP432(X39)) )), 23.38/23.21 inference(general_splitting,[],[f1171,f1172_D])). 23.38/23.21 fof(f1171,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP431(X40)) )), 23.38/23.21 inference(general_splitting,[],[f1169,f1170_D])). 23.38/23.21 fof(f1169,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP430(X41)) )), 23.38/23.21 inference(general_splitting,[],[f1167,f1168_D])). 23.38/23.21 fof(f1167,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP429(X42)) )), 23.38/23.21 inference(general_splitting,[],[f1165,f1166_D])). 23.38/23.21 fof(f1165,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP428(X43)) )), 23.38/23.21 inference(general_splitting,[],[f1163,f1164_D])). 23.38/23.21 fof(f1163,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP427(X44)) )), 23.38/23.21 inference(general_splitting,[],[f1161,f1162_D])). 23.38/23.21 fof(f1161,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP426(X45)) )), 23.38/23.21 inference(general_splitting,[],[f1159,f1160_D])). 23.38/23.21 fof(f1159,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP425(X46)) )), 23.38/23.21 inference(general_splitting,[],[f1157,f1158_D])). 23.38/23.21 fof(f1157,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP424(X47)) )), 23.38/23.21 inference(general_splitting,[],[f1155,f1156_D])). 23.38/23.21 fof(f1155,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP422(X16) | ~sP423(X48)) )), 23.38/23.21 inference(general_splitting,[],[f1153,f1154_D])). 23.38/23.21 fof(f1153,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X49,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP409(X49) | ~sP422(X16)) )), 23.38/23.21 inference(general_splitting,[],[f1151,f1152_D])). 23.38/23.21 fof(f1152,plain,( 23.38/23.21 ( ! [X15,X16] : (sP422(X16) | ~sP421(X15) | ~r1(X15,X16)) )), 23.38/23.21 inference(cnf_transformation,[],[f1152_D])). 23.38/23.21 fof(f1152_D,plain,( 23.38/23.21 ( ! [X16] : (( ! [X15] : (~sP421(X15) | ~r1(X15,X16)) ) <=> ~sP422(X16)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP422])])). 23.38/23.21 fof(f1151,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP409(X49) | ~sP421(X15)) )), 23.38/23.21 inference(general_splitting,[],[f1149,f1150_D])). 23.38/23.21 fof(f1150,plain,( 23.38/23.21 ( ! [X14,X15] : (sP421(X15) | ~sP420(X14) | ~r1(X14,X15)) )), 23.38/23.21 inference(cnf_transformation,[],[f1150_D])). 23.38/23.21 fof(f1150_D,plain,( 23.38/23.21 ( ! [X15] : (( ! [X14] : (~sP420(X14) | ~r1(X14,X15)) ) <=> ~sP421(X15)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP421])])). 23.38/23.21 fof(f1149,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP409(X49) | ~sP420(X14)) )), 23.38/23.21 inference(general_splitting,[],[f1147,f1148_D])). 23.38/23.21 fof(f1148,plain,( 23.38/23.21 ( ! [X14,X13] : (sP420(X14) | ~sP419(X13) | ~r1(X13,X14)) )), 23.38/23.21 inference(cnf_transformation,[],[f1148_D])). 23.38/23.21 fof(f1148_D,plain,( 23.38/23.21 ( ! [X14] : (( ! [X13] : (~sP419(X13) | ~r1(X13,X14)) ) <=> ~sP420(X14)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP420])])). 23.38/23.21 fof(f1147,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP409(X49) | ~sP419(X13)) )), 23.38/23.21 inference(general_splitting,[],[f1145,f1146_D])). 23.38/23.21 fof(f1146,plain,( 23.38/23.21 ( ! [X12,X13] : (sP419(X13) | ~sP418(X12) | ~r1(X12,X13)) )), 23.38/23.21 inference(cnf_transformation,[],[f1146_D])). 23.38/23.21 fof(f1146_D,plain,( 23.38/23.21 ( ! [X13] : (( ! [X12] : (~sP418(X12) | ~r1(X12,X13)) ) <=> ~sP419(X13)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP419])])). 23.38/23.21 fof(f1145,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~sP409(X49) | ~sP418(X12)) )), 23.38/23.21 inference(general_splitting,[],[f1143,f1144_D])). 23.38/23.21 fof(f1144,plain,( 23.38/23.21 ( ! [X12,X11] : (sP418(X12) | ~sP417(X11) | ~r1(X11,X12)) )), 23.38/23.21 inference(cnf_transformation,[],[f1144_D])). 23.38/23.21 fof(f1144_D,plain,( 23.38/23.21 ( ! [X12] : (( ! [X11] : (~sP417(X11) | ~r1(X11,X12)) ) <=> ~sP418(X12)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP418])])). 23.38/23.21 fof(f1143,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~sP409(X49) | ~sP417(X11)) )), 23.38/23.21 inference(general_splitting,[],[f1141,f1142_D])). 23.38/23.21 fof(f1142,plain,( 23.38/23.21 ( ! [X10,X11] : (sP417(X11) | ~sP416(X10) | ~r1(X10,X11)) )), 23.38/23.21 inference(cnf_transformation,[],[f1142_D])). 23.38/23.21 fof(f1142_D,plain,( 23.38/23.21 ( ! [X11] : (( ! [X10] : (~sP416(X10) | ~r1(X10,X11)) ) <=> ~sP417(X11)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP417])])). 23.38/23.21 fof(f1141,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~sP409(X49) | ~sP416(X10)) )), 23.38/23.21 inference(general_splitting,[],[f1139,f1140_D])). 23.38/23.21 fof(f1140,plain,( 23.38/23.21 ( ! [X10,X9] : (sP416(X10) | ~sP415(X9) | ~r1(X9,X10)) )), 23.38/23.21 inference(cnf_transformation,[],[f1140_D])). 23.38/23.21 fof(f1140_D,plain,( 23.38/23.21 ( ! [X10] : (( ! [X9] : (~sP415(X9) | ~r1(X9,X10)) ) <=> ~sP416(X10)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP416])])). 23.38/23.21 fof(f1139,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP409(X49) | ~sP415(X9)) )), 23.38/23.21 inference(general_splitting,[],[f1137,f1138_D])). 23.38/23.21 fof(f1138,plain,( 23.38/23.21 ( ! [X8,X9] : (sP415(X9) | ~sP414(X8) | ~r1(X8,X9)) )), 23.38/23.21 inference(cnf_transformation,[],[f1138_D])). 23.38/23.21 fof(f1138_D,plain,( 23.38/23.21 ( ! [X9] : (( ! [X8] : (~sP414(X8) | ~r1(X8,X9)) ) <=> ~sP415(X9)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP415])])). 23.38/23.21 fof(f1137,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP409(X49) | ~sP414(X8)) )), 23.38/23.21 inference(general_splitting,[],[f1135,f1136_D])). 23.38/23.21 fof(f1136,plain,( 23.38/23.21 ( ! [X8,X7] : (sP414(X8) | ~sP413(X7) | ~r1(X7,X8)) )), 23.38/23.21 inference(cnf_transformation,[],[f1136_D])). 23.38/23.21 fof(f1136_D,plain,( 23.38/23.21 ( ! [X8] : (( ! [X7] : (~sP413(X7) | ~r1(X7,X8)) ) <=> ~sP414(X8)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP414])])). 23.38/23.21 fof(f1135,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP409(X49) | ~sP413(X7)) )), 23.38/23.21 inference(general_splitting,[],[f1133,f1134_D])). 23.38/23.21 fof(f1134,plain,( 23.38/23.21 ( ! [X6,X7] : (sP413(X7) | ~sP412(X6) | ~r1(X6,X7)) )), 23.38/23.21 inference(cnf_transformation,[],[f1134_D])). 23.38/23.21 fof(f1134_D,plain,( 23.38/23.21 ( ! [X7] : (( ! [X6] : (~sP412(X6) | ~r1(X6,X7)) ) <=> ~sP413(X7)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP413])])). 23.38/23.21 fof(f1133,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP409(X49) | ~sP412(X6)) )), 23.38/23.21 inference(general_splitting,[],[f1131,f1132_D])). 23.38/23.21 fof(f1132,plain,( 23.38/23.21 ( ! [X6,X5] : (sP412(X6) | ~sP411(X5) | ~r1(X5,X6)) )), 23.38/23.21 inference(cnf_transformation,[],[f1132_D])). 23.38/23.21 fof(f1132_D,plain,( 23.38/23.21 ( ! [X6] : (( ! [X5] : (~sP411(X5) | ~r1(X5,X6)) ) <=> ~sP412(X6)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP412])])). 23.38/23.21 fof(f1131,plain,( 23.38/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP409(X49) | ~sP411(X5)) )), 23.38/23.21 inference(general_splitting,[],[f1129,f1130_D])). 23.38/23.21 fof(f1130,plain,( 23.38/23.21 ( ! [X4,X5] : (sP411(X5) | ~sP410(X4) | ~r1(X4,X5)) )), 23.38/23.21 inference(cnf_transformation,[],[f1130_D])). 23.38/23.21 fof(f1130_D,plain,( 23.38/23.21 ( ! [X5] : (( ! [X4] : (~sP410(X4) | ~r1(X4,X5)) ) <=> ~sP411(X5)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP411])])). 23.38/23.21 fof(f1129,plain,( 23.38/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~sP409(X49) | ~sP410(X4)) )), 23.38/23.21 inference(general_splitting,[],[f1127,f1128_D])). 23.38/23.21 fof(f1128,plain,( 23.38/23.21 ( ! [X4,X3] : (sP410(X4) | ~sP408(X3) | ~r1(X3,X4)) )), 23.38/23.21 inference(cnf_transformation,[],[f1128_D])). 23.38/23.21 fof(f1128_D,plain,( 23.38/23.21 ( ! [X4] : (( ! [X3] : (~sP408(X3) | ~r1(X3,X4)) ) <=> ~sP410(X4)) )), 23.38/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP410])])). 23.40/23.21 fof(f1127,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP408(X3) | ~sP409(X49)) )), 23.40/23.21 inference(general_splitting,[],[f1125,f1126_D])). 23.40/23.21 fof(f1125,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP406(X50) | ~sP408(X3)) )), 23.40/23.21 inference(general_splitting,[],[f1123,f1124_D])). 23.40/23.21 fof(f1124,plain,( 23.40/23.21 ( ! [X3,X1] : (sP408(X3) | ~sP407(X1) | ~r1(X1,X3)) )), 23.40/23.21 inference(cnf_transformation,[],[f1124_D])). 23.40/23.21 fof(f1124_D,plain,( 23.40/23.21 ( ! [X3] : (( ! [X1] : (~sP407(X1) | ~r1(X1,X3)) ) <=> ~sP408(X3)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP408])])). 23.40/23.21 fof(f1123,plain,( 23.40/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X31,X7,X36,X15,X44,X20,X49] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP406(X50) | ~sP407(X1)) )), 23.40/23.21 inference(general_splitting,[],[f1121,f1122_D])). 23.40/23.21 fof(f1122,plain,( 23.40/23.21 ( ! [X0,X1] : (sP407(X1) | ~sP45(X0) | ~r1(X0,X1)) )), 23.40/23.21 inference(cnf_transformation,[],[f1122_D])). 23.40/23.21 fof(f1122_D,plain,( 23.40/23.21 ( ! [X1] : (( ! [X0] : (~sP45(X0) | ~r1(X0,X1)) ) <=> ~sP407(X1)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP407])])). 23.40/23.21 fof(f1121,plain,( 23.40/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X0,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X31,X7,X36,X15,X44,X20,X49] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X49,X50) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP45(X0) | ~sP406(X50)) )), 23.40/23.21 inference(general_splitting,[],[f372,f1120_D])). 23.40/23.21 fof(f372,plain,( 23.40/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X51,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X0,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X31,X7,X36,X15,X44,X20,X49] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X49,X50) | p47(X51) | p48(X51) | ~r1(X50,X51) | ~r1(X48,X49) | ~r1(X47,X48) | ~r1(X46,X47) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP45(X0)) )), 23.40/23.21 inference(cnf_transformation,[],[f70])). 23.40/23.21 fof(f28344,plain,( 23.40/23.21 sP422(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f25215,f1152])). 23.40/23.21 fof(f25215,plain,( 23.40/23.21 sP421(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f22396,f1150])). 23.40/23.21 fof(f22396,plain,( 23.40/23.21 sP420(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f19871,f1148])). 23.40/23.21 fof(f19871,plain,( 23.40/23.21 sP419(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f17609,f1146])). 23.40/23.21 fof(f17609,plain,( 23.40/23.21 sP418(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f15202,f1144])). 23.40/23.21 fof(f15202,plain,( 23.40/23.21 sP417(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f13155,f1142])). 23.40/23.21 fof(f13155,plain,( 23.40/23.21 sP416(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f11440,f1140])). 23.40/23.21 fof(f11440,plain,( 23.40/23.21 sP415(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f10292,f1138])). 23.40/23.21 fof(f10292,plain,( 23.40/23.21 sP414(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f9330,f1136])). 23.40/23.21 fof(f9330,plain,( 23.40/23.21 sP413(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f8361,f1134])). 23.40/23.21 fof(f8361,plain,( 23.40/23.21 sP412(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f7760,f1132])). 23.40/23.21 fof(f7760,plain,( 23.40/23.21 sP411(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f7293,f1130])). 23.40/23.21 fof(f7293,plain,( 23.40/23.21 sP410(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f6944,f1128])). 23.40/23.21 fof(f6944,plain,( 23.40/23.21 sP408(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f6697,f1124])). 23.40/23.21 fof(f6697,plain,( 23.40/23.21 sP407(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f6538,f1122])). 23.40/23.21 fof(f472396,plain,( 23.40/23.21 ~sP506(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f449027,f1348])). 23.40/23.21 fof(f1348,plain,( 23.40/23.21 ( ! [X48,X49] : (~sP506(X49) | ~r1(X48,X49) | sP520(X48)) )), 23.40/23.21 inference(cnf_transformation,[],[f1348_D])). 23.40/23.21 fof(f1348_D,plain,( 23.40/23.21 ( ! [X48] : (( ! [X49] : (~sP506(X49) | ~r1(X48,X49)) ) <=> ~sP520(X48)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP520])])). 23.40/23.21 fof(f449027,plain,( 23.40/23.21 ~sP520(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f425877,f1350])). 23.40/23.21 fof(f1350,plain,( 23.40/23.21 ( ! [X47,X48] : (~sP520(X48) | ~r1(X47,X48) | sP521(X47)) )), 23.40/23.21 inference(cnf_transformation,[],[f1350_D])). 23.40/23.21 fof(f1350_D,plain,( 23.40/23.21 ( ! [X47] : (( ! [X48] : (~sP520(X48) | ~r1(X47,X48)) ) <=> ~sP521(X47)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP521])])). 23.40/23.21 fof(f425877,plain,( 23.40/23.21 ~sP521(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f403043,f1352])). 23.40/23.21 fof(f1352,plain,( 23.40/23.21 ( ! [X47,X46] : (~sP521(X47) | ~r1(X46,X47) | sP522(X46)) )), 23.40/23.21 inference(cnf_transformation,[],[f1352_D])). 23.40/23.21 fof(f1352_D,plain,( 23.40/23.21 ( ! [X46] : (( ! [X47] : (~sP521(X47) | ~r1(X46,X47)) ) <=> ~sP522(X46)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP522])])). 23.40/23.21 fof(f403043,plain,( 23.40/23.21 ~sP522(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f378358,f1354])). 23.40/23.21 fof(f1354,plain,( 23.40/23.21 ( ! [X45,X46] : (~sP522(X46) | ~r1(X45,X46) | sP523(X45)) )), 23.40/23.21 inference(cnf_transformation,[],[f1354_D])). 23.40/23.21 fof(f1354_D,plain,( 23.40/23.21 ( ! [X45] : (( ! [X46] : (~sP522(X46) | ~r1(X45,X46)) ) <=> ~sP523(X45)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP523])])). 23.40/23.21 fof(f378358,plain,( 23.40/23.21 ~sP523(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f342878,f1356])). 23.40/23.21 fof(f1356,plain,( 23.40/23.21 ( ! [X45,X44] : (~sP523(X45) | ~r1(X44,X45) | sP524(X44)) )), 23.40/23.21 inference(cnf_transformation,[],[f1356_D])). 23.40/23.21 fof(f1356_D,plain,( 23.40/23.21 ( ! [X44] : (( ! [X45] : (~sP523(X45) | ~r1(X44,X45)) ) <=> ~sP524(X44)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP524])])). 23.40/23.21 fof(f342878,plain,( 23.40/23.21 ~sP524(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f320745,f1358])). 23.40/23.21 fof(f1358,plain,( 23.40/23.21 ( ! [X43,X44] : (~sP524(X44) | ~r1(X43,X44) | sP525(X43)) )), 23.40/23.21 inference(cnf_transformation,[],[f1358_D])). 23.40/23.21 fof(f1358_D,plain,( 23.40/23.21 ( ! [X43] : (( ! [X44] : (~sP524(X44) | ~r1(X43,X44)) ) <=> ~sP525(X43)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP525])])). 23.40/23.21 fof(f320745,plain,( 23.40/23.21 ~sP525(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f301854,f1360])). 23.40/23.21 fof(f1360,plain,( 23.40/23.21 ( ! [X43,X42] : (~sP525(X43) | ~r1(X42,X43) | sP526(X42)) )), 23.40/23.21 inference(cnf_transformation,[],[f1360_D])). 23.40/23.21 fof(f1360_D,plain,( 23.40/23.21 ( ! [X42] : (( ! [X43] : (~sP525(X43) | ~r1(X42,X43)) ) <=> ~sP526(X42)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP526])])). 23.40/23.21 fof(f301854,plain,( 23.40/23.21 ~sP526(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f283733,f1362])). 23.40/23.21 fof(f1362,plain,( 23.40/23.21 ( ! [X41,X42] : (~sP526(X42) | ~r1(X41,X42) | sP527(X41)) )), 23.40/23.21 inference(cnf_transformation,[],[f1362_D])). 23.40/23.21 fof(f1362_D,plain,( 23.40/23.21 ( ! [X41] : (( ! [X42] : (~sP526(X42) | ~r1(X41,X42)) ) <=> ~sP527(X41)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP527])])). 23.40/23.21 fof(f283733,plain,( 23.40/23.21 ~sP527(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f266374,f1364])). 23.40/23.21 fof(f1364,plain,( 23.40/23.21 ( ! [X41,X40] : (~sP527(X41) | ~r1(X40,X41) | sP528(X40)) )), 23.40/23.21 inference(cnf_transformation,[],[f1364_D])). 23.40/23.21 fof(f1364_D,plain,( 23.40/23.21 ( ! [X40] : (( ! [X41] : (~sP527(X41) | ~r1(X40,X41)) ) <=> ~sP528(X40)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP528])])). 23.40/23.21 fof(f266374,plain,( 23.40/23.21 ~sP528(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f249746,f1366])). 23.40/23.21 fof(f1366,plain,( 23.40/23.21 ( ! [X39,X40] : (~sP528(X40) | ~r1(X39,X40) | sP529(X39)) )), 23.40/23.21 inference(cnf_transformation,[],[f1366_D])). 23.40/23.21 fof(f1366_D,plain,( 23.40/23.21 ( ! [X39] : (( ! [X40] : (~sP528(X40) | ~r1(X39,X40)) ) <=> ~sP529(X39)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP529])])). 23.40/23.21 fof(f249746,plain,( 23.40/23.21 ~sP529(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f233848,f1368])). 23.40/23.21 fof(f1368,plain,( 23.40/23.21 ( ! [X39,X38] : (~sP529(X39) | ~r1(X38,X39) | sP530(X38)) )), 23.40/23.21 inference(cnf_transformation,[],[f1368_D])). 23.40/23.21 fof(f1368_D,plain,( 23.40/23.21 ( ! [X38] : (( ! [X39] : (~sP529(X39) | ~r1(X38,X39)) ) <=> ~sP530(X38)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP530])])). 23.40/23.21 fof(f233848,plain,( 23.40/23.21 ~sP530(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f218648,f1370])). 23.40/23.21 fof(f1370,plain,( 23.40/23.21 ( ! [X37,X38] : (~sP530(X38) | ~r1(X37,X38) | sP531(X37)) )), 23.40/23.21 inference(cnf_transformation,[],[f1370_D])). 23.40/23.21 fof(f1370_D,plain,( 23.40/23.21 ( ! [X37] : (( ! [X38] : (~sP530(X38) | ~r1(X37,X38)) ) <=> ~sP531(X37)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP531])])). 23.40/23.21 fof(f218648,plain,( 23.40/23.21 ~sP531(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f204143,f1372])). 23.40/23.21 fof(f1372,plain,( 23.40/23.21 ( ! [X37,X36] : (~sP531(X37) | ~r1(X36,X37) | sP532(X36)) )), 23.40/23.21 inference(cnf_transformation,[],[f1372_D])). 23.40/23.21 fof(f1372_D,plain,( 23.40/23.21 ( ! [X36] : (( ! [X37] : (~sP531(X37) | ~r1(X36,X37)) ) <=> ~sP532(X36)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP532])])). 23.40/23.21 fof(f204143,plain,( 23.40/23.21 ~sP532(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f190311,f1374])). 23.40/23.21 fof(f1374,plain,( 23.40/23.21 ( ! [X35,X36] : (~sP532(X36) | ~r1(X35,X36) | sP533(X35)) )), 23.40/23.21 inference(cnf_transformation,[],[f1374_D])). 23.40/23.21 fof(f1374_D,plain,( 23.40/23.21 ( ! [X35] : (( ! [X36] : (~sP532(X36) | ~r1(X35,X36)) ) <=> ~sP533(X35)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP533])])). 23.40/23.21 fof(f190311,plain,( 23.40/23.21 ~sP533(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f177140,f1376])). 23.40/23.21 fof(f1376,plain,( 23.40/23.21 ( ! [X35,X34] : (~sP533(X35) | ~r1(X34,X35) | sP534(X34)) )), 23.40/23.21 inference(cnf_transformation,[],[f1376_D])). 23.40/23.21 fof(f1376_D,plain,( 23.40/23.21 ( ! [X34] : (( ! [X35] : (~sP533(X35) | ~r1(X34,X35)) ) <=> ~sP534(X34)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP534])])). 23.40/23.21 fof(f177140,plain,( 23.40/23.21 ~sP534(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f164613,f1378])). 23.40/23.21 fof(f1378,plain,( 23.40/23.21 ( ! [X33,X34] : (~sP534(X34) | ~r1(X33,X34) | sP535(X33)) )), 23.40/23.21 inference(cnf_transformation,[],[f1378_D])). 23.40/23.21 fof(f1378_D,plain,( 23.40/23.21 ( ! [X33] : (( ! [X34] : (~sP534(X34) | ~r1(X33,X34)) ) <=> ~sP535(X33)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP535])])). 23.40/23.21 fof(f164613,plain,( 23.40/23.21 ~sP535(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f152712,f1380])). 23.40/23.21 fof(f1380,plain,( 23.40/23.21 ( ! [X33,X32] : (~sP535(X33) | ~r1(X32,X33) | sP536(X32)) )), 23.40/23.21 inference(cnf_transformation,[],[f1380_D])). 23.40/23.21 fof(f1380_D,plain,( 23.40/23.21 ( ! [X32] : (( ! [X33] : (~sP535(X33) | ~r1(X32,X33)) ) <=> ~sP536(X32)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP536])])). 23.40/23.21 fof(f152712,plain,( 23.40/23.21 ~sP536(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f141421,f1382])). 23.40/23.21 fof(f1382,plain,( 23.40/23.21 ( ! [X31,X32] : (~sP536(X32) | ~r1(X31,X32) | sP537(X31)) )), 23.40/23.21 inference(cnf_transformation,[],[f1382_D])). 23.40/23.21 fof(f1382_D,plain,( 23.40/23.21 ( ! [X31] : (( ! [X32] : (~sP536(X32) | ~r1(X31,X32)) ) <=> ~sP537(X31)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP537])])). 23.40/23.21 fof(f141421,plain,( 23.40/23.21 ~sP537(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f130723,f1384])). 23.40/23.21 fof(f1384,plain,( 23.40/23.21 ( ! [X30,X31] : (~sP537(X31) | ~r1(X30,X31) | sP538(X30)) )), 23.40/23.21 inference(cnf_transformation,[],[f1384_D])). 23.40/23.21 fof(f1384_D,plain,( 23.40/23.21 ( ! [X30] : (( ! [X31] : (~sP537(X31) | ~r1(X30,X31)) ) <=> ~sP538(X30)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP538])])). 23.40/23.21 fof(f130723,plain,( 23.40/23.21 ~sP538(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f120605,f1386])). 23.40/23.21 fof(f1386,plain,( 23.40/23.21 ( ! [X30,X29] : (~sP538(X30) | ~r1(X29,X30) | sP539(X29)) )), 23.40/23.21 inference(cnf_transformation,[],[f1386_D])). 23.40/23.21 fof(f1386_D,plain,( 23.40/23.21 ( ! [X29] : (( ! [X30] : (~sP538(X30) | ~r1(X29,X30)) ) <=> ~sP539(X29)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP539])])). 23.40/23.21 fof(f120605,plain,( 23.40/23.21 ~sP539(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f111041,f1388])). 23.40/23.21 fof(f1388,plain,( 23.40/23.21 ( ! [X28,X29] : (~sP539(X29) | ~r1(X28,X29) | sP540(X28)) )), 23.40/23.21 inference(cnf_transformation,[],[f1388_D])). 23.40/23.21 fof(f1388_D,plain,( 23.40/23.21 ( ! [X28] : (( ! [X29] : (~sP539(X29) | ~r1(X28,X29)) ) <=> ~sP540(X28)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP540])])). 23.40/23.21 fof(f111041,plain,( 23.40/23.21 ~sP540(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f102029,f1390])). 23.40/23.21 fof(f1390,plain,( 23.40/23.21 ( ! [X28,X27] : (~sP540(X28) | ~r1(X27,X28) | sP541(X27)) )), 23.40/23.21 inference(cnf_transformation,[],[f1390_D])). 23.40/23.21 fof(f1390_D,plain,( 23.40/23.21 ( ! [X27] : (( ! [X28] : (~sP540(X28) | ~r1(X27,X28)) ) <=> ~sP541(X27)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP541])])). 23.40/23.21 fof(f102029,plain,( 23.40/23.21 ~sP541(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f93548,f1392])). 23.40/23.21 fof(f1392,plain,( 23.40/23.21 ( ! [X26,X27] : (~sP541(X27) | ~r1(X26,X27) | sP542(X26)) )), 23.40/23.21 inference(cnf_transformation,[],[f1392_D])). 23.40/23.21 fof(f1392_D,plain,( 23.40/23.21 ( ! [X26] : (( ! [X27] : (~sP541(X27) | ~r1(X26,X27)) ) <=> ~sP542(X26)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP542])])). 23.40/23.21 fof(f93548,plain,( 23.40/23.21 ~sP542(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f85580,f1394])). 23.40/23.21 fof(f1394,plain,( 23.40/23.21 ( ! [X26,X25] : (~sP542(X26) | ~r1(X25,X26) | sP543(X25)) )), 23.40/23.21 inference(cnf_transformation,[],[f1394_D])). 23.40/23.21 fof(f1394_D,plain,( 23.40/23.21 ( ! [X25] : (( ! [X26] : (~sP542(X26) | ~r1(X25,X26)) ) <=> ~sP543(X25)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP543])])). 23.40/23.21 fof(f85580,plain,( 23.40/23.21 ~sP543(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f78117,f1396])). 23.40/23.21 fof(f1396,plain,( 23.40/23.21 ( ! [X24,X25] : (~sP543(X25) | ~r1(X24,X25) | sP544(X24)) )), 23.40/23.21 inference(cnf_transformation,[],[f1396_D])). 23.40/23.21 fof(f1396_D,plain,( 23.40/23.21 ( ! [X24] : (( ! [X25] : (~sP543(X25) | ~r1(X24,X25)) ) <=> ~sP544(X24)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP544])])). 23.40/23.21 fof(f78117,plain,( 23.40/23.21 ~sP544(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f71121,f1398])). 23.40/23.21 fof(f1398,plain,( 23.40/23.21 ( ! [X24,X23] : (~sP544(X24) | ~r1(X23,X24) | sP545(X23)) )), 23.40/23.21 inference(cnf_transformation,[],[f1398_D])). 23.40/23.21 fof(f1398_D,plain,( 23.40/23.21 ( ! [X23] : (( ! [X24] : (~sP544(X24) | ~r1(X23,X24)) ) <=> ~sP545(X23)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP545])])). 23.40/23.21 fof(f71121,plain,( 23.40/23.21 ~sP545(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f64596,f1400])). 23.40/23.21 fof(f1400,plain,( 23.40/23.21 ( ! [X23,X22] : (~sP545(X23) | ~r1(X22,X23) | sP546(X22)) )), 23.40/23.21 inference(cnf_transformation,[],[f1400_D])). 23.40/23.21 fof(f1400_D,plain,( 23.40/23.21 ( ! [X22] : (( ! [X23] : (~sP545(X23) | ~r1(X22,X23)) ) <=> ~sP546(X22)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP546])])). 23.40/23.21 fof(f64596,plain,( 23.40/23.21 ~sP546(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f56522,f1402])). 23.40/23.21 fof(f1402,plain,( 23.40/23.21 ( ! [X21,X22] : (~sP546(X22) | ~r1(X21,X22) | sP547(X21)) )), 23.40/23.21 inference(cnf_transformation,[],[f1402_D])). 23.40/23.21 fof(f1402_D,plain,( 23.40/23.21 ( ! [X21] : (( ! [X22] : (~sP546(X22) | ~r1(X21,X22)) ) <=> ~sP547(X21)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP547])])). 23.40/23.21 fof(f56522,plain,( 23.40/23.21 ~sP547(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f49819,f1404])). 23.40/23.21 fof(f1404,plain,( 23.40/23.21 ( ! [X21,X20] : (~sP547(X21) | ~r1(X20,X21) | sP548(X20)) )), 23.40/23.21 inference(cnf_transformation,[],[f1404_D])). 23.40/23.21 fof(f1404_D,plain,( 23.40/23.21 ( ! [X20] : (( ! [X21] : (~sP547(X21) | ~r1(X20,X21)) ) <=> ~sP548(X20)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP548])])). 23.40/23.21 fof(f49819,plain,( 23.40/23.21 ~sP548(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f44291,f1406])). 23.40/23.21 fof(f1406,plain,( 23.40/23.21 ( ! [X19,X20] : (~sP548(X20) | ~r1(X19,X20) | sP549(X19)) )), 23.40/23.21 inference(cnf_transformation,[],[f1406_D])). 23.40/23.21 fof(f1406_D,plain,( 23.40/23.21 ( ! [X19] : (( ! [X20] : (~sP548(X20) | ~r1(X19,X20)) ) <=> ~sP549(X19)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP549])])). 23.40/23.21 fof(f44291,plain,( 23.40/23.21 ~sP549(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f39762,f1408])). 23.40/23.21 fof(f1408,plain,( 23.40/23.21 ( ! [X19,X18] : (~sP549(X19) | ~r1(X18,X19) | sP550(X18)) )), 23.40/23.21 inference(cnf_transformation,[],[f1408_D])). 23.40/23.21 fof(f1408_D,plain,( 23.40/23.21 ( ! [X18] : (( ! [X19] : (~sP549(X19) | ~r1(X18,X19)) ) <=> ~sP550(X18)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP550])])). 23.40/23.21 fof(f39762,plain,( 23.40/23.21 ~sP550(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f35607,f1410])). 23.40/23.21 fof(f1410,plain,( 23.40/23.21 ( ! [X17,X18] : (~sP550(X18) | ~r1(X17,X18) | sP551(X17)) )), 23.40/23.21 inference(cnf_transformation,[],[f1410_D])). 23.40/23.21 fof(f1410_D,plain,( 23.40/23.21 ( ! [X17] : (( ! [X18] : (~sP550(X18) | ~r1(X17,X18)) ) <=> ~sP551(X17)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP551])])). 23.40/23.21 fof(f35607,plain,( 23.40/23.21 ~sP551(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f31810,f1411])). 23.40/23.21 fof(f1411,plain,( 23.40/23.21 ( ! [X17,X16] : (~sP551(X17) | ~sP519(X16) | ~r1(X16,X17)) )), 23.40/23.21 inference(general_splitting,[],[f1409,f1410_D])). 23.40/23.21 fof(f1409,plain,( 23.40/23.21 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP519(X16) | ~sP550(X18)) )), 23.40/23.21 inference(general_splitting,[],[f1407,f1408_D])). 23.40/23.21 fof(f1407,plain,( 23.40/23.21 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP549(X19)) )), 23.40/23.21 inference(general_splitting,[],[f1405,f1406_D])). 23.40/23.21 fof(f1405,plain,( 23.40/23.21 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP548(X20)) )), 23.40/23.21 inference(general_splitting,[],[f1403,f1404_D])). 23.40/23.21 fof(f1403,plain,( 23.40/23.21 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP547(X21)) )), 23.40/23.21 inference(general_splitting,[],[f1401,f1402_D])). 23.40/23.21 fof(f1401,plain,( 23.40/23.21 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP546(X22)) )), 23.40/23.21 inference(general_splitting,[],[f1399,f1400_D])). 23.40/23.21 fof(f1399,plain,( 23.40/23.21 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP545(X23)) )), 23.40/23.21 inference(general_splitting,[],[f1397,f1398_D])). 23.40/23.21 fof(f1397,plain,( 23.40/23.21 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP544(X24)) )), 23.40/23.21 inference(general_splitting,[],[f1395,f1396_D])). 23.40/23.21 fof(f1395,plain,( 23.40/23.21 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP543(X25)) )), 23.40/23.21 inference(general_splitting,[],[f1393,f1394_D])). 23.40/23.21 fof(f1393,plain,( 23.40/23.21 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP542(X26)) )), 23.40/23.21 inference(general_splitting,[],[f1391,f1392_D])). 23.40/23.21 fof(f1391,plain,( 23.40/23.21 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP541(X27)) )), 23.40/23.21 inference(general_splitting,[],[f1389,f1390_D])). 23.40/23.21 fof(f1389,plain,( 23.40/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP540(X28)) )), 23.40/23.21 inference(general_splitting,[],[f1387,f1388_D])). 23.40/23.21 fof(f1387,plain,( 23.40/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP539(X29)) )), 23.40/23.21 inference(general_splitting,[],[f1385,f1386_D])). 23.40/23.21 fof(f1385,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP538(X30)) )), 23.40/23.21 inference(general_splitting,[],[f1383,f1384_D])). 23.40/23.21 fof(f1383,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP537(X31)) )), 23.40/23.21 inference(general_splitting,[],[f1381,f1382_D])). 23.40/23.21 fof(f1381,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP536(X32)) )), 23.40/23.21 inference(general_splitting,[],[f1379,f1380_D])). 23.40/23.21 fof(f1379,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP535(X33)) )), 23.40/23.21 inference(general_splitting,[],[f1377,f1378_D])). 23.40/23.21 fof(f1377,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP534(X34)) )), 23.40/23.21 inference(general_splitting,[],[f1375,f1376_D])). 23.40/23.21 fof(f1375,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP533(X35)) )), 23.40/23.21 inference(general_splitting,[],[f1373,f1374_D])). 23.40/23.21 fof(f1373,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP532(X36)) )), 23.40/23.21 inference(general_splitting,[],[f1371,f1372_D])). 23.40/23.21 fof(f1371,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP531(X37)) )), 23.40/23.21 inference(general_splitting,[],[f1369,f1370_D])). 23.40/23.21 fof(f1369,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP530(X38)) )), 23.40/23.21 inference(general_splitting,[],[f1367,f1368_D])). 23.40/23.21 fof(f1367,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP529(X39)) )), 23.40/23.21 inference(general_splitting,[],[f1365,f1366_D])). 23.40/23.21 fof(f1365,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP528(X40)) )), 23.40/23.21 inference(general_splitting,[],[f1363,f1364_D])). 23.40/23.21 fof(f1363,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP527(X41)) )), 23.40/23.21 inference(general_splitting,[],[f1361,f1362_D])). 23.40/23.21 fof(f1361,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP526(X42)) )), 23.40/23.21 inference(general_splitting,[],[f1359,f1360_D])). 23.40/23.21 fof(f1359,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP525(X43)) )), 23.40/23.21 inference(general_splitting,[],[f1357,f1358_D])). 23.40/23.21 fof(f1357,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP524(X44)) )), 23.40/23.21 inference(general_splitting,[],[f1355,f1356_D])). 23.40/23.21 fof(f1355,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP523(X45)) )), 23.40/23.21 inference(general_splitting,[],[f1353,f1354_D])). 23.40/23.21 fof(f1353,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP522(X46)) )), 23.40/23.21 inference(general_splitting,[],[f1351,f1352_D])). 23.40/23.21 fof(f1351,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP521(X47)) )), 23.40/23.21 inference(general_splitting,[],[f1349,f1350_D])). 23.40/23.21 fof(f1349,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP519(X16) | ~sP520(X48)) )), 23.40/23.21 inference(general_splitting,[],[f1347,f1348_D])). 23.40/23.21 fof(f1347,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X49,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP506(X49) | ~sP519(X16)) )), 23.40/23.21 inference(general_splitting,[],[f1345,f1346_D])). 23.40/23.21 fof(f1346,plain,( 23.40/23.21 ( ! [X15,X16] : (sP519(X16) | ~sP518(X15) | ~r1(X15,X16)) )), 23.40/23.21 inference(cnf_transformation,[],[f1346_D])). 23.40/23.21 fof(f1346_D,plain,( 23.40/23.21 ( ! [X16] : (( ! [X15] : (~sP518(X15) | ~r1(X15,X16)) ) <=> ~sP519(X16)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP519])])). 23.40/23.21 fof(f1345,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP506(X49) | ~sP518(X15)) )), 23.40/23.21 inference(general_splitting,[],[f1343,f1344_D])). 23.40/23.21 fof(f1344,plain,( 23.40/23.21 ( ! [X14,X15] : (sP518(X15) | ~sP517(X14) | ~r1(X14,X15)) )), 23.40/23.21 inference(cnf_transformation,[],[f1344_D])). 23.40/23.21 fof(f1344_D,plain,( 23.40/23.21 ( ! [X15] : (( ! [X14] : (~sP517(X14) | ~r1(X14,X15)) ) <=> ~sP518(X15)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP518])])). 23.40/23.21 fof(f1343,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP506(X49) | ~sP517(X14)) )), 23.40/23.21 inference(general_splitting,[],[f1341,f1342_D])). 23.40/23.21 fof(f1342,plain,( 23.40/23.21 ( ! [X14,X13] : (sP517(X14) | ~sP516(X13) | ~r1(X13,X14)) )), 23.40/23.21 inference(cnf_transformation,[],[f1342_D])). 23.40/23.21 fof(f1342_D,plain,( 23.40/23.21 ( ! [X14] : (( ! [X13] : (~sP516(X13) | ~r1(X13,X14)) ) <=> ~sP517(X14)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP517])])). 23.40/23.21 fof(f1341,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP506(X49) | ~sP516(X13)) )), 23.40/23.21 inference(general_splitting,[],[f1339,f1340_D])). 23.40/23.21 fof(f1340,plain,( 23.40/23.21 ( ! [X12,X13] : (sP516(X13) | ~sP515(X12) | ~r1(X12,X13)) )), 23.40/23.21 inference(cnf_transformation,[],[f1340_D])). 23.40/23.21 fof(f1340_D,plain,( 23.40/23.21 ( ! [X13] : (( ! [X12] : (~sP515(X12) | ~r1(X12,X13)) ) <=> ~sP516(X13)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP516])])). 23.40/23.21 fof(f1339,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP506(X49) | ~sP515(X12)) )), 23.40/23.21 inference(general_splitting,[],[f1337,f1338_D])). 23.40/23.21 fof(f1338,plain,( 23.40/23.21 ( ! [X12,X11] : (sP515(X12) | ~sP514(X11) | ~r1(X11,X12)) )), 23.40/23.21 inference(cnf_transformation,[],[f1338_D])). 23.40/23.21 fof(f1338_D,plain,( 23.40/23.21 ( ! [X12] : (( ! [X11] : (~sP514(X11) | ~r1(X11,X12)) ) <=> ~sP515(X12)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP515])])). 23.40/23.21 fof(f1337,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP506(X49) | ~sP514(X11)) )), 23.40/23.21 inference(general_splitting,[],[f1335,f1336_D])). 23.40/23.21 fof(f1336,plain,( 23.40/23.21 ( ! [X10,X11] : (sP514(X11) | ~sP513(X10) | ~r1(X10,X11)) )), 23.40/23.21 inference(cnf_transformation,[],[f1336_D])). 23.40/23.21 fof(f1336_D,plain,( 23.40/23.21 ( ! [X11] : (( ! [X10] : (~sP513(X10) | ~r1(X10,X11)) ) <=> ~sP514(X11)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP514])])). 23.40/23.21 fof(f1335,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP506(X49) | ~sP513(X10)) )), 23.40/23.21 inference(general_splitting,[],[f1333,f1334_D])). 23.40/23.21 fof(f1334,plain,( 23.40/23.21 ( ! [X10,X9] : (sP513(X10) | ~sP512(X9) | ~r1(X9,X10)) )), 23.40/23.21 inference(cnf_transformation,[],[f1334_D])). 23.40/23.21 fof(f1334_D,plain,( 23.40/23.21 ( ! [X10] : (( ! [X9] : (~sP512(X9) | ~r1(X9,X10)) ) <=> ~sP513(X10)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP513])])). 23.40/23.21 fof(f1333,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP506(X49) | ~sP512(X9)) )), 23.40/23.21 inference(general_splitting,[],[f1331,f1332_D])). 23.40/23.21 fof(f1332,plain,( 23.40/23.21 ( ! [X8,X9] : (sP512(X9) | ~sP511(X8) | ~r1(X8,X9)) )), 23.40/23.21 inference(cnf_transformation,[],[f1332_D])). 23.40/23.21 fof(f1332_D,plain,( 23.40/23.21 ( ! [X9] : (( ! [X8] : (~sP511(X8) | ~r1(X8,X9)) ) <=> ~sP512(X9)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP512])])). 23.40/23.21 fof(f1331,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP506(X49) | ~sP511(X8)) )), 23.40/23.21 inference(general_splitting,[],[f1329,f1330_D])). 23.40/23.21 fof(f1330,plain,( 23.40/23.21 ( ! [X8,X7] : (sP511(X8) | ~sP510(X7) | ~r1(X7,X8)) )), 23.40/23.21 inference(cnf_transformation,[],[f1330_D])). 23.40/23.21 fof(f1330_D,plain,( 23.40/23.21 ( ! [X8] : (( ! [X7] : (~sP510(X7) | ~r1(X7,X8)) ) <=> ~sP511(X8)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP511])])). 23.40/23.21 fof(f1329,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP506(X49) | ~sP510(X7)) )), 23.40/23.21 inference(general_splitting,[],[f1327,f1328_D])). 23.40/23.21 fof(f1328,plain,( 23.40/23.21 ( ! [X6,X7] : (sP510(X7) | ~sP509(X6) | ~r1(X6,X7)) )), 23.40/23.21 inference(cnf_transformation,[],[f1328_D])). 23.40/23.21 fof(f1328_D,plain,( 23.40/23.21 ( ! [X7] : (( ! [X6] : (~sP509(X6) | ~r1(X6,X7)) ) <=> ~sP510(X7)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP510])])). 23.40/23.21 fof(f1327,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~sP506(X49) | ~sP509(X6)) )), 23.40/23.21 inference(general_splitting,[],[f1325,f1326_D])). 23.40/23.21 fof(f1326,plain,( 23.40/23.21 ( ! [X6,X5] : (sP509(X6) | ~sP508(X5) | ~r1(X5,X6)) )), 23.40/23.21 inference(cnf_transformation,[],[f1326_D])). 23.40/23.21 fof(f1326_D,plain,( 23.40/23.21 ( ! [X6] : (( ! [X5] : (~sP508(X5) | ~r1(X5,X6)) ) <=> ~sP509(X6)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP509])])). 23.40/23.21 fof(f1325,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~sP506(X49) | ~sP508(X5)) )), 23.40/23.21 inference(general_splitting,[],[f1323,f1324_D])). 23.40/23.21 fof(f1324,plain,( 23.40/23.21 ( ! [X4,X5] : (sP508(X5) | ~sP507(X4) | ~r1(X4,X5)) )), 23.40/23.21 inference(cnf_transformation,[],[f1324_D])). 23.40/23.21 fof(f1324_D,plain,( 23.40/23.21 ( ! [X5] : (( ! [X4] : (~sP507(X4) | ~r1(X4,X5)) ) <=> ~sP508(X5)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP508])])). 23.40/23.21 fof(f1323,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~sP506(X49) | ~sP507(X4)) )), 23.40/23.21 inference(general_splitting,[],[f1321,f1322_D])). 23.40/23.21 fof(f1322,plain,( 23.40/23.21 ( ! [X4,X3] : (sP507(X4) | ~sP505(X3) | ~r1(X3,X4)) )), 23.40/23.21 inference(cnf_transformation,[],[f1322_D])). 23.40/23.21 fof(f1322_D,plain,( 23.40/23.21 ( ! [X4] : (( ! [X3] : (~sP505(X3) | ~r1(X3,X4)) ) <=> ~sP507(X4)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP507])])). 23.40/23.21 fof(f1321,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~sP505(X3) | ~sP506(X49)) )), 23.40/23.21 inference(general_splitting,[],[f1319,f1320_D])). 23.40/23.21 fof(f1319,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X50,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~p47(X50) | ~p46(X50) | ~r1(X49,X50) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~sP505(X3)) )), 23.40/23.21 inference(general_splitting,[],[f1317,f1318_D])). 23.40/23.21 fof(f1318,plain,( 23.40/23.21 ( ! [X3,X1] : (sP505(X3) | ~sP504(X1) | ~r1(X1,X3)) )), 23.40/23.21 inference(cnf_transformation,[],[f1318_D])). 23.40/23.21 fof(f1318_D,plain,( 23.40/23.21 ( ! [X3] : (( ! [X1] : (~sP504(X1) | ~r1(X1,X3)) ) <=> ~sP505(X3)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP505])])). 23.40/23.21 fof(f1317,plain,( 23.40/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X31,X7,X36,X15,X44,X20,X49] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~p47(X50) | ~p46(X50) | ~r1(X49,X50) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X1,X3) | ~sP504(X1)) )), 23.40/23.21 inference(general_splitting,[],[f377,f1316_D])). 23.40/23.21 fof(f1316,plain,( 23.40/23.21 ( ! [X0,X1] : (sP504(X1) | ~sP44(X0) | ~r1(X0,X1)) )), 23.40/23.21 inference(cnf_transformation,[],[f1316_D])). 23.40/23.21 fof(f1316_D,plain,( 23.40/23.21 ( ! [X1] : (( ! [X0] : (~sP44(X0) | ~r1(X0,X1)) ) <=> ~sP504(X1)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP504])])). 23.40/23.21 fof(f377,plain,( 23.40/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X0,X45,X8,X21,X50,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X31,X7,X36,X15,X44,X20,X49] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X48,X49) | ~p47(X50) | ~p46(X50) | ~r1(X49,X50) | ~r1(X42,X43) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP44(X0)) )), 23.40/23.21 inference(cnf_transformation,[],[f74])). 23.40/23.21 fof(f31810,plain,( 23.40/23.21 sP519(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f28340,f1346])). 23.40/23.21 fof(f28340,plain,( 23.40/23.21 sP518(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f25211,f1344])). 23.40/23.21 fof(f25211,plain,( 23.40/23.21 sP517(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f22392,f1342])). 23.40/23.21 fof(f22392,plain,( 23.40/23.21 sP516(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f19867,f1340])). 23.40/23.21 fof(f19867,plain,( 23.40/23.21 sP515(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f17605,f1338])). 23.40/23.21 fof(f17605,plain,( 23.40/23.21 sP514(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f15198,f1336])). 23.40/23.21 fof(f15198,plain,( 23.40/23.21 sP513(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f13151,f1334])). 23.40/23.21 fof(f13151,plain,( 23.40/23.21 sP512(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f11436,f1332])). 23.40/23.21 fof(f11436,plain,( 23.40/23.21 sP511(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f10288,f1330])). 23.40/23.21 fof(f10288,plain,( 23.40/23.21 sP510(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f9326,f1328])). 23.40/23.21 fof(f9326,plain,( 23.40/23.21 sP509(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f8357,f1326])). 23.40/23.21 fof(f8357,plain,( 23.40/23.21 sP508(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f7756,f1324])). 23.40/23.21 fof(f7756,plain,( 23.40/23.21 sP507(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f7289,f1322])). 23.40/23.21 fof(f7289,plain,( 23.40/23.21 sP505(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f6940,f1318])). 23.40/23.21 fof(f6940,plain,( 23.40/23.21 sP504(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f6695,f1316])). 23.40/23.21 fof(f472390,plain,( 23.40/23.21 ~sP615(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f449021,f1540])). 23.40/23.21 fof(f1540,plain,( 23.40/23.21 ( ! [X47,X48] : (~sP615(X48) | ~r1(X47,X48) | sP616(X47)) )), 23.40/23.21 inference(cnf_transformation,[],[f1540_D])). 23.40/23.21 fof(f1540_D,plain,( 23.40/23.21 ( ! [X47] : (( ! [X48] : (~sP615(X48) | ~r1(X47,X48)) ) <=> ~sP616(X47)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP616])])). 23.40/23.21 fof(f449021,plain,( 23.40/23.21 ~sP616(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f425871,f1542])). 23.40/23.21 fof(f1542,plain,( 23.40/23.21 ( ! [X47,X46] : (~sP616(X47) | ~r1(X46,X47) | sP617(X46)) )), 23.40/23.21 inference(cnf_transformation,[],[f1542_D])). 23.40/23.21 fof(f1542_D,plain,( 23.40/23.21 ( ! [X46] : (( ! [X47] : (~sP616(X47) | ~r1(X46,X47)) ) <=> ~sP617(X46)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP617])])). 23.40/23.21 fof(f425871,plain,( 23.40/23.21 ~sP617(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f403037,f1544])). 23.40/23.21 fof(f1544,plain,( 23.40/23.21 ( ! [X45,X46] : (~sP617(X46) | ~r1(X45,X46) | sP618(X45)) )), 23.40/23.21 inference(cnf_transformation,[],[f1544_D])). 23.40/23.21 fof(f1544_D,plain,( 23.40/23.21 ( ! [X45] : (( ! [X46] : (~sP617(X46) | ~r1(X45,X46)) ) <=> ~sP618(X45)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP618])])). 23.40/23.21 fof(f403037,plain,( 23.40/23.21 ~sP618(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f378352,f1546])). 23.40/23.21 fof(f1546,plain,( 23.40/23.21 ( ! [X45,X44] : (~sP618(X45) | ~r1(X44,X45) | sP619(X44)) )), 23.40/23.21 inference(cnf_transformation,[],[f1546_D])). 23.40/23.21 fof(f1546_D,plain,( 23.40/23.21 ( ! [X44] : (( ! [X45] : (~sP618(X45) | ~r1(X44,X45)) ) <=> ~sP619(X44)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP619])])). 23.40/23.21 fof(f378352,plain,( 23.40/23.21 ~sP619(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f342872,f1548])). 23.40/23.21 fof(f1548,plain,( 23.40/23.21 ( ! [X43,X44] : (~sP619(X44) | ~r1(X43,X44) | sP620(X43)) )), 23.40/23.21 inference(cnf_transformation,[],[f1548_D])). 23.40/23.21 fof(f1548_D,plain,( 23.40/23.21 ( ! [X43] : (( ! [X44] : (~sP619(X44) | ~r1(X43,X44)) ) <=> ~sP620(X43)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP620])])). 23.40/23.21 fof(f342872,plain,( 23.40/23.21 ~sP620(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f320741,f1550])). 23.40/23.21 fof(f1550,plain,( 23.40/23.21 ( ! [X43,X42] : (~sP620(X43) | ~r1(X42,X43) | sP621(X42)) )), 23.40/23.21 inference(cnf_transformation,[],[f1550_D])). 23.40/23.21 fof(f1550_D,plain,( 23.40/23.21 ( ! [X42] : (( ! [X43] : (~sP620(X43) | ~r1(X42,X43)) ) <=> ~sP621(X42)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP621])])). 23.40/23.21 fof(f320741,plain,( 23.40/23.21 ~sP621(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f301850,f1552])). 23.40/23.21 fof(f1552,plain,( 23.40/23.21 ( ! [X41,X42] : (~sP621(X42) | ~r1(X41,X42) | sP622(X41)) )), 23.40/23.21 inference(cnf_transformation,[],[f1552_D])). 23.40/23.21 fof(f1552_D,plain,( 23.40/23.21 ( ! [X41] : (( ! [X42] : (~sP621(X42) | ~r1(X41,X42)) ) <=> ~sP622(X41)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP622])])). 23.40/23.21 fof(f301850,plain,( 23.40/23.21 ~sP622(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f283729,f1554])). 23.40/23.21 fof(f1554,plain,( 23.40/23.21 ( ! [X41,X40] : (~sP622(X41) | ~r1(X40,X41) | sP623(X40)) )), 23.40/23.21 inference(cnf_transformation,[],[f1554_D])). 23.40/23.21 fof(f1554_D,plain,( 23.40/23.21 ( ! [X40] : (( ! [X41] : (~sP622(X41) | ~r1(X40,X41)) ) <=> ~sP623(X40)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP623])])). 23.40/23.21 fof(f283729,plain,( 23.40/23.21 ~sP623(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f266370,f1556])). 23.40/23.21 fof(f1556,plain,( 23.40/23.21 ( ! [X39,X40] : (~sP623(X40) | ~r1(X39,X40) | sP624(X39)) )), 23.40/23.21 inference(cnf_transformation,[],[f1556_D])). 23.40/23.21 fof(f1556_D,plain,( 23.40/23.21 ( ! [X39] : (( ! [X40] : (~sP623(X40) | ~r1(X39,X40)) ) <=> ~sP624(X39)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP624])])). 23.40/23.21 fof(f266370,plain,( 23.40/23.21 ~sP624(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f249742,f1558])). 23.40/23.21 fof(f1558,plain,( 23.40/23.21 ( ! [X39,X38] : (~sP624(X39) | ~r1(X38,X39) | sP625(X38)) )), 23.40/23.21 inference(cnf_transformation,[],[f1558_D])). 23.40/23.21 fof(f1558_D,plain,( 23.40/23.21 ( ! [X38] : (( ! [X39] : (~sP624(X39) | ~r1(X38,X39)) ) <=> ~sP625(X38)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP625])])). 23.40/23.21 fof(f249742,plain,( 23.40/23.21 ~sP625(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f233844,f1560])). 23.40/23.21 fof(f1560,plain,( 23.40/23.21 ( ! [X37,X38] : (~sP625(X38) | ~r1(X37,X38) | sP626(X37)) )), 23.40/23.21 inference(cnf_transformation,[],[f1560_D])). 23.40/23.21 fof(f1560_D,plain,( 23.40/23.21 ( ! [X37] : (( ! [X38] : (~sP625(X38) | ~r1(X37,X38)) ) <=> ~sP626(X37)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP626])])). 23.40/23.21 fof(f233844,plain,( 23.40/23.21 ~sP626(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f218644,f1562])). 23.40/23.21 fof(f1562,plain,( 23.40/23.21 ( ! [X37,X36] : (~sP626(X37) | ~r1(X36,X37) | sP627(X36)) )), 23.40/23.21 inference(cnf_transformation,[],[f1562_D])). 23.40/23.21 fof(f1562_D,plain,( 23.40/23.21 ( ! [X36] : (( ! [X37] : (~sP626(X37) | ~r1(X36,X37)) ) <=> ~sP627(X36)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP627])])). 23.40/23.21 fof(f218644,plain,( 23.40/23.21 ~sP627(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f204139,f1564])). 23.40/23.21 fof(f1564,plain,( 23.40/23.21 ( ! [X35,X36] : (~sP627(X36) | ~r1(X35,X36) | sP628(X35)) )), 23.40/23.21 inference(cnf_transformation,[],[f1564_D])). 23.40/23.21 fof(f1564_D,plain,( 23.40/23.21 ( ! [X35] : (( ! [X36] : (~sP627(X36) | ~r1(X35,X36)) ) <=> ~sP628(X35)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP628])])). 23.40/23.21 fof(f204139,plain,( 23.40/23.21 ~sP628(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f190307,f1566])). 23.40/23.21 fof(f1566,plain,( 23.40/23.21 ( ! [X35,X34] : (~sP628(X35) | ~r1(X34,X35) | sP629(X34)) )), 23.40/23.21 inference(cnf_transformation,[],[f1566_D])). 23.40/23.21 fof(f1566_D,plain,( 23.40/23.21 ( ! [X34] : (( ! [X35] : (~sP628(X35) | ~r1(X34,X35)) ) <=> ~sP629(X34)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP629])])). 23.40/23.21 fof(f190307,plain,( 23.40/23.21 ~sP629(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f177136,f1568])). 23.40/23.21 fof(f1568,plain,( 23.40/23.21 ( ! [X33,X34] : (~sP629(X34) | ~r1(X33,X34) | sP630(X33)) )), 23.40/23.21 inference(cnf_transformation,[],[f1568_D])). 23.40/23.21 fof(f1568_D,plain,( 23.40/23.21 ( ! [X33] : (( ! [X34] : (~sP629(X34) | ~r1(X33,X34)) ) <=> ~sP630(X33)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP630])])). 23.40/23.21 fof(f177136,plain,( 23.40/23.21 ~sP630(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f164609,f1570])). 23.40/23.21 fof(f1570,plain,( 23.40/23.21 ( ! [X33,X32] : (~sP630(X33) | ~r1(X32,X33) | sP631(X32)) )), 23.40/23.21 inference(cnf_transformation,[],[f1570_D])). 23.40/23.21 fof(f1570_D,plain,( 23.40/23.21 ( ! [X32] : (( ! [X33] : (~sP630(X33) | ~r1(X32,X33)) ) <=> ~sP631(X32)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP631])])). 23.40/23.21 fof(f164609,plain,( 23.40/23.21 ~sP631(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f152708,f1572])). 23.40/23.21 fof(f1572,plain,( 23.40/23.21 ( ! [X31,X32] : (~sP631(X32) | ~r1(X31,X32) | sP632(X31)) )), 23.40/23.21 inference(cnf_transformation,[],[f1572_D])). 23.40/23.21 fof(f1572_D,plain,( 23.40/23.21 ( ! [X31] : (( ! [X32] : (~sP631(X32) | ~r1(X31,X32)) ) <=> ~sP632(X31)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP632])])). 23.40/23.21 fof(f152708,plain,( 23.40/23.21 ~sP632(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f141417,f1574])). 23.40/23.21 fof(f1574,plain,( 23.40/23.21 ( ! [X30,X31] : (~sP632(X31) | ~r1(X30,X31) | sP633(X30)) )), 23.40/23.21 inference(cnf_transformation,[],[f1574_D])). 23.40/23.21 fof(f1574_D,plain,( 23.40/23.21 ( ! [X30] : (( ! [X31] : (~sP632(X31) | ~r1(X30,X31)) ) <=> ~sP633(X30)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP633])])). 23.40/23.21 fof(f141417,plain,( 23.40/23.21 ~sP633(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f130719,f1576])). 23.40/23.21 fof(f1576,plain,( 23.40/23.21 ( ! [X30,X29] : (~sP633(X30) | ~r1(X29,X30) | sP634(X29)) )), 23.40/23.21 inference(cnf_transformation,[],[f1576_D])). 23.40/23.21 fof(f1576_D,plain,( 23.40/23.21 ( ! [X29] : (( ! [X30] : (~sP633(X30) | ~r1(X29,X30)) ) <=> ~sP634(X29)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP634])])). 23.40/23.21 fof(f130719,plain,( 23.40/23.21 ~sP634(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f120601,f1578])). 23.40/23.21 fof(f1578,plain,( 23.40/23.21 ( ! [X28,X29] : (~sP634(X29) | ~r1(X28,X29) | sP635(X28)) )), 23.40/23.21 inference(cnf_transformation,[],[f1578_D])). 23.40/23.21 fof(f1578_D,plain,( 23.40/23.21 ( ! [X28] : (( ! [X29] : (~sP634(X29) | ~r1(X28,X29)) ) <=> ~sP635(X28)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP635])])). 23.40/23.21 fof(f120601,plain,( 23.40/23.21 ~sP635(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f111037,f1580])). 23.40/23.21 fof(f1580,plain,( 23.40/23.21 ( ! [X28,X27] : (~sP635(X28) | ~r1(X27,X28) | sP636(X27)) )), 23.40/23.21 inference(cnf_transformation,[],[f1580_D])). 23.40/23.21 fof(f1580_D,plain,( 23.40/23.21 ( ! [X27] : (( ! [X28] : (~sP635(X28) | ~r1(X27,X28)) ) <=> ~sP636(X27)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP636])])). 23.40/23.21 fof(f111037,plain,( 23.40/23.21 ~sP636(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f102025,f1582])). 23.40/23.21 fof(f1582,plain,( 23.40/23.21 ( ! [X26,X27] : (~sP636(X27) | ~r1(X26,X27) | sP637(X26)) )), 23.40/23.21 inference(cnf_transformation,[],[f1582_D])). 23.40/23.21 fof(f1582_D,plain,( 23.40/23.21 ( ! [X26] : (( ! [X27] : (~sP636(X27) | ~r1(X26,X27)) ) <=> ~sP637(X26)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP637])])). 23.40/23.21 fof(f102025,plain,( 23.40/23.21 ~sP637(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f93544,f1584])). 23.40/23.21 fof(f1584,plain,( 23.40/23.21 ( ! [X26,X25] : (~sP637(X26) | ~r1(X25,X26) | sP638(X25)) )), 23.40/23.21 inference(cnf_transformation,[],[f1584_D])). 23.40/23.21 fof(f1584_D,plain,( 23.40/23.21 ( ! [X25] : (( ! [X26] : (~sP637(X26) | ~r1(X25,X26)) ) <=> ~sP638(X25)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP638])])). 23.40/23.21 fof(f93544,plain,( 23.40/23.21 ~sP638(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f85576,f1586])). 23.40/23.21 fof(f1586,plain,( 23.40/23.21 ( ! [X24,X25] : (~sP638(X25) | ~r1(X24,X25) | sP639(X24)) )), 23.40/23.21 inference(cnf_transformation,[],[f1586_D])). 23.40/23.21 fof(f1586_D,plain,( 23.40/23.21 ( ! [X24] : (( ! [X25] : (~sP638(X25) | ~r1(X24,X25)) ) <=> ~sP639(X24)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP639])])). 23.40/23.21 fof(f85576,plain,( 23.40/23.21 ~sP639(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f78113,f1588])). 23.40/23.21 fof(f1588,plain,( 23.40/23.21 ( ! [X24,X23] : (~sP639(X24) | ~r1(X23,X24) | sP640(X23)) )), 23.40/23.21 inference(cnf_transformation,[],[f1588_D])). 23.40/23.21 fof(f1588_D,plain,( 23.40/23.21 ( ! [X23] : (( ! [X24] : (~sP639(X24) | ~r1(X23,X24)) ) <=> ~sP640(X23)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP640])])). 23.40/23.21 fof(f78113,plain,( 23.40/23.21 ~sP640(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f71117,f1590])). 23.40/23.21 fof(f1590,plain,( 23.40/23.21 ( ! [X23,X22] : (~sP640(X23) | ~r1(X22,X23) | sP641(X22)) )), 23.40/23.21 inference(cnf_transformation,[],[f1590_D])). 23.40/23.21 fof(f1590_D,plain,( 23.40/23.21 ( ! [X22] : (( ! [X23] : (~sP640(X23) | ~r1(X22,X23)) ) <=> ~sP641(X22)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP641])])). 23.40/23.21 fof(f71117,plain,( 23.40/23.21 ~sP641(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f64592,f1592])). 23.40/23.21 fof(f1592,plain,( 23.40/23.21 ( ! [X21,X22] : (~sP641(X22) | ~r1(X21,X22) | sP642(X21)) )), 23.40/23.21 inference(cnf_transformation,[],[f1592_D])). 23.40/23.21 fof(f1592_D,plain,( 23.40/23.21 ( ! [X21] : (( ! [X22] : (~sP641(X22) | ~r1(X21,X22)) ) <=> ~sP642(X21)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP642])])). 23.40/23.21 fof(f64592,plain,( 23.40/23.21 ~sP642(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f56518,f1594])). 23.40/23.21 fof(f1594,plain,( 23.40/23.21 ( ! [X21,X20] : (~sP642(X21) | ~r1(X20,X21) | sP643(X20)) )), 23.40/23.21 inference(cnf_transformation,[],[f1594_D])). 23.40/23.21 fof(f1594_D,plain,( 23.40/23.21 ( ! [X20] : (( ! [X21] : (~sP642(X21) | ~r1(X20,X21)) ) <=> ~sP643(X20)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP643])])). 23.40/23.21 fof(f56518,plain,( 23.40/23.21 ~sP643(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f49815,f1596])). 23.40/23.21 fof(f1596,plain,( 23.40/23.21 ( ! [X19,X20] : (~sP643(X20) | ~r1(X19,X20) | sP644(X19)) )), 23.40/23.21 inference(cnf_transformation,[],[f1596_D])). 23.40/23.21 fof(f1596_D,plain,( 23.40/23.21 ( ! [X19] : (( ! [X20] : (~sP643(X20) | ~r1(X19,X20)) ) <=> ~sP644(X19)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP644])])). 23.40/23.21 fof(f49815,plain,( 23.40/23.21 ~sP644(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f44287,f1598])). 23.40/23.21 fof(f1598,plain,( 23.40/23.21 ( ! [X19,X18] : (~sP644(X19) | ~r1(X18,X19) | sP645(X18)) )), 23.40/23.21 inference(cnf_transformation,[],[f1598_D])). 23.40/23.21 fof(f1598_D,plain,( 23.40/23.21 ( ! [X18] : (( ! [X19] : (~sP644(X19) | ~r1(X18,X19)) ) <=> ~sP645(X18)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP645])])). 23.40/23.21 fof(f44287,plain,( 23.40/23.21 ~sP645(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f39758,f1600])). 23.40/23.21 fof(f1600,plain,( 23.40/23.21 ( ! [X17,X18] : (~sP645(X18) | ~r1(X17,X18) | sP646(X17)) )), 23.40/23.21 inference(cnf_transformation,[],[f1600_D])). 23.40/23.21 fof(f1600_D,plain,( 23.40/23.21 ( ! [X17] : (( ! [X18] : (~sP645(X18) | ~r1(X17,X18)) ) <=> ~sP646(X17)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP646])])). 23.40/23.21 fof(f39758,plain,( 23.40/23.21 ~sP646(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f35603,f1601])). 23.40/23.21 fof(f1601,plain,( 23.40/23.21 ( ! [X17,X16] : (~sP646(X17) | ~sP614(X16) | ~r1(X16,X17)) )), 23.40/23.21 inference(general_splitting,[],[f1599,f1600_D])). 23.40/23.21 fof(f1599,plain,( 23.40/23.21 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP614(X16) | ~sP645(X18)) )), 23.40/23.21 inference(general_splitting,[],[f1597,f1598_D])). 23.40/23.21 fof(f1597,plain,( 23.40/23.21 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~sP614(X16) | ~sP644(X19)) )), 23.40/23.21 inference(general_splitting,[],[f1595,f1596_D])). 23.40/23.21 fof(f1595,plain,( 23.40/23.21 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP643(X20)) )), 23.40/23.21 inference(general_splitting,[],[f1593,f1594_D])). 23.40/23.21 fof(f1593,plain,( 23.40/23.21 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP642(X21)) )), 23.40/23.21 inference(general_splitting,[],[f1591,f1592_D])). 23.40/23.21 fof(f1591,plain,( 23.40/23.21 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP641(X22)) )), 23.40/23.21 inference(general_splitting,[],[f1589,f1590_D])). 23.40/23.21 fof(f1589,plain,( 23.40/23.21 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP640(X23)) )), 23.40/23.21 inference(general_splitting,[],[f1587,f1588_D])). 23.40/23.21 fof(f1587,plain,( 23.40/23.21 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP639(X24)) )), 23.40/23.21 inference(general_splitting,[],[f1585,f1586_D])). 23.40/23.21 fof(f1585,plain,( 23.40/23.21 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP638(X25)) )), 23.40/23.21 inference(general_splitting,[],[f1583,f1584_D])). 23.40/23.21 fof(f1583,plain,( 23.40/23.21 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP637(X26)) )), 23.40/23.21 inference(general_splitting,[],[f1581,f1582_D])). 23.40/23.21 fof(f1581,plain,( 23.40/23.21 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP636(X27)) )), 23.40/23.21 inference(general_splitting,[],[f1579,f1580_D])). 23.40/23.21 fof(f1579,plain,( 23.40/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP635(X28)) )), 23.40/23.21 inference(general_splitting,[],[f1577,f1578_D])). 23.40/23.21 fof(f1577,plain,( 23.40/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP634(X29)) )), 23.40/23.21 inference(general_splitting,[],[f1575,f1576_D])). 23.40/23.21 fof(f1575,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP633(X30)) )), 23.40/23.21 inference(general_splitting,[],[f1573,f1574_D])). 23.40/23.21 fof(f1573,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP632(X31)) )), 23.40/23.21 inference(general_splitting,[],[f1571,f1572_D])). 23.40/23.21 fof(f1571,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP631(X32)) )), 23.40/23.21 inference(general_splitting,[],[f1569,f1570_D])). 23.40/23.21 fof(f1569,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP630(X33)) )), 23.40/23.21 inference(general_splitting,[],[f1567,f1568_D])). 23.40/23.21 fof(f1567,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP629(X34)) )), 23.40/23.21 inference(general_splitting,[],[f1565,f1566_D])). 23.40/23.21 fof(f1565,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP628(X35)) )), 23.40/23.21 inference(general_splitting,[],[f1563,f1564_D])). 23.40/23.21 fof(f1563,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP627(X36)) )), 23.40/23.21 inference(general_splitting,[],[f1561,f1562_D])). 23.40/23.21 fof(f1561,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP626(X37)) )), 23.40/23.21 inference(general_splitting,[],[f1559,f1560_D])). 23.40/23.21 fof(f1559,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP625(X38)) )), 23.40/23.21 inference(general_splitting,[],[f1557,f1558_D])). 23.40/23.21 fof(f1557,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP624(X39)) )), 23.40/23.21 inference(general_splitting,[],[f1555,f1556_D])). 23.40/23.21 fof(f1555,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP623(X40)) )), 23.40/23.21 inference(general_splitting,[],[f1553,f1554_D])). 23.40/23.21 fof(f1553,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP622(X41)) )), 23.40/23.21 inference(general_splitting,[],[f1551,f1552_D])). 23.40/23.21 fof(f1551,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP621(X42)) )), 23.40/23.21 inference(general_splitting,[],[f1549,f1550_D])). 23.40/23.21 fof(f1549,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP620(X43)) )), 23.40/23.21 inference(general_splitting,[],[f1547,f1548_D])). 23.40/23.21 fof(f1547,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP619(X44)) )), 23.40/23.21 inference(general_splitting,[],[f1545,f1546_D])). 23.40/23.21 fof(f1545,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP618(X45)) )), 23.40/23.21 inference(general_splitting,[],[f1543,f1544_D])). 23.40/23.21 fof(f1543,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP617(X46)) )), 23.40/23.21 inference(general_splitting,[],[f1541,f1542_D])). 23.40/23.21 fof(f1541,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP616(X47)) )), 23.40/23.21 inference(general_splitting,[],[f1539,f1540_D])). 23.40/23.21 fof(f1539,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16) | ~sP615(X48)) )), 23.40/23.21 inference(general_splitting,[],[f1537,f1538_D])). 23.40/23.21 fof(f1537,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X44,X40,X20,X49,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP614(X16)) )), 23.40/23.21 inference(general_splitting,[],[f1535,f1536_D])). 23.40/23.21 fof(f1536,plain,( 23.40/23.21 ( ! [X15,X16] : (sP614(X16) | ~sP613(X15) | ~r1(X15,X16)) )), 23.40/23.21 inference(cnf_transformation,[],[f1536_D])). 23.40/23.21 fof(f1536_D,plain,( 23.40/23.21 ( ! [X16] : (( ! [X15] : (~sP613(X15) | ~r1(X15,X16)) ) <=> ~sP614(X16)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP614])])). 23.40/23.21 fof(f1535,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP613(X15)) )), 23.40/23.21 inference(general_splitting,[],[f1533,f1534_D])). 23.40/23.21 fof(f1534,plain,( 23.40/23.21 ( ! [X14,X15] : (sP613(X15) | ~sP612(X14) | ~r1(X14,X15)) )), 23.40/23.21 inference(cnf_transformation,[],[f1534_D])). 23.40/23.21 fof(f1534_D,plain,( 23.40/23.21 ( ! [X15] : (( ! [X14] : (~sP612(X14) | ~r1(X14,X15)) ) <=> ~sP613(X15)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP613])])). 23.40/23.21 fof(f1533,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~sP612(X14)) )), 23.40/23.21 inference(general_splitting,[],[f1531,f1532_D])). 23.40/23.21 fof(f1532,plain,( 23.40/23.21 ( ! [X14,X13] : (sP612(X14) | ~sP611(X13) | ~r1(X13,X14)) )), 23.40/23.21 inference(cnf_transformation,[],[f1532_D])). 23.40/23.21 fof(f1532_D,plain,( 23.40/23.21 ( ! [X14] : (( ! [X13] : (~sP611(X13) | ~r1(X13,X14)) ) <=> ~sP612(X14)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP612])])). 23.40/23.21 fof(f1531,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~sP611(X13)) )), 23.40/23.21 inference(general_splitting,[],[f1529,f1530_D])). 23.40/23.21 fof(f1530,plain,( 23.40/23.21 ( ! [X12,X13] : (sP611(X13) | ~sP610(X12) | ~r1(X12,X13)) )), 23.40/23.21 inference(cnf_transformation,[],[f1530_D])). 23.40/23.21 fof(f1530_D,plain,( 23.40/23.21 ( ! [X13] : (( ! [X12] : (~sP610(X12) | ~r1(X12,X13)) ) <=> ~sP611(X13)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP611])])). 23.40/23.21 fof(f1529,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X40,X20,X49,X16] : (~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~sP610(X12)) )), 23.40/23.21 inference(general_splitting,[],[f1527,f1528_D])). 23.40/23.21 fof(f1528,plain,( 23.40/23.21 ( ! [X12,X11] : (sP610(X12) | ~sP609(X11) | ~r1(X11,X12)) )), 23.40/23.21 inference(cnf_transformation,[],[f1528_D])). 23.40/23.21 fof(f1528_D,plain,( 23.40/23.21 ( ! [X12] : (( ! [X11] : (~sP609(X11) | ~r1(X11,X12)) ) <=> ~sP610(X12)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP610])])). 23.40/23.21 fof(f1527,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~sP609(X11)) )), 23.40/23.21 inference(general_splitting,[],[f1525,f1526_D])). 23.40/23.21 fof(f1526,plain,( 23.40/23.21 ( ! [X10,X11] : (sP609(X11) | ~sP608(X10) | ~r1(X10,X11)) )), 23.40/23.21 inference(cnf_transformation,[],[f1526_D])). 23.40/23.21 fof(f1526_D,plain,( 23.40/23.21 ( ! [X11] : (( ! [X10] : (~sP608(X10) | ~r1(X10,X11)) ) <=> ~sP609(X11)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP609])])). 23.40/23.21 fof(f1525,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~sP608(X10)) )), 23.40/23.21 inference(general_splitting,[],[f1523,f1524_D])). 23.40/23.21 fof(f1524,plain,( 23.40/23.21 ( ! [X10,X9] : (sP608(X10) | ~sP607(X9) | ~r1(X9,X10)) )), 23.40/23.21 inference(cnf_transformation,[],[f1524_D])). 23.40/23.21 fof(f1524_D,plain,( 23.40/23.21 ( ! [X10] : (( ! [X9] : (~sP607(X9) | ~r1(X9,X10)) ) <=> ~sP608(X10)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP608])])). 23.40/23.21 fof(f1523,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~sP607(X9)) )), 23.40/23.21 inference(general_splitting,[],[f1521,f1522_D])). 23.40/23.21 fof(f1522,plain,( 23.40/23.21 ( ! [X8,X9] : (sP607(X9) | ~sP606(X8) | ~r1(X8,X9)) )), 23.40/23.21 inference(cnf_transformation,[],[f1522_D])). 23.40/23.21 fof(f1522_D,plain,( 23.40/23.21 ( ! [X9] : (( ! [X8] : (~sP606(X8) | ~r1(X8,X9)) ) <=> ~sP607(X9)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP607])])). 23.40/23.21 fof(f1521,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP606(X8)) )), 23.40/23.21 inference(general_splitting,[],[f1519,f1520_D])). 23.40/23.21 fof(f1520,plain,( 23.40/23.21 ( ! [X8,X7] : (sP606(X8) | ~sP605(X7) | ~r1(X7,X8)) )), 23.40/23.21 inference(cnf_transformation,[],[f1520_D])). 23.40/23.21 fof(f1520_D,plain,( 23.40/23.21 ( ! [X8] : (( ! [X7] : (~sP605(X7) | ~r1(X7,X8)) ) <=> ~sP606(X8)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP606])])). 23.40/23.21 fof(f1519,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP605(X7)) )), 23.40/23.21 inference(general_splitting,[],[f1517,f1518_D])). 23.40/23.21 fof(f1518,plain,( 23.40/23.21 ( ! [X6,X7] : (sP605(X7) | ~sP604(X6) | ~r1(X6,X7)) )), 23.40/23.21 inference(cnf_transformation,[],[f1518_D])). 23.40/23.21 fof(f1518_D,plain,( 23.40/23.21 ( ! [X7] : (( ! [X6] : (~sP604(X6) | ~r1(X6,X7)) ) <=> ~sP605(X7)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP605])])). 23.40/23.21 fof(f1517,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP604(X6)) )), 23.40/23.21 inference(general_splitting,[],[f1515,f1516_D])). 23.40/23.21 fof(f1516,plain,( 23.40/23.21 ( ! [X6,X5] : (sP604(X6) | ~sP603(X5) | ~r1(X5,X6)) )), 23.40/23.21 inference(cnf_transformation,[],[f1516_D])). 23.40/23.21 fof(f1516_D,plain,( 23.40/23.21 ( ! [X6] : (( ! [X5] : (~sP603(X5) | ~r1(X5,X6)) ) <=> ~sP604(X6)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP604])])). 23.40/23.21 fof(f1515,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X5,X6) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP603(X5)) )), 23.40/23.21 inference(general_splitting,[],[f1513,f1514_D])). 23.40/23.21 fof(f1514,plain,( 23.40/23.21 ( ! [X4,X5] : (sP603(X5) | ~sP602(X4) | ~r1(X4,X5)) )), 23.40/23.21 inference(cnf_transformation,[],[f1514_D])). 23.40/23.21 fof(f1514_D,plain,( 23.40/23.21 ( ! [X5] : (( ! [X4] : (~sP602(X4) | ~r1(X4,X5)) ) <=> ~sP603(X5)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP603])])). 23.40/23.21 fof(f1513,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X5,X6) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X4,X5) | ~sP602(X4)) )), 23.40/23.21 inference(general_splitting,[],[f1511,f1512_D])). 23.40/23.21 fof(f1512,plain,( 23.40/23.21 ( ! [X4,X3] : (sP602(X4) | ~sP601(X3) | ~r1(X3,X4)) )), 23.40/23.21 inference(cnf_transformation,[],[f1512_D])). 23.40/23.21 fof(f1512_D,plain,( 23.40/23.21 ( ! [X4] : (( ! [X3] : (~sP601(X3) | ~r1(X3,X4)) ) <=> ~sP602(X4)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP602])])). 23.40/23.21 fof(f1511,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X4,X5) | ~sP601(X3)) )), 23.40/23.21 inference(general_splitting,[],[f1509,f1510_D])). 23.40/23.21 fof(f1510,plain,( 23.40/23.21 ( ! [X3,X1] : (sP601(X3) | ~sP600(X1) | ~r1(X1,X3)) )), 23.40/23.21 inference(cnf_transformation,[],[f1510_D])). 23.40/23.21 fof(f1510_D,plain,( 23.40/23.21 ( ! [X3] : (( ! [X1] : (~sP600(X1) | ~r1(X1,X3)) ) <=> ~sP601(X3)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP601])])). 23.40/23.21 fof(f1509,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X49,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X4,X5) | ~sP600(X1)) )), 23.40/23.21 inference(general_splitting,[],[f382,f1508_D])). 23.40/23.21 fof(f1508,plain,( 23.40/23.21 ( ! [X0,X1] : (sP600(X1) | ~sP43(X0) | ~r1(X0,X1)) )), 23.40/23.21 inference(cnf_transformation,[],[f1508_D])). 23.40/23.21 fof(f1508_D,plain,( 23.40/23.21 ( ! [X1] : (( ! [X0] : (~sP43(X0) | ~r1(X0,X1)) ) <=> ~sP600(X1)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP600])])). 23.40/23.21 fof(f382,plain,( 23.40/23.21 ( ! [X28,X4,X33,X12,X41,X17,X25,X38,X1,X46,X9,X22,X30,X6,X35,X14,X43,X19,X48,X27,X3,X32,X11,X40,X16,X24,X37,X0,X45,X8,X21,X29,X5,X34,X13,X42,X18,X26,X39,X47,X10,X23,X31,X7,X36,X15,X44,X20,X49] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X47,X48) | p46(X49) | p45(X49) | ~r1(X48,X49) | ~r1(X44,X45) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X4,X5) | ~r1(X0,X1) | ~sP43(X0)) )), 23.40/23.21 inference(cnf_transformation,[],[f78])). 23.40/23.21 fof(f35603,plain,( 23.40/23.21 sP614(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f31806,f1536])). 23.40/23.21 fof(f31806,plain,( 23.40/23.21 sP613(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f28336,f1534])). 23.40/23.21 fof(f28336,plain,( 23.40/23.21 sP612(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f25207,f1532])). 23.40/23.21 fof(f25207,plain,( 23.40/23.21 sP611(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f22388,f1530])). 23.40/23.21 fof(f22388,plain,( 23.40/23.21 sP610(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f19863,f1528])). 23.40/23.21 fof(f19863,plain,( 23.40/23.21 sP609(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f17601,f1526])). 23.40/23.21 fof(f17601,plain,( 23.40/23.21 sP608(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f15194,f1524])). 23.40/23.21 fof(f15194,plain,( 23.40/23.21 sP607(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f13147,f1522])). 23.40/23.21 fof(f13147,plain,( 23.40/23.21 sP606(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f11432,f1520])). 23.40/23.21 fof(f11432,plain,( 23.40/23.21 sP605(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f10284,f1518])). 23.40/23.21 fof(f10284,plain,( 23.40/23.21 sP604(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f9322,f1516])). 23.40/23.21 fof(f9322,plain,( 23.40/23.21 sP603(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f8353,f1514])). 23.40/23.21 fof(f8353,plain,( 23.40/23.21 sP602(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f7752,f1512])). 23.40/23.21 fof(f7752,plain,( 23.40/23.21 sP601(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f7285,f1510])). 23.40/23.21 fof(f7285,plain,( 23.40/23.21 sP600(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f6934,f1508])). 23.40/23.21 fof(f472387,plain,( 23.40/23.21 ~sP742(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f449018,f1794])). 23.40/23.21 fof(f1794,plain,( 23.40/23.21 ( ! [X47,X46] : (~sP742(X47) | ~r1(X46,X47) | sP743(X46)) )), 23.40/23.21 inference(cnf_transformation,[],[f1794_D])). 23.40/23.21 fof(f1794_D,plain,( 23.40/23.21 ( ! [X46] : (( ! [X47] : (~sP742(X47) | ~r1(X46,X47)) ) <=> ~sP743(X46)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP743])])). 23.40/23.21 fof(f449018,plain,( 23.40/23.21 ~sP743(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f425868,f1796])). 23.40/23.21 fof(f1796,plain,( 23.40/23.21 ( ! [X45,X46] : (~sP743(X46) | ~r1(X45,X46) | sP744(X45)) )), 23.40/23.21 inference(cnf_transformation,[],[f1796_D])). 23.40/23.21 fof(f1796_D,plain,( 23.40/23.21 ( ! [X45] : (( ! [X46] : (~sP743(X46) | ~r1(X45,X46)) ) <=> ~sP744(X45)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP744])])). 23.40/23.21 fof(f425868,plain,( 23.40/23.21 ~sP744(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f403034,f1798])). 23.40/23.21 fof(f1798,plain,( 23.40/23.21 ( ! [X45,X44] : (~sP744(X45) | ~r1(X44,X45) | sP745(X44)) )), 23.40/23.21 inference(cnf_transformation,[],[f1798_D])). 23.40/23.21 fof(f1798_D,plain,( 23.40/23.21 ( ! [X44] : (( ! [X45] : (~sP744(X45) | ~r1(X44,X45)) ) <=> ~sP745(X44)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP745])])). 23.40/23.21 fof(f403034,plain,( 23.40/23.21 ~sP745(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f378349,f1816])). 23.40/23.21 fof(f1816,plain,( 23.40/23.21 ( ! [X43,X44] : (~sP745(X44) | ~r1(X43,X44) | sP754(X43)) )), 23.40/23.21 inference(cnf_transformation,[],[f1816_D])). 23.40/23.21 fof(f1816_D,plain,( 23.40/23.21 ( ! [X43] : (( ! [X44] : (~sP745(X44) | ~r1(X43,X44)) ) <=> ~sP754(X43)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP754])])). 23.40/23.21 fof(f378349,plain,( 23.40/23.21 ~sP754(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f342869,f1818])). 23.40/23.21 fof(f1818,plain,( 23.40/23.21 ( ! [X43,X42] : (~sP754(X43) | ~r1(X42,X43) | sP755(X42)) )), 23.40/23.21 inference(cnf_transformation,[],[f1818_D])). 23.40/23.21 fof(f1818_D,plain,( 23.40/23.21 ( ! [X42] : (( ! [X43] : (~sP754(X43) | ~r1(X42,X43)) ) <=> ~sP755(X42)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP755])])). 23.40/23.21 fof(f342869,plain,( 23.40/23.21 ~sP755(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f320739,f1820])). 23.40/23.21 fof(f1820,plain,( 23.40/23.21 ( ! [X41,X42] : (~sP755(X42) | ~r1(X41,X42) | sP756(X41)) )), 23.40/23.21 inference(cnf_transformation,[],[f1820_D])). 23.40/23.21 fof(f1820_D,plain,( 23.40/23.21 ( ! [X41] : (( ! [X42] : (~sP755(X42) | ~r1(X41,X42)) ) <=> ~sP756(X41)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP756])])). 23.40/23.21 fof(f320739,plain,( 23.40/23.21 ~sP756(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f301848,f1822])). 23.40/23.21 fof(f1822,plain,( 23.40/23.21 ( ! [X41,X40] : (~sP756(X41) | ~r1(X40,X41) | sP757(X40)) )), 23.40/23.21 inference(cnf_transformation,[],[f1822_D])). 23.40/23.21 fof(f1822_D,plain,( 23.40/23.21 ( ! [X40] : (( ! [X41] : (~sP756(X41) | ~r1(X40,X41)) ) <=> ~sP757(X40)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP757])])). 23.40/23.21 fof(f301848,plain,( 23.40/23.21 ~sP757(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f283727,f1834])). 23.40/23.21 fof(f1834,plain,( 23.40/23.21 ( ! [X39,X40] : (~sP757(X40) | ~r1(X39,X40) | sP763(X39)) )), 23.40/23.21 inference(cnf_transformation,[],[f1834_D])). 23.40/23.21 fof(f1834_D,plain,( 23.40/23.21 ( ! [X39] : (( ! [X40] : (~sP757(X40) | ~r1(X39,X40)) ) <=> ~sP763(X39)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP763])])). 23.40/23.21 fof(f283727,plain,( 23.40/23.21 ~sP763(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f266368,f1836])). 23.40/23.21 fof(f1836,plain,( 23.40/23.21 ( ! [X39,X38] : (~sP763(X39) | ~r1(X38,X39) | sP764(X38)) )), 23.40/23.21 inference(cnf_transformation,[],[f1836_D])). 23.40/23.21 fof(f1836_D,plain,( 23.40/23.21 ( ! [X38] : (( ! [X39] : (~sP763(X39) | ~r1(X38,X39)) ) <=> ~sP764(X38)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP764])])). 23.40/23.21 fof(f266368,plain,( 23.40/23.21 ~sP764(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f249740,f1838])). 23.40/23.21 fof(f1838,plain,( 23.40/23.21 ( ! [X37,X38] : (~sP764(X38) | ~r1(X37,X38) | sP765(X37)) )), 23.40/23.21 inference(cnf_transformation,[],[f1838_D])). 23.40/23.21 fof(f1838_D,plain,( 23.40/23.21 ( ! [X37] : (( ! [X38] : (~sP764(X38) | ~r1(X37,X38)) ) <=> ~sP765(X37)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP765])])). 23.40/23.21 fof(f249740,plain,( 23.40/23.21 ~sP765(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f233842,f1840])). 23.40/23.21 fof(f1840,plain,( 23.40/23.21 ( ! [X37,X36] : (~sP765(X37) | ~r1(X36,X37) | sP766(X36)) )), 23.40/23.21 inference(cnf_transformation,[],[f1840_D])). 23.40/23.21 fof(f1840_D,plain,( 23.40/23.21 ( ! [X36] : (( ! [X37] : (~sP765(X37) | ~r1(X36,X37)) ) <=> ~sP766(X36)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP766])])). 23.40/23.21 fof(f233842,plain,( 23.40/23.21 ~sP766(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f218642,f1842])). 23.40/23.21 fof(f1842,plain,( 23.40/23.21 ( ! [X35,X36] : (~sP766(X36) | ~r1(X35,X36) | sP767(X35)) )), 23.40/23.21 inference(cnf_transformation,[],[f1842_D])). 23.40/23.21 fof(f1842_D,plain,( 23.40/23.21 ( ! [X35] : (( ! [X36] : (~sP766(X36) | ~r1(X35,X36)) ) <=> ~sP767(X35)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP767])])). 23.40/23.21 fof(f218642,plain,( 23.40/23.21 ~sP767(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f204137,f1844])). 23.40/23.21 fof(f1844,plain,( 23.40/23.21 ( ! [X35,X34] : (~sP767(X35) | ~r1(X34,X35) | sP768(X34)) )), 23.40/23.21 inference(cnf_transformation,[],[f1844_D])). 23.40/23.21 fof(f1844_D,plain,( 23.40/23.21 ( ! [X34] : (( ! [X35] : (~sP767(X35) | ~r1(X34,X35)) ) <=> ~sP768(X34)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP768])])). 23.40/23.21 fof(f204137,plain,( 23.40/23.21 ~sP768(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f190305,f1846])). 23.40/23.21 fof(f1846,plain,( 23.40/23.21 ( ! [X33,X34] : (~sP768(X34) | ~r1(X33,X34) | sP769(X33)) )), 23.40/23.21 inference(cnf_transformation,[],[f1846_D])). 23.40/23.21 fof(f1846_D,plain,( 23.40/23.21 ( ! [X33] : (( ! [X34] : (~sP768(X34) | ~r1(X33,X34)) ) <=> ~sP769(X33)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP769])])). 23.40/23.21 fof(f190305,plain,( 23.40/23.21 ~sP769(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f177134,f1848])). 23.40/23.21 fof(f1848,plain,( 23.40/23.21 ( ! [X33,X32] : (~sP769(X33) | ~r1(X32,X33) | sP770(X32)) )), 23.40/23.21 inference(cnf_transformation,[],[f1848_D])). 23.40/23.21 fof(f1848_D,plain,( 23.40/23.21 ( ! [X32] : (( ! [X33] : (~sP769(X33) | ~r1(X32,X33)) ) <=> ~sP770(X32)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP770])])). 23.40/23.21 fof(f177134,plain,( 23.40/23.21 ~sP770(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f164607,f1850])). 23.40/23.21 fof(f1850,plain,( 23.40/23.21 ( ! [X31,X32] : (~sP770(X32) | ~r1(X31,X32) | sP771(X31)) )), 23.40/23.21 inference(cnf_transformation,[],[f1850_D])). 23.40/23.21 fof(f1850_D,plain,( 23.40/23.21 ( ! [X31] : (( ! [X32] : (~sP770(X32) | ~r1(X31,X32)) ) <=> ~sP771(X31)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP771])])). 23.40/23.21 fof(f164607,plain,( 23.40/23.21 ~sP771(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f152706,f1852])). 23.40/23.21 fof(f1852,plain,( 23.40/23.21 ( ! [X30,X31] : (~sP771(X31) | ~r1(X30,X31) | sP772(X30)) )), 23.40/23.21 inference(cnf_transformation,[],[f1852_D])). 23.40/23.21 fof(f1852_D,plain,( 23.40/23.21 ( ! [X30] : (( ! [X31] : (~sP771(X31) | ~r1(X30,X31)) ) <=> ~sP772(X30)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP772])])). 23.40/23.21 fof(f152706,plain,( 23.40/23.21 ~sP772(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f141415,f1854])). 23.40/23.21 fof(f1854,plain,( 23.40/23.21 ( ! [X30,X29] : (~sP772(X30) | ~r1(X29,X30) | sP773(X29)) )), 23.40/23.21 inference(cnf_transformation,[],[f1854_D])). 23.40/23.21 fof(f1854_D,plain,( 23.40/23.21 ( ! [X29] : (( ! [X30] : (~sP772(X30) | ~r1(X29,X30)) ) <=> ~sP773(X29)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP773])])). 23.40/23.21 fof(f141415,plain,( 23.40/23.21 ~sP773(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f130717,f1856])). 23.40/23.21 fof(f1856,plain,( 23.40/23.21 ( ! [X28,X29] : (~sP773(X29) | ~r1(X28,X29) | sP774(X28)) )), 23.40/23.21 inference(cnf_transformation,[],[f1856_D])). 23.40/23.21 fof(f1856_D,plain,( 23.40/23.21 ( ! [X28] : (( ! [X29] : (~sP773(X29) | ~r1(X28,X29)) ) <=> ~sP774(X28)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP774])])). 23.40/23.21 fof(f130717,plain,( 23.40/23.21 ~sP774(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f120599,f1858])). 23.40/23.21 fof(f1858,plain,( 23.40/23.21 ( ! [X28,X27] : (~sP774(X28) | ~r1(X27,X28) | sP775(X27)) )), 23.40/23.21 inference(cnf_transformation,[],[f1858_D])). 23.40/23.21 fof(f1858_D,plain,( 23.40/23.21 ( ! [X27] : (( ! [X28] : (~sP774(X28) | ~r1(X27,X28)) ) <=> ~sP775(X27)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP775])])). 23.40/23.21 fof(f120599,plain,( 23.40/23.21 ~sP775(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f111035,f1860])). 23.40/23.21 fof(f1860,plain,( 23.40/23.21 ( ! [X26,X27] : (~sP775(X27) | ~r1(X26,X27) | sP776(X26)) )), 23.40/23.21 inference(cnf_transformation,[],[f1860_D])). 23.40/23.21 fof(f1860_D,plain,( 23.40/23.21 ( ! [X26] : (( ! [X27] : (~sP775(X27) | ~r1(X26,X27)) ) <=> ~sP776(X26)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP776])])). 23.40/23.21 fof(f111035,plain,( 23.40/23.21 ~sP776(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f102023,f1862])). 23.40/23.21 fof(f1862,plain,( 23.40/23.21 ( ! [X26,X25] : (~sP776(X26) | ~r1(X25,X26) | sP777(X25)) )), 23.40/23.21 inference(cnf_transformation,[],[f1862_D])). 23.40/23.21 fof(f1862_D,plain,( 23.40/23.21 ( ! [X25] : (( ! [X26] : (~sP776(X26) | ~r1(X25,X26)) ) <=> ~sP777(X25)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP777])])). 23.40/23.21 fof(f102023,plain,( 23.40/23.21 ~sP777(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f93542,f1864])). 23.40/23.21 fof(f1864,plain,( 23.40/23.21 ( ! [X24,X25] : (~sP777(X25) | ~r1(X24,X25) | sP778(X24)) )), 23.40/23.21 inference(cnf_transformation,[],[f1864_D])). 23.40/23.21 fof(f1864_D,plain,( 23.40/23.21 ( ! [X24] : (( ! [X25] : (~sP777(X25) | ~r1(X24,X25)) ) <=> ~sP778(X24)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP778])])). 23.40/23.21 fof(f93542,plain,( 23.40/23.21 ~sP778(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f85574,f1866])). 23.40/23.21 fof(f1866,plain,( 23.40/23.21 ( ! [X24,X23] : (~sP778(X24) | ~r1(X23,X24) | sP779(X23)) )), 23.40/23.21 inference(cnf_transformation,[],[f1866_D])). 23.40/23.21 fof(f1866_D,plain,( 23.40/23.21 ( ! [X23] : (( ! [X24] : (~sP778(X24) | ~r1(X23,X24)) ) <=> ~sP779(X23)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP779])])). 23.40/23.21 fof(f85574,plain,( 23.40/23.21 ~sP779(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f78111,f1868])). 23.40/23.21 fof(f1868,plain,( 23.40/23.21 ( ! [X23,X22] : (~sP779(X23) | ~r1(X22,X23) | sP780(X22)) )), 23.40/23.21 inference(cnf_transformation,[],[f1868_D])). 23.40/23.21 fof(f1868_D,plain,( 23.40/23.21 ( ! [X22] : (( ! [X23] : (~sP779(X23) | ~r1(X22,X23)) ) <=> ~sP780(X22)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP780])])). 23.40/23.21 fof(f78111,plain,( 23.40/23.21 ~sP780(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f71115,f1870])). 23.40/23.21 fof(f1870,plain,( 23.40/23.21 ( ! [X21,X22] : (~sP780(X22) | ~r1(X21,X22) | sP781(X21)) )), 23.40/23.21 inference(cnf_transformation,[],[f1870_D])). 23.40/23.21 fof(f1870_D,plain,( 23.40/23.21 ( ! [X21] : (( ! [X22] : (~sP780(X22) | ~r1(X21,X22)) ) <=> ~sP781(X21)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP781])])). 23.40/23.21 fof(f71115,plain,( 23.40/23.21 ~sP781(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f64590,f1872])). 23.40/23.21 fof(f1872,plain,( 23.40/23.21 ( ! [X21,X20] : (~sP781(X21) | ~r1(X20,X21) | sP782(X20)) )), 23.40/23.21 inference(cnf_transformation,[],[f1872_D])). 23.40/23.21 fof(f1872_D,plain,( 23.40/23.21 ( ! [X20] : (( ! [X21] : (~sP781(X21) | ~r1(X20,X21)) ) <=> ~sP782(X20)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP782])])). 23.40/23.21 fof(f64590,plain,( 23.40/23.21 ~sP782(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f56516,f1874])). 23.40/23.21 fof(f1874,plain,( 23.40/23.21 ( ! [X19,X20] : (~sP782(X20) | ~r1(X19,X20) | sP783(X19)) )), 23.40/23.21 inference(cnf_transformation,[],[f1874_D])). 23.40/23.21 fof(f1874_D,plain,( 23.40/23.21 ( ! [X19] : (( ! [X20] : (~sP782(X20) | ~r1(X19,X20)) ) <=> ~sP783(X19)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP783])])). 23.40/23.21 fof(f56516,plain,( 23.40/23.21 ~sP783(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f49813,f1876])). 23.40/23.21 fof(f1876,plain,( 23.40/23.21 ( ! [X19,X18] : (~sP783(X19) | ~r1(X18,X19) | sP784(X18)) )), 23.40/23.21 inference(cnf_transformation,[],[f1876_D])). 23.40/23.21 fof(f1876_D,plain,( 23.40/23.21 ( ! [X18] : (( ! [X19] : (~sP783(X19) | ~r1(X18,X19)) ) <=> ~sP784(X18)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP784])])). 23.40/23.21 fof(f49813,plain,( 23.40/23.21 ~sP784(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f44285,f1878])). 23.40/23.21 fof(f1878,plain,( 23.40/23.21 ( ! [X17,X18] : (~sP784(X18) | ~r1(X17,X18) | sP785(X17)) )), 23.40/23.21 inference(cnf_transformation,[],[f1878_D])). 23.40/23.21 fof(f1878_D,plain,( 23.40/23.21 ( ! [X17] : (( ! [X18] : (~sP784(X18) | ~r1(X17,X18)) ) <=> ~sP785(X17)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP785])])). 23.40/23.21 fof(f44285,plain,( 23.40/23.21 ~sP785(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f39756,f1879])). 23.40/23.21 fof(f1879,plain,( 23.40/23.21 ( ! [X17,X16] : (~sP785(X17) | ~sP762(X16) | ~r1(X16,X17)) )), 23.40/23.21 inference(general_splitting,[],[f1877,f1878_D])). 23.40/23.21 fof(f1877,plain,( 23.40/23.21 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP762(X16) | ~sP784(X18)) )), 23.40/23.21 inference(general_splitting,[],[f1875,f1876_D])). 23.40/23.21 fof(f1875,plain,( 23.40/23.21 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP783(X19)) )), 23.40/23.21 inference(general_splitting,[],[f1873,f1874_D])). 23.40/23.21 fof(f1873,plain,( 23.40/23.21 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP782(X20)) )), 23.40/23.21 inference(general_splitting,[],[f1871,f1872_D])). 23.40/23.21 fof(f1871,plain,( 23.40/23.21 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP781(X21)) )), 23.40/23.21 inference(general_splitting,[],[f1869,f1870_D])). 23.40/23.21 fof(f1869,plain,( 23.40/23.21 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP780(X22)) )), 23.40/23.21 inference(general_splitting,[],[f1867,f1868_D])). 23.40/23.21 fof(f1867,plain,( 23.40/23.21 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP779(X23)) )), 23.40/23.21 inference(general_splitting,[],[f1865,f1866_D])). 23.40/23.21 fof(f1865,plain,( 23.40/23.21 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP778(X24)) )), 23.40/23.21 inference(general_splitting,[],[f1863,f1864_D])). 23.40/23.21 fof(f1863,plain,( 23.40/23.21 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP777(X25)) )), 23.40/23.21 inference(general_splitting,[],[f1861,f1862_D])). 23.40/23.21 fof(f1861,plain,( 23.40/23.21 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP776(X26)) )), 23.40/23.21 inference(general_splitting,[],[f1859,f1860_D])). 23.40/23.21 fof(f1859,plain,( 23.40/23.21 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP775(X27)) )), 23.40/23.21 inference(general_splitting,[],[f1857,f1858_D])). 23.40/23.21 fof(f1857,plain,( 23.40/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP774(X28)) )), 23.40/23.21 inference(general_splitting,[],[f1855,f1856_D])). 23.40/23.21 fof(f1855,plain,( 23.40/23.21 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP773(X29)) )), 23.40/23.21 inference(general_splitting,[],[f1853,f1854_D])). 23.40/23.21 fof(f1853,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP772(X30)) )), 23.40/23.21 inference(general_splitting,[],[f1851,f1852_D])). 23.40/23.21 fof(f1851,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP771(X31)) )), 23.40/23.21 inference(general_splitting,[],[f1849,f1850_D])). 23.40/23.21 fof(f1849,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP770(X32)) )), 23.40/23.21 inference(general_splitting,[],[f1847,f1848_D])). 23.40/23.21 fof(f1847,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP769(X33)) )), 23.40/23.21 inference(general_splitting,[],[f1845,f1846_D])). 23.40/23.21 fof(f1845,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP768(X34)) )), 23.40/23.21 inference(general_splitting,[],[f1843,f1844_D])). 23.40/23.21 fof(f1843,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP767(X35)) )), 23.40/23.21 inference(general_splitting,[],[f1841,f1842_D])). 23.40/23.21 fof(f1841,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP766(X36)) )), 23.40/23.21 inference(general_splitting,[],[f1839,f1840_D])). 23.40/23.21 fof(f1839,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP765(X37)) )), 23.40/23.21 inference(general_splitting,[],[f1837,f1838_D])). 23.40/23.21 fof(f1837,plain,( 23.40/23.21 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP764(X38)) )), 23.40/23.21 inference(general_splitting,[],[f1835,f1836_D])). 23.40/23.21 fof(f1835,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP762(X16) | ~sP763(X39)) )), 23.40/23.21 inference(general_splitting,[],[f1833,f1834_D])). 23.40/23.21 fof(f1833,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP757(X40) | ~sP762(X16)) )), 23.40/23.21 inference(general_splitting,[],[f1831,f1832_D])). 23.40/23.21 fof(f1832,plain,( 23.40/23.21 ( ! [X15,X16] : (sP762(X16) | ~sP761(X15) | ~r1(X15,X16)) )), 23.40/23.21 inference(cnf_transformation,[],[f1832_D])). 23.40/23.21 fof(f1832_D,plain,( 23.40/23.21 ( ! [X16] : (( ! [X15] : (~sP761(X15) | ~r1(X15,X16)) ) <=> ~sP762(X16)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP762])])). 23.40/23.21 fof(f1831,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP757(X40) | ~sP761(X15)) )), 23.40/23.21 inference(general_splitting,[],[f1829,f1830_D])). 23.40/23.21 fof(f1830,plain,( 23.40/23.21 ( ! [X14,X15] : (sP761(X15) | ~sP760(X14) | ~r1(X14,X15)) )), 23.40/23.21 inference(cnf_transformation,[],[f1830_D])). 23.40/23.21 fof(f1830_D,plain,( 23.40/23.21 ( ! [X15] : (( ! [X14] : (~sP760(X14) | ~r1(X14,X15)) ) <=> ~sP761(X15)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP761])])). 23.40/23.21 fof(f1829,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP757(X40) | ~sP760(X14)) )), 23.40/23.21 inference(general_splitting,[],[f1827,f1828_D])). 23.40/23.21 fof(f1828,plain,( 23.40/23.21 ( ! [X14,X13] : (sP760(X14) | ~sP759(X13) | ~r1(X13,X14)) )), 23.40/23.21 inference(cnf_transformation,[],[f1828_D])). 23.40/23.21 fof(f1828_D,plain,( 23.40/23.21 ( ! [X14] : (( ! [X13] : (~sP759(X13) | ~r1(X13,X14)) ) <=> ~sP760(X14)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP760])])). 23.40/23.21 fof(f1827,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP757(X40) | ~sP759(X13)) )), 23.40/23.21 inference(general_splitting,[],[f1825,f1826_D])). 23.40/23.21 fof(f1826,plain,( 23.40/23.21 ( ! [X12,X13] : (sP759(X13) | ~sP758(X12) | ~r1(X12,X13)) )), 23.40/23.21 inference(cnf_transformation,[],[f1826_D])). 23.40/23.21 fof(f1826_D,plain,( 23.40/23.21 ( ! [X13] : (( ! [X12] : (~sP758(X12) | ~r1(X12,X13)) ) <=> ~sP759(X13)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP759])])). 23.40/23.21 fof(f1825,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP757(X40) | ~sP758(X12)) )), 23.40/23.21 inference(general_splitting,[],[f1823,f1824_D])). 23.40/23.21 fof(f1824,plain,( 23.40/23.21 ( ! [X12,X11] : (sP758(X12) | ~sP753(X11) | ~r1(X11,X12)) )), 23.40/23.21 inference(cnf_transformation,[],[f1824_D])). 23.40/23.21 fof(f1824_D,plain,( 23.40/23.21 ( ! [X12] : (( ! [X11] : (~sP753(X11) | ~r1(X11,X12)) ) <=> ~sP758(X12)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP758])])). 23.40/23.21 fof(f1823,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP753(X11) | ~sP757(X40)) )), 23.40/23.21 inference(general_splitting,[],[f1821,f1822_D])). 23.40/23.21 fof(f1821,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP753(X11) | ~sP756(X41)) )), 23.40/23.21 inference(general_splitting,[],[f1819,f1820_D])). 23.40/23.21 fof(f1819,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP753(X11) | ~sP755(X42)) )), 23.40/23.21 inference(general_splitting,[],[f1817,f1818_D])). 23.40/23.21 fof(f1817,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP753(X11) | ~sP754(X43)) )), 23.40/23.21 inference(general_splitting,[],[f1815,f1816_D])). 23.40/23.21 fof(f1815,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP745(X44) | ~sP753(X11)) )), 23.40/23.21 inference(general_splitting,[],[f1813,f1814_D])). 23.40/23.21 fof(f1814,plain,( 23.40/23.21 ( ! [X10,X11] : (sP753(X11) | ~sP752(X10) | ~r1(X10,X11)) )), 23.40/23.21 inference(cnf_transformation,[],[f1814_D])). 23.40/23.21 fof(f1814_D,plain,( 23.40/23.21 ( ! [X11] : (( ! [X10] : (~sP752(X10) | ~r1(X10,X11)) ) <=> ~sP753(X11)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP753])])). 23.40/23.21 fof(f1813,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP745(X44) | ~sP752(X10)) )), 23.40/23.21 inference(general_splitting,[],[f1811,f1812_D])). 23.40/23.21 fof(f1812,plain,( 23.40/23.21 ( ! [X10,X9] : (sP752(X10) | ~sP751(X9) | ~r1(X9,X10)) )), 23.40/23.21 inference(cnf_transformation,[],[f1812_D])). 23.40/23.21 fof(f1812_D,plain,( 23.40/23.21 ( ! [X10] : (( ! [X9] : (~sP751(X9) | ~r1(X9,X10)) ) <=> ~sP752(X10)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP752])])). 23.40/23.21 fof(f1811,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP745(X44) | ~sP751(X9)) )), 23.40/23.21 inference(general_splitting,[],[f1809,f1810_D])). 23.40/23.21 fof(f1810,plain,( 23.40/23.21 ( ! [X8,X9] : (sP751(X9) | ~sP750(X8) | ~r1(X8,X9)) )), 23.40/23.21 inference(cnf_transformation,[],[f1810_D])). 23.40/23.21 fof(f1810_D,plain,( 23.40/23.21 ( ! [X9] : (( ! [X8] : (~sP750(X8) | ~r1(X8,X9)) ) <=> ~sP751(X9)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP751])])). 23.40/23.21 fof(f1809,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP745(X44) | ~sP750(X8)) )), 23.40/23.21 inference(general_splitting,[],[f1807,f1808_D])). 23.40/23.21 fof(f1808,plain,( 23.40/23.21 ( ! [X8,X7] : (sP750(X8) | ~sP749(X7) | ~r1(X7,X8)) )), 23.40/23.21 inference(cnf_transformation,[],[f1808_D])). 23.40/23.21 fof(f1808_D,plain,( 23.40/23.21 ( ! [X8] : (( ! [X7] : (~sP749(X7) | ~r1(X7,X8)) ) <=> ~sP750(X8)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP750])])). 23.40/23.21 fof(f1807,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP745(X44) | ~sP749(X7)) )), 23.40/23.21 inference(general_splitting,[],[f1805,f1806_D])). 23.40/23.21 fof(f1806,plain,( 23.40/23.21 ( ! [X6,X7] : (sP749(X7) | ~sP748(X6) | ~r1(X6,X7)) )), 23.40/23.21 inference(cnf_transformation,[],[f1806_D])). 23.40/23.21 fof(f1806_D,plain,( 23.40/23.21 ( ! [X7] : (( ! [X6] : (~sP748(X6) | ~r1(X6,X7)) ) <=> ~sP749(X7)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP749])])). 23.40/23.21 fof(f1805,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP745(X44) | ~sP748(X6)) )), 23.40/23.21 inference(general_splitting,[],[f1803,f1804_D])). 23.40/23.21 fof(f1804,plain,( 23.40/23.21 ( ! [X6,X5] : (sP748(X6) | ~sP747(X5) | ~r1(X5,X6)) )), 23.40/23.21 inference(cnf_transformation,[],[f1804_D])). 23.40/23.21 fof(f1804_D,plain,( 23.40/23.21 ( ! [X6] : (( ! [X5] : (~sP747(X5) | ~r1(X5,X6)) ) <=> ~sP748(X6)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP748])])). 23.40/23.21 fof(f1803,plain,( 23.40/23.21 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP745(X44) | ~sP747(X5)) )), 23.40/23.21 inference(general_splitting,[],[f1801,f1802_D])). 23.40/23.21 fof(f1802,plain,( 23.40/23.21 ( ! [X4,X5] : (sP747(X5) | ~sP746(X4) | ~r1(X4,X5)) )), 23.40/23.21 inference(cnf_transformation,[],[f1802_D])). 23.40/23.21 fof(f1802_D,plain,( 23.40/23.21 ( ! [X5] : (( ! [X4] : (~sP746(X4) | ~r1(X4,X5)) ) <=> ~sP747(X5)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP747])])). 23.40/23.21 fof(f1801,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~sP745(X44) | ~sP746(X4)) )), 23.40/23.21 inference(general_splitting,[],[f1799,f1800_D])). 23.40/23.21 fof(f1800,plain,( 23.40/23.21 ( ! [X4,X3] : (sP746(X4) | ~sP741(X3) | ~r1(X3,X4)) )), 23.40/23.21 inference(cnf_transformation,[],[f1800_D])). 23.40/23.21 fof(f1800_D,plain,( 23.40/23.21 ( ! [X4] : (( ! [X3] : (~sP741(X3) | ~r1(X3,X4)) ) <=> ~sP746(X4)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP746])])). 23.40/23.21 fof(f1799,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP741(X3) | ~sP745(X44)) )), 23.40/23.21 inference(general_splitting,[],[f1797,f1798_D])). 23.40/23.21 fof(f1797,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP741(X3) | ~sP744(X45)) )), 23.40/23.21 inference(general_splitting,[],[f1795,f1796_D])). 23.40/23.21 fof(f1795,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP741(X3) | ~sP743(X46)) )), 23.40/23.21 inference(general_splitting,[],[f1793,f1794_D])). 23.40/23.21 fof(f1793,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X45,X46) | ~r1(X46,X47) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP741(X3) | ~sP742(X47)) )), 23.40/23.21 inference(general_splitting,[],[f1791,f1792_D])). 23.40/23.21 fof(f1791,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X45,X46) | ~r1(X47,X48) | ~p44(X48) | ~p45(X48) | ~r1(X46,X47) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP741(X3)) )), 23.40/23.21 inference(general_splitting,[],[f1789,f1790_D])). 23.40/23.21 fof(f1790,plain,( 23.40/23.21 ( ! [X3,X1] : (sP741(X3) | ~sP740(X1) | ~r1(X1,X3)) )), 23.40/23.21 inference(cnf_transformation,[],[f1790_D])). 23.40/23.21 fof(f1790_D,plain,( 23.40/23.21 ( ! [X3] : (( ! [X1] : (~sP740(X1) | ~r1(X1,X3)) ) <=> ~sP741(X3)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP741])])). 23.40/23.21 fof(f1789,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X1,X3) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X45,X46) | ~r1(X47,X48) | ~p44(X48) | ~p45(X48) | ~r1(X46,X47) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP740(X1)) )), 23.40/23.21 inference(general_splitting,[],[f386,f1788_D])). 23.40/23.21 fof(f1788,plain,( 23.40/23.21 ( ! [X0,X1] : (sP740(X1) | ~sP42(X0) | ~r1(X0,X1)) )), 23.40/23.21 inference(cnf_transformation,[],[f1788_D])). 23.40/23.21 fof(f1788_D,plain,( 23.40/23.21 ( ! [X1] : (( ! [X0] : (~sP42(X0) | ~r1(X0,X1)) ) <=> ~sP740(X1)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP740])])). 23.40/23.21 fof(f386,plain,( 23.40/23.21 ( ! [X28,X24,X37,X4,X33,X0,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X48,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X1,X3) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X45,X46) | ~r1(X47,X48) | ~p44(X48) | ~p45(X48) | ~r1(X46,X47) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X39,X40) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X0,X1) | ~sP42(X0)) )), 23.40/23.21 inference(cnf_transformation,[],[f82])). 23.40/23.21 fof(f39756,plain,( 23.40/23.21 sP762(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f35601,f1832])). 23.40/23.21 fof(f35601,plain,( 23.40/23.21 sP761(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f31804,f1830])). 23.40/23.21 fof(f31804,plain,( 23.40/23.21 sP760(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f28334,f1828])). 23.40/23.21 fof(f28334,plain,( 23.40/23.21 sP759(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f25205,f1826])). 23.40/23.21 fof(f25205,plain,( 23.40/23.21 sP758(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f22386,f1824])). 23.40/23.21 fof(f22386,plain,( 23.40/23.21 sP753(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f19861,f1814])). 23.40/23.21 fof(f19861,plain,( 23.40/23.21 sP752(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f17599,f1812])). 23.40/23.21 fof(f17599,plain,( 23.40/23.21 sP751(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f15192,f1810])). 23.40/23.21 fof(f15192,plain,( 23.40/23.21 sP750(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f13145,f1808])). 23.40/23.21 fof(f13145,plain,( 23.40/23.21 sP749(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f11430,f1806])). 23.40/23.21 fof(f11430,plain,( 23.40/23.21 sP748(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f10282,f1804])). 23.40/23.21 fof(f10282,plain,( 23.40/23.21 sP747(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f9320,f1802])). 23.40/23.21 fof(f9320,plain,( 23.40/23.21 sP746(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f8351,f1800])). 23.40/23.21 fof(f8351,plain,( 23.40/23.21 sP741(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f7750,f1790])). 23.40/23.21 fof(f7750,plain,( 23.40/23.21 sP740(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f7279,f1788])). 23.40/23.21 fof(f472381,plain,( 23.40/23.21 ~sP833(sK101)), 23.40/23.21 inference(unit_resulting_resolution,[],[f715,f449012,f1976])). 23.40/23.21 fof(f1976,plain,( 23.40/23.21 ( ! [X45,X46] : (~sP833(X46) | ~r1(X45,X46) | sP834(X45)) )), 23.40/23.21 inference(cnf_transformation,[],[f1976_D])). 23.40/23.21 fof(f1976_D,plain,( 23.40/23.21 ( ! [X45] : (( ! [X46] : (~sP833(X46) | ~r1(X45,X46)) ) <=> ~sP834(X45)) )), 23.40/23.21 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP834])])). 23.40/23.21 fof(f449012,plain,( 23.40/23.21 ~sP834(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f425862,f1978])). 23.40/23.22 fof(f1978,plain,( 23.40/23.22 ( ! [X45,X44] : (~sP834(X45) | ~r1(X44,X45) | sP835(X44)) )), 23.40/23.22 inference(cnf_transformation,[],[f1978_D])). 23.40/23.22 fof(f1978_D,plain,( 23.40/23.22 ( ! [X44] : (( ! [X45] : (~sP834(X45) | ~r1(X44,X45)) ) <=> ~sP835(X44)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP835])])). 23.40/23.22 fof(f425862,plain,( 23.40/23.22 ~sP835(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f403028,f1996])). 23.40/23.22 fof(f1996,plain,( 23.40/23.22 ( ! [X43,X44] : (~sP835(X44) | ~r1(X43,X44) | sP844(X43)) )), 23.40/23.22 inference(cnf_transformation,[],[f1996_D])). 23.40/23.22 fof(f1996_D,plain,( 23.40/23.22 ( ! [X43] : (( ! [X44] : (~sP835(X44) | ~r1(X43,X44)) ) <=> ~sP844(X43)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP844])])). 23.40/23.22 fof(f403028,plain,( 23.40/23.22 ~sP844(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f378343,f1998])). 23.40/23.22 fof(f1998,plain,( 23.40/23.22 ( ! [X43,X42] : (~sP844(X43) | ~r1(X42,X43) | sP845(X42)) )), 23.40/23.22 inference(cnf_transformation,[],[f1998_D])). 23.40/23.22 fof(f1998_D,plain,( 23.40/23.22 ( ! [X42] : (( ! [X43] : (~sP844(X43) | ~r1(X42,X43)) ) <=> ~sP845(X42)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP845])])). 23.40/23.22 fof(f378343,plain,( 23.40/23.22 ~sP845(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f342863,f2000])). 23.40/23.22 fof(f2000,plain,( 23.40/23.22 ( ! [X41,X42] : (~sP845(X42) | ~r1(X41,X42) | sP846(X41)) )), 23.40/23.22 inference(cnf_transformation,[],[f2000_D])). 23.40/23.22 fof(f2000_D,plain,( 23.40/23.22 ( ! [X41] : (( ! [X42] : (~sP845(X42) | ~r1(X41,X42)) ) <=> ~sP846(X41)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP846])])). 23.40/23.22 fof(f342863,plain,( 23.40/23.22 ~sP846(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f320735,f2002])). 23.40/23.22 fof(f2002,plain,( 23.40/23.22 ( ! [X41,X40] : (~sP846(X41) | ~r1(X40,X41) | sP847(X40)) )), 23.40/23.22 inference(cnf_transformation,[],[f2002_D])). 23.40/23.22 fof(f2002_D,plain,( 23.40/23.22 ( ! [X40] : (( ! [X41] : (~sP846(X41) | ~r1(X40,X41)) ) <=> ~sP847(X40)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP847])])). 23.40/23.22 fof(f320735,plain,( 23.40/23.22 ~sP847(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f301844,f2014])). 23.40/23.22 fof(f2014,plain,( 23.40/23.22 ( ! [X39,X40] : (~sP847(X40) | ~r1(X39,X40) | sP853(X39)) )), 23.40/23.22 inference(cnf_transformation,[],[f2014_D])). 23.40/23.22 fof(f2014_D,plain,( 23.40/23.22 ( ! [X39] : (( ! [X40] : (~sP847(X40) | ~r1(X39,X40)) ) <=> ~sP853(X39)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP853])])). 23.40/23.22 fof(f301844,plain,( 23.40/23.22 ~sP853(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f283723,f2016])). 23.40/23.22 fof(f2016,plain,( 23.40/23.22 ( ! [X39,X38] : (~sP853(X39) | ~r1(X38,X39) | sP854(X38)) )), 23.40/23.22 inference(cnf_transformation,[],[f2016_D])). 23.40/23.22 fof(f2016_D,plain,( 23.40/23.22 ( ! [X38] : (( ! [X39] : (~sP853(X39) | ~r1(X38,X39)) ) <=> ~sP854(X38)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP854])])). 23.40/23.22 fof(f283723,plain,( 23.40/23.22 ~sP854(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f266364,f2018])). 23.40/23.22 fof(f2018,plain,( 23.40/23.22 ( ! [X37,X38] : (~sP854(X38) | ~r1(X37,X38) | sP855(X37)) )), 23.40/23.22 inference(cnf_transformation,[],[f2018_D])). 23.40/23.22 fof(f2018_D,plain,( 23.40/23.22 ( ! [X37] : (( ! [X38] : (~sP854(X38) | ~r1(X37,X38)) ) <=> ~sP855(X37)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP855])])). 23.40/23.22 fof(f266364,plain,( 23.40/23.22 ~sP855(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f249736,f2020])). 23.40/23.22 fof(f2020,plain,( 23.40/23.22 ( ! [X37,X36] : (~sP855(X37) | ~r1(X36,X37) | sP856(X36)) )), 23.40/23.22 inference(cnf_transformation,[],[f2020_D])). 23.40/23.22 fof(f2020_D,plain,( 23.40/23.22 ( ! [X36] : (( ! [X37] : (~sP855(X37) | ~r1(X36,X37)) ) <=> ~sP856(X36)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP856])])). 23.40/23.22 fof(f249736,plain,( 23.40/23.22 ~sP856(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f233838,f2022])). 23.40/23.22 fof(f2022,plain,( 23.40/23.22 ( ! [X35,X36] : (~sP856(X36) | ~r1(X35,X36) | sP857(X35)) )), 23.40/23.22 inference(cnf_transformation,[],[f2022_D])). 23.40/23.22 fof(f2022_D,plain,( 23.40/23.22 ( ! [X35] : (( ! [X36] : (~sP856(X36) | ~r1(X35,X36)) ) <=> ~sP857(X35)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP857])])). 23.40/23.22 fof(f233838,plain,( 23.40/23.22 ~sP857(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f218638,f2024])). 23.40/23.22 fof(f2024,plain,( 23.40/23.22 ( ! [X35,X34] : (~sP857(X35) | ~r1(X34,X35) | sP858(X34)) )), 23.40/23.22 inference(cnf_transformation,[],[f2024_D])). 23.40/23.22 fof(f2024_D,plain,( 23.40/23.22 ( ! [X34] : (( ! [X35] : (~sP857(X35) | ~r1(X34,X35)) ) <=> ~sP858(X34)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP858])])). 23.40/23.22 fof(f218638,plain,( 23.40/23.22 ~sP858(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f204133,f2026])). 23.40/23.22 fof(f2026,plain,( 23.40/23.22 ( ! [X33,X34] : (~sP858(X34) | ~r1(X33,X34) | sP859(X33)) )), 23.40/23.22 inference(cnf_transformation,[],[f2026_D])). 23.40/23.22 fof(f2026_D,plain,( 23.40/23.22 ( ! [X33] : (( ! [X34] : (~sP858(X34) | ~r1(X33,X34)) ) <=> ~sP859(X33)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP859])])). 23.40/23.22 fof(f204133,plain,( 23.40/23.22 ~sP859(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f190301,f2028])). 23.40/23.22 fof(f2028,plain,( 23.40/23.22 ( ! [X33,X32] : (~sP859(X33) | ~r1(X32,X33) | sP860(X32)) )), 23.40/23.22 inference(cnf_transformation,[],[f2028_D])). 23.40/23.22 fof(f2028_D,plain,( 23.40/23.22 ( ! [X32] : (( ! [X33] : (~sP859(X33) | ~r1(X32,X33)) ) <=> ~sP860(X32)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP860])])). 23.40/23.22 fof(f190301,plain,( 23.40/23.22 ~sP860(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f177130,f2030])). 23.40/23.22 fof(f2030,plain,( 23.40/23.22 ( ! [X31,X32] : (~sP860(X32) | ~r1(X31,X32) | sP861(X31)) )), 23.40/23.22 inference(cnf_transformation,[],[f2030_D])). 23.40/23.22 fof(f2030_D,plain,( 23.40/23.22 ( ! [X31] : (( ! [X32] : (~sP860(X32) | ~r1(X31,X32)) ) <=> ~sP861(X31)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP861])])). 23.40/23.22 fof(f177130,plain,( 23.40/23.22 ~sP861(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f164603,f2032])). 23.40/23.22 fof(f2032,plain,( 23.40/23.22 ( ! [X30,X31] : (~sP861(X31) | ~r1(X30,X31) | sP862(X30)) )), 23.40/23.22 inference(cnf_transformation,[],[f2032_D])). 23.40/23.22 fof(f2032_D,plain,( 23.40/23.22 ( ! [X30] : (( ! [X31] : (~sP861(X31) | ~r1(X30,X31)) ) <=> ~sP862(X30)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP862])])). 23.40/23.22 fof(f164603,plain,( 23.40/23.22 ~sP862(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f152702,f2034])). 23.40/23.22 fof(f2034,plain,( 23.40/23.22 ( ! [X30,X29] : (~sP862(X30) | ~r1(X29,X30) | sP863(X29)) )), 23.40/23.22 inference(cnf_transformation,[],[f2034_D])). 23.40/23.22 fof(f2034_D,plain,( 23.40/23.22 ( ! [X29] : (( ! [X30] : (~sP862(X30) | ~r1(X29,X30)) ) <=> ~sP863(X29)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP863])])). 23.40/23.22 fof(f152702,plain,( 23.40/23.22 ~sP863(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f141411,f2036])). 23.40/23.22 fof(f2036,plain,( 23.40/23.22 ( ! [X28,X29] : (~sP863(X29) | ~r1(X28,X29) | sP864(X28)) )), 23.40/23.22 inference(cnf_transformation,[],[f2036_D])). 23.40/23.22 fof(f2036_D,plain,( 23.40/23.22 ( ! [X28] : (( ! [X29] : (~sP863(X29) | ~r1(X28,X29)) ) <=> ~sP864(X28)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP864])])). 23.40/23.22 fof(f141411,plain,( 23.40/23.22 ~sP864(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f130713,f2038])). 23.40/23.22 fof(f2038,plain,( 23.40/23.22 ( ! [X28,X27] : (~sP864(X28) | ~r1(X27,X28) | sP865(X27)) )), 23.40/23.22 inference(cnf_transformation,[],[f2038_D])). 23.40/23.22 fof(f2038_D,plain,( 23.40/23.22 ( ! [X27] : (( ! [X28] : (~sP864(X28) | ~r1(X27,X28)) ) <=> ~sP865(X27)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP865])])). 23.40/23.22 fof(f130713,plain,( 23.40/23.22 ~sP865(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f120595,f2040])). 23.40/23.22 fof(f2040,plain,( 23.40/23.22 ( ! [X26,X27] : (~sP865(X27) | ~r1(X26,X27) | sP866(X26)) )), 23.40/23.22 inference(cnf_transformation,[],[f2040_D])). 23.40/23.22 fof(f2040_D,plain,( 23.40/23.22 ( ! [X26] : (( ! [X27] : (~sP865(X27) | ~r1(X26,X27)) ) <=> ~sP866(X26)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP866])])). 23.40/23.22 fof(f120595,plain,( 23.40/23.22 ~sP866(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f111031,f2042])). 23.40/23.22 fof(f2042,plain,( 23.40/23.22 ( ! [X26,X25] : (~sP866(X26) | ~r1(X25,X26) | sP867(X25)) )), 23.40/23.22 inference(cnf_transformation,[],[f2042_D])). 23.40/23.22 fof(f2042_D,plain,( 23.40/23.22 ( ! [X25] : (( ! [X26] : (~sP866(X26) | ~r1(X25,X26)) ) <=> ~sP867(X25)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP867])])). 23.40/23.22 fof(f111031,plain,( 23.40/23.22 ~sP867(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f102019,f2044])). 23.40/23.22 fof(f2044,plain,( 23.40/23.22 ( ! [X24,X25] : (~sP867(X25) | ~r1(X24,X25) | sP868(X24)) )), 23.40/23.22 inference(cnf_transformation,[],[f2044_D])). 23.40/23.22 fof(f2044_D,plain,( 23.40/23.22 ( ! [X24] : (( ! [X25] : (~sP867(X25) | ~r1(X24,X25)) ) <=> ~sP868(X24)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP868])])). 23.40/23.22 fof(f102019,plain,( 23.40/23.22 ~sP868(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f93538,f2046])). 23.40/23.22 fof(f2046,plain,( 23.40/23.22 ( ! [X24,X23] : (~sP868(X24) | ~r1(X23,X24) | sP869(X23)) )), 23.40/23.22 inference(cnf_transformation,[],[f2046_D])). 23.40/23.22 fof(f2046_D,plain,( 23.40/23.22 ( ! [X23] : (( ! [X24] : (~sP868(X24) | ~r1(X23,X24)) ) <=> ~sP869(X23)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP869])])). 23.40/23.22 fof(f93538,plain,( 23.40/23.22 ~sP869(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f85570,f2048])). 23.40/23.22 fof(f2048,plain,( 23.40/23.22 ( ! [X23,X22] : (~sP869(X23) | ~r1(X22,X23) | sP870(X22)) )), 23.40/23.22 inference(cnf_transformation,[],[f2048_D])). 23.40/23.22 fof(f2048_D,plain,( 23.40/23.22 ( ! [X22] : (( ! [X23] : (~sP869(X23) | ~r1(X22,X23)) ) <=> ~sP870(X22)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP870])])). 23.40/23.22 fof(f85570,plain,( 23.40/23.22 ~sP870(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f78107,f2050])). 23.40/23.22 fof(f2050,plain,( 23.40/23.22 ( ! [X21,X22] : (~sP870(X22) | ~r1(X21,X22) | sP871(X21)) )), 23.40/23.22 inference(cnf_transformation,[],[f2050_D])). 23.40/23.22 fof(f2050_D,plain,( 23.40/23.22 ( ! [X21] : (( ! [X22] : (~sP870(X22) | ~r1(X21,X22)) ) <=> ~sP871(X21)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP871])])). 23.40/23.22 fof(f78107,plain,( 23.40/23.22 ~sP871(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f71111,f2052])). 23.40/23.22 fof(f2052,plain,( 23.40/23.22 ( ! [X21,X20] : (~sP871(X21) | ~r1(X20,X21) | sP872(X20)) )), 23.40/23.22 inference(cnf_transformation,[],[f2052_D])). 23.40/23.22 fof(f2052_D,plain,( 23.40/23.22 ( ! [X20] : (( ! [X21] : (~sP871(X21) | ~r1(X20,X21)) ) <=> ~sP872(X20)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP872])])). 23.40/23.22 fof(f71111,plain,( 23.40/23.22 ~sP872(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f64586,f2054])). 23.40/23.22 fof(f2054,plain,( 23.40/23.22 ( ! [X19,X20] : (~sP872(X20) | ~r1(X19,X20) | sP873(X19)) )), 23.40/23.22 inference(cnf_transformation,[],[f2054_D])). 23.40/23.22 fof(f2054_D,plain,( 23.40/23.22 ( ! [X19] : (( ! [X20] : (~sP872(X20) | ~r1(X19,X20)) ) <=> ~sP873(X19)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP873])])). 23.40/23.22 fof(f64586,plain,( 23.40/23.22 ~sP873(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f56512,f2056])). 23.40/23.22 fof(f2056,plain,( 23.40/23.22 ( ! [X19,X18] : (~sP873(X19) | ~r1(X18,X19) | sP874(X18)) )), 23.40/23.22 inference(cnf_transformation,[],[f2056_D])). 23.40/23.22 fof(f2056_D,plain,( 23.40/23.22 ( ! [X18] : (( ! [X19] : (~sP873(X19) | ~r1(X18,X19)) ) <=> ~sP874(X18)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP874])])). 23.40/23.22 fof(f56512,plain,( 23.40/23.22 ~sP874(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f49809,f2058])). 23.40/23.22 fof(f2058,plain,( 23.40/23.22 ( ! [X17,X18] : (~sP874(X18) | ~r1(X17,X18) | sP875(X17)) )), 23.40/23.22 inference(cnf_transformation,[],[f2058_D])). 23.40/23.22 fof(f2058_D,plain,( 23.40/23.22 ( ! [X17] : (( ! [X18] : (~sP874(X18) | ~r1(X17,X18)) ) <=> ~sP875(X17)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP875])])). 23.40/23.22 fof(f49809,plain,( 23.40/23.22 ~sP875(sK101)), 23.40/23.22 inference(unit_resulting_resolution,[],[f715,f44281,f2059])). 23.40/23.22 fof(f2059,plain,( 23.40/23.22 ( ! [X17,X16] : (~sP875(X17) | ~sP852(X16) | ~r1(X16,X17)) )), 23.40/23.22 inference(general_splitting,[],[f2057,f2058_D])). 23.40/23.22 fof(f2057,plain,( 23.40/23.22 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP852(X16) | ~sP874(X18)) )), 23.40/23.22 inference(general_splitting,[],[f2055,f2056_D])). 23.40/23.22 fof(f2055,plain,( 23.40/23.22 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~sP852(X16) | ~sP873(X19)) )), 23.40/23.22 inference(general_splitting,[],[f2053,f2054_D])). 23.40/23.22 fof(f2053,plain,( 23.40/23.22 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP872(X20)) )), 23.40/23.22 inference(general_splitting,[],[f2051,f2052_D])). 23.40/23.22 fof(f2051,plain,( 23.40/23.22 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP871(X21)) )), 23.40/23.22 inference(general_splitting,[],[f2049,f2050_D])). 23.40/23.22 fof(f2049,plain,( 23.40/23.22 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP870(X22)) )), 23.40/23.22 inference(general_splitting,[],[f2047,f2048_D])). 23.40/23.22 fof(f2047,plain,( 23.40/23.22 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP869(X23)) )), 23.40/23.22 inference(general_splitting,[],[f2045,f2046_D])). 23.40/23.22 fof(f2045,plain,( 23.40/23.22 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP868(X24)) )), 23.40/23.22 inference(general_splitting,[],[f2043,f2044_D])). 23.40/23.22 fof(f2043,plain,( 23.40/23.22 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP867(X25)) )), 23.40/23.22 inference(general_splitting,[],[f2041,f2042_D])). 23.40/23.22 fof(f2041,plain,( 23.40/23.22 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP866(X26)) )), 23.40/23.22 inference(general_splitting,[],[f2039,f2040_D])). 23.40/23.22 fof(f2039,plain,( 23.40/23.22 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP865(X27)) )), 23.40/23.22 inference(general_splitting,[],[f2037,f2038_D])). 23.40/23.22 fof(f2037,plain,( 23.40/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP864(X28)) )), 23.40/23.22 inference(general_splitting,[],[f2035,f2036_D])). 23.40/23.22 fof(f2035,plain,( 23.40/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP863(X29)) )), 23.40/23.22 inference(general_splitting,[],[f2033,f2034_D])). 23.40/23.22 fof(f2033,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP862(X30)) )), 23.40/23.22 inference(general_splitting,[],[f2031,f2032_D])). 23.40/23.22 fof(f2031,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP861(X31)) )), 23.40/23.22 inference(general_splitting,[],[f2029,f2030_D])). 23.40/23.22 fof(f2029,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP860(X32)) )), 23.40/23.22 inference(general_splitting,[],[f2027,f2028_D])). 23.40/23.22 fof(f2027,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP859(X33)) )), 23.40/23.22 inference(general_splitting,[],[f2025,f2026_D])). 23.40/23.22 fof(f2025,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP858(X34)) )), 23.40/23.22 inference(general_splitting,[],[f2023,f2024_D])). 23.40/23.22 fof(f2023,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP857(X35)) )), 23.40/23.22 inference(general_splitting,[],[f2021,f2022_D])). 23.40/23.22 fof(f2021,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP856(X36)) )), 23.40/23.22 inference(general_splitting,[],[f2019,f2020_D])). 23.40/23.22 fof(f2019,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP855(X37)) )), 23.40/23.22 inference(general_splitting,[],[f2017,f2018_D])). 23.40/23.22 fof(f2017,plain,( 23.40/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP854(X38)) )), 23.40/23.22 inference(general_splitting,[],[f2015,f2016_D])). 23.40/23.22 fof(f2015,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP852(X16) | ~sP853(X39)) )), 23.40/23.22 inference(general_splitting,[],[f2013,f2014_D])). 23.40/23.22 fof(f2013,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP847(X40) | ~sP852(X16)) )), 23.40/23.22 inference(general_splitting,[],[f2011,f2012_D])). 23.40/23.22 fof(f2012,plain,( 23.40/23.22 ( ! [X15,X16] : (sP852(X16) | ~sP851(X15) | ~r1(X15,X16)) )), 23.40/23.22 inference(cnf_transformation,[],[f2012_D])). 23.40/23.22 fof(f2012_D,plain,( 23.40/23.22 ( ! [X16] : (( ! [X15] : (~sP851(X15) | ~r1(X15,X16)) ) <=> ~sP852(X16)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP852])])). 23.40/23.22 fof(f2011,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP847(X40) | ~sP851(X15)) )), 23.40/23.22 inference(general_splitting,[],[f2009,f2010_D])). 23.40/23.22 fof(f2010,plain,( 23.40/23.22 ( ! [X14,X15] : (sP851(X15) | ~sP850(X14) | ~r1(X14,X15)) )), 23.40/23.22 inference(cnf_transformation,[],[f2010_D])). 23.40/23.22 fof(f2010_D,plain,( 23.40/23.22 ( ! [X15] : (( ! [X14] : (~sP850(X14) | ~r1(X14,X15)) ) <=> ~sP851(X15)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP851])])). 23.40/23.22 fof(f2009,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP847(X40) | ~sP850(X14)) )), 23.40/23.22 inference(general_splitting,[],[f2007,f2008_D])). 23.40/23.22 fof(f2008,plain,( 23.40/23.22 ( ! [X14,X13] : (sP850(X14) | ~sP849(X13) | ~r1(X13,X14)) )), 23.40/23.22 inference(cnf_transformation,[],[f2008_D])). 23.40/23.22 fof(f2008_D,plain,( 23.40/23.22 ( ! [X14] : (( ! [X13] : (~sP849(X13) | ~r1(X13,X14)) ) <=> ~sP850(X14)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP850])])). 23.40/23.22 fof(f2007,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP847(X40) | ~sP849(X13)) )), 23.40/23.22 inference(general_splitting,[],[f2005,f2006_D])). 23.40/23.22 fof(f2006,plain,( 23.40/23.22 ( ! [X12,X13] : (sP849(X13) | ~sP848(X12) | ~r1(X12,X13)) )), 23.40/23.22 inference(cnf_transformation,[],[f2006_D])). 23.40/23.22 fof(f2006_D,plain,( 23.40/23.22 ( ! [X13] : (( ! [X12] : (~sP848(X12) | ~r1(X12,X13)) ) <=> ~sP849(X13)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP849])])). 23.40/23.22 fof(f2005,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP847(X40) | ~sP848(X12)) )), 23.40/23.22 inference(general_splitting,[],[f2003,f2004_D])). 23.40/23.22 fof(f2004,plain,( 23.40/23.22 ( ! [X12,X11] : (sP848(X12) | ~sP843(X11) | ~r1(X11,X12)) )), 23.40/23.22 inference(cnf_transformation,[],[f2004_D])). 23.40/23.22 fof(f2004_D,plain,( 23.40/23.22 ( ! [X12] : (( ! [X11] : (~sP843(X11) | ~r1(X11,X12)) ) <=> ~sP848(X12)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP848])])). 23.40/23.22 fof(f2003,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~sP843(X11) | ~sP847(X40)) )), 23.40/23.22 inference(general_splitting,[],[f2001,f2002_D])). 23.40/23.22 fof(f2001,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~sP843(X11) | ~sP846(X41)) )), 23.40/23.22 inference(general_splitting,[],[f1999,f2000_D])). 23.40/23.22 fof(f1999,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~sP843(X11) | ~sP845(X42)) )), 23.40/23.22 inference(general_splitting,[],[f1997,f1998_D])). 23.40/23.22 fof(f1997,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~sP843(X11) | ~sP844(X43)) )), 23.40/23.22 inference(general_splitting,[],[f1995,f1996_D])). 23.40/23.22 fof(f1995,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~sP835(X44) | ~sP843(X11)) )), 23.40/23.22 inference(general_splitting,[],[f1993,f1994_D])). 23.40/23.22 fof(f1994,plain,( 23.40/23.22 ( ! [X10,X11] : (sP843(X11) | ~sP842(X10) | ~r1(X10,X11)) )), 23.40/23.22 inference(cnf_transformation,[],[f1994_D])). 23.40/23.22 fof(f1994_D,plain,( 23.40/23.22 ( ! [X11] : (( ! [X10] : (~sP842(X10) | ~r1(X10,X11)) ) <=> ~sP843(X11)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP843])])). 23.40/23.22 fof(f1993,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP835(X44) | ~sP842(X10)) )), 23.40/23.22 inference(general_splitting,[],[f1991,f1992_D])). 23.40/23.22 fof(f1992,plain,( 23.40/23.22 ( ! [X10,X9] : (sP842(X10) | ~sP841(X9) | ~r1(X9,X10)) )), 23.40/23.22 inference(cnf_transformation,[],[f1992_D])). 23.40/23.22 fof(f1992_D,plain,( 23.40/23.22 ( ! [X10] : (( ! [X9] : (~sP841(X9) | ~r1(X9,X10)) ) <=> ~sP842(X10)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP842])])). 23.40/23.22 fof(f1991,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP835(X44) | ~sP841(X9)) )), 23.40/23.22 inference(general_splitting,[],[f1989,f1990_D])). 23.40/23.22 fof(f1990,plain,( 23.40/23.22 ( ! [X8,X9] : (sP841(X9) | ~sP840(X8) | ~r1(X8,X9)) )), 23.40/23.22 inference(cnf_transformation,[],[f1990_D])). 23.40/23.22 fof(f1990_D,plain,( 23.40/23.22 ( ! [X9] : (( ! [X8] : (~sP840(X8) | ~r1(X8,X9)) ) <=> ~sP841(X9)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP841])])). 23.40/23.22 fof(f1989,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP835(X44) | ~sP840(X8)) )), 23.40/23.22 inference(general_splitting,[],[f1987,f1988_D])). 23.40/23.22 fof(f1988,plain,( 23.40/23.22 ( ! [X8,X7] : (sP840(X8) | ~sP839(X7) | ~r1(X7,X8)) )), 23.40/23.22 inference(cnf_transformation,[],[f1988_D])). 23.40/23.22 fof(f1988_D,plain,( 23.40/23.22 ( ! [X8] : (( ! [X7] : (~sP839(X7) | ~r1(X7,X8)) ) <=> ~sP840(X8)) )), 23.40/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP840])])). 23.40/23.22 fof(f1987,plain,( 23.40/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP835(X44) | ~sP839(X7)) )), 23.41/23.22 inference(general_splitting,[],[f1985,f1986_D])). 23.41/23.22 fof(f1986,plain,( 23.41/23.22 ( ! [X6,X7] : (sP839(X7) | ~sP838(X6) | ~r1(X6,X7)) )), 23.41/23.22 inference(cnf_transformation,[],[f1986_D])). 23.41/23.22 fof(f1986_D,plain,( 23.41/23.22 ( ! [X7] : (( ! [X6] : (~sP838(X6) | ~r1(X6,X7)) ) <=> ~sP839(X7)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP839])])). 23.41/23.22 fof(f1985,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP835(X44) | ~sP838(X6)) )), 23.41/23.22 inference(general_splitting,[],[f1983,f1984_D])). 23.41/23.22 fof(f1984,plain,( 23.41/23.22 ( ! [X6,X5] : (sP838(X6) | ~sP837(X5) | ~r1(X5,X6)) )), 23.41/23.22 inference(cnf_transformation,[],[f1984_D])). 23.41/23.22 fof(f1984_D,plain,( 23.41/23.22 ( ! [X6] : (( ! [X5] : (~sP837(X5) | ~r1(X5,X6)) ) <=> ~sP838(X6)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP838])])). 23.41/23.22 fof(f1983,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP835(X44) | ~sP837(X5)) )), 23.41/23.22 inference(general_splitting,[],[f1981,f1982_D])). 23.41/23.22 fof(f1982,plain,( 23.41/23.22 ( ! [X4,X5] : (sP837(X5) | ~sP836(X4) | ~r1(X4,X5)) )), 23.41/23.22 inference(cnf_transformation,[],[f1982_D])). 23.41/23.22 fof(f1982_D,plain,( 23.41/23.22 ( ! [X5] : (( ! [X4] : (~sP836(X4) | ~r1(X4,X5)) ) <=> ~sP837(X5)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP837])])). 23.41/23.22 fof(f1981,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP835(X44) | ~sP836(X4)) )), 23.41/23.22 inference(general_splitting,[],[f1979,f1980_D])). 23.41/23.22 fof(f1980,plain,( 23.41/23.22 ( ! [X4,X3] : (sP836(X4) | ~sP832(X3) | ~r1(X3,X4)) )), 23.41/23.22 inference(cnf_transformation,[],[f1980_D])). 23.41/23.22 fof(f1980_D,plain,( 23.41/23.22 ( ! [X4] : (( ! [X3] : (~sP832(X3) | ~r1(X3,X4)) ) <=> ~sP836(X4)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP836])])). 23.41/23.22 fof(f1979,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP832(X3) | ~sP835(X44)) )), 23.41/23.22 inference(general_splitting,[],[f1977,f1978_D])). 23.41/23.22 fof(f1977,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP832(X3) | ~sP834(X45)) )), 23.41/23.22 inference(general_splitting,[],[f1975,f1976_D])). 23.41/23.22 fof(f1975,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP832(X3) | ~sP833(X46)) )), 23.41/23.22 inference(general_splitting,[],[f1973,f1974_D])). 23.41/23.22 fof(f1973,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X46,X47) | p43(X47) | p44(X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP832(X3)) )), 23.41/23.22 inference(general_splitting,[],[f1971,f1972_D])). 23.41/23.22 fof(f1972,plain,( 23.41/23.22 ( ! [X3,X1] : (sP832(X3) | ~sP831(X1) | ~r1(X1,X3)) )), 23.41/23.22 inference(cnf_transformation,[],[f1972_D])). 23.41/23.22 fof(f1972_D,plain,( 23.41/23.22 ( ! [X3] : (( ! [X1] : (~sP831(X1) | ~r1(X1,X3)) ) <=> ~sP832(X3)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP832])])). 23.41/23.22 fof(f1971,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X46,X47) | p43(X47) | p44(X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP831(X1)) )), 23.41/23.22 inference(general_splitting,[],[f391,f1970_D])). 23.41/23.22 fof(f1970,plain,( 23.41/23.22 ( ! [X0,X1] : (sP831(X1) | ~sP41(X0) | ~r1(X0,X1)) )), 23.41/23.22 inference(cnf_transformation,[],[f1970_D])). 23.41/23.22 fof(f1970_D,plain,( 23.41/23.22 ( ! [X1] : (( ! [X0] : (~sP41(X0) | ~r1(X0,X1)) ) <=> ~sP831(X1)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP831])])). 23.41/23.22 fof(f391,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X0,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X47,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X46,X47) | p43(X47) | p44(X47) | ~r1(X45,X46) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X0,X1) | ~sP41(X0)) )), 23.41/23.22 inference(cnf_transformation,[],[f86])). 23.41/23.22 fof(f44281,plain,( 23.41/23.22 sP852(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f39752,f2012])). 23.41/23.22 fof(f39752,plain,( 23.41/23.22 sP851(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f35597,f2010])). 23.41/23.22 fof(f35597,plain,( 23.41/23.22 sP850(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f31800,f2008])). 23.41/23.22 fof(f31800,plain,( 23.41/23.22 sP849(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f28330,f2006])). 23.41/23.22 fof(f28330,plain,( 23.41/23.22 sP848(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f25201,f2004])). 23.41/23.22 fof(f25201,plain,( 23.41/23.22 sP843(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f22382,f1994])). 23.41/23.22 fof(f22382,plain,( 23.41/23.22 sP842(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f19857,f1992])). 23.41/23.22 fof(f19857,plain,( 23.41/23.22 sP841(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f17595,f1990])). 23.41/23.22 fof(f17595,plain,( 23.41/23.22 sP840(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f15188,f1988])). 23.41/23.22 fof(f15188,plain,( 23.41/23.22 sP839(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f13141,f1986])). 23.41/23.22 fof(f13141,plain,( 23.41/23.22 sP838(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f11426,f1984])). 23.41/23.22 fof(f11426,plain,( 23.41/23.22 sP837(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f10278,f1982])). 23.41/23.22 fof(f10278,plain,( 23.41/23.22 sP836(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f9316,f1980])). 23.41/23.22 fof(f9316,plain,( 23.41/23.22 sP832(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f8347,f1972])). 23.41/23.22 fof(f8347,plain,( 23.41/23.22 sP831(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f7742,f1970])). 23.41/23.22 fof(f472372,plain,( 23.41/23.22 ~sP878(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f449003,f2066])). 23.41/23.22 fof(f2066,plain,( 23.41/23.22 ( ! [X45,X44] : (~sP878(X45) | ~r1(X44,X45) | sP879(X44)) )), 23.41/23.22 inference(cnf_transformation,[],[f2066_D])). 23.41/23.22 fof(f2066_D,plain,( 23.41/23.22 ( ! [X44] : (( ! [X45] : (~sP878(X45) | ~r1(X44,X45)) ) <=> ~sP879(X44)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP879])])). 23.41/23.22 fof(f449003,plain,( 23.41/23.22 ~sP879(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f425853,f2084])). 23.41/23.22 fof(f2084,plain,( 23.41/23.22 ( ! [X43,X44] : (~sP879(X44) | ~r1(X43,X44) | sP888(X43)) )), 23.41/23.22 inference(cnf_transformation,[],[f2084_D])). 23.41/23.22 fof(f2084_D,plain,( 23.41/23.22 ( ! [X43] : (( ! [X44] : (~sP879(X44) | ~r1(X43,X44)) ) <=> ~sP888(X43)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP888])])). 23.41/23.22 fof(f425853,plain,( 23.41/23.22 ~sP888(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f403019,f2086])). 23.41/23.22 fof(f2086,plain,( 23.41/23.22 ( ! [X43,X42] : (~sP888(X43) | ~r1(X42,X43) | sP889(X42)) )), 23.41/23.22 inference(cnf_transformation,[],[f2086_D])). 23.41/23.22 fof(f2086_D,plain,( 23.41/23.22 ( ! [X42] : (( ! [X43] : (~sP888(X43) | ~r1(X42,X43)) ) <=> ~sP889(X42)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP889])])). 23.41/23.22 fof(f403019,plain,( 23.41/23.22 ~sP889(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f378334,f2088])). 23.41/23.22 fof(f2088,plain,( 23.41/23.22 ( ! [X41,X42] : (~sP889(X42) | ~r1(X41,X42) | sP890(X41)) )), 23.41/23.22 inference(cnf_transformation,[],[f2088_D])). 23.41/23.22 fof(f2088_D,plain,( 23.41/23.22 ( ! [X41] : (( ! [X42] : (~sP889(X42) | ~r1(X41,X42)) ) <=> ~sP890(X41)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP890])])). 23.41/23.22 fof(f378334,plain,( 23.41/23.22 ~sP890(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f342854,f2090])). 23.41/23.22 fof(f2090,plain,( 23.41/23.22 ( ! [X41,X40] : (~sP890(X41) | ~r1(X40,X41) | sP891(X40)) )), 23.41/23.22 inference(cnf_transformation,[],[f2090_D])). 23.41/23.22 fof(f2090_D,plain,( 23.41/23.22 ( ! [X40] : (( ! [X41] : (~sP890(X41) | ~r1(X40,X41)) ) <=> ~sP891(X40)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP891])])). 23.41/23.22 fof(f342854,plain,( 23.41/23.22 ~sP891(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f320729,f2102])). 23.41/23.22 fof(f2102,plain,( 23.41/23.22 ( ! [X39,X40] : (~sP891(X40) | ~r1(X39,X40) | sP897(X39)) )), 23.41/23.22 inference(cnf_transformation,[],[f2102_D])). 23.41/23.22 fof(f2102_D,plain,( 23.41/23.22 ( ! [X39] : (( ! [X40] : (~sP891(X40) | ~r1(X39,X40)) ) <=> ~sP897(X39)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP897])])). 23.41/23.22 fof(f320729,plain,( 23.41/23.22 ~sP897(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f301838,f2104])). 23.41/23.22 fof(f2104,plain,( 23.41/23.22 ( ! [X39,X38] : (~sP897(X39) | ~r1(X38,X39) | sP898(X38)) )), 23.41/23.22 inference(cnf_transformation,[],[f2104_D])). 23.41/23.22 fof(f2104_D,plain,( 23.41/23.22 ( ! [X38] : (( ! [X39] : (~sP897(X39) | ~r1(X38,X39)) ) <=> ~sP898(X38)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP898])])). 23.41/23.22 fof(f301838,plain,( 23.41/23.22 ~sP898(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f283717,f2106])). 23.41/23.22 fof(f2106,plain,( 23.41/23.22 ( ! [X37,X38] : (~sP898(X38) | ~r1(X37,X38) | sP899(X37)) )), 23.41/23.22 inference(cnf_transformation,[],[f2106_D])). 23.41/23.22 fof(f2106_D,plain,( 23.41/23.22 ( ! [X37] : (( ! [X38] : (~sP898(X38) | ~r1(X37,X38)) ) <=> ~sP899(X37)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP899])])). 23.41/23.22 fof(f283717,plain,( 23.41/23.22 ~sP899(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f266358,f2108])). 23.41/23.22 fof(f2108,plain,( 23.41/23.22 ( ! [X37,X36] : (~sP899(X37) | ~r1(X36,X37) | sP900(X36)) )), 23.41/23.22 inference(cnf_transformation,[],[f2108_D])). 23.41/23.22 fof(f2108_D,plain,( 23.41/23.22 ( ! [X36] : (( ! [X37] : (~sP899(X37) | ~r1(X36,X37)) ) <=> ~sP900(X36)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP900])])). 23.41/23.22 fof(f266358,plain,( 23.41/23.22 ~sP900(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f249730,f2110])). 23.41/23.22 fof(f2110,plain,( 23.41/23.22 ( ! [X35,X36] : (~sP900(X36) | ~r1(X35,X36) | sP901(X35)) )), 23.41/23.22 inference(cnf_transformation,[],[f2110_D])). 23.41/23.22 fof(f2110_D,plain,( 23.41/23.22 ( ! [X35] : (( ! [X36] : (~sP900(X36) | ~r1(X35,X36)) ) <=> ~sP901(X35)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP901])])). 23.41/23.22 fof(f249730,plain,( 23.41/23.22 ~sP901(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f233832,f2112])). 23.41/23.22 fof(f2112,plain,( 23.41/23.22 ( ! [X35,X34] : (~sP901(X35) | ~r1(X34,X35) | sP902(X34)) )), 23.41/23.22 inference(cnf_transformation,[],[f2112_D])). 23.41/23.22 fof(f2112_D,plain,( 23.41/23.22 ( ! [X34] : (( ! [X35] : (~sP901(X35) | ~r1(X34,X35)) ) <=> ~sP902(X34)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP902])])). 23.41/23.22 fof(f233832,plain,( 23.41/23.22 ~sP902(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f218632,f2114])). 23.41/23.22 fof(f2114,plain,( 23.41/23.22 ( ! [X33,X34] : (~sP902(X34) | ~r1(X33,X34) | sP903(X33)) )), 23.41/23.22 inference(cnf_transformation,[],[f2114_D])). 23.41/23.22 fof(f2114_D,plain,( 23.41/23.22 ( ! [X33] : (( ! [X34] : (~sP902(X34) | ~r1(X33,X34)) ) <=> ~sP903(X33)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP903])])). 23.41/23.22 fof(f218632,plain,( 23.41/23.22 ~sP903(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f204127,f2116])). 23.41/23.22 fof(f2116,plain,( 23.41/23.22 ( ! [X33,X32] : (~sP903(X33) | ~r1(X32,X33) | sP904(X32)) )), 23.41/23.22 inference(cnf_transformation,[],[f2116_D])). 23.41/23.22 fof(f2116_D,plain,( 23.41/23.22 ( ! [X32] : (( ! [X33] : (~sP903(X33) | ~r1(X32,X33)) ) <=> ~sP904(X32)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP904])])). 23.41/23.22 fof(f204127,plain,( 23.41/23.22 ~sP904(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f190295,f2118])). 23.41/23.22 fof(f2118,plain,( 23.41/23.22 ( ! [X31,X32] : (~sP904(X32) | ~r1(X31,X32) | sP905(X31)) )), 23.41/23.22 inference(cnf_transformation,[],[f2118_D])). 23.41/23.22 fof(f2118_D,plain,( 23.41/23.22 ( ! [X31] : (( ! [X32] : (~sP904(X32) | ~r1(X31,X32)) ) <=> ~sP905(X31)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP905])])). 23.41/23.22 fof(f190295,plain,( 23.41/23.22 ~sP905(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f177124,f2120])). 23.41/23.22 fof(f2120,plain,( 23.41/23.22 ( ! [X30,X31] : (~sP905(X31) | ~r1(X30,X31) | sP906(X30)) )), 23.41/23.22 inference(cnf_transformation,[],[f2120_D])). 23.41/23.22 fof(f2120_D,plain,( 23.41/23.22 ( ! [X30] : (( ! [X31] : (~sP905(X31) | ~r1(X30,X31)) ) <=> ~sP906(X30)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP906])])). 23.41/23.22 fof(f177124,plain,( 23.41/23.22 ~sP906(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f164597,f2122])). 23.41/23.22 fof(f2122,plain,( 23.41/23.22 ( ! [X30,X29] : (~sP906(X30) | ~r1(X29,X30) | sP907(X29)) )), 23.41/23.22 inference(cnf_transformation,[],[f2122_D])). 23.41/23.22 fof(f2122_D,plain,( 23.41/23.22 ( ! [X29] : (( ! [X30] : (~sP906(X30) | ~r1(X29,X30)) ) <=> ~sP907(X29)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP907])])). 23.41/23.22 fof(f164597,plain,( 23.41/23.22 ~sP907(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f152696,f2124])). 23.41/23.22 fof(f2124,plain,( 23.41/23.22 ( ! [X28,X29] : (~sP907(X29) | ~r1(X28,X29) | sP908(X28)) )), 23.41/23.22 inference(cnf_transformation,[],[f2124_D])). 23.41/23.22 fof(f2124_D,plain,( 23.41/23.22 ( ! [X28] : (( ! [X29] : (~sP907(X29) | ~r1(X28,X29)) ) <=> ~sP908(X28)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP908])])). 23.41/23.22 fof(f152696,plain,( 23.41/23.22 ~sP908(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f141405,f2126])). 23.41/23.22 fof(f2126,plain,( 23.41/23.22 ( ! [X28,X27] : (~sP908(X28) | ~r1(X27,X28) | sP909(X27)) )), 23.41/23.22 inference(cnf_transformation,[],[f2126_D])). 23.41/23.22 fof(f2126_D,plain,( 23.41/23.22 ( ! [X27] : (( ! [X28] : (~sP908(X28) | ~r1(X27,X28)) ) <=> ~sP909(X27)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP909])])). 23.41/23.22 fof(f141405,plain,( 23.41/23.22 ~sP909(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f130707,f2128])). 23.41/23.22 fof(f2128,plain,( 23.41/23.22 ( ! [X26,X27] : (~sP909(X27) | ~r1(X26,X27) | sP910(X26)) )), 23.41/23.22 inference(cnf_transformation,[],[f2128_D])). 23.41/23.22 fof(f2128_D,plain,( 23.41/23.22 ( ! [X26] : (( ! [X27] : (~sP909(X27) | ~r1(X26,X27)) ) <=> ~sP910(X26)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP910])])). 23.41/23.22 fof(f130707,plain,( 23.41/23.22 ~sP910(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f120589,f2130])). 23.41/23.22 fof(f2130,plain,( 23.41/23.22 ( ! [X26,X25] : (~sP910(X26) | ~r1(X25,X26) | sP911(X25)) )), 23.41/23.22 inference(cnf_transformation,[],[f2130_D])). 23.41/23.22 fof(f2130_D,plain,( 23.41/23.22 ( ! [X25] : (( ! [X26] : (~sP910(X26) | ~r1(X25,X26)) ) <=> ~sP911(X25)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP911])])). 23.41/23.22 fof(f120589,plain,( 23.41/23.22 ~sP911(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f111025,f2132])). 23.41/23.22 fof(f2132,plain,( 23.41/23.22 ( ! [X24,X25] : (~sP911(X25) | ~r1(X24,X25) | sP912(X24)) )), 23.41/23.22 inference(cnf_transformation,[],[f2132_D])). 23.41/23.22 fof(f2132_D,plain,( 23.41/23.22 ( ! [X24] : (( ! [X25] : (~sP911(X25) | ~r1(X24,X25)) ) <=> ~sP912(X24)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP912])])). 23.41/23.22 fof(f111025,plain,( 23.41/23.22 ~sP912(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f102013,f2134])). 23.41/23.22 fof(f2134,plain,( 23.41/23.22 ( ! [X24,X23] : (~sP912(X24) | ~r1(X23,X24) | sP913(X23)) )), 23.41/23.22 inference(cnf_transformation,[],[f2134_D])). 23.41/23.22 fof(f2134_D,plain,( 23.41/23.22 ( ! [X23] : (( ! [X24] : (~sP912(X24) | ~r1(X23,X24)) ) <=> ~sP913(X23)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP913])])). 23.41/23.22 fof(f102013,plain,( 23.41/23.22 ~sP913(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f93532,f2136])). 23.41/23.22 fof(f2136,plain,( 23.41/23.22 ( ! [X23,X22] : (~sP913(X23) | ~r1(X22,X23) | sP914(X22)) )), 23.41/23.22 inference(cnf_transformation,[],[f2136_D])). 23.41/23.22 fof(f2136_D,plain,( 23.41/23.22 ( ! [X22] : (( ! [X23] : (~sP913(X23) | ~r1(X22,X23)) ) <=> ~sP914(X22)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP914])])). 23.41/23.22 fof(f93532,plain,( 23.41/23.22 ~sP914(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f85564,f2138])). 23.41/23.22 fof(f2138,plain,( 23.41/23.22 ( ! [X21,X22] : (~sP914(X22) | ~r1(X21,X22) | sP915(X21)) )), 23.41/23.22 inference(cnf_transformation,[],[f2138_D])). 23.41/23.22 fof(f2138_D,plain,( 23.41/23.22 ( ! [X21] : (( ! [X22] : (~sP914(X22) | ~r1(X21,X22)) ) <=> ~sP915(X21)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP915])])). 23.41/23.22 fof(f85564,plain,( 23.41/23.22 ~sP915(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f78101,f2140])). 23.41/23.22 fof(f2140,plain,( 23.41/23.22 ( ! [X21,X20] : (~sP915(X21) | ~r1(X20,X21) | sP916(X20)) )), 23.41/23.22 inference(cnf_transformation,[],[f2140_D])). 23.41/23.22 fof(f2140_D,plain,( 23.41/23.22 ( ! [X20] : (( ! [X21] : (~sP915(X21) | ~r1(X20,X21)) ) <=> ~sP916(X20)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP916])])). 23.41/23.22 fof(f78101,plain,( 23.41/23.22 ~sP916(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f71105,f2142])). 23.41/23.22 fof(f2142,plain,( 23.41/23.22 ( ! [X19,X20] : (~sP916(X20) | ~r1(X19,X20) | sP917(X19)) )), 23.41/23.22 inference(cnf_transformation,[],[f2142_D])). 23.41/23.22 fof(f2142_D,plain,( 23.41/23.22 ( ! [X19] : (( ! [X20] : (~sP916(X20) | ~r1(X19,X20)) ) <=> ~sP917(X19)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP917])])). 23.41/23.22 fof(f71105,plain,( 23.41/23.22 ~sP917(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f64580,f2144])). 23.41/23.22 fof(f2144,plain,( 23.41/23.22 ( ! [X19,X18] : (~sP917(X19) | ~r1(X18,X19) | sP918(X18)) )), 23.41/23.22 inference(cnf_transformation,[],[f2144_D])). 23.41/23.22 fof(f2144_D,plain,( 23.41/23.22 ( ! [X18] : (( ! [X19] : (~sP917(X19) | ~r1(X18,X19)) ) <=> ~sP918(X18)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP918])])). 23.41/23.22 fof(f64580,plain,( 23.41/23.22 ~sP918(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f56506,f2146])). 23.41/23.22 fof(f2146,plain,( 23.41/23.22 ( ! [X17,X18] : (~sP918(X18) | ~r1(X17,X18) | sP919(X17)) )), 23.41/23.22 inference(cnf_transformation,[],[f2146_D])). 23.41/23.22 fof(f2146_D,plain,( 23.41/23.22 ( ! [X17] : (( ! [X18] : (~sP918(X18) | ~r1(X17,X18)) ) <=> ~sP919(X17)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP919])])). 23.41/23.22 fof(f56506,plain,( 23.41/23.22 ~sP919(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f49803,f2147])). 23.41/23.22 fof(f2147,plain,( 23.41/23.22 ( ! [X17,X16] : (~sP919(X17) | ~sP896(X16) | ~r1(X16,X17)) )), 23.41/23.22 inference(general_splitting,[],[f2145,f2146_D])). 23.41/23.22 fof(f2145,plain,( 23.41/23.22 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP896(X16) | ~sP918(X18)) )), 23.41/23.22 inference(general_splitting,[],[f2143,f2144_D])). 23.41/23.22 fof(f2143,plain,( 23.41/23.22 ( ! [X19,X17,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP896(X16) | ~sP917(X19)) )), 23.41/23.22 inference(general_splitting,[],[f2141,f2142_D])). 23.41/23.22 fof(f2141,plain,( 23.41/23.22 ( ! [X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP896(X16) | ~sP916(X20)) )), 23.41/23.22 inference(general_splitting,[],[f2139,f2140_D])). 23.41/23.22 fof(f2139,plain,( 23.41/23.22 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X16,X17) | ~sP896(X16) | ~sP915(X21)) )), 23.41/23.22 inference(general_splitting,[],[f2137,f2138_D])). 23.41/23.22 fof(f2137,plain,( 23.41/23.22 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP914(X22)) )), 23.41/23.22 inference(general_splitting,[],[f2135,f2136_D])). 23.41/23.22 fof(f2135,plain,( 23.41/23.22 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP913(X23)) )), 23.41/23.22 inference(general_splitting,[],[f2133,f2134_D])). 23.41/23.22 fof(f2133,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP912(X24)) )), 23.41/23.22 inference(general_splitting,[],[f2131,f2132_D])). 23.41/23.22 fof(f2131,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP911(X25)) )), 23.41/23.22 inference(general_splitting,[],[f2129,f2130_D])). 23.41/23.22 fof(f2129,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP910(X26)) )), 23.41/23.22 inference(general_splitting,[],[f2127,f2128_D])). 23.41/23.22 fof(f2127,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP909(X27)) )), 23.41/23.22 inference(general_splitting,[],[f2125,f2126_D])). 23.41/23.22 fof(f2125,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP908(X28)) )), 23.41/23.22 inference(general_splitting,[],[f2123,f2124_D])). 23.41/23.22 fof(f2123,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP907(X29)) )), 23.41/23.22 inference(general_splitting,[],[f2121,f2122_D])). 23.41/23.22 fof(f2121,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP906(X30)) )), 23.41/23.22 inference(general_splitting,[],[f2119,f2120_D])). 23.41/23.22 fof(f2119,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP905(X31)) )), 23.41/23.22 inference(general_splitting,[],[f2117,f2118_D])). 23.41/23.22 fof(f2117,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP904(X32)) )), 23.41/23.22 inference(general_splitting,[],[f2115,f2116_D])). 23.41/23.22 fof(f2115,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP903(X33)) )), 23.41/23.22 inference(general_splitting,[],[f2113,f2114_D])). 23.41/23.22 fof(f2113,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP902(X34)) )), 23.41/23.22 inference(general_splitting,[],[f2111,f2112_D])). 23.41/23.22 fof(f2111,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP901(X35)) )), 23.41/23.22 inference(general_splitting,[],[f2109,f2110_D])). 23.41/23.22 fof(f2109,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP900(X36)) )), 23.41/23.22 inference(general_splitting,[],[f2107,f2108_D])). 23.41/23.22 fof(f2107,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP899(X37)) )), 23.41/23.22 inference(general_splitting,[],[f2105,f2106_D])). 23.41/23.22 fof(f2105,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP898(X38)) )), 23.41/23.22 inference(general_splitting,[],[f2103,f2104_D])). 23.41/23.22 fof(f2103,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP896(X16) | ~sP897(X39)) )), 23.41/23.22 inference(general_splitting,[],[f2101,f2102_D])). 23.41/23.22 fof(f2101,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP891(X40) | ~sP896(X16)) )), 23.41/23.22 inference(general_splitting,[],[f2099,f2100_D])). 23.41/23.22 fof(f2100,plain,( 23.41/23.22 ( ! [X15,X16] : (sP896(X16) | ~sP895(X15) | ~r1(X15,X16)) )), 23.41/23.22 inference(cnf_transformation,[],[f2100_D])). 23.41/23.22 fof(f2100_D,plain,( 23.41/23.22 ( ! [X16] : (( ! [X15] : (~sP895(X15) | ~r1(X15,X16)) ) <=> ~sP896(X16)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP896])])). 23.41/23.22 fof(f2099,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP891(X40) | ~sP895(X15)) )), 23.41/23.22 inference(general_splitting,[],[f2097,f2098_D])). 23.41/23.22 fof(f2098,plain,( 23.41/23.22 ( ! [X14,X15] : (sP895(X15) | ~sP894(X14) | ~r1(X14,X15)) )), 23.41/23.22 inference(cnf_transformation,[],[f2098_D])). 23.41/23.22 fof(f2098_D,plain,( 23.41/23.22 ( ! [X15] : (( ! [X14] : (~sP894(X14) | ~r1(X14,X15)) ) <=> ~sP895(X15)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP895])])). 23.41/23.22 fof(f2097,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP891(X40) | ~sP894(X14)) )), 23.41/23.22 inference(general_splitting,[],[f2095,f2096_D])). 23.41/23.22 fof(f2096,plain,( 23.41/23.22 ( ! [X14,X13] : (sP894(X14) | ~sP893(X13) | ~r1(X13,X14)) )), 23.41/23.22 inference(cnf_transformation,[],[f2096_D])). 23.41/23.22 fof(f2096_D,plain,( 23.41/23.22 ( ! [X14] : (( ! [X13] : (~sP893(X13) | ~r1(X13,X14)) ) <=> ~sP894(X14)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP894])])). 23.41/23.22 fof(f2095,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~sP891(X40) | ~sP893(X13)) )), 23.41/23.22 inference(general_splitting,[],[f2093,f2094_D])). 23.41/23.22 fof(f2094,plain,( 23.41/23.22 ( ! [X12,X13] : (sP893(X13) | ~sP892(X12) | ~r1(X12,X13)) )), 23.41/23.22 inference(cnf_transformation,[],[f2094_D])). 23.41/23.22 fof(f2094_D,plain,( 23.41/23.22 ( ! [X13] : (( ! [X12] : (~sP892(X12) | ~r1(X12,X13)) ) <=> ~sP893(X13)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP893])])). 23.41/23.22 fof(f2093,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~sP891(X40) | ~sP892(X12)) )), 23.41/23.22 inference(general_splitting,[],[f2091,f2092_D])). 23.41/23.22 fof(f2092,plain,( 23.41/23.22 ( ! [X12,X11] : (sP892(X12) | ~sP887(X11) | ~r1(X11,X12)) )), 23.41/23.22 inference(cnf_transformation,[],[f2092_D])). 23.41/23.22 fof(f2092_D,plain,( 23.41/23.22 ( ! [X12] : (( ! [X11] : (~sP887(X11) | ~r1(X11,X12)) ) <=> ~sP892(X12)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP892])])). 23.41/23.22 fof(f2091,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP887(X11) | ~sP891(X40)) )), 23.41/23.22 inference(general_splitting,[],[f2089,f2090_D])). 23.41/23.22 fof(f2089,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP887(X11) | ~sP890(X41)) )), 23.41/23.22 inference(general_splitting,[],[f2087,f2088_D])). 23.41/23.22 fof(f2087,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP887(X11) | ~sP889(X42)) )), 23.41/23.22 inference(general_splitting,[],[f2085,f2086_D])). 23.41/23.22 fof(f2085,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP887(X11) | ~sP888(X43)) )), 23.41/23.22 inference(general_splitting,[],[f2083,f2084_D])). 23.41/23.22 fof(f2083,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP879(X44) | ~sP887(X11)) )), 23.41/23.22 inference(general_splitting,[],[f2081,f2082_D])). 23.41/23.22 fof(f2082,plain,( 23.41/23.22 ( ! [X10,X11] : (sP887(X11) | ~sP886(X10) | ~r1(X10,X11)) )), 23.41/23.22 inference(cnf_transformation,[],[f2082_D])). 23.41/23.22 fof(f2082_D,plain,( 23.41/23.22 ( ! [X11] : (( ! [X10] : (~sP886(X10) | ~r1(X10,X11)) ) <=> ~sP887(X11)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP887])])). 23.41/23.22 fof(f2081,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP879(X44) | ~sP886(X10)) )), 23.41/23.22 inference(general_splitting,[],[f2079,f2080_D])). 23.41/23.22 fof(f2080,plain,( 23.41/23.22 ( ! [X10,X9] : (sP886(X10) | ~sP885(X9) | ~r1(X9,X10)) )), 23.41/23.22 inference(cnf_transformation,[],[f2080_D])). 23.41/23.22 fof(f2080_D,plain,( 23.41/23.22 ( ! [X10] : (( ! [X9] : (~sP885(X9) | ~r1(X9,X10)) ) <=> ~sP886(X10)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP886])])). 23.41/23.22 fof(f2079,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP879(X44) | ~sP885(X9)) )), 23.41/23.22 inference(general_splitting,[],[f2077,f2078_D])). 23.41/23.22 fof(f2078,plain,( 23.41/23.22 ( ! [X8,X9] : (sP885(X9) | ~sP884(X8) | ~r1(X8,X9)) )), 23.41/23.22 inference(cnf_transformation,[],[f2078_D])). 23.41/23.22 fof(f2078_D,plain,( 23.41/23.22 ( ! [X9] : (( ! [X8] : (~sP884(X8) | ~r1(X8,X9)) ) <=> ~sP885(X9)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP885])])). 23.41/23.22 fof(f2077,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP879(X44) | ~sP884(X8)) )), 23.41/23.22 inference(general_splitting,[],[f2075,f2076_D])). 23.41/23.22 fof(f2076,plain,( 23.41/23.22 ( ! [X8,X7] : (sP884(X8) | ~sP883(X7) | ~r1(X7,X8)) )), 23.41/23.22 inference(cnf_transformation,[],[f2076_D])). 23.41/23.22 fof(f2076_D,plain,( 23.41/23.22 ( ! [X8] : (( ! [X7] : (~sP883(X7) | ~r1(X7,X8)) ) <=> ~sP884(X8)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP884])])). 23.41/23.22 fof(f2075,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP879(X44) | ~sP883(X7)) )), 23.41/23.22 inference(general_splitting,[],[f2073,f2074_D])). 23.41/23.22 fof(f2074,plain,( 23.41/23.22 ( ! [X6,X7] : (sP883(X7) | ~sP882(X6) | ~r1(X6,X7)) )), 23.41/23.22 inference(cnf_transformation,[],[f2074_D])). 23.41/23.22 fof(f2074_D,plain,( 23.41/23.22 ( ! [X7] : (( ! [X6] : (~sP882(X6) | ~r1(X6,X7)) ) <=> ~sP883(X7)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP883])])). 23.41/23.22 fof(f2073,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP879(X44) | ~sP882(X6)) )), 23.41/23.22 inference(general_splitting,[],[f2071,f2072_D])). 23.41/23.22 fof(f2072,plain,( 23.41/23.22 ( ! [X6,X5] : (sP882(X6) | ~sP881(X5) | ~r1(X5,X6)) )), 23.41/23.22 inference(cnf_transformation,[],[f2072_D])). 23.41/23.22 fof(f2072_D,plain,( 23.41/23.22 ( ! [X6] : (( ! [X5] : (~sP881(X5) | ~r1(X5,X6)) ) <=> ~sP882(X6)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP882])])). 23.41/23.22 fof(f2071,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP879(X44) | ~sP881(X5)) )), 23.41/23.22 inference(general_splitting,[],[f2069,f2070_D])). 23.41/23.22 fof(f2070,plain,( 23.41/23.22 ( ! [X4,X5] : (sP881(X5) | ~sP880(X4) | ~r1(X4,X5)) )), 23.41/23.22 inference(cnf_transformation,[],[f2070_D])). 23.41/23.22 fof(f2070_D,plain,( 23.41/23.22 ( ! [X5] : (( ! [X4] : (~sP880(X4) | ~r1(X4,X5)) ) <=> ~sP881(X5)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP881])])). 23.41/23.22 fof(f2069,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X4,X5) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP879(X44) | ~sP880(X4)) )), 23.41/23.22 inference(general_splitting,[],[f2067,f2068_D])). 23.41/23.22 fof(f2068,plain,( 23.41/23.22 ( ! [X4,X3] : (sP880(X4) | ~sP877(X3) | ~r1(X3,X4)) )), 23.41/23.22 inference(cnf_transformation,[],[f2068_D])). 23.41/23.22 fof(f2068_D,plain,( 23.41/23.22 ( ! [X4] : (( ! [X3] : (~sP877(X3) | ~r1(X3,X4)) ) <=> ~sP880(X4)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP880])])). 23.41/23.22 fof(f2067,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X4,X5) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP877(X3) | ~sP879(X44)) )), 23.41/23.22 inference(general_splitting,[],[f2065,f2066_D])). 23.41/23.22 fof(f2065,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X4,X5) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X44,X45) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP877(X3) | ~sP878(X45)) )), 23.41/23.22 inference(general_splitting,[],[f2063,f2064_D])). 23.41/23.22 fof(f2063,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X4,X5) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X44,X45) | ~r1(X45,X46) | ~p43(X46) | ~p42(X46) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP877(X3)) )), 23.41/23.22 inference(general_splitting,[],[f2061,f2062_D])). 23.41/23.22 fof(f2062,plain,( 23.41/23.22 ( ! [X3,X1] : (sP877(X3) | ~sP876(X1) | ~r1(X1,X3)) )), 23.41/23.22 inference(cnf_transformation,[],[f2062_D])). 23.41/23.22 fof(f2062_D,plain,( 23.41/23.22 ( ! [X3] : (( ! [X1] : (~sP876(X1) | ~r1(X1,X3)) ) <=> ~sP877(X3)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP877])])). 23.41/23.22 fof(f2061,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X44,X45) | ~r1(X45,X46) | ~p43(X46) | ~p42(X46) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP876(X1)) )), 23.41/23.22 inference(general_splitting,[],[f397,f2060_D])). 23.41/23.22 fof(f2060,plain,( 23.41/23.22 ( ! [X0,X1] : (sP876(X1) | ~sP40(X0) | ~r1(X0,X1)) )), 23.41/23.22 inference(cnf_transformation,[],[f2060_D])). 23.41/23.22 fof(f2060_D,plain,( 23.41/23.22 ( ! [X1] : (( ! [X0] : (~sP40(X0) | ~r1(X0,X1)) ) <=> ~sP876(X1)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP876])])). 23.41/23.22 fof(f397,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X0,X45,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X46,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X0,X1) | ~r1(X1,X3) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X44,X45) | ~r1(X45,X46) | ~p43(X46) | ~p42(X46) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP40(X0)) )), 23.41/23.22 inference(cnf_transformation,[],[f90])). 23.41/23.22 fof(f49803,plain,( 23.41/23.22 sP896(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f44275,f2100])). 23.41/23.22 fof(f44275,plain,( 23.41/23.22 sP895(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f39746,f2098])). 23.41/23.22 fof(f39746,plain,( 23.41/23.22 sP894(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f35591,f2096])). 23.41/23.22 fof(f35591,plain,( 23.41/23.22 sP893(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f31794,f2094])). 23.41/23.22 fof(f31794,plain,( 23.41/23.22 sP892(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f28324,f2092])). 23.41/23.22 fof(f28324,plain,( 23.41/23.22 sP887(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f25195,f2082])). 23.41/23.22 fof(f25195,plain,( 23.41/23.22 sP886(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f22376,f2080])). 23.41/23.22 fof(f22376,plain,( 23.41/23.22 sP885(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f19851,f2078])). 23.41/23.22 fof(f19851,plain,( 23.41/23.22 sP884(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f17589,f2076])). 23.41/23.22 fof(f17589,plain,( 23.41/23.22 sP883(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f15182,f2074])). 23.41/23.22 fof(f15182,plain,( 23.41/23.22 sP882(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f13135,f2072])). 23.41/23.22 fof(f13135,plain,( 23.41/23.22 sP881(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f11420,f2070])). 23.41/23.22 fof(f11420,plain,( 23.41/23.22 sP880(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f10272,f2068])). 23.41/23.22 fof(f10272,plain,( 23.41/23.22 sP877(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f9310,f2062])). 23.41/23.22 fof(f9310,plain,( 23.41/23.22 sP876(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f8339,f2060])). 23.41/23.22 fof(f472366,plain,( 23.41/23.22 ~sP975(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f448997,f2260])). 23.41/23.22 fof(f2260,plain,( 23.41/23.22 ( ! [X43,X42] : (~sP975(X43) | ~r1(X42,X43) | sP976(X42)) )), 23.41/23.22 inference(cnf_transformation,[],[f2260_D])). 23.41/23.22 fof(f2260_D,plain,( 23.41/23.22 ( ! [X42] : (( ! [X43] : (~sP975(X43) | ~r1(X42,X43)) ) <=> ~sP976(X42)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP976])])). 23.41/23.22 fof(f448997,plain,( 23.41/23.22 ~sP976(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f425847,f2262])). 23.41/23.22 fof(f2262,plain,( 23.41/23.22 ( ! [X41,X42] : (~sP976(X42) | ~r1(X41,X42) | sP977(X41)) )), 23.41/23.22 inference(cnf_transformation,[],[f2262_D])). 23.41/23.22 fof(f2262_D,plain,( 23.41/23.22 ( ! [X41] : (( ! [X42] : (~sP976(X42) | ~r1(X41,X42)) ) <=> ~sP977(X41)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP977])])). 23.41/23.22 fof(f425847,plain,( 23.41/23.22 ~sP977(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f403013,f2264])). 23.41/23.22 fof(f2264,plain,( 23.41/23.22 ( ! [X41,X40] : (~sP977(X41) | ~r1(X40,X41) | sP978(X40)) )), 23.41/23.22 inference(cnf_transformation,[],[f2264_D])). 23.41/23.22 fof(f2264_D,plain,( 23.41/23.22 ( ! [X40] : (( ! [X41] : (~sP977(X41) | ~r1(X40,X41)) ) <=> ~sP978(X40)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP978])])). 23.41/23.22 fof(f403013,plain,( 23.41/23.22 ~sP978(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f378328,f2276])). 23.41/23.22 fof(f2276,plain,( 23.41/23.22 ( ! [X39,X40] : (~sP978(X40) | ~r1(X39,X40) | sP984(X39)) )), 23.41/23.22 inference(cnf_transformation,[],[f2276_D])). 23.41/23.22 fof(f2276_D,plain,( 23.41/23.22 ( ! [X39] : (( ! [X40] : (~sP978(X40) | ~r1(X39,X40)) ) <=> ~sP984(X39)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP984])])). 23.41/23.22 fof(f378328,plain,( 23.41/23.22 ~sP984(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f342848,f2278])). 23.41/23.22 fof(f2278,plain,( 23.41/23.22 ( ! [X39,X38] : (~sP984(X39) | ~r1(X38,X39) | sP985(X38)) )), 23.41/23.22 inference(cnf_transformation,[],[f2278_D])). 23.41/23.22 fof(f2278_D,plain,( 23.41/23.22 ( ! [X38] : (( ! [X39] : (~sP984(X39) | ~r1(X38,X39)) ) <=> ~sP985(X38)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP985])])). 23.41/23.22 fof(f342848,plain,( 23.41/23.22 ~sP985(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f320725,f2280])). 23.41/23.22 fof(f2280,plain,( 23.41/23.22 ( ! [X37,X38] : (~sP985(X38) | ~r1(X37,X38) | sP986(X37)) )), 23.41/23.22 inference(cnf_transformation,[],[f2280_D])). 23.41/23.22 fof(f2280_D,plain,( 23.41/23.22 ( ! [X37] : (( ! [X38] : (~sP985(X38) | ~r1(X37,X38)) ) <=> ~sP986(X37)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP986])])). 23.41/23.22 fof(f320725,plain,( 23.41/23.22 ~sP986(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f301834,f2282])). 23.41/23.22 fof(f2282,plain,( 23.41/23.22 ( ! [X37,X36] : (~sP986(X37) | ~r1(X36,X37) | sP987(X36)) )), 23.41/23.22 inference(cnf_transformation,[],[f2282_D])). 23.41/23.22 fof(f2282_D,plain,( 23.41/23.22 ( ! [X36] : (( ! [X37] : (~sP986(X37) | ~r1(X36,X37)) ) <=> ~sP987(X36)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP987])])). 23.41/23.22 fof(f301834,plain,( 23.41/23.22 ~sP987(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f283713,f2284])). 23.41/23.22 fof(f2284,plain,( 23.41/23.22 ( ! [X35,X36] : (~sP987(X36) | ~r1(X35,X36) | sP988(X35)) )), 23.41/23.22 inference(cnf_transformation,[],[f2284_D])). 23.41/23.22 fof(f2284_D,plain,( 23.41/23.22 ( ! [X35] : (( ! [X36] : (~sP987(X36) | ~r1(X35,X36)) ) <=> ~sP988(X35)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP988])])). 23.41/23.22 fof(f283713,plain,( 23.41/23.22 ~sP988(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f266354,f2286])). 23.41/23.22 fof(f2286,plain,( 23.41/23.22 ( ! [X35,X34] : (~sP988(X35) | ~r1(X34,X35) | sP989(X34)) )), 23.41/23.22 inference(cnf_transformation,[],[f2286_D])). 23.41/23.22 fof(f2286_D,plain,( 23.41/23.22 ( ! [X34] : (( ! [X35] : (~sP988(X35) | ~r1(X34,X35)) ) <=> ~sP989(X34)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP989])])). 23.41/23.22 fof(f266354,plain,( 23.41/23.22 ~sP989(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f249726,f2288])). 23.41/23.22 fof(f2288,plain,( 23.41/23.22 ( ! [X33,X34] : (~sP989(X34) | ~r1(X33,X34) | sP990(X33)) )), 23.41/23.22 inference(cnf_transformation,[],[f2288_D])). 23.41/23.22 fof(f2288_D,plain,( 23.41/23.22 ( ! [X33] : (( ! [X34] : (~sP989(X34) | ~r1(X33,X34)) ) <=> ~sP990(X33)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP990])])). 23.41/23.22 fof(f249726,plain,( 23.41/23.22 ~sP990(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f233828,f2290])). 23.41/23.22 fof(f2290,plain,( 23.41/23.22 ( ! [X33,X32] : (~sP990(X33) | ~r1(X32,X33) | sP991(X32)) )), 23.41/23.22 inference(cnf_transformation,[],[f2290_D])). 23.41/23.22 fof(f2290_D,plain,( 23.41/23.22 ( ! [X32] : (( ! [X33] : (~sP990(X33) | ~r1(X32,X33)) ) <=> ~sP991(X32)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP991])])). 23.41/23.22 fof(f233828,plain,( 23.41/23.22 ~sP991(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f218628,f2292])). 23.41/23.22 fof(f2292,plain,( 23.41/23.22 ( ! [X31,X32] : (~sP991(X32) | ~r1(X31,X32) | sP992(X31)) )), 23.41/23.22 inference(cnf_transformation,[],[f2292_D])). 23.41/23.22 fof(f2292_D,plain,( 23.41/23.22 ( ! [X31] : (( ! [X32] : (~sP991(X32) | ~r1(X31,X32)) ) <=> ~sP992(X31)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP992])])). 23.41/23.22 fof(f218628,plain,( 23.41/23.22 ~sP992(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f204123,f2294])). 23.41/23.22 fof(f2294,plain,( 23.41/23.22 ( ! [X30,X31] : (~sP992(X31) | ~r1(X30,X31) | sP993(X30)) )), 23.41/23.22 inference(cnf_transformation,[],[f2294_D])). 23.41/23.22 fof(f2294_D,plain,( 23.41/23.22 ( ! [X30] : (( ! [X31] : (~sP992(X31) | ~r1(X30,X31)) ) <=> ~sP993(X30)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP993])])). 23.41/23.22 fof(f204123,plain,( 23.41/23.22 ~sP993(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f190291,f2296])). 23.41/23.22 fof(f2296,plain,( 23.41/23.22 ( ! [X30,X29] : (~sP993(X30) | ~r1(X29,X30) | sP994(X29)) )), 23.41/23.22 inference(cnf_transformation,[],[f2296_D])). 23.41/23.22 fof(f2296_D,plain,( 23.41/23.22 ( ! [X29] : (( ! [X30] : (~sP993(X30) | ~r1(X29,X30)) ) <=> ~sP994(X29)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP994])])). 23.41/23.22 fof(f190291,plain,( 23.41/23.22 ~sP994(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f177120,f2298])). 23.41/23.22 fof(f2298,plain,( 23.41/23.22 ( ! [X28,X29] : (~sP994(X29) | ~r1(X28,X29) | sP995(X28)) )), 23.41/23.22 inference(cnf_transformation,[],[f2298_D])). 23.41/23.22 fof(f2298_D,plain,( 23.41/23.22 ( ! [X28] : (( ! [X29] : (~sP994(X29) | ~r1(X28,X29)) ) <=> ~sP995(X28)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP995])])). 23.41/23.22 fof(f177120,plain,( 23.41/23.22 ~sP995(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f164593,f2300])). 23.41/23.22 fof(f2300,plain,( 23.41/23.22 ( ! [X28,X27] : (~sP995(X28) | ~r1(X27,X28) | sP996(X27)) )), 23.41/23.22 inference(cnf_transformation,[],[f2300_D])). 23.41/23.22 fof(f2300_D,plain,( 23.41/23.22 ( ! [X27] : (( ! [X28] : (~sP995(X28) | ~r1(X27,X28)) ) <=> ~sP996(X27)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP996])])). 23.41/23.22 fof(f164593,plain,( 23.41/23.22 ~sP996(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f152692,f2302])). 23.41/23.22 fof(f2302,plain,( 23.41/23.22 ( ! [X26,X27] : (~sP996(X27) | ~r1(X26,X27) | sP997(X26)) )), 23.41/23.22 inference(cnf_transformation,[],[f2302_D])). 23.41/23.22 fof(f2302_D,plain,( 23.41/23.22 ( ! [X26] : (( ! [X27] : (~sP996(X27) | ~r1(X26,X27)) ) <=> ~sP997(X26)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP997])])). 23.41/23.22 fof(f152692,plain,( 23.41/23.22 ~sP997(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f141401,f2304])). 23.41/23.22 fof(f2304,plain,( 23.41/23.22 ( ! [X26,X25] : (~sP997(X26) | ~r1(X25,X26) | sP998(X25)) )), 23.41/23.22 inference(cnf_transformation,[],[f2304_D])). 23.41/23.22 fof(f2304_D,plain,( 23.41/23.22 ( ! [X25] : (( ! [X26] : (~sP997(X26) | ~r1(X25,X26)) ) <=> ~sP998(X25)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP998])])). 23.41/23.22 fof(f141401,plain,( 23.41/23.22 ~sP998(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f130703,f2306])). 23.41/23.22 fof(f2306,plain,( 23.41/23.22 ( ! [X24,X25] : (~sP998(X25) | ~r1(X24,X25) | sP999(X24)) )), 23.41/23.22 inference(cnf_transformation,[],[f2306_D])). 23.41/23.22 fof(f2306_D,plain,( 23.41/23.22 ( ! [X24] : (( ! [X25] : (~sP998(X25) | ~r1(X24,X25)) ) <=> ~sP999(X24)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP999])])). 23.41/23.22 fof(f130703,plain,( 23.41/23.22 ~sP999(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f120585,f2308])). 23.41/23.22 fof(f2308,plain,( 23.41/23.22 ( ! [X24,X23] : (~sP999(X24) | ~r1(X23,X24) | sP1000(X23)) )), 23.41/23.22 inference(cnf_transformation,[],[f2308_D])). 23.41/23.22 fof(f2308_D,plain,( 23.41/23.22 ( ! [X23] : (( ! [X24] : (~sP999(X24) | ~r1(X23,X24)) ) <=> ~sP1000(X23)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1000])])). 23.41/23.22 fof(f120585,plain,( 23.41/23.22 ~sP1000(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f111021,f2310])). 23.41/23.22 fof(f2310,plain,( 23.41/23.22 ( ! [X23,X22] : (~sP1000(X23) | ~r1(X22,X23) | sP1001(X22)) )), 23.41/23.22 inference(cnf_transformation,[],[f2310_D])). 23.41/23.22 fof(f2310_D,plain,( 23.41/23.22 ( ! [X22] : (( ! [X23] : (~sP1000(X23) | ~r1(X22,X23)) ) <=> ~sP1001(X22)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1001])])). 23.41/23.22 fof(f111021,plain,( 23.41/23.22 ~sP1001(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f102009,f2312])). 23.41/23.22 fof(f2312,plain,( 23.41/23.22 ( ! [X21,X22] : (~sP1001(X22) | ~r1(X21,X22) | sP1002(X21)) )), 23.41/23.22 inference(cnf_transformation,[],[f2312_D])). 23.41/23.22 fof(f2312_D,plain,( 23.41/23.22 ( ! [X21] : (( ! [X22] : (~sP1001(X22) | ~r1(X21,X22)) ) <=> ~sP1002(X21)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1002])])). 23.41/23.22 fof(f102009,plain,( 23.41/23.22 ~sP1002(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f93528,f2314])). 23.41/23.22 fof(f2314,plain,( 23.41/23.22 ( ! [X21,X20] : (~sP1002(X21) | ~r1(X20,X21) | sP1003(X20)) )), 23.41/23.22 inference(cnf_transformation,[],[f2314_D])). 23.41/23.22 fof(f2314_D,plain,( 23.41/23.22 ( ! [X20] : (( ! [X21] : (~sP1002(X21) | ~r1(X20,X21)) ) <=> ~sP1003(X20)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1003])])). 23.41/23.22 fof(f93528,plain,( 23.41/23.22 ~sP1003(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f85560,f2316])). 23.41/23.22 fof(f2316,plain,( 23.41/23.22 ( ! [X19,X20] : (~sP1003(X20) | ~r1(X19,X20) | sP1004(X19)) )), 23.41/23.22 inference(cnf_transformation,[],[f2316_D])). 23.41/23.22 fof(f2316_D,plain,( 23.41/23.22 ( ! [X19] : (( ! [X20] : (~sP1003(X20) | ~r1(X19,X20)) ) <=> ~sP1004(X19)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1004])])). 23.41/23.22 fof(f85560,plain,( 23.41/23.22 ~sP1004(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f78097,f2318])). 23.41/23.22 fof(f2318,plain,( 23.41/23.22 ( ! [X19,X18] : (~sP1004(X19) | ~r1(X18,X19) | sP1005(X18)) )), 23.41/23.22 inference(cnf_transformation,[],[f2318_D])). 23.41/23.22 fof(f2318_D,plain,( 23.41/23.22 ( ! [X18] : (( ! [X19] : (~sP1004(X19) | ~r1(X18,X19)) ) <=> ~sP1005(X18)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1005])])). 23.41/23.22 fof(f78097,plain,( 23.41/23.22 ~sP1005(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f71101,f2320])). 23.41/23.22 fof(f2320,plain,( 23.41/23.22 ( ! [X17,X18] : (~sP1005(X18) | ~r1(X17,X18) | sP1006(X17)) )), 23.41/23.22 inference(cnf_transformation,[],[f2320_D])). 23.41/23.22 fof(f2320_D,plain,( 23.41/23.22 ( ! [X17] : (( ! [X18] : (~sP1005(X18) | ~r1(X17,X18)) ) <=> ~sP1006(X17)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1006])])). 23.41/23.22 fof(f71101,plain,( 23.41/23.22 ~sP1006(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f64576,f2321])). 23.41/23.22 fof(f2321,plain,( 23.41/23.22 ( ! [X17,X16] : (~sP1006(X17) | ~sP983(X16) | ~r1(X16,X17)) )), 23.41/23.22 inference(general_splitting,[],[f2319,f2320_D])). 23.41/23.22 fof(f2319,plain,( 23.41/23.22 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP983(X16) | ~sP1005(X18)) )), 23.41/23.22 inference(general_splitting,[],[f2317,f2318_D])). 23.41/23.22 fof(f2317,plain,( 23.41/23.22 ( ! [X19,X17,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP1004(X19)) )), 23.41/23.22 inference(general_splitting,[],[f2315,f2316_D])). 23.41/23.22 fof(f2315,plain,( 23.41/23.22 ( ! [X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP1003(X20)) )), 23.41/23.22 inference(general_splitting,[],[f2313,f2314_D])). 23.41/23.22 fof(f2313,plain,( 23.41/23.22 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP1002(X21)) )), 23.41/23.22 inference(general_splitting,[],[f2311,f2312_D])). 23.41/23.22 fof(f2311,plain,( 23.41/23.22 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP1001(X22)) )), 23.41/23.22 inference(general_splitting,[],[f2309,f2310_D])). 23.41/23.22 fof(f2309,plain,( 23.41/23.22 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP1000(X23)) )), 23.41/23.22 inference(general_splitting,[],[f2307,f2308_D])). 23.41/23.22 fof(f2307,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP999(X24)) )), 23.41/23.22 inference(general_splitting,[],[f2305,f2306_D])). 23.41/23.22 fof(f2305,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP998(X25)) )), 23.41/23.22 inference(general_splitting,[],[f2303,f2304_D])). 23.41/23.22 fof(f2303,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP997(X26)) )), 23.41/23.22 inference(general_splitting,[],[f2301,f2302_D])). 23.41/23.22 fof(f2301,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP996(X27)) )), 23.41/23.22 inference(general_splitting,[],[f2299,f2300_D])). 23.41/23.22 fof(f2299,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP995(X28)) )), 23.41/23.22 inference(general_splitting,[],[f2297,f2298_D])). 23.41/23.22 fof(f2297,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP994(X29)) )), 23.41/23.22 inference(general_splitting,[],[f2295,f2296_D])). 23.41/23.22 fof(f2295,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP993(X30)) )), 23.41/23.22 inference(general_splitting,[],[f2293,f2294_D])). 23.41/23.22 fof(f2293,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP992(X31)) )), 23.41/23.22 inference(general_splitting,[],[f2291,f2292_D])). 23.41/23.22 fof(f2291,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP991(X32)) )), 23.41/23.22 inference(general_splitting,[],[f2289,f2290_D])). 23.41/23.22 fof(f2289,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP990(X33)) )), 23.41/23.22 inference(general_splitting,[],[f2287,f2288_D])). 23.41/23.22 fof(f2287,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP989(X34)) )), 23.41/23.22 inference(general_splitting,[],[f2285,f2286_D])). 23.41/23.22 fof(f2285,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP988(X35)) )), 23.41/23.22 inference(general_splitting,[],[f2283,f2284_D])). 23.41/23.22 fof(f2283,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP987(X36)) )), 23.41/23.22 inference(general_splitting,[],[f2281,f2282_D])). 23.41/23.22 fof(f2281,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP986(X37)) )), 23.41/23.22 inference(general_splitting,[],[f2279,f2280_D])). 23.41/23.22 fof(f2279,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP985(X38)) )), 23.41/23.22 inference(general_splitting,[],[f2277,f2278_D])). 23.41/23.22 fof(f2277,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP983(X16) | ~sP984(X39)) )), 23.41/23.22 inference(general_splitting,[],[f2275,f2276_D])). 23.41/23.22 fof(f2275,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP978(X40) | ~sP983(X16)) )), 23.41/23.22 inference(general_splitting,[],[f2273,f2274_D])). 23.41/23.22 fof(f2274,plain,( 23.41/23.22 ( ! [X15,X16] : (sP983(X16) | ~sP982(X15) | ~r1(X15,X16)) )), 23.41/23.22 inference(cnf_transformation,[],[f2274_D])). 23.41/23.22 fof(f2274_D,plain,( 23.41/23.22 ( ! [X16] : (( ! [X15] : (~sP982(X15) | ~r1(X15,X16)) ) <=> ~sP983(X16)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP983])])). 23.41/23.22 fof(f2273,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP978(X40) | ~sP982(X15)) )), 23.41/23.22 inference(general_splitting,[],[f2271,f2272_D])). 23.41/23.22 fof(f2272,plain,( 23.41/23.22 ( ! [X14,X15] : (sP982(X15) | ~sP981(X14) | ~r1(X14,X15)) )), 23.41/23.22 inference(cnf_transformation,[],[f2272_D])). 23.41/23.22 fof(f2272_D,plain,( 23.41/23.22 ( ! [X15] : (( ! [X14] : (~sP981(X14) | ~r1(X14,X15)) ) <=> ~sP982(X15)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP982])])). 23.41/23.22 fof(f2271,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP978(X40) | ~sP981(X14)) )), 23.41/23.22 inference(general_splitting,[],[f2269,f2270_D])). 23.41/23.22 fof(f2270,plain,( 23.41/23.22 ( ! [X14,X13] : (sP981(X14) | ~sP980(X13) | ~r1(X13,X14)) )), 23.41/23.22 inference(cnf_transformation,[],[f2270_D])). 23.41/23.22 fof(f2270_D,plain,( 23.41/23.22 ( ! [X14] : (( ! [X13] : (~sP980(X13) | ~r1(X13,X14)) ) <=> ~sP981(X14)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP981])])). 23.41/23.22 fof(f2269,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP978(X40) | ~sP980(X13)) )), 23.41/23.22 inference(general_splitting,[],[f2267,f2268_D])). 23.41/23.22 fof(f2268,plain,( 23.41/23.22 ( ! [X12,X13] : (sP980(X13) | ~sP979(X12) | ~r1(X12,X13)) )), 23.41/23.22 inference(cnf_transformation,[],[f2268_D])). 23.41/23.22 fof(f2268_D,plain,( 23.41/23.22 ( ! [X13] : (( ! [X12] : (~sP979(X12) | ~r1(X12,X13)) ) <=> ~sP980(X13)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP980])])). 23.41/23.22 fof(f2267,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP978(X40) | ~sP979(X12)) )), 23.41/23.22 inference(general_splitting,[],[f2265,f2266_D])). 23.41/23.22 fof(f2266,plain,( 23.41/23.22 ( ! [X12,X11] : (sP979(X12) | ~sP974(X11) | ~r1(X11,X12)) )), 23.41/23.22 inference(cnf_transformation,[],[f2266_D])). 23.41/23.22 fof(f2266_D,plain,( 23.41/23.22 ( ! [X12] : (( ! [X11] : (~sP974(X11) | ~r1(X11,X12)) ) <=> ~sP979(X12)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP979])])). 23.41/23.22 fof(f2265,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP974(X11) | ~sP978(X40)) )), 23.41/23.22 inference(general_splitting,[],[f2263,f2264_D])). 23.41/23.22 fof(f2263,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP974(X11) | ~sP977(X41)) )), 23.41/23.22 inference(general_splitting,[],[f2261,f2262_D])). 23.41/23.22 fof(f2261,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP974(X11) | ~sP976(X42)) )), 23.41/23.22 inference(general_splitting,[],[f2259,f2260_D])). 23.41/23.22 fof(f2259,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP974(X11) | ~sP975(X43)) )), 23.41/23.22 inference(general_splitting,[],[f2257,f2258_D])). 23.41/23.22 fof(f2257,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP974(X11)) )), 23.41/23.22 inference(general_splitting,[],[f2255,f2256_D])). 23.41/23.22 fof(f2256,plain,( 23.41/23.22 ( ! [X10,X11] : (sP974(X11) | ~sP973(X10) | ~r1(X10,X11)) )), 23.41/23.22 inference(cnf_transformation,[],[f2256_D])). 23.41/23.22 fof(f2256_D,plain,( 23.41/23.22 ( ! [X11] : (( ! [X10] : (~sP973(X10) | ~r1(X10,X11)) ) <=> ~sP974(X11)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP974])])). 23.41/23.22 fof(f2255,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~sP973(X10)) )), 23.41/23.22 inference(general_splitting,[],[f2253,f2254_D])). 23.41/23.22 fof(f2254,plain,( 23.41/23.22 ( ! [X10,X9] : (sP973(X10) | ~sP972(X9) | ~r1(X9,X10)) )), 23.41/23.22 inference(cnf_transformation,[],[f2254_D])). 23.41/23.22 fof(f2254_D,plain,( 23.41/23.22 ( ! [X10] : (( ! [X9] : (~sP972(X9) | ~r1(X9,X10)) ) <=> ~sP973(X10)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP973])])). 23.41/23.22 fof(f2253,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP972(X9)) )), 23.41/23.22 inference(general_splitting,[],[f2251,f2252_D])). 23.41/23.22 fof(f2252,plain,( 23.41/23.22 ( ! [X8,X9] : (sP972(X9) | ~sP971(X8) | ~r1(X8,X9)) )), 23.41/23.22 inference(cnf_transformation,[],[f2252_D])). 23.41/23.22 fof(f2252_D,plain,( 23.41/23.22 ( ! [X9] : (( ! [X8] : (~sP971(X8) | ~r1(X8,X9)) ) <=> ~sP972(X9)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP972])])). 23.41/23.22 fof(f2251,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP971(X8)) )), 23.41/23.22 inference(general_splitting,[],[f2249,f2250_D])). 23.41/23.22 fof(f2250,plain,( 23.41/23.22 ( ! [X8,X7] : (sP971(X8) | ~sP970(X7) | ~r1(X7,X8)) )), 23.41/23.22 inference(cnf_transformation,[],[f2250_D])). 23.41/23.22 fof(f2250_D,plain,( 23.41/23.22 ( ! [X8] : (( ! [X7] : (~sP970(X7) | ~r1(X7,X8)) ) <=> ~sP971(X8)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP971])])). 23.41/23.22 fof(f2249,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~sP970(X7)) )), 23.41/23.22 inference(general_splitting,[],[f2247,f2248_D])). 23.41/23.22 fof(f2248,plain,( 23.41/23.22 ( ! [X6,X7] : (sP970(X7) | ~sP969(X6) | ~r1(X6,X7)) )), 23.41/23.22 inference(cnf_transformation,[],[f2248_D])). 23.41/23.22 fof(f2248_D,plain,( 23.41/23.22 ( ! [X7] : (( ! [X6] : (~sP969(X6) | ~r1(X6,X7)) ) <=> ~sP970(X7)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP970])])). 23.41/23.22 fof(f2247,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP969(X6)) )), 23.41/23.22 inference(general_splitting,[],[f2245,f2246_D])). 23.41/23.22 fof(f2246,plain,( 23.41/23.22 ( ! [X6,X5] : (sP969(X6) | ~sP968(X5) | ~r1(X5,X6)) )), 23.41/23.22 inference(cnf_transformation,[],[f2246_D])). 23.41/23.22 fof(f2246_D,plain,( 23.41/23.22 ( ! [X6] : (( ! [X5] : (~sP968(X5) | ~r1(X5,X6)) ) <=> ~sP969(X6)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP969])])). 23.41/23.22 fof(f2245,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP968(X5)) )), 23.41/23.22 inference(general_splitting,[],[f2243,f2244_D])). 23.41/23.22 fof(f2244,plain,( 23.41/23.22 ( ! [X4,X5] : (sP968(X5) | ~sP967(X4) | ~r1(X4,X5)) )), 23.41/23.22 inference(cnf_transformation,[],[f2244_D])). 23.41/23.22 fof(f2244_D,plain,( 23.41/23.22 ( ! [X5] : (( ! [X4] : (~sP967(X4) | ~r1(X4,X5)) ) <=> ~sP968(X5)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP968])])). 23.41/23.22 fof(f2243,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP967(X4)) )), 23.41/23.22 inference(general_splitting,[],[f2241,f2242_D])). 23.41/23.22 fof(f2242,plain,( 23.41/23.22 ( ! [X4,X3] : (sP967(X4) | ~sP966(X3) | ~r1(X3,X4)) )), 23.41/23.22 inference(cnf_transformation,[],[f2242_D])). 23.41/23.22 fof(f2242_D,plain,( 23.41/23.22 ( ! [X4] : (( ! [X3] : (~sP966(X3) | ~r1(X3,X4)) ) <=> ~sP967(X4)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP967])])). 23.41/23.22 fof(f2241,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP966(X3)) )), 23.41/23.22 inference(general_splitting,[],[f2239,f2240_D])). 23.41/23.22 fof(f2240,plain,( 23.41/23.22 ( ! [X2,X3] : (sP966(X3) | ~sP965(X2) | ~r1(X2,X3)) )), 23.41/23.22 inference(cnf_transformation,[],[f2240_D])). 23.41/23.22 fof(f2240_D,plain,( 23.41/23.22 ( ! [X3] : (( ! [X2] : (~sP965(X2) | ~r1(X2,X3)) ) <=> ~sP966(X3)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP966])])). 23.41/23.22 fof(f2239,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP965(X2)) )), 23.41/23.22 inference(general_splitting,[],[f2237,f2238_D])). 23.41/23.22 fof(f2238,plain,( 23.41/23.22 ( ! [X2,X1] : (sP965(X2) | ~sP964(X1) | ~r1(X1,X2)) )), 23.41/23.22 inference(cnf_transformation,[],[f2238_D])). 23.41/23.22 fof(f2238_D,plain,( 23.41/23.22 ( ! [X2] : (( ! [X1] : (~sP964(X1) | ~r1(X1,X2)) ) <=> ~sP965(X2)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP965])])). 23.41/23.22 fof(f2237,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X1,X2) | ~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP964(X1)) )), 23.41/23.22 inference(general_splitting,[],[f405,f2236_D])). 23.41/23.22 fof(f2236,plain,( 23.41/23.22 ( ! [X0,X1] : (sP964(X1) | ~sP39(X0) | ~r1(X0,X1)) )), 23.41/23.22 inference(cnf_transformation,[],[f2236_D])). 23.41/23.22 fof(f2236_D,plain,( 23.41/23.22 ( ! [X1] : (( ! [X0] : (~sP39(X0) | ~r1(X0,X1)) ) <=> ~sP964(X1)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP964])])). 23.41/23.22 fof(f405,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X0,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X1,X2) | ~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X43,X44) | p42(X44) | p41(X44) | ~r1(X42,X43) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X0,X1) | ~sP39(X0)) )), 23.41/23.22 inference(cnf_transformation,[],[f94])). 23.41/23.22 fof(f64576,plain,( 23.41/23.22 sP983(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f56502,f2274])). 23.41/23.22 fof(f56502,plain,( 23.41/23.22 sP982(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f49799,f2272])). 23.41/23.22 fof(f49799,plain,( 23.41/23.22 sP981(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f44271,f2270])). 23.41/23.22 fof(f44271,plain,( 23.41/23.22 sP980(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f39742,f2268])). 23.41/23.22 fof(f39742,plain,( 23.41/23.22 sP979(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f35587,f2266])). 23.41/23.22 fof(f35587,plain,( 23.41/23.22 sP974(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f31790,f2256])). 23.41/23.22 fof(f31790,plain,( 23.41/23.22 sP973(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f28320,f2254])). 23.41/23.22 fof(f28320,plain,( 23.41/23.22 sP972(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f25191,f2252])). 23.41/23.22 fof(f25191,plain,( 23.41/23.22 sP971(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f22372,f2250])). 23.41/23.22 fof(f22372,plain,( 23.41/23.22 sP970(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f19847,f2248])). 23.41/23.22 fof(f19847,plain,( 23.41/23.22 sP969(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f17585,f2246])). 23.41/23.22 fof(f17585,plain,( 23.41/23.22 sP968(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f15178,f2244])). 23.41/23.22 fof(f15178,plain,( 23.41/23.22 sP967(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f13131,f2242])). 23.41/23.22 fof(f13131,plain,( 23.41/23.22 sP966(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f11416,f2240])). 23.41/23.22 fof(f11416,plain,( 23.41/23.22 sP965(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f10268,f2238])). 23.41/23.22 fof(f10268,plain,( 23.41/23.22 sP964(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f9304,f2236])). 23.41/23.22 fof(f472363,plain,( 23.41/23.22 ~sP1102(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f448994,f2514])). 23.41/23.22 fof(f2514,plain,( 23.41/23.22 ( ! [X43,X42] : (~sP1102(X43) | ~r1(X42,X43) | sP1103(X42)) )), 23.41/23.22 inference(cnf_transformation,[],[f2514_D])). 23.41/23.22 fof(f2514_D,plain,( 23.41/23.22 ( ! [X42] : (( ! [X43] : (~sP1102(X43) | ~r1(X42,X43)) ) <=> ~sP1103(X42)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1103])])). 23.41/23.22 fof(f448994,plain,( 23.41/23.22 ~sP1103(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f425844,f2516])). 23.41/23.22 fof(f2516,plain,( 23.41/23.22 ( ! [X41,X42] : (~sP1103(X42) | ~r1(X41,X42) | sP1104(X41)) )), 23.41/23.22 inference(cnf_transformation,[],[f2516_D])). 23.41/23.22 fof(f2516_D,plain,( 23.41/23.22 ( ! [X41] : (( ! [X42] : (~sP1103(X42) | ~r1(X41,X42)) ) <=> ~sP1104(X41)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1104])])). 23.41/23.22 fof(f425844,plain,( 23.41/23.22 ~sP1104(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f403010,f2518])). 23.41/23.22 fof(f2518,plain,( 23.41/23.22 ( ! [X41,X40] : (~sP1104(X41) | ~r1(X40,X41) | sP1105(X40)) )), 23.41/23.22 inference(cnf_transformation,[],[f2518_D])). 23.41/23.22 fof(f2518_D,plain,( 23.41/23.22 ( ! [X40] : (( ! [X41] : (~sP1104(X41) | ~r1(X40,X41)) ) <=> ~sP1105(X40)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1105])])). 23.41/23.22 fof(f403010,plain,( 23.41/23.22 ~sP1105(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f378325,f2530])). 23.41/23.22 fof(f2530,plain,( 23.41/23.22 ( ! [X39,X40] : (~sP1105(X40) | ~r1(X39,X40) | sP1111(X39)) )), 23.41/23.22 inference(cnf_transformation,[],[f2530_D])). 23.41/23.22 fof(f2530_D,plain,( 23.41/23.22 ( ! [X39] : (( ! [X40] : (~sP1105(X40) | ~r1(X39,X40)) ) <=> ~sP1111(X39)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1111])])). 23.41/23.22 fof(f378325,plain,( 23.41/23.22 ~sP1111(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f342845,f2532])). 23.41/23.22 fof(f2532,plain,( 23.41/23.22 ( ! [X39,X38] : (~sP1111(X39) | ~r1(X38,X39) | sP1112(X38)) )), 23.41/23.22 inference(cnf_transformation,[],[f2532_D])). 23.41/23.22 fof(f2532_D,plain,( 23.41/23.22 ( ! [X38] : (( ! [X39] : (~sP1111(X39) | ~r1(X38,X39)) ) <=> ~sP1112(X38)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1112])])). 23.41/23.22 fof(f342845,plain,( 23.41/23.22 ~sP1112(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f320723,f2534])). 23.41/23.22 fof(f2534,plain,( 23.41/23.22 ( ! [X37,X38] : (~sP1112(X38) | ~r1(X37,X38) | sP1113(X37)) )), 23.41/23.22 inference(cnf_transformation,[],[f2534_D])). 23.41/23.22 fof(f2534_D,plain,( 23.41/23.22 ( ! [X37] : (( ! [X38] : (~sP1112(X38) | ~r1(X37,X38)) ) <=> ~sP1113(X37)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1113])])). 23.41/23.22 fof(f320723,plain,( 23.41/23.22 ~sP1113(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f301832,f2536])). 23.41/23.22 fof(f2536,plain,( 23.41/23.22 ( ! [X37,X36] : (~sP1113(X37) | ~r1(X36,X37) | sP1114(X36)) )), 23.41/23.22 inference(cnf_transformation,[],[f2536_D])). 23.41/23.22 fof(f2536_D,plain,( 23.41/23.22 ( ! [X36] : (( ! [X37] : (~sP1113(X37) | ~r1(X36,X37)) ) <=> ~sP1114(X36)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1114])])). 23.41/23.22 fof(f301832,plain,( 23.41/23.22 ~sP1114(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f283711,f2538])). 23.41/23.22 fof(f2538,plain,( 23.41/23.22 ( ! [X35,X36] : (~sP1114(X36) | ~r1(X35,X36) | sP1115(X35)) )), 23.41/23.22 inference(cnf_transformation,[],[f2538_D])). 23.41/23.22 fof(f2538_D,plain,( 23.41/23.22 ( ! [X35] : (( ! [X36] : (~sP1114(X36) | ~r1(X35,X36)) ) <=> ~sP1115(X35)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1115])])). 23.41/23.22 fof(f283711,plain,( 23.41/23.22 ~sP1115(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f266352,f2540])). 23.41/23.22 fof(f2540,plain,( 23.41/23.22 ( ! [X35,X34] : (~sP1115(X35) | ~r1(X34,X35) | sP1116(X34)) )), 23.41/23.22 inference(cnf_transformation,[],[f2540_D])). 23.41/23.22 fof(f2540_D,plain,( 23.41/23.22 ( ! [X34] : (( ! [X35] : (~sP1115(X35) | ~r1(X34,X35)) ) <=> ~sP1116(X34)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1116])])). 23.41/23.22 fof(f266352,plain,( 23.41/23.22 ~sP1116(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f249724,f2542])). 23.41/23.22 fof(f2542,plain,( 23.41/23.22 ( ! [X33,X34] : (~sP1116(X34) | ~r1(X33,X34) | sP1117(X33)) )), 23.41/23.22 inference(cnf_transformation,[],[f2542_D])). 23.41/23.22 fof(f2542_D,plain,( 23.41/23.22 ( ! [X33] : (( ! [X34] : (~sP1116(X34) | ~r1(X33,X34)) ) <=> ~sP1117(X33)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1117])])). 23.41/23.22 fof(f249724,plain,( 23.41/23.22 ~sP1117(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f233826,f2544])). 23.41/23.22 fof(f2544,plain,( 23.41/23.22 ( ! [X33,X32] : (~sP1117(X33) | ~r1(X32,X33) | sP1118(X32)) )), 23.41/23.22 inference(cnf_transformation,[],[f2544_D])). 23.41/23.22 fof(f2544_D,plain,( 23.41/23.22 ( ! [X32] : (( ! [X33] : (~sP1117(X33) | ~r1(X32,X33)) ) <=> ~sP1118(X32)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1118])])). 23.41/23.22 fof(f233826,plain,( 23.41/23.22 ~sP1118(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f218626,f2546])). 23.41/23.22 fof(f2546,plain,( 23.41/23.22 ( ! [X31,X32] : (~sP1118(X32) | ~r1(X31,X32) | sP1119(X31)) )), 23.41/23.22 inference(cnf_transformation,[],[f2546_D])). 23.41/23.22 fof(f2546_D,plain,( 23.41/23.22 ( ! [X31] : (( ! [X32] : (~sP1118(X32) | ~r1(X31,X32)) ) <=> ~sP1119(X31)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1119])])). 23.41/23.22 fof(f218626,plain,( 23.41/23.22 ~sP1119(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f204121,f2548])). 23.41/23.22 fof(f2548,plain,( 23.41/23.22 ( ! [X30,X31] : (~sP1119(X31) | ~r1(X30,X31) | sP1120(X30)) )), 23.41/23.22 inference(cnf_transformation,[],[f2548_D])). 23.41/23.22 fof(f2548_D,plain,( 23.41/23.22 ( ! [X30] : (( ! [X31] : (~sP1119(X31) | ~r1(X30,X31)) ) <=> ~sP1120(X30)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1120])])). 23.41/23.22 fof(f204121,plain,( 23.41/23.22 ~sP1120(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f190289,f2550])). 23.41/23.22 fof(f2550,plain,( 23.41/23.22 ( ! [X30,X29] : (~sP1120(X30) | ~r1(X29,X30) | sP1121(X29)) )), 23.41/23.22 inference(cnf_transformation,[],[f2550_D])). 23.41/23.22 fof(f2550_D,plain,( 23.41/23.22 ( ! [X29] : (( ! [X30] : (~sP1120(X30) | ~r1(X29,X30)) ) <=> ~sP1121(X29)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1121])])). 23.41/23.22 fof(f190289,plain,( 23.41/23.22 ~sP1121(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f177118,f2552])). 23.41/23.22 fof(f2552,plain,( 23.41/23.22 ( ! [X28,X29] : (~sP1121(X29) | ~r1(X28,X29) | sP1122(X28)) )), 23.41/23.22 inference(cnf_transformation,[],[f2552_D])). 23.41/23.22 fof(f2552_D,plain,( 23.41/23.22 ( ! [X28] : (( ! [X29] : (~sP1121(X29) | ~r1(X28,X29)) ) <=> ~sP1122(X28)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1122])])). 23.41/23.22 fof(f177118,plain,( 23.41/23.22 ~sP1122(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f164591,f2554])). 23.41/23.22 fof(f2554,plain,( 23.41/23.22 ( ! [X28,X27] : (~sP1122(X28) | ~r1(X27,X28) | sP1123(X27)) )), 23.41/23.22 inference(cnf_transformation,[],[f2554_D])). 23.41/23.22 fof(f2554_D,plain,( 23.41/23.22 ( ! [X27] : (( ! [X28] : (~sP1122(X28) | ~r1(X27,X28)) ) <=> ~sP1123(X27)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1123])])). 23.41/23.22 fof(f164591,plain,( 23.41/23.22 ~sP1123(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f152690,f2556])). 23.41/23.22 fof(f2556,plain,( 23.41/23.22 ( ! [X26,X27] : (~sP1123(X27) | ~r1(X26,X27) | sP1124(X26)) )), 23.41/23.22 inference(cnf_transformation,[],[f2556_D])). 23.41/23.22 fof(f2556_D,plain,( 23.41/23.22 ( ! [X26] : (( ! [X27] : (~sP1123(X27) | ~r1(X26,X27)) ) <=> ~sP1124(X26)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1124])])). 23.41/23.22 fof(f152690,plain,( 23.41/23.22 ~sP1124(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f141399,f2558])). 23.41/23.22 fof(f2558,plain,( 23.41/23.22 ( ! [X26,X25] : (~sP1124(X26) | ~r1(X25,X26) | sP1125(X25)) )), 23.41/23.22 inference(cnf_transformation,[],[f2558_D])). 23.41/23.22 fof(f2558_D,plain,( 23.41/23.22 ( ! [X25] : (( ! [X26] : (~sP1124(X26) | ~r1(X25,X26)) ) <=> ~sP1125(X25)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1125])])). 23.41/23.22 fof(f141399,plain,( 23.41/23.22 ~sP1125(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f130701,f2560])). 23.41/23.22 fof(f2560,plain,( 23.41/23.22 ( ! [X24,X25] : (~sP1125(X25) | ~r1(X24,X25) | sP1126(X24)) )), 23.41/23.22 inference(cnf_transformation,[],[f2560_D])). 23.41/23.22 fof(f2560_D,plain,( 23.41/23.22 ( ! [X24] : (( ! [X25] : (~sP1125(X25) | ~r1(X24,X25)) ) <=> ~sP1126(X24)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1126])])). 23.41/23.22 fof(f130701,plain,( 23.41/23.22 ~sP1126(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f120583,f2562])). 23.41/23.22 fof(f2562,plain,( 23.41/23.22 ( ! [X24,X23] : (~sP1126(X24) | ~r1(X23,X24) | sP1127(X23)) )), 23.41/23.22 inference(cnf_transformation,[],[f2562_D])). 23.41/23.22 fof(f2562_D,plain,( 23.41/23.22 ( ! [X23] : (( ! [X24] : (~sP1126(X24) | ~r1(X23,X24)) ) <=> ~sP1127(X23)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1127])])). 23.41/23.22 fof(f120583,plain,( 23.41/23.22 ~sP1127(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f111019,f2564])). 23.41/23.22 fof(f2564,plain,( 23.41/23.22 ( ! [X23,X22] : (~sP1127(X23) | ~r1(X22,X23) | sP1128(X22)) )), 23.41/23.22 inference(cnf_transformation,[],[f2564_D])). 23.41/23.22 fof(f2564_D,plain,( 23.41/23.22 ( ! [X22] : (( ! [X23] : (~sP1127(X23) | ~r1(X22,X23)) ) <=> ~sP1128(X22)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1128])])). 23.41/23.22 fof(f111019,plain,( 23.41/23.22 ~sP1128(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f102007,f2566])). 23.41/23.22 fof(f2566,plain,( 23.41/23.22 ( ! [X21,X22] : (~sP1128(X22) | ~r1(X21,X22) | sP1129(X21)) )), 23.41/23.22 inference(cnf_transformation,[],[f2566_D])). 23.41/23.22 fof(f2566_D,plain,( 23.41/23.22 ( ! [X21] : (( ! [X22] : (~sP1128(X22) | ~r1(X21,X22)) ) <=> ~sP1129(X21)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1129])])). 23.41/23.22 fof(f102007,plain,( 23.41/23.22 ~sP1129(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f93526,f2568])). 23.41/23.22 fof(f2568,plain,( 23.41/23.22 ( ! [X21,X20] : (~sP1129(X21) | ~r1(X20,X21) | sP1130(X20)) )), 23.41/23.22 inference(cnf_transformation,[],[f2568_D])). 23.41/23.22 fof(f2568_D,plain,( 23.41/23.22 ( ! [X20] : (( ! [X21] : (~sP1129(X21) | ~r1(X20,X21)) ) <=> ~sP1130(X20)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1130])])). 23.41/23.22 fof(f93526,plain,( 23.41/23.22 ~sP1130(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f85558,f2570])). 23.41/23.22 fof(f2570,plain,( 23.41/23.22 ( ! [X19,X20] : (~sP1130(X20) | ~r1(X19,X20) | sP1131(X19)) )), 23.41/23.22 inference(cnf_transformation,[],[f2570_D])). 23.41/23.22 fof(f2570_D,plain,( 23.41/23.22 ( ! [X19] : (( ! [X20] : (~sP1130(X20) | ~r1(X19,X20)) ) <=> ~sP1131(X19)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1131])])). 23.41/23.22 fof(f85558,plain,( 23.41/23.22 ~sP1131(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f78095,f2572])). 23.41/23.22 fof(f2572,plain,( 23.41/23.22 ( ! [X19,X18] : (~sP1131(X19) | ~r1(X18,X19) | sP1132(X18)) )), 23.41/23.22 inference(cnf_transformation,[],[f2572_D])). 23.41/23.22 fof(f2572_D,plain,( 23.41/23.22 ( ! [X18] : (( ! [X19] : (~sP1131(X19) | ~r1(X18,X19)) ) <=> ~sP1132(X18)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1132])])). 23.41/23.22 fof(f78095,plain,( 23.41/23.22 ~sP1132(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f71099,f2574])). 23.41/23.22 fof(f2574,plain,( 23.41/23.22 ( ! [X17,X18] : (~sP1132(X18) | ~r1(X17,X18) | sP1133(X17)) )), 23.41/23.22 inference(cnf_transformation,[],[f2574_D])). 23.41/23.22 fof(f2574_D,plain,( 23.41/23.22 ( ! [X17] : (( ! [X18] : (~sP1132(X18) | ~r1(X17,X18)) ) <=> ~sP1133(X17)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1133])])). 23.41/23.22 fof(f71099,plain,( 23.41/23.22 ~sP1133(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f64574,f2575])). 23.41/23.22 fof(f2575,plain,( 23.41/23.22 ( ! [X17,X16] : (~sP1133(X17) | ~sP1110(X16) | ~r1(X16,X17)) )), 23.41/23.22 inference(general_splitting,[],[f2573,f2574_D])). 23.41/23.22 fof(f2573,plain,( 23.41/23.22 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP1110(X16) | ~sP1132(X18)) )), 23.41/23.22 inference(general_splitting,[],[f2571,f2572_D])). 23.41/23.22 fof(f2571,plain,( 23.41/23.22 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~sP1110(X16) | ~sP1131(X19)) )), 23.41/23.22 inference(general_splitting,[],[f2569,f2570_D])). 23.41/23.22 fof(f2569,plain,( 23.41/23.22 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~sP1110(X16) | ~sP1130(X20)) )), 23.41/23.22 inference(general_splitting,[],[f2567,f2568_D])). 23.41/23.22 fof(f2567,plain,( 23.41/23.22 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1129(X21)) )), 23.41/23.22 inference(general_splitting,[],[f2565,f2566_D])). 23.41/23.22 fof(f2565,plain,( 23.41/23.22 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1128(X22)) )), 23.41/23.22 inference(general_splitting,[],[f2563,f2564_D])). 23.41/23.22 fof(f2563,plain,( 23.41/23.22 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1127(X23)) )), 23.41/23.22 inference(general_splitting,[],[f2561,f2562_D])). 23.41/23.22 fof(f2561,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1126(X24)) )), 23.41/23.22 inference(general_splitting,[],[f2559,f2560_D])). 23.41/23.22 fof(f2559,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1125(X25)) )), 23.41/23.22 inference(general_splitting,[],[f2557,f2558_D])). 23.41/23.22 fof(f2557,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1124(X26)) )), 23.41/23.22 inference(general_splitting,[],[f2555,f2556_D])). 23.41/23.22 fof(f2555,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1123(X27)) )), 23.41/23.22 inference(general_splitting,[],[f2553,f2554_D])). 23.41/23.22 fof(f2553,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1122(X28)) )), 23.41/23.22 inference(general_splitting,[],[f2551,f2552_D])). 23.41/23.22 fof(f2551,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1121(X29)) )), 23.41/23.22 inference(general_splitting,[],[f2549,f2550_D])). 23.41/23.22 fof(f2549,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1120(X30)) )), 23.41/23.22 inference(general_splitting,[],[f2547,f2548_D])). 23.41/23.22 fof(f2547,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1119(X31)) )), 23.41/23.22 inference(general_splitting,[],[f2545,f2546_D])). 23.41/23.22 fof(f2545,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1118(X32)) )), 23.41/23.22 inference(general_splitting,[],[f2543,f2544_D])). 23.41/23.22 fof(f2543,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1117(X33)) )), 23.41/23.22 inference(general_splitting,[],[f2541,f2542_D])). 23.41/23.22 fof(f2541,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1116(X34)) )), 23.41/23.22 inference(general_splitting,[],[f2539,f2540_D])). 23.41/23.22 fof(f2539,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1115(X35)) )), 23.41/23.22 inference(general_splitting,[],[f2537,f2538_D])). 23.41/23.22 fof(f2537,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1114(X36)) )), 23.41/23.22 inference(general_splitting,[],[f2535,f2536_D])). 23.41/23.22 fof(f2535,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1113(X37)) )), 23.41/23.22 inference(general_splitting,[],[f2533,f2534_D])). 23.41/23.22 fof(f2533,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1112(X38)) )), 23.41/23.22 inference(general_splitting,[],[f2531,f2532_D])). 23.41/23.22 fof(f2531,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1110(X16) | ~sP1111(X39)) )), 23.41/23.22 inference(general_splitting,[],[f2529,f2530_D])). 23.41/23.22 fof(f2529,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP1105(X40) | ~sP1110(X16)) )), 23.41/23.22 inference(general_splitting,[],[f2527,f2528_D])). 23.41/23.22 fof(f2528,plain,( 23.41/23.22 ( ! [X15,X16] : (sP1110(X16) | ~sP1109(X15) | ~r1(X15,X16)) )), 23.41/23.22 inference(cnf_transformation,[],[f2528_D])). 23.41/23.22 fof(f2528_D,plain,( 23.41/23.22 ( ! [X16] : (( ! [X15] : (~sP1109(X15) | ~r1(X15,X16)) ) <=> ~sP1110(X16)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1110])])). 23.41/23.22 fof(f2527,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~sP1105(X40) | ~sP1109(X15)) )), 23.41/23.22 inference(general_splitting,[],[f2525,f2526_D])). 23.41/23.22 fof(f2526,plain,( 23.41/23.22 ( ! [X14,X15] : (sP1109(X15) | ~sP1108(X14) | ~r1(X14,X15)) )), 23.41/23.22 inference(cnf_transformation,[],[f2526_D])). 23.41/23.22 fof(f2526_D,plain,( 23.41/23.22 ( ! [X15] : (( ! [X14] : (~sP1108(X14) | ~r1(X14,X15)) ) <=> ~sP1109(X15)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1109])])). 23.41/23.22 fof(f2525,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1105(X40) | ~sP1108(X14)) )), 23.41/23.22 inference(general_splitting,[],[f2523,f2524_D])). 23.41/23.22 fof(f2524,plain,( 23.41/23.22 ( ! [X14,X13] : (sP1108(X14) | ~sP1107(X13) | ~r1(X13,X14)) )), 23.41/23.22 inference(cnf_transformation,[],[f2524_D])). 23.41/23.22 fof(f2524_D,plain,( 23.41/23.22 ( ! [X14] : (( ! [X13] : (~sP1107(X13) | ~r1(X13,X14)) ) <=> ~sP1108(X14)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1108])])). 23.41/23.22 fof(f2523,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1105(X40) | ~sP1107(X13)) )), 23.41/23.22 inference(general_splitting,[],[f2521,f2522_D])). 23.41/23.22 fof(f2522,plain,( 23.41/23.22 ( ! [X12,X13] : (sP1107(X13) | ~sP1106(X12) | ~r1(X12,X13)) )), 23.41/23.22 inference(cnf_transformation,[],[f2522_D])). 23.41/23.22 fof(f2522_D,plain,( 23.41/23.22 ( ! [X13] : (( ! [X12] : (~sP1106(X12) | ~r1(X12,X13)) ) <=> ~sP1107(X13)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1107])])). 23.41/23.22 fof(f2521,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1105(X40) | ~sP1106(X12)) )), 23.41/23.22 inference(general_splitting,[],[f2519,f2520_D])). 23.41/23.22 fof(f2520,plain,( 23.41/23.22 ( ! [X12,X11] : (sP1106(X12) | ~sP1101(X11) | ~r1(X11,X12)) )), 23.41/23.22 inference(cnf_transformation,[],[f2520_D])). 23.41/23.22 fof(f2520_D,plain,( 23.41/23.22 ( ! [X12] : (( ! [X11] : (~sP1101(X11) | ~r1(X11,X12)) ) <=> ~sP1106(X12)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1106])])). 23.41/23.22 fof(f2519,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1101(X11) | ~sP1105(X40)) )), 23.41/23.22 inference(general_splitting,[],[f2517,f2518_D])). 23.41/23.22 fof(f2517,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1101(X11) | ~sP1104(X41)) )), 23.41/23.22 inference(general_splitting,[],[f2515,f2516_D])). 23.41/23.22 fof(f2515,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1101(X11) | ~sP1103(X42)) )), 23.41/23.22 inference(general_splitting,[],[f2513,f2514_D])). 23.41/23.22 fof(f2513,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1101(X11) | ~sP1102(X43)) )), 23.41/23.22 inference(general_splitting,[],[f2511,f2512_D])). 23.41/23.22 fof(f2511,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1101(X11)) )), 23.41/23.22 inference(general_splitting,[],[f2509,f2510_D])). 23.41/23.22 fof(f2510,plain,( 23.41/23.22 ( ! [X10,X11] : (sP1101(X11) | ~sP1100(X10) | ~r1(X10,X11)) )), 23.41/23.22 inference(cnf_transformation,[],[f2510_D])). 23.41/23.22 fof(f2510_D,plain,( 23.41/23.22 ( ! [X11] : (( ! [X10] : (~sP1100(X10) | ~r1(X10,X11)) ) <=> ~sP1101(X11)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1101])])). 23.41/23.22 fof(f2509,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~sP1100(X10)) )), 23.41/23.22 inference(general_splitting,[],[f2507,f2508_D])). 23.41/23.22 fof(f2508,plain,( 23.41/23.22 ( ! [X10,X9] : (sP1100(X10) | ~sP1099(X9) | ~r1(X9,X10)) )), 23.41/23.22 inference(cnf_transformation,[],[f2508_D])). 23.41/23.22 fof(f2508_D,plain,( 23.41/23.22 ( ! [X10] : (( ! [X9] : (~sP1099(X9) | ~r1(X9,X10)) ) <=> ~sP1100(X10)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1100])])). 23.41/23.22 fof(f2507,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~sP1099(X9)) )), 23.41/23.22 inference(general_splitting,[],[f2505,f2506_D])). 23.41/23.22 fof(f2506,plain,( 23.41/23.22 ( ! [X8,X9] : (sP1099(X9) | ~sP1098(X8) | ~r1(X8,X9)) )), 23.41/23.22 inference(cnf_transformation,[],[f2506_D])). 23.41/23.22 fof(f2506_D,plain,( 23.41/23.22 ( ! [X9] : (( ! [X8] : (~sP1098(X8) | ~r1(X8,X9)) ) <=> ~sP1099(X9)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1099])])). 23.41/23.22 fof(f2505,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1098(X8)) )), 23.41/23.22 inference(general_splitting,[],[f2503,f2504_D])). 23.41/23.22 fof(f2504,plain,( 23.41/23.22 ( ! [X8,X7] : (sP1098(X8) | ~sP1097(X7) | ~r1(X7,X8)) )), 23.41/23.22 inference(cnf_transformation,[],[f2504_D])). 23.41/23.22 fof(f2504_D,plain,( 23.41/23.22 ( ! [X8] : (( ! [X7] : (~sP1097(X7) | ~r1(X7,X8)) ) <=> ~sP1098(X8)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1098])])). 23.41/23.22 fof(f2503,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1097(X7)) )), 23.41/23.22 inference(general_splitting,[],[f2501,f2502_D])). 23.41/23.22 fof(f2502,plain,( 23.41/23.22 ( ! [X6,X7] : (sP1097(X7) | ~sP1096(X6) | ~r1(X6,X7)) )), 23.41/23.22 inference(cnf_transformation,[],[f2502_D])). 23.41/23.22 fof(f2502_D,plain,( 23.41/23.22 ( ! [X7] : (( ! [X6] : (~sP1096(X6) | ~r1(X6,X7)) ) <=> ~sP1097(X7)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1097])])). 23.41/23.22 fof(f2501,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1096(X6)) )), 23.41/23.22 inference(general_splitting,[],[f2499,f2500_D])). 23.41/23.22 fof(f2500,plain,( 23.41/23.22 ( ! [X6,X5] : (sP1096(X6) | ~sP1095(X5) | ~r1(X5,X6)) )), 23.41/23.22 inference(cnf_transformation,[],[f2500_D])). 23.41/23.22 fof(f2500_D,plain,( 23.41/23.22 ( ! [X6] : (( ! [X5] : (~sP1095(X5) | ~r1(X5,X6)) ) <=> ~sP1096(X6)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1096])])). 23.41/23.22 fof(f2499,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1095(X5)) )), 23.41/23.22 inference(general_splitting,[],[f2497,f2498_D])). 23.41/23.22 fof(f2498,plain,( 23.41/23.22 ( ! [X4,X5] : (sP1095(X5) | ~sP1094(X4) | ~r1(X4,X5)) )), 23.41/23.22 inference(cnf_transformation,[],[f2498_D])). 23.41/23.22 fof(f2498_D,plain,( 23.41/23.22 ( ! [X5] : (( ! [X4] : (~sP1094(X4) | ~r1(X4,X5)) ) <=> ~sP1095(X5)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1095])])). 23.41/23.22 fof(f2497,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X32,X15,X44,X11,X40,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1094(X4)) )), 23.41/23.22 inference(general_splitting,[],[f2495,f2496_D])). 23.41/23.22 fof(f2496,plain,( 23.41/23.22 ( ! [X4,X3] : (sP1094(X4) | ~sP1093(X3) | ~r1(X3,X4)) )), 23.41/23.22 inference(cnf_transformation,[],[f2496_D])). 23.41/23.22 fof(f2496_D,plain,( 23.41/23.22 ( ! [X4] : (( ! [X3] : (~sP1093(X3) | ~r1(X3,X4)) ) <=> ~sP1094(X4)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1094])])). 23.41/23.22 fof(f2495,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1093(X3)) )), 23.41/23.22 inference(general_splitting,[],[f2493,f2494_D])). 23.41/23.22 fof(f2494,plain,( 23.41/23.22 ( ! [X3,X1] : (sP1093(X3) | ~sP1092(X1) | ~r1(X1,X3)) )), 23.41/23.22 inference(cnf_transformation,[],[f2494_D])). 23.41/23.22 fof(f2494_D,plain,( 23.41/23.22 ( ! [X3] : (( ! [X1] : (~sP1092(X1) | ~r1(X1,X3)) ) <=> ~sP1093(X3)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1093])])). 23.41/23.22 fof(f2493,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1092(X1)) )), 23.41/23.22 inference(general_splitting,[],[f406,f2492_D])). 23.41/23.22 fof(f2492,plain,( 23.41/23.22 ( ! [X0,X1] : (sP1092(X1) | ~sP38(X0) | ~r1(X0,X1)) )), 23.41/23.22 inference(cnf_transformation,[],[f2492_D])). 23.41/23.22 fof(f2492_D,plain,( 23.41/23.22 ( ! [X1] : (( ! [X0] : (~sP38(X0) | ~r1(X0,X1)) ) <=> ~sP1092(X1)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1092])])). 23.41/23.22 fof(f406,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X0,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X43,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X44,X11,X40,X20,X16] : (~r1(X0,X1) | ~r1(X1,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X36,X37) | ~r1(X39,X40) | ~r1(X41,X42) | ~r1(X42,X43) | ~p41(X44) | ~p40(X44) | ~r1(X43,X44) | ~r1(X40,X41) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP38(X0)) )), 23.41/23.22 inference(cnf_transformation,[],[f98])). 23.41/23.22 fof(f64574,plain,( 23.41/23.22 sP1110(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f56500,f2528])). 23.41/23.22 fof(f56500,plain,( 23.41/23.22 sP1109(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f49797,f2526])). 23.41/23.22 fof(f49797,plain,( 23.41/23.22 sP1108(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f44269,f2524])). 23.41/23.22 fof(f44269,plain,( 23.41/23.22 sP1107(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f39740,f2522])). 23.41/23.22 fof(f39740,plain,( 23.41/23.22 sP1106(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f35585,f2520])). 23.41/23.22 fof(f35585,plain,( 23.41/23.22 sP1101(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f31788,f2510])). 23.41/23.22 fof(f31788,plain,( 23.41/23.22 sP1100(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f28318,f2508])). 23.41/23.22 fof(f28318,plain,( 23.41/23.22 sP1099(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f25189,f2506])). 23.41/23.22 fof(f25189,plain,( 23.41/23.22 sP1098(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f22370,f2504])). 23.41/23.22 fof(f22370,plain,( 23.41/23.22 sP1097(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f19845,f2502])). 23.41/23.22 fof(f19845,plain,( 23.41/23.22 sP1096(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f17583,f2500])). 23.41/23.22 fof(f17583,plain,( 23.41/23.22 sP1095(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f15176,f2498])). 23.41/23.22 fof(f15176,plain,( 23.41/23.22 sP1094(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f13129,f2496])). 23.41/23.22 fof(f13129,plain,( 23.41/23.22 sP1093(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f11414,f2494])). 23.41/23.22 fof(f11414,plain,( 23.41/23.22 sP1092(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f10262,f2492])). 23.41/23.22 fof(f472354,plain,( 23.41/23.22 ~sP1136(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f448985,f2582])). 23.41/23.22 fof(f2582,plain,( 23.41/23.22 ( ! [X41,X40] : (~sP1136(X41) | ~r1(X40,X41) | sP1137(X40)) )), 23.41/23.22 inference(cnf_transformation,[],[f2582_D])). 23.41/23.22 fof(f2582_D,plain,( 23.41/23.22 ( ! [X40] : (( ! [X41] : (~sP1136(X41) | ~r1(X40,X41)) ) <=> ~sP1137(X40)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1137])])). 23.41/23.22 fof(f448985,plain,( 23.41/23.22 ~sP1137(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f425835,f2612])). 23.41/23.22 fof(f2612,plain,( 23.41/23.22 ( ! [X39,X40] : (~sP1137(X40) | ~r1(X39,X40) | sP1152(X39)) )), 23.41/23.22 inference(cnf_transformation,[],[f2612_D])). 23.41/23.22 fof(f2612_D,plain,( 23.41/23.22 ( ! [X39] : (( ! [X40] : (~sP1137(X40) | ~r1(X39,X40)) ) <=> ~sP1152(X39)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1152])])). 23.41/23.22 fof(f425835,plain,( 23.41/23.22 ~sP1152(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f403001,f2614])). 23.41/23.22 fof(f2614,plain,( 23.41/23.22 ( ! [X39,X38] : (~sP1152(X39) | ~r1(X38,X39) | sP1153(X38)) )), 23.41/23.22 inference(cnf_transformation,[],[f2614_D])). 23.41/23.22 fof(f2614_D,plain,( 23.41/23.22 ( ! [X38] : (( ! [X39] : (~sP1152(X39) | ~r1(X38,X39)) ) <=> ~sP1153(X38)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1153])])). 23.41/23.22 fof(f403001,plain,( 23.41/23.22 ~sP1153(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f378316,f2616])). 23.41/23.22 fof(f2616,plain,( 23.41/23.22 ( ! [X37,X38] : (~sP1153(X38) | ~r1(X37,X38) | sP1154(X37)) )), 23.41/23.22 inference(cnf_transformation,[],[f2616_D])). 23.41/23.22 fof(f2616_D,plain,( 23.41/23.22 ( ! [X37] : (( ! [X38] : (~sP1153(X38) | ~r1(X37,X38)) ) <=> ~sP1154(X37)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1154])])). 23.41/23.22 fof(f378316,plain,( 23.41/23.22 ~sP1154(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f342836,f2618])). 23.41/23.22 fof(f2618,plain,( 23.41/23.22 ( ! [X37,X36] : (~sP1154(X37) | ~r1(X36,X37) | sP1155(X36)) )), 23.41/23.22 inference(cnf_transformation,[],[f2618_D])). 23.41/23.22 fof(f2618_D,plain,( 23.41/23.22 ( ! [X36] : (( ! [X37] : (~sP1154(X37) | ~r1(X36,X37)) ) <=> ~sP1155(X36)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1155])])). 23.41/23.22 fof(f342836,plain,( 23.41/23.22 ~sP1155(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f320717,f2620])). 23.41/23.22 fof(f2620,plain,( 23.41/23.22 ( ! [X35,X36] : (~sP1155(X36) | ~r1(X35,X36) | sP1156(X35)) )), 23.41/23.22 inference(cnf_transformation,[],[f2620_D])). 23.41/23.22 fof(f2620_D,plain,( 23.41/23.22 ( ! [X35] : (( ! [X36] : (~sP1155(X36) | ~r1(X35,X36)) ) <=> ~sP1156(X35)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1156])])). 23.41/23.22 fof(f320717,plain,( 23.41/23.22 ~sP1156(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f301826,f2622])). 23.41/23.22 fof(f2622,plain,( 23.41/23.22 ( ! [X35,X34] : (~sP1156(X35) | ~r1(X34,X35) | sP1157(X34)) )), 23.41/23.22 inference(cnf_transformation,[],[f2622_D])). 23.41/23.22 fof(f2622_D,plain,( 23.41/23.22 ( ! [X34] : (( ! [X35] : (~sP1156(X35) | ~r1(X34,X35)) ) <=> ~sP1157(X34)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1157])])). 23.41/23.22 fof(f301826,plain,( 23.41/23.22 ~sP1157(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f283705,f2624])). 23.41/23.22 fof(f2624,plain,( 23.41/23.22 ( ! [X33,X34] : (~sP1157(X34) | ~r1(X33,X34) | sP1158(X33)) )), 23.41/23.22 inference(cnf_transformation,[],[f2624_D])). 23.41/23.22 fof(f2624_D,plain,( 23.41/23.22 ( ! [X33] : (( ! [X34] : (~sP1157(X34) | ~r1(X33,X34)) ) <=> ~sP1158(X33)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1158])])). 23.41/23.22 fof(f283705,plain,( 23.41/23.22 ~sP1158(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f266346,f2626])). 23.41/23.22 fof(f2626,plain,( 23.41/23.22 ( ! [X33,X32] : (~sP1158(X33) | ~r1(X32,X33) | sP1159(X32)) )), 23.41/23.22 inference(cnf_transformation,[],[f2626_D])). 23.41/23.22 fof(f2626_D,plain,( 23.41/23.22 ( ! [X32] : (( ! [X33] : (~sP1158(X33) | ~r1(X32,X33)) ) <=> ~sP1159(X32)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1159])])). 23.41/23.22 fof(f266346,plain,( 23.41/23.22 ~sP1159(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f249718,f2628])). 23.41/23.22 fof(f2628,plain,( 23.41/23.22 ( ! [X31,X32] : (~sP1159(X32) | ~r1(X31,X32) | sP1160(X31)) )), 23.41/23.22 inference(cnf_transformation,[],[f2628_D])). 23.41/23.22 fof(f2628_D,plain,( 23.41/23.22 ( ! [X31] : (( ! [X32] : (~sP1159(X32) | ~r1(X31,X32)) ) <=> ~sP1160(X31)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1160])])). 23.41/23.22 fof(f249718,plain,( 23.41/23.22 ~sP1160(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f233820,f2630])). 23.41/23.22 fof(f2630,plain,( 23.41/23.22 ( ! [X30,X31] : (~sP1160(X31) | ~r1(X30,X31) | sP1161(X30)) )), 23.41/23.22 inference(cnf_transformation,[],[f2630_D])). 23.41/23.22 fof(f2630_D,plain,( 23.41/23.22 ( ! [X30] : (( ! [X31] : (~sP1160(X31) | ~r1(X30,X31)) ) <=> ~sP1161(X30)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1161])])). 23.41/23.22 fof(f233820,plain,( 23.41/23.22 ~sP1161(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f218620,f2632])). 23.41/23.22 fof(f2632,plain,( 23.41/23.22 ( ! [X30,X29] : (~sP1161(X30) | ~r1(X29,X30) | sP1162(X29)) )), 23.41/23.22 inference(cnf_transformation,[],[f2632_D])). 23.41/23.22 fof(f2632_D,plain,( 23.41/23.22 ( ! [X29] : (( ! [X30] : (~sP1161(X30) | ~r1(X29,X30)) ) <=> ~sP1162(X29)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1162])])). 23.41/23.22 fof(f218620,plain,( 23.41/23.22 ~sP1162(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f204115,f2634])). 23.41/23.22 fof(f2634,plain,( 23.41/23.22 ( ! [X28,X29] : (~sP1162(X29) | ~r1(X28,X29) | sP1163(X28)) )), 23.41/23.22 inference(cnf_transformation,[],[f2634_D])). 23.41/23.22 fof(f2634_D,plain,( 23.41/23.22 ( ! [X28] : (( ! [X29] : (~sP1162(X29) | ~r1(X28,X29)) ) <=> ~sP1163(X28)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1163])])). 23.41/23.22 fof(f204115,plain,( 23.41/23.22 ~sP1163(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f190283,f2636])). 23.41/23.22 fof(f2636,plain,( 23.41/23.22 ( ! [X28,X27] : (~sP1163(X28) | ~r1(X27,X28) | sP1164(X27)) )), 23.41/23.22 inference(cnf_transformation,[],[f2636_D])). 23.41/23.22 fof(f2636_D,plain,( 23.41/23.22 ( ! [X27] : (( ! [X28] : (~sP1163(X28) | ~r1(X27,X28)) ) <=> ~sP1164(X27)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1164])])). 23.41/23.22 fof(f190283,plain,( 23.41/23.22 ~sP1164(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f177112,f2638])). 23.41/23.22 fof(f2638,plain,( 23.41/23.22 ( ! [X26,X27] : (~sP1164(X27) | ~r1(X26,X27) | sP1165(X26)) )), 23.41/23.22 inference(cnf_transformation,[],[f2638_D])). 23.41/23.22 fof(f2638_D,plain,( 23.41/23.22 ( ! [X26] : (( ! [X27] : (~sP1164(X27) | ~r1(X26,X27)) ) <=> ~sP1165(X26)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1165])])). 23.41/23.22 fof(f177112,plain,( 23.41/23.22 ~sP1165(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f164585,f2640])). 23.41/23.22 fof(f2640,plain,( 23.41/23.22 ( ! [X26,X25] : (~sP1165(X26) | ~r1(X25,X26) | sP1166(X25)) )), 23.41/23.22 inference(cnf_transformation,[],[f2640_D])). 23.41/23.22 fof(f2640_D,plain,( 23.41/23.22 ( ! [X25] : (( ! [X26] : (~sP1165(X26) | ~r1(X25,X26)) ) <=> ~sP1166(X25)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1166])])). 23.41/23.22 fof(f164585,plain,( 23.41/23.22 ~sP1166(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f152684,f2642])). 23.41/23.22 fof(f2642,plain,( 23.41/23.22 ( ! [X24,X25] : (~sP1166(X25) | ~r1(X24,X25) | sP1167(X24)) )), 23.41/23.22 inference(cnf_transformation,[],[f2642_D])). 23.41/23.22 fof(f2642_D,plain,( 23.41/23.22 ( ! [X24] : (( ! [X25] : (~sP1166(X25) | ~r1(X24,X25)) ) <=> ~sP1167(X24)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1167])])). 23.41/23.22 fof(f152684,plain,( 23.41/23.22 ~sP1167(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f141393,f2644])). 23.41/23.22 fof(f2644,plain,( 23.41/23.22 ( ! [X24,X23] : (~sP1167(X24) | ~r1(X23,X24) | sP1168(X23)) )), 23.41/23.22 inference(cnf_transformation,[],[f2644_D])). 23.41/23.22 fof(f2644_D,plain,( 23.41/23.22 ( ! [X23] : (( ! [X24] : (~sP1167(X24) | ~r1(X23,X24)) ) <=> ~sP1168(X23)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1168])])). 23.41/23.22 fof(f141393,plain,( 23.41/23.22 ~sP1168(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f130695,f2646])). 23.41/23.22 fof(f2646,plain,( 23.41/23.22 ( ! [X23,X22] : (~sP1168(X23) | ~r1(X22,X23) | sP1169(X22)) )), 23.41/23.22 inference(cnf_transformation,[],[f2646_D])). 23.41/23.22 fof(f2646_D,plain,( 23.41/23.22 ( ! [X22] : (( ! [X23] : (~sP1168(X23) | ~r1(X22,X23)) ) <=> ~sP1169(X22)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1169])])). 23.41/23.22 fof(f130695,plain,( 23.41/23.22 ~sP1169(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f120577,f2648])). 23.41/23.22 fof(f2648,plain,( 23.41/23.22 ( ! [X21,X22] : (~sP1169(X22) | ~r1(X21,X22) | sP1170(X21)) )), 23.41/23.22 inference(cnf_transformation,[],[f2648_D])). 23.41/23.22 fof(f2648_D,plain,( 23.41/23.22 ( ! [X21] : (( ! [X22] : (~sP1169(X22) | ~r1(X21,X22)) ) <=> ~sP1170(X21)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1170])])). 23.41/23.22 fof(f120577,plain,( 23.41/23.22 ~sP1170(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f111013,f2650])). 23.41/23.22 fof(f2650,plain,( 23.41/23.22 ( ! [X21,X20] : (~sP1170(X21) | ~r1(X20,X21) | sP1171(X20)) )), 23.41/23.22 inference(cnf_transformation,[],[f2650_D])). 23.41/23.22 fof(f2650_D,plain,( 23.41/23.22 ( ! [X20] : (( ! [X21] : (~sP1170(X21) | ~r1(X20,X21)) ) <=> ~sP1171(X20)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1171])])). 23.41/23.22 fof(f111013,plain,( 23.41/23.22 ~sP1171(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f102001,f2652])). 23.41/23.22 fof(f2652,plain,( 23.41/23.22 ( ! [X19,X20] : (~sP1171(X20) | ~r1(X19,X20) | sP1172(X19)) )), 23.41/23.22 inference(cnf_transformation,[],[f2652_D])). 23.41/23.22 fof(f2652_D,plain,( 23.41/23.22 ( ! [X19] : (( ! [X20] : (~sP1171(X20) | ~r1(X19,X20)) ) <=> ~sP1172(X19)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1172])])). 23.41/23.22 fof(f102001,plain,( 23.41/23.22 ~sP1172(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f93520,f2654])). 23.41/23.22 fof(f2654,plain,( 23.41/23.22 ( ! [X19,X18] : (~sP1172(X19) | ~r1(X18,X19) | sP1173(X18)) )), 23.41/23.22 inference(cnf_transformation,[],[f2654_D])). 23.41/23.22 fof(f2654_D,plain,( 23.41/23.22 ( ! [X18] : (( ! [X19] : (~sP1172(X19) | ~r1(X18,X19)) ) <=> ~sP1173(X18)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1173])])). 23.41/23.22 fof(f93520,plain,( 23.41/23.22 ~sP1173(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f85552,f2656])). 23.41/23.22 fof(f2656,plain,( 23.41/23.22 ( ! [X17,X18] : (~sP1173(X18) | ~r1(X17,X18) | sP1174(X17)) )), 23.41/23.22 inference(cnf_transformation,[],[f2656_D])). 23.41/23.22 fof(f2656_D,plain,( 23.41/23.22 ( ! [X17] : (( ! [X18] : (~sP1173(X18) | ~r1(X17,X18)) ) <=> ~sP1174(X17)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1174])])). 23.41/23.22 fof(f85552,plain,( 23.41/23.22 ~sP1174(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f78089,f2657])). 23.41/23.22 fof(f2657,plain,( 23.41/23.22 ( ! [X17,X16] : (~sP1174(X17) | ~sP1151(X16) | ~r1(X16,X17)) )), 23.41/23.22 inference(general_splitting,[],[f2655,f2656_D])). 23.41/23.22 fof(f2655,plain,( 23.41/23.22 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1173(X18)) )), 23.41/23.22 inference(general_splitting,[],[f2653,f2654_D])). 23.41/23.22 fof(f2653,plain,( 23.41/23.22 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1172(X19)) )), 23.41/23.22 inference(general_splitting,[],[f2651,f2652_D])). 23.41/23.22 fof(f2651,plain,( 23.41/23.22 ( ! [X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1171(X20)) )), 23.41/23.22 inference(general_splitting,[],[f2649,f2650_D])). 23.41/23.22 fof(f2649,plain,( 23.41/23.22 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1170(X21)) )), 23.41/23.22 inference(general_splitting,[],[f2647,f2648_D])). 23.41/23.22 fof(f2647,plain,( 23.41/23.22 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1169(X22)) )), 23.41/23.22 inference(general_splitting,[],[f2645,f2646_D])). 23.41/23.22 fof(f2645,plain,( 23.41/23.22 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1168(X23)) )), 23.41/23.22 inference(general_splitting,[],[f2643,f2644_D])). 23.41/23.22 fof(f2643,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1167(X24)) )), 23.41/23.22 inference(general_splitting,[],[f2641,f2642_D])). 23.41/23.22 fof(f2641,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1166(X25)) )), 23.41/23.22 inference(general_splitting,[],[f2639,f2640_D])). 23.41/23.22 fof(f2639,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1165(X26)) )), 23.41/23.22 inference(general_splitting,[],[f2637,f2638_D])). 23.41/23.22 fof(f2637,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1164(X27)) )), 23.41/23.22 inference(general_splitting,[],[f2635,f2636_D])). 23.41/23.22 fof(f2635,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1163(X28)) )), 23.41/23.22 inference(general_splitting,[],[f2633,f2634_D])). 23.41/23.22 fof(f2633,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1162(X29)) )), 23.41/23.22 inference(general_splitting,[],[f2631,f2632_D])). 23.41/23.22 fof(f2631,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1161(X30)) )), 23.41/23.22 inference(general_splitting,[],[f2629,f2630_D])). 23.41/23.22 fof(f2629,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1160(X31)) )), 23.41/23.22 inference(general_splitting,[],[f2627,f2628_D])). 23.41/23.22 fof(f2627,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1159(X32)) )), 23.41/23.22 inference(general_splitting,[],[f2625,f2626_D])). 23.41/23.22 fof(f2625,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1158(X33)) )), 23.41/23.22 inference(general_splitting,[],[f2623,f2624_D])). 23.41/23.22 fof(f2623,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1157(X34)) )), 23.41/23.22 inference(general_splitting,[],[f2621,f2622_D])). 23.41/23.22 fof(f2621,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1156(X35)) )), 23.41/23.22 inference(general_splitting,[],[f2619,f2620_D])). 23.41/23.22 fof(f2619,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1155(X36)) )), 23.41/23.22 inference(general_splitting,[],[f2617,f2618_D])). 23.41/23.22 fof(f2617,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1154(X37)) )), 23.41/23.22 inference(general_splitting,[],[f2615,f2616_D])). 23.41/23.22 fof(f2615,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1153(X38)) )), 23.41/23.22 inference(general_splitting,[],[f2613,f2614_D])). 23.41/23.22 fof(f2613,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1151(X16) | ~sP1152(X39)) )), 23.41/23.22 inference(general_splitting,[],[f2611,f2612_D])). 23.41/23.22 fof(f2611,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1137(X40) | ~sP1151(X16)) )), 23.41/23.22 inference(general_splitting,[],[f2609,f2610_D])). 23.41/23.22 fof(f2610,plain,( 23.41/23.22 ( ! [X15,X16] : (sP1151(X16) | ~sP1150(X15) | ~r1(X15,X16)) )), 23.41/23.22 inference(cnf_transformation,[],[f2610_D])). 23.41/23.22 fof(f2610_D,plain,( 23.41/23.22 ( ! [X16] : (( ! [X15] : (~sP1150(X15) | ~r1(X15,X16)) ) <=> ~sP1151(X16)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1151])])). 23.41/23.22 fof(f2609,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP1137(X40) | ~sP1150(X15)) )), 23.41/23.22 inference(general_splitting,[],[f2607,f2608_D])). 23.41/23.22 fof(f2608,plain,( 23.41/23.22 ( ! [X14,X15] : (sP1150(X15) | ~sP1149(X14) | ~r1(X14,X15)) )), 23.41/23.22 inference(cnf_transformation,[],[f2608_D])). 23.41/23.22 fof(f2608_D,plain,( 23.41/23.22 ( ! [X15] : (( ! [X14] : (~sP1149(X14) | ~r1(X14,X15)) ) <=> ~sP1150(X15)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1150])])). 23.41/23.22 fof(f2607,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1137(X40) | ~sP1149(X14)) )), 23.41/23.22 inference(general_splitting,[],[f2605,f2606_D])). 23.41/23.22 fof(f2606,plain,( 23.41/23.22 ( ! [X14,X13] : (sP1149(X14) | ~sP1148(X13) | ~r1(X13,X14)) )), 23.41/23.22 inference(cnf_transformation,[],[f2606_D])). 23.41/23.22 fof(f2606_D,plain,( 23.41/23.22 ( ! [X14] : (( ! [X13] : (~sP1148(X13) | ~r1(X13,X14)) ) <=> ~sP1149(X14)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1149])])). 23.41/23.22 fof(f2605,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1137(X40) | ~sP1148(X13)) )), 23.41/23.22 inference(general_splitting,[],[f2603,f2604_D])). 23.41/23.22 fof(f2604,plain,( 23.41/23.22 ( ! [X12,X13] : (sP1148(X13) | ~sP1147(X12) | ~r1(X12,X13)) )), 23.41/23.22 inference(cnf_transformation,[],[f2604_D])). 23.41/23.22 fof(f2604_D,plain,( 23.41/23.22 ( ! [X13] : (( ! [X12] : (~sP1147(X12) | ~r1(X12,X13)) ) <=> ~sP1148(X13)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1148])])). 23.41/23.22 fof(f2603,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~sP1137(X40) | ~sP1147(X12)) )), 23.41/23.22 inference(general_splitting,[],[f2601,f2602_D])). 23.41/23.22 fof(f2602,plain,( 23.41/23.22 ( ! [X12,X11] : (sP1147(X12) | ~sP1146(X11) | ~r1(X11,X12)) )), 23.41/23.22 inference(cnf_transformation,[],[f2602_D])). 23.41/23.22 fof(f2602_D,plain,( 23.41/23.22 ( ! [X12] : (( ! [X11] : (~sP1146(X11) | ~r1(X11,X12)) ) <=> ~sP1147(X12)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1147])])). 23.41/23.22 fof(f2601,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1137(X40) | ~sP1146(X11)) )), 23.41/23.22 inference(general_splitting,[],[f2599,f2600_D])). 23.41/23.22 fof(f2600,plain,( 23.41/23.22 ( ! [X10,X11] : (sP1146(X11) | ~sP1145(X10) | ~r1(X10,X11)) )), 23.41/23.22 inference(cnf_transformation,[],[f2600_D])). 23.41/23.22 fof(f2600_D,plain,( 23.41/23.22 ( ! [X11] : (( ! [X10] : (~sP1145(X10) | ~r1(X10,X11)) ) <=> ~sP1146(X11)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1146])])). 23.41/23.22 fof(f2599,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1137(X40) | ~sP1145(X10)) )), 23.41/23.22 inference(general_splitting,[],[f2597,f2598_D])). 23.41/23.22 fof(f2598,plain,( 23.41/23.22 ( ! [X10,X9] : (sP1145(X10) | ~sP1144(X9) | ~r1(X9,X10)) )), 23.41/23.22 inference(cnf_transformation,[],[f2598_D])). 23.41/23.22 fof(f2598_D,plain,( 23.41/23.22 ( ! [X10] : (( ! [X9] : (~sP1144(X9) | ~r1(X9,X10)) ) <=> ~sP1145(X10)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1145])])). 23.41/23.22 fof(f2597,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP1137(X40) | ~sP1144(X9)) )), 23.41/23.22 inference(general_splitting,[],[f2595,f2596_D])). 23.41/23.22 fof(f2596,plain,( 23.41/23.22 ( ! [X8,X9] : (sP1144(X9) | ~sP1143(X8) | ~r1(X8,X9)) )), 23.41/23.22 inference(cnf_transformation,[],[f2596_D])). 23.41/23.22 fof(f2596_D,plain,( 23.41/23.22 ( ! [X9] : (( ! [X8] : (~sP1143(X8) | ~r1(X8,X9)) ) <=> ~sP1144(X9)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1144])])). 23.41/23.22 fof(f2595,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP1137(X40) | ~sP1143(X8)) )), 23.41/23.22 inference(general_splitting,[],[f2593,f2594_D])). 23.41/23.22 fof(f2594,plain,( 23.41/23.22 ( ! [X8,X7] : (sP1143(X8) | ~sP1142(X7) | ~r1(X7,X8)) )), 23.41/23.22 inference(cnf_transformation,[],[f2594_D])). 23.41/23.22 fof(f2594_D,plain,( 23.41/23.22 ( ! [X8] : (( ! [X7] : (~sP1142(X7) | ~r1(X7,X8)) ) <=> ~sP1143(X8)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1143])])). 23.41/23.22 fof(f2593,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1137(X40) | ~sP1142(X7)) )), 23.41/23.22 inference(general_splitting,[],[f2591,f2592_D])). 23.41/23.22 fof(f2592,plain,( 23.41/23.22 ( ! [X6,X7] : (sP1142(X7) | ~sP1141(X6) | ~r1(X6,X7)) )), 23.41/23.22 inference(cnf_transformation,[],[f2592_D])). 23.41/23.22 fof(f2592_D,plain,( 23.41/23.22 ( ! [X7] : (( ! [X6] : (~sP1141(X6) | ~r1(X6,X7)) ) <=> ~sP1142(X7)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1142])])). 23.41/23.22 fof(f2591,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP1137(X40) | ~sP1141(X6)) )), 23.41/23.22 inference(general_splitting,[],[f2589,f2590_D])). 23.41/23.22 fof(f2590,plain,( 23.41/23.22 ( ! [X6,X5] : (sP1141(X6) | ~sP1140(X5) | ~r1(X5,X6)) )), 23.41/23.22 inference(cnf_transformation,[],[f2590_D])). 23.41/23.22 fof(f2590_D,plain,( 23.41/23.22 ( ! [X6] : (( ! [X5] : (~sP1140(X5) | ~r1(X5,X6)) ) <=> ~sP1141(X6)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1141])])). 23.41/23.22 fof(f2589,plain,( 23.41/23.22 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1137(X40) | ~sP1140(X5)) )), 23.41/23.22 inference(general_splitting,[],[f2587,f2588_D])). 23.41/23.22 fof(f2588,plain,( 23.41/23.22 ( ! [X4,X5] : (sP1140(X5) | ~sP1139(X4) | ~r1(X4,X5)) )), 23.41/23.22 inference(cnf_transformation,[],[f2588_D])). 23.41/23.22 fof(f2588_D,plain,( 23.41/23.22 ( ! [X5] : (( ! [X4] : (~sP1139(X4) | ~r1(X4,X5)) ) <=> ~sP1140(X5)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1140])])). 23.41/23.22 fof(f2587,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1137(X40) | ~sP1139(X4)) )), 23.41/23.22 inference(general_splitting,[],[f2585,f2586_D])). 23.41/23.22 fof(f2586,plain,( 23.41/23.22 ( ! [X4,X3] : (sP1139(X4) | ~sP1138(X3) | ~r1(X3,X4)) )), 23.41/23.22 inference(cnf_transformation,[],[f2586_D])). 23.41/23.22 fof(f2586_D,plain,( 23.41/23.22 ( ! [X4] : (( ! [X3] : (~sP1138(X3) | ~r1(X3,X4)) ) <=> ~sP1139(X4)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1139])])). 23.41/23.22 fof(f2585,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1137(X40) | ~sP1138(X3)) )), 23.41/23.22 inference(general_splitting,[],[f2583,f2584_D])). 23.41/23.22 fof(f2584,plain,( 23.41/23.22 ( ! [X2,X3] : (sP1138(X3) | ~sP1135(X2) | ~r1(X2,X3)) )), 23.41/23.22 inference(cnf_transformation,[],[f2584_D])). 23.41/23.22 fof(f2584_D,plain,( 23.41/23.22 ( ! [X3] : (( ! [X2] : (~sP1135(X2) | ~r1(X2,X3)) ) <=> ~sP1138(X3)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1138])])). 23.41/23.22 fof(f2583,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X2,X3) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1135(X2) | ~sP1137(X40)) )), 23.41/23.22 inference(general_splitting,[],[f2581,f2582_D])). 23.41/23.22 fof(f2581,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X2,X3) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1135(X2) | ~sP1136(X41)) )), 23.41/23.22 inference(general_splitting,[],[f2579,f2580_D])). 23.41/23.22 fof(f2579,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X2,X3) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | p39(X42) | p40(X42) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1135(X2)) )), 23.41/23.22 inference(general_splitting,[],[f2577,f2578_D])). 23.41/23.22 fof(f2578,plain,( 23.41/23.22 ( ! [X2,X1] : (sP1135(X2) | ~sP1134(X1) | ~r1(X1,X2)) )), 23.41/23.22 inference(cnf_transformation,[],[f2578_D])). 23.41/23.22 fof(f2578_D,plain,( 23.41/23.22 ( ! [X2] : (( ! [X1] : (~sP1134(X1) | ~r1(X1,X2)) ) <=> ~sP1135(X2)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1135])])). 23.41/23.22 fof(f2577,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X2,X3) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | p39(X42) | p40(X42) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X2) | ~sP1134(X1)) )), 23.41/23.22 inference(general_splitting,[],[f415,f2576_D])). 23.41/23.22 fof(f2576,plain,( 23.41/23.22 ( ! [X0,X1] : (sP1134(X1) | ~sP37(X0) | ~r1(X0,X1)) )), 23.41/23.22 inference(cnf_transformation,[],[f2576_D])). 23.41/23.22 fof(f2576_D,plain,( 23.41/23.22 ( ! [X1] : (( ! [X0] : (~sP37(X0) | ~r1(X0,X1)) ) <=> ~sP1134(X1)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1134])])). 23.41/23.22 fof(f415,plain,( 23.41/23.22 ( ! [X28,X24,X37,X4,X33,X0,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X0,X1) | ~r1(X2,X3) | ~r1(X10,X11) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X33,X34) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X41,X42) | p39(X42) | p40(X42) | ~r1(X39,X40) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X2) | ~sP37(X0)) )), 23.41/23.22 inference(cnf_transformation,[],[f102])). 23.41/23.22 fof(f78089,plain,( 23.41/23.22 sP1151(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f71093,f2610])). 23.41/23.22 fof(f71093,plain,( 23.41/23.22 sP1150(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f64568,f2608])). 23.41/23.22 fof(f64568,plain,( 23.41/23.22 sP1149(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f56494,f2606])). 23.41/23.22 fof(f56494,plain,( 23.41/23.22 sP1148(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f49791,f2604])). 23.41/23.22 fof(f49791,plain,( 23.41/23.22 sP1147(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f44263,f2602])). 23.41/23.22 fof(f44263,plain,( 23.41/23.22 sP1146(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f39734,f2600])). 23.41/23.22 fof(f39734,plain,( 23.41/23.22 sP1145(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f35579,f2598])). 23.41/23.22 fof(f35579,plain,( 23.41/23.22 sP1144(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f31782,f2596])). 23.41/23.22 fof(f31782,plain,( 23.41/23.22 sP1143(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f28312,f2594])). 23.41/23.22 fof(f28312,plain,( 23.41/23.22 sP1142(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f25183,f2592])). 23.41/23.22 fof(f25183,plain,( 23.41/23.22 sP1141(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f22364,f2590])). 23.41/23.22 fof(f22364,plain,( 23.41/23.22 sP1140(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f19839,f2588])). 23.41/23.22 fof(f19839,plain,( 23.41/23.22 sP1139(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f17577,f2586])). 23.41/23.22 fof(f17577,plain,( 23.41/23.22 sP1138(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f15170,f2584])). 23.41/23.22 fof(f15170,plain,( 23.41/23.22 sP1135(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f13123,f2578])). 23.41/23.22 fof(f13123,plain,( 23.41/23.22 sP1134(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f11406,f2576])). 23.41/23.22 fof(f472351,plain,( 23.41/23.22 ~sP1258(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f448982,f2826])). 23.41/23.22 fof(f2826,plain,( 23.41/23.22 ( ! [X41,X40] : (~sP1258(X41) | ~r1(X40,X41) | sP1259(X40)) )), 23.41/23.22 inference(cnf_transformation,[],[f2826_D])). 23.41/23.22 fof(f2826_D,plain,( 23.41/23.22 ( ! [X40] : (( ! [X41] : (~sP1258(X41) | ~r1(X40,X41)) ) <=> ~sP1259(X40)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1259])])). 23.41/23.22 fof(f448982,plain,( 23.41/23.22 ~sP1259(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f425832,f2854])). 23.41/23.22 fof(f2854,plain,( 23.41/23.22 ( ! [X39,X40] : (~sP1259(X40) | ~r1(X39,X40) | sP1273(X39)) )), 23.41/23.22 inference(cnf_transformation,[],[f2854_D])). 23.41/23.22 fof(f2854_D,plain,( 23.41/23.22 ( ! [X39] : (( ! [X40] : (~sP1259(X40) | ~r1(X39,X40)) ) <=> ~sP1273(X39)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1273])])). 23.41/23.22 fof(f425832,plain,( 23.41/23.22 ~sP1273(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f402998,f2856])). 23.41/23.22 fof(f2856,plain,( 23.41/23.22 ( ! [X39,X38] : (~sP1273(X39) | ~r1(X38,X39) | sP1274(X38)) )), 23.41/23.22 inference(cnf_transformation,[],[f2856_D])). 23.41/23.22 fof(f2856_D,plain,( 23.41/23.22 ( ! [X38] : (( ! [X39] : (~sP1273(X39) | ~r1(X38,X39)) ) <=> ~sP1274(X38)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1274])])). 23.41/23.22 fof(f402998,plain,( 23.41/23.22 ~sP1274(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f378313,f2858])). 23.41/23.22 fof(f2858,plain,( 23.41/23.22 ( ! [X37,X38] : (~sP1274(X38) | ~r1(X37,X38) | sP1275(X37)) )), 23.41/23.22 inference(cnf_transformation,[],[f2858_D])). 23.41/23.22 fof(f2858_D,plain,( 23.41/23.22 ( ! [X37] : (( ! [X38] : (~sP1274(X38) | ~r1(X37,X38)) ) <=> ~sP1275(X37)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1275])])). 23.41/23.22 fof(f378313,plain,( 23.41/23.22 ~sP1275(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f342833,f2860])). 23.41/23.22 fof(f2860,plain,( 23.41/23.22 ( ! [X37,X36] : (~sP1275(X37) | ~r1(X36,X37) | sP1276(X36)) )), 23.41/23.22 inference(cnf_transformation,[],[f2860_D])). 23.41/23.22 fof(f2860_D,plain,( 23.41/23.22 ( ! [X36] : (( ! [X37] : (~sP1275(X37) | ~r1(X36,X37)) ) <=> ~sP1276(X36)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1276])])). 23.41/23.22 fof(f342833,plain,( 23.41/23.22 ~sP1276(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f320715,f2862])). 23.41/23.22 fof(f2862,plain,( 23.41/23.22 ( ! [X35,X36] : (~sP1276(X36) | ~r1(X35,X36) | sP1277(X35)) )), 23.41/23.22 inference(cnf_transformation,[],[f2862_D])). 23.41/23.22 fof(f2862_D,plain,( 23.41/23.22 ( ! [X35] : (( ! [X36] : (~sP1276(X36) | ~r1(X35,X36)) ) <=> ~sP1277(X35)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1277])])). 23.41/23.22 fof(f320715,plain,( 23.41/23.22 ~sP1277(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f301824,f2864])). 23.41/23.22 fof(f2864,plain,( 23.41/23.22 ( ! [X35,X34] : (~sP1277(X35) | ~r1(X34,X35) | sP1278(X34)) )), 23.41/23.22 inference(cnf_transformation,[],[f2864_D])). 23.41/23.22 fof(f2864_D,plain,( 23.41/23.22 ( ! [X34] : (( ! [X35] : (~sP1277(X35) | ~r1(X34,X35)) ) <=> ~sP1278(X34)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1278])])). 23.41/23.22 fof(f301824,plain,( 23.41/23.22 ~sP1278(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f283703,f2866])). 23.41/23.22 fof(f2866,plain,( 23.41/23.22 ( ! [X33,X34] : (~sP1278(X34) | ~r1(X33,X34) | sP1279(X33)) )), 23.41/23.22 inference(cnf_transformation,[],[f2866_D])). 23.41/23.22 fof(f2866_D,plain,( 23.41/23.22 ( ! [X33] : (( ! [X34] : (~sP1278(X34) | ~r1(X33,X34)) ) <=> ~sP1279(X33)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1279])])). 23.41/23.22 fof(f283703,plain,( 23.41/23.22 ~sP1279(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f266344,f2868])). 23.41/23.22 fof(f2868,plain,( 23.41/23.22 ( ! [X33,X32] : (~sP1279(X33) | ~r1(X32,X33) | sP1280(X32)) )), 23.41/23.22 inference(cnf_transformation,[],[f2868_D])). 23.41/23.22 fof(f2868_D,plain,( 23.41/23.22 ( ! [X32] : (( ! [X33] : (~sP1279(X33) | ~r1(X32,X33)) ) <=> ~sP1280(X32)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1280])])). 23.41/23.22 fof(f266344,plain,( 23.41/23.22 ~sP1280(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f249716,f2870])). 23.41/23.22 fof(f2870,plain,( 23.41/23.22 ( ! [X31,X32] : (~sP1280(X32) | ~r1(X31,X32) | sP1281(X31)) )), 23.41/23.22 inference(cnf_transformation,[],[f2870_D])). 23.41/23.22 fof(f2870_D,plain,( 23.41/23.22 ( ! [X31] : (( ! [X32] : (~sP1280(X32) | ~r1(X31,X32)) ) <=> ~sP1281(X31)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1281])])). 23.41/23.22 fof(f249716,plain,( 23.41/23.22 ~sP1281(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f233818,f2872])). 23.41/23.22 fof(f2872,plain,( 23.41/23.22 ( ! [X30,X31] : (~sP1281(X31) | ~r1(X30,X31) | sP1282(X30)) )), 23.41/23.22 inference(cnf_transformation,[],[f2872_D])). 23.41/23.22 fof(f2872_D,plain,( 23.41/23.22 ( ! [X30] : (( ! [X31] : (~sP1281(X31) | ~r1(X30,X31)) ) <=> ~sP1282(X30)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1282])])). 23.41/23.22 fof(f233818,plain,( 23.41/23.22 ~sP1282(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f218618,f2874])). 23.41/23.22 fof(f2874,plain,( 23.41/23.22 ( ! [X30,X29] : (~sP1282(X30) | ~r1(X29,X30) | sP1283(X29)) )), 23.41/23.22 inference(cnf_transformation,[],[f2874_D])). 23.41/23.22 fof(f2874_D,plain,( 23.41/23.22 ( ! [X29] : (( ! [X30] : (~sP1282(X30) | ~r1(X29,X30)) ) <=> ~sP1283(X29)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1283])])). 23.41/23.22 fof(f218618,plain,( 23.41/23.22 ~sP1283(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f204113,f2876])). 23.41/23.22 fof(f2876,plain,( 23.41/23.22 ( ! [X28,X29] : (~sP1283(X29) | ~r1(X28,X29) | sP1284(X28)) )), 23.41/23.22 inference(cnf_transformation,[],[f2876_D])). 23.41/23.22 fof(f2876_D,plain,( 23.41/23.22 ( ! [X28] : (( ! [X29] : (~sP1283(X29) | ~r1(X28,X29)) ) <=> ~sP1284(X28)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1284])])). 23.41/23.22 fof(f204113,plain,( 23.41/23.22 ~sP1284(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f190281,f2878])). 23.41/23.22 fof(f2878,plain,( 23.41/23.22 ( ! [X28,X27] : (~sP1284(X28) | ~r1(X27,X28) | sP1285(X27)) )), 23.41/23.22 inference(cnf_transformation,[],[f2878_D])). 23.41/23.22 fof(f2878_D,plain,( 23.41/23.22 ( ! [X27] : (( ! [X28] : (~sP1284(X28) | ~r1(X27,X28)) ) <=> ~sP1285(X27)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1285])])). 23.41/23.22 fof(f190281,plain,( 23.41/23.22 ~sP1285(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f177110,f2880])). 23.41/23.22 fof(f2880,plain,( 23.41/23.22 ( ! [X26,X27] : (~sP1285(X27) | ~r1(X26,X27) | sP1286(X26)) )), 23.41/23.22 inference(cnf_transformation,[],[f2880_D])). 23.41/23.22 fof(f2880_D,plain,( 23.41/23.22 ( ! [X26] : (( ! [X27] : (~sP1285(X27) | ~r1(X26,X27)) ) <=> ~sP1286(X26)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1286])])). 23.41/23.22 fof(f177110,plain,( 23.41/23.22 ~sP1286(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f164583,f2882])). 23.41/23.22 fof(f2882,plain,( 23.41/23.22 ( ! [X26,X25] : (~sP1286(X26) | ~r1(X25,X26) | sP1287(X25)) )), 23.41/23.22 inference(cnf_transformation,[],[f2882_D])). 23.41/23.22 fof(f2882_D,plain,( 23.41/23.22 ( ! [X25] : (( ! [X26] : (~sP1286(X26) | ~r1(X25,X26)) ) <=> ~sP1287(X25)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1287])])). 23.41/23.22 fof(f164583,plain,( 23.41/23.22 ~sP1287(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f152682,f2884])). 23.41/23.22 fof(f2884,plain,( 23.41/23.22 ( ! [X24,X25] : (~sP1287(X25) | ~r1(X24,X25) | sP1288(X24)) )), 23.41/23.22 inference(cnf_transformation,[],[f2884_D])). 23.41/23.22 fof(f2884_D,plain,( 23.41/23.22 ( ! [X24] : (( ! [X25] : (~sP1287(X25) | ~r1(X24,X25)) ) <=> ~sP1288(X24)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1288])])). 23.41/23.22 fof(f152682,plain,( 23.41/23.22 ~sP1288(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f141391,f2886])). 23.41/23.22 fof(f2886,plain,( 23.41/23.22 ( ! [X24,X23] : (~sP1288(X24) | ~r1(X23,X24) | sP1289(X23)) )), 23.41/23.22 inference(cnf_transformation,[],[f2886_D])). 23.41/23.22 fof(f2886_D,plain,( 23.41/23.22 ( ! [X23] : (( ! [X24] : (~sP1288(X24) | ~r1(X23,X24)) ) <=> ~sP1289(X23)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1289])])). 23.41/23.22 fof(f141391,plain,( 23.41/23.22 ~sP1289(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f130693,f2888])). 23.41/23.22 fof(f2888,plain,( 23.41/23.22 ( ! [X23,X22] : (~sP1289(X23) | ~r1(X22,X23) | sP1290(X22)) )), 23.41/23.22 inference(cnf_transformation,[],[f2888_D])). 23.41/23.22 fof(f2888_D,plain,( 23.41/23.22 ( ! [X22] : (( ! [X23] : (~sP1289(X23) | ~r1(X22,X23)) ) <=> ~sP1290(X22)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1290])])). 23.41/23.22 fof(f130693,plain,( 23.41/23.22 ~sP1290(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f120575,f2890])). 23.41/23.22 fof(f2890,plain,( 23.41/23.22 ( ! [X21,X22] : (~sP1290(X22) | ~r1(X21,X22) | sP1291(X21)) )), 23.41/23.22 inference(cnf_transformation,[],[f2890_D])). 23.41/23.22 fof(f2890_D,plain,( 23.41/23.22 ( ! [X21] : (( ! [X22] : (~sP1290(X22) | ~r1(X21,X22)) ) <=> ~sP1291(X21)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1291])])). 23.41/23.22 fof(f120575,plain,( 23.41/23.22 ~sP1291(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f111011,f2892])). 23.41/23.22 fof(f2892,plain,( 23.41/23.22 ( ! [X21,X20] : (~sP1291(X21) | ~r1(X20,X21) | sP1292(X20)) )), 23.41/23.22 inference(cnf_transformation,[],[f2892_D])). 23.41/23.22 fof(f2892_D,plain,( 23.41/23.22 ( ! [X20] : (( ! [X21] : (~sP1291(X21) | ~r1(X20,X21)) ) <=> ~sP1292(X20)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1292])])). 23.41/23.22 fof(f111011,plain,( 23.41/23.22 ~sP1292(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f101999,f2894])). 23.41/23.22 fof(f2894,plain,( 23.41/23.22 ( ! [X19,X20] : (~sP1292(X20) | ~r1(X19,X20) | sP1293(X19)) )), 23.41/23.22 inference(cnf_transformation,[],[f2894_D])). 23.41/23.22 fof(f2894_D,plain,( 23.41/23.22 ( ! [X19] : (( ! [X20] : (~sP1292(X20) | ~r1(X19,X20)) ) <=> ~sP1293(X19)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1293])])). 23.41/23.22 fof(f101999,plain,( 23.41/23.22 ~sP1293(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f93518,f2896])). 23.41/23.22 fof(f2896,plain,( 23.41/23.22 ( ! [X19,X18] : (~sP1293(X19) | ~r1(X18,X19) | sP1294(X18)) )), 23.41/23.22 inference(cnf_transformation,[],[f2896_D])). 23.41/23.22 fof(f2896_D,plain,( 23.41/23.22 ( ! [X18] : (( ! [X19] : (~sP1293(X19) | ~r1(X18,X19)) ) <=> ~sP1294(X18)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1294])])). 23.41/23.22 fof(f93518,plain,( 23.41/23.22 ~sP1294(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f85550,f2898])). 23.41/23.22 fof(f2898,plain,( 23.41/23.22 ( ! [X17,X18] : (~sP1294(X18) | ~r1(X17,X18) | sP1295(X17)) )), 23.41/23.22 inference(cnf_transformation,[],[f2898_D])). 23.41/23.22 fof(f2898_D,plain,( 23.41/23.22 ( ! [X17] : (( ! [X18] : (~sP1294(X18) | ~r1(X17,X18)) ) <=> ~sP1295(X17)) )), 23.41/23.22 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1295])])). 23.41/23.22 fof(f85550,plain,( 23.41/23.22 ~sP1295(sK101)), 23.41/23.22 inference(unit_resulting_resolution,[],[f715,f78087,f2899])). 23.41/23.22 fof(f2899,plain,( 23.41/23.22 ( ! [X17,X16] : (~sP1295(X17) | ~sP1272(X16) | ~r1(X16,X17)) )), 23.41/23.22 inference(general_splitting,[],[f2897,f2898_D])). 23.41/23.22 fof(f2897,plain,( 23.41/23.22 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1294(X18)) )), 23.41/23.22 inference(general_splitting,[],[f2895,f2896_D])). 23.41/23.22 fof(f2895,plain,( 23.41/23.22 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1293(X19)) )), 23.41/23.22 inference(general_splitting,[],[f2893,f2894_D])). 23.41/23.22 fof(f2893,plain,( 23.41/23.22 ( ! [X19,X17,X20,X18,X16] : (~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1292(X20)) )), 23.41/23.22 inference(general_splitting,[],[f2891,f2892_D])). 23.41/23.22 fof(f2891,plain,( 23.41/23.22 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1291(X21)) )), 23.41/23.22 inference(general_splitting,[],[f2889,f2890_D])). 23.41/23.22 fof(f2889,plain,( 23.41/23.22 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1290(X22)) )), 23.41/23.22 inference(general_splitting,[],[f2887,f2888_D])). 23.41/23.22 fof(f2887,plain,( 23.41/23.22 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1289(X23)) )), 23.41/23.22 inference(general_splitting,[],[f2885,f2886_D])). 23.41/23.22 fof(f2885,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1288(X24)) )), 23.41/23.22 inference(general_splitting,[],[f2883,f2884_D])). 23.41/23.22 fof(f2883,plain,( 23.41/23.22 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1287(X25)) )), 23.41/23.22 inference(general_splitting,[],[f2881,f2882_D])). 23.41/23.22 fof(f2881,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1286(X26)) )), 23.41/23.22 inference(general_splitting,[],[f2879,f2880_D])). 23.41/23.22 fof(f2879,plain,( 23.41/23.22 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1285(X27)) )), 23.41/23.22 inference(general_splitting,[],[f2877,f2878_D])). 23.41/23.22 fof(f2877,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1284(X28)) )), 23.41/23.22 inference(general_splitting,[],[f2875,f2876_D])). 23.41/23.22 fof(f2875,plain,( 23.41/23.22 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1283(X29)) )), 23.41/23.22 inference(general_splitting,[],[f2873,f2874_D])). 23.41/23.22 fof(f2873,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1282(X30)) )), 23.41/23.22 inference(general_splitting,[],[f2871,f2872_D])). 23.41/23.22 fof(f2871,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1281(X31)) )), 23.41/23.22 inference(general_splitting,[],[f2869,f2870_D])). 23.41/23.22 fof(f2869,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1280(X32)) )), 23.41/23.22 inference(general_splitting,[],[f2867,f2868_D])). 23.41/23.22 fof(f2867,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1279(X33)) )), 23.41/23.22 inference(general_splitting,[],[f2865,f2866_D])). 23.41/23.22 fof(f2865,plain,( 23.41/23.22 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1278(X34)) )), 23.41/23.23 inference(general_splitting,[],[f2863,f2864_D])). 23.41/23.23 fof(f2863,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1277(X35)) )), 23.41/23.23 inference(general_splitting,[],[f2861,f2862_D])). 23.41/23.23 fof(f2861,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1276(X36)) )), 23.41/23.23 inference(general_splitting,[],[f2859,f2860_D])). 23.41/23.23 fof(f2859,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1275(X37)) )), 23.41/23.23 inference(general_splitting,[],[f2857,f2858_D])). 23.41/23.23 fof(f2857,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1274(X38)) )), 23.41/23.23 inference(general_splitting,[],[f2855,f2856_D])). 23.41/23.23 fof(f2855,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1272(X16) | ~sP1273(X39)) )), 23.41/23.23 inference(general_splitting,[],[f2853,f2854_D])). 23.41/23.23 fof(f2853,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1259(X40) | ~sP1272(X16)) )), 23.41/23.23 inference(general_splitting,[],[f2851,f2852_D])). 23.41/23.23 fof(f2852,plain,( 23.41/23.23 ( ! [X15,X16] : (sP1272(X16) | ~sP1271(X15) | ~r1(X15,X16)) )), 23.41/23.23 inference(cnf_transformation,[],[f2852_D])). 23.41/23.23 fof(f2852_D,plain,( 23.41/23.23 ( ! [X16] : (( ! [X15] : (~sP1271(X15) | ~r1(X15,X16)) ) <=> ~sP1272(X16)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1272])])). 23.41/23.23 fof(f2851,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1259(X40) | ~sP1271(X15)) )), 23.41/23.23 inference(general_splitting,[],[f2849,f2850_D])). 23.41/23.23 fof(f2850,plain,( 23.41/23.23 ( ! [X14,X15] : (sP1271(X15) | ~sP1270(X14) | ~r1(X14,X15)) )), 23.41/23.23 inference(cnf_transformation,[],[f2850_D])). 23.41/23.23 fof(f2850_D,plain,( 23.41/23.23 ( ! [X15] : (( ! [X14] : (~sP1270(X14) | ~r1(X14,X15)) ) <=> ~sP1271(X15)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1271])])). 23.41/23.23 fof(f2849,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~sP1259(X40) | ~sP1270(X14)) )), 23.41/23.23 inference(general_splitting,[],[f2847,f2848_D])). 23.41/23.23 fof(f2848,plain,( 23.41/23.23 ( ! [X14,X13] : (sP1270(X14) | ~sP1269(X13) | ~r1(X13,X14)) )), 23.41/23.23 inference(cnf_transformation,[],[f2848_D])). 23.41/23.23 fof(f2848_D,plain,( 23.41/23.23 ( ! [X14] : (( ! [X13] : (~sP1269(X13) | ~r1(X13,X14)) ) <=> ~sP1270(X14)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1270])])). 23.41/23.23 fof(f2847,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP1259(X40) | ~sP1269(X13)) )), 23.41/23.23 inference(general_splitting,[],[f2845,f2846_D])). 23.41/23.23 fof(f2846,plain,( 23.41/23.23 ( ! [X12,X13] : (sP1269(X13) | ~sP1268(X12) | ~r1(X12,X13)) )), 23.41/23.23 inference(cnf_transformation,[],[f2846_D])). 23.41/23.23 fof(f2846_D,plain,( 23.41/23.23 ( ! [X13] : (( ! [X12] : (~sP1268(X12) | ~r1(X12,X13)) ) <=> ~sP1269(X13)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1269])])). 23.41/23.23 fof(f2845,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP1259(X40) | ~sP1268(X12)) )), 23.41/23.23 inference(general_splitting,[],[f2843,f2844_D])). 23.41/23.23 fof(f2844,plain,( 23.41/23.23 ( ! [X12,X11] : (sP1268(X12) | ~sP1267(X11) | ~r1(X11,X12)) )), 23.41/23.23 inference(cnf_transformation,[],[f2844_D])). 23.41/23.23 fof(f2844_D,plain,( 23.41/23.23 ( ! [X12] : (( ! [X11] : (~sP1267(X11) | ~r1(X11,X12)) ) <=> ~sP1268(X12)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1268])])). 23.41/23.23 fof(f2843,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP1259(X40) | ~sP1267(X11)) )), 23.41/23.23 inference(general_splitting,[],[f2841,f2842_D])). 23.41/23.23 fof(f2842,plain,( 23.41/23.23 ( ! [X10,X11] : (sP1267(X11) | ~sP1266(X10) | ~r1(X10,X11)) )), 23.41/23.23 inference(cnf_transformation,[],[f2842_D])). 23.41/23.23 fof(f2842_D,plain,( 23.41/23.23 ( ! [X11] : (( ! [X10] : (~sP1266(X10) | ~r1(X10,X11)) ) <=> ~sP1267(X11)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1267])])). 23.41/23.23 fof(f2841,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~sP1259(X40) | ~sP1266(X10)) )), 23.41/23.23 inference(general_splitting,[],[f2839,f2840_D])). 23.41/23.23 fof(f2840,plain,( 23.41/23.23 ( ! [X10,X9] : (sP1266(X10) | ~sP1265(X9) | ~r1(X9,X10)) )), 23.41/23.23 inference(cnf_transformation,[],[f2840_D])). 23.41/23.23 fof(f2840_D,plain,( 23.41/23.23 ( ! [X10] : (( ! [X9] : (~sP1265(X9) | ~r1(X9,X10)) ) <=> ~sP1266(X10)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1266])])). 23.41/23.23 fof(f2839,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~sP1259(X40) | ~sP1265(X9)) )), 23.41/23.23 inference(general_splitting,[],[f2837,f2838_D])). 23.41/23.23 fof(f2838,plain,( 23.41/23.23 ( ! [X8,X9] : (sP1265(X9) | ~sP1264(X8) | ~r1(X8,X9)) )), 23.41/23.23 inference(cnf_transformation,[],[f2838_D])). 23.41/23.23 fof(f2838_D,plain,( 23.41/23.23 ( ! [X9] : (( ! [X8] : (~sP1264(X8) | ~r1(X8,X9)) ) <=> ~sP1265(X9)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1265])])). 23.41/23.23 fof(f2837,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1259(X40) | ~sP1264(X8)) )), 23.41/23.23 inference(general_splitting,[],[f2835,f2836_D])). 23.41/23.23 fof(f2836,plain,( 23.41/23.23 ( ! [X8,X7] : (sP1264(X8) | ~sP1263(X7) | ~r1(X7,X8)) )), 23.41/23.23 inference(cnf_transformation,[],[f2836_D])). 23.41/23.23 fof(f2836_D,plain,( 23.41/23.23 ( ! [X8] : (( ! [X7] : (~sP1263(X7) | ~r1(X7,X8)) ) <=> ~sP1264(X8)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1264])])). 23.41/23.23 fof(f2835,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1259(X40) | ~sP1263(X7)) )), 23.41/23.23 inference(general_splitting,[],[f2833,f2834_D])). 23.41/23.23 fof(f2834,plain,( 23.41/23.23 ( ! [X6,X7] : (sP1263(X7) | ~sP1262(X6) | ~r1(X6,X7)) )), 23.41/23.23 inference(cnf_transformation,[],[f2834_D])). 23.41/23.23 fof(f2834_D,plain,( 23.41/23.23 ( ! [X7] : (( ! [X6] : (~sP1262(X6) | ~r1(X6,X7)) ) <=> ~sP1263(X7)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1263])])). 23.41/23.23 fof(f2833,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP1259(X40) | ~sP1262(X6)) )), 23.41/23.23 inference(general_splitting,[],[f2831,f2832_D])). 23.41/23.23 fof(f2832,plain,( 23.41/23.23 ( ! [X6,X5] : (sP1262(X6) | ~sP1261(X5) | ~r1(X5,X6)) )), 23.41/23.23 inference(cnf_transformation,[],[f2832_D])). 23.41/23.23 fof(f2832_D,plain,( 23.41/23.23 ( ! [X6] : (( ! [X5] : (~sP1261(X5) | ~r1(X5,X6)) ) <=> ~sP1262(X6)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1262])])). 23.41/23.23 fof(f2831,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1259(X40) | ~sP1261(X5)) )), 23.41/23.23 inference(general_splitting,[],[f2829,f2830_D])). 23.41/23.23 fof(f2830,plain,( 23.41/23.23 ( ! [X4,X5] : (sP1261(X5) | ~sP1260(X4) | ~r1(X4,X5)) )), 23.41/23.23 inference(cnf_transformation,[],[f2830_D])). 23.41/23.23 fof(f2830_D,plain,( 23.41/23.23 ( ! [X5] : (( ! [X4] : (~sP1260(X4) | ~r1(X4,X5)) ) <=> ~sP1261(X5)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1261])])). 23.41/23.23 fof(f2829,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1259(X40) | ~sP1260(X4)) )), 23.41/23.23 inference(general_splitting,[],[f2827,f2828_D])). 23.41/23.23 fof(f2828,plain,( 23.41/23.23 ( ! [X4,X3] : (sP1260(X4) | ~sP1257(X3) | ~r1(X3,X4)) )), 23.41/23.23 inference(cnf_transformation,[],[f2828_D])). 23.41/23.23 fof(f2828_D,plain,( 23.41/23.23 ( ! [X4] : (( ! [X3] : (~sP1257(X3) | ~r1(X3,X4)) ) <=> ~sP1260(X4)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1260])])). 23.41/23.23 fof(f2827,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1257(X3) | ~sP1259(X40)) )), 23.41/23.23 inference(general_splitting,[],[f2825,f2826_D])). 23.41/23.23 fof(f2825,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1257(X3) | ~sP1258(X41)) )), 23.41/23.23 inference(general_splitting,[],[f2823,f2824_D])). 23.41/23.23 fof(f2823,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~p38(X42) | ~p39(X42) | ~r1(X41,X42) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1257(X3)) )), 23.41/23.23 inference(general_splitting,[],[f2821,f2822_D])). 23.41/23.23 fof(f2822,plain,( 23.41/23.23 ( ! [X3,X1] : (sP1257(X3) | ~sP1256(X1) | ~r1(X1,X3)) )), 23.41/23.23 inference(cnf_transformation,[],[f2822_D])). 23.41/23.23 fof(f2822_D,plain,( 23.41/23.23 ( ! [X3] : (( ! [X1] : (~sP1256(X1) | ~r1(X1,X3)) ) <=> ~sP1257(X3)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1257])])). 23.41/23.23 fof(f2821,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~p38(X42) | ~p39(X42) | ~r1(X41,X42) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~sP1256(X1)) )), 23.41/23.23 inference(general_splitting,[],[f416,f2820_D])). 23.41/23.23 fof(f2820,plain,( 23.41/23.23 ( ! [X0,X1] : (sP1256(X1) | ~sP36(X0) | ~r1(X0,X1)) )), 23.41/23.23 inference(cnf_transformation,[],[f2820_D])). 23.41/23.23 fof(f2820_D,plain,( 23.41/23.23 ( ! [X1] : (( ! [X0] : (~sP36(X0) | ~r1(X0,X1)) ) <=> ~sP1256(X1)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1256])])). 23.41/23.23 fof(f416,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X0,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X42,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X0,X1) | ~r1(X3,X4) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X15,X16) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X40,X41) | ~p38(X42) | ~p39(X42) | ~r1(X41,X42) | ~r1(X39,X40) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~sP36(X0)) )), 23.41/23.23 inference(cnf_transformation,[],[f106])). 23.41/23.23 fof(f78087,plain,( 23.41/23.23 sP1272(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f71091,f2852])). 23.41/23.23 fof(f71091,plain,( 23.41/23.23 sP1271(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f64566,f2850])). 23.41/23.23 fof(f64566,plain,( 23.41/23.23 sP1270(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f56492,f2848])). 23.41/23.23 fof(f56492,plain,( 23.41/23.23 sP1269(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f49789,f2846])). 23.41/23.23 fof(f49789,plain,( 23.41/23.23 sP1268(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f44261,f2844])). 23.41/23.23 fof(f44261,plain,( 23.41/23.23 sP1267(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f39732,f2842])). 23.41/23.23 fof(f39732,plain,( 23.41/23.23 sP1266(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f35577,f2840])). 23.41/23.23 fof(f35577,plain,( 23.41/23.23 sP1265(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f31780,f2838])). 23.41/23.23 fof(f31780,plain,( 23.41/23.23 sP1264(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f28310,f2836])). 23.41/23.23 fof(f28310,plain,( 23.41/23.23 sP1263(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f25181,f2834])). 23.41/23.23 fof(f25181,plain,( 23.41/23.23 sP1262(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f22362,f2832])). 23.41/23.23 fof(f22362,plain,( 23.41/23.23 sP1261(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f19837,f2830])). 23.41/23.23 fof(f19837,plain,( 23.41/23.23 sP1260(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f17575,f2828])). 23.41/23.23 fof(f17575,plain,( 23.41/23.23 sP1257(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f15168,f2822])). 23.41/23.23 fof(f15168,plain,( 23.41/23.23 sP1256(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f13121,f2820])). 23.41/23.23 fof(f472342,plain,( 23.41/23.23 ~sP1297(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f448973,f2932])). 23.41/23.23 fof(f2932,plain,( 23.41/23.23 ( ! [X39,X40] : (~sP1297(X40) | ~r1(X39,X40) | sP1312(X39)) )), 23.41/23.23 inference(cnf_transformation,[],[f2932_D])). 23.41/23.23 fof(f2932_D,plain,( 23.41/23.23 ( ! [X39] : (( ! [X40] : (~sP1297(X40) | ~r1(X39,X40)) ) <=> ~sP1312(X39)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1312])])). 23.41/23.23 fof(f448973,plain,( 23.41/23.23 ~sP1312(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f425823,f2934])). 23.41/23.23 fof(f2934,plain,( 23.41/23.23 ( ! [X39,X38] : (~sP1312(X39) | ~r1(X38,X39) | sP1313(X38)) )), 23.41/23.23 inference(cnf_transformation,[],[f2934_D])). 23.41/23.23 fof(f2934_D,plain,( 23.41/23.23 ( ! [X38] : (( ! [X39] : (~sP1312(X39) | ~r1(X38,X39)) ) <=> ~sP1313(X38)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1313])])). 23.41/23.23 fof(f425823,plain,( 23.41/23.23 ~sP1313(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f402989,f2936])). 23.41/23.23 fof(f2936,plain,( 23.41/23.23 ( ! [X37,X38] : (~sP1313(X38) | ~r1(X37,X38) | sP1314(X37)) )), 23.41/23.23 inference(cnf_transformation,[],[f2936_D])). 23.41/23.23 fof(f2936_D,plain,( 23.41/23.23 ( ! [X37] : (( ! [X38] : (~sP1313(X38) | ~r1(X37,X38)) ) <=> ~sP1314(X37)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1314])])). 23.41/23.23 fof(f402989,plain,( 23.41/23.23 ~sP1314(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f378304,f2938])). 23.41/23.23 fof(f2938,plain,( 23.41/23.23 ( ! [X37,X36] : (~sP1314(X37) | ~r1(X36,X37) | sP1315(X36)) )), 23.41/23.23 inference(cnf_transformation,[],[f2938_D])). 23.41/23.23 fof(f2938_D,plain,( 23.41/23.23 ( ! [X36] : (( ! [X37] : (~sP1314(X37) | ~r1(X36,X37)) ) <=> ~sP1315(X36)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1315])])). 23.41/23.23 fof(f378304,plain,( 23.41/23.23 ~sP1315(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f342824,f2940])). 23.41/23.23 fof(f2940,plain,( 23.41/23.23 ( ! [X35,X36] : (~sP1315(X36) | ~r1(X35,X36) | sP1316(X35)) )), 23.41/23.23 inference(cnf_transformation,[],[f2940_D])). 23.41/23.23 fof(f2940_D,plain,( 23.41/23.23 ( ! [X35] : (( ! [X36] : (~sP1315(X36) | ~r1(X35,X36)) ) <=> ~sP1316(X35)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1316])])). 23.41/23.23 fof(f342824,plain,( 23.41/23.23 ~sP1316(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f320709,f2942])). 23.41/23.23 fof(f2942,plain,( 23.41/23.23 ( ! [X35,X34] : (~sP1316(X35) | ~r1(X34,X35) | sP1317(X34)) )), 23.41/23.23 inference(cnf_transformation,[],[f2942_D])). 23.41/23.23 fof(f2942_D,plain,( 23.41/23.23 ( ! [X34] : (( ! [X35] : (~sP1316(X35) | ~r1(X34,X35)) ) <=> ~sP1317(X34)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1317])])). 23.41/23.23 fof(f320709,plain,( 23.41/23.23 ~sP1317(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f301818,f2944])). 23.41/23.23 fof(f2944,plain,( 23.41/23.23 ( ! [X33,X34] : (~sP1317(X34) | ~r1(X33,X34) | sP1318(X33)) )), 23.41/23.23 inference(cnf_transformation,[],[f2944_D])). 23.41/23.23 fof(f2944_D,plain,( 23.41/23.23 ( ! [X33] : (( ! [X34] : (~sP1317(X34) | ~r1(X33,X34)) ) <=> ~sP1318(X33)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1318])])). 23.41/23.23 fof(f301818,plain,( 23.41/23.23 ~sP1318(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f283697,f2946])). 23.41/23.23 fof(f2946,plain,( 23.41/23.23 ( ! [X33,X32] : (~sP1318(X33) | ~r1(X32,X33) | sP1319(X32)) )), 23.41/23.23 inference(cnf_transformation,[],[f2946_D])). 23.41/23.23 fof(f2946_D,plain,( 23.41/23.23 ( ! [X32] : (( ! [X33] : (~sP1318(X33) | ~r1(X32,X33)) ) <=> ~sP1319(X32)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1319])])). 23.41/23.23 fof(f283697,plain,( 23.41/23.23 ~sP1319(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f266338,f2948])). 23.41/23.23 fof(f2948,plain,( 23.41/23.23 ( ! [X31,X32] : (~sP1319(X32) | ~r1(X31,X32) | sP1320(X31)) )), 23.41/23.23 inference(cnf_transformation,[],[f2948_D])). 23.41/23.23 fof(f2948_D,plain,( 23.41/23.23 ( ! [X31] : (( ! [X32] : (~sP1319(X32) | ~r1(X31,X32)) ) <=> ~sP1320(X31)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1320])])). 23.41/23.23 fof(f266338,plain,( 23.41/23.23 ~sP1320(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f249710,f2950])). 23.41/23.23 fof(f2950,plain,( 23.41/23.23 ( ! [X30,X31] : (~sP1320(X31) | ~r1(X30,X31) | sP1321(X30)) )), 23.41/23.23 inference(cnf_transformation,[],[f2950_D])). 23.41/23.23 fof(f2950_D,plain,( 23.41/23.23 ( ! [X30] : (( ! [X31] : (~sP1320(X31) | ~r1(X30,X31)) ) <=> ~sP1321(X30)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1321])])). 23.41/23.23 fof(f249710,plain,( 23.41/23.23 ~sP1321(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f233812,f2952])). 23.41/23.23 fof(f2952,plain,( 23.41/23.23 ( ! [X30,X29] : (~sP1321(X30) | ~r1(X29,X30) | sP1322(X29)) )), 23.41/23.23 inference(cnf_transformation,[],[f2952_D])). 23.41/23.23 fof(f2952_D,plain,( 23.41/23.23 ( ! [X29] : (( ! [X30] : (~sP1321(X30) | ~r1(X29,X30)) ) <=> ~sP1322(X29)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1322])])). 23.41/23.23 fof(f233812,plain,( 23.41/23.23 ~sP1322(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f218612,f2954])). 23.41/23.23 fof(f2954,plain,( 23.41/23.23 ( ! [X28,X29] : (~sP1322(X29) | ~r1(X28,X29) | sP1323(X28)) )), 23.41/23.23 inference(cnf_transformation,[],[f2954_D])). 23.41/23.23 fof(f2954_D,plain,( 23.41/23.23 ( ! [X28] : (( ! [X29] : (~sP1322(X29) | ~r1(X28,X29)) ) <=> ~sP1323(X28)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1323])])). 23.41/23.23 fof(f218612,plain,( 23.41/23.23 ~sP1323(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f204107,f2956])). 23.41/23.23 fof(f2956,plain,( 23.41/23.23 ( ! [X28,X27] : (~sP1323(X28) | ~r1(X27,X28) | sP1324(X27)) )), 23.41/23.23 inference(cnf_transformation,[],[f2956_D])). 23.41/23.23 fof(f2956_D,plain,( 23.41/23.23 ( ! [X27] : (( ! [X28] : (~sP1323(X28) | ~r1(X27,X28)) ) <=> ~sP1324(X27)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1324])])). 23.41/23.23 fof(f204107,plain,( 23.41/23.23 ~sP1324(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f190275,f2958])). 23.41/23.23 fof(f2958,plain,( 23.41/23.23 ( ! [X26,X27] : (~sP1324(X27) | ~r1(X26,X27) | sP1325(X26)) )), 23.41/23.23 inference(cnf_transformation,[],[f2958_D])). 23.41/23.23 fof(f2958_D,plain,( 23.41/23.23 ( ! [X26] : (( ! [X27] : (~sP1324(X27) | ~r1(X26,X27)) ) <=> ~sP1325(X26)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1325])])). 23.41/23.23 fof(f190275,plain,( 23.41/23.23 ~sP1325(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f177104,f2960])). 23.41/23.23 fof(f2960,plain,( 23.41/23.23 ( ! [X26,X25] : (~sP1325(X26) | ~r1(X25,X26) | sP1326(X25)) )), 23.41/23.23 inference(cnf_transformation,[],[f2960_D])). 23.41/23.23 fof(f2960_D,plain,( 23.41/23.23 ( ! [X25] : (( ! [X26] : (~sP1325(X26) | ~r1(X25,X26)) ) <=> ~sP1326(X25)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1326])])). 23.41/23.23 fof(f177104,plain,( 23.41/23.23 ~sP1326(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f164577,f2962])). 23.41/23.23 fof(f2962,plain,( 23.41/23.23 ( ! [X24,X25] : (~sP1326(X25) | ~r1(X24,X25) | sP1327(X24)) )), 23.41/23.23 inference(cnf_transformation,[],[f2962_D])). 23.41/23.23 fof(f2962_D,plain,( 23.41/23.23 ( ! [X24] : (( ! [X25] : (~sP1326(X25) | ~r1(X24,X25)) ) <=> ~sP1327(X24)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1327])])). 23.41/23.23 fof(f164577,plain,( 23.41/23.23 ~sP1327(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f152676,f2964])). 23.41/23.23 fof(f2964,plain,( 23.41/23.23 ( ! [X24,X23] : (~sP1327(X24) | ~r1(X23,X24) | sP1328(X23)) )), 23.41/23.23 inference(cnf_transformation,[],[f2964_D])). 23.41/23.23 fof(f2964_D,plain,( 23.41/23.23 ( ! [X23] : (( ! [X24] : (~sP1327(X24) | ~r1(X23,X24)) ) <=> ~sP1328(X23)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1328])])). 23.41/23.23 fof(f152676,plain,( 23.41/23.23 ~sP1328(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f141385,f2966])). 23.41/23.23 fof(f2966,plain,( 23.41/23.23 ( ! [X23,X22] : (~sP1328(X23) | ~r1(X22,X23) | sP1329(X22)) )), 23.41/23.23 inference(cnf_transformation,[],[f2966_D])). 23.41/23.23 fof(f2966_D,plain,( 23.41/23.23 ( ! [X22] : (( ! [X23] : (~sP1328(X23) | ~r1(X22,X23)) ) <=> ~sP1329(X22)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1329])])). 23.41/23.23 fof(f141385,plain,( 23.41/23.23 ~sP1329(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f130687,f2968])). 23.41/23.23 fof(f2968,plain,( 23.41/23.23 ( ! [X21,X22] : (~sP1329(X22) | ~r1(X21,X22) | sP1330(X21)) )), 23.41/23.23 inference(cnf_transformation,[],[f2968_D])). 23.41/23.23 fof(f2968_D,plain,( 23.41/23.23 ( ! [X21] : (( ! [X22] : (~sP1329(X22) | ~r1(X21,X22)) ) <=> ~sP1330(X21)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1330])])). 23.41/23.23 fof(f130687,plain,( 23.41/23.23 ~sP1330(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f120569,f2970])). 23.41/23.23 fof(f2970,plain,( 23.41/23.23 ( ! [X21,X20] : (~sP1330(X21) | ~r1(X20,X21) | sP1331(X20)) )), 23.41/23.23 inference(cnf_transformation,[],[f2970_D])). 23.41/23.23 fof(f2970_D,plain,( 23.41/23.23 ( ! [X20] : (( ! [X21] : (~sP1330(X21) | ~r1(X20,X21)) ) <=> ~sP1331(X20)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1331])])). 23.41/23.23 fof(f120569,plain,( 23.41/23.23 ~sP1331(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f111005,f2972])). 23.41/23.23 fof(f2972,plain,( 23.41/23.23 ( ! [X19,X20] : (~sP1331(X20) | ~r1(X19,X20) | sP1332(X19)) )), 23.41/23.23 inference(cnf_transformation,[],[f2972_D])). 23.41/23.23 fof(f2972_D,plain,( 23.41/23.23 ( ! [X19] : (( ! [X20] : (~sP1331(X20) | ~r1(X19,X20)) ) <=> ~sP1332(X19)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1332])])). 23.41/23.23 fof(f111005,plain,( 23.41/23.23 ~sP1332(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f101993,f2974])). 23.41/23.23 fof(f2974,plain,( 23.41/23.23 ( ! [X19,X18] : (~sP1332(X19) | ~r1(X18,X19) | sP1333(X18)) )), 23.41/23.23 inference(cnf_transformation,[],[f2974_D])). 23.41/23.23 fof(f2974_D,plain,( 23.41/23.23 ( ! [X18] : (( ! [X19] : (~sP1332(X19) | ~r1(X18,X19)) ) <=> ~sP1333(X18)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1333])])). 23.41/23.23 fof(f101993,plain,( 23.41/23.23 ~sP1333(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f93512,f2976])). 23.41/23.23 fof(f2976,plain,( 23.41/23.23 ( ! [X17,X18] : (~sP1333(X18) | ~r1(X17,X18) | sP1334(X17)) )), 23.41/23.23 inference(cnf_transformation,[],[f2976_D])). 23.41/23.23 fof(f2976_D,plain,( 23.41/23.23 ( ! [X17] : (( ! [X18] : (~sP1333(X18) | ~r1(X17,X18)) ) <=> ~sP1334(X17)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1334])])). 23.41/23.23 fof(f93512,plain,( 23.41/23.23 ~sP1334(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f85544,f2977])). 23.41/23.23 fof(f2977,plain,( 23.41/23.23 ( ! [X17,X16] : (~sP1334(X17) | ~sP1311(X16) | ~r1(X16,X17)) )), 23.41/23.23 inference(general_splitting,[],[f2975,f2976_D])). 23.41/23.23 fof(f2975,plain,( 23.41/23.23 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1333(X18)) )), 23.41/23.23 inference(general_splitting,[],[f2973,f2974_D])). 23.41/23.23 fof(f2973,plain,( 23.41/23.23 ( ! [X19,X17,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1332(X19)) )), 23.41/23.23 inference(general_splitting,[],[f2971,f2972_D])). 23.41/23.23 fof(f2971,plain,( 23.41/23.23 ( ! [X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1331(X20)) )), 23.41/23.23 inference(general_splitting,[],[f2969,f2970_D])). 23.41/23.23 fof(f2969,plain,( 23.41/23.23 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1330(X21)) )), 23.41/23.23 inference(general_splitting,[],[f2967,f2968_D])). 23.41/23.23 fof(f2967,plain,( 23.41/23.23 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1329(X22)) )), 23.41/23.23 inference(general_splitting,[],[f2965,f2966_D])). 23.41/23.23 fof(f2965,plain,( 23.41/23.23 ( ! [X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1328(X23)) )), 23.41/23.23 inference(general_splitting,[],[f2963,f2964_D])). 23.41/23.23 fof(f2963,plain,( 23.41/23.23 ( ! [X24,X23,X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1327(X24)) )), 23.41/23.23 inference(general_splitting,[],[f2961,f2962_D])). 23.41/23.23 fof(f2961,plain,( 23.41/23.23 ( ! [X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1326(X25)) )), 23.41/23.23 inference(general_splitting,[],[f2959,f2960_D])). 23.41/23.23 fof(f2959,plain,( 23.41/23.23 ( ! [X26,X24,X23,X21,X19,X17,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1325(X26)) )), 23.41/23.23 inference(general_splitting,[],[f2957,f2958_D])). 23.41/23.23 fof(f2957,plain,( 23.41/23.23 ( ! [X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1324(X27)) )), 23.41/23.23 inference(general_splitting,[],[f2955,f2956_D])). 23.41/23.23 fof(f2955,plain,( 23.41/23.23 ( ! [X28,X26,X24,X23,X21,X19,X17,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1323(X28)) )), 23.41/23.23 inference(general_splitting,[],[f2953,f2954_D])). 23.41/23.23 fof(f2953,plain,( 23.41/23.23 ( ! [X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1322(X29)) )), 23.41/23.23 inference(general_splitting,[],[f2951,f2952_D])). 23.41/23.23 fof(f2951,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1321(X30)) )), 23.41/23.23 inference(general_splitting,[],[f2949,f2950_D])). 23.41/23.23 fof(f2949,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1320(X31)) )), 23.41/23.23 inference(general_splitting,[],[f2947,f2948_D])). 23.41/23.23 fof(f2947,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1319(X32)) )), 23.41/23.23 inference(general_splitting,[],[f2945,f2946_D])). 23.41/23.23 fof(f2945,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1318(X33)) )), 23.41/23.23 inference(general_splitting,[],[f2943,f2944_D])). 23.41/23.23 fof(f2943,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1317(X34)) )), 23.41/23.23 inference(general_splitting,[],[f2941,f2942_D])). 23.41/23.23 fof(f2941,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1316(X35)) )), 23.41/23.23 inference(general_splitting,[],[f2939,f2940_D])). 23.41/23.23 fof(f2939,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1315(X36)) )), 23.41/23.23 inference(general_splitting,[],[f2937,f2938_D])). 23.41/23.23 fof(f2937,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1314(X37)) )), 23.41/23.23 inference(general_splitting,[],[f2935,f2936_D])). 23.41/23.23 fof(f2935,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X37,X35,X33,X23,X21,X19,X17,X31,X29,X27,X25,X38,X36,X34,X32,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1313(X38)) )), 23.41/23.23 inference(general_splitting,[],[f2933,f2934_D])). 23.41/23.23 fof(f2933,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X20,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1311(X16) | ~sP1312(X39)) )), 23.41/23.23 inference(general_splitting,[],[f2931,f2932_D])). 23.41/23.23 fof(f2931,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X40,X20,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~sP1297(X40) | ~sP1311(X16)) )), 23.41/23.23 inference(general_splitting,[],[f2929,f2930_D])). 23.41/23.23 fof(f2930,plain,( 23.41/23.23 ( ! [X15,X16] : (sP1311(X16) | ~sP1310(X15) | ~r1(X15,X16)) )), 23.41/23.23 inference(cnf_transformation,[],[f2930_D])). 23.41/23.23 fof(f2930_D,plain,( 23.41/23.23 ( ! [X16] : (( ! [X15] : (~sP1310(X15) | ~r1(X15,X16)) ) <=> ~sP1311(X16)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1311])])). 23.41/23.23 fof(f2929,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP1297(X40) | ~sP1310(X15)) )), 23.41/23.23 inference(general_splitting,[],[f2927,f2928_D])). 23.41/23.23 fof(f2928,plain,( 23.41/23.23 ( ! [X14,X15] : (sP1310(X15) | ~sP1309(X14) | ~r1(X14,X15)) )), 23.41/23.23 inference(cnf_transformation,[],[f2928_D])). 23.41/23.23 fof(f2928_D,plain,( 23.41/23.23 ( ! [X15] : (( ! [X14] : (~sP1309(X14) | ~r1(X14,X15)) ) <=> ~sP1310(X15)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1310])])). 23.41/23.23 fof(f2927,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP1297(X40) | ~sP1309(X14)) )), 23.41/23.23 inference(general_splitting,[],[f2925,f2926_D])). 23.41/23.23 fof(f2926,plain,( 23.41/23.23 ( ! [X14,X13] : (sP1309(X14) | ~sP1308(X13) | ~r1(X13,X14)) )), 23.41/23.23 inference(cnf_transformation,[],[f2926_D])). 23.41/23.23 fof(f2926_D,plain,( 23.41/23.23 ( ! [X14] : (( ! [X13] : (~sP1308(X13) | ~r1(X13,X14)) ) <=> ~sP1309(X14)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1309])])). 23.41/23.23 fof(f2925,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP1297(X40) | ~sP1308(X13)) )), 23.41/23.23 inference(general_splitting,[],[f2923,f2924_D])). 23.41/23.23 fof(f2924,plain,( 23.41/23.23 ( ! [X12,X13] : (sP1308(X13) | ~sP1307(X12) | ~r1(X12,X13)) )), 23.41/23.23 inference(cnf_transformation,[],[f2924_D])). 23.41/23.23 fof(f2924_D,plain,( 23.41/23.23 ( ! [X13] : (( ! [X12] : (~sP1307(X12) | ~r1(X12,X13)) ) <=> ~sP1308(X13)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1308])])). 23.41/23.23 fof(f2923,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X40,X20,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP1297(X40) | ~sP1307(X12)) )), 23.41/23.23 inference(general_splitting,[],[f2921,f2922_D])). 23.41/23.23 fof(f2922,plain,( 23.41/23.23 ( ! [X12,X11] : (sP1307(X12) | ~sP1306(X11) | ~r1(X11,X12)) )), 23.41/23.23 inference(cnf_transformation,[],[f2922_D])). 23.41/23.23 fof(f2922_D,plain,( 23.41/23.23 ( ! [X12] : (( ! [X11] : (~sP1306(X11) | ~r1(X11,X12)) ) <=> ~sP1307(X12)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1307])])). 23.41/23.23 fof(f2921,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP1297(X40) | ~sP1306(X11)) )), 23.41/23.23 inference(general_splitting,[],[f2919,f2920_D])). 23.41/23.23 fof(f2920,plain,( 23.41/23.23 ( ! [X10,X11] : (sP1306(X11) | ~sP1305(X10) | ~r1(X10,X11)) )), 23.41/23.23 inference(cnf_transformation,[],[f2920_D])). 23.41/23.23 fof(f2920_D,plain,( 23.41/23.23 ( ! [X11] : (( ! [X10] : (~sP1305(X10) | ~r1(X10,X11)) ) <=> ~sP1306(X11)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1306])])). 23.41/23.23 fof(f2919,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP1297(X40) | ~sP1305(X10)) )), 23.41/23.23 inference(general_splitting,[],[f2917,f2918_D])). 23.41/23.23 fof(f2918,plain,( 23.41/23.23 ( ! [X10,X9] : (sP1305(X10) | ~sP1304(X9) | ~r1(X9,X10)) )), 23.41/23.23 inference(cnf_transformation,[],[f2918_D])). 23.41/23.23 fof(f2918_D,plain,( 23.41/23.23 ( ! [X10] : (( ! [X9] : (~sP1304(X9) | ~r1(X9,X10)) ) <=> ~sP1305(X10)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1305])])). 23.41/23.23 fof(f2917,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~sP1297(X40) | ~sP1304(X9)) )), 23.41/23.23 inference(general_splitting,[],[f2915,f2916_D])). 23.41/23.23 fof(f2916,plain,( 23.41/23.23 ( ! [X8,X9] : (sP1304(X9) | ~sP1303(X8) | ~r1(X8,X9)) )), 23.41/23.23 inference(cnf_transformation,[],[f2916_D])). 23.41/23.23 fof(f2916_D,plain,( 23.41/23.23 ( ! [X9] : (( ! [X8] : (~sP1303(X8) | ~r1(X8,X9)) ) <=> ~sP1304(X9)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1304])])). 23.41/23.23 fof(f2915,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X36,X32,X15,X11,X40,X20,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~sP1297(X40) | ~sP1303(X8)) )), 23.41/23.23 inference(general_splitting,[],[f2913,f2914_D])). 23.41/23.23 fof(f2914,plain,( 23.41/23.23 ( ! [X8,X7] : (sP1303(X8) | ~sP1302(X7) | ~r1(X7,X8)) )), 23.41/23.23 inference(cnf_transformation,[],[f2914_D])). 23.41/23.23 fof(f2914_D,plain,( 23.41/23.23 ( ! [X8] : (( ! [X7] : (~sP1302(X7) | ~r1(X7,X8)) ) <=> ~sP1303(X8)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1303])])). 23.41/23.23 fof(f2913,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~sP1297(X40) | ~sP1302(X7)) )), 23.41/23.23 inference(general_splitting,[],[f2911,f2912_D])). 23.41/23.23 fof(f2912,plain,( 23.41/23.23 ( ! [X6,X7] : (sP1302(X7) | ~sP1301(X6) | ~r1(X6,X7)) )), 23.41/23.23 inference(cnf_transformation,[],[f2912_D])). 23.41/23.23 fof(f2912_D,plain,( 23.41/23.23 ( ! [X7] : (( ! [X6] : (~sP1301(X6) | ~r1(X6,X7)) ) <=> ~sP1302(X7)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1302])])). 23.41/23.23 fof(f2911,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~sP1297(X40) | ~sP1301(X6)) )), 23.41/23.23 inference(general_splitting,[],[f2909,f2910_D])). 23.41/23.23 fof(f2910,plain,( 23.41/23.23 ( ! [X6,X5] : (sP1301(X6) | ~sP1300(X5) | ~r1(X5,X6)) )), 23.41/23.23 inference(cnf_transformation,[],[f2910_D])). 23.41/23.23 fof(f2910_D,plain,( 23.41/23.23 ( ! [X6] : (( ! [X5] : (~sP1300(X5) | ~r1(X5,X6)) ) <=> ~sP1301(X6)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1301])])). 23.41/23.23 fof(f2909,plain,( 23.41/23.23 ( ! [X28,X24,X37,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~r1(X5,X6) | ~sP1297(X40) | ~sP1300(X5)) )), 23.41/23.23 inference(general_splitting,[],[f2907,f2908_D])). 23.41/23.23 fof(f2908,plain,( 23.41/23.23 ( ! [X4,X5] : (sP1300(X5) | ~sP1299(X4) | ~r1(X4,X5)) )), 23.41/23.23 inference(cnf_transformation,[],[f2908_D])). 23.41/23.23 fof(f2908_D,plain,( 23.41/23.23 ( ! [X5] : (( ! [X4] : (~sP1299(X4) | ~r1(X4,X5)) ) <=> ~sP1300(X5)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1300])])). 23.41/23.23 fof(f2907,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X32,X15,X11,X40,X20,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1297(X40) | ~sP1299(X4)) )), 23.41/23.23 inference(general_splitting,[],[f2905,f2906_D])). 23.41/23.23 fof(f2906,plain,( 23.41/23.23 ( ! [X4,X3] : (sP1299(X4) | ~sP1298(X3) | ~r1(X3,X4)) )), 23.41/23.23 inference(cnf_transformation,[],[f2906_D])). 23.41/23.23 fof(f2906_D,plain,( 23.41/23.23 ( ! [X4] : (( ! [X3] : (~sP1298(X3) | ~r1(X3,X4)) ) <=> ~sP1299(X4)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1299])])). 23.41/23.23 fof(f2905,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X3,X4) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1297(X40) | ~sP1298(X3)) )), 23.41/23.23 inference(general_splitting,[],[f2903,f2904_D])). 23.41/23.23 fof(f2904,plain,( 23.41/23.23 ( ! [X3,X1] : (sP1298(X3) | ~sP1296(X1) | ~r1(X1,X3)) )), 23.41/23.23 inference(cnf_transformation,[],[f2904_D])). 23.41/23.23 fof(f2904_D,plain,( 23.41/23.23 ( ! [X3] : (( ! [X1] : (~sP1296(X1) | ~r1(X1,X3)) ) <=> ~sP1298(X3)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1298])])). 23.41/23.23 fof(f2903,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1296(X1) | ~sP1297(X40)) )), 23.41/23.23 inference(general_splitting,[],[f2901,f2902_D])). 23.41/23.23 fof(f2901,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X40,X41) | p37(X41) | p38(X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1296(X1)) )), 23.41/23.23 inference(general_splitting,[],[f422,f2900_D])). 23.41/23.23 fof(f2900,plain,( 23.41/23.23 ( ! [X0,X1] : (sP1296(X1) | ~sP35(X0) | ~r1(X0,X1)) )), 23.41/23.23 inference(cnf_transformation,[],[f2900_D])). 23.41/23.23 fof(f2900_D,plain,( 23.41/23.23 ( ! [X1] : (( ! [X0] : (~sP35(X0) | ~r1(X0,X1)) ) <=> ~sP1296(X1)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1296])])). 23.41/23.23 fof(f422,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X0,X12,X41,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X40,X20,X16] : (~r1(X0,X1) | ~r1(X1,X3) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X37,X38) | ~r1(X40,X41) | p37(X41) | p38(X41) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X31,X32) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP35(X0)) )), 23.41/23.23 inference(cnf_transformation,[],[f110])). 23.41/23.23 fof(f85544,plain,( 23.41/23.23 sP1311(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f78081,f2930])). 23.41/23.23 fof(f78081,plain,( 23.41/23.23 sP1310(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f71085,f2928])). 23.41/23.23 fof(f71085,plain,( 23.41/23.23 sP1309(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f64560,f2926])). 23.41/23.23 fof(f64560,plain,( 23.41/23.23 sP1308(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f56486,f2924])). 23.41/23.23 fof(f56486,plain,( 23.41/23.23 sP1307(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f49783,f2922])). 23.41/23.23 fof(f49783,plain,( 23.41/23.23 sP1306(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f44255,f2920])). 23.41/23.23 fof(f44255,plain,( 23.41/23.23 sP1305(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f39726,f2918])). 23.41/23.23 fof(f39726,plain,( 23.41/23.23 sP1304(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f35571,f2916])). 23.41/23.23 fof(f35571,plain,( 23.41/23.23 sP1303(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f31774,f2914])). 23.41/23.23 fof(f31774,plain,( 23.41/23.23 sP1302(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f28304,f2912])). 23.41/23.23 fof(f28304,plain,( 23.41/23.23 sP1301(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f25175,f2910])). 23.41/23.23 fof(f25175,plain,( 23.41/23.23 sP1300(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f22356,f2908])). 23.41/23.23 fof(f22356,plain,( 23.41/23.23 sP1299(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f19831,f2906])). 23.41/23.23 fof(f19831,plain,( 23.41/23.23 sP1298(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f17569,f2904])). 23.41/23.23 fof(f17569,plain,( 23.41/23.23 sP1296(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f15164,f2900])). 23.41/23.23 fof(f472336,plain,( 23.41/23.23 ~sP1376(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f448967,f3062])). 23.41/23.23 fof(f3062,plain,( 23.41/23.23 ( ! [X37,X38] : (~sP1376(X38) | ~r1(X37,X38) | sP1377(X37)) )), 23.41/23.23 inference(cnf_transformation,[],[f3062_D])). 23.41/23.23 fof(f3062_D,plain,( 23.41/23.23 ( ! [X37] : (( ! [X38] : (~sP1376(X38) | ~r1(X37,X38)) ) <=> ~sP1377(X37)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1377])])). 23.41/23.23 fof(f448967,plain,( 23.41/23.23 ~sP1377(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f425817,f3064])). 23.41/23.23 fof(f3064,plain,( 23.41/23.23 ( ! [X37,X36] : (~sP1377(X37) | ~r1(X36,X37) | sP1378(X36)) )), 23.41/23.23 inference(cnf_transformation,[],[f3064_D])). 23.41/23.23 fof(f3064_D,plain,( 23.41/23.23 ( ! [X36] : (( ! [X37] : (~sP1377(X37) | ~r1(X36,X37)) ) <=> ~sP1378(X36)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1378])])). 23.41/23.23 fof(f425817,plain,( 23.41/23.23 ~sP1378(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f402983,f3068])). 23.41/23.23 fof(f3068,plain,( 23.41/23.23 ( ! [X35,X36] : (~sP1378(X36) | ~r1(X35,X36) | sP1380(X35)) )), 23.41/23.23 inference(cnf_transformation,[],[f3068_D])). 23.41/23.23 fof(f3068_D,plain,( 23.41/23.23 ( ! [X35] : (( ! [X36] : (~sP1378(X36) | ~r1(X35,X36)) ) <=> ~sP1380(X35)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1380])])). 23.41/23.23 fof(f402983,plain,( 23.41/23.23 ~sP1380(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f378298,f3070])). 23.41/23.23 fof(f3070,plain,( 23.41/23.23 ( ! [X35,X34] : (~sP1380(X35) | ~r1(X34,X35) | sP1381(X34)) )), 23.41/23.23 inference(cnf_transformation,[],[f3070_D])). 23.41/23.23 fof(f3070_D,plain,( 23.41/23.23 ( ! [X34] : (( ! [X35] : (~sP1380(X35) | ~r1(X34,X35)) ) <=> ~sP1381(X34)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1381])])). 23.41/23.23 fof(f378298,plain,( 23.41/23.23 ~sP1381(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f342818,f3072])). 23.41/23.23 fof(f3072,plain,( 23.41/23.23 ( ! [X33,X34] : (~sP1381(X34) | ~r1(X33,X34) | sP1382(X33)) )), 23.41/23.23 inference(cnf_transformation,[],[f3072_D])). 23.41/23.23 fof(f3072_D,plain,( 23.41/23.23 ( ! [X33] : (( ! [X34] : (~sP1381(X34) | ~r1(X33,X34)) ) <=> ~sP1382(X33)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1382])])). 23.41/23.23 fof(f342818,plain,( 23.41/23.23 ~sP1382(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f320705,f3074])). 23.41/23.23 fof(f3074,plain,( 23.41/23.23 ( ! [X33,X32] : (~sP1382(X33) | ~r1(X32,X33) | sP1383(X32)) )), 23.41/23.23 inference(cnf_transformation,[],[f3074_D])). 23.41/23.23 fof(f3074_D,plain,( 23.41/23.23 ( ! [X32] : (( ! [X33] : (~sP1382(X33) | ~r1(X32,X33)) ) <=> ~sP1383(X32)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1383])])). 23.41/23.23 fof(f320705,plain,( 23.41/23.23 ~sP1383(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f301814,f3092])). 23.41/23.23 fof(f3092,plain,( 23.41/23.23 ( ! [X31,X32] : (~sP1383(X32) | ~r1(X31,X32) | sP1392(X31)) )), 23.41/23.23 inference(cnf_transformation,[],[f3092_D])). 23.41/23.23 fof(f3092_D,plain,( 23.41/23.23 ( ! [X31] : (( ! [X32] : (~sP1383(X32) | ~r1(X31,X32)) ) <=> ~sP1392(X31)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1392])])). 23.41/23.23 fof(f301814,plain,( 23.41/23.23 ~sP1392(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f283693,f3094])). 23.41/23.23 fof(f3094,plain,( 23.41/23.23 ( ! [X30,X31] : (~sP1392(X31) | ~r1(X30,X31) | sP1393(X30)) )), 23.41/23.23 inference(cnf_transformation,[],[f3094_D])). 23.41/23.23 fof(f3094_D,plain,( 23.41/23.23 ( ! [X30] : (( ! [X31] : (~sP1392(X31) | ~r1(X30,X31)) ) <=> ~sP1393(X30)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1393])])). 23.41/23.23 fof(f283693,plain,( 23.41/23.23 ~sP1393(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f266334,f3096])). 23.41/23.23 fof(f3096,plain,( 23.41/23.23 ( ! [X30,X29] : (~sP1393(X30) | ~r1(X29,X30) | sP1394(X29)) )), 23.41/23.23 inference(cnf_transformation,[],[f3096_D])). 23.41/23.23 fof(f3096_D,plain,( 23.41/23.23 ( ! [X29] : (( ! [X30] : (~sP1393(X30) | ~r1(X29,X30)) ) <=> ~sP1394(X29)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1394])])). 23.41/23.23 fof(f266334,plain,( 23.41/23.23 ~sP1394(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f249706,f3098])). 23.41/23.23 fof(f3098,plain,( 23.41/23.23 ( ! [X28,X29] : (~sP1394(X29) | ~r1(X28,X29) | sP1395(X28)) )), 23.41/23.23 inference(cnf_transformation,[],[f3098_D])). 23.41/23.23 fof(f3098_D,plain,( 23.41/23.23 ( ! [X28] : (( ! [X29] : (~sP1394(X29) | ~r1(X28,X29)) ) <=> ~sP1395(X28)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1395])])). 23.41/23.23 fof(f249706,plain,( 23.41/23.23 ~sP1395(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f233808,f3100])). 23.41/23.23 fof(f3100,plain,( 23.41/23.23 ( ! [X28,X27] : (~sP1395(X28) | ~r1(X27,X28) | sP1396(X27)) )), 23.41/23.23 inference(cnf_transformation,[],[f3100_D])). 23.41/23.23 fof(f3100_D,plain,( 23.41/23.23 ( ! [X27] : (( ! [X28] : (~sP1395(X28) | ~r1(X27,X28)) ) <=> ~sP1396(X27)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1396])])). 23.41/23.23 fof(f233808,plain,( 23.41/23.23 ~sP1396(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f218608,f3102])). 23.41/23.23 fof(f3102,plain,( 23.41/23.23 ( ! [X26,X27] : (~sP1396(X27) | ~r1(X26,X27) | sP1397(X26)) )), 23.41/23.23 inference(cnf_transformation,[],[f3102_D])). 23.41/23.23 fof(f3102_D,plain,( 23.41/23.23 ( ! [X26] : (( ! [X27] : (~sP1396(X27) | ~r1(X26,X27)) ) <=> ~sP1397(X26)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1397])])). 23.41/23.23 fof(f218608,plain,( 23.41/23.23 ~sP1397(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f204103,f3104])). 23.41/23.23 fof(f3104,plain,( 23.41/23.23 ( ! [X26,X25] : (~sP1397(X26) | ~r1(X25,X26) | sP1398(X25)) )), 23.41/23.23 inference(cnf_transformation,[],[f3104_D])). 23.41/23.23 fof(f3104_D,plain,( 23.41/23.23 ( ! [X25] : (( ! [X26] : (~sP1397(X26) | ~r1(X25,X26)) ) <=> ~sP1398(X25)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1398])])). 23.41/23.23 fof(f204103,plain,( 23.41/23.23 ~sP1398(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f190271,f3106])). 23.41/23.23 fof(f3106,plain,( 23.41/23.23 ( ! [X24,X25] : (~sP1398(X25) | ~r1(X24,X25) | sP1399(X24)) )), 23.41/23.23 inference(cnf_transformation,[],[f3106_D])). 23.41/23.23 fof(f3106_D,plain,( 23.41/23.23 ( ! [X24] : (( ! [X25] : (~sP1398(X25) | ~r1(X24,X25)) ) <=> ~sP1399(X24)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1399])])). 23.41/23.23 fof(f190271,plain,( 23.41/23.23 ~sP1399(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f177100,f3108])). 23.41/23.23 fof(f3108,plain,( 23.41/23.23 ( ! [X24,X23] : (~sP1399(X24) | ~r1(X23,X24) | sP1400(X23)) )), 23.41/23.23 inference(cnf_transformation,[],[f3108_D])). 23.41/23.23 fof(f3108_D,plain,( 23.41/23.23 ( ! [X23] : (( ! [X24] : (~sP1399(X24) | ~r1(X23,X24)) ) <=> ~sP1400(X23)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1400])])). 23.41/23.23 fof(f177100,plain,( 23.41/23.23 ~sP1400(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f164573,f3110])). 23.41/23.23 fof(f3110,plain,( 23.41/23.23 ( ! [X23,X22] : (~sP1400(X23) | ~r1(X22,X23) | sP1401(X22)) )), 23.41/23.23 inference(cnf_transformation,[],[f3110_D])). 23.41/23.23 fof(f3110_D,plain,( 23.41/23.23 ( ! [X22] : (( ! [X23] : (~sP1400(X23) | ~r1(X22,X23)) ) <=> ~sP1401(X22)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1401])])). 23.41/23.23 fof(f164573,plain,( 23.41/23.23 ~sP1401(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f152672,f3122])). 23.41/23.23 fof(f3122,plain,( 23.41/23.23 ( ! [X21,X22] : (~sP1401(X22) | ~r1(X21,X22) | sP1407(X21)) )), 23.41/23.23 inference(cnf_transformation,[],[f3122_D])). 23.41/23.23 fof(f3122_D,plain,( 23.41/23.23 ( ! [X21] : (( ! [X22] : (~sP1401(X22) | ~r1(X21,X22)) ) <=> ~sP1407(X21)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1407])])). 23.41/23.23 fof(f152672,plain,( 23.41/23.23 ~sP1407(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f141381,f3124])). 23.41/23.23 fof(f3124,plain,( 23.41/23.23 ( ! [X21,X20] : (~sP1407(X21) | ~r1(X20,X21) | sP1408(X20)) )), 23.41/23.23 inference(cnf_transformation,[],[f3124_D])). 23.41/23.23 fof(f3124_D,plain,( 23.41/23.23 ( ! [X20] : (( ! [X21] : (~sP1407(X21) | ~r1(X20,X21)) ) <=> ~sP1408(X20)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1408])])). 23.41/23.23 fof(f141381,plain,( 23.41/23.23 ~sP1408(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f130683,f3126])). 23.41/23.23 fof(f3126,plain,( 23.41/23.23 ( ! [X19,X20] : (~sP1408(X20) | ~r1(X19,X20) | sP1409(X19)) )), 23.41/23.23 inference(cnf_transformation,[],[f3126_D])). 23.41/23.23 fof(f3126_D,plain,( 23.41/23.23 ( ! [X19] : (( ! [X20] : (~sP1408(X20) | ~r1(X19,X20)) ) <=> ~sP1409(X19)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1409])])). 23.41/23.23 fof(f130683,plain,( 23.41/23.23 ~sP1409(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f120565,f3128])). 23.41/23.23 fof(f3128,plain,( 23.41/23.23 ( ! [X19,X18] : (~sP1409(X19) | ~r1(X18,X19) | sP1410(X18)) )), 23.41/23.23 inference(cnf_transformation,[],[f3128_D])). 23.41/23.23 fof(f3128_D,plain,( 23.41/23.23 ( ! [X18] : (( ! [X19] : (~sP1409(X19) | ~r1(X18,X19)) ) <=> ~sP1410(X18)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1410])])). 23.41/23.23 fof(f120565,plain,( 23.41/23.23 ~sP1410(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f111001,f3130])). 23.41/23.23 fof(f3130,plain,( 23.41/23.23 ( ! [X17,X18] : (~sP1410(X18) | ~r1(X17,X18) | sP1411(X17)) )), 23.41/23.23 inference(cnf_transformation,[],[f3130_D])). 23.41/23.23 fof(f3130_D,plain,( 23.41/23.23 ( ! [X17] : (( ! [X18] : (~sP1410(X18) | ~r1(X17,X18)) ) <=> ~sP1411(X17)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1411])])). 23.41/23.23 fof(f111001,plain,( 23.41/23.23 ~sP1411(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f101989,f3131])). 23.41/23.23 fof(f3131,plain,( 23.41/23.23 ( ! [X17,X16] : (~sP1411(X17) | ~sP1406(X16) | ~r1(X16,X17)) )), 23.41/23.23 inference(general_splitting,[],[f3129,f3130_D])). 23.41/23.23 fof(f3129,plain,( 23.41/23.23 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP1406(X16) | ~sP1410(X18)) )), 23.41/23.23 inference(general_splitting,[],[f3127,f3128_D])). 23.41/23.23 fof(f3127,plain,( 23.41/23.23 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1406(X16) | ~sP1409(X19)) )), 23.41/23.23 inference(general_splitting,[],[f3125,f3126_D])). 23.41/23.23 fof(f3125,plain,( 23.41/23.23 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X17,X18) | ~sP1406(X16) | ~sP1408(X20)) )), 23.41/23.23 inference(general_splitting,[],[f3123,f3124_D])). 23.41/23.23 fof(f3123,plain,( 23.41/23.23 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP1406(X16) | ~sP1407(X21)) )), 23.41/23.23 inference(general_splitting,[],[f3121,f3122_D])). 23.41/23.23 fof(f3121,plain,( 23.41/23.23 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~sP1401(X22) | ~sP1406(X16)) )), 23.41/23.23 inference(general_splitting,[],[f3119,f3120_D])). 23.41/23.23 fof(f3120,plain,( 23.41/23.23 ( ! [X15,X16] : (sP1406(X16) | ~sP1405(X15) | ~r1(X15,X16)) )), 23.41/23.23 inference(cnf_transformation,[],[f3120_D])). 23.41/23.23 fof(f3120_D,plain,( 23.41/23.23 ( ! [X16] : (( ! [X15] : (~sP1405(X15) | ~r1(X15,X16)) ) <=> ~sP1406(X16)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1406])])). 23.41/23.23 fof(f3119,plain,( 23.41/23.23 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~sP1401(X22) | ~sP1405(X15)) )), 23.41/23.23 inference(general_splitting,[],[f3117,f3118_D])). 23.41/23.23 fof(f3118,plain,( 23.41/23.23 ( ! [X14,X15] : (sP1405(X15) | ~sP1404(X14) | ~r1(X14,X15)) )), 23.41/23.23 inference(cnf_transformation,[],[f3118_D])). 23.41/23.23 fof(f3118_D,plain,( 23.41/23.23 ( ! [X15] : (( ! [X14] : (~sP1404(X14) | ~r1(X14,X15)) ) <=> ~sP1405(X15)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1405])])). 23.41/23.23 fof(f3117,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~sP1401(X22) | ~sP1404(X14)) )), 23.41/23.23 inference(general_splitting,[],[f3115,f3116_D])). 23.41/23.23 fof(f3116,plain,( 23.41/23.23 ( ! [X14,X13] : (sP1404(X14) | ~sP1403(X13) | ~r1(X13,X14)) )), 23.41/23.23 inference(cnf_transformation,[],[f3116_D])). 23.41/23.23 fof(f3116_D,plain,( 23.41/23.23 ( ! [X14] : (( ! [X13] : (~sP1403(X13) | ~r1(X13,X14)) ) <=> ~sP1404(X14)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1404])])). 23.41/23.23 fof(f3115,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP1401(X22) | ~sP1403(X13)) )), 23.41/23.23 inference(general_splitting,[],[f3113,f3114_D])). 23.41/23.23 fof(f3114,plain,( 23.41/23.23 ( ! [X12,X13] : (sP1403(X13) | ~sP1402(X12) | ~r1(X12,X13)) )), 23.41/23.23 inference(cnf_transformation,[],[f3114_D])). 23.41/23.23 fof(f3114_D,plain,( 23.41/23.23 ( ! [X13] : (( ! [X12] : (~sP1402(X12) | ~r1(X12,X13)) ) <=> ~sP1403(X13)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1403])])). 23.41/23.23 fof(f3113,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1401(X22) | ~sP1402(X12)) )), 23.41/23.23 inference(general_splitting,[],[f3111,f3112_D])). 23.41/23.23 fof(f3112,plain,( 23.41/23.23 ( ! [X12,X11] : (sP1402(X12) | ~sP1391(X11) | ~r1(X11,X12)) )), 23.41/23.23 inference(cnf_transformation,[],[f3112_D])). 23.41/23.23 fof(f3112_D,plain,( 23.41/23.23 ( ! [X12] : (( ! [X11] : (~sP1391(X11) | ~r1(X11,X12)) ) <=> ~sP1402(X12)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1402])])). 23.41/23.23 fof(f3111,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1401(X22)) )), 23.41/23.23 inference(general_splitting,[],[f3109,f3110_D])). 23.41/23.23 fof(f3109,plain,( 23.41/23.23 ( ! [X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1400(X23)) )), 23.41/23.23 inference(general_splitting,[],[f3107,f3108_D])). 23.41/23.23 fof(f3107,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1399(X24)) )), 23.41/23.23 inference(general_splitting,[],[f3105,f3106_D])). 23.41/23.23 fof(f3105,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1398(X25)) )), 23.41/23.23 inference(general_splitting,[],[f3103,f3104_D])). 23.41/23.23 fof(f3103,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1397(X26)) )), 23.41/23.23 inference(general_splitting,[],[f3101,f3102_D])). 23.41/23.23 fof(f3101,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1396(X27)) )), 23.41/23.23 inference(general_splitting,[],[f3099,f3100_D])). 23.41/23.23 fof(f3099,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1395(X28)) )), 23.41/23.23 inference(general_splitting,[],[f3097,f3098_D])). 23.41/23.23 fof(f3097,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1394(X29)) )), 23.41/23.23 inference(general_splitting,[],[f3095,f3096_D])). 23.41/23.23 fof(f3095,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1393(X30)) )), 23.41/23.23 inference(general_splitting,[],[f3093,f3094_D])). 23.41/23.23 fof(f3093,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1391(X11) | ~sP1392(X31)) )), 23.41/23.23 inference(general_splitting,[],[f3091,f3092_D])). 23.41/23.23 fof(f3091,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1383(X32) | ~sP1391(X11)) )), 23.41/23.23 inference(general_splitting,[],[f3089,f3090_D])). 23.41/23.23 fof(f3090,plain,( 23.41/23.23 ( ! [X10,X11] : (sP1391(X11) | ~sP1390(X10) | ~r1(X10,X11)) )), 23.41/23.23 inference(cnf_transformation,[],[f3090_D])). 23.41/23.23 fof(f3090_D,plain,( 23.41/23.23 ( ! [X11] : (( ! [X10] : (~sP1390(X10) | ~r1(X10,X11)) ) <=> ~sP1391(X11)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1391])])). 23.41/23.23 fof(f3089,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X10,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1383(X32) | ~sP1390(X10)) )), 23.41/23.23 inference(general_splitting,[],[f3087,f3088_D])). 23.41/23.23 fof(f3088,plain,( 23.41/23.23 ( ! [X10,X9] : (sP1390(X10) | ~sP1389(X9) | ~r1(X9,X10)) )), 23.41/23.23 inference(cnf_transformation,[],[f3088_D])). 23.41/23.23 fof(f3088_D,plain,( 23.41/23.23 ( ! [X10] : (( ! [X9] : (~sP1389(X9) | ~r1(X9,X10)) ) <=> ~sP1390(X10)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1390])])). 23.41/23.23 fof(f3087,plain,( 23.41/23.23 ( ! [X28,X24,X12,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1383(X32) | ~sP1389(X9)) )), 23.41/23.23 inference(general_splitting,[],[f3085,f3086_D])). 23.41/23.23 fof(f3086,plain,( 23.41/23.23 ( ! [X8,X9] : (sP1389(X9) | ~sP1388(X8) | ~r1(X8,X9)) )), 23.41/23.23 inference(cnf_transformation,[],[f3086_D])). 23.41/23.23 fof(f3086_D,plain,( 23.41/23.23 ( ! [X9] : (( ! [X8] : (~sP1388(X8) | ~r1(X8,X9)) ) <=> ~sP1389(X9)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1389])])). 23.41/23.23 fof(f3085,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~sP1383(X32) | ~sP1388(X8)) )), 23.41/23.23 inference(general_splitting,[],[f3083,f3084_D])). 23.41/23.23 fof(f3084,plain,( 23.41/23.23 ( ! [X8,X7] : (sP1388(X8) | ~sP1387(X7) | ~r1(X7,X8)) )), 23.41/23.23 inference(cnf_transformation,[],[f3084_D])). 23.41/23.23 fof(f3084_D,plain,( 23.41/23.23 ( ! [X8] : (( ! [X7] : (~sP1387(X7) | ~r1(X7,X8)) ) <=> ~sP1388(X8)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1388])])). 23.41/23.23 fof(f3083,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1383(X32) | ~sP1387(X7)) )), 23.41/23.23 inference(general_splitting,[],[f3081,f3082_D])). 23.41/23.23 fof(f3082,plain,( 23.41/23.23 ( ! [X6,X7] : (sP1387(X7) | ~sP1386(X6) | ~r1(X6,X7)) )), 23.41/23.23 inference(cnf_transformation,[],[f3082_D])). 23.41/23.23 fof(f3082_D,plain,( 23.41/23.23 ( ! [X7] : (( ! [X6] : (~sP1386(X6) | ~r1(X6,X7)) ) <=> ~sP1387(X7)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1387])])). 23.41/23.23 fof(f3081,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP1383(X32) | ~sP1386(X6)) )), 23.41/23.23 inference(general_splitting,[],[f3079,f3080_D])). 23.41/23.23 fof(f3080,plain,( 23.41/23.23 ( ! [X6,X5] : (sP1386(X6) | ~sP1385(X5) | ~r1(X5,X6)) )), 23.41/23.23 inference(cnf_transformation,[],[f3080_D])). 23.41/23.23 fof(f3080_D,plain,( 23.41/23.23 ( ! [X6] : (( ! [X5] : (~sP1385(X5) | ~r1(X5,X6)) ) <=> ~sP1386(X6)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1386])])). 23.41/23.23 fof(f3079,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1383(X32) | ~sP1385(X5)) )), 23.41/23.23 inference(general_splitting,[],[f3077,f3078_D])). 23.41/23.23 fof(f3078,plain,( 23.41/23.23 ( ! [X4,X5] : (sP1385(X5) | ~sP1384(X4) | ~r1(X4,X5)) )), 23.41/23.23 inference(cnf_transformation,[],[f3078_D])). 23.41/23.23 fof(f3078_D,plain,( 23.41/23.23 ( ! [X5] : (( ! [X4] : (~sP1384(X4) | ~r1(X4,X5)) ) <=> ~sP1385(X5)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1385])])). 23.41/23.23 fof(f3077,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1383(X32) | ~sP1384(X4)) )), 23.41/23.23 inference(general_splitting,[],[f3075,f3076_D])). 23.41/23.23 fof(f3076,plain,( 23.41/23.23 ( ! [X4,X3] : (sP1384(X4) | ~sP1379(X3) | ~r1(X3,X4)) )), 23.41/23.23 inference(cnf_transformation,[],[f3076_D])). 23.41/23.23 fof(f3076_D,plain,( 23.41/23.23 ( ! [X4] : (( ! [X3] : (~sP1379(X3) | ~r1(X3,X4)) ) <=> ~sP1384(X4)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1384])])). 23.41/23.23 fof(f3075,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1379(X3) | ~sP1383(X32)) )), 23.41/23.23 inference(general_splitting,[],[f3073,f3074_D])). 23.41/23.23 fof(f3073,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1379(X3) | ~sP1382(X33)) )), 23.41/23.23 inference(general_splitting,[],[f3071,f3072_D])). 23.41/23.23 fof(f3071,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1379(X3) | ~sP1381(X34)) )), 23.41/23.23 inference(general_splitting,[],[f3069,f3070_D])). 23.41/23.23 fof(f3069,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1379(X3) | ~sP1380(X35)) )), 23.41/23.23 inference(general_splitting,[],[f3067,f3068_D])). 23.41/23.23 fof(f3067,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1378(X36) | ~sP1379(X3)) )), 23.41/23.23 inference(general_splitting,[],[f3065,f3066_D])). 23.41/23.23 fof(f3066,plain,( 23.41/23.23 ( ! [X2,X3] : (sP1379(X3) | ~sP1375(X2) | ~r1(X2,X3)) )), 23.41/23.23 inference(cnf_transformation,[],[f3066_D])). 23.41/23.23 fof(f3066_D,plain,( 23.41/23.23 ( ! [X3] : (( ! [X2] : (~sP1375(X2) | ~r1(X2,X3)) ) <=> ~sP1379(X3)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1379])])). 23.41/23.23 fof(f3065,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1375(X2) | ~sP1378(X36)) )), 23.41/23.23 inference(general_splitting,[],[f3063,f3064_D])). 23.41/23.23 fof(f3063,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1375(X2) | ~sP1377(X37)) )), 23.41/23.23 inference(general_splitting,[],[f3061,f3062_D])). 23.41/23.23 fof(f3061,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1375(X2) | ~sP1376(X38)) )), 23.41/23.23 inference(general_splitting,[],[f3059,f3060_D])). 23.41/23.23 fof(f3059,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X38,X39) | ~p36(X39) | ~p37(X39) | ~r1(X36,X37) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1375(X2)) )), 23.41/23.23 inference(general_splitting,[],[f3057,f3058_D])). 23.41/23.23 fof(f3058,plain,( 23.41/23.23 ( ! [X2,X1] : (sP1375(X2) | ~sP1374(X1) | ~r1(X1,X2)) )), 23.41/23.23 inference(cnf_transformation,[],[f3058_D])). 23.41/23.23 fof(f3058_D,plain,( 23.41/23.23 ( ! [X2] : (( ! [X1] : (~sP1374(X1) | ~r1(X1,X2)) ) <=> ~sP1375(X2)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1375])])). 23.41/23.23 fof(f3057,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X38,X39) | ~p36(X39) | ~p37(X39) | ~r1(X36,X37) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X1,X2) | ~sP1374(X1)) )), 23.41/23.23 inference(general_splitting,[],[f430,f3056_D])). 23.41/23.23 fof(f3056,plain,( 23.41/23.23 ( ! [X0,X1] : (sP1374(X1) | ~sP34(X0) | ~r1(X0,X1)) )), 23.41/23.23 inference(cnf_transformation,[],[f3056_D])). 23.41/23.23 fof(f3056_D,plain,( 23.41/23.23 ( ! [X1] : (( ! [X0] : (~sP34(X0) | ~r1(X0,X1)) ) <=> ~sP1374(X1)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1374])])). 23.41/23.23 fof(f430,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X0,X12,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X39,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X0,X1) | ~r1(X2,X3) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X37,X38) | ~r1(X38,X39) | ~p36(X39) | ~p37(X39) | ~r1(X36,X37) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X1,X2) | ~sP34(X0)) )), 23.41/23.23 inference(cnf_transformation,[],[f114])). 23.41/23.23 fof(f101989,plain,( 23.41/23.23 sP1406(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f93508,f3120])). 23.41/23.23 fof(f93508,plain,( 23.41/23.23 sP1405(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f85540,f3118])). 23.41/23.23 fof(f85540,plain,( 23.41/23.23 sP1404(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f78077,f3116])). 23.41/23.23 fof(f78077,plain,( 23.41/23.23 sP1403(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f71081,f3114])). 23.41/23.23 fof(f71081,plain,( 23.41/23.23 sP1402(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f64556,f3112])). 23.41/23.23 fof(f64556,plain,( 23.41/23.23 sP1391(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f56482,f3090])). 23.41/23.23 fof(f56482,plain,( 23.41/23.23 sP1390(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f49779,f3088])). 23.41/23.23 fof(f49779,plain,( 23.41/23.23 sP1389(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f44251,f3086])). 23.41/23.23 fof(f44251,plain,( 23.41/23.23 sP1388(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f39722,f3084])). 23.41/23.23 fof(f39722,plain,( 23.41/23.23 sP1387(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f35567,f3082])). 23.41/23.23 fof(f35567,plain,( 23.41/23.23 sP1386(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f31770,f3080])). 23.41/23.23 fof(f31770,plain,( 23.41/23.23 sP1385(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f28300,f3078])). 23.41/23.23 fof(f28300,plain,( 23.41/23.23 sP1384(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f25171,f3076])). 23.41/23.23 fof(f25171,plain,( 23.41/23.23 sP1379(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f22352,f3066])). 23.41/23.23 fof(f22352,plain,( 23.41/23.23 sP1375(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f19827,f3058])). 23.41/23.23 fof(f19827,plain,( 23.41/23.23 sP1374(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f17567,f3056])). 23.41/23.23 fof(f472333,plain,( 23.41/23.23 ~sP1489(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f448964,f3288])). 23.41/23.23 fof(f3288,plain,( 23.41/23.23 ( ! [X37,X38] : (~sP1489(X38) | ~r1(X37,X38) | sP1490(X37)) )), 23.41/23.23 inference(cnf_transformation,[],[f3288_D])). 23.41/23.23 fof(f3288_D,plain,( 23.41/23.23 ( ! [X37] : (( ! [X38] : (~sP1489(X38) | ~r1(X37,X38)) ) <=> ~sP1490(X37)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1490])])). 23.41/23.23 fof(f448964,plain,( 23.41/23.23 ~sP1490(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f425814,f3290])). 23.41/23.23 fof(f3290,plain,( 23.41/23.23 ( ! [X37,X36] : (~sP1490(X37) | ~r1(X36,X37) | sP1491(X36)) )), 23.41/23.23 inference(cnf_transformation,[],[f3290_D])). 23.41/23.23 fof(f3290_D,plain,( 23.41/23.23 ( ! [X36] : (( ! [X37] : (~sP1490(X37) | ~r1(X36,X37)) ) <=> ~sP1491(X36)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1491])])). 23.41/23.23 fof(f425814,plain,( 23.41/23.23 ~sP1491(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f402980,f3292])). 23.41/23.23 fof(f3292,plain,( 23.41/23.23 ( ! [X35,X36] : (~sP1491(X36) | ~r1(X35,X36) | sP1492(X35)) )), 23.41/23.23 inference(cnf_transformation,[],[f3292_D])). 23.41/23.23 fof(f3292_D,plain,( 23.41/23.23 ( ! [X35] : (( ! [X36] : (~sP1491(X36) | ~r1(X35,X36)) ) <=> ~sP1492(X35)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1492])])). 23.41/23.23 fof(f402980,plain,( 23.41/23.23 ~sP1492(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f378295,f3294])). 23.41/23.23 fof(f3294,plain,( 23.41/23.23 ( ! [X35,X34] : (~sP1492(X35) | ~r1(X34,X35) | sP1493(X34)) )), 23.41/23.23 inference(cnf_transformation,[],[f3294_D])). 23.41/23.23 fof(f3294_D,plain,( 23.41/23.23 ( ! [X34] : (( ! [X35] : (~sP1492(X35) | ~r1(X34,X35)) ) <=> ~sP1493(X34)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1493])])). 23.41/23.23 fof(f378295,plain,( 23.41/23.23 ~sP1493(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f342815,f3296])). 23.41/23.23 fof(f3296,plain,( 23.41/23.23 ( ! [X33,X34] : (~sP1493(X34) | ~r1(X33,X34) | sP1494(X33)) )), 23.41/23.23 inference(cnf_transformation,[],[f3296_D])). 23.41/23.23 fof(f3296_D,plain,( 23.41/23.23 ( ! [X33] : (( ! [X34] : (~sP1493(X34) | ~r1(X33,X34)) ) <=> ~sP1494(X33)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1494])])). 23.41/23.23 fof(f342815,plain,( 23.41/23.23 ~sP1494(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f320703,f3298])). 23.41/23.23 fof(f3298,plain,( 23.41/23.23 ( ! [X33,X32] : (~sP1494(X33) | ~r1(X32,X33) | sP1495(X32)) )), 23.41/23.23 inference(cnf_transformation,[],[f3298_D])). 23.41/23.23 fof(f3298_D,plain,( 23.41/23.23 ( ! [X32] : (( ! [X33] : (~sP1494(X33) | ~r1(X32,X33)) ) <=> ~sP1495(X32)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1495])])). 23.41/23.23 fof(f320703,plain,( 23.41/23.23 ~sP1495(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f301812,f3316])). 23.41/23.23 fof(f3316,plain,( 23.41/23.23 ( ! [X31,X32] : (~sP1495(X32) | ~r1(X31,X32) | sP1504(X31)) )), 23.41/23.23 inference(cnf_transformation,[],[f3316_D])). 23.41/23.23 fof(f3316_D,plain,( 23.41/23.23 ( ! [X31] : (( ! [X32] : (~sP1495(X32) | ~r1(X31,X32)) ) <=> ~sP1504(X31)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1504])])). 23.41/23.23 fof(f301812,plain,( 23.41/23.23 ~sP1504(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f283691,f3318])). 23.41/23.23 fof(f3318,plain,( 23.41/23.23 ( ! [X30,X31] : (~sP1504(X31) | ~r1(X30,X31) | sP1505(X30)) )), 23.41/23.23 inference(cnf_transformation,[],[f3318_D])). 23.41/23.23 fof(f3318_D,plain,( 23.41/23.23 ( ! [X30] : (( ! [X31] : (~sP1504(X31) | ~r1(X30,X31)) ) <=> ~sP1505(X30)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1505])])). 23.41/23.23 fof(f283691,plain,( 23.41/23.23 ~sP1505(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f266332,f3320])). 23.41/23.23 fof(f3320,plain,( 23.41/23.23 ( ! [X30,X29] : (~sP1505(X30) | ~r1(X29,X30) | sP1506(X29)) )), 23.41/23.23 inference(cnf_transformation,[],[f3320_D])). 23.41/23.23 fof(f3320_D,plain,( 23.41/23.23 ( ! [X29] : (( ! [X30] : (~sP1505(X30) | ~r1(X29,X30)) ) <=> ~sP1506(X29)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1506])])). 23.41/23.23 fof(f266332,plain,( 23.41/23.23 ~sP1506(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f249704,f3322])). 23.41/23.23 fof(f3322,plain,( 23.41/23.23 ( ! [X28,X29] : (~sP1506(X29) | ~r1(X28,X29) | sP1507(X28)) )), 23.41/23.23 inference(cnf_transformation,[],[f3322_D])). 23.41/23.23 fof(f3322_D,plain,( 23.41/23.23 ( ! [X28] : (( ! [X29] : (~sP1506(X29) | ~r1(X28,X29)) ) <=> ~sP1507(X28)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1507])])). 23.41/23.23 fof(f249704,plain,( 23.41/23.23 ~sP1507(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f233806,f3324])). 23.41/23.23 fof(f3324,plain,( 23.41/23.23 ( ! [X28,X27] : (~sP1507(X28) | ~r1(X27,X28) | sP1508(X27)) )), 23.41/23.23 inference(cnf_transformation,[],[f3324_D])). 23.41/23.23 fof(f3324_D,plain,( 23.41/23.23 ( ! [X27] : (( ! [X28] : (~sP1507(X28) | ~r1(X27,X28)) ) <=> ~sP1508(X27)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1508])])). 23.41/23.23 fof(f233806,plain,( 23.41/23.23 ~sP1508(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f218606,f3326])). 23.41/23.23 fof(f3326,plain,( 23.41/23.23 ( ! [X26,X27] : (~sP1508(X27) | ~r1(X26,X27) | sP1509(X26)) )), 23.41/23.23 inference(cnf_transformation,[],[f3326_D])). 23.41/23.23 fof(f3326_D,plain,( 23.41/23.23 ( ! [X26] : (( ! [X27] : (~sP1508(X27) | ~r1(X26,X27)) ) <=> ~sP1509(X26)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1509])])). 23.41/23.23 fof(f218606,plain,( 23.41/23.23 ~sP1509(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f204101,f3328])). 23.41/23.23 fof(f3328,plain,( 23.41/23.23 ( ! [X26,X25] : (~sP1509(X26) | ~r1(X25,X26) | sP1510(X25)) )), 23.41/23.23 inference(cnf_transformation,[],[f3328_D])). 23.41/23.23 fof(f3328_D,plain,( 23.41/23.23 ( ! [X25] : (( ! [X26] : (~sP1509(X26) | ~r1(X25,X26)) ) <=> ~sP1510(X25)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1510])])). 23.41/23.23 fof(f204101,plain,( 23.41/23.23 ~sP1510(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f190269,f3330])). 23.41/23.23 fof(f3330,plain,( 23.41/23.23 ( ! [X24,X25] : (~sP1510(X25) | ~r1(X24,X25) | sP1511(X24)) )), 23.41/23.23 inference(cnf_transformation,[],[f3330_D])). 23.41/23.23 fof(f3330_D,plain,( 23.41/23.23 ( ! [X24] : (( ! [X25] : (~sP1510(X25) | ~r1(X24,X25)) ) <=> ~sP1511(X24)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1511])])). 23.41/23.23 fof(f190269,plain,( 23.41/23.23 ~sP1511(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f177098,f3332])). 23.41/23.23 fof(f3332,plain,( 23.41/23.23 ( ! [X24,X23] : (~sP1511(X24) | ~r1(X23,X24) | sP1512(X23)) )), 23.41/23.23 inference(cnf_transformation,[],[f3332_D])). 23.41/23.23 fof(f3332_D,plain,( 23.41/23.23 ( ! [X23] : (( ! [X24] : (~sP1511(X24) | ~r1(X23,X24)) ) <=> ~sP1512(X23)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1512])])). 23.41/23.23 fof(f177098,plain,( 23.41/23.23 ~sP1512(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f164571,f3334])). 23.41/23.23 fof(f3334,plain,( 23.41/23.23 ( ! [X23,X22] : (~sP1512(X23) | ~r1(X22,X23) | sP1513(X22)) )), 23.41/23.23 inference(cnf_transformation,[],[f3334_D])). 23.41/23.23 fof(f3334_D,plain,( 23.41/23.23 ( ! [X22] : (( ! [X23] : (~sP1512(X23) | ~r1(X22,X23)) ) <=> ~sP1513(X22)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1513])])). 23.41/23.23 fof(f164571,plain,( 23.41/23.23 ~sP1513(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f152670,f3346])). 23.41/23.23 fof(f3346,plain,( 23.41/23.23 ( ! [X21,X22] : (~sP1513(X22) | ~r1(X21,X22) | sP1519(X21)) )), 23.41/23.23 inference(cnf_transformation,[],[f3346_D])). 23.41/23.23 fof(f3346_D,plain,( 23.41/23.23 ( ! [X21] : (( ! [X22] : (~sP1513(X22) | ~r1(X21,X22)) ) <=> ~sP1519(X21)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1519])])). 23.41/23.23 fof(f152670,plain,( 23.41/23.23 ~sP1519(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f141379,f3348])). 23.41/23.23 fof(f3348,plain,( 23.41/23.23 ( ! [X21,X20] : (~sP1519(X21) | ~r1(X20,X21) | sP1520(X20)) )), 23.41/23.23 inference(cnf_transformation,[],[f3348_D])). 23.41/23.23 fof(f3348_D,plain,( 23.41/23.23 ( ! [X20] : (( ! [X21] : (~sP1519(X21) | ~r1(X20,X21)) ) <=> ~sP1520(X20)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1520])])). 23.41/23.23 fof(f141379,plain,( 23.41/23.23 ~sP1520(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f130681,f3350])). 23.41/23.23 fof(f3350,plain,( 23.41/23.23 ( ! [X19,X20] : (~sP1520(X20) | ~r1(X19,X20) | sP1521(X19)) )), 23.41/23.23 inference(cnf_transformation,[],[f3350_D])). 23.41/23.23 fof(f3350_D,plain,( 23.41/23.23 ( ! [X19] : (( ! [X20] : (~sP1520(X20) | ~r1(X19,X20)) ) <=> ~sP1521(X19)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1521])])). 23.41/23.23 fof(f130681,plain,( 23.41/23.23 ~sP1521(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f120563,f3352])). 23.41/23.23 fof(f3352,plain,( 23.41/23.23 ( ! [X19,X18] : (~sP1521(X19) | ~r1(X18,X19) | sP1522(X18)) )), 23.41/23.23 inference(cnf_transformation,[],[f3352_D])). 23.41/23.23 fof(f3352_D,plain,( 23.41/23.23 ( ! [X18] : (( ! [X19] : (~sP1521(X19) | ~r1(X18,X19)) ) <=> ~sP1522(X18)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1522])])). 23.41/23.23 fof(f120563,plain,( 23.41/23.23 ~sP1522(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f110999,f3354])). 23.41/23.23 fof(f3354,plain,( 23.41/23.23 ( ! [X17,X18] : (~sP1522(X18) | ~r1(X17,X18) | sP1523(X17)) )), 23.41/23.23 inference(cnf_transformation,[],[f3354_D])). 23.41/23.23 fof(f3354_D,plain,( 23.41/23.23 ( ! [X17] : (( ! [X18] : (~sP1522(X18) | ~r1(X17,X18)) ) <=> ~sP1523(X17)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1523])])). 23.41/23.23 fof(f110999,plain,( 23.41/23.23 ~sP1523(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f101987,f3355])). 23.41/23.23 fof(f3355,plain,( 23.41/23.23 ( ! [X17,X16] : (~sP1523(X17) | ~sP1518(X16) | ~r1(X16,X17)) )), 23.41/23.23 inference(general_splitting,[],[f3353,f3354_D])). 23.41/23.23 fof(f3353,plain,( 23.41/23.23 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP1518(X16) | ~sP1522(X18)) )), 23.41/23.23 inference(general_splitting,[],[f3351,f3352_D])). 23.41/23.23 fof(f3351,plain,( 23.41/23.23 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1518(X16) | ~sP1521(X19)) )), 23.41/23.23 inference(general_splitting,[],[f3349,f3350_D])). 23.41/23.23 fof(f3349,plain,( 23.41/23.23 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1518(X16) | ~sP1520(X20)) )), 23.41/23.23 inference(general_splitting,[],[f3347,f3348_D])). 23.41/23.23 fof(f3347,plain,( 23.41/23.23 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1518(X16) | ~sP1519(X21)) )), 23.41/23.23 inference(general_splitting,[],[f3345,f3346_D])). 23.41/23.23 fof(f3345,plain,( 23.41/23.23 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1513(X22) | ~sP1518(X16)) )), 23.41/23.23 inference(general_splitting,[],[f3343,f3344_D])). 23.41/23.23 fof(f3344,plain,( 23.41/23.23 ( ! [X15,X16] : (sP1518(X16) | ~sP1517(X15) | ~r1(X15,X16)) )), 23.41/23.23 inference(cnf_transformation,[],[f3344_D])). 23.41/23.23 fof(f3344_D,plain,( 23.41/23.23 ( ! [X16] : (( ! [X15] : (~sP1517(X15) | ~r1(X15,X16)) ) <=> ~sP1518(X16)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1518])])). 23.41/23.23 fof(f3343,plain,( 23.41/23.23 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1513(X22) | ~sP1517(X15)) )), 23.41/23.23 inference(general_splitting,[],[f3341,f3342_D])). 23.41/23.23 fof(f3342,plain,( 23.41/23.23 ( ! [X14,X15] : (sP1517(X15) | ~sP1516(X14) | ~r1(X14,X15)) )), 23.41/23.23 inference(cnf_transformation,[],[f3342_D])). 23.41/23.23 fof(f3342_D,plain,( 23.41/23.23 ( ! [X15] : (( ! [X14] : (~sP1516(X14) | ~r1(X14,X15)) ) <=> ~sP1517(X15)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1517])])). 23.41/23.23 fof(f3341,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1513(X22) | ~sP1516(X14)) )), 23.41/23.23 inference(general_splitting,[],[f3339,f3340_D])). 23.41/23.23 fof(f3340,plain,( 23.41/23.23 ( ! [X14,X13] : (sP1516(X14) | ~sP1515(X13) | ~r1(X13,X14)) )), 23.41/23.23 inference(cnf_transformation,[],[f3340_D])). 23.41/23.23 fof(f3340_D,plain,( 23.41/23.23 ( ! [X14] : (( ! [X13] : (~sP1515(X13) | ~r1(X13,X14)) ) <=> ~sP1516(X14)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1516])])). 23.41/23.23 fof(f3339,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~sP1513(X22) | ~sP1515(X13)) )), 23.41/23.23 inference(general_splitting,[],[f3337,f3338_D])). 23.41/23.23 fof(f3338,plain,( 23.41/23.23 ( ! [X12,X13] : (sP1515(X13) | ~sP1514(X12) | ~r1(X12,X13)) )), 23.41/23.23 inference(cnf_transformation,[],[f3338_D])). 23.41/23.23 fof(f3338_D,plain,( 23.41/23.23 ( ! [X13] : (( ! [X12] : (~sP1514(X12) | ~r1(X12,X13)) ) <=> ~sP1515(X13)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1515])])). 23.41/23.23 fof(f3337,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~sP1513(X22) | ~sP1514(X12)) )), 23.41/23.23 inference(general_splitting,[],[f3335,f3336_D])). 23.41/23.23 fof(f3336,plain,( 23.41/23.23 ( ! [X12,X11] : (sP1514(X12) | ~sP1503(X11) | ~r1(X11,X12)) )), 23.41/23.23 inference(cnf_transformation,[],[f3336_D])). 23.41/23.23 fof(f3336_D,plain,( 23.41/23.23 ( ! [X12] : (( ! [X11] : (~sP1503(X11) | ~r1(X11,X12)) ) <=> ~sP1514(X12)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1514])])). 23.41/23.23 fof(f3335,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1513(X22)) )), 23.41/23.23 inference(general_splitting,[],[f3333,f3334_D])). 23.41/23.23 fof(f3333,plain,( 23.41/23.23 ( ! [X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1512(X23)) )), 23.41/23.23 inference(general_splitting,[],[f3331,f3332_D])). 23.41/23.23 fof(f3331,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1511(X24)) )), 23.41/23.23 inference(general_splitting,[],[f3329,f3330_D])). 23.41/23.23 fof(f3329,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1510(X25)) )), 23.41/23.23 inference(general_splitting,[],[f3327,f3328_D])). 23.41/23.23 fof(f3327,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1509(X26)) )), 23.41/23.23 inference(general_splitting,[],[f3325,f3326_D])). 23.41/23.23 fof(f3325,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1508(X27)) )), 23.41/23.23 inference(general_splitting,[],[f3323,f3324_D])). 23.41/23.23 fof(f3323,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1507(X28)) )), 23.41/23.23 inference(general_splitting,[],[f3321,f3322_D])). 23.41/23.23 fof(f3321,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1506(X29)) )), 23.41/23.23 inference(general_splitting,[],[f3319,f3320_D])). 23.41/23.23 fof(f3319,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1505(X30)) )), 23.41/23.23 inference(general_splitting,[],[f3317,f3318_D])). 23.41/23.23 fof(f3317,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1503(X11) | ~sP1504(X31)) )), 23.41/23.23 inference(general_splitting,[],[f3315,f3316_D])). 23.41/23.23 fof(f3315,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1495(X32) | ~sP1503(X11)) )), 23.41/23.23 inference(general_splitting,[],[f3313,f3314_D])). 23.41/23.23 fof(f3314,plain,( 23.41/23.23 ( ! [X10,X11] : (sP1503(X11) | ~sP1502(X10) | ~r1(X10,X11)) )), 23.41/23.23 inference(cnf_transformation,[],[f3314_D])). 23.41/23.23 fof(f3314_D,plain,( 23.41/23.23 ( ! [X11] : (( ! [X10] : (~sP1502(X10) | ~r1(X10,X11)) ) <=> ~sP1503(X11)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1503])])). 23.41/23.23 fof(f3313,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X10,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1495(X32) | ~sP1502(X10)) )), 23.41/23.23 inference(general_splitting,[],[f3311,f3312_D])). 23.41/23.23 fof(f3312,plain,( 23.41/23.23 ( ! [X10,X9] : (sP1502(X10) | ~sP1501(X9) | ~r1(X9,X10)) )), 23.41/23.23 inference(cnf_transformation,[],[f3312_D])). 23.41/23.23 fof(f3312_D,plain,( 23.41/23.23 ( ! [X10] : (( ! [X9] : (~sP1501(X9) | ~r1(X9,X10)) ) <=> ~sP1502(X10)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1502])])). 23.41/23.23 fof(f3311,plain,( 23.41/23.23 ( ! [X28,X24,X12,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP1495(X32) | ~sP1501(X9)) )), 23.41/23.23 inference(general_splitting,[],[f3309,f3310_D])). 23.41/23.23 fof(f3310,plain,( 23.41/23.23 ( ! [X8,X9] : (sP1501(X9) | ~sP1500(X8) | ~r1(X8,X9)) )), 23.41/23.23 inference(cnf_transformation,[],[f3310_D])). 23.41/23.23 fof(f3310_D,plain,( 23.41/23.23 ( ! [X9] : (( ! [X8] : (~sP1500(X8) | ~r1(X8,X9)) ) <=> ~sP1501(X9)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1501])])). 23.41/23.23 fof(f3309,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP1495(X32) | ~sP1500(X8)) )), 23.41/23.23 inference(general_splitting,[],[f3307,f3308_D])). 23.41/23.23 fof(f3308,plain,( 23.41/23.23 ( ! [X8,X7] : (sP1500(X8) | ~sP1499(X7) | ~r1(X7,X8)) )), 23.41/23.23 inference(cnf_transformation,[],[f3308_D])). 23.41/23.23 fof(f3308_D,plain,( 23.41/23.23 ( ! [X8] : (( ! [X7] : (~sP1499(X7) | ~r1(X7,X8)) ) <=> ~sP1500(X8)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1500])])). 23.41/23.23 fof(f3307,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1495(X32) | ~sP1499(X7)) )), 23.41/23.23 inference(general_splitting,[],[f3305,f3306_D])). 23.41/23.23 fof(f3306,plain,( 23.41/23.23 ( ! [X6,X7] : (sP1499(X7) | ~sP1498(X6) | ~r1(X6,X7)) )), 23.41/23.23 inference(cnf_transformation,[],[f3306_D])). 23.41/23.23 fof(f3306_D,plain,( 23.41/23.23 ( ! [X7] : (( ! [X6] : (~sP1498(X6) | ~r1(X6,X7)) ) <=> ~sP1499(X7)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1499])])). 23.41/23.23 fof(f3305,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1495(X32) | ~sP1498(X6)) )), 23.41/23.23 inference(general_splitting,[],[f3303,f3304_D])). 23.41/23.23 fof(f3304,plain,( 23.41/23.23 ( ! [X6,X5] : (sP1498(X6) | ~sP1497(X5) | ~r1(X5,X6)) )), 23.41/23.23 inference(cnf_transformation,[],[f3304_D])). 23.41/23.23 fof(f3304_D,plain,( 23.41/23.23 ( ! [X6] : (( ! [X5] : (~sP1497(X5) | ~r1(X5,X6)) ) <=> ~sP1498(X6)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1498])])). 23.41/23.23 fof(f3303,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1495(X32) | ~sP1497(X5)) )), 23.41/23.23 inference(general_splitting,[],[f3301,f3302_D])). 23.41/23.23 fof(f3302,plain,( 23.41/23.23 ( ! [X4,X5] : (sP1497(X5) | ~sP1496(X4) | ~r1(X4,X5)) )), 23.41/23.23 inference(cnf_transformation,[],[f3302_D])). 23.41/23.23 fof(f3302_D,plain,( 23.41/23.23 ( ! [X5] : (( ! [X4] : (~sP1496(X4) | ~r1(X4,X5)) ) <=> ~sP1497(X5)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1497])])). 23.41/23.23 fof(f3301,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1495(X32) | ~sP1496(X4)) )), 23.41/23.23 inference(general_splitting,[],[f3299,f3300_D])). 23.41/23.23 fof(f3300,plain,( 23.41/23.23 ( ! [X4,X3] : (sP1496(X4) | ~sP1488(X3) | ~r1(X3,X4)) )), 23.41/23.23 inference(cnf_transformation,[],[f3300_D])). 23.41/23.23 fof(f3300_D,plain,( 23.41/23.23 ( ! [X4] : (( ! [X3] : (~sP1488(X3) | ~r1(X3,X4)) ) <=> ~sP1496(X4)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1496])])). 23.41/23.23 fof(f3299,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1488(X3) | ~sP1495(X32)) )), 23.41/23.23 inference(general_splitting,[],[f3297,f3298_D])). 23.41/23.23 fof(f3297,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1488(X3) | ~sP1494(X33)) )), 23.41/23.23 inference(general_splitting,[],[f3295,f3296_D])). 23.41/23.23 fof(f3295,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1488(X3) | ~sP1493(X34)) )), 23.41/23.23 inference(general_splitting,[],[f3293,f3294_D])). 23.41/23.23 fof(f3293,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1488(X3) | ~sP1492(X35)) )), 23.41/23.23 inference(general_splitting,[],[f3291,f3292_D])). 23.41/23.23 fof(f3291,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1488(X3) | ~sP1491(X36)) )), 23.41/23.23 inference(general_splitting,[],[f3289,f3290_D])). 23.41/23.23 fof(f3289,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1488(X3) | ~sP1490(X37)) )), 23.41/23.23 inference(general_splitting,[],[f3287,f3288_D])). 23.41/23.23 fof(f3287,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X35,X36) | ~r1(X36,X37) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1488(X3) | ~sP1489(X38)) )), 23.41/23.23 inference(general_splitting,[],[f3285,f3286_D])). 23.41/23.23 fof(f3285,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X35,X36) | ~r1(X36,X37) | p35(X39) | p36(X39) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1488(X3)) )), 23.41/23.23 inference(general_splitting,[],[f3283,f3284_D])). 23.41/23.23 fof(f3284,plain,( 23.41/23.23 ( ! [X3,X1] : (sP1488(X3) | ~sP1487(X1) | ~r1(X1,X3)) )), 23.41/23.23 inference(cnf_transformation,[],[f3284_D])). 23.41/23.23 fof(f3284_D,plain,( 23.41/23.23 ( ! [X3] : (( ! [X1] : (~sP1487(X1) | ~r1(X1,X3)) ) <=> ~sP1488(X3)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1488])])). 23.41/23.23 fof(f3283,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X35,X36) | ~r1(X36,X37) | p35(X39) | p36(X39) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X1,X3) | ~sP1487(X1)) )), 23.41/23.23 inference(general_splitting,[],[f431,f3282_D])). 23.41/23.23 fof(f3282,plain,( 23.41/23.23 ( ! [X0,X1] : (sP1487(X1) | ~sP33(X0) | ~r1(X0,X1)) )), 23.41/23.23 inference(cnf_transformation,[],[f3282_D])). 23.41/23.23 fof(f3282_D,plain,( 23.41/23.23 ( ! [X1] : (( ! [X0] : (~sP33(X0) | ~r1(X0,X1)) ) <=> ~sP1487(X1)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1487])])). 23.41/23.23 fof(f431,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X0,X12,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X39,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X0,X1) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X35,X36) | ~r1(X36,X37) | p35(X39) | p36(X39) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X1,X3) | ~sP33(X0)) )), 23.41/23.23 inference(cnf_transformation,[],[f118])). 23.41/23.23 fof(f101987,plain,( 23.41/23.23 sP1518(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f93506,f3344])). 23.41/23.23 fof(f93506,plain,( 23.41/23.23 sP1517(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f85538,f3342])). 23.41/23.23 fof(f85538,plain,( 23.41/23.23 sP1516(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f78075,f3340])). 23.41/23.23 fof(f78075,plain,( 23.41/23.23 sP1515(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f71079,f3338])). 23.41/23.23 fof(f71079,plain,( 23.41/23.23 sP1514(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f64554,f3336])). 23.41/23.23 fof(f64554,plain,( 23.41/23.23 sP1503(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f56480,f3314])). 23.41/23.23 fof(f56480,plain,( 23.41/23.23 sP1502(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f49777,f3312])). 23.41/23.23 fof(f49777,plain,( 23.41/23.23 sP1501(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f44249,f3310])). 23.41/23.23 fof(f44249,plain,( 23.41/23.23 sP1500(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f39720,f3308])). 23.41/23.23 fof(f39720,plain,( 23.41/23.23 sP1499(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f35565,f3306])). 23.41/23.23 fof(f35565,plain,( 23.41/23.23 sP1498(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f31768,f3304])). 23.41/23.23 fof(f31768,plain,( 23.41/23.23 sP1497(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f28298,f3302])). 23.41/23.23 fof(f28298,plain,( 23.41/23.23 sP1496(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f25169,f3300])). 23.41/23.23 fof(f25169,plain,( 23.41/23.23 sP1488(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f22350,f3284])). 23.41/23.23 fof(f22350,plain,( 23.41/23.23 sP1487(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f19821,f3282])). 23.41/23.23 fof(f472324,plain,( 23.41/23.23 ~sP1525(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f448955,f3360])). 23.41/23.23 fof(f3360,plain,( 23.41/23.23 ( ! [X37,X36] : (~sP1525(X37) | ~r1(X36,X37) | sP1526(X36)) )), 23.41/23.23 inference(cnf_transformation,[],[f3360_D])). 23.41/23.23 fof(f3360_D,plain,( 23.41/23.23 ( ! [X36] : (( ! [X37] : (~sP1525(X37) | ~r1(X36,X37)) ) <=> ~sP1526(X36)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1526])])). 23.41/23.23 fof(f448955,plain,( 23.41/23.23 ~sP1526(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f425805,f3364])). 23.41/23.23 fof(f3364,plain,( 23.41/23.23 ( ! [X35,X36] : (~sP1526(X36) | ~r1(X35,X36) | sP1528(X35)) )), 23.41/23.23 inference(cnf_transformation,[],[f3364_D])). 23.41/23.23 fof(f3364_D,plain,( 23.41/23.23 ( ! [X35] : (( ! [X36] : (~sP1526(X36) | ~r1(X35,X36)) ) <=> ~sP1528(X35)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1528])])). 23.41/23.23 fof(f425805,plain,( 23.41/23.23 ~sP1528(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f402971,f3366])). 23.41/23.23 fof(f3366,plain,( 23.41/23.23 ( ! [X35,X34] : (~sP1528(X35) | ~r1(X34,X35) | sP1529(X34)) )), 23.41/23.23 inference(cnf_transformation,[],[f3366_D])). 23.41/23.23 fof(f3366_D,plain,( 23.41/23.23 ( ! [X34] : (( ! [X35] : (~sP1528(X35) | ~r1(X34,X35)) ) <=> ~sP1529(X34)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1529])])). 23.41/23.23 fof(f402971,plain,( 23.41/23.23 ~sP1529(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f378286,f3368])). 23.41/23.23 fof(f3368,plain,( 23.41/23.23 ( ! [X33,X34] : (~sP1529(X34) | ~r1(X33,X34) | sP1530(X33)) )), 23.41/23.23 inference(cnf_transformation,[],[f3368_D])). 23.41/23.23 fof(f3368_D,plain,( 23.41/23.23 ( ! [X33] : (( ! [X34] : (~sP1529(X34) | ~r1(X33,X34)) ) <=> ~sP1530(X33)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1530])])). 23.41/23.23 fof(f378286,plain,( 23.41/23.23 ~sP1530(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f342806,f3370])). 23.41/23.23 fof(f3370,plain,( 23.41/23.23 ( ! [X33,X32] : (~sP1530(X33) | ~r1(X32,X33) | sP1531(X32)) )), 23.41/23.23 inference(cnf_transformation,[],[f3370_D])). 23.41/23.23 fof(f3370_D,plain,( 23.41/23.23 ( ! [X32] : (( ! [X33] : (~sP1530(X33) | ~r1(X32,X33)) ) <=> ~sP1531(X32)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1531])])). 23.41/23.23 fof(f342806,plain,( 23.41/23.23 ~sP1531(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f320697,f3388])). 23.41/23.23 fof(f3388,plain,( 23.41/23.23 ( ! [X31,X32] : (~sP1531(X32) | ~r1(X31,X32) | sP1540(X31)) )), 23.41/23.23 inference(cnf_transformation,[],[f3388_D])). 23.41/23.23 fof(f3388_D,plain,( 23.41/23.23 ( ! [X31] : (( ! [X32] : (~sP1531(X32) | ~r1(X31,X32)) ) <=> ~sP1540(X31)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1540])])). 23.41/23.23 fof(f320697,plain,( 23.41/23.23 ~sP1540(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f301806,f3390])). 23.41/23.23 fof(f3390,plain,( 23.41/23.23 ( ! [X30,X31] : (~sP1540(X31) | ~r1(X30,X31) | sP1541(X30)) )), 23.41/23.23 inference(cnf_transformation,[],[f3390_D])). 23.41/23.23 fof(f3390_D,plain,( 23.41/23.23 ( ! [X30] : (( ! [X31] : (~sP1540(X31) | ~r1(X30,X31)) ) <=> ~sP1541(X30)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1541])])). 23.41/23.23 fof(f301806,plain,( 23.41/23.23 ~sP1541(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f283685,f3392])). 23.41/23.23 fof(f3392,plain,( 23.41/23.23 ( ! [X30,X29] : (~sP1541(X30) | ~r1(X29,X30) | sP1542(X29)) )), 23.41/23.23 inference(cnf_transformation,[],[f3392_D])). 23.41/23.23 fof(f3392_D,plain,( 23.41/23.23 ( ! [X29] : (( ! [X30] : (~sP1541(X30) | ~r1(X29,X30)) ) <=> ~sP1542(X29)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1542])])). 23.41/23.23 fof(f283685,plain,( 23.41/23.23 ~sP1542(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f266326,f3394])). 23.41/23.23 fof(f3394,plain,( 23.41/23.23 ( ! [X28,X29] : (~sP1542(X29) | ~r1(X28,X29) | sP1543(X28)) )), 23.41/23.23 inference(cnf_transformation,[],[f3394_D])). 23.41/23.23 fof(f3394_D,plain,( 23.41/23.23 ( ! [X28] : (( ! [X29] : (~sP1542(X29) | ~r1(X28,X29)) ) <=> ~sP1543(X28)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1543])])). 23.41/23.23 fof(f266326,plain,( 23.41/23.23 ~sP1543(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f249698,f3396])). 23.41/23.23 fof(f3396,plain,( 23.41/23.23 ( ! [X28,X27] : (~sP1543(X28) | ~r1(X27,X28) | sP1544(X27)) )), 23.41/23.23 inference(cnf_transformation,[],[f3396_D])). 23.41/23.23 fof(f3396_D,plain,( 23.41/23.23 ( ! [X27] : (( ! [X28] : (~sP1543(X28) | ~r1(X27,X28)) ) <=> ~sP1544(X27)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1544])])). 23.41/23.23 fof(f249698,plain,( 23.41/23.23 ~sP1544(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f233800,f3398])). 23.41/23.23 fof(f3398,plain,( 23.41/23.23 ( ! [X26,X27] : (~sP1544(X27) | ~r1(X26,X27) | sP1545(X26)) )), 23.41/23.23 inference(cnf_transformation,[],[f3398_D])). 23.41/23.23 fof(f3398_D,plain,( 23.41/23.23 ( ! [X26] : (( ! [X27] : (~sP1544(X27) | ~r1(X26,X27)) ) <=> ~sP1545(X26)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1545])])). 23.41/23.23 fof(f233800,plain,( 23.41/23.23 ~sP1545(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f218600,f3400])). 23.41/23.23 fof(f3400,plain,( 23.41/23.23 ( ! [X26,X25] : (~sP1545(X26) | ~r1(X25,X26) | sP1546(X25)) )), 23.41/23.23 inference(cnf_transformation,[],[f3400_D])). 23.41/23.23 fof(f3400_D,plain,( 23.41/23.23 ( ! [X25] : (( ! [X26] : (~sP1545(X26) | ~r1(X25,X26)) ) <=> ~sP1546(X25)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1546])])). 23.41/23.23 fof(f218600,plain,( 23.41/23.23 ~sP1546(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f204095,f3402])). 23.41/23.23 fof(f3402,plain,( 23.41/23.23 ( ! [X24,X25] : (~sP1546(X25) | ~r1(X24,X25) | sP1547(X24)) )), 23.41/23.23 inference(cnf_transformation,[],[f3402_D])). 23.41/23.23 fof(f3402_D,plain,( 23.41/23.23 ( ! [X24] : (( ! [X25] : (~sP1546(X25) | ~r1(X24,X25)) ) <=> ~sP1547(X24)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1547])])). 23.41/23.23 fof(f204095,plain,( 23.41/23.23 ~sP1547(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f190263,f3404])). 23.41/23.23 fof(f3404,plain,( 23.41/23.23 ( ! [X24,X23] : (~sP1547(X24) | ~r1(X23,X24) | sP1548(X23)) )), 23.41/23.23 inference(cnf_transformation,[],[f3404_D])). 23.41/23.23 fof(f3404_D,plain,( 23.41/23.23 ( ! [X23] : (( ! [X24] : (~sP1547(X24) | ~r1(X23,X24)) ) <=> ~sP1548(X23)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1548])])). 23.41/23.23 fof(f190263,plain,( 23.41/23.23 ~sP1548(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f177092,f3406])). 23.41/23.23 fof(f3406,plain,( 23.41/23.23 ( ! [X23,X22] : (~sP1548(X23) | ~r1(X22,X23) | sP1549(X22)) )), 23.41/23.23 inference(cnf_transformation,[],[f3406_D])). 23.41/23.23 fof(f3406_D,plain,( 23.41/23.23 ( ! [X22] : (( ! [X23] : (~sP1548(X23) | ~r1(X22,X23)) ) <=> ~sP1549(X22)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1549])])). 23.41/23.23 fof(f177092,plain,( 23.41/23.23 ~sP1549(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f164565,f3418])). 23.41/23.23 fof(f3418,plain,( 23.41/23.23 ( ! [X21,X22] : (~sP1549(X22) | ~r1(X21,X22) | sP1555(X21)) )), 23.41/23.23 inference(cnf_transformation,[],[f3418_D])). 23.41/23.23 fof(f3418_D,plain,( 23.41/23.23 ( ! [X21] : (( ! [X22] : (~sP1549(X22) | ~r1(X21,X22)) ) <=> ~sP1555(X21)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1555])])). 23.41/23.23 fof(f164565,plain,( 23.41/23.23 ~sP1555(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f152664,f3420])). 23.41/23.23 fof(f3420,plain,( 23.41/23.23 ( ! [X21,X20] : (~sP1555(X21) | ~r1(X20,X21) | sP1556(X20)) )), 23.41/23.23 inference(cnf_transformation,[],[f3420_D])). 23.41/23.23 fof(f3420_D,plain,( 23.41/23.23 ( ! [X20] : (( ! [X21] : (~sP1555(X21) | ~r1(X20,X21)) ) <=> ~sP1556(X20)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1556])])). 23.41/23.23 fof(f152664,plain,( 23.41/23.23 ~sP1556(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f141373,f3422])). 23.41/23.23 fof(f3422,plain,( 23.41/23.23 ( ! [X19,X20] : (~sP1556(X20) | ~r1(X19,X20) | sP1557(X19)) )), 23.41/23.23 inference(cnf_transformation,[],[f3422_D])). 23.41/23.23 fof(f3422_D,plain,( 23.41/23.23 ( ! [X19] : (( ! [X20] : (~sP1556(X20) | ~r1(X19,X20)) ) <=> ~sP1557(X19)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1557])])). 23.41/23.23 fof(f141373,plain,( 23.41/23.23 ~sP1557(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f130675,f3424])). 23.41/23.23 fof(f3424,plain,( 23.41/23.23 ( ! [X19,X18] : (~sP1557(X19) | ~r1(X18,X19) | sP1558(X18)) )), 23.41/23.23 inference(cnf_transformation,[],[f3424_D])). 23.41/23.23 fof(f3424_D,plain,( 23.41/23.23 ( ! [X18] : (( ! [X19] : (~sP1557(X19) | ~r1(X18,X19)) ) <=> ~sP1558(X18)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1558])])). 23.41/23.23 fof(f130675,plain,( 23.41/23.23 ~sP1558(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f120557,f3426])). 23.41/23.23 fof(f3426,plain,( 23.41/23.23 ( ! [X17,X18] : (~sP1558(X18) | ~r1(X17,X18) | sP1559(X17)) )), 23.41/23.23 inference(cnf_transformation,[],[f3426_D])). 23.41/23.23 fof(f3426_D,plain,( 23.41/23.23 ( ! [X17] : (( ! [X18] : (~sP1558(X18) | ~r1(X17,X18)) ) <=> ~sP1559(X17)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1559])])). 23.41/23.23 fof(f120557,plain,( 23.41/23.23 ~sP1559(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f110993,f3427])). 23.41/23.23 fof(f3427,plain,( 23.41/23.23 ( ! [X17,X16] : (~sP1559(X17) | ~sP1554(X16) | ~r1(X16,X17)) )), 23.41/23.23 inference(general_splitting,[],[f3425,f3426_D])). 23.41/23.23 fof(f3425,plain,( 23.41/23.23 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP1554(X16) | ~sP1558(X18)) )), 23.41/23.23 inference(general_splitting,[],[f3423,f3424_D])). 23.41/23.23 fof(f3423,plain,( 23.41/23.23 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1554(X16) | ~sP1557(X19)) )), 23.41/23.23 inference(general_splitting,[],[f3421,f3422_D])). 23.41/23.23 fof(f3421,plain,( 23.41/23.23 ( ! [X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1554(X16) | ~sP1556(X20)) )), 23.41/23.23 inference(general_splitting,[],[f3419,f3420_D])). 23.41/23.23 fof(f3419,plain,( 23.41/23.23 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1554(X16) | ~sP1555(X21)) )), 23.41/23.23 inference(general_splitting,[],[f3417,f3418_D])). 23.41/23.23 fof(f3417,plain,( 23.41/23.23 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1549(X22) | ~sP1554(X16)) )), 23.41/23.23 inference(general_splitting,[],[f3415,f3416_D])). 23.41/23.23 fof(f3416,plain,( 23.41/23.23 ( ! [X15,X16] : (sP1554(X16) | ~sP1553(X15) | ~r1(X15,X16)) )), 23.41/23.23 inference(cnf_transformation,[],[f3416_D])). 23.41/23.23 fof(f3416_D,plain,( 23.41/23.23 ( ! [X16] : (( ! [X15] : (~sP1553(X15) | ~r1(X15,X16)) ) <=> ~sP1554(X16)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1554])])). 23.41/23.23 fof(f3415,plain,( 23.41/23.23 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP1549(X22) | ~sP1553(X15)) )), 23.41/23.23 inference(general_splitting,[],[f3413,f3414_D])). 23.41/23.23 fof(f3414,plain,( 23.41/23.23 ( ! [X14,X15] : (sP1553(X15) | ~sP1552(X14) | ~r1(X14,X15)) )), 23.41/23.23 inference(cnf_transformation,[],[f3414_D])). 23.41/23.23 fof(f3414_D,plain,( 23.41/23.23 ( ! [X15] : (( ! [X14] : (~sP1552(X14) | ~r1(X14,X15)) ) <=> ~sP1553(X15)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1553])])). 23.41/23.23 fof(f3413,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1549(X22) | ~sP1552(X14)) )), 23.41/23.23 inference(general_splitting,[],[f3411,f3412_D])). 23.41/23.23 fof(f3412,plain,( 23.41/23.23 ( ! [X14,X13] : (sP1552(X14) | ~sP1551(X13) | ~r1(X13,X14)) )), 23.41/23.23 inference(cnf_transformation,[],[f3412_D])). 23.41/23.23 fof(f3412_D,plain,( 23.41/23.23 ( ! [X14] : (( ! [X13] : (~sP1551(X13) | ~r1(X13,X14)) ) <=> ~sP1552(X14)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1552])])). 23.41/23.23 fof(f3411,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1549(X22) | ~sP1551(X13)) )), 23.41/23.23 inference(general_splitting,[],[f3409,f3410_D])). 23.41/23.23 fof(f3410,plain,( 23.41/23.23 ( ! [X12,X13] : (sP1551(X13) | ~sP1550(X12) | ~r1(X12,X13)) )), 23.41/23.23 inference(cnf_transformation,[],[f3410_D])). 23.41/23.23 fof(f3410_D,plain,( 23.41/23.23 ( ! [X13] : (( ! [X12] : (~sP1550(X12) | ~r1(X12,X13)) ) <=> ~sP1551(X13)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1551])])). 23.41/23.23 fof(f3409,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1549(X22) | ~sP1550(X12)) )), 23.41/23.23 inference(general_splitting,[],[f3407,f3408_D])). 23.41/23.23 fof(f3408,plain,( 23.41/23.23 ( ! [X12,X11] : (sP1550(X12) | ~sP1539(X11) | ~r1(X11,X12)) )), 23.41/23.23 inference(cnf_transformation,[],[f3408_D])). 23.41/23.23 fof(f3408_D,plain,( 23.41/23.23 ( ! [X12] : (( ! [X11] : (~sP1539(X11) | ~r1(X11,X12)) ) <=> ~sP1550(X12)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1550])])). 23.41/23.23 fof(f3407,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1549(X22)) )), 23.41/23.23 inference(general_splitting,[],[f3405,f3406_D])). 23.41/23.23 fof(f3405,plain,( 23.41/23.23 ( ! [X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1548(X23)) )), 23.41/23.23 inference(general_splitting,[],[f3403,f3404_D])). 23.41/23.23 fof(f3403,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1547(X24)) )), 23.41/23.23 inference(general_splitting,[],[f3401,f3402_D])). 23.41/23.23 fof(f3401,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1546(X25)) )), 23.41/23.23 inference(general_splitting,[],[f3399,f3400_D])). 23.41/23.23 fof(f3399,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1545(X26)) )), 23.41/23.23 inference(general_splitting,[],[f3397,f3398_D])). 23.41/23.23 fof(f3397,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1544(X27)) )), 23.41/23.23 inference(general_splitting,[],[f3395,f3396_D])). 23.41/23.23 fof(f3395,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1543(X28)) )), 23.41/23.23 inference(general_splitting,[],[f3393,f3394_D])). 23.41/23.23 fof(f3393,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1542(X29)) )), 23.41/23.23 inference(general_splitting,[],[f3391,f3392_D])). 23.41/23.23 fof(f3391,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1541(X30)) )), 23.41/23.23 inference(general_splitting,[],[f3389,f3390_D])). 23.41/23.23 fof(f3389,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1539(X11) | ~sP1540(X31)) )), 23.41/23.23 inference(general_splitting,[],[f3387,f3388_D])). 23.41/23.23 fof(f3387,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~sP1531(X32) | ~sP1539(X11)) )), 23.41/23.23 inference(general_splitting,[],[f3385,f3386_D])). 23.41/23.23 fof(f3386,plain,( 23.41/23.23 ( ! [X10,X11] : (sP1539(X11) | ~sP1538(X10) | ~r1(X10,X11)) )), 23.41/23.23 inference(cnf_transformation,[],[f3386_D])). 23.41/23.23 fof(f3386_D,plain,( 23.41/23.23 ( ! [X11] : (( ! [X10] : (~sP1538(X10) | ~r1(X10,X11)) ) <=> ~sP1539(X11)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1539])])). 23.41/23.23 fof(f3385,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X10,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP1531(X32) | ~sP1538(X10)) )), 23.41/23.23 inference(general_splitting,[],[f3383,f3384_D])). 23.41/23.23 fof(f3384,plain,( 23.41/23.23 ( ! [X10,X9] : (sP1538(X10) | ~sP1537(X9) | ~r1(X9,X10)) )), 23.41/23.23 inference(cnf_transformation,[],[f3384_D])). 23.41/23.23 fof(f3384_D,plain,( 23.41/23.23 ( ! [X10] : (( ! [X9] : (~sP1537(X9) | ~r1(X9,X10)) ) <=> ~sP1538(X10)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1538])])). 23.41/23.23 fof(f3383,plain,( 23.41/23.23 ( ! [X28,X24,X12,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP1531(X32) | ~sP1537(X9)) )), 23.41/23.23 inference(general_splitting,[],[f3381,f3382_D])). 23.41/23.23 fof(f3382,plain,( 23.41/23.23 ( ! [X8,X9] : (sP1537(X9) | ~sP1536(X8) | ~r1(X8,X9)) )), 23.41/23.23 inference(cnf_transformation,[],[f3382_D])). 23.41/23.23 fof(f3382_D,plain,( 23.41/23.23 ( ! [X9] : (( ! [X8] : (~sP1536(X8) | ~r1(X8,X9)) ) <=> ~sP1537(X9)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1537])])). 23.41/23.23 fof(f3381,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1531(X32) | ~sP1536(X8)) )), 23.41/23.23 inference(general_splitting,[],[f3379,f3380_D])). 23.41/23.23 fof(f3380,plain,( 23.41/23.23 ( ! [X8,X7] : (sP1536(X8) | ~sP1535(X7) | ~r1(X7,X8)) )), 23.41/23.23 inference(cnf_transformation,[],[f3380_D])). 23.41/23.23 fof(f3380_D,plain,( 23.41/23.23 ( ! [X8] : (( ! [X7] : (~sP1535(X7) | ~r1(X7,X8)) ) <=> ~sP1536(X8)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1536])])). 23.41/23.23 fof(f3379,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1531(X32) | ~sP1535(X7)) )), 23.41/23.23 inference(general_splitting,[],[f3377,f3378_D])). 23.41/23.23 fof(f3378,plain,( 23.41/23.23 ( ! [X6,X7] : (sP1535(X7) | ~sP1534(X6) | ~r1(X6,X7)) )), 23.41/23.23 inference(cnf_transformation,[],[f3378_D])). 23.41/23.23 fof(f3378_D,plain,( 23.41/23.23 ( ! [X7] : (( ! [X6] : (~sP1534(X6) | ~r1(X6,X7)) ) <=> ~sP1535(X7)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1535])])). 23.41/23.23 fof(f3377,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1531(X32) | ~sP1534(X6)) )), 23.41/23.23 inference(general_splitting,[],[f3375,f3376_D])). 23.41/23.23 fof(f3376,plain,( 23.41/23.23 ( ! [X6,X5] : (sP1534(X6) | ~sP1533(X5) | ~r1(X5,X6)) )), 23.41/23.23 inference(cnf_transformation,[],[f3376_D])). 23.41/23.23 fof(f3376_D,plain,( 23.41/23.23 ( ! [X6] : (( ! [X5] : (~sP1533(X5) | ~r1(X5,X6)) ) <=> ~sP1534(X6)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1534])])). 23.41/23.23 fof(f3375,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1531(X32) | ~sP1533(X5)) )), 23.41/23.23 inference(general_splitting,[],[f3373,f3374_D])). 23.41/23.23 fof(f3374,plain,( 23.41/23.23 ( ! [X4,X5] : (sP1533(X5) | ~sP1532(X4) | ~r1(X4,X5)) )), 23.41/23.23 inference(cnf_transformation,[],[f3374_D])). 23.41/23.23 fof(f3374_D,plain,( 23.41/23.23 ( ! [X5] : (( ! [X4] : (~sP1532(X4) | ~r1(X4,X5)) ) <=> ~sP1533(X5)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1533])])). 23.41/23.23 fof(f3373,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1531(X32) | ~sP1532(X4)) )), 23.41/23.23 inference(general_splitting,[],[f3371,f3372_D])). 23.41/23.23 fof(f3372,plain,( 23.41/23.23 ( ! [X4,X3] : (sP1532(X4) | ~sP1527(X3) | ~r1(X3,X4)) )), 23.41/23.23 inference(cnf_transformation,[],[f3372_D])). 23.41/23.23 fof(f3372_D,plain,( 23.41/23.23 ( ! [X4] : (( ! [X3] : (~sP1527(X3) | ~r1(X3,X4)) ) <=> ~sP1532(X4)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1532])])). 23.41/23.23 fof(f3371,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP1527(X3) | ~sP1531(X32)) )), 23.41/23.23 inference(general_splitting,[],[f3369,f3370_D])). 23.41/23.23 fof(f3369,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP1527(X3) | ~sP1530(X33)) )), 23.41/23.23 inference(general_splitting,[],[f3367,f3368_D])). 23.41/23.23 fof(f3367,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP1527(X3) | ~sP1529(X34)) )), 23.41/23.23 inference(general_splitting,[],[f3365,f3366_D])). 23.41/23.23 fof(f3365,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP1527(X3) | ~sP1528(X35)) )), 23.41/23.23 inference(general_splitting,[],[f3363,f3364_D])). 23.41/23.23 fof(f3363,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP1526(X36) | ~sP1527(X3)) )), 23.41/23.23 inference(general_splitting,[],[f3361,f3362_D])). 23.41/23.23 fof(f3362,plain,( 23.41/23.23 ( ! [X3,X1] : (sP1527(X3) | ~sP1524(X1) | ~r1(X1,X3)) )), 23.41/23.23 inference(cnf_transformation,[],[f3362_D])). 23.41/23.23 fof(f3362_D,plain,( 23.41/23.23 ( ! [X3] : (( ! [X1] : (~sP1524(X1) | ~r1(X1,X3)) ) <=> ~sP1527(X3)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1527])])). 23.41/23.23 fof(f3361,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X35,X36) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP1524(X1) | ~sP1526(X36)) )), 23.41/23.23 inference(general_splitting,[],[f3359,f3360_D])). 23.41/23.23 fof(f3359,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP1524(X1) | ~sP1525(X37)) )), 23.41/23.23 inference(general_splitting,[],[f3357,f3358_D])). 23.41/23.23 fof(f3357,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X12,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X37,X38) | ~p34(X38) | ~p35(X38) | ~r1(X35,X36) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~sP1524(X1)) )), 23.41/23.23 inference(general_splitting,[],[f437,f3356_D])). 23.41/23.23 fof(f3356,plain,( 23.41/23.23 ( ! [X0,X1] : (sP1524(X1) | ~sP32(X0) | ~r1(X0,X1)) )), 23.41/23.23 inference(cnf_transformation,[],[f3356_D])). 23.41/23.23 fof(f3356_D,plain,( 23.41/23.23 ( ! [X1] : (( ! [X0] : (~sP32(X0) | ~r1(X0,X1)) ) <=> ~sP1524(X1)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1524])])). 23.41/23.23 fof(f437,plain,( 23.41/23.23 ( ! [X28,X24,X37,X4,X33,X0,X12,X8,X21,X17,X29,X25,X38,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X1,X3) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X18,X19) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X36,X37) | ~r1(X37,X38) | ~p34(X38) | ~p35(X38) | ~r1(X35,X36) | ~r1(X33,X34) | ~r1(X30,X31) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X3,X4) | ~r1(X0,X1) | ~sP32(X0)) )), 23.41/23.23 inference(cnf_transformation,[],[f122])). 23.41/23.23 fof(f110993,plain,( 23.41/23.23 sP1554(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f101981,f3416])). 23.41/23.23 fof(f101981,plain,( 23.41/23.23 sP1553(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f93500,f3414])). 23.41/23.23 fof(f93500,plain,( 23.41/23.23 sP1552(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f85532,f3412])). 23.41/23.23 fof(f85532,plain,( 23.41/23.23 sP1551(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f78069,f3410])). 23.41/23.23 fof(f78069,plain,( 23.41/23.23 sP1550(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f71073,f3408])). 23.41/23.23 fof(f71073,plain,( 23.41/23.23 sP1539(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f64548,f3386])). 23.41/23.23 fof(f64548,plain,( 23.41/23.23 sP1538(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f56474,f3384])). 23.41/23.23 fof(f56474,plain,( 23.41/23.23 sP1537(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f49771,f3382])). 23.41/23.23 fof(f49771,plain,( 23.41/23.23 sP1536(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f44243,f3380])). 23.41/23.23 fof(f44243,plain,( 23.41/23.23 sP1535(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f39714,f3378])). 23.41/23.23 fof(f39714,plain,( 23.41/23.23 sP1534(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f35559,f3376])). 23.41/23.23 fof(f35559,plain,( 23.41/23.23 sP1533(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f31762,f3374])). 23.41/23.23 fof(f31762,plain,( 23.41/23.23 sP1532(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f28292,f3372])). 23.41/23.23 fof(f28292,plain,( 23.41/23.23 sP1527(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f25163,f3362])). 23.41/23.23 fof(f25163,plain,( 23.41/23.23 sP1524(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f22346,f3356])). 23.41/23.23 fof(f472321,plain,( 23.41/23.23 ~sP1634(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f448952,f3578])). 23.41/23.23 fof(f3578,plain,( 23.41/23.23 ( ! [X35,X34] : (~sP1634(X35) | ~r1(X34,X35) | sP1635(X34)) )), 23.41/23.23 inference(cnf_transformation,[],[f3578_D])). 23.41/23.23 fof(f3578_D,plain,( 23.41/23.23 ( ! [X34] : (( ! [X35] : (~sP1634(X35) | ~r1(X34,X35)) ) <=> ~sP1635(X34)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1635])])). 23.41/23.23 fof(f448952,plain,( 23.41/23.23 ~sP1635(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f425802,f3580])). 23.41/23.23 fof(f3580,plain,( 23.41/23.23 ( ! [X33,X34] : (~sP1635(X34) | ~r1(X33,X34) | sP1636(X33)) )), 23.41/23.23 inference(cnf_transformation,[],[f3580_D])). 23.41/23.23 fof(f3580_D,plain,( 23.41/23.23 ( ! [X33] : (( ! [X34] : (~sP1635(X34) | ~r1(X33,X34)) ) <=> ~sP1636(X33)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1636])])). 23.41/23.23 fof(f425802,plain,( 23.41/23.23 ~sP1636(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f402968,f3582])). 23.41/23.23 fof(f3582,plain,( 23.41/23.23 ( ! [X33,X32] : (~sP1636(X33) | ~r1(X32,X33) | sP1637(X32)) )), 23.41/23.23 inference(cnf_transformation,[],[f3582_D])). 23.41/23.23 fof(f3582_D,plain,( 23.41/23.23 ( ! [X32] : (( ! [X33] : (~sP1636(X33) | ~r1(X32,X33)) ) <=> ~sP1637(X32)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1637])])). 23.41/23.23 fof(f402968,plain,( 23.41/23.23 ~sP1637(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f378283,f3600])). 23.41/23.23 fof(f3600,plain,( 23.41/23.23 ( ! [X31,X32] : (~sP1637(X32) | ~r1(X31,X32) | sP1646(X31)) )), 23.41/23.23 inference(cnf_transformation,[],[f3600_D])). 23.41/23.23 fof(f3600_D,plain,( 23.41/23.23 ( ! [X31] : (( ! [X32] : (~sP1637(X32) | ~r1(X31,X32)) ) <=> ~sP1646(X31)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1646])])). 23.41/23.23 fof(f378283,plain,( 23.41/23.23 ~sP1646(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f342803,f3602])). 23.41/23.23 fof(f3602,plain,( 23.41/23.23 ( ! [X30,X31] : (~sP1646(X31) | ~r1(X30,X31) | sP1647(X30)) )), 23.41/23.23 inference(cnf_transformation,[],[f3602_D])). 23.41/23.23 fof(f3602_D,plain,( 23.41/23.23 ( ! [X30] : (( ! [X31] : (~sP1646(X31) | ~r1(X30,X31)) ) <=> ~sP1647(X30)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1647])])). 23.41/23.23 fof(f342803,plain,( 23.41/23.23 ~sP1647(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f320695,f3604])). 23.41/23.23 fof(f3604,plain,( 23.41/23.23 ( ! [X30,X29] : (~sP1647(X30) | ~r1(X29,X30) | sP1648(X29)) )), 23.41/23.23 inference(cnf_transformation,[],[f3604_D])). 23.41/23.23 fof(f3604_D,plain,( 23.41/23.23 ( ! [X29] : (( ! [X30] : (~sP1647(X30) | ~r1(X29,X30)) ) <=> ~sP1648(X29)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1648])])). 23.41/23.23 fof(f320695,plain,( 23.41/23.23 ~sP1648(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f301804,f3606])). 23.41/23.23 fof(f3606,plain,( 23.41/23.23 ( ! [X28,X29] : (~sP1648(X29) | ~r1(X28,X29) | sP1649(X28)) )), 23.41/23.23 inference(cnf_transformation,[],[f3606_D])). 23.41/23.23 fof(f3606_D,plain,( 23.41/23.23 ( ! [X28] : (( ! [X29] : (~sP1648(X29) | ~r1(X28,X29)) ) <=> ~sP1649(X28)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1649])])). 23.41/23.23 fof(f301804,plain,( 23.41/23.23 ~sP1649(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f283683,f3608])). 23.41/23.23 fof(f3608,plain,( 23.41/23.23 ( ! [X28,X27] : (~sP1649(X28) | ~r1(X27,X28) | sP1650(X27)) )), 23.41/23.23 inference(cnf_transformation,[],[f3608_D])). 23.41/23.23 fof(f3608_D,plain,( 23.41/23.23 ( ! [X27] : (( ! [X28] : (~sP1649(X28) | ~r1(X27,X28)) ) <=> ~sP1650(X27)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1650])])). 23.41/23.23 fof(f283683,plain,( 23.41/23.23 ~sP1650(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f266324,f3610])). 23.41/23.23 fof(f3610,plain,( 23.41/23.23 ( ! [X26,X27] : (~sP1650(X27) | ~r1(X26,X27) | sP1651(X26)) )), 23.41/23.23 inference(cnf_transformation,[],[f3610_D])). 23.41/23.23 fof(f3610_D,plain,( 23.41/23.23 ( ! [X26] : (( ! [X27] : (~sP1650(X27) | ~r1(X26,X27)) ) <=> ~sP1651(X26)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1651])])). 23.41/23.23 fof(f266324,plain,( 23.41/23.23 ~sP1651(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f249696,f3612])). 23.41/23.23 fof(f3612,plain,( 23.41/23.23 ( ! [X26,X25] : (~sP1651(X26) | ~r1(X25,X26) | sP1652(X25)) )), 23.41/23.23 inference(cnf_transformation,[],[f3612_D])). 23.41/23.23 fof(f3612_D,plain,( 23.41/23.23 ( ! [X25] : (( ! [X26] : (~sP1651(X26) | ~r1(X25,X26)) ) <=> ~sP1652(X25)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1652])])). 23.41/23.23 fof(f249696,plain,( 23.41/23.23 ~sP1652(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f233798,f3614])). 23.41/23.23 fof(f3614,plain,( 23.41/23.23 ( ! [X24,X25] : (~sP1652(X25) | ~r1(X24,X25) | sP1653(X24)) )), 23.41/23.23 inference(cnf_transformation,[],[f3614_D])). 23.41/23.23 fof(f3614_D,plain,( 23.41/23.23 ( ! [X24] : (( ! [X25] : (~sP1652(X25) | ~r1(X24,X25)) ) <=> ~sP1653(X24)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1653])])). 23.41/23.23 fof(f233798,plain,( 23.41/23.23 ~sP1653(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f218598,f3616])). 23.41/23.23 fof(f3616,plain,( 23.41/23.23 ( ! [X24,X23] : (~sP1653(X24) | ~r1(X23,X24) | sP1654(X23)) )), 23.41/23.23 inference(cnf_transformation,[],[f3616_D])). 23.41/23.23 fof(f3616_D,plain,( 23.41/23.23 ( ! [X23] : (( ! [X24] : (~sP1653(X24) | ~r1(X23,X24)) ) <=> ~sP1654(X23)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1654])])). 23.41/23.23 fof(f218598,plain,( 23.41/23.23 ~sP1654(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f204093,f3618])). 23.41/23.23 fof(f3618,plain,( 23.41/23.23 ( ! [X23,X22] : (~sP1654(X23) | ~r1(X22,X23) | sP1655(X22)) )), 23.41/23.23 inference(cnf_transformation,[],[f3618_D])). 23.41/23.23 fof(f3618_D,plain,( 23.41/23.23 ( ! [X22] : (( ! [X23] : (~sP1654(X23) | ~r1(X22,X23)) ) <=> ~sP1655(X22)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1655])])). 23.41/23.23 fof(f204093,plain,( 23.41/23.23 ~sP1655(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f190261,f3630])). 23.41/23.23 fof(f3630,plain,( 23.41/23.23 ( ! [X21,X22] : (~sP1655(X22) | ~r1(X21,X22) | sP1661(X21)) )), 23.41/23.23 inference(cnf_transformation,[],[f3630_D])). 23.41/23.23 fof(f3630_D,plain,( 23.41/23.23 ( ! [X21] : (( ! [X22] : (~sP1655(X22) | ~r1(X21,X22)) ) <=> ~sP1661(X21)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1661])])). 23.41/23.23 fof(f190261,plain,( 23.41/23.23 ~sP1661(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f177090,f3632])). 23.41/23.23 fof(f3632,plain,( 23.41/23.23 ( ! [X21,X20] : (~sP1661(X21) | ~r1(X20,X21) | sP1662(X20)) )), 23.41/23.23 inference(cnf_transformation,[],[f3632_D])). 23.41/23.23 fof(f3632_D,plain,( 23.41/23.23 ( ! [X20] : (( ! [X21] : (~sP1661(X21) | ~r1(X20,X21)) ) <=> ~sP1662(X20)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1662])])). 23.41/23.23 fof(f177090,plain,( 23.41/23.23 ~sP1662(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f164563,f3634])). 23.41/23.23 fof(f3634,plain,( 23.41/23.23 ( ! [X19,X20] : (~sP1662(X20) | ~r1(X19,X20) | sP1663(X19)) )), 23.41/23.23 inference(cnf_transformation,[],[f3634_D])). 23.41/23.23 fof(f3634_D,plain,( 23.41/23.23 ( ! [X19] : (( ! [X20] : (~sP1662(X20) | ~r1(X19,X20)) ) <=> ~sP1663(X19)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1663])])). 23.41/23.23 fof(f164563,plain,( 23.41/23.23 ~sP1663(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f152662,f3636])). 23.41/23.23 fof(f3636,plain,( 23.41/23.23 ( ! [X19,X18] : (~sP1663(X19) | ~r1(X18,X19) | sP1664(X18)) )), 23.41/23.23 inference(cnf_transformation,[],[f3636_D])). 23.41/23.23 fof(f3636_D,plain,( 23.41/23.23 ( ! [X18] : (( ! [X19] : (~sP1663(X19) | ~r1(X18,X19)) ) <=> ~sP1664(X18)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1664])])). 23.41/23.23 fof(f152662,plain,( 23.41/23.23 ~sP1664(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f141371,f3638])). 23.41/23.23 fof(f3638,plain,( 23.41/23.23 ( ! [X17,X18] : (~sP1664(X18) | ~r1(X17,X18) | sP1665(X17)) )), 23.41/23.23 inference(cnf_transformation,[],[f3638_D])). 23.41/23.23 fof(f3638_D,plain,( 23.41/23.23 ( ! [X17] : (( ! [X18] : (~sP1664(X18) | ~r1(X17,X18)) ) <=> ~sP1665(X17)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1665])])). 23.41/23.23 fof(f141371,plain,( 23.41/23.23 ~sP1665(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f130673,f3639])). 23.41/23.23 fof(f3639,plain,( 23.41/23.23 ( ! [X17,X16] : (~sP1665(X17) | ~sP1660(X16) | ~r1(X16,X17)) )), 23.41/23.23 inference(general_splitting,[],[f3637,f3638_D])). 23.41/23.23 fof(f3637,plain,( 23.41/23.23 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP1660(X16) | ~sP1664(X18)) )), 23.41/23.23 inference(general_splitting,[],[f3635,f3636_D])). 23.41/23.23 fof(f3635,plain,( 23.41/23.23 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1660(X16) | ~sP1663(X19)) )), 23.41/23.23 inference(general_splitting,[],[f3633,f3634_D])). 23.41/23.23 fof(f3633,plain,( 23.41/23.23 ( ! [X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1660(X16) | ~sP1662(X20)) )), 23.41/23.23 inference(general_splitting,[],[f3631,f3632_D])). 23.41/23.23 fof(f3631,plain,( 23.41/23.23 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1660(X16) | ~sP1661(X21)) )), 23.41/23.23 inference(general_splitting,[],[f3629,f3630_D])). 23.41/23.23 fof(f3629,plain,( 23.41/23.23 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1655(X22) | ~sP1660(X16)) )), 23.41/23.23 inference(general_splitting,[],[f3627,f3628_D])). 23.41/23.23 fof(f3628,plain,( 23.41/23.23 ( ! [X15,X16] : (sP1660(X16) | ~sP1659(X15) | ~r1(X15,X16)) )), 23.41/23.23 inference(cnf_transformation,[],[f3628_D])). 23.41/23.23 fof(f3628_D,plain,( 23.41/23.23 ( ! [X16] : (( ! [X15] : (~sP1659(X15) | ~r1(X15,X16)) ) <=> ~sP1660(X16)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1660])])). 23.41/23.23 fof(f3627,plain,( 23.41/23.23 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1655(X22) | ~sP1659(X15)) )), 23.41/23.23 inference(general_splitting,[],[f3625,f3626_D])). 23.41/23.23 fof(f3626,plain,( 23.41/23.23 ( ! [X14,X15] : (sP1659(X15) | ~sP1658(X14) | ~r1(X14,X15)) )), 23.41/23.23 inference(cnf_transformation,[],[f3626_D])). 23.41/23.23 fof(f3626_D,plain,( 23.41/23.23 ( ! [X15] : (( ! [X14] : (~sP1658(X14) | ~r1(X14,X15)) ) <=> ~sP1659(X15)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1659])])). 23.41/23.23 fof(f3625,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1655(X22) | ~sP1658(X14)) )), 23.41/23.23 inference(general_splitting,[],[f3623,f3624_D])). 23.41/23.23 fof(f3624,plain,( 23.41/23.23 ( ! [X14,X13] : (sP1658(X14) | ~sP1657(X13) | ~r1(X13,X14)) )), 23.41/23.23 inference(cnf_transformation,[],[f3624_D])). 23.41/23.23 fof(f3624_D,plain,( 23.41/23.23 ( ! [X14] : (( ! [X13] : (~sP1657(X13) | ~r1(X13,X14)) ) <=> ~sP1658(X14)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1658])])). 23.41/23.23 fof(f3623,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1655(X22) | ~sP1657(X13)) )), 23.41/23.23 inference(general_splitting,[],[f3621,f3622_D])). 23.41/23.23 fof(f3622,plain,( 23.41/23.23 ( ! [X12,X13] : (sP1657(X13) | ~sP1656(X12) | ~r1(X12,X13)) )), 23.41/23.23 inference(cnf_transformation,[],[f3622_D])). 23.41/23.23 fof(f3622_D,plain,( 23.41/23.23 ( ! [X13] : (( ! [X12] : (~sP1656(X12) | ~r1(X12,X13)) ) <=> ~sP1657(X13)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1657])])). 23.41/23.23 fof(f3621,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~sP1655(X22) | ~sP1656(X12)) )), 23.41/23.23 inference(general_splitting,[],[f3619,f3620_D])). 23.41/23.23 fof(f3620,plain,( 23.41/23.23 ( ! [X12,X11] : (sP1656(X12) | ~sP1645(X11) | ~r1(X11,X12)) )), 23.41/23.23 inference(cnf_transformation,[],[f3620_D])). 23.41/23.23 fof(f3620_D,plain,( 23.41/23.23 ( ! [X12] : (( ! [X11] : (~sP1645(X11) | ~r1(X11,X12)) ) <=> ~sP1656(X12)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1656])])). 23.41/23.23 fof(f3619,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1655(X22)) )), 23.41/23.23 inference(general_splitting,[],[f3617,f3618_D])). 23.41/23.23 fof(f3617,plain,( 23.41/23.23 ( ! [X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1654(X23)) )), 23.41/23.23 inference(general_splitting,[],[f3615,f3616_D])). 23.41/23.23 fof(f3615,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1653(X24)) )), 23.41/23.23 inference(general_splitting,[],[f3613,f3614_D])). 23.41/23.23 fof(f3613,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1652(X25)) )), 23.41/23.23 inference(general_splitting,[],[f3611,f3612_D])). 23.41/23.23 fof(f3611,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1651(X26)) )), 23.41/23.23 inference(general_splitting,[],[f3609,f3610_D])). 23.41/23.23 fof(f3609,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1650(X27)) )), 23.41/23.23 inference(general_splitting,[],[f3607,f3608_D])). 23.41/23.23 fof(f3607,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1649(X28)) )), 23.41/23.23 inference(general_splitting,[],[f3605,f3606_D])). 23.41/23.23 fof(f3605,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1648(X29)) )), 23.41/23.23 inference(general_splitting,[],[f3603,f3604_D])). 23.41/23.23 fof(f3603,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1647(X30)) )), 23.41/23.23 inference(general_splitting,[],[f3601,f3602_D])). 23.41/23.23 fof(f3601,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1645(X11) | ~sP1646(X31)) )), 23.41/23.23 inference(general_splitting,[],[f3599,f3600_D])). 23.41/23.23 fof(f3599,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~sP1637(X32) | ~sP1645(X11)) )), 23.41/23.23 inference(general_splitting,[],[f3597,f3598_D])). 23.41/23.23 fof(f3598,plain,( 23.41/23.23 ( ! [X10,X11] : (sP1645(X11) | ~sP1644(X10) | ~r1(X10,X11)) )), 23.41/23.23 inference(cnf_transformation,[],[f3598_D])). 23.41/23.23 fof(f3598_D,plain,( 23.41/23.23 ( ! [X11] : (( ! [X10] : (~sP1644(X10) | ~r1(X10,X11)) ) <=> ~sP1645(X11)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1645])])). 23.41/23.23 fof(f3597,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X10,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP1637(X32) | ~sP1644(X10)) )), 23.41/23.23 inference(general_splitting,[],[f3595,f3596_D])). 23.41/23.23 fof(f3596,plain,( 23.41/23.23 ( ! [X10,X9] : (sP1644(X10) | ~sP1643(X9) | ~r1(X9,X10)) )), 23.41/23.23 inference(cnf_transformation,[],[f3596_D])). 23.41/23.23 fof(f3596_D,plain,( 23.41/23.23 ( ! [X10] : (( ! [X9] : (~sP1643(X9) | ~r1(X9,X10)) ) <=> ~sP1644(X10)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1644])])). 23.41/23.23 fof(f3595,plain,( 23.41/23.23 ( ! [X28,X24,X12,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~sP1637(X32) | ~sP1643(X9)) )), 23.41/23.23 inference(general_splitting,[],[f3593,f3594_D])). 23.41/23.23 fof(f3594,plain,( 23.41/23.23 ( ! [X8,X9] : (sP1643(X9) | ~sP1642(X8) | ~r1(X8,X9)) )), 23.41/23.23 inference(cnf_transformation,[],[f3594_D])). 23.41/23.23 fof(f3594_D,plain,( 23.41/23.23 ( ! [X9] : (( ! [X8] : (~sP1642(X8) | ~r1(X8,X9)) ) <=> ~sP1643(X9)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1643])])). 23.41/23.23 fof(f3593,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1637(X32) | ~sP1642(X8)) )), 23.41/23.23 inference(general_splitting,[],[f3591,f3592_D])). 23.41/23.23 fof(f3592,plain,( 23.41/23.23 ( ! [X8,X7] : (sP1642(X8) | ~sP1641(X7) | ~r1(X7,X8)) )), 23.41/23.23 inference(cnf_transformation,[],[f3592_D])). 23.41/23.23 fof(f3592_D,plain,( 23.41/23.23 ( ! [X8] : (( ! [X7] : (~sP1641(X7) | ~r1(X7,X8)) ) <=> ~sP1642(X8)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1642])])). 23.41/23.23 fof(f3591,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP1637(X32) | ~sP1641(X7)) )), 23.41/23.23 inference(general_splitting,[],[f3589,f3590_D])). 23.41/23.23 fof(f3590,plain,( 23.41/23.23 ( ! [X6,X7] : (sP1641(X7) | ~sP1640(X6) | ~r1(X6,X7)) )), 23.41/23.23 inference(cnf_transformation,[],[f3590_D])). 23.41/23.23 fof(f3590_D,plain,( 23.41/23.23 ( ! [X7] : (( ! [X6] : (~sP1640(X6) | ~r1(X6,X7)) ) <=> ~sP1641(X7)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1641])])). 23.41/23.23 fof(f3589,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~sP1637(X32) | ~sP1640(X6)) )), 23.41/23.23 inference(general_splitting,[],[f3587,f3588_D])). 23.41/23.23 fof(f3588,plain,( 23.41/23.23 ( ! [X6,X5] : (sP1640(X6) | ~sP1639(X5) | ~r1(X5,X6)) )), 23.41/23.23 inference(cnf_transformation,[],[f3588_D])). 23.41/23.23 fof(f3588_D,plain,( 23.41/23.23 ( ! [X6] : (( ! [X5] : (~sP1639(X5) | ~r1(X5,X6)) ) <=> ~sP1640(X6)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1640])])). 23.41/23.23 fof(f3587,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1637(X32) | ~sP1639(X5)) )), 23.41/23.23 inference(general_splitting,[],[f3585,f3586_D])). 23.41/23.23 fof(f3586,plain,( 23.41/23.23 ( ! [X4,X5] : (sP1639(X5) | ~sP1638(X4) | ~r1(X4,X5)) )), 23.41/23.23 inference(cnf_transformation,[],[f3586_D])). 23.41/23.23 fof(f3586_D,plain,( 23.41/23.23 ( ! [X5] : (( ! [X4] : (~sP1638(X4) | ~r1(X4,X5)) ) <=> ~sP1639(X5)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1639])])). 23.41/23.23 fof(f3585,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1637(X32) | ~sP1638(X4)) )), 23.41/23.23 inference(general_splitting,[],[f3583,f3584_D])). 23.41/23.23 fof(f3584,plain,( 23.41/23.23 ( ! [X4,X3] : (sP1638(X4) | ~sP1633(X3) | ~r1(X3,X4)) )), 23.41/23.23 inference(cnf_transformation,[],[f3584_D])). 23.41/23.23 fof(f3584_D,plain,( 23.41/23.23 ( ! [X4] : (( ! [X3] : (~sP1633(X3) | ~r1(X3,X4)) ) <=> ~sP1638(X4)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1638])])). 23.41/23.23 fof(f3583,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1633(X3) | ~sP1637(X32)) )), 23.41/23.23 inference(general_splitting,[],[f3581,f3582_D])). 23.41/23.23 fof(f3581,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1633(X3) | ~sP1636(X33)) )), 23.41/23.23 inference(general_splitting,[],[f3579,f3580_D])). 23.41/23.23 fof(f3579,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1633(X3) | ~sP1635(X34)) )), 23.41/23.23 inference(general_splitting,[],[f3577,f3578_D])). 23.41/23.23 fof(f3577,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1633(X3) | ~sP1634(X35)) )), 23.41/23.23 inference(general_splitting,[],[f3575,f3576_D])). 23.41/23.23 fof(f3575,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | p33(X36) | p34(X36) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1633(X3)) )), 23.41/23.23 inference(general_splitting,[],[f3573,f3574_D])). 23.41/23.23 fof(f3574,plain,( 23.41/23.23 ( ! [X2,X3] : (sP1633(X3) | ~sP1632(X2) | ~r1(X2,X3)) )), 23.41/23.23 inference(cnf_transformation,[],[f3574_D])). 23.41/23.23 fof(f3574_D,plain,( 23.41/23.23 ( ! [X3] : (( ! [X2] : (~sP1632(X2) | ~r1(X2,X3)) ) <=> ~sP1633(X3)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1633])])). 23.41/23.23 fof(f3573,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | p33(X36) | p34(X36) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X2,X3) | ~sP1632(X2)) )), 23.41/23.23 inference(general_splitting,[],[f3571,f3572_D])). 23.41/23.23 fof(f3572,plain,( 23.41/23.23 ( ! [X2,X1] : (sP1632(X2) | ~sP1631(X1) | ~r1(X1,X2)) )), 23.41/23.23 inference(cnf_transformation,[],[f3572_D])). 23.41/23.23 fof(f3572_D,plain,( 23.41/23.23 ( ! [X2] : (( ! [X1] : (~sP1631(X1) | ~r1(X1,X2)) ) <=> ~sP1632(X2)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1632])])). 23.41/23.23 fof(f3571,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X1,X2) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | p33(X36) | p34(X36) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X2,X3) | ~sP1631(X1)) )), 23.41/23.23 inference(general_splitting,[],[f444,f3570_D])). 23.41/23.23 fof(f3570,plain,( 23.41/23.23 ( ! [X0,X1] : (sP1631(X1) | ~sP31(X0) | ~r1(X0,X1)) )), 23.41/23.23 inference(cnf_transformation,[],[f3570_D])). 23.41/23.23 fof(f3570_D,plain,( 23.41/23.23 ( ! [X1] : (( ! [X0] : (~sP31(X0) | ~r1(X0,X1)) ) <=> ~sP1631(X1)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1631])])). 23.41/23.23 fof(f444,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X0,X12,X8,X21,X17,X29,X25,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X35,X2,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X1,X2) | ~r1(X3,X4) | ~r1(X4,X5) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X33,X34) | ~r1(X34,X35) | p33(X36) | p34(X36) | ~r1(X35,X36) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X20,X21) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X2,X3) | ~r1(X0,X1) | ~sP31(X0)) )), 23.41/23.23 inference(cnf_transformation,[],[f126])). 23.41/23.23 fof(f130673,plain,( 23.41/23.23 sP1660(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f120555,f3628])). 23.41/23.23 fof(f120555,plain,( 23.41/23.23 sP1659(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f110991,f3626])). 23.41/23.23 fof(f110991,plain,( 23.41/23.23 sP1658(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f101979,f3624])). 23.41/23.23 fof(f101979,plain,( 23.41/23.23 sP1657(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f93498,f3622])). 23.41/23.23 fof(f93498,plain,( 23.41/23.23 sP1656(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f85530,f3620])). 23.41/23.23 fof(f85530,plain,( 23.41/23.23 sP1645(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f78067,f3598])). 23.41/23.23 fof(f78067,plain,( 23.41/23.23 sP1644(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f71071,f3596])). 23.41/23.23 fof(f71071,plain,( 23.41/23.23 sP1643(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f64546,f3594])). 23.41/23.23 fof(f64546,plain,( 23.41/23.23 sP1642(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f56472,f3592])). 23.41/23.23 fof(f56472,plain,( 23.41/23.23 sP1641(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f49769,f3590])). 23.41/23.23 fof(f49769,plain,( 23.41/23.23 sP1640(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f44241,f3588])). 23.41/23.23 fof(f44241,plain,( 23.41/23.23 sP1639(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f39712,f3586])). 23.41/23.23 fof(f39712,plain,( 23.41/23.23 sP1638(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f35557,f3584])). 23.41/23.23 fof(f35557,plain,( 23.41/23.23 sP1633(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f31760,f3574])). 23.41/23.23 fof(f31760,plain,( 23.41/23.23 sP1632(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f28290,f3572])). 23.41/23.23 fof(f28290,plain,( 23.41/23.23 sP1631(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f25161,f3570])). 23.41/23.23 fof(f472315,plain,( 23.41/23.23 ~sP1702(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f448946,f3714])). 23.41/23.23 fof(f3714,plain,( 23.41/23.23 ( ! [X35,X34] : (~sP1702(X35) | ~r1(X34,X35) | sP1703(X34)) )), 23.41/23.23 inference(cnf_transformation,[],[f3714_D])). 23.41/23.23 fof(f3714_D,plain,( 23.41/23.23 ( ! [X34] : (( ! [X35] : (~sP1702(X35) | ~r1(X34,X35)) ) <=> ~sP1703(X34)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1703])])). 23.41/23.23 fof(f448946,plain,( 23.41/23.23 ~sP1703(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f425796,f3716])). 23.41/23.23 fof(f3716,plain,( 23.41/23.23 ( ! [X33,X34] : (~sP1703(X34) | ~r1(X33,X34) | sP1704(X33)) )), 23.41/23.23 inference(cnf_transformation,[],[f3716_D])). 23.41/23.23 fof(f3716_D,plain,( 23.41/23.23 ( ! [X33] : (( ! [X34] : (~sP1703(X34) | ~r1(X33,X34)) ) <=> ~sP1704(X33)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1704])])). 23.41/23.23 fof(f425796,plain,( 23.41/23.23 ~sP1704(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f402962,f3718])). 23.41/23.23 fof(f3718,plain,( 23.41/23.23 ( ! [X33,X32] : (~sP1704(X33) | ~r1(X32,X33) | sP1705(X32)) )), 23.41/23.23 inference(cnf_transformation,[],[f3718_D])). 23.41/23.23 fof(f3718_D,plain,( 23.41/23.23 ( ! [X32] : (( ! [X33] : (~sP1704(X33) | ~r1(X32,X33)) ) <=> ~sP1705(X32)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1705])])). 23.41/23.23 fof(f402962,plain,( 23.41/23.23 ~sP1705(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f378277,f3736])). 23.41/23.23 fof(f3736,plain,( 23.41/23.23 ( ! [X31,X32] : (~sP1705(X32) | ~r1(X31,X32) | sP1714(X31)) )), 23.41/23.23 inference(cnf_transformation,[],[f3736_D])). 23.41/23.23 fof(f3736_D,plain,( 23.41/23.23 ( ! [X31] : (( ! [X32] : (~sP1705(X32) | ~r1(X31,X32)) ) <=> ~sP1714(X31)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1714])])). 23.41/23.23 fof(f378277,plain,( 23.41/23.23 ~sP1714(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f342797,f3738])). 23.41/23.23 fof(f3738,plain,( 23.41/23.23 ( ! [X30,X31] : (~sP1714(X31) | ~r1(X30,X31) | sP1715(X30)) )), 23.41/23.23 inference(cnf_transformation,[],[f3738_D])). 23.41/23.23 fof(f3738_D,plain,( 23.41/23.23 ( ! [X30] : (( ! [X31] : (~sP1714(X31) | ~r1(X30,X31)) ) <=> ~sP1715(X30)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1715])])). 23.41/23.23 fof(f342797,plain,( 23.41/23.23 ~sP1715(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f320691,f3740])). 23.41/23.23 fof(f3740,plain,( 23.41/23.23 ( ! [X30,X29] : (~sP1715(X30) | ~r1(X29,X30) | sP1716(X29)) )), 23.41/23.23 inference(cnf_transformation,[],[f3740_D])). 23.41/23.23 fof(f3740_D,plain,( 23.41/23.23 ( ! [X29] : (( ! [X30] : (~sP1715(X30) | ~r1(X29,X30)) ) <=> ~sP1716(X29)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1716])])). 23.41/23.23 fof(f320691,plain,( 23.41/23.23 ~sP1716(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f301800,f3742])). 23.41/23.23 fof(f3742,plain,( 23.41/23.23 ( ! [X28,X29] : (~sP1716(X29) | ~r1(X28,X29) | sP1717(X28)) )), 23.41/23.23 inference(cnf_transformation,[],[f3742_D])). 23.41/23.23 fof(f3742_D,plain,( 23.41/23.23 ( ! [X28] : (( ! [X29] : (~sP1716(X29) | ~r1(X28,X29)) ) <=> ~sP1717(X28)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1717])])). 23.41/23.23 fof(f301800,plain,( 23.41/23.23 ~sP1717(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f283679,f3744])). 23.41/23.23 fof(f3744,plain,( 23.41/23.23 ( ! [X28,X27] : (~sP1717(X28) | ~r1(X27,X28) | sP1718(X27)) )), 23.41/23.23 inference(cnf_transformation,[],[f3744_D])). 23.41/23.23 fof(f3744_D,plain,( 23.41/23.23 ( ! [X27] : (( ! [X28] : (~sP1717(X28) | ~r1(X27,X28)) ) <=> ~sP1718(X27)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1718])])). 23.41/23.23 fof(f283679,plain,( 23.41/23.23 ~sP1718(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f266320,f3746])). 23.41/23.23 fof(f3746,plain,( 23.41/23.23 ( ! [X26,X27] : (~sP1718(X27) | ~r1(X26,X27) | sP1719(X26)) )), 23.41/23.23 inference(cnf_transformation,[],[f3746_D])). 23.41/23.23 fof(f3746_D,plain,( 23.41/23.23 ( ! [X26] : (( ! [X27] : (~sP1718(X27) | ~r1(X26,X27)) ) <=> ~sP1719(X26)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1719])])). 23.41/23.23 fof(f266320,plain,( 23.41/23.23 ~sP1719(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f249692,f3748])). 23.41/23.23 fof(f3748,plain,( 23.41/23.23 ( ! [X26,X25] : (~sP1719(X26) | ~r1(X25,X26) | sP1720(X25)) )), 23.41/23.23 inference(cnf_transformation,[],[f3748_D])). 23.41/23.23 fof(f3748_D,plain,( 23.41/23.23 ( ! [X25] : (( ! [X26] : (~sP1719(X26) | ~r1(X25,X26)) ) <=> ~sP1720(X25)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1720])])). 23.41/23.23 fof(f249692,plain,( 23.41/23.23 ~sP1720(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f233794,f3750])). 23.41/23.23 fof(f3750,plain,( 23.41/23.23 ( ! [X24,X25] : (~sP1720(X25) | ~r1(X24,X25) | sP1721(X24)) )), 23.41/23.23 inference(cnf_transformation,[],[f3750_D])). 23.41/23.23 fof(f3750_D,plain,( 23.41/23.23 ( ! [X24] : (( ! [X25] : (~sP1720(X25) | ~r1(X24,X25)) ) <=> ~sP1721(X24)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1721])])). 23.41/23.23 fof(f233794,plain,( 23.41/23.23 ~sP1721(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f218594,f3752])). 23.41/23.23 fof(f3752,plain,( 23.41/23.23 ( ! [X24,X23] : (~sP1721(X24) | ~r1(X23,X24) | sP1722(X23)) )), 23.41/23.23 inference(cnf_transformation,[],[f3752_D])). 23.41/23.23 fof(f3752_D,plain,( 23.41/23.23 ( ! [X23] : (( ! [X24] : (~sP1721(X24) | ~r1(X23,X24)) ) <=> ~sP1722(X23)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1722])])). 23.41/23.23 fof(f218594,plain,( 23.41/23.23 ~sP1722(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f204089,f3754])). 23.41/23.23 fof(f3754,plain,( 23.41/23.23 ( ! [X23,X22] : (~sP1722(X23) | ~r1(X22,X23) | sP1723(X22)) )), 23.41/23.23 inference(cnf_transformation,[],[f3754_D])). 23.41/23.23 fof(f3754_D,plain,( 23.41/23.23 ( ! [X22] : (( ! [X23] : (~sP1722(X23) | ~r1(X22,X23)) ) <=> ~sP1723(X22)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1723])])). 23.41/23.23 fof(f204089,plain,( 23.41/23.23 ~sP1723(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f190257,f3766])). 23.41/23.23 fof(f3766,plain,( 23.41/23.23 ( ! [X21,X22] : (~sP1723(X22) | ~r1(X21,X22) | sP1729(X21)) )), 23.41/23.23 inference(cnf_transformation,[],[f3766_D])). 23.41/23.23 fof(f3766_D,plain,( 23.41/23.23 ( ! [X21] : (( ! [X22] : (~sP1723(X22) | ~r1(X21,X22)) ) <=> ~sP1729(X21)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1729])])). 23.41/23.23 fof(f190257,plain,( 23.41/23.23 ~sP1729(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f177086,f3768])). 23.41/23.23 fof(f3768,plain,( 23.41/23.23 ( ! [X21,X20] : (~sP1729(X21) | ~r1(X20,X21) | sP1730(X20)) )), 23.41/23.23 inference(cnf_transformation,[],[f3768_D])). 23.41/23.23 fof(f3768_D,plain,( 23.41/23.23 ( ! [X20] : (( ! [X21] : (~sP1729(X21) | ~r1(X20,X21)) ) <=> ~sP1730(X20)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1730])])). 23.41/23.23 fof(f177086,plain,( 23.41/23.23 ~sP1730(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f164559,f3770])). 23.41/23.23 fof(f3770,plain,( 23.41/23.23 ( ! [X19,X20] : (~sP1730(X20) | ~r1(X19,X20) | sP1731(X19)) )), 23.41/23.23 inference(cnf_transformation,[],[f3770_D])). 23.41/23.23 fof(f3770_D,plain,( 23.41/23.23 ( ! [X19] : (( ! [X20] : (~sP1730(X20) | ~r1(X19,X20)) ) <=> ~sP1731(X19)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1731])])). 23.41/23.23 fof(f164559,plain,( 23.41/23.23 ~sP1731(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f152658,f3772])). 23.41/23.23 fof(f3772,plain,( 23.41/23.23 ( ! [X19,X18] : (~sP1731(X19) | ~r1(X18,X19) | sP1732(X18)) )), 23.41/23.23 inference(cnf_transformation,[],[f3772_D])). 23.41/23.23 fof(f3772_D,plain,( 23.41/23.23 ( ! [X18] : (( ! [X19] : (~sP1731(X19) | ~r1(X18,X19)) ) <=> ~sP1732(X18)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1732])])). 23.41/23.23 fof(f152658,plain,( 23.41/23.23 ~sP1732(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f141367,f3774])). 23.41/23.23 fof(f3774,plain,( 23.41/23.23 ( ! [X17,X18] : (~sP1732(X18) | ~r1(X17,X18) | sP1733(X17)) )), 23.41/23.23 inference(cnf_transformation,[],[f3774_D])). 23.41/23.23 fof(f3774_D,plain,( 23.41/23.23 ( ! [X17] : (( ! [X18] : (~sP1732(X18) | ~r1(X17,X18)) ) <=> ~sP1733(X17)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1733])])). 23.41/23.23 fof(f141367,plain,( 23.41/23.23 ~sP1733(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f130669,f3775])). 23.41/23.23 fof(f3775,plain,( 23.41/23.23 ( ! [X17,X16] : (~sP1733(X17) | ~sP1728(X16) | ~r1(X16,X17)) )), 23.41/23.23 inference(general_splitting,[],[f3773,f3774_D])). 23.41/23.23 fof(f3773,plain,( 23.41/23.23 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP1728(X16) | ~sP1732(X18)) )), 23.41/23.23 inference(general_splitting,[],[f3771,f3772_D])). 23.41/23.23 fof(f3771,plain,( 23.41/23.23 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~sP1728(X16) | ~sP1731(X19)) )), 23.41/23.23 inference(general_splitting,[],[f3769,f3770_D])). 23.41/23.23 fof(f3769,plain,( 23.41/23.23 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP1728(X16) | ~sP1730(X20)) )), 23.41/23.23 inference(general_splitting,[],[f3767,f3768_D])). 23.41/23.23 fof(f3767,plain,( 23.41/23.23 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP1728(X16) | ~sP1729(X21)) )), 23.41/23.23 inference(general_splitting,[],[f3765,f3766_D])). 23.41/23.23 fof(f3765,plain,( 23.41/23.23 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~sP1723(X22) | ~sP1728(X16)) )), 23.41/23.23 inference(general_splitting,[],[f3763,f3764_D])). 23.41/23.23 fof(f3764,plain,( 23.41/23.23 ( ! [X15,X16] : (sP1728(X16) | ~sP1727(X15) | ~r1(X15,X16)) )), 23.41/23.23 inference(cnf_transformation,[],[f3764_D])). 23.41/23.23 fof(f3764_D,plain,( 23.41/23.23 ( ! [X16] : (( ! [X15] : (~sP1727(X15) | ~r1(X15,X16)) ) <=> ~sP1728(X16)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1728])])). 23.41/23.23 fof(f3763,plain,( 23.41/23.23 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~sP1723(X22) | ~sP1727(X15)) )), 23.41/23.23 inference(general_splitting,[],[f3761,f3762_D])). 23.41/23.23 fof(f3762,plain,( 23.41/23.23 ( ! [X14,X15] : (sP1727(X15) | ~sP1726(X14) | ~r1(X14,X15)) )), 23.41/23.23 inference(cnf_transformation,[],[f3762_D])). 23.41/23.23 fof(f3762_D,plain,( 23.41/23.23 ( ! [X15] : (( ! [X14] : (~sP1726(X14) | ~r1(X14,X15)) ) <=> ~sP1727(X15)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1727])])). 23.41/23.23 fof(f3761,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~sP1723(X22) | ~sP1726(X14)) )), 23.41/23.23 inference(general_splitting,[],[f3759,f3760_D])). 23.41/23.23 fof(f3760,plain,( 23.41/23.23 ( ! [X14,X13] : (sP1726(X14) | ~sP1725(X13) | ~r1(X13,X14)) )), 23.41/23.23 inference(cnf_transformation,[],[f3760_D])). 23.41/23.23 fof(f3760_D,plain,( 23.41/23.23 ( ! [X14] : (( ! [X13] : (~sP1725(X13) | ~r1(X13,X14)) ) <=> ~sP1726(X14)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1726])])). 23.41/23.23 fof(f3759,plain,( 23.41/23.23 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~sP1723(X22) | ~sP1725(X13)) )), 23.41/23.23 inference(general_splitting,[],[f3757,f3758_D])). 23.41/23.23 fof(f3758,plain,( 23.41/23.23 ( ! [X12,X13] : (sP1725(X13) | ~sP1724(X12) | ~r1(X12,X13)) )), 23.41/23.23 inference(cnf_transformation,[],[f3758_D])). 23.41/23.23 fof(f3758_D,plain,( 23.41/23.23 ( ! [X13] : (( ! [X12] : (~sP1724(X12) | ~r1(X12,X13)) ) <=> ~sP1725(X13)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1725])])). 23.41/23.23 fof(f3757,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~sP1723(X22) | ~sP1724(X12)) )), 23.41/23.23 inference(general_splitting,[],[f3755,f3756_D])). 23.41/23.23 fof(f3756,plain,( 23.41/23.23 ( ! [X12,X11] : (sP1724(X12) | ~sP1713(X11) | ~r1(X11,X12)) )), 23.41/23.23 inference(cnf_transformation,[],[f3756_D])). 23.41/23.23 fof(f3756_D,plain,( 23.41/23.23 ( ! [X12] : (( ! [X11] : (~sP1713(X11) | ~r1(X11,X12)) ) <=> ~sP1724(X12)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1724])])). 23.41/23.23 fof(f3755,plain,( 23.41/23.23 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1723(X22)) )), 23.41/23.23 inference(general_splitting,[],[f3753,f3754_D])). 23.41/23.23 fof(f3753,plain,( 23.41/23.23 ( ! [X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1722(X23)) )), 23.41/23.23 inference(general_splitting,[],[f3751,f3752_D])). 23.41/23.23 fof(f3751,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1721(X24)) )), 23.41/23.23 inference(general_splitting,[],[f3749,f3750_D])). 23.41/23.23 fof(f3749,plain,( 23.41/23.23 ( ! [X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1720(X25)) )), 23.41/23.23 inference(general_splitting,[],[f3747,f3748_D])). 23.41/23.23 fof(f3747,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1719(X26)) )), 23.41/23.23 inference(general_splitting,[],[f3745,f3746_D])). 23.41/23.23 fof(f3745,plain,( 23.41/23.23 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1718(X27)) )), 23.41/23.23 inference(general_splitting,[],[f3743,f3744_D])). 23.41/23.23 fof(f3743,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1717(X28)) )), 23.41/23.23 inference(general_splitting,[],[f3741,f3742_D])). 23.41/23.23 fof(f3741,plain,( 23.41/23.23 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1716(X29)) )), 23.41/23.23 inference(general_splitting,[],[f3739,f3740_D])). 23.41/23.23 fof(f3739,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1715(X30)) )), 23.41/23.23 inference(general_splitting,[],[f3737,f3738_D])). 23.41/23.23 fof(f3737,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1713(X11) | ~sP1714(X31)) )), 23.41/23.23 inference(general_splitting,[],[f3735,f3736_D])). 23.41/23.23 fof(f3735,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1705(X32) | ~sP1713(X11)) )), 23.41/23.23 inference(general_splitting,[],[f3733,f3734_D])). 23.41/23.23 fof(f3734,plain,( 23.41/23.23 ( ! [X10,X11] : (sP1713(X11) | ~sP1712(X10) | ~r1(X10,X11)) )), 23.41/23.23 inference(cnf_transformation,[],[f3734_D])). 23.41/23.23 fof(f3734_D,plain,( 23.41/23.23 ( ! [X11] : (( ! [X10] : (~sP1712(X10) | ~r1(X10,X11)) ) <=> ~sP1713(X11)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1713])])). 23.41/23.23 fof(f3733,plain,( 23.41/23.23 ( ! [X30,X28,X26,X24,X14,X12,X10,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1705(X32) | ~sP1712(X10)) )), 23.41/23.23 inference(general_splitting,[],[f3731,f3732_D])). 23.41/23.23 fof(f3732,plain,( 23.41/23.23 ( ! [X10,X9] : (sP1712(X10) | ~sP1711(X9) | ~r1(X9,X10)) )), 23.41/23.23 inference(cnf_transformation,[],[f3732_D])). 23.41/23.23 fof(f3732_D,plain,( 23.41/23.23 ( ! [X10] : (( ! [X9] : (~sP1711(X9) | ~r1(X9,X10)) ) <=> ~sP1712(X10)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1712])])). 23.41/23.23 fof(f3731,plain,( 23.41/23.23 ( ! [X28,X24,X12,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~sP1705(X32) | ~sP1711(X9)) )), 23.41/23.23 inference(general_splitting,[],[f3729,f3730_D])). 23.41/23.23 fof(f3730,plain,( 23.41/23.23 ( ! [X8,X9] : (sP1711(X9) | ~sP1710(X8) | ~r1(X8,X9)) )), 23.41/23.23 inference(cnf_transformation,[],[f3730_D])). 23.41/23.23 fof(f3730_D,plain,( 23.41/23.23 ( ! [X9] : (( ! [X8] : (~sP1710(X8) | ~r1(X8,X9)) ) <=> ~sP1711(X9)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1711])])). 23.41/23.23 fof(f3729,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~sP1705(X32) | ~sP1710(X8)) )), 23.41/23.23 inference(general_splitting,[],[f3727,f3728_D])). 23.41/23.23 fof(f3728,plain,( 23.41/23.23 ( ! [X8,X7] : (sP1710(X8) | ~sP1709(X7) | ~r1(X7,X8)) )), 23.41/23.23 inference(cnf_transformation,[],[f3728_D])). 23.41/23.23 fof(f3728_D,plain,( 23.41/23.23 ( ! [X8] : (( ! [X7] : (~sP1709(X7) | ~r1(X7,X8)) ) <=> ~sP1710(X8)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1710])])). 23.41/23.23 fof(f3727,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~sP1705(X32) | ~sP1709(X7)) )), 23.41/23.23 inference(general_splitting,[],[f3725,f3726_D])). 23.41/23.23 fof(f3726,plain,( 23.41/23.23 ( ! [X6,X7] : (sP1709(X7) | ~sP1708(X6) | ~r1(X6,X7)) )), 23.41/23.23 inference(cnf_transformation,[],[f3726_D])). 23.41/23.23 fof(f3726_D,plain,( 23.41/23.23 ( ! [X7] : (( ! [X6] : (~sP1708(X6) | ~r1(X6,X7)) ) <=> ~sP1709(X7)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1709])])). 23.41/23.23 fof(f3725,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~sP1705(X32) | ~sP1708(X6)) )), 23.41/23.23 inference(general_splitting,[],[f3723,f3724_D])). 23.41/23.23 fof(f3724,plain,( 23.41/23.23 ( ! [X6,X5] : (sP1708(X6) | ~sP1707(X5) | ~r1(X5,X6)) )), 23.41/23.23 inference(cnf_transformation,[],[f3724_D])). 23.41/23.23 fof(f3724_D,plain,( 23.41/23.23 ( ! [X6] : (( ! [X5] : (~sP1707(X5) | ~r1(X5,X6)) ) <=> ~sP1708(X6)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1708])])). 23.41/23.23 fof(f3723,plain,( 23.41/23.23 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~sP1705(X32) | ~sP1707(X5)) )), 23.41/23.23 inference(general_splitting,[],[f3721,f3722_D])). 23.41/23.23 fof(f3722,plain,( 23.41/23.23 ( ! [X4,X5] : (sP1707(X5) | ~sP1706(X4) | ~r1(X4,X5)) )), 23.41/23.23 inference(cnf_transformation,[],[f3722_D])). 23.41/23.23 fof(f3722_D,plain,( 23.41/23.23 ( ! [X5] : (( ! [X4] : (~sP1706(X4) | ~r1(X4,X5)) ) <=> ~sP1707(X5)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1707])])). 23.41/23.23 fof(f3721,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP1705(X32) | ~sP1706(X4)) )), 23.41/23.23 inference(general_splitting,[],[f3719,f3720_D])). 23.41/23.23 fof(f3720,plain,( 23.41/23.23 ( ! [X4,X3] : (sP1706(X4) | ~sP1701(X3) | ~r1(X3,X4)) )), 23.41/23.23 inference(cnf_transformation,[],[f3720_D])). 23.41/23.23 fof(f3720_D,plain,( 23.41/23.23 ( ! [X4] : (( ! [X3] : (~sP1701(X3) | ~r1(X3,X4)) ) <=> ~sP1706(X4)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1706])])). 23.41/23.23 fof(f3719,plain,( 23.41/23.23 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP1701(X3) | ~sP1705(X32)) )), 23.41/23.23 inference(general_splitting,[],[f3717,f3718_D])). 23.41/23.23 fof(f3717,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP1701(X3) | ~sP1704(X33)) )), 23.41/23.23 inference(general_splitting,[],[f3715,f3716_D])). 23.41/23.23 fof(f3715,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP1701(X3) | ~sP1703(X34)) )), 23.41/23.23 inference(general_splitting,[],[f3713,f3714_D])). 23.41/23.23 fof(f3713,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP1701(X3) | ~sP1702(X35)) )), 23.41/23.23 inference(general_splitting,[],[f3711,f3712_D])). 23.41/23.23 fof(f3711,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~p32(X36) | ~p33(X36) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP1701(X3)) )), 23.41/23.23 inference(general_splitting,[],[f3709,f3710_D])). 23.41/23.23 fof(f3710,plain,( 23.41/23.23 ( ! [X3,X1] : (sP1701(X3) | ~sP1700(X1) | ~r1(X1,X3)) )), 23.41/23.23 inference(cnf_transformation,[],[f3710_D])). 23.41/23.23 fof(f3710_D,plain,( 23.41/23.23 ( ! [X3] : (( ! [X1] : (~sP1700(X1) | ~r1(X1,X3)) ) <=> ~sP1701(X3)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1701])])). 23.41/23.23 fof(f3709,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~p32(X36) | ~p33(X36) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP1700(X1)) )), 23.41/23.23 inference(general_splitting,[],[f446,f3708_D])). 23.41/23.23 fof(f3708,plain,( 23.41/23.23 ( ! [X0,X1] : (sP1700(X1) | ~sP30(X0) | ~r1(X0,X1)) )), 23.41/23.23 inference(cnf_transformation,[],[f3708_D])). 23.41/23.23 fof(f3708_D,plain,( 23.41/23.23 ( ! [X1] : (( ! [X0] : (~sP30(X0) | ~r1(X0,X1)) ) <=> ~sP1700(X1)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1700])])). 23.41/23.23 fof(f446,plain,( 23.41/23.23 ( ! [X28,X24,X4,X33,X0,X12,X8,X21,X17,X29,X25,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X35,X14,X10,X23,X19,X31,X27,X7,X36,X3,X32,X15,X11,X20,X16] : (~r1(X1,X3) | ~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~p32(X36) | ~p33(X36) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X33,X34) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X15,X16) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X4,X5) | ~r1(X0,X1) | ~sP30(X0)) )), 23.41/23.23 inference(cnf_transformation,[],[f130])). 23.41/23.23 fof(f130669,plain,( 23.41/23.23 sP1728(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f120551,f3764])). 23.41/23.23 fof(f120551,plain,( 23.41/23.23 sP1727(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f110987,f3762])). 23.41/23.23 fof(f110987,plain,( 23.41/23.23 sP1726(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f101975,f3760])). 23.41/23.23 fof(f101975,plain,( 23.41/23.23 sP1725(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f93494,f3758])). 23.41/23.23 fof(f93494,plain,( 23.41/23.23 sP1724(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f85526,f3756])). 23.41/23.23 fof(f85526,plain,( 23.41/23.23 sP1713(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f78063,f3734])). 23.41/23.23 fof(f78063,plain,( 23.41/23.23 sP1712(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f71067,f3732])). 23.41/23.23 fof(f71067,plain,( 23.41/23.23 sP1711(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f64542,f3730])). 23.41/23.23 fof(f64542,plain,( 23.41/23.23 sP1710(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f56468,f3728])). 23.41/23.23 fof(f56468,plain,( 23.41/23.23 sP1709(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f49765,f3726])). 23.41/23.23 fof(f49765,plain,( 23.41/23.23 sP1708(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f44237,f3724])). 23.41/23.23 fof(f44237,plain,( 23.41/23.23 sP1707(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f39708,f3722])). 23.41/23.23 fof(f39708,plain,( 23.41/23.23 sP1706(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f35553,f3720])). 23.41/23.23 fof(f35553,plain,( 23.41/23.23 sP1701(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f31756,f3710])). 23.41/23.23 fof(f31756,plain,( 23.41/23.23 sP1700(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f28286,f3708])). 23.41/23.23 fof(f472309,plain,( 23.41/23.23 ~sP1768(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f448940,f3846])). 23.41/23.23 fof(f3846,plain,( 23.41/23.23 ( ! [X33,X32] : (~sP1768(X33) | ~r1(X32,X33) | sP1769(X32)) )), 23.41/23.23 inference(cnf_transformation,[],[f3846_D])). 23.41/23.23 fof(f3846_D,plain,( 23.41/23.23 ( ! [X32] : (( ! [X33] : (~sP1768(X33) | ~r1(X32,X33)) ) <=> ~sP1769(X32)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1769])])). 23.41/23.23 fof(f448940,plain,( 23.41/23.23 ~sP1769(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f425790,f3868])). 23.41/23.23 fof(f3868,plain,( 23.41/23.23 ( ! [X31,X32] : (~sP1769(X32) | ~r1(X31,X32) | sP1780(X31)) )), 23.41/23.23 inference(cnf_transformation,[],[f3868_D])). 23.41/23.23 fof(f3868_D,plain,( 23.41/23.23 ( ! [X31] : (( ! [X32] : (~sP1769(X32) | ~r1(X31,X32)) ) <=> ~sP1780(X31)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1780])])). 23.41/23.23 fof(f425790,plain,( 23.41/23.23 ~sP1780(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f402956,f3870])). 23.41/23.23 fof(f3870,plain,( 23.41/23.23 ( ! [X30,X31] : (~sP1780(X31) | ~r1(X30,X31) | sP1781(X30)) )), 23.41/23.23 inference(cnf_transformation,[],[f3870_D])). 23.41/23.23 fof(f3870_D,plain,( 23.41/23.23 ( ! [X30] : (( ! [X31] : (~sP1780(X31) | ~r1(X30,X31)) ) <=> ~sP1781(X30)) )), 23.41/23.23 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1781])])). 23.41/23.23 fof(f402956,plain,( 23.41/23.23 ~sP1781(sK101)), 23.41/23.23 inference(unit_resulting_resolution,[],[f715,f378271,f3872])). 23.41/23.23 fof(f3872,plain,( 23.41/23.23 ( ! [X30,X29] : (~sP1781(X30) | ~r1(X29,X30) | sP1782(X29)) )), 23.41/23.23 inference(cnf_transformation,[],[f3872_D])). 23.41/23.23 fof(f3872_D,plain,( 23.41/23.23 ( ! [X29] : (( ! [X30] : (~sP1781(X30) | ~r1(X29,X30)) ) <=> ~sP1782(X29)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1782])])). 23.41/23.24 fof(f378271,plain,( 23.41/23.24 ~sP1782(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f342791,f3874])). 23.41/23.24 fof(f3874,plain,( 23.41/23.24 ( ! [X28,X29] : (~sP1782(X29) | ~r1(X28,X29) | sP1783(X28)) )), 23.41/23.24 inference(cnf_transformation,[],[f3874_D])). 23.41/23.24 fof(f3874_D,plain,( 23.41/23.24 ( ! [X28] : (( ! [X29] : (~sP1782(X29) | ~r1(X28,X29)) ) <=> ~sP1783(X28)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1783])])). 23.41/23.24 fof(f342791,plain,( 23.41/23.24 ~sP1783(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f320687,f3876])). 23.41/23.24 fof(f3876,plain,( 23.41/23.24 ( ! [X28,X27] : (~sP1783(X28) | ~r1(X27,X28) | sP1784(X27)) )), 23.41/23.24 inference(cnf_transformation,[],[f3876_D])). 23.41/23.24 fof(f3876_D,plain,( 23.41/23.24 ( ! [X27] : (( ! [X28] : (~sP1783(X28) | ~r1(X27,X28)) ) <=> ~sP1784(X27)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1784])])). 23.41/23.24 fof(f320687,plain,( 23.41/23.24 ~sP1784(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f301796,f3878])). 23.41/23.24 fof(f3878,plain,( 23.41/23.24 ( ! [X26,X27] : (~sP1784(X27) | ~r1(X26,X27) | sP1785(X26)) )), 23.41/23.24 inference(cnf_transformation,[],[f3878_D])). 23.41/23.24 fof(f3878_D,plain,( 23.41/23.24 ( ! [X26] : (( ! [X27] : (~sP1784(X27) | ~r1(X26,X27)) ) <=> ~sP1785(X26)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1785])])). 23.41/23.24 fof(f301796,plain,( 23.41/23.24 ~sP1785(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f283675,f3880])). 23.41/23.24 fof(f3880,plain,( 23.41/23.24 ( ! [X26,X25] : (~sP1785(X26) | ~r1(X25,X26) | sP1786(X25)) )), 23.41/23.24 inference(cnf_transformation,[],[f3880_D])). 23.41/23.24 fof(f3880_D,plain,( 23.41/23.24 ( ! [X25] : (( ! [X26] : (~sP1785(X26) | ~r1(X25,X26)) ) <=> ~sP1786(X25)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1786])])). 23.41/23.24 fof(f283675,plain,( 23.41/23.24 ~sP1786(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f266316,f3882])). 23.41/23.24 fof(f3882,plain,( 23.41/23.24 ( ! [X24,X25] : (~sP1786(X25) | ~r1(X24,X25) | sP1787(X24)) )), 23.41/23.24 inference(cnf_transformation,[],[f3882_D])). 23.41/23.24 fof(f3882_D,plain,( 23.41/23.24 ( ! [X24] : (( ! [X25] : (~sP1786(X25) | ~r1(X24,X25)) ) <=> ~sP1787(X24)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1787])])). 23.41/23.24 fof(f266316,plain,( 23.41/23.24 ~sP1787(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f249688,f3884])). 23.41/23.24 fof(f3884,plain,( 23.41/23.24 ( ! [X24,X23] : (~sP1787(X24) | ~r1(X23,X24) | sP1788(X23)) )), 23.41/23.24 inference(cnf_transformation,[],[f3884_D])). 23.41/23.24 fof(f3884_D,plain,( 23.41/23.24 ( ! [X23] : (( ! [X24] : (~sP1787(X24) | ~r1(X23,X24)) ) <=> ~sP1788(X23)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1788])])). 23.41/23.24 fof(f249688,plain,( 23.41/23.24 ~sP1788(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f233790,f3886])). 23.41/23.24 fof(f3886,plain,( 23.41/23.24 ( ! [X23,X22] : (~sP1788(X23) | ~r1(X22,X23) | sP1789(X22)) )), 23.41/23.24 inference(cnf_transformation,[],[f3886_D])). 23.41/23.24 fof(f3886_D,plain,( 23.41/23.24 ( ! [X22] : (( ! [X23] : (~sP1788(X23) | ~r1(X22,X23)) ) <=> ~sP1789(X22)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1789])])). 23.41/23.24 fof(f233790,plain,( 23.41/23.24 ~sP1789(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f218590,f3898])). 23.41/23.24 fof(f3898,plain,( 23.41/23.24 ( ! [X21,X22] : (~sP1789(X22) | ~r1(X21,X22) | sP1795(X21)) )), 23.41/23.24 inference(cnf_transformation,[],[f3898_D])). 23.41/23.24 fof(f3898_D,plain,( 23.41/23.24 ( ! [X21] : (( ! [X22] : (~sP1789(X22) | ~r1(X21,X22)) ) <=> ~sP1795(X21)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1795])])). 23.41/23.24 fof(f218590,plain,( 23.41/23.24 ~sP1795(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f204085,f3900])). 23.41/23.24 fof(f3900,plain,( 23.41/23.24 ( ! [X21,X20] : (~sP1795(X21) | ~r1(X20,X21) | sP1796(X20)) )), 23.41/23.24 inference(cnf_transformation,[],[f3900_D])). 23.41/23.24 fof(f3900_D,plain,( 23.41/23.24 ( ! [X20] : (( ! [X21] : (~sP1795(X21) | ~r1(X20,X21)) ) <=> ~sP1796(X20)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1796])])). 23.41/23.24 fof(f204085,plain,( 23.41/23.24 ~sP1796(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f190253,f3902])). 23.41/23.24 fof(f3902,plain,( 23.41/23.24 ( ! [X19,X20] : (~sP1796(X20) | ~r1(X19,X20) | sP1797(X19)) )), 23.41/23.24 inference(cnf_transformation,[],[f3902_D])). 23.41/23.24 fof(f3902_D,plain,( 23.41/23.24 ( ! [X19] : (( ! [X20] : (~sP1796(X20) | ~r1(X19,X20)) ) <=> ~sP1797(X19)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1797])])). 23.41/23.24 fof(f190253,plain,( 23.41/23.24 ~sP1797(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f177082,f3904])). 23.41/23.24 fof(f3904,plain,( 23.41/23.24 ( ! [X19,X18] : (~sP1797(X19) | ~r1(X18,X19) | sP1798(X18)) )), 23.41/23.24 inference(cnf_transformation,[],[f3904_D])). 23.41/23.24 fof(f3904_D,plain,( 23.41/23.24 ( ! [X18] : (( ! [X19] : (~sP1797(X19) | ~r1(X18,X19)) ) <=> ~sP1798(X18)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1798])])). 23.41/23.24 fof(f177082,plain,( 23.41/23.24 ~sP1798(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f164555,f3906])). 23.41/23.24 fof(f3906,plain,( 23.41/23.24 ( ! [X17,X18] : (~sP1798(X18) | ~r1(X17,X18) | sP1799(X17)) )), 23.41/23.24 inference(cnf_transformation,[],[f3906_D])). 23.41/23.24 fof(f3906_D,plain,( 23.41/23.24 ( ! [X17] : (( ! [X18] : (~sP1798(X18) | ~r1(X17,X18)) ) <=> ~sP1799(X17)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1799])])). 23.41/23.24 fof(f164555,plain,( 23.41/23.24 ~sP1799(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f152654,f3907])). 23.41/23.24 fof(f3907,plain,( 23.41/23.24 ( ! [X17,X16] : (~sP1799(X17) | ~sP1794(X16) | ~r1(X16,X17)) )), 23.41/23.24 inference(general_splitting,[],[f3905,f3906_D])). 23.41/23.24 fof(f3905,plain,( 23.41/23.24 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP1794(X16) | ~sP1798(X18)) )), 23.41/23.24 inference(general_splitting,[],[f3903,f3904_D])). 23.41/23.24 fof(f3903,plain,( 23.41/23.24 ( ! [X19,X17,X18,X16] : (~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1794(X16) | ~sP1797(X19)) )), 23.41/23.24 inference(general_splitting,[],[f3901,f3902_D])). 23.41/23.24 fof(f3901,plain,( 23.41/23.24 ( ! [X19,X17,X20,X18,X16] : (~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1794(X16) | ~sP1796(X20)) )), 23.41/23.24 inference(general_splitting,[],[f3899,f3900_D])). 23.41/23.24 fof(f3899,plain,( 23.41/23.24 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X19,X20) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1794(X16) | ~sP1795(X21)) )), 23.41/23.24 inference(general_splitting,[],[f3897,f3898_D])). 23.41/23.24 fof(f3897,plain,( 23.41/23.24 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~sP1789(X22) | ~sP1794(X16)) )), 23.41/23.24 inference(general_splitting,[],[f3895,f3896_D])). 23.41/23.24 fof(f3896,plain,( 23.41/23.24 ( ! [X15,X16] : (sP1794(X16) | ~sP1793(X15) | ~r1(X15,X16)) )), 23.41/23.24 inference(cnf_transformation,[],[f3896_D])). 23.41/23.24 fof(f3896_D,plain,( 23.41/23.24 ( ! [X16] : (( ! [X15] : (~sP1793(X15) | ~r1(X15,X16)) ) <=> ~sP1794(X16)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1794])])). 23.41/23.24 fof(f3895,plain,( 23.41/23.24 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP1789(X22) | ~sP1793(X15)) )), 23.41/23.24 inference(general_splitting,[],[f3893,f3894_D])). 23.41/23.24 fof(f3894,plain,( 23.41/23.24 ( ! [X14,X15] : (sP1793(X15) | ~sP1792(X14) | ~r1(X14,X15)) )), 23.41/23.24 inference(cnf_transformation,[],[f3894_D])). 23.41/23.24 fof(f3894_D,plain,( 23.41/23.24 ( ! [X15] : (( ! [X14] : (~sP1792(X14) | ~r1(X14,X15)) ) <=> ~sP1793(X15)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1793])])). 23.41/23.24 fof(f3893,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~sP1789(X22) | ~sP1792(X14)) )), 23.41/23.24 inference(general_splitting,[],[f3891,f3892_D])). 23.41/23.24 fof(f3892,plain,( 23.41/23.24 ( ! [X14,X13] : (sP1792(X14) | ~sP1791(X13) | ~r1(X13,X14)) )), 23.41/23.24 inference(cnf_transformation,[],[f3892_D])). 23.41/23.24 fof(f3892_D,plain,( 23.41/23.24 ( ! [X14] : (( ! [X13] : (~sP1791(X13) | ~r1(X13,X14)) ) <=> ~sP1792(X14)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1792])])). 23.41/23.24 fof(f3891,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP1789(X22) | ~sP1791(X13)) )), 23.41/23.24 inference(general_splitting,[],[f3889,f3890_D])). 23.41/23.24 fof(f3890,plain,( 23.41/23.24 ( ! [X12,X13] : (sP1791(X13) | ~sP1790(X12) | ~r1(X12,X13)) )), 23.41/23.24 inference(cnf_transformation,[],[f3890_D])). 23.41/23.24 fof(f3890_D,plain,( 23.41/23.24 ( ! [X13] : (( ! [X12] : (~sP1790(X12) | ~r1(X12,X13)) ) <=> ~sP1791(X13)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1791])])). 23.41/23.24 fof(f3889,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP1789(X22) | ~sP1790(X12)) )), 23.41/23.24 inference(general_splitting,[],[f3887,f3888_D])). 23.41/23.24 fof(f3888,plain,( 23.41/23.24 ( ! [X12,X11] : (sP1790(X12) | ~sP1779(X11) | ~r1(X11,X12)) )), 23.41/23.24 inference(cnf_transformation,[],[f3888_D])). 23.41/23.24 fof(f3888_D,plain,( 23.41/23.24 ( ! [X12] : (( ! [X11] : (~sP1779(X11) | ~r1(X11,X12)) ) <=> ~sP1790(X12)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1790])])). 23.41/23.24 fof(f3887,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1789(X22)) )), 23.41/23.24 inference(general_splitting,[],[f3885,f3886_D])). 23.41/23.24 fof(f3885,plain,( 23.41/23.24 ( ! [X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1788(X23)) )), 23.41/23.24 inference(general_splitting,[],[f3883,f3884_D])). 23.41/23.24 fof(f3883,plain,( 23.41/23.24 ( ! [X24,X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1787(X24)) )), 23.41/23.24 inference(general_splitting,[],[f3881,f3882_D])). 23.41/23.24 fof(f3881,plain,( 23.41/23.24 ( ! [X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1786(X25)) )), 23.41/23.24 inference(general_splitting,[],[f3879,f3880_D])). 23.41/23.24 fof(f3879,plain,( 23.41/23.24 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1785(X26)) )), 23.41/23.24 inference(general_splitting,[],[f3877,f3878_D])). 23.41/23.24 fof(f3877,plain,( 23.41/23.24 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1784(X27)) )), 23.41/23.24 inference(general_splitting,[],[f3875,f3876_D])). 23.41/23.24 fof(f3875,plain,( 23.41/23.24 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1783(X28)) )), 23.41/23.24 inference(general_splitting,[],[f3873,f3874_D])). 23.41/23.24 fof(f3873,plain,( 23.41/23.24 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1782(X29)) )), 23.41/23.24 inference(general_splitting,[],[f3871,f3872_D])). 23.41/23.24 fof(f3871,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1781(X30)) )), 23.41/23.24 inference(general_splitting,[],[f3869,f3870_D])). 23.41/23.24 fof(f3869,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1779(X11) | ~sP1780(X31)) )), 23.41/23.24 inference(general_splitting,[],[f3867,f3868_D])). 23.41/23.24 fof(f3867,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1769(X32) | ~sP1779(X11)) )), 23.41/23.24 inference(general_splitting,[],[f3865,f3866_D])). 23.41/23.24 fof(f3866,plain,( 23.41/23.24 ( ! [X10,X11] : (sP1779(X11) | ~sP1778(X10) | ~r1(X10,X11)) )), 23.41/23.24 inference(cnf_transformation,[],[f3866_D])). 23.41/23.24 fof(f3866_D,plain,( 23.41/23.24 ( ! [X11] : (( ! [X10] : (~sP1778(X10) | ~r1(X10,X11)) ) <=> ~sP1779(X11)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1779])])). 23.41/23.24 fof(f3865,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X10,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1769(X32) | ~sP1778(X10)) )), 23.41/23.24 inference(general_splitting,[],[f3863,f3864_D])). 23.41/23.24 fof(f3864,plain,( 23.41/23.24 ( ! [X10,X9] : (sP1778(X10) | ~sP1777(X9) | ~r1(X9,X10)) )), 23.41/23.24 inference(cnf_transformation,[],[f3864_D])). 23.41/23.24 fof(f3864_D,plain,( 23.41/23.24 ( ! [X10] : (( ! [X9] : (~sP1777(X9) | ~r1(X9,X10)) ) <=> ~sP1778(X10)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1778])])). 23.41/23.24 fof(f3863,plain,( 23.41/23.24 ( ! [X28,X24,X12,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1769(X32) | ~sP1777(X9)) )), 23.41/23.24 inference(general_splitting,[],[f3861,f3862_D])). 23.41/23.24 fof(f3862,plain,( 23.41/23.24 ( ! [X8,X9] : (sP1777(X9) | ~sP1776(X8) | ~r1(X8,X9)) )), 23.41/23.24 inference(cnf_transformation,[],[f3862_D])). 23.41/23.24 fof(f3862_D,plain,( 23.41/23.24 ( ! [X9] : (( ! [X8] : (~sP1776(X8) | ~r1(X8,X9)) ) <=> ~sP1777(X9)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1777])])). 23.41/23.24 fof(f3861,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~sP1769(X32) | ~sP1776(X8)) )), 23.41/23.24 inference(general_splitting,[],[f3859,f3860_D])). 23.41/23.24 fof(f3860,plain,( 23.41/23.24 ( ! [X8,X7] : (sP1776(X8) | ~sP1775(X7) | ~r1(X7,X8)) )), 23.41/23.24 inference(cnf_transformation,[],[f3860_D])). 23.41/23.24 fof(f3860_D,plain,( 23.41/23.24 ( ! [X8] : (( ! [X7] : (~sP1775(X7) | ~r1(X7,X8)) ) <=> ~sP1776(X8)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1776])])). 23.41/23.24 fof(f3859,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1769(X32) | ~sP1775(X7)) )), 23.41/23.24 inference(general_splitting,[],[f3857,f3858_D])). 23.41/23.24 fof(f3858,plain,( 23.41/23.24 ( ! [X6,X7] : (sP1775(X7) | ~sP1774(X6) | ~r1(X6,X7)) )), 23.41/23.24 inference(cnf_transformation,[],[f3858_D])). 23.41/23.24 fof(f3858_D,plain,( 23.41/23.24 ( ! [X7] : (( ! [X6] : (~sP1774(X6) | ~r1(X6,X7)) ) <=> ~sP1775(X7)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1775])])). 23.41/23.24 fof(f3857,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~sP1769(X32) | ~sP1774(X6)) )), 23.41/23.24 inference(general_splitting,[],[f3855,f3856_D])). 23.41/23.24 fof(f3856,plain,( 23.41/23.24 ( ! [X6,X5] : (sP1774(X6) | ~sP1773(X5) | ~r1(X5,X6)) )), 23.41/23.24 inference(cnf_transformation,[],[f3856_D])). 23.41/23.24 fof(f3856_D,plain,( 23.41/23.24 ( ! [X6] : (( ! [X5] : (~sP1773(X5) | ~r1(X5,X6)) ) <=> ~sP1774(X6)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1774])])). 23.41/23.24 fof(f3855,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~sP1769(X32) | ~sP1773(X5)) )), 23.41/23.24 inference(general_splitting,[],[f3853,f3854_D])). 23.41/23.24 fof(f3854,plain,( 23.41/23.24 ( ! [X4,X5] : (sP1773(X5) | ~sP1772(X4) | ~r1(X4,X5)) )), 23.41/23.24 inference(cnf_transformation,[],[f3854_D])). 23.41/23.24 fof(f3854_D,plain,( 23.41/23.24 ( ! [X5] : (( ! [X4] : (~sP1772(X4) | ~r1(X4,X5)) ) <=> ~sP1773(X5)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1773])])). 23.41/23.24 fof(f3853,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1769(X32) | ~sP1772(X4)) )), 23.41/23.24 inference(general_splitting,[],[f3851,f3852_D])). 23.41/23.24 fof(f3852,plain,( 23.41/23.24 ( ! [X4,X3] : (sP1772(X4) | ~sP1771(X3) | ~r1(X3,X4)) )), 23.41/23.24 inference(cnf_transformation,[],[f3852_D])). 23.41/23.24 fof(f3852_D,plain,( 23.41/23.24 ( ! [X4] : (( ! [X3] : (~sP1771(X3) | ~r1(X3,X4)) ) <=> ~sP1772(X4)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1772])])). 23.41/23.24 fof(f3851,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1769(X32) | ~sP1771(X3)) )), 23.41/23.24 inference(general_splitting,[],[f3849,f3850_D])). 23.41/23.24 fof(f3850,plain,( 23.41/23.24 ( ! [X2,X3] : (sP1771(X3) | ~sP1770(X2) | ~r1(X2,X3)) )), 23.41/23.24 inference(cnf_transformation,[],[f3850_D])). 23.41/23.24 fof(f3850_D,plain,( 23.41/23.24 ( ! [X3] : (( ! [X2] : (~sP1770(X2) | ~r1(X2,X3)) ) <=> ~sP1771(X3)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1771])])). 23.41/23.24 fof(f3849,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP1769(X32) | ~sP1770(X2)) )), 23.41/23.24 inference(general_splitting,[],[f3847,f3848_D])). 23.41/23.24 fof(f3848,plain,( 23.41/23.24 ( ! [X2,X1] : (sP1770(X2) | ~sP1767(X1) | ~r1(X1,X2)) )), 23.41/23.24 inference(cnf_transformation,[],[f3848_D])). 23.41/23.24 fof(f3848_D,plain,( 23.41/23.24 ( ! [X2] : (( ! [X1] : (~sP1767(X1) | ~r1(X1,X2)) ) <=> ~sP1770(X2)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1770])])). 23.41/23.24 fof(f3847,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X1,X2) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP1767(X1) | ~sP1769(X32)) )), 23.41/23.24 inference(general_splitting,[],[f3845,f3846_D])). 23.41/23.24 fof(f3845,plain,( 23.41/23.24 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X1,X2) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP1767(X1) | ~sP1768(X33)) )), 23.41/23.24 inference(general_splitting,[],[f3843,f3844_D])). 23.41/23.24 fof(f3843,plain,( 23.41/23.24 ( ! [X28,X24,X4,X33,X12,X8,X21,X17,X29,X25,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X1,X2) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | p32(X34) | p31(X34) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP1767(X1)) )), 23.41/23.24 inference(general_splitting,[],[f454,f3842_D])). 23.41/23.24 fof(f3842,plain,( 23.41/23.24 ( ! [X0,X1] : (sP1767(X1) | ~sP29(X0) | ~r1(X0,X1)) )), 23.41/23.24 inference(cnf_transformation,[],[f3842_D])). 23.41/23.24 fof(f3842_D,plain,( 23.41/23.24 ( ! [X1] : (( ! [X0] : (~sP29(X0) | ~r1(X0,X1)) ) <=> ~sP1767(X1)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1767])])). 23.41/23.24 fof(f454,plain,( 23.41/23.24 ( ! [X28,X24,X4,X33,X0,X12,X8,X21,X17,X29,X25,X5,X34,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X0,X1) | ~r1(X1,X2) | ~r1(X3,X4) | ~r1(X6,X7) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X32,X33) | ~r1(X33,X34) | p32(X34) | p31(X34) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X16,X17) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X8,X9) | ~r1(X7,X8) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP29(X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f134])). 23.41/23.24 fof(f152654,plain,( 23.41/23.24 sP1794(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f141363,f3896])). 23.41/23.24 fof(f141363,plain,( 23.41/23.24 sP1793(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f130665,f3894])). 23.41/23.24 fof(f130665,plain,( 23.41/23.24 sP1792(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f120547,f3892])). 23.41/23.24 fof(f120547,plain,( 23.41/23.24 sP1791(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f110983,f3890])). 23.41/23.24 fof(f110983,plain,( 23.41/23.24 sP1790(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f101971,f3888])). 23.41/23.24 fof(f101971,plain,( 23.41/23.24 sP1779(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f93490,f3866])). 23.41/23.24 fof(f93490,plain,( 23.41/23.24 sP1778(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f85522,f3864])). 23.41/23.24 fof(f85522,plain,( 23.41/23.24 sP1777(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f78059,f3862])). 23.41/23.24 fof(f78059,plain,( 23.41/23.24 sP1776(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f71063,f3860])). 23.41/23.24 fof(f71063,plain,( 23.41/23.24 sP1775(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f64538,f3858])). 23.41/23.24 fof(f64538,plain,( 23.41/23.24 sP1774(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f56464,f3856])). 23.41/23.24 fof(f56464,plain,( 23.41/23.24 sP1773(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f49761,f3854])). 23.41/23.24 fof(f49761,plain,( 23.41/23.24 sP1772(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f44233,f3852])). 23.41/23.24 fof(f44233,plain,( 23.41/23.24 sP1771(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f39704,f3850])). 23.41/23.24 fof(f39704,plain,( 23.41/23.24 sP1770(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f35549,f3848])). 23.41/23.24 fof(f35549,plain,( 23.41/23.24 sP1767(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f31752,f3842])). 23.41/23.24 fof(f472300,plain,( 23.41/23.24 ~sP1800(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f448931,f3932])). 23.41/23.24 fof(f3932,plain,( 23.41/23.24 ( ! [X31,X32] : (~sP1800(X32) | ~r1(X31,X32) | sP1812(X31)) )), 23.41/23.24 inference(cnf_transformation,[],[f3932_D])). 23.41/23.24 fof(f3932_D,plain,( 23.41/23.24 ( ! [X31] : (( ! [X32] : (~sP1800(X32) | ~r1(X31,X32)) ) <=> ~sP1812(X31)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1812])])). 23.41/23.24 fof(f448931,plain,( 23.41/23.24 ~sP1812(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f425781,f3934])). 23.41/23.24 fof(f3934,plain,( 23.41/23.24 ( ! [X30,X31] : (~sP1812(X31) | ~r1(X30,X31) | sP1813(X30)) )), 23.41/23.24 inference(cnf_transformation,[],[f3934_D])). 23.41/23.24 fof(f3934_D,plain,( 23.41/23.24 ( ! [X30] : (( ! [X31] : (~sP1812(X31) | ~r1(X30,X31)) ) <=> ~sP1813(X30)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1813])])). 23.41/23.24 fof(f425781,plain,( 23.41/23.24 ~sP1813(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f402947,f3936])). 23.41/23.24 fof(f3936,plain,( 23.41/23.24 ( ! [X30,X29] : (~sP1813(X30) | ~r1(X29,X30) | sP1814(X29)) )), 23.41/23.24 inference(cnf_transformation,[],[f3936_D])). 23.41/23.24 fof(f3936_D,plain,( 23.41/23.24 ( ! [X29] : (( ! [X30] : (~sP1813(X30) | ~r1(X29,X30)) ) <=> ~sP1814(X29)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1814])])). 23.41/23.24 fof(f402947,plain,( 23.41/23.24 ~sP1814(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f378262,f3938])). 23.41/23.24 fof(f3938,plain,( 23.41/23.24 ( ! [X28,X29] : (~sP1814(X29) | ~r1(X28,X29) | sP1815(X28)) )), 23.41/23.24 inference(cnf_transformation,[],[f3938_D])). 23.41/23.24 fof(f3938_D,plain,( 23.41/23.24 ( ! [X28] : (( ! [X29] : (~sP1814(X29) | ~r1(X28,X29)) ) <=> ~sP1815(X28)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1815])])). 23.41/23.24 fof(f378262,plain,( 23.41/23.24 ~sP1815(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f342782,f3940])). 23.41/23.24 fof(f3940,plain,( 23.41/23.24 ( ! [X28,X27] : (~sP1815(X28) | ~r1(X27,X28) | sP1816(X27)) )), 23.41/23.24 inference(cnf_transformation,[],[f3940_D])). 23.41/23.24 fof(f3940_D,plain,( 23.41/23.24 ( ! [X27] : (( ! [X28] : (~sP1815(X28) | ~r1(X27,X28)) ) <=> ~sP1816(X27)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1816])])). 23.41/23.24 fof(f342782,plain,( 23.41/23.24 ~sP1816(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f320681,f3942])). 23.41/23.24 fof(f3942,plain,( 23.41/23.24 ( ! [X26,X27] : (~sP1816(X27) | ~r1(X26,X27) | sP1817(X26)) )), 23.41/23.24 inference(cnf_transformation,[],[f3942_D])). 23.41/23.24 fof(f3942_D,plain,( 23.41/23.24 ( ! [X26] : (( ! [X27] : (~sP1816(X27) | ~r1(X26,X27)) ) <=> ~sP1817(X26)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1817])])). 23.41/23.24 fof(f320681,plain,( 23.41/23.24 ~sP1817(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f301790,f3944])). 23.41/23.24 fof(f3944,plain,( 23.41/23.24 ( ! [X26,X25] : (~sP1817(X26) | ~r1(X25,X26) | sP1818(X25)) )), 23.41/23.24 inference(cnf_transformation,[],[f3944_D])). 23.41/23.24 fof(f3944_D,plain,( 23.41/23.24 ( ! [X25] : (( ! [X26] : (~sP1817(X26) | ~r1(X25,X26)) ) <=> ~sP1818(X25)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1818])])). 23.41/23.24 fof(f301790,plain,( 23.41/23.24 ~sP1818(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f283669,f3946])). 23.41/23.24 fof(f3946,plain,( 23.41/23.24 ( ! [X24,X25] : (~sP1818(X25) | ~r1(X24,X25) | sP1819(X24)) )), 23.41/23.24 inference(cnf_transformation,[],[f3946_D])). 23.41/23.24 fof(f3946_D,plain,( 23.41/23.24 ( ! [X24] : (( ! [X25] : (~sP1818(X25) | ~r1(X24,X25)) ) <=> ~sP1819(X24)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1819])])). 23.41/23.24 fof(f283669,plain,( 23.41/23.24 ~sP1819(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f266310,f3948])). 23.41/23.24 fof(f3948,plain,( 23.41/23.24 ( ! [X24,X23] : (~sP1819(X24) | ~r1(X23,X24) | sP1820(X23)) )), 23.41/23.24 inference(cnf_transformation,[],[f3948_D])). 23.41/23.24 fof(f3948_D,plain,( 23.41/23.24 ( ! [X23] : (( ! [X24] : (~sP1819(X24) | ~r1(X23,X24)) ) <=> ~sP1820(X23)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1820])])). 23.41/23.24 fof(f266310,plain,( 23.41/23.24 ~sP1820(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f249682,f3950])). 23.41/23.24 fof(f3950,plain,( 23.41/23.24 ( ! [X23,X22] : (~sP1820(X23) | ~r1(X22,X23) | sP1821(X22)) )), 23.41/23.24 inference(cnf_transformation,[],[f3950_D])). 23.41/23.24 fof(f3950_D,plain,( 23.41/23.24 ( ! [X22] : (( ! [X23] : (~sP1820(X23) | ~r1(X22,X23)) ) <=> ~sP1821(X22)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1821])])). 23.41/23.24 fof(f249682,plain,( 23.41/23.24 ~sP1821(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f233784,f3962])). 23.41/23.24 fof(f3962,plain,( 23.41/23.24 ( ! [X21,X22] : (~sP1821(X22) | ~r1(X21,X22) | sP1827(X21)) )), 23.41/23.24 inference(cnf_transformation,[],[f3962_D])). 23.41/23.24 fof(f3962_D,plain,( 23.41/23.24 ( ! [X21] : (( ! [X22] : (~sP1821(X22) | ~r1(X21,X22)) ) <=> ~sP1827(X21)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1827])])). 23.41/23.24 fof(f233784,plain,( 23.41/23.24 ~sP1827(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f218584,f3964])). 23.41/23.24 fof(f3964,plain,( 23.41/23.24 ( ! [X21,X20] : (~sP1827(X21) | ~r1(X20,X21) | sP1828(X20)) )), 23.41/23.24 inference(cnf_transformation,[],[f3964_D])). 23.41/23.24 fof(f3964_D,plain,( 23.41/23.24 ( ! [X20] : (( ! [X21] : (~sP1827(X21) | ~r1(X20,X21)) ) <=> ~sP1828(X20)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1828])])). 23.41/23.24 fof(f218584,plain,( 23.41/23.24 ~sP1828(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f204079,f3966])). 23.41/23.24 fof(f3966,plain,( 23.41/23.24 ( ! [X19,X20] : (~sP1828(X20) | ~r1(X19,X20) | sP1829(X19)) )), 23.41/23.24 inference(cnf_transformation,[],[f3966_D])). 23.41/23.24 fof(f3966_D,plain,( 23.41/23.24 ( ! [X19] : (( ! [X20] : (~sP1828(X20) | ~r1(X19,X20)) ) <=> ~sP1829(X19)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1829])])). 23.41/23.24 fof(f204079,plain,( 23.41/23.24 ~sP1829(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f190247,f3968])). 23.41/23.24 fof(f3968,plain,( 23.41/23.24 ( ! [X19,X18] : (~sP1829(X19) | ~r1(X18,X19) | sP1830(X18)) )), 23.41/23.24 inference(cnf_transformation,[],[f3968_D])). 23.41/23.24 fof(f3968_D,plain,( 23.41/23.24 ( ! [X18] : (( ! [X19] : (~sP1829(X19) | ~r1(X18,X19)) ) <=> ~sP1830(X18)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1830])])). 23.41/23.24 fof(f190247,plain,( 23.41/23.24 ~sP1830(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f177076,f3970])). 23.41/23.24 fof(f3970,plain,( 23.41/23.24 ( ! [X17,X18] : (~sP1830(X18) | ~r1(X17,X18) | sP1831(X17)) )), 23.41/23.24 inference(cnf_transformation,[],[f3970_D])). 23.41/23.24 fof(f3970_D,plain,( 23.41/23.24 ( ! [X17] : (( ! [X18] : (~sP1830(X18) | ~r1(X17,X18)) ) <=> ~sP1831(X17)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1831])])). 23.41/23.24 fof(f177076,plain,( 23.41/23.24 ~sP1831(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f164549,f3971])). 23.41/23.24 fof(f3971,plain,( 23.41/23.24 ( ! [X17,X16] : (~sP1831(X17) | ~sP1826(X16) | ~r1(X16,X17)) )), 23.41/23.24 inference(general_splitting,[],[f3969,f3970_D])). 23.41/23.24 fof(f3969,plain,( 23.41/23.24 ( ! [X17,X18,X16] : (~r1(X17,X18) | ~r1(X16,X17) | ~sP1826(X16) | ~sP1830(X18)) )), 23.41/23.24 inference(general_splitting,[],[f3967,f3968_D])). 23.41/23.24 fof(f3967,plain,( 23.41/23.24 ( ! [X19,X17,X18,X16] : (~r1(X17,X18) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP1826(X16) | ~sP1829(X19)) )), 23.41/23.24 inference(general_splitting,[],[f3965,f3966_D])). 23.41/23.24 fof(f3965,plain,( 23.41/23.24 ( ! [X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP1826(X16) | ~sP1828(X20)) )), 23.41/23.24 inference(general_splitting,[],[f3963,f3964_D])). 23.41/23.24 fof(f3963,plain,( 23.41/23.24 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X17,X18) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP1826(X16) | ~sP1827(X21)) )), 23.41/23.24 inference(general_splitting,[],[f3961,f3962_D])). 23.41/23.24 fof(f3961,plain,( 23.41/23.24 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP1821(X22) | ~sP1826(X16)) )), 23.41/23.24 inference(general_splitting,[],[f3959,f3960_D])). 23.41/23.24 fof(f3960,plain,( 23.41/23.24 ( ! [X15,X16] : (sP1826(X16) | ~sP1825(X15) | ~r1(X15,X16)) )), 23.41/23.24 inference(cnf_transformation,[],[f3960_D])). 23.41/23.24 fof(f3960_D,plain,( 23.41/23.24 ( ! [X16] : (( ! [X15] : (~sP1825(X15) | ~r1(X15,X16)) ) <=> ~sP1826(X16)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1826])])). 23.41/23.24 fof(f3959,plain,( 23.41/23.24 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP1821(X22) | ~sP1825(X15)) )), 23.41/23.24 inference(general_splitting,[],[f3957,f3958_D])). 23.41/23.24 fof(f3958,plain,( 23.41/23.24 ( ! [X14,X15] : (sP1825(X15) | ~sP1824(X14) | ~r1(X14,X15)) )), 23.41/23.24 inference(cnf_transformation,[],[f3958_D])). 23.41/23.24 fof(f3958_D,plain,( 23.41/23.24 ( ! [X15] : (( ! [X14] : (~sP1824(X14) | ~r1(X14,X15)) ) <=> ~sP1825(X15)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1825])])). 23.41/23.24 fof(f3957,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~sP1821(X22) | ~sP1824(X14)) )), 23.41/23.24 inference(general_splitting,[],[f3955,f3956_D])). 23.41/23.24 fof(f3956,plain,( 23.41/23.24 ( ! [X14,X13] : (sP1824(X14) | ~sP1823(X13) | ~r1(X13,X14)) )), 23.41/23.24 inference(cnf_transformation,[],[f3956_D])). 23.41/23.24 fof(f3956_D,plain,( 23.41/23.24 ( ! [X14] : (( ! [X13] : (~sP1823(X13) | ~r1(X13,X14)) ) <=> ~sP1824(X14)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1824])])). 23.41/23.24 fof(f3955,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~sP1821(X22) | ~sP1823(X13)) )), 23.41/23.24 inference(general_splitting,[],[f3953,f3954_D])). 23.41/23.24 fof(f3954,plain,( 23.41/23.24 ( ! [X12,X13] : (sP1823(X13) | ~sP1822(X12) | ~r1(X12,X13)) )), 23.41/23.24 inference(cnf_transformation,[],[f3954_D])). 23.41/23.24 fof(f3954_D,plain,( 23.41/23.24 ( ! [X13] : (( ! [X12] : (~sP1822(X12) | ~r1(X12,X13)) ) <=> ~sP1823(X13)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1823])])). 23.41/23.24 fof(f3953,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~sP1821(X22) | ~sP1822(X12)) )), 23.41/23.24 inference(general_splitting,[],[f3951,f3952_D])). 23.41/23.24 fof(f3952,plain,( 23.41/23.24 ( ! [X12,X11] : (sP1822(X12) | ~sP1811(X11) | ~r1(X11,X12)) )), 23.41/23.24 inference(cnf_transformation,[],[f3952_D])). 23.41/23.24 fof(f3952_D,plain,( 23.41/23.24 ( ! [X12] : (( ! [X11] : (~sP1811(X11) | ~r1(X11,X12)) ) <=> ~sP1822(X12)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1822])])). 23.41/23.24 fof(f3951,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1821(X22)) )), 23.41/23.24 inference(general_splitting,[],[f3949,f3950_D])). 23.41/23.24 fof(f3949,plain,( 23.41/23.24 ( ! [X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1820(X23)) )), 23.41/23.24 inference(general_splitting,[],[f3947,f3948_D])). 23.41/23.24 fof(f3947,plain,( 23.41/23.24 ( ! [X24,X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1819(X24)) )), 23.41/23.24 inference(general_splitting,[],[f3945,f3946_D])). 23.41/23.24 fof(f3945,plain,( 23.41/23.24 ( ! [X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1818(X25)) )), 23.41/23.24 inference(general_splitting,[],[f3943,f3944_D])). 23.41/23.24 fof(f3943,plain,( 23.41/23.24 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1817(X26)) )), 23.41/23.24 inference(general_splitting,[],[f3941,f3942_D])). 23.41/23.24 fof(f3941,plain,( 23.41/23.24 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1816(X27)) )), 23.41/23.24 inference(general_splitting,[],[f3939,f3940_D])). 23.41/23.24 fof(f3939,plain,( 23.41/23.24 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1815(X28)) )), 23.41/23.24 inference(general_splitting,[],[f3937,f3938_D])). 23.41/23.24 fof(f3937,plain,( 23.41/23.24 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1814(X29)) )), 23.41/23.24 inference(general_splitting,[],[f3935,f3936_D])). 23.41/23.24 fof(f3935,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1813(X30)) )), 23.41/23.24 inference(general_splitting,[],[f3933,f3934_D])). 23.41/23.24 fof(f3933,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1811(X11) | ~sP1812(X31)) )), 23.41/23.24 inference(general_splitting,[],[f3931,f3932_D])). 23.41/23.24 fof(f3931,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1800(X32) | ~sP1811(X11)) )), 23.41/23.24 inference(general_splitting,[],[f3929,f3930_D])). 23.41/23.24 fof(f3930,plain,( 23.41/23.24 ( ! [X10,X11] : (sP1811(X11) | ~sP1810(X10) | ~r1(X10,X11)) )), 23.41/23.24 inference(cnf_transformation,[],[f3930_D])). 23.41/23.24 fof(f3930_D,plain,( 23.41/23.24 ( ! [X11] : (( ! [X10] : (~sP1810(X10) | ~r1(X10,X11)) ) <=> ~sP1811(X11)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1811])])). 23.41/23.24 fof(f3929,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X10,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1800(X32) | ~sP1810(X10)) )), 23.41/23.24 inference(general_splitting,[],[f3927,f3928_D])). 23.41/23.24 fof(f3928,plain,( 23.41/23.24 ( ! [X10,X9] : (sP1810(X10) | ~sP1809(X9) | ~r1(X9,X10)) )), 23.41/23.24 inference(cnf_transformation,[],[f3928_D])). 23.41/23.24 fof(f3928_D,plain,( 23.41/23.24 ( ! [X10] : (( ! [X9] : (~sP1809(X9) | ~r1(X9,X10)) ) <=> ~sP1810(X10)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1810])])). 23.41/23.24 fof(f3927,plain,( 23.41/23.24 ( ! [X28,X24,X12,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP1800(X32) | ~sP1809(X9)) )), 23.41/23.24 inference(general_splitting,[],[f3925,f3926_D])). 23.41/23.24 fof(f3926,plain,( 23.41/23.24 ( ! [X8,X9] : (sP1809(X9) | ~sP1808(X8) | ~r1(X8,X9)) )), 23.41/23.24 inference(cnf_transformation,[],[f3926_D])). 23.41/23.24 fof(f3926_D,plain,( 23.41/23.24 ( ! [X9] : (( ! [X8] : (~sP1808(X8) | ~r1(X8,X9)) ) <=> ~sP1809(X9)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1809])])). 23.41/23.24 fof(f3925,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP1800(X32) | ~sP1808(X8)) )), 23.41/23.24 inference(general_splitting,[],[f3923,f3924_D])). 23.41/23.24 fof(f3924,plain,( 23.41/23.24 ( ! [X8,X7] : (sP1808(X8) | ~sP1807(X7) | ~r1(X7,X8)) )), 23.41/23.24 inference(cnf_transformation,[],[f3924_D])). 23.41/23.24 fof(f3924_D,plain,( 23.41/23.24 ( ! [X8] : (( ! [X7] : (~sP1807(X7) | ~r1(X7,X8)) ) <=> ~sP1808(X8)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1808])])). 23.41/23.24 fof(f3923,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP1800(X32) | ~sP1807(X7)) )), 23.41/23.24 inference(general_splitting,[],[f3921,f3922_D])). 23.41/23.24 fof(f3922,plain,( 23.41/23.24 ( ! [X6,X7] : (sP1807(X7) | ~sP1806(X6) | ~r1(X6,X7)) )), 23.41/23.24 inference(cnf_transformation,[],[f3922_D])). 23.41/23.24 fof(f3922_D,plain,( 23.41/23.24 ( ! [X7] : (( ! [X6] : (~sP1806(X6) | ~r1(X6,X7)) ) <=> ~sP1807(X7)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1807])])). 23.41/23.24 fof(f3921,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP1800(X32) | ~sP1806(X6)) )), 23.41/23.24 inference(general_splitting,[],[f3919,f3920_D])). 23.41/23.24 fof(f3920,plain,( 23.41/23.24 ( ! [X6,X5] : (sP1806(X6) | ~sP1805(X5) | ~r1(X5,X6)) )), 23.41/23.24 inference(cnf_transformation,[],[f3920_D])). 23.41/23.24 fof(f3920_D,plain,( 23.41/23.24 ( ! [X6] : (( ! [X5] : (~sP1805(X5) | ~r1(X5,X6)) ) <=> ~sP1806(X6)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1806])])). 23.41/23.24 fof(f3919,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~sP1800(X32) | ~sP1805(X5)) )), 23.41/23.24 inference(general_splitting,[],[f3917,f3918_D])). 23.41/23.24 fof(f3918,plain,( 23.41/23.24 ( ! [X4,X5] : (sP1805(X5) | ~sP1804(X4) | ~r1(X4,X5)) )), 23.41/23.24 inference(cnf_transformation,[],[f3918_D])). 23.41/23.24 fof(f3918_D,plain,( 23.41/23.24 ( ! [X5] : (( ! [X4] : (~sP1804(X4) | ~r1(X4,X5)) ) <=> ~sP1805(X5)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1805])])). 23.41/23.24 fof(f3917,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X4,X5) | ~sP1800(X32) | ~sP1804(X4)) )), 23.41/23.24 inference(general_splitting,[],[f3915,f3916_D])). 23.41/23.24 fof(f3916,plain,( 23.41/23.24 ( ! [X4,X3] : (sP1804(X4) | ~sP1803(X3) | ~r1(X3,X4)) )), 23.41/23.24 inference(cnf_transformation,[],[f3916_D])). 23.41/23.24 fof(f3916_D,plain,( 23.41/23.24 ( ! [X4] : (( ! [X3] : (~sP1803(X3) | ~r1(X3,X4)) ) <=> ~sP1804(X4)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1804])])). 23.41/23.24 fof(f3915,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X4,X5) | ~sP1800(X32) | ~sP1803(X3)) )), 23.41/23.24 inference(general_splitting,[],[f3913,f3914_D])). 23.41/23.24 fof(f3914,plain,( 23.41/23.24 ( ! [X2,X3] : (sP1803(X3) | ~sP1802(X2) | ~r1(X2,X3)) )), 23.41/23.24 inference(cnf_transformation,[],[f3914_D])). 23.41/23.24 fof(f3914_D,plain,( 23.41/23.24 ( ! [X3] : (( ! [X2] : (~sP1802(X2) | ~r1(X2,X3)) ) <=> ~sP1803(X3)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1803])])). 23.41/23.24 fof(f3913,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X4,X5) | ~r1(X2,X3) | ~sP1800(X32) | ~sP1802(X2)) )), 23.41/23.24 inference(general_splitting,[],[f3911,f3912_D])). 23.41/23.24 fof(f3912,plain,( 23.41/23.24 ( ! [X2,X1] : (sP1802(X2) | ~sP1801(X1) | ~r1(X1,X2)) )), 23.41/23.24 inference(cnf_transformation,[],[f3912_D])). 23.41/23.24 fof(f3912_D,plain,( 23.41/23.24 ( ! [X2] : (( ! [X1] : (~sP1801(X1) | ~r1(X1,X2)) ) <=> ~sP1802(X2)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1802])])). 23.41/23.24 fof(f3911,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X4,X5) | ~r1(X2,X3) | ~r1(X1,X2) | ~sP1800(X32) | ~sP1801(X1)) )), 23.41/23.24 inference(general_splitting,[],[f3909,f3910_D])). 23.41/23.24 fof(f3910,plain,( 23.41/23.24 ( ! [X0,X1] : (sP1801(X1) | ~sP28(X0) | ~r1(X0,X1)) )), 23.41/23.24 inference(cnf_transformation,[],[f3910_D])). 23.41/23.24 fof(f3910_D,plain,( 23.41/23.24 ( ! [X1] : (( ! [X0] : (~sP28(X0) | ~r1(X0,X1)) ) <=> ~sP1801(X1)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1801])])). 23.41/23.24 fof(f3909,plain,( 23.41/23.24 ( ! [X28,X24,X4,X0,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X4,X5) | ~r1(X2,X3) | ~r1(X1,X2) | ~r1(X0,X1) | ~sP28(X0) | ~sP1800(X32)) )), 23.41/23.24 inference(general_splitting,[],[f460,f3908_D])). 23.41/23.24 fof(f460,plain,( 23.41/23.24 ( ! [X28,X24,X4,X33,X0,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X28,X29) | ~r1(X30,X31) | ~p31(X33) | ~p30(X33) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X29,X30) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X16,X17) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X9,X10) | ~r1(X4,X5) | ~r1(X2,X3) | ~r1(X1,X2) | ~r1(X0,X1) | ~sP28(X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f138])). 23.41/23.24 fof(f164549,plain,( 23.41/23.24 sP1826(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f152648,f3960])). 23.41/23.24 fof(f152648,plain,( 23.41/23.24 sP1825(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f141357,f3958])). 23.41/23.24 fof(f141357,plain,( 23.41/23.24 sP1824(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f130659,f3956])). 23.41/23.24 fof(f130659,plain,( 23.41/23.24 sP1823(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f120541,f3954])). 23.41/23.24 fof(f120541,plain,( 23.41/23.24 sP1822(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f110977,f3952])). 23.41/23.24 fof(f110977,plain,( 23.41/23.24 sP1811(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f101965,f3930])). 23.41/23.24 fof(f101965,plain,( 23.41/23.24 sP1810(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f93484,f3928])). 23.41/23.24 fof(f93484,plain,( 23.41/23.24 sP1809(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f85516,f3926])). 23.41/23.24 fof(f85516,plain,( 23.41/23.24 sP1808(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f78053,f3924])). 23.41/23.24 fof(f78053,plain,( 23.41/23.24 sP1807(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f71057,f3922])). 23.41/23.24 fof(f71057,plain,( 23.41/23.24 sP1806(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f64532,f3920])). 23.41/23.24 fof(f64532,plain,( 23.41/23.24 sP1805(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f56458,f3918])). 23.41/23.24 fof(f56458,plain,( 23.41/23.24 sP1804(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f49755,f3916])). 23.41/23.24 fof(f49755,plain,( 23.41/23.24 sP1803(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f44227,f3914])). 23.41/23.24 fof(f44227,plain,( 23.41/23.24 sP1802(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f39698,f3912])). 23.41/23.24 fof(f39698,plain,( 23.41/23.24 sP1801(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f35541,f3910])). 23.41/23.24 fof(f472297,plain,( 23.41/23.24 ~sP1895(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f448928,f4120])). 23.41/23.24 fof(f4120,plain,( 23.41/23.24 ( ! [X31,X32] : (~sP1895(X32) | ~r1(X31,X32) | sP1906(X31)) )), 23.41/23.24 inference(cnf_transformation,[],[f4120_D])). 23.41/23.24 fof(f4120_D,plain,( 23.41/23.24 ( ! [X31] : (( ! [X32] : (~sP1895(X32) | ~r1(X31,X32)) ) <=> ~sP1906(X31)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1906])])). 23.41/23.24 fof(f448928,plain,( 23.41/23.24 ~sP1906(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f425778,f4122])). 23.41/23.24 fof(f4122,plain,( 23.41/23.24 ( ! [X30,X31] : (~sP1906(X31) | ~r1(X30,X31) | sP1907(X30)) )), 23.41/23.24 inference(cnf_transformation,[],[f4122_D])). 23.41/23.24 fof(f4122_D,plain,( 23.41/23.24 ( ! [X30] : (( ! [X31] : (~sP1906(X31) | ~r1(X30,X31)) ) <=> ~sP1907(X30)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1907])])). 23.41/23.24 fof(f425778,plain,( 23.41/23.24 ~sP1907(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f402944,f4124])). 23.41/23.24 fof(f4124,plain,( 23.41/23.24 ( ! [X30,X29] : (~sP1907(X30) | ~r1(X29,X30) | sP1908(X29)) )), 23.41/23.24 inference(cnf_transformation,[],[f4124_D])). 23.41/23.24 fof(f4124_D,plain,( 23.41/23.24 ( ! [X29] : (( ! [X30] : (~sP1907(X30) | ~r1(X29,X30)) ) <=> ~sP1908(X29)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1908])])). 23.41/23.24 fof(f402944,plain,( 23.41/23.24 ~sP1908(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f378259,f4126])). 23.41/23.24 fof(f4126,plain,( 23.41/23.24 ( ! [X28,X29] : (~sP1908(X29) | ~r1(X28,X29) | sP1909(X28)) )), 23.41/23.24 inference(cnf_transformation,[],[f4126_D])). 23.41/23.24 fof(f4126_D,plain,( 23.41/23.24 ( ! [X28] : (( ! [X29] : (~sP1908(X29) | ~r1(X28,X29)) ) <=> ~sP1909(X28)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1909])])). 23.41/23.24 fof(f378259,plain,( 23.41/23.24 ~sP1909(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f342779,f4128])). 23.41/23.24 fof(f4128,plain,( 23.41/23.24 ( ! [X28,X27] : (~sP1909(X28) | ~r1(X27,X28) | sP1910(X27)) )), 23.41/23.24 inference(cnf_transformation,[],[f4128_D])). 23.41/23.24 fof(f4128_D,plain,( 23.41/23.24 ( ! [X27] : (( ! [X28] : (~sP1909(X28) | ~r1(X27,X28)) ) <=> ~sP1910(X27)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1910])])). 23.41/23.24 fof(f342779,plain,( 23.41/23.24 ~sP1910(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f320679,f4130])). 23.41/23.24 fof(f4130,plain,( 23.41/23.24 ( ! [X26,X27] : (~sP1910(X27) | ~r1(X26,X27) | sP1911(X26)) )), 23.41/23.24 inference(cnf_transformation,[],[f4130_D])). 23.41/23.24 fof(f4130_D,plain,( 23.41/23.24 ( ! [X26] : (( ! [X27] : (~sP1910(X27) | ~r1(X26,X27)) ) <=> ~sP1911(X26)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1911])])). 23.41/23.24 fof(f320679,plain,( 23.41/23.24 ~sP1911(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f301788,f4132])). 23.41/23.24 fof(f4132,plain,( 23.41/23.24 ( ! [X26,X25] : (~sP1911(X26) | ~r1(X25,X26) | sP1912(X25)) )), 23.41/23.24 inference(cnf_transformation,[],[f4132_D])). 23.41/23.24 fof(f4132_D,plain,( 23.41/23.24 ( ! [X25] : (( ! [X26] : (~sP1911(X26) | ~r1(X25,X26)) ) <=> ~sP1912(X25)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1912])])). 23.41/23.24 fof(f301788,plain,( 23.41/23.24 ~sP1912(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f283667,f4134])). 23.41/23.24 fof(f4134,plain,( 23.41/23.24 ( ! [X24,X25] : (~sP1912(X25) | ~r1(X24,X25) | sP1913(X24)) )), 23.41/23.24 inference(cnf_transformation,[],[f4134_D])). 23.41/23.24 fof(f4134_D,plain,( 23.41/23.24 ( ! [X24] : (( ! [X25] : (~sP1912(X25) | ~r1(X24,X25)) ) <=> ~sP1913(X24)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1913])])). 23.41/23.24 fof(f283667,plain,( 23.41/23.24 ~sP1913(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f266308,f4136])). 23.41/23.24 fof(f4136,plain,( 23.41/23.24 ( ! [X24,X23] : (~sP1913(X24) | ~r1(X23,X24) | sP1914(X23)) )), 23.41/23.24 inference(cnf_transformation,[],[f4136_D])). 23.41/23.24 fof(f4136_D,plain,( 23.41/23.24 ( ! [X23] : (( ! [X24] : (~sP1913(X24) | ~r1(X23,X24)) ) <=> ~sP1914(X23)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1914])])). 23.41/23.24 fof(f266308,plain,( 23.41/23.24 ~sP1914(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f249680,f4138])). 23.41/23.24 fof(f4138,plain,( 23.41/23.24 ( ! [X23,X22] : (~sP1914(X23) | ~r1(X22,X23) | sP1915(X22)) )), 23.41/23.24 inference(cnf_transformation,[],[f4138_D])). 23.41/23.24 fof(f4138_D,plain,( 23.41/23.24 ( ! [X22] : (( ! [X23] : (~sP1914(X23) | ~r1(X22,X23)) ) <=> ~sP1915(X22)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1915])])). 23.41/23.24 fof(f249680,plain,( 23.41/23.24 ~sP1915(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f233782,f4150])). 23.41/23.24 fof(f4150,plain,( 23.41/23.24 ( ! [X21,X22] : (~sP1915(X22) | ~r1(X21,X22) | sP1921(X21)) )), 23.41/23.24 inference(cnf_transformation,[],[f4150_D])). 23.41/23.24 fof(f4150_D,plain,( 23.41/23.24 ( ! [X21] : (( ! [X22] : (~sP1915(X22) | ~r1(X21,X22)) ) <=> ~sP1921(X21)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1921])])). 23.41/23.24 fof(f233782,plain,( 23.41/23.24 ~sP1921(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f218582,f4152])). 23.41/23.24 fof(f4152,plain,( 23.41/23.24 ( ! [X21,X20] : (~sP1921(X21) | ~r1(X20,X21) | sP1922(X20)) )), 23.41/23.24 inference(cnf_transformation,[],[f4152_D])). 23.41/23.24 fof(f4152_D,plain,( 23.41/23.24 ( ! [X20] : (( ! [X21] : (~sP1921(X21) | ~r1(X20,X21)) ) <=> ~sP1922(X20)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1922])])). 23.41/23.24 fof(f218582,plain,( 23.41/23.24 ~sP1922(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f204077,f4154])). 23.41/23.24 fof(f4154,plain,( 23.41/23.24 ( ! [X19,X20] : (~sP1922(X20) | ~r1(X19,X20) | sP1923(X19)) )), 23.41/23.24 inference(cnf_transformation,[],[f4154_D])). 23.41/23.24 fof(f4154_D,plain,( 23.41/23.24 ( ! [X19] : (( ! [X20] : (~sP1922(X20) | ~r1(X19,X20)) ) <=> ~sP1923(X19)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1923])])). 23.41/23.24 fof(f204077,plain,( 23.41/23.24 ~sP1923(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f190245,f4156])). 23.41/23.24 fof(f4156,plain,( 23.41/23.24 ( ! [X19,X18] : (~sP1923(X19) | ~r1(X18,X19) | sP1924(X18)) )), 23.41/23.24 inference(cnf_transformation,[],[f4156_D])). 23.41/23.24 fof(f4156_D,plain,( 23.41/23.24 ( ! [X18] : (( ! [X19] : (~sP1923(X19) | ~r1(X18,X19)) ) <=> ~sP1924(X18)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1924])])). 23.41/23.24 fof(f190245,plain,( 23.41/23.24 ~sP1924(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f177074,f4158])). 23.41/23.24 fof(f4158,plain,( 23.41/23.24 ( ! [X17,X18] : (~sP1924(X18) | ~r1(X17,X18) | sP1925(X17)) )), 23.41/23.24 inference(cnf_transformation,[],[f4158_D])). 23.41/23.24 fof(f4158_D,plain,( 23.41/23.24 ( ! [X17] : (( ! [X18] : (~sP1924(X18) | ~r1(X17,X18)) ) <=> ~sP1925(X17)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1925])])). 23.41/23.24 fof(f177074,plain,( 23.41/23.24 ~sP1925(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f164547,f4159])). 23.41/23.24 fof(f4159,plain,( 23.41/23.24 ( ! [X17,X16] : (~sP1925(X17) | ~sP1920(X16) | ~r1(X16,X17)) )), 23.41/23.24 inference(general_splitting,[],[f4157,f4158_D])). 23.41/23.24 fof(f4157,plain,( 23.41/23.24 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP1920(X16) | ~sP1924(X18)) )), 23.41/23.24 inference(general_splitting,[],[f4155,f4156_D])). 23.41/23.24 fof(f4155,plain,( 23.41/23.24 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1920(X16) | ~sP1923(X19)) )), 23.41/23.24 inference(general_splitting,[],[f4153,f4154_D])). 23.41/23.24 fof(f4153,plain,( 23.41/23.24 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X17,X18) | ~sP1920(X16) | ~sP1922(X20)) )), 23.41/23.24 inference(general_splitting,[],[f4151,f4152_D])). 23.41/23.24 fof(f4151,plain,( 23.41/23.24 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X17,X18) | ~sP1920(X16) | ~sP1921(X21)) )), 23.41/23.24 inference(general_splitting,[],[f4149,f4150_D])). 23.41/23.24 fof(f4149,plain,( 23.41/23.24 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~sP1915(X22) | ~sP1920(X16)) )), 23.41/23.24 inference(general_splitting,[],[f4147,f4148_D])). 23.41/23.24 fof(f4148,plain,( 23.41/23.24 ( ! [X15,X16] : (sP1920(X16) | ~sP1919(X15) | ~r1(X15,X16)) )), 23.41/23.24 inference(cnf_transformation,[],[f4148_D])). 23.41/23.24 fof(f4148_D,plain,( 23.41/23.24 ( ! [X16] : (( ! [X15] : (~sP1919(X15) | ~r1(X15,X16)) ) <=> ~sP1920(X16)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1920])])). 23.41/23.24 fof(f4147,plain,( 23.41/23.24 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP1915(X22) | ~sP1919(X15)) )), 23.41/23.24 inference(general_splitting,[],[f4145,f4146_D])). 23.41/23.24 fof(f4146,plain,( 23.41/23.24 ( ! [X14,X15] : (sP1919(X15) | ~sP1918(X14) | ~r1(X14,X15)) )), 23.41/23.24 inference(cnf_transformation,[],[f4146_D])). 23.41/23.24 fof(f4146_D,plain,( 23.41/23.24 ( ! [X15] : (( ! [X14] : (~sP1918(X14) | ~r1(X14,X15)) ) <=> ~sP1919(X15)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1919])])). 23.41/23.24 fof(f4145,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP1915(X22) | ~sP1918(X14)) )), 23.41/23.24 inference(general_splitting,[],[f4143,f4144_D])). 23.41/23.24 fof(f4144,plain,( 23.41/23.24 ( ! [X14,X13] : (sP1918(X14) | ~sP1917(X13) | ~r1(X13,X14)) )), 23.41/23.24 inference(cnf_transformation,[],[f4144_D])). 23.41/23.24 fof(f4144_D,plain,( 23.41/23.24 ( ! [X14] : (( ! [X13] : (~sP1917(X13) | ~r1(X13,X14)) ) <=> ~sP1918(X14)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1918])])). 23.41/23.24 fof(f4143,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP1915(X22) | ~sP1917(X13)) )), 23.41/23.24 inference(general_splitting,[],[f4141,f4142_D])). 23.41/23.24 fof(f4142,plain,( 23.41/23.24 ( ! [X12,X13] : (sP1917(X13) | ~sP1916(X12) | ~r1(X12,X13)) )), 23.41/23.24 inference(cnf_transformation,[],[f4142_D])). 23.41/23.24 fof(f4142_D,plain,( 23.41/23.24 ( ! [X13] : (( ! [X12] : (~sP1916(X12) | ~r1(X12,X13)) ) <=> ~sP1917(X13)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1917])])). 23.41/23.24 fof(f4141,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP1915(X22) | ~sP1916(X12)) )), 23.41/23.24 inference(general_splitting,[],[f4139,f4140_D])). 23.41/23.24 fof(f4140,plain,( 23.41/23.24 ( ! [X12,X11] : (sP1916(X12) | ~sP1905(X11) | ~r1(X11,X12)) )), 23.41/23.24 inference(cnf_transformation,[],[f4140_D])). 23.41/23.24 fof(f4140_D,plain,( 23.41/23.24 ( ! [X12] : (( ! [X11] : (~sP1905(X11) | ~r1(X11,X12)) ) <=> ~sP1916(X12)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1916])])). 23.41/23.24 fof(f4139,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1915(X22)) )), 23.41/23.24 inference(general_splitting,[],[f4137,f4138_D])). 23.41/23.24 fof(f4137,plain,( 23.41/23.24 ( ! [X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1914(X23)) )), 23.41/23.24 inference(general_splitting,[],[f4135,f4136_D])). 23.41/23.24 fof(f4135,plain,( 23.41/23.24 ( ! [X24,X14,X12,X23,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1913(X24)) )), 23.41/23.24 inference(general_splitting,[],[f4133,f4134_D])). 23.41/23.24 fof(f4133,plain,( 23.41/23.24 ( ! [X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1912(X25)) )), 23.41/23.24 inference(general_splitting,[],[f4131,f4132_D])). 23.41/23.24 fof(f4131,plain,( 23.41/23.24 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1911(X26)) )), 23.41/23.24 inference(general_splitting,[],[f4129,f4130_D])). 23.41/23.24 fof(f4129,plain,( 23.41/23.24 ( ! [X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1910(X27)) )), 23.41/23.24 inference(general_splitting,[],[f4127,f4128_D])). 23.41/23.24 fof(f4127,plain,( 23.41/23.24 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1909(X28)) )), 23.41/23.24 inference(general_splitting,[],[f4125,f4126_D])). 23.41/23.24 fof(f4125,plain,( 23.41/23.24 ( ! [X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1908(X29)) )), 23.41/23.24 inference(general_splitting,[],[f4123,f4124_D])). 23.41/23.24 fof(f4123,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1907(X30)) )), 23.41/23.24 inference(general_splitting,[],[f4121,f4122_D])). 23.41/23.24 fof(f4121,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1905(X11) | ~sP1906(X31)) )), 23.41/23.24 inference(general_splitting,[],[f4119,f4120_D])). 23.41/23.24 fof(f4119,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1895(X32) | ~sP1905(X11)) )), 23.41/23.24 inference(general_splitting,[],[f4117,f4118_D])). 23.41/23.24 fof(f4118,plain,( 23.41/23.24 ( ! [X10,X11] : (sP1905(X11) | ~sP1904(X10) | ~r1(X10,X11)) )), 23.41/23.24 inference(cnf_transformation,[],[f4118_D])). 23.41/23.24 fof(f4118_D,plain,( 23.41/23.24 ( ! [X11] : (( ! [X10] : (~sP1904(X10) | ~r1(X10,X11)) ) <=> ~sP1905(X11)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1905])])). 23.41/23.24 fof(f4117,plain,( 23.41/23.24 ( ! [X30,X28,X26,X24,X14,X12,X10,X23,X21,X19,X17,X31,X29,X27,X25,X32,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1895(X32) | ~sP1904(X10)) )), 23.41/23.24 inference(general_splitting,[],[f4115,f4116_D])). 23.41/23.24 fof(f4116,plain,( 23.41/23.24 ( ! [X10,X9] : (sP1904(X10) | ~sP1903(X9) | ~r1(X9,X10)) )), 23.41/23.24 inference(cnf_transformation,[],[f4116_D])). 23.41/23.24 fof(f4116_D,plain,( 23.41/23.24 ( ! [X10] : (( ! [X9] : (~sP1903(X9) | ~r1(X9,X10)) ) <=> ~sP1904(X10)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1904])])). 23.41/23.24 fof(f4115,plain,( 23.41/23.24 ( ! [X28,X24,X12,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1895(X32) | ~sP1903(X9)) )), 23.41/23.24 inference(general_splitting,[],[f4113,f4114_D])). 23.41/23.24 fof(f4114,plain,( 23.41/23.24 ( ! [X8,X9] : (sP1903(X9) | ~sP1902(X8) | ~r1(X8,X9)) )), 23.41/23.24 inference(cnf_transformation,[],[f4114_D])). 23.41/23.24 fof(f4114_D,plain,( 23.41/23.24 ( ! [X9] : (( ! [X8] : (~sP1902(X8) | ~r1(X8,X9)) ) <=> ~sP1903(X9)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1903])])). 23.41/23.24 fof(f4113,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X32,X15,X11,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1895(X32) | ~sP1902(X8)) )), 23.41/23.24 inference(general_splitting,[],[f4111,f4112_D])). 23.41/23.24 fof(f4112,plain,( 23.41/23.24 ( ! [X8,X7] : (sP1902(X8) | ~sP1901(X7) | ~r1(X7,X8)) )), 23.41/23.24 inference(cnf_transformation,[],[f4112_D])). 23.41/23.24 fof(f4112_D,plain,( 23.41/23.24 ( ! [X8] : (( ! [X7] : (~sP1901(X7) | ~r1(X7,X8)) ) <=> ~sP1902(X8)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1902])])). 23.41/23.24 fof(f4111,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~sP1895(X32) | ~sP1901(X7)) )), 23.41/23.24 inference(general_splitting,[],[f4109,f4110_D])). 23.41/23.24 fof(f4110,plain,( 23.41/23.24 ( ! [X6,X7] : (sP1901(X7) | ~sP1900(X6) | ~r1(X6,X7)) )), 23.41/23.24 inference(cnf_transformation,[],[f4110_D])). 23.41/23.24 fof(f4110_D,plain,( 23.41/23.24 ( ! [X7] : (( ! [X6] : (~sP1900(X6) | ~r1(X6,X7)) ) <=> ~sP1901(X7)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1901])])). 23.41/23.24 fof(f4109,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X6,X7) | ~sP1895(X32) | ~sP1900(X6)) )), 23.41/23.24 inference(general_splitting,[],[f4107,f4108_D])). 23.41/23.24 fof(f4108,plain,( 23.41/23.24 ( ! [X6,X5] : (sP1900(X6) | ~sP1899(X5) | ~r1(X5,X6)) )), 23.41/23.24 inference(cnf_transformation,[],[f4108_D])). 23.41/23.24 fof(f4108_D,plain,( 23.41/23.24 ( ! [X6] : (( ! [X5] : (~sP1899(X5) | ~r1(X5,X6)) ) <=> ~sP1900(X6)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1900])])). 23.41/23.24 fof(f4107,plain,( 23.41/23.24 ( ! [X28,X24,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1895(X32) | ~sP1899(X5)) )), 23.41/23.24 inference(general_splitting,[],[f4105,f4106_D])). 23.41/23.24 fof(f4106,plain,( 23.41/23.24 ( ! [X4,X5] : (sP1899(X5) | ~sP1898(X4) | ~r1(X4,X5)) )), 23.41/23.24 inference(cnf_transformation,[],[f4106_D])). 23.41/23.24 fof(f4106_D,plain,( 23.41/23.24 ( ! [X5] : (( ! [X4] : (~sP1898(X4) | ~r1(X4,X5)) ) <=> ~sP1899(X5)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1899])])). 23.41/23.24 fof(f4105,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X32,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1895(X32) | ~sP1898(X4)) )), 23.41/23.24 inference(general_splitting,[],[f4103,f4104_D])). 23.41/23.24 fof(f4104,plain,( 23.41/23.24 ( ! [X4,X3] : (sP1898(X4) | ~sP1897(X3) | ~r1(X3,X4)) )), 23.41/23.24 inference(cnf_transformation,[],[f4104_D])). 23.41/23.24 fof(f4104_D,plain,( 23.41/23.24 ( ! [X4] : (( ! [X3] : (~sP1897(X3) | ~r1(X3,X4)) ) <=> ~sP1898(X4)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1898])])). 23.41/23.24 fof(f4103,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1895(X32) | ~sP1897(X3)) )), 23.41/23.24 inference(general_splitting,[],[f4101,f4102_D])). 23.41/23.24 fof(f4102,plain,( 23.41/23.24 ( ! [X3,X1] : (sP1897(X3) | ~sP1896(X1) | ~r1(X1,X3)) )), 23.41/23.24 inference(cnf_transformation,[],[f4102_D])). 23.41/23.24 fof(f4102_D,plain,( 23.41/23.24 ( ! [X3] : (( ! [X1] : (~sP1896(X1) | ~r1(X1,X3)) ) <=> ~sP1897(X3)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1897])])). 23.41/23.24 fof(f4101,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~sP1895(X32) | ~sP1896(X1)) )), 23.41/23.24 inference(general_splitting,[],[f4099,f4100_D])). 23.41/23.24 fof(f4100,plain,( 23.41/23.24 ( ! [X0,X1] : (sP1896(X1) | ~sP27(X0) | ~r1(X0,X1)) )), 23.41/23.24 inference(cnf_transformation,[],[f4100_D])). 23.41/23.24 fof(f4100_D,plain,( 23.41/23.24 ( ! [X1] : (( ! [X0] : (~sP27(X0) | ~r1(X0,X1)) ) <=> ~sP1896(X1)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1896])])). 23.41/23.24 fof(f4099,plain,( 23.41/23.24 ( ! [X28,X24,X4,X0,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP27(X0) | ~sP1895(X32)) )), 23.41/23.24 inference(general_splitting,[],[f461,f4098_D])). 23.41/23.24 fof(f461,plain,( 23.41/23.24 ( ! [X28,X24,X4,X33,X0,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X32,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X12,X13) | ~r1(X16,X17) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X26,X27) | p29(X33) | p30(X33) | ~r1(X32,X33) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X11,X12) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP27(X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f142])). 23.41/23.24 fof(f164547,plain,( 23.41/23.24 sP1920(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f152646,f4148])). 23.41/23.24 fof(f152646,plain,( 23.41/23.24 sP1919(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f141355,f4146])). 23.41/23.24 fof(f141355,plain,( 23.41/23.24 sP1918(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f130657,f4144])). 23.41/23.24 fof(f130657,plain,( 23.41/23.24 sP1917(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f120539,f4142])). 23.41/23.24 fof(f120539,plain,( 23.41/23.24 sP1916(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f110975,f4140])). 23.41/23.24 fof(f110975,plain,( 23.41/23.24 sP1905(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f101963,f4118])). 23.41/23.24 fof(f101963,plain,( 23.41/23.24 sP1904(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f93482,f4116])). 23.41/23.24 fof(f93482,plain,( 23.41/23.24 sP1903(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f85514,f4114])). 23.41/23.24 fof(f85514,plain,( 23.41/23.24 sP1902(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f78051,f4112])). 23.41/23.24 fof(f78051,plain,( 23.41/23.24 sP1901(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f71055,f4110])). 23.41/23.24 fof(f71055,plain,( 23.41/23.24 sP1900(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f64530,f4108])). 23.41/23.24 fof(f64530,plain,( 23.41/23.24 sP1899(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f56456,f4106])). 23.41/23.24 fof(f56456,plain,( 23.41/23.24 sP1898(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f49753,f4104])). 23.41/23.24 fof(f49753,plain,( 23.41/23.24 sP1897(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f44225,f4102])). 23.41/23.24 fof(f44225,plain,( 23.41/23.24 sP1896(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f39692,f4100])). 23.41/23.24 fof(f472291,plain,( 23.41/23.24 ~sP1959(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f448922,f4228])). 23.41/23.24 fof(f4228,plain,( 23.41/23.24 ( ! [X30,X29] : (~sP1959(X30) | ~r1(X29,X30) | sP1960(X29)) )), 23.41/23.24 inference(cnf_transformation,[],[f4228_D])). 23.41/23.24 fof(f4228_D,plain,( 23.41/23.24 ( ! [X29] : (( ! [X30] : (~sP1959(X30) | ~r1(X29,X30)) ) <=> ~sP1960(X29)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1960])])). 23.41/23.24 fof(f448922,plain,( 23.41/23.24 ~sP1960(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f425772,f4230])). 23.41/23.24 fof(f4230,plain,( 23.41/23.24 ( ! [X28,X29] : (~sP1960(X29) | ~r1(X28,X29) | sP1961(X28)) )), 23.41/23.24 inference(cnf_transformation,[],[f4230_D])). 23.41/23.24 fof(f4230_D,plain,( 23.41/23.24 ( ! [X28] : (( ! [X29] : (~sP1960(X29) | ~r1(X28,X29)) ) <=> ~sP1961(X28)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1961])])). 23.41/23.24 fof(f425772,plain,( 23.41/23.24 ~sP1961(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f402938,f4232])). 23.41/23.24 fof(f4232,plain,( 23.41/23.24 ( ! [X28,X27] : (~sP1961(X28) | ~r1(X27,X28) | sP1962(X27)) )), 23.41/23.24 inference(cnf_transformation,[],[f4232_D])). 23.41/23.24 fof(f4232_D,plain,( 23.41/23.24 ( ! [X27] : (( ! [X28] : (~sP1961(X28) | ~r1(X27,X28)) ) <=> ~sP1962(X27)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1962])])). 23.41/23.24 fof(f402938,plain,( 23.41/23.24 ~sP1962(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f378253,f4234])). 23.41/23.24 fof(f4234,plain,( 23.41/23.24 ( ! [X26,X27] : (~sP1962(X27) | ~r1(X26,X27) | sP1963(X26)) )), 23.41/23.24 inference(cnf_transformation,[],[f4234_D])). 23.41/23.24 fof(f4234_D,plain,( 23.41/23.24 ( ! [X26] : (( ! [X27] : (~sP1962(X27) | ~r1(X26,X27)) ) <=> ~sP1963(X26)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1963])])). 23.41/23.24 fof(f378253,plain,( 23.41/23.24 ~sP1963(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f342773,f4236])). 23.41/23.24 fof(f4236,plain,( 23.41/23.24 ( ! [X26,X25] : (~sP1963(X26) | ~r1(X25,X26) | sP1964(X25)) )), 23.41/23.24 inference(cnf_transformation,[],[f4236_D])). 23.41/23.24 fof(f4236_D,plain,( 23.41/23.24 ( ! [X25] : (( ! [X26] : (~sP1963(X26) | ~r1(X25,X26)) ) <=> ~sP1964(X25)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1964])])). 23.41/23.24 fof(f342773,plain,( 23.41/23.24 ~sP1964(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f320675,f4238])). 23.41/23.24 fof(f4238,plain,( 23.41/23.24 ( ! [X24,X25] : (~sP1964(X25) | ~r1(X24,X25) | sP1965(X24)) )), 23.41/23.24 inference(cnf_transformation,[],[f4238_D])). 23.41/23.24 fof(f4238_D,plain,( 23.41/23.24 ( ! [X24] : (( ! [X25] : (~sP1964(X25) | ~r1(X24,X25)) ) <=> ~sP1965(X24)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1965])])). 23.41/23.24 fof(f320675,plain,( 23.41/23.24 ~sP1965(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f301784,f4240])). 23.41/23.24 fof(f4240,plain,( 23.41/23.24 ( ! [X24,X23] : (~sP1965(X24) | ~r1(X23,X24) | sP1966(X23)) )), 23.41/23.24 inference(cnf_transformation,[],[f4240_D])). 23.41/23.24 fof(f4240_D,plain,( 23.41/23.24 ( ! [X23] : (( ! [X24] : (~sP1965(X24) | ~r1(X23,X24)) ) <=> ~sP1966(X23)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1966])])). 23.41/23.24 fof(f301784,plain,( 23.41/23.24 ~sP1966(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f283663,f4242])). 23.41/23.24 fof(f4242,plain,( 23.41/23.24 ( ! [X23,X22] : (~sP1966(X23) | ~r1(X22,X23) | sP1967(X22)) )), 23.41/23.24 inference(cnf_transformation,[],[f4242_D])). 23.41/23.24 fof(f4242_D,plain,( 23.41/23.24 ( ! [X22] : (( ! [X23] : (~sP1966(X23) | ~r1(X22,X23)) ) <=> ~sP1967(X22)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1967])])). 23.41/23.24 fof(f283663,plain,( 23.41/23.24 ~sP1967(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f266304,f4270])). 23.41/23.24 fof(f4270,plain,( 23.41/23.24 ( ! [X21,X22] : (~sP1967(X22) | ~r1(X21,X22) | sP1981(X21)) )), 23.41/23.24 inference(cnf_transformation,[],[f4270_D])). 23.41/23.24 fof(f4270_D,plain,( 23.41/23.24 ( ! [X21] : (( ! [X22] : (~sP1967(X22) | ~r1(X21,X22)) ) <=> ~sP1981(X21)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1981])])). 23.41/23.24 fof(f266304,plain,( 23.41/23.24 ~sP1981(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f249676,f4272])). 23.41/23.24 fof(f4272,plain,( 23.41/23.24 ( ! [X21,X20] : (~sP1981(X21) | ~r1(X20,X21) | sP1982(X20)) )), 23.41/23.24 inference(cnf_transformation,[],[f4272_D])). 23.41/23.24 fof(f4272_D,plain,( 23.41/23.24 ( ! [X20] : (( ! [X21] : (~sP1981(X21) | ~r1(X20,X21)) ) <=> ~sP1982(X20)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1982])])). 23.41/23.24 fof(f249676,plain,( 23.41/23.24 ~sP1982(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f233778,f4274])). 23.41/23.24 fof(f4274,plain,( 23.41/23.24 ( ! [X19,X20] : (~sP1982(X20) | ~r1(X19,X20) | sP1983(X19)) )), 23.41/23.24 inference(cnf_transformation,[],[f4274_D])). 23.41/23.24 fof(f4274_D,plain,( 23.41/23.24 ( ! [X19] : (( ! [X20] : (~sP1982(X20) | ~r1(X19,X20)) ) <=> ~sP1983(X19)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1983])])). 23.41/23.24 fof(f233778,plain,( 23.41/23.24 ~sP1983(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f218578,f4276])). 23.41/23.24 fof(f4276,plain,( 23.41/23.24 ( ! [X19,X18] : (~sP1983(X19) | ~r1(X18,X19) | sP1984(X18)) )), 23.41/23.24 inference(cnf_transformation,[],[f4276_D])). 23.41/23.24 fof(f4276_D,plain,( 23.41/23.24 ( ! [X18] : (( ! [X19] : (~sP1983(X19) | ~r1(X18,X19)) ) <=> ~sP1984(X18)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1984])])). 23.41/23.24 fof(f218578,plain,( 23.41/23.24 ~sP1984(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f204073,f4278])). 23.41/23.24 fof(f4278,plain,( 23.41/23.24 ( ! [X17,X18] : (~sP1984(X18) | ~r1(X17,X18) | sP1985(X17)) )), 23.41/23.24 inference(cnf_transformation,[],[f4278_D])). 23.41/23.24 fof(f4278_D,plain,( 23.41/23.24 ( ! [X17] : (( ! [X18] : (~sP1984(X18) | ~r1(X17,X18)) ) <=> ~sP1985(X17)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1985])])). 23.41/23.24 fof(f204073,plain,( 23.41/23.24 ~sP1985(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f190241,f4279])). 23.41/23.24 fof(f4279,plain,( 23.41/23.24 ( ! [X17,X16] : (~sP1985(X17) | ~sP1980(X16) | ~r1(X16,X17)) )), 23.41/23.24 inference(general_splitting,[],[f4277,f4278_D])). 23.41/23.24 fof(f4277,plain,( 23.41/23.24 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP1980(X16) | ~sP1984(X18)) )), 23.41/23.24 inference(general_splitting,[],[f4275,f4276_D])). 23.41/23.24 fof(f4275,plain,( 23.41/23.24 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1980(X16) | ~sP1983(X19)) )), 23.41/23.24 inference(general_splitting,[],[f4273,f4274_D])). 23.41/23.24 fof(f4273,plain,( 23.41/23.24 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1980(X16) | ~sP1982(X20)) )), 23.41/23.24 inference(general_splitting,[],[f4271,f4272_D])). 23.41/23.24 fof(f4271,plain,( 23.41/23.24 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1980(X16) | ~sP1981(X21)) )), 23.41/23.24 inference(general_splitting,[],[f4269,f4270_D])). 23.41/23.24 fof(f4269,plain,( 23.41/23.24 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP1967(X22) | ~sP1980(X16)) )), 23.41/23.24 inference(general_splitting,[],[f4267,f4268_D])). 23.41/23.24 fof(f4268,plain,( 23.41/23.24 ( ! [X15,X16] : (sP1980(X16) | ~sP1979(X15) | ~r1(X15,X16)) )), 23.41/23.24 inference(cnf_transformation,[],[f4268_D])). 23.41/23.24 fof(f4268_D,plain,( 23.41/23.24 ( ! [X16] : (( ! [X15] : (~sP1979(X15) | ~r1(X15,X16)) ) <=> ~sP1980(X16)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1980])])). 23.41/23.24 fof(f4267,plain,( 23.41/23.24 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP1967(X22) | ~sP1979(X15)) )), 23.41/23.24 inference(general_splitting,[],[f4265,f4266_D])). 23.41/23.24 fof(f4266,plain,( 23.41/23.24 ( ! [X14,X15] : (sP1979(X15) | ~sP1978(X14) | ~r1(X14,X15)) )), 23.41/23.24 inference(cnf_transformation,[],[f4266_D])). 23.41/23.24 fof(f4266_D,plain,( 23.41/23.24 ( ! [X15] : (( ! [X14] : (~sP1978(X14) | ~r1(X14,X15)) ) <=> ~sP1979(X15)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1979])])). 23.41/23.24 fof(f4265,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP1967(X22) | ~sP1978(X14)) )), 23.41/23.24 inference(general_splitting,[],[f4263,f4264_D])). 23.41/23.24 fof(f4264,plain,( 23.41/23.24 ( ! [X14,X13] : (sP1978(X14) | ~sP1977(X13) | ~r1(X13,X14)) )), 23.41/23.24 inference(cnf_transformation,[],[f4264_D])). 23.41/23.24 fof(f4264_D,plain,( 23.41/23.24 ( ! [X14] : (( ! [X13] : (~sP1977(X13) | ~r1(X13,X14)) ) <=> ~sP1978(X14)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1978])])). 23.41/23.24 fof(f4263,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP1967(X22) | ~sP1977(X13)) )), 23.41/23.24 inference(general_splitting,[],[f4261,f4262_D])). 23.41/23.24 fof(f4262,plain,( 23.41/23.24 ( ! [X12,X13] : (sP1977(X13) | ~sP1976(X12) | ~r1(X12,X13)) )), 23.41/23.24 inference(cnf_transformation,[],[f4262_D])). 23.41/23.24 fof(f4262_D,plain,( 23.41/23.24 ( ! [X13] : (( ! [X12] : (~sP1976(X12) | ~r1(X12,X13)) ) <=> ~sP1977(X13)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1977])])). 23.41/23.24 fof(f4261,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~sP1967(X22) | ~sP1976(X12)) )), 23.41/23.24 inference(general_splitting,[],[f4259,f4260_D])). 23.41/23.24 fof(f4260,plain,( 23.41/23.24 ( ! [X12,X11] : (sP1976(X12) | ~sP1975(X11) | ~r1(X11,X12)) )), 23.41/23.24 inference(cnf_transformation,[],[f4260_D])). 23.41/23.24 fof(f4260_D,plain,( 23.41/23.24 ( ! [X12] : (( ! [X11] : (~sP1975(X11) | ~r1(X11,X12)) ) <=> ~sP1976(X12)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1976])])). 23.41/23.24 fof(f4259,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~sP1967(X22) | ~sP1975(X11)) )), 23.41/23.24 inference(general_splitting,[],[f4257,f4258_D])). 23.41/23.24 fof(f4258,plain,( 23.41/23.24 ( ! [X10,X11] : (sP1975(X11) | ~sP1974(X10) | ~r1(X10,X11)) )), 23.41/23.24 inference(cnf_transformation,[],[f4258_D])). 23.41/23.24 fof(f4258_D,plain,( 23.41/23.24 ( ! [X11] : (( ! [X10] : (~sP1974(X10) | ~r1(X10,X11)) ) <=> ~sP1975(X11)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1975])])). 23.41/23.24 fof(f4257,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~sP1967(X22) | ~sP1974(X10)) )), 23.41/23.24 inference(general_splitting,[],[f4255,f4256_D])). 23.41/23.24 fof(f4256,plain,( 23.41/23.24 ( ! [X10,X9] : (sP1974(X10) | ~sP1973(X9) | ~r1(X9,X10)) )), 23.41/23.24 inference(cnf_transformation,[],[f4256_D])). 23.41/23.24 fof(f4256_D,plain,( 23.41/23.24 ( ! [X10] : (( ! [X9] : (~sP1973(X9) | ~r1(X9,X10)) ) <=> ~sP1974(X10)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1974])])). 23.41/23.24 fof(f4255,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~sP1967(X22) | ~sP1973(X9)) )), 23.41/23.24 inference(general_splitting,[],[f4253,f4254_D])). 23.41/23.24 fof(f4254,plain,( 23.41/23.24 ( ! [X8,X9] : (sP1973(X9) | ~sP1972(X8) | ~r1(X8,X9)) )), 23.41/23.24 inference(cnf_transformation,[],[f4254_D])). 23.41/23.24 fof(f4254_D,plain,( 23.41/23.24 ( ! [X9] : (( ! [X8] : (~sP1972(X8) | ~r1(X8,X9)) ) <=> ~sP1973(X9)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1973])])). 23.41/23.24 fof(f4253,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~sP1967(X22) | ~sP1972(X8)) )), 23.41/23.24 inference(general_splitting,[],[f4251,f4252_D])). 23.41/23.24 fof(f4252,plain,( 23.41/23.24 ( ! [X8,X7] : (sP1972(X8) | ~sP1971(X7) | ~r1(X7,X8)) )), 23.41/23.24 inference(cnf_transformation,[],[f4252_D])). 23.41/23.24 fof(f4252_D,plain,( 23.41/23.24 ( ! [X8] : (( ! [X7] : (~sP1971(X7) | ~r1(X7,X8)) ) <=> ~sP1972(X8)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1972])])). 23.41/23.24 fof(f4251,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~sP1967(X22) | ~sP1971(X7)) )), 23.41/23.24 inference(general_splitting,[],[f4249,f4250_D])). 23.41/23.24 fof(f4250,plain,( 23.41/23.24 ( ! [X6,X7] : (sP1971(X7) | ~sP1970(X6) | ~r1(X6,X7)) )), 23.41/23.24 inference(cnf_transformation,[],[f4250_D])). 23.41/23.24 fof(f4250_D,plain,( 23.41/23.24 ( ! [X7] : (( ! [X6] : (~sP1970(X6) | ~r1(X6,X7)) ) <=> ~sP1971(X7)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1971])])). 23.41/23.24 fof(f4249,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~sP1967(X22) | ~sP1970(X6)) )), 23.41/23.24 inference(general_splitting,[],[f4247,f4248_D])). 23.41/23.24 fof(f4248,plain,( 23.41/23.24 ( ! [X6,X5] : (sP1970(X6) | ~sP1969(X5) | ~r1(X5,X6)) )), 23.41/23.24 inference(cnf_transformation,[],[f4248_D])). 23.41/23.24 fof(f4248_D,plain,( 23.41/23.24 ( ! [X6] : (( ! [X5] : (~sP1969(X5) | ~r1(X5,X6)) ) <=> ~sP1970(X6)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1970])])). 23.41/23.24 fof(f4247,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP1967(X22) | ~sP1969(X5)) )), 23.41/23.24 inference(general_splitting,[],[f4245,f4246_D])). 23.41/23.24 fof(f4246,plain,( 23.41/23.24 ( ! [X4,X5] : (sP1969(X5) | ~sP1968(X4) | ~r1(X4,X5)) )), 23.41/23.24 inference(cnf_transformation,[],[f4246_D])). 23.41/23.24 fof(f4246_D,plain,( 23.41/23.24 ( ! [X5] : (( ! [X4] : (~sP1968(X4) | ~r1(X4,X5)) ) <=> ~sP1969(X5)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1969])])). 23.41/23.24 fof(f4245,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP1967(X22) | ~sP1968(X4)) )), 23.41/23.24 inference(general_splitting,[],[f4243,f4244_D])). 23.41/23.24 fof(f4244,plain,( 23.41/23.24 ( ! [X4,X3] : (sP1968(X4) | ~sP1958(X3) | ~r1(X3,X4)) )), 23.41/23.24 inference(cnf_transformation,[],[f4244_D])). 23.41/23.24 fof(f4244_D,plain,( 23.41/23.24 ( ! [X4] : (( ! [X3] : (~sP1958(X3) | ~r1(X3,X4)) ) <=> ~sP1968(X4)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1968])])). 23.41/23.24 fof(f4243,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1967(X22)) )), 23.41/23.24 inference(general_splitting,[],[f4241,f4242_D])). 23.41/23.24 fof(f4241,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1966(X23)) )), 23.41/23.24 inference(general_splitting,[],[f4239,f4240_D])). 23.41/23.24 fof(f4239,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1965(X24)) )), 23.41/23.24 inference(general_splitting,[],[f4237,f4238_D])). 23.41/23.24 fof(f4237,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X25,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1964(X25)) )), 23.41/23.24 inference(general_splitting,[],[f4235,f4236_D])). 23.41/23.24 fof(f4235,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1963(X26)) )), 23.41/23.24 inference(general_splitting,[],[f4233,f4234_D])). 23.41/23.24 fof(f4233,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1962(X27)) )), 23.41/23.24 inference(general_splitting,[],[f4231,f4232_D])). 23.41/23.24 fof(f4231,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1961(X28)) )), 23.41/23.24 inference(general_splitting,[],[f4229,f4230_D])). 23.41/23.24 fof(f4229,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1960(X29)) )), 23.41/23.24 inference(general_splitting,[],[f4227,f4228_D])). 23.41/23.24 fof(f4227,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3) | ~sP1959(X30)) )), 23.41/23.24 inference(general_splitting,[],[f4225,f4226_D])). 23.41/23.24 fof(f4225,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X15,X11,X20,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X26,X27) | ~p28(X31) | ~p29(X31) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1958(X3)) )), 23.41/23.24 inference(general_splitting,[],[f4223,f4224_D])). 23.41/23.24 fof(f4224,plain,( 23.41/23.24 ( ! [X2,X3] : (sP1958(X3) | ~sP1957(X2) | ~r1(X2,X3)) )), 23.41/23.24 inference(cnf_transformation,[],[f4224_D])). 23.41/23.24 fof(f4224_D,plain,( 23.41/23.24 ( ! [X3] : (( ! [X2] : (~sP1957(X2) | ~r1(X2,X3)) ) <=> ~sP1958(X3)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1958])])). 23.41/23.24 fof(f4223,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X26,X27) | ~p28(X31) | ~p29(X31) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP1957(X2)) )), 23.41/23.24 inference(general_splitting,[],[f4221,f4222_D])). 23.41/23.24 fof(f4222,plain,( 23.41/23.24 ( ! [X2,X1] : (sP1957(X2) | ~sP1956(X1) | ~r1(X1,X2)) )), 23.41/23.24 inference(cnf_transformation,[],[f4222_D])). 23.41/23.24 fof(f4222_D,plain,( 23.41/23.24 ( ! [X2] : (( ! [X1] : (~sP1956(X1) | ~r1(X1,X2)) ) <=> ~sP1957(X2)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1957])])). 23.41/23.24 fof(f4221,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X26,X27) | ~p28(X31) | ~p29(X31) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X2) | ~sP1956(X1)) )), 23.41/23.24 inference(general_splitting,[],[f469,f4220_D])). 23.41/23.24 fof(f4220,plain,( 23.41/23.24 ( ! [X0,X1] : (sP1956(X1) | ~sP26(X0) | ~r1(X0,X1)) )), 23.41/23.24 inference(cnf_transformation,[],[f4220_D])). 23.41/23.24 fof(f4220_D,plain,( 23.41/23.24 ( ! [X1] : (( ! [X0] : (~sP26(X0) | ~r1(X0,X1)) ) <=> ~sP1956(X1)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1956])])). 23.41/23.24 fof(f469,plain,( 23.41/23.24 ( ! [X28,X24,X4,X0,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X2,X14,X10,X23,X19,X31,X27,X7,X3,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X19,X20) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X25,X26) | ~r1(X26,X27) | ~p28(X31) | ~p29(X31) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X24,X25) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X2) | ~r1(X0,X1) | ~sP26(X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f146])). 23.41/23.24 fof(f190241,plain,( 23.41/23.24 sP1980(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f177070,f4268])). 23.41/23.24 fof(f177070,plain,( 23.41/23.24 sP1979(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f164543,f4266])). 23.41/23.24 fof(f164543,plain,( 23.41/23.24 sP1978(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f152642,f4264])). 23.41/23.24 fof(f152642,plain,( 23.41/23.24 sP1977(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f141351,f4262])). 23.41/23.24 fof(f141351,plain,( 23.41/23.24 sP1976(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f130653,f4260])). 23.41/23.24 fof(f130653,plain,( 23.41/23.24 sP1975(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f120535,f4258])). 23.41/23.24 fof(f120535,plain,( 23.41/23.24 sP1974(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f110971,f4256])). 23.41/23.24 fof(f110971,plain,( 23.41/23.24 sP1973(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f101959,f4254])). 23.41/23.24 fof(f101959,plain,( 23.41/23.24 sP1972(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f93478,f4252])). 23.41/23.24 fof(f93478,plain,( 23.41/23.24 sP1971(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f85510,f4250])). 23.41/23.24 fof(f85510,plain,( 23.41/23.24 sP1970(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f78047,f4248])). 23.41/23.24 fof(f78047,plain,( 23.41/23.24 sP1969(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f71051,f4246])). 23.41/23.24 fof(f71051,plain,( 23.41/23.24 sP1968(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f64526,f4244])). 23.41/23.24 fof(f64526,plain,( 23.41/23.24 sP1958(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f56452,f4224])). 23.41/23.24 fof(f56452,plain,( 23.41/23.24 sP1957(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f49749,f4222])). 23.41/23.24 fof(f49749,plain,( 23.41/23.24 sP1956(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f44217,f4220])). 23.41/23.24 fof(f472282,plain,( 23.41/23.24 ~sP1988(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f448913,f4286])). 23.41/23.24 fof(f4286,plain,( 23.41/23.24 ( ! [X30,X29] : (~sP1988(X30) | ~r1(X29,X30) | sP1989(X29)) )), 23.41/23.24 inference(cnf_transformation,[],[f4286_D])). 23.41/23.24 fof(f4286_D,plain,( 23.41/23.24 ( ! [X29] : (( ! [X30] : (~sP1988(X30) | ~r1(X29,X30)) ) <=> ~sP1989(X29)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1989])])). 23.41/23.24 fof(f448913,plain,( 23.41/23.24 ~sP1989(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f425763,f4288])). 23.41/23.24 fof(f4288,plain,( 23.41/23.24 ( ! [X28,X29] : (~sP1989(X29) | ~r1(X28,X29) | sP1990(X28)) )), 23.41/23.24 inference(cnf_transformation,[],[f4288_D])). 23.41/23.24 fof(f4288_D,plain,( 23.41/23.24 ( ! [X28] : (( ! [X29] : (~sP1989(X29) | ~r1(X28,X29)) ) <=> ~sP1990(X28)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1990])])). 23.41/23.24 fof(f425763,plain,( 23.41/23.24 ~sP1990(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f402929,f4290])). 23.41/23.24 fof(f4290,plain,( 23.41/23.24 ( ! [X28,X27] : (~sP1990(X28) | ~r1(X27,X28) | sP1991(X27)) )), 23.41/23.24 inference(cnf_transformation,[],[f4290_D])). 23.41/23.24 fof(f4290_D,plain,( 23.41/23.24 ( ! [X27] : (( ! [X28] : (~sP1990(X28) | ~r1(X27,X28)) ) <=> ~sP1991(X27)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1991])])). 23.41/23.24 fof(f402929,plain,( 23.41/23.24 ~sP1991(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f378244,f4292])). 23.41/23.24 fof(f4292,plain,( 23.41/23.24 ( ! [X26,X27] : (~sP1991(X27) | ~r1(X26,X27) | sP1992(X26)) )), 23.41/23.24 inference(cnf_transformation,[],[f4292_D])). 23.41/23.24 fof(f4292_D,plain,( 23.41/23.24 ( ! [X26] : (( ! [X27] : (~sP1991(X27) | ~r1(X26,X27)) ) <=> ~sP1992(X26)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1992])])). 23.41/23.24 fof(f378244,plain,( 23.41/23.24 ~sP1992(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f342764,f4294])). 23.41/23.24 fof(f4294,plain,( 23.41/23.24 ( ! [X26,X25] : (~sP1992(X26) | ~r1(X25,X26) | sP1993(X25)) )), 23.41/23.24 inference(cnf_transformation,[],[f4294_D])). 23.41/23.24 fof(f4294_D,plain,( 23.41/23.24 ( ! [X25] : (( ! [X26] : (~sP1992(X26) | ~r1(X25,X26)) ) <=> ~sP1993(X25)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1993])])). 23.41/23.24 fof(f342764,plain,( 23.41/23.24 ~sP1993(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f320669,f4296])). 23.41/23.24 fof(f4296,plain,( 23.41/23.24 ( ! [X24,X25] : (~sP1993(X25) | ~r1(X24,X25) | sP1994(X24)) )), 23.41/23.24 inference(cnf_transformation,[],[f4296_D])). 23.41/23.24 fof(f4296_D,plain,( 23.41/23.24 ( ! [X24] : (( ! [X25] : (~sP1993(X25) | ~r1(X24,X25)) ) <=> ~sP1994(X24)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1994])])). 23.41/23.24 fof(f320669,plain,( 23.41/23.24 ~sP1994(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f301778,f4298])). 23.41/23.24 fof(f4298,plain,( 23.41/23.24 ( ! [X24,X23] : (~sP1994(X24) | ~r1(X23,X24) | sP1995(X23)) )), 23.41/23.24 inference(cnf_transformation,[],[f4298_D])). 23.41/23.24 fof(f4298_D,plain,( 23.41/23.24 ( ! [X23] : (( ! [X24] : (~sP1994(X24) | ~r1(X23,X24)) ) <=> ~sP1995(X23)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1995])])). 23.41/23.24 fof(f301778,plain,( 23.41/23.24 ~sP1995(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f283657,f4300])). 23.41/23.24 fof(f4300,plain,( 23.41/23.24 ( ! [X23,X22] : (~sP1995(X23) | ~r1(X22,X23) | sP1996(X22)) )), 23.41/23.24 inference(cnf_transformation,[],[f4300_D])). 23.41/23.24 fof(f4300_D,plain,( 23.41/23.24 ( ! [X22] : (( ! [X23] : (~sP1995(X23) | ~r1(X22,X23)) ) <=> ~sP1996(X22)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1996])])). 23.41/23.24 fof(f283657,plain,( 23.41/23.24 ~sP1996(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f266298,f4328])). 23.41/23.24 fof(f4328,plain,( 23.41/23.24 ( ! [X21,X22] : (~sP1996(X22) | ~r1(X21,X22) | sP2010(X21)) )), 23.41/23.24 inference(cnf_transformation,[],[f4328_D])). 23.41/23.24 fof(f4328_D,plain,( 23.41/23.24 ( ! [X21] : (( ! [X22] : (~sP1996(X22) | ~r1(X21,X22)) ) <=> ~sP2010(X21)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2010])])). 23.41/23.24 fof(f266298,plain,( 23.41/23.24 ~sP2010(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f249670,f4330])). 23.41/23.24 fof(f4330,plain,( 23.41/23.24 ( ! [X21,X20] : (~sP2010(X21) | ~r1(X20,X21) | sP2011(X20)) )), 23.41/23.24 inference(cnf_transformation,[],[f4330_D])). 23.41/23.24 fof(f4330_D,plain,( 23.41/23.24 ( ! [X20] : (( ! [X21] : (~sP2010(X21) | ~r1(X20,X21)) ) <=> ~sP2011(X20)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2011])])). 23.41/23.24 fof(f249670,plain,( 23.41/23.24 ~sP2011(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f233772,f4332])). 23.41/23.24 fof(f4332,plain,( 23.41/23.24 ( ! [X19,X20] : (~sP2011(X20) | ~r1(X19,X20) | sP2012(X19)) )), 23.41/23.24 inference(cnf_transformation,[],[f4332_D])). 23.41/23.24 fof(f4332_D,plain,( 23.41/23.24 ( ! [X19] : (( ! [X20] : (~sP2011(X20) | ~r1(X19,X20)) ) <=> ~sP2012(X19)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2012])])). 23.41/23.24 fof(f233772,plain,( 23.41/23.24 ~sP2012(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f218572,f4334])). 23.41/23.24 fof(f4334,plain,( 23.41/23.24 ( ! [X19,X18] : (~sP2012(X19) | ~r1(X18,X19) | sP2013(X18)) )), 23.41/23.24 inference(cnf_transformation,[],[f4334_D])). 23.41/23.24 fof(f4334_D,plain,( 23.41/23.24 ( ! [X18] : (( ! [X19] : (~sP2012(X19) | ~r1(X18,X19)) ) <=> ~sP2013(X18)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2013])])). 23.41/23.24 fof(f218572,plain,( 23.41/23.24 ~sP2013(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f204067,f4336])). 23.41/23.24 fof(f4336,plain,( 23.41/23.24 ( ! [X17,X18] : (~sP2013(X18) | ~r1(X17,X18) | sP2014(X17)) )), 23.41/23.24 inference(cnf_transformation,[],[f4336_D])). 23.41/23.24 fof(f4336_D,plain,( 23.41/23.24 ( ! [X17] : (( ! [X18] : (~sP2013(X18) | ~r1(X17,X18)) ) <=> ~sP2014(X17)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2014])])). 23.41/23.24 fof(f204067,plain,( 23.41/23.24 ~sP2014(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f190235,f4337])). 23.41/23.24 fof(f4337,plain,( 23.41/23.24 ( ! [X17,X16] : (~sP2014(X17) | ~sP2009(X16) | ~r1(X16,X17)) )), 23.41/23.24 inference(general_splitting,[],[f4335,f4336_D])). 23.41/23.24 fof(f4335,plain,( 23.41/23.24 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP2009(X16) | ~sP2013(X18)) )), 23.41/23.24 inference(general_splitting,[],[f4333,f4334_D])). 23.41/23.24 fof(f4333,plain,( 23.41/23.24 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~sP2009(X16) | ~sP2012(X19)) )), 23.41/23.24 inference(general_splitting,[],[f4331,f4332_D])). 23.41/23.24 fof(f4331,plain,( 23.41/23.24 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~sP2009(X16) | ~sP2011(X20)) )), 23.41/23.24 inference(general_splitting,[],[f4329,f4330_D])). 23.41/23.24 fof(f4329,plain,( 23.41/23.24 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X19,X20) | ~sP2009(X16) | ~sP2010(X21)) )), 23.41/23.24 inference(general_splitting,[],[f4327,f4328_D])). 23.41/23.24 fof(f4327,plain,( 23.41/23.24 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~sP1996(X22) | ~sP2009(X16)) )), 23.41/23.24 inference(general_splitting,[],[f4325,f4326_D])). 23.41/23.24 fof(f4326,plain,( 23.41/23.24 ( ! [X15,X16] : (sP2009(X16) | ~sP2008(X15) | ~r1(X15,X16)) )), 23.41/23.24 inference(cnf_transformation,[],[f4326_D])). 23.41/23.24 fof(f4326_D,plain,( 23.41/23.24 ( ! [X16] : (( ! [X15] : (~sP2008(X15) | ~r1(X15,X16)) ) <=> ~sP2009(X16)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2009])])). 23.41/23.24 fof(f4325,plain,( 23.41/23.24 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~sP1996(X22) | ~sP2008(X15)) )), 23.41/23.24 inference(general_splitting,[],[f4323,f4324_D])). 23.41/23.24 fof(f4324,plain,( 23.41/23.24 ( ! [X14,X15] : (sP2008(X15) | ~sP2007(X14) | ~r1(X14,X15)) )), 23.41/23.24 inference(cnf_transformation,[],[f4324_D])). 23.41/23.24 fof(f4324_D,plain,( 23.41/23.24 ( ! [X15] : (( ! [X14] : (~sP2007(X14) | ~r1(X14,X15)) ) <=> ~sP2008(X15)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2008])])). 23.41/23.24 fof(f4323,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~sP1996(X22) | ~sP2007(X14)) )), 23.41/23.24 inference(general_splitting,[],[f4321,f4322_D])). 23.41/23.24 fof(f4322,plain,( 23.41/23.24 ( ! [X14,X13] : (sP2007(X14) | ~sP2006(X13) | ~r1(X13,X14)) )), 23.41/23.24 inference(cnf_transformation,[],[f4322_D])). 23.41/23.24 fof(f4322_D,plain,( 23.41/23.24 ( ! [X14] : (( ! [X13] : (~sP2006(X13) | ~r1(X13,X14)) ) <=> ~sP2007(X14)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2007])])). 23.41/23.24 fof(f4321,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~sP1996(X22) | ~sP2006(X13)) )), 23.41/23.24 inference(general_splitting,[],[f4319,f4320_D])). 23.41/23.24 fof(f4320,plain,( 23.41/23.24 ( ! [X12,X13] : (sP2006(X13) | ~sP2005(X12) | ~r1(X12,X13)) )), 23.41/23.24 inference(cnf_transformation,[],[f4320_D])). 23.41/23.24 fof(f4320_D,plain,( 23.41/23.24 ( ! [X13] : (( ! [X12] : (~sP2005(X12) | ~r1(X12,X13)) ) <=> ~sP2006(X13)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2006])])). 23.41/23.24 fof(f4319,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1996(X22) | ~sP2005(X12)) )), 23.41/23.24 inference(general_splitting,[],[f4317,f4318_D])). 23.41/23.24 fof(f4318,plain,( 23.41/23.24 ( ! [X12,X11] : (sP2005(X12) | ~sP2004(X11) | ~r1(X11,X12)) )), 23.41/23.24 inference(cnf_transformation,[],[f4318_D])). 23.41/23.24 fof(f4318_D,plain,( 23.41/23.24 ( ! [X12] : (( ! [X11] : (~sP2004(X11) | ~r1(X11,X12)) ) <=> ~sP2005(X12)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2005])])). 23.41/23.24 fof(f4317,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~sP1996(X22) | ~sP2004(X11)) )), 23.41/23.24 inference(general_splitting,[],[f4315,f4316_D])). 23.41/23.24 fof(f4316,plain,( 23.41/23.24 ( ! [X10,X11] : (sP2004(X11) | ~sP2003(X10) | ~r1(X10,X11)) )), 23.41/23.24 inference(cnf_transformation,[],[f4316_D])). 23.41/23.24 fof(f4316_D,plain,( 23.41/23.24 ( ! [X11] : (( ! [X10] : (~sP2003(X10) | ~r1(X10,X11)) ) <=> ~sP2004(X11)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2004])])). 23.41/23.24 fof(f4315,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~sP1996(X22) | ~sP2003(X10)) )), 23.41/23.24 inference(general_splitting,[],[f4313,f4314_D])). 23.41/23.24 fof(f4314,plain,( 23.41/23.24 ( ! [X10,X9] : (sP2003(X10) | ~sP2002(X9) | ~r1(X9,X10)) )), 23.41/23.24 inference(cnf_transformation,[],[f4314_D])). 23.41/23.24 fof(f4314_D,plain,( 23.41/23.24 ( ! [X10] : (( ! [X9] : (~sP2002(X9) | ~r1(X9,X10)) ) <=> ~sP2003(X10)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2003])])). 23.41/23.24 fof(f4313,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP1996(X22) | ~sP2002(X9)) )), 23.41/23.24 inference(general_splitting,[],[f4311,f4312_D])). 23.41/23.24 fof(f4312,plain,( 23.41/23.24 ( ! [X8,X9] : (sP2002(X9) | ~sP2001(X8) | ~r1(X8,X9)) )), 23.41/23.24 inference(cnf_transformation,[],[f4312_D])). 23.41/23.24 fof(f4312_D,plain,( 23.41/23.24 ( ! [X9] : (( ! [X8] : (~sP2001(X8) | ~r1(X8,X9)) ) <=> ~sP2002(X9)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2002])])). 23.41/23.24 fof(f4311,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP1996(X22) | ~sP2001(X8)) )), 23.41/23.24 inference(general_splitting,[],[f4309,f4310_D])). 23.41/23.24 fof(f4310,plain,( 23.41/23.24 ( ! [X8,X7] : (sP2001(X8) | ~sP2000(X7) | ~r1(X7,X8)) )), 23.41/23.24 inference(cnf_transformation,[],[f4310_D])). 23.41/23.24 fof(f4310_D,plain,( 23.41/23.24 ( ! [X8] : (( ! [X7] : (~sP2000(X7) | ~r1(X7,X8)) ) <=> ~sP2001(X8)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2001])])). 23.41/23.24 fof(f4309,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP1996(X22) | ~sP2000(X7)) )), 23.41/23.24 inference(general_splitting,[],[f4307,f4308_D])). 23.41/23.24 fof(f4308,plain,( 23.41/23.24 ( ! [X6,X7] : (sP2000(X7) | ~sP1999(X6) | ~r1(X6,X7)) )), 23.41/23.24 inference(cnf_transformation,[],[f4308_D])). 23.41/23.24 fof(f4308_D,plain,( 23.41/23.24 ( ! [X7] : (( ! [X6] : (~sP1999(X6) | ~r1(X6,X7)) ) <=> ~sP2000(X7)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2000])])). 23.41/23.24 fof(f4307,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP1996(X22) | ~sP1999(X6)) )), 23.41/23.24 inference(general_splitting,[],[f4305,f4306_D])). 23.41/23.24 fof(f4306,plain,( 23.41/23.24 ( ! [X6,X5] : (sP1999(X6) | ~sP1998(X5) | ~r1(X5,X6)) )), 23.41/23.24 inference(cnf_transformation,[],[f4306_D])). 23.41/23.24 fof(f4306_D,plain,( 23.41/23.24 ( ! [X6] : (( ! [X5] : (~sP1998(X5) | ~r1(X5,X6)) ) <=> ~sP1999(X6)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1999])])). 23.41/23.24 fof(f4305,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~sP1996(X22) | ~sP1998(X5)) )), 23.41/23.24 inference(general_splitting,[],[f4303,f4304_D])). 23.41/23.24 fof(f4304,plain,( 23.41/23.24 ( ! [X4,X5] : (sP1998(X5) | ~sP1997(X4) | ~r1(X4,X5)) )), 23.41/23.24 inference(cnf_transformation,[],[f4304_D])). 23.41/23.24 fof(f4304_D,plain,( 23.41/23.24 ( ! [X5] : (( ! [X4] : (~sP1997(X4) | ~r1(X4,X5)) ) <=> ~sP1998(X5)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1998])])). 23.41/23.24 fof(f4303,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~sP1996(X22) | ~sP1997(X4)) )), 23.41/23.24 inference(general_splitting,[],[f4301,f4302_D])). 23.41/23.24 fof(f4302,plain,( 23.41/23.24 ( ! [X4,X3] : (sP1997(X4) | ~sP1987(X3) | ~r1(X3,X4)) )), 23.41/23.24 inference(cnf_transformation,[],[f4302_D])). 23.41/23.24 fof(f4302_D,plain,( 23.41/23.24 ( ! [X4] : (( ! [X3] : (~sP1987(X3) | ~r1(X3,X4)) ) <=> ~sP1997(X4)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1997])])). 23.41/23.24 fof(f4301,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1996(X22)) )), 23.41/23.24 inference(general_splitting,[],[f4299,f4300_D])). 23.41/23.24 fof(f4299,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1995(X23)) )), 23.41/23.24 inference(general_splitting,[],[f4297,f4298_D])). 23.41/23.24 fof(f4297,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1994(X24)) )), 23.41/23.24 inference(general_splitting,[],[f4295,f4296_D])). 23.41/23.24 fof(f4295,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X25,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1993(X25)) )), 23.41/23.24 inference(general_splitting,[],[f4293,f4294_D])). 23.41/23.24 fof(f4293,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1992(X26)) )), 23.41/23.24 inference(general_splitting,[],[f4291,f4292_D])). 23.41/23.24 fof(f4291,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1991(X27)) )), 23.41/23.24 inference(general_splitting,[],[f4289,f4290_D])). 23.41/23.24 fof(f4289,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1990(X28)) )), 23.41/23.24 inference(general_splitting,[],[f4287,f4288_D])). 23.41/23.24 fof(f4287,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1989(X29)) )), 23.41/23.24 inference(general_splitting,[],[f4285,f4286_D])). 23.41/23.24 fof(f4285,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3) | ~sP1988(X30)) )), 23.41/23.24 inference(general_splitting,[],[f4283,f4284_D])). 23.41/23.24 fof(f4283,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X28,X29) | p27(X31) | p28(X31) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~sP1987(X3)) )), 23.41/23.24 inference(general_splitting,[],[f4281,f4282_D])). 23.41/23.24 fof(f4282,plain,( 23.41/23.24 ( ! [X3,X1] : (sP1987(X3) | ~sP1986(X1) | ~r1(X1,X3)) )), 23.41/23.24 inference(cnf_transformation,[],[f4282_D])). 23.41/23.24 fof(f4282_D,plain,( 23.41/23.24 ( ! [X3] : (( ! [X1] : (~sP1986(X1) | ~r1(X1,X3)) ) <=> ~sP1987(X3)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1987])])). 23.41/23.24 fof(f4281,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X28,X29) | p27(X31) | p28(X31) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~sP1986(X1)) )), 23.41/23.24 inference(general_splitting,[],[f472,f4280_D])). 23.41/23.24 fof(f4280,plain,( 23.41/23.24 ( ! [X0,X1] : (sP1986(X1) | ~sP25(X0) | ~r1(X0,X1)) )), 23.41/23.24 inference(cnf_transformation,[],[f4280_D])). 23.41/23.24 fof(f4280_D,plain,( 23.41/23.24 ( ! [X1] : (( ! [X0] : (~sP25(X0) | ~r1(X0,X1)) ) <=> ~sP1986(X1)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP1986])])). 23.41/23.24 fof(f472,plain,( 23.41/23.24 ( ! [X28,X24,X4,X0,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X31,X27,X7,X3,X15,X11,X20,X16] : (~r1(X4,X5) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X11,X12) | ~r1(X15,X16) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X20,X21) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X28,X29) | p27(X31) | p28(X31) | ~r1(X30,X31) | ~r1(X29,X30) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X14,X15) | ~r1(X13,X14) | ~r1(X12,X13) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP25(X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f150])). 23.41/23.24 fof(f190235,plain,( 23.41/23.24 sP2009(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f177064,f4326])). 23.41/23.24 fof(f177064,plain,( 23.41/23.24 sP2008(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f164537,f4324])). 23.41/23.24 fof(f164537,plain,( 23.41/23.24 sP2007(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f152636,f4322])). 23.41/23.24 fof(f152636,plain,( 23.41/23.24 sP2006(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f141345,f4320])). 23.41/23.24 fof(f141345,plain,( 23.41/23.24 sP2005(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f130647,f4318])). 23.41/23.24 fof(f130647,plain,( 23.41/23.24 sP2004(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f120529,f4316])). 23.41/23.24 fof(f120529,plain,( 23.41/23.24 sP2003(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f110965,f4314])). 23.41/23.24 fof(f110965,plain,( 23.41/23.24 sP2002(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f101953,f4312])). 23.41/23.24 fof(f101953,plain,( 23.41/23.24 sP2001(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f93472,f4310])). 23.41/23.24 fof(f93472,plain,( 23.41/23.24 sP2000(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f85504,f4308])). 23.41/23.24 fof(f85504,plain,( 23.41/23.24 sP1999(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f78041,f4306])). 23.41/23.24 fof(f78041,plain,( 23.41/23.24 sP1998(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f71045,f4304])). 23.41/23.24 fof(f71045,plain,( 23.41/23.24 sP1997(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f64520,f4302])). 23.41/23.24 fof(f64520,plain,( 23.41/23.24 sP1987(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f56446,f4282])). 23.41/23.24 fof(f56446,plain,( 23.41/23.24 sP1986(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f49745,f4280])). 23.41/23.24 fof(f472276,plain,( 23.41/23.24 ~sP2046(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f448907,f4402])). 23.41/23.24 fof(f4402,plain,( 23.41/23.24 ( ! [X28,X29] : (~sP2046(X29) | ~r1(X28,X29) | sP2047(X28)) )), 23.41/23.24 inference(cnf_transformation,[],[f4402_D])). 23.41/23.24 fof(f4402_D,plain,( 23.41/23.24 ( ! [X28] : (( ! [X29] : (~sP2046(X29) | ~r1(X28,X29)) ) <=> ~sP2047(X28)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2047])])). 23.41/23.24 fof(f448907,plain,( 23.41/23.24 ~sP2047(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f425757,f4404])). 23.41/23.24 fof(f4404,plain,( 23.41/23.24 ( ! [X28,X27] : (~sP2047(X28) | ~r1(X27,X28) | sP2048(X27)) )), 23.41/23.24 inference(cnf_transformation,[],[f4404_D])). 23.41/23.24 fof(f4404_D,plain,( 23.41/23.24 ( ! [X27] : (( ! [X28] : (~sP2047(X28) | ~r1(X27,X28)) ) <=> ~sP2048(X27)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2048])])). 23.41/23.24 fof(f425757,plain,( 23.41/23.24 ~sP2048(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f402923,f4406])). 23.41/23.24 fof(f4406,plain,( 23.41/23.24 ( ! [X26,X27] : (~sP2048(X27) | ~r1(X26,X27) | sP2049(X26)) )), 23.41/23.24 inference(cnf_transformation,[],[f4406_D])). 23.41/23.24 fof(f4406_D,plain,( 23.41/23.24 ( ! [X26] : (( ! [X27] : (~sP2048(X27) | ~r1(X26,X27)) ) <=> ~sP2049(X26)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2049])])). 23.41/23.24 fof(f402923,plain,( 23.41/23.24 ~sP2049(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f378238,f4408])). 23.41/23.24 fof(f4408,plain,( 23.41/23.24 ( ! [X26,X25] : (~sP2049(X26) | ~r1(X25,X26) | sP2050(X25)) )), 23.41/23.24 inference(cnf_transformation,[],[f4408_D])). 23.41/23.24 fof(f4408_D,plain,( 23.41/23.24 ( ! [X25] : (( ! [X26] : (~sP2049(X26) | ~r1(X25,X26)) ) <=> ~sP2050(X25)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2050])])). 23.41/23.24 fof(f378238,plain,( 23.41/23.24 ~sP2050(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f342758,f4410])). 23.41/23.24 fof(f4410,plain,( 23.41/23.24 ( ! [X24,X25] : (~sP2050(X25) | ~r1(X24,X25) | sP2051(X24)) )), 23.41/23.24 inference(cnf_transformation,[],[f4410_D])). 23.41/23.24 fof(f4410_D,plain,( 23.41/23.24 ( ! [X24] : (( ! [X25] : (~sP2050(X25) | ~r1(X24,X25)) ) <=> ~sP2051(X24)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2051])])). 23.41/23.24 fof(f342758,plain,( 23.41/23.24 ~sP2051(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f320665,f4412])). 23.41/23.24 fof(f4412,plain,( 23.41/23.24 ( ! [X24,X23] : (~sP2051(X24) | ~r1(X23,X24) | sP2052(X23)) )), 23.41/23.24 inference(cnf_transformation,[],[f4412_D])). 23.41/23.24 fof(f4412_D,plain,( 23.41/23.24 ( ! [X23] : (( ! [X24] : (~sP2051(X24) | ~r1(X23,X24)) ) <=> ~sP2052(X23)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2052])])). 23.41/23.24 fof(f320665,plain,( 23.41/23.24 ~sP2052(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f301774,f4414])). 23.41/23.24 fof(f4414,plain,( 23.41/23.24 ( ! [X23,X22] : (~sP2052(X23) | ~r1(X22,X23) | sP2053(X22)) )), 23.41/23.24 inference(cnf_transformation,[],[f4414_D])). 23.41/23.24 fof(f4414_D,plain,( 23.41/23.24 ( ! [X22] : (( ! [X23] : (~sP2052(X23) | ~r1(X22,X23)) ) <=> ~sP2053(X22)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2053])])). 23.41/23.24 fof(f301774,plain,( 23.41/23.24 ~sP2053(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f283653,f4442])). 23.41/23.24 fof(f4442,plain,( 23.41/23.24 ( ! [X21,X22] : (~sP2053(X22) | ~r1(X21,X22) | sP2067(X21)) )), 23.41/23.24 inference(cnf_transformation,[],[f4442_D])). 23.41/23.24 fof(f4442_D,plain,( 23.41/23.24 ( ! [X21] : (( ! [X22] : (~sP2053(X22) | ~r1(X21,X22)) ) <=> ~sP2067(X21)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2067])])). 23.41/23.24 fof(f283653,plain,( 23.41/23.24 ~sP2067(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f266294,f4444])). 23.41/23.24 fof(f4444,plain,( 23.41/23.24 ( ! [X21,X20] : (~sP2067(X21) | ~r1(X20,X21) | sP2068(X20)) )), 23.41/23.24 inference(cnf_transformation,[],[f4444_D])). 23.41/23.24 fof(f4444_D,plain,( 23.41/23.24 ( ! [X20] : (( ! [X21] : (~sP2067(X21) | ~r1(X20,X21)) ) <=> ~sP2068(X20)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2068])])). 23.41/23.24 fof(f266294,plain,( 23.41/23.24 ~sP2068(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f249666,f4446])). 23.41/23.24 fof(f4446,plain,( 23.41/23.24 ( ! [X19,X20] : (~sP2068(X20) | ~r1(X19,X20) | sP2069(X19)) )), 23.41/23.24 inference(cnf_transformation,[],[f4446_D])). 23.41/23.24 fof(f4446_D,plain,( 23.41/23.24 ( ! [X19] : (( ! [X20] : (~sP2068(X20) | ~r1(X19,X20)) ) <=> ~sP2069(X19)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2069])])). 23.41/23.24 fof(f249666,plain,( 23.41/23.24 ~sP2069(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f233768,f4448])). 23.41/23.24 fof(f4448,plain,( 23.41/23.24 ( ! [X19,X18] : (~sP2069(X19) | ~r1(X18,X19) | sP2070(X18)) )), 23.41/23.24 inference(cnf_transformation,[],[f4448_D])). 23.41/23.24 fof(f4448_D,plain,( 23.41/23.24 ( ! [X18] : (( ! [X19] : (~sP2069(X19) | ~r1(X18,X19)) ) <=> ~sP2070(X18)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2070])])). 23.41/23.24 fof(f233768,plain,( 23.41/23.24 ~sP2070(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f218568,f4450])). 23.41/23.24 fof(f4450,plain,( 23.41/23.24 ( ! [X17,X18] : (~sP2070(X18) | ~r1(X17,X18) | sP2071(X17)) )), 23.41/23.24 inference(cnf_transformation,[],[f4450_D])). 23.41/23.24 fof(f4450_D,plain,( 23.41/23.24 ( ! [X17] : (( ! [X18] : (~sP2070(X18) | ~r1(X17,X18)) ) <=> ~sP2071(X17)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2071])])). 23.41/23.24 fof(f218568,plain,( 23.41/23.24 ~sP2071(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f204063,f4451])). 23.41/23.24 fof(f4451,plain,( 23.41/23.24 ( ! [X17,X16] : (~sP2071(X17) | ~sP2066(X16) | ~r1(X16,X17)) )), 23.41/23.24 inference(general_splitting,[],[f4449,f4450_D])). 23.41/23.24 fof(f4449,plain,( 23.41/23.24 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP2066(X16) | ~sP2070(X18)) )), 23.41/23.24 inference(general_splitting,[],[f4447,f4448_D])). 23.41/23.24 fof(f4447,plain,( 23.41/23.24 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2066(X16) | ~sP2069(X19)) )), 23.41/23.24 inference(general_splitting,[],[f4445,f4446_D])). 23.41/23.24 fof(f4445,plain,( 23.41/23.24 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2066(X16) | ~sP2068(X20)) )), 23.41/23.24 inference(general_splitting,[],[f4443,f4444_D])). 23.41/23.24 fof(f4443,plain,( 23.41/23.24 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2066(X16) | ~sP2067(X21)) )), 23.41/23.24 inference(general_splitting,[],[f4441,f4442_D])). 23.41/23.24 fof(f4441,plain,( 23.41/23.24 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2053(X22) | ~sP2066(X16)) )), 23.41/23.24 inference(general_splitting,[],[f4439,f4440_D])). 23.41/23.24 fof(f4440,plain,( 23.41/23.24 ( ! [X15,X16] : (sP2066(X16) | ~sP2065(X15) | ~r1(X15,X16)) )), 23.41/23.24 inference(cnf_transformation,[],[f4440_D])). 23.41/23.24 fof(f4440_D,plain,( 23.41/23.24 ( ! [X16] : (( ! [X15] : (~sP2065(X15) | ~r1(X15,X16)) ) <=> ~sP2066(X16)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2066])])). 23.41/23.24 fof(f4439,plain,( 23.41/23.24 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP2053(X22) | ~sP2065(X15)) )), 23.41/23.24 inference(general_splitting,[],[f4437,f4438_D])). 23.41/23.24 fof(f4438,plain,( 23.41/23.24 ( ! [X14,X15] : (sP2065(X15) | ~sP2064(X14) | ~r1(X14,X15)) )), 23.41/23.24 inference(cnf_transformation,[],[f4438_D])). 23.41/23.24 fof(f4438_D,plain,( 23.41/23.24 ( ! [X15] : (( ! [X14] : (~sP2064(X14) | ~r1(X14,X15)) ) <=> ~sP2065(X15)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2065])])). 23.41/23.24 fof(f4437,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2053(X22) | ~sP2064(X14)) )), 23.41/23.24 inference(general_splitting,[],[f4435,f4436_D])). 23.41/23.24 fof(f4436,plain,( 23.41/23.24 ( ! [X14,X13] : (sP2064(X14) | ~sP2063(X13) | ~r1(X13,X14)) )), 23.41/23.24 inference(cnf_transformation,[],[f4436_D])). 23.41/23.24 fof(f4436_D,plain,( 23.41/23.24 ( ! [X14] : (( ! [X13] : (~sP2063(X13) | ~r1(X13,X14)) ) <=> ~sP2064(X14)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2064])])). 23.41/23.24 fof(f4435,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2053(X22) | ~sP2063(X13)) )), 23.41/23.24 inference(general_splitting,[],[f4433,f4434_D])). 23.41/23.24 fof(f4434,plain,( 23.41/23.24 ( ! [X12,X13] : (sP2063(X13) | ~sP2062(X12) | ~r1(X12,X13)) )), 23.41/23.24 inference(cnf_transformation,[],[f4434_D])). 23.41/23.24 fof(f4434_D,plain,( 23.41/23.24 ( ! [X13] : (( ! [X12] : (~sP2062(X12) | ~r1(X12,X13)) ) <=> ~sP2063(X13)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2063])])). 23.41/23.24 fof(f4433,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2053(X22) | ~sP2062(X12)) )), 23.41/23.24 inference(general_splitting,[],[f4431,f4432_D])). 23.41/23.24 fof(f4432,plain,( 23.41/23.24 ( ! [X12,X11] : (sP2062(X12) | ~sP2061(X11) | ~r1(X11,X12)) )), 23.41/23.24 inference(cnf_transformation,[],[f4432_D])). 23.41/23.24 fof(f4432_D,plain,( 23.41/23.24 ( ! [X12] : (( ! [X11] : (~sP2061(X11) | ~r1(X11,X12)) ) <=> ~sP2062(X12)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2062])])). 23.41/23.24 fof(f4431,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2053(X22) | ~sP2061(X11)) )), 23.41/23.24 inference(general_splitting,[],[f4429,f4430_D])). 23.41/23.24 fof(f4430,plain,( 23.41/23.24 ( ! [X10,X11] : (sP2061(X11) | ~sP2060(X10) | ~r1(X10,X11)) )), 23.41/23.24 inference(cnf_transformation,[],[f4430_D])). 23.41/23.24 fof(f4430_D,plain,( 23.41/23.24 ( ! [X11] : (( ! [X10] : (~sP2060(X10) | ~r1(X10,X11)) ) <=> ~sP2061(X11)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2061])])). 23.41/23.24 fof(f4429,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~sP2053(X22) | ~sP2060(X10)) )), 23.41/23.24 inference(general_splitting,[],[f4427,f4428_D])). 23.41/23.24 fof(f4428,plain,( 23.41/23.24 ( ! [X10,X9] : (sP2060(X10) | ~sP2059(X9) | ~r1(X9,X10)) )), 23.41/23.24 inference(cnf_transformation,[],[f4428_D])). 23.41/23.24 fof(f4428_D,plain,( 23.41/23.24 ( ! [X10] : (( ! [X9] : (~sP2059(X9) | ~r1(X9,X10)) ) <=> ~sP2060(X10)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2060])])). 23.41/23.24 fof(f4427,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~sP2053(X22) | ~sP2059(X9)) )), 23.41/23.24 inference(general_splitting,[],[f4425,f4426_D])). 23.41/23.24 fof(f4426,plain,( 23.41/23.24 ( ! [X8,X9] : (sP2059(X9) | ~sP2058(X8) | ~r1(X8,X9)) )), 23.41/23.24 inference(cnf_transformation,[],[f4426_D])). 23.41/23.24 fof(f4426_D,plain,( 23.41/23.24 ( ! [X9] : (( ! [X8] : (~sP2058(X8) | ~r1(X8,X9)) ) <=> ~sP2059(X9)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2059])])). 23.41/23.24 fof(f4425,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2053(X22) | ~sP2058(X8)) )), 23.41/23.24 inference(general_splitting,[],[f4423,f4424_D])). 23.41/23.24 fof(f4424,plain,( 23.41/23.24 ( ! [X8,X7] : (sP2058(X8) | ~sP2057(X7) | ~r1(X7,X8)) )), 23.41/23.24 inference(cnf_transformation,[],[f4424_D])). 23.41/23.24 fof(f4424_D,plain,( 23.41/23.24 ( ! [X8] : (( ! [X7] : (~sP2057(X7) | ~r1(X7,X8)) ) <=> ~sP2058(X8)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2058])])). 23.41/23.24 fof(f4423,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2053(X22) | ~sP2057(X7)) )), 23.41/23.24 inference(general_splitting,[],[f4421,f4422_D])). 23.41/23.24 fof(f4422,plain,( 23.41/23.24 ( ! [X6,X7] : (sP2057(X7) | ~sP2056(X6) | ~r1(X6,X7)) )), 23.41/23.24 inference(cnf_transformation,[],[f4422_D])). 23.41/23.24 fof(f4422_D,plain,( 23.41/23.24 ( ! [X7] : (( ! [X6] : (~sP2056(X6) | ~r1(X6,X7)) ) <=> ~sP2057(X7)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2057])])). 23.41/23.24 fof(f4421,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2053(X22) | ~sP2056(X6)) )), 23.41/23.24 inference(general_splitting,[],[f4419,f4420_D])). 23.41/23.24 fof(f4420,plain,( 23.41/23.24 ( ! [X6,X5] : (sP2056(X6) | ~sP2055(X5) | ~r1(X5,X6)) )), 23.41/23.24 inference(cnf_transformation,[],[f4420_D])). 23.41/23.24 fof(f4420_D,plain,( 23.41/23.24 ( ! [X6] : (( ! [X5] : (~sP2055(X5) | ~r1(X5,X6)) ) <=> ~sP2056(X6)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2056])])). 23.41/23.24 fof(f4419,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2053(X22) | ~sP2055(X5)) )), 23.41/23.24 inference(general_splitting,[],[f4417,f4418_D])). 23.41/23.24 fof(f4418,plain,( 23.41/23.24 ( ! [X4,X5] : (sP2055(X5) | ~sP2054(X4) | ~r1(X4,X5)) )), 23.41/23.24 inference(cnf_transformation,[],[f4418_D])). 23.41/23.24 fof(f4418_D,plain,( 23.41/23.24 ( ! [X5] : (( ! [X4] : (~sP2054(X4) | ~r1(X4,X5)) ) <=> ~sP2055(X5)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2055])])). 23.41/23.24 fof(f4417,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2053(X22) | ~sP2054(X4)) )), 23.41/23.24 inference(general_splitting,[],[f4415,f4416_D])). 23.41/23.24 fof(f4416,plain,( 23.41/23.24 ( ! [X4,X3] : (sP2054(X4) | ~sP2045(X3) | ~r1(X3,X4)) )), 23.41/23.24 inference(cnf_transformation,[],[f4416_D])). 23.41/23.24 fof(f4416_D,plain,( 23.41/23.24 ( ! [X4] : (( ! [X3] : (~sP2045(X3) | ~r1(X3,X4)) ) <=> ~sP2054(X4)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2054])])). 23.41/23.24 fof(f4415,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3) | ~sP2053(X22)) )), 23.41/23.24 inference(general_splitting,[],[f4413,f4414_D])). 23.41/23.24 fof(f4413,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X23,X17,X19,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3) | ~sP2052(X23)) )), 23.41/23.24 inference(general_splitting,[],[f4411,f4412_D])). 23.41/23.24 fof(f4411,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X23,X17,X19,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3) | ~sP2051(X24)) )), 23.41/23.24 inference(general_splitting,[],[f4409,f4410_D])). 23.41/23.24 fof(f4409,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X23,X17,X19,X25,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3) | ~sP2050(X25)) )), 23.41/23.24 inference(general_splitting,[],[f4407,f4408_D])). 23.41/23.24 fof(f4407,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3) | ~sP2049(X26)) )), 23.41/23.24 inference(general_splitting,[],[f4405,f4406_D])). 23.41/23.24 fof(f4405,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3) | ~sP2048(X27)) )), 23.41/23.24 inference(general_splitting,[],[f4403,f4404_D])). 23.41/23.24 fof(f4403,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3) | ~sP2047(X28)) )), 23.41/23.24 inference(general_splitting,[],[f4401,f4402_D])). 23.41/23.24 fof(f4401,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3) | ~sP2046(X29)) )), 23.41/23.24 inference(general_splitting,[],[f4399,f4400_D])). 23.41/23.24 fof(f4399,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X29,X30) | ~p26(X30) | ~p27(X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~sP2045(X3)) )), 23.41/23.24 inference(general_splitting,[],[f4397,f4398_D])). 23.41/23.24 fof(f4398,plain,( 23.41/23.24 ( ! [X3,X1] : (sP2045(X3) | ~sP2044(X1) | ~r1(X1,X3)) )), 23.41/23.24 inference(cnf_transformation,[],[f4398_D])). 23.41/23.24 fof(f4398_D,plain,( 23.41/23.24 ( ! [X3] : (( ! [X1] : (~sP2044(X1) | ~r1(X1,X3)) ) <=> ~sP2045(X3)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2045])])). 23.41/23.24 fof(f4397,plain,( 23.41/23.24 ( ! [X28,X24,X4,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X29,X30) | ~p26(X30) | ~p27(X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X1,X3) | ~sP2044(X1)) )), 23.41/23.24 inference(general_splitting,[],[f477,f4396_D])). 23.41/23.24 fof(f4396,plain,( 23.41/23.24 ( ! [X0,X1] : (sP2044(X1) | ~sP24(X0) | ~r1(X0,X1)) )), 23.41/23.24 inference(cnf_transformation,[],[f4396_D])). 23.41/23.24 fof(f4396_D,plain,( 23.41/23.24 ( ! [X1] : (( ! [X0] : (~sP24(X0) | ~r1(X0,X1)) ) <=> ~sP2044(X1)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2044])])). 23.41/23.24 fof(f477,plain,( 23.41/23.24 ( ! [X28,X24,X4,X0,X12,X8,X21,X17,X29,X25,X5,X1,X13,X9,X22,X18,X30,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X4,X5) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X29,X30) | ~p26(X30) | ~p27(X30) | ~r1(X28,X29) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X8,X9) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP24(X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f154])). 23.41/23.24 fof(f204063,plain,( 23.41/23.24 sP2066(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f190231,f4440])). 23.41/23.24 fof(f190231,plain,( 23.41/23.24 sP2065(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f177060,f4438])). 23.41/23.24 fof(f177060,plain,( 23.41/23.24 sP2064(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f164533,f4436])). 23.41/23.24 fof(f164533,plain,( 23.41/23.24 sP2063(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f152632,f4434])). 23.41/23.24 fof(f152632,plain,( 23.41/23.24 sP2062(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f141341,f4432])). 23.41/23.24 fof(f141341,plain,( 23.41/23.24 sP2061(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f130643,f4430])). 23.41/23.24 fof(f130643,plain,( 23.41/23.24 sP2060(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f120525,f4428])). 23.41/23.24 fof(f120525,plain,( 23.41/23.24 sP2059(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f110961,f4426])). 23.41/23.24 fof(f110961,plain,( 23.41/23.24 sP2058(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f101949,f4424])). 23.41/23.24 fof(f101949,plain,( 23.41/23.24 sP2057(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f93468,f4422])). 23.41/23.24 fof(f93468,plain,( 23.41/23.24 sP2056(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f85500,f4420])). 23.41/23.24 fof(f85500,plain,( 23.41/23.24 sP2055(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f78037,f4418])). 23.41/23.24 fof(f78037,plain,( 23.41/23.24 sP2054(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f71041,f4416])). 23.41/23.24 fof(f71041,plain,( 23.41/23.24 sP2045(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f64516,f4398])). 23.41/23.24 fof(f64516,plain,( 23.41/23.24 sP2044(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f56444,f4396])). 23.41/23.24 fof(f472273,plain,( 23.41/23.24 ~sP2127(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f448904,f4570])). 23.41/23.24 fof(f4570,plain,( 23.41/23.24 ( ! [X26,X27] : (~sP2127(X27) | ~r1(X26,X27) | sP2131(X26)) )), 23.41/23.24 inference(cnf_transformation,[],[f4570_D])). 23.41/23.24 fof(f4570_D,plain,( 23.41/23.24 ( ! [X26] : (( ! [X27] : (~sP2127(X27) | ~r1(X26,X27)) ) <=> ~sP2131(X26)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2131])])). 23.41/23.24 fof(f448904,plain,( 23.41/23.24 ~sP2131(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f425754,f4572])). 23.41/23.24 fof(f4572,plain,( 23.41/23.24 ( ! [X26,X25] : (~sP2131(X26) | ~r1(X25,X26) | sP2132(X25)) )), 23.41/23.24 inference(cnf_transformation,[],[f4572_D])). 23.41/23.24 fof(f4572_D,plain,( 23.41/23.24 ( ! [X25] : (( ! [X26] : (~sP2131(X26) | ~r1(X25,X26)) ) <=> ~sP2132(X25)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2132])])). 23.41/23.24 fof(f425754,plain,( 23.41/23.24 ~sP2132(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f402920,f4574])). 23.41/23.24 fof(f4574,plain,( 23.41/23.24 ( ! [X24,X25] : (~sP2132(X25) | ~r1(X24,X25) | sP2133(X24)) )), 23.41/23.24 inference(cnf_transformation,[],[f4574_D])). 23.41/23.24 fof(f4574_D,plain,( 23.41/23.24 ( ! [X24] : (( ! [X25] : (~sP2132(X25) | ~r1(X24,X25)) ) <=> ~sP2133(X24)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2133])])). 23.41/23.24 fof(f402920,plain,( 23.41/23.24 ~sP2133(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f378235,f4576])). 23.41/23.24 fof(f4576,plain,( 23.41/23.24 ( ! [X24,X23] : (~sP2133(X24) | ~r1(X23,X24) | sP2134(X23)) )), 23.41/23.24 inference(cnf_transformation,[],[f4576_D])). 23.41/23.24 fof(f4576_D,plain,( 23.41/23.24 ( ! [X23] : (( ! [X24] : (~sP2133(X24) | ~r1(X23,X24)) ) <=> ~sP2134(X23)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2134])])). 23.41/23.24 fof(f378235,plain,( 23.41/23.24 ~sP2134(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f342755,f4578])). 23.41/23.24 fof(f4578,plain,( 23.41/23.24 ( ! [X23,X22] : (~sP2134(X23) | ~r1(X22,X23) | sP2135(X22)) )), 23.41/23.24 inference(cnf_transformation,[],[f4578_D])). 23.41/23.24 fof(f4578_D,plain,( 23.41/23.24 ( ! [X22] : (( ! [X23] : (~sP2134(X23) | ~r1(X22,X23)) ) <=> ~sP2135(X22)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2135])])). 23.41/23.24 fof(f342755,plain,( 23.41/23.24 ~sP2135(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f320663,f4606])). 23.41/23.24 fof(f4606,plain,( 23.41/23.24 ( ! [X21,X22] : (~sP2135(X22) | ~r1(X21,X22) | sP2149(X21)) )), 23.41/23.24 inference(cnf_transformation,[],[f4606_D])). 23.41/23.24 fof(f4606_D,plain,( 23.41/23.24 ( ! [X21] : (( ! [X22] : (~sP2135(X22) | ~r1(X21,X22)) ) <=> ~sP2149(X21)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2149])])). 23.41/23.24 fof(f320663,plain,( 23.41/23.24 ~sP2149(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f301772,f4608])). 23.41/23.24 fof(f4608,plain,( 23.41/23.24 ( ! [X21,X20] : (~sP2149(X21) | ~r1(X20,X21) | sP2150(X20)) )), 23.41/23.24 inference(cnf_transformation,[],[f4608_D])). 23.41/23.24 fof(f4608_D,plain,( 23.41/23.24 ( ! [X20] : (( ! [X21] : (~sP2149(X21) | ~r1(X20,X21)) ) <=> ~sP2150(X20)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2150])])). 23.41/23.24 fof(f301772,plain,( 23.41/23.24 ~sP2150(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f283651,f4610])). 23.41/23.24 fof(f4610,plain,( 23.41/23.24 ( ! [X19,X20] : (~sP2150(X20) | ~r1(X19,X20) | sP2151(X19)) )), 23.41/23.24 inference(cnf_transformation,[],[f4610_D])). 23.41/23.24 fof(f4610_D,plain,( 23.41/23.24 ( ! [X19] : (( ! [X20] : (~sP2150(X20) | ~r1(X19,X20)) ) <=> ~sP2151(X19)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2151])])). 23.41/23.24 fof(f283651,plain,( 23.41/23.24 ~sP2151(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f266292,f4612])). 23.41/23.24 fof(f4612,plain,( 23.41/23.24 ( ! [X19,X18] : (~sP2151(X19) | ~r1(X18,X19) | sP2152(X18)) )), 23.41/23.24 inference(cnf_transformation,[],[f4612_D])). 23.41/23.24 fof(f4612_D,plain,( 23.41/23.24 ( ! [X18] : (( ! [X19] : (~sP2151(X19) | ~r1(X18,X19)) ) <=> ~sP2152(X18)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2152])])). 23.41/23.24 fof(f266292,plain,( 23.41/23.24 ~sP2152(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f249664,f4614])). 23.41/23.24 fof(f4614,plain,( 23.41/23.24 ( ! [X17,X18] : (~sP2152(X18) | ~r1(X17,X18) | sP2153(X17)) )), 23.41/23.24 inference(cnf_transformation,[],[f4614_D])). 23.41/23.24 fof(f4614_D,plain,( 23.41/23.24 ( ! [X17] : (( ! [X18] : (~sP2152(X18) | ~r1(X17,X18)) ) <=> ~sP2153(X17)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2153])])). 23.41/23.24 fof(f249664,plain,( 23.41/23.24 ~sP2153(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f233766,f4615])). 23.41/23.24 fof(f4615,plain,( 23.41/23.24 ( ! [X17,X16] : (~sP2153(X17) | ~sP2148(X16) | ~r1(X16,X17)) )), 23.41/23.24 inference(general_splitting,[],[f4613,f4614_D])). 23.41/23.24 fof(f4613,plain,( 23.41/23.24 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP2148(X16) | ~sP2152(X18)) )), 23.41/23.24 inference(general_splitting,[],[f4611,f4612_D])). 23.41/23.24 fof(f4611,plain,( 23.41/23.24 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~sP2148(X16) | ~sP2151(X19)) )), 23.41/23.24 inference(general_splitting,[],[f4609,f4610_D])). 23.41/23.24 fof(f4609,plain,( 23.41/23.24 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~sP2148(X16) | ~sP2150(X20)) )), 23.41/23.24 inference(general_splitting,[],[f4607,f4608_D])). 23.41/23.24 fof(f4607,plain,( 23.41/23.24 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X20,X21) | ~sP2148(X16) | ~sP2149(X21)) )), 23.41/23.24 inference(general_splitting,[],[f4605,f4606_D])). 23.41/23.24 fof(f4605,plain,( 23.41/23.24 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~sP2135(X22) | ~sP2148(X16)) )), 23.41/23.24 inference(general_splitting,[],[f4603,f4604_D])). 23.41/23.24 fof(f4604,plain,( 23.41/23.24 ( ! [X15,X16] : (sP2148(X16) | ~sP2147(X15) | ~r1(X15,X16)) )), 23.41/23.24 inference(cnf_transformation,[],[f4604_D])). 23.41/23.24 fof(f4604_D,plain,( 23.41/23.24 ( ! [X16] : (( ! [X15] : (~sP2147(X15) | ~r1(X15,X16)) ) <=> ~sP2148(X16)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2148])])). 23.41/23.24 fof(f4603,plain,( 23.41/23.24 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~sP2135(X22) | ~sP2147(X15)) )), 23.41/23.24 inference(general_splitting,[],[f4601,f4602_D])). 23.41/23.24 fof(f4602,plain,( 23.41/23.24 ( ! [X14,X15] : (sP2147(X15) | ~sP2146(X14) | ~r1(X14,X15)) )), 23.41/23.24 inference(cnf_transformation,[],[f4602_D])). 23.41/23.24 fof(f4602_D,plain,( 23.41/23.24 ( ! [X15] : (( ! [X14] : (~sP2146(X14) | ~r1(X14,X15)) ) <=> ~sP2147(X15)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2147])])). 23.41/23.24 fof(f4601,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~sP2135(X22) | ~sP2146(X14)) )), 23.41/23.24 inference(general_splitting,[],[f4599,f4600_D])). 23.41/23.24 fof(f4600,plain,( 23.41/23.24 ( ! [X14,X13] : (sP2146(X14) | ~sP2145(X13) | ~r1(X13,X14)) )), 23.41/23.24 inference(cnf_transformation,[],[f4600_D])). 23.41/23.24 fof(f4600_D,plain,( 23.41/23.24 ( ! [X14] : (( ! [X13] : (~sP2145(X13) | ~r1(X13,X14)) ) <=> ~sP2146(X14)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2146])])). 23.41/23.24 fof(f4599,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2135(X22) | ~sP2145(X13)) )), 23.41/23.24 inference(general_splitting,[],[f4597,f4598_D])). 23.41/23.24 fof(f4598,plain,( 23.41/23.24 ( ! [X12,X13] : (sP2145(X13) | ~sP2144(X12) | ~r1(X12,X13)) )), 23.41/23.24 inference(cnf_transformation,[],[f4598_D])). 23.41/23.24 fof(f4598_D,plain,( 23.41/23.24 ( ! [X13] : (( ! [X12] : (~sP2144(X12) | ~r1(X12,X13)) ) <=> ~sP2145(X13)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2145])])). 23.41/23.24 fof(f4597,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2135(X22) | ~sP2144(X12)) )), 23.41/23.24 inference(general_splitting,[],[f4595,f4596_D])). 23.41/23.24 fof(f4596,plain,( 23.41/23.24 ( ! [X12,X11] : (sP2144(X12) | ~sP2143(X11) | ~r1(X11,X12)) )), 23.41/23.24 inference(cnf_transformation,[],[f4596_D])). 23.41/23.24 fof(f4596_D,plain,( 23.41/23.24 ( ! [X12] : (( ! [X11] : (~sP2143(X11) | ~r1(X11,X12)) ) <=> ~sP2144(X12)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2144])])). 23.41/23.24 fof(f4595,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2135(X22) | ~sP2143(X11)) )), 23.41/23.24 inference(general_splitting,[],[f4593,f4594_D])). 23.41/23.24 fof(f4594,plain,( 23.41/23.24 ( ! [X10,X11] : (sP2143(X11) | ~sP2142(X10) | ~r1(X10,X11)) )), 23.41/23.24 inference(cnf_transformation,[],[f4594_D])). 23.41/23.24 fof(f4594_D,plain,( 23.41/23.24 ( ! [X11] : (( ! [X10] : (~sP2142(X10) | ~r1(X10,X11)) ) <=> ~sP2143(X11)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2143])])). 23.41/23.24 fof(f4593,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2135(X22) | ~sP2142(X10)) )), 23.41/23.24 inference(general_splitting,[],[f4591,f4592_D])). 23.41/23.24 fof(f4592,plain,( 23.41/23.24 ( ! [X10,X9] : (sP2142(X10) | ~sP2141(X9) | ~r1(X9,X10)) )), 23.41/23.24 inference(cnf_transformation,[],[f4592_D])). 23.41/23.24 fof(f4592_D,plain,( 23.41/23.24 ( ! [X10] : (( ! [X9] : (~sP2141(X9) | ~r1(X9,X10)) ) <=> ~sP2142(X10)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2142])])). 23.41/23.24 fof(f4591,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2135(X22) | ~sP2141(X9)) )), 23.41/23.24 inference(general_splitting,[],[f4589,f4590_D])). 23.41/23.24 fof(f4590,plain,( 23.41/23.24 ( ! [X8,X9] : (sP2141(X9) | ~sP2140(X8) | ~r1(X8,X9)) )), 23.41/23.24 inference(cnf_transformation,[],[f4590_D])). 23.41/23.24 fof(f4590_D,plain,( 23.41/23.24 ( ! [X9] : (( ! [X8] : (~sP2140(X8) | ~r1(X8,X9)) ) <=> ~sP2141(X9)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2141])])). 23.41/23.24 fof(f4589,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2135(X22) | ~sP2140(X8)) )), 23.41/23.24 inference(general_splitting,[],[f4587,f4588_D])). 23.41/23.24 fof(f4588,plain,( 23.41/23.24 ( ! [X8,X7] : (sP2140(X8) | ~sP2139(X7) | ~r1(X7,X8)) )), 23.41/23.24 inference(cnf_transformation,[],[f4588_D])). 23.41/23.24 fof(f4588_D,plain,( 23.41/23.24 ( ! [X8] : (( ! [X7] : (~sP2139(X7) | ~r1(X7,X8)) ) <=> ~sP2140(X8)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2140])])). 23.41/23.24 fof(f4587,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~sP2135(X22) | ~sP2139(X7)) )), 23.41/23.24 inference(general_splitting,[],[f4585,f4586_D])). 23.41/23.24 fof(f4586,plain,( 23.41/23.24 ( ! [X6,X7] : (sP2139(X7) | ~sP2138(X6) | ~r1(X6,X7)) )), 23.41/23.24 inference(cnf_transformation,[],[f4586_D])). 23.41/23.24 fof(f4586_D,plain,( 23.41/23.24 ( ! [X7] : (( ! [X6] : (~sP2138(X6) | ~r1(X6,X7)) ) <=> ~sP2139(X7)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2139])])). 23.41/23.24 fof(f4585,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~sP2135(X22) | ~sP2138(X6)) )), 23.41/23.24 inference(general_splitting,[],[f4583,f4584_D])). 23.41/23.24 fof(f4584,plain,( 23.41/23.24 ( ! [X6,X5] : (sP2138(X6) | ~sP2137(X5) | ~r1(X5,X6)) )), 23.41/23.24 inference(cnf_transformation,[],[f4584_D])). 23.41/23.24 fof(f4584_D,plain,( 23.41/23.24 ( ! [X6] : (( ! [X5] : (~sP2137(X5) | ~r1(X5,X6)) ) <=> ~sP2138(X6)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2138])])). 23.41/23.24 fof(f4583,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~sP2135(X22) | ~sP2137(X5)) )), 23.41/23.24 inference(general_splitting,[],[f4581,f4582_D])). 23.41/23.24 fof(f4582,plain,( 23.41/23.24 ( ! [X4,X5] : (sP2137(X5) | ~sP2136(X4) | ~r1(X4,X5)) )), 23.41/23.24 inference(cnf_transformation,[],[f4582_D])). 23.41/23.24 fof(f4582_D,plain,( 23.41/23.24 ( ! [X5] : (( ! [X4] : (~sP2136(X4) | ~r1(X4,X5)) ) <=> ~sP2137(X5)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2137])])). 23.41/23.24 fof(f4581,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~sP2135(X22) | ~sP2136(X4)) )), 23.41/23.24 inference(general_splitting,[],[f4579,f4580_D])). 23.41/23.24 fof(f4580,plain,( 23.41/23.24 ( ! [X4,X3] : (sP2136(X4) | ~sP2130(X3) | ~r1(X3,X4)) )), 23.41/23.24 inference(cnf_transformation,[],[f4580_D])). 23.41/23.24 fof(f4580_D,plain,( 23.41/23.24 ( ! [X4] : (( ! [X3] : (~sP2130(X3) | ~r1(X3,X4)) ) <=> ~sP2136(X4)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2136])])). 23.41/23.24 fof(f4579,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2130(X3) | ~sP2135(X22)) )), 23.41/23.24 inference(general_splitting,[],[f4577,f4578_D])). 23.41/23.24 fof(f4577,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2130(X3) | ~sP2134(X23)) )), 23.41/23.24 inference(general_splitting,[],[f4575,f4576_D])). 23.41/23.24 fof(f4575,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2130(X3) | ~sP2133(X24)) )), 23.41/23.24 inference(general_splitting,[],[f4573,f4574_D])). 23.41/23.24 fof(f4573,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X19,X17,X23,X25,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2130(X3) | ~sP2132(X25)) )), 23.41/23.24 inference(general_splitting,[],[f4571,f4572_D])). 23.41/23.24 fof(f4571,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2130(X3) | ~sP2131(X26)) )), 23.41/23.24 inference(general_splitting,[],[f4569,f4570_D])). 23.41/23.24 fof(f4569,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2127(X27) | ~sP2130(X3)) )), 23.41/23.24 inference(general_splitting,[],[f4567,f4568_D])). 23.41/23.24 fof(f4568,plain,( 23.41/23.24 ( ! [X2,X3] : (sP2130(X3) | ~sP2129(X2) | ~r1(X2,X3)) )), 23.41/23.24 inference(cnf_transformation,[],[f4568_D])). 23.41/23.24 fof(f4568_D,plain,( 23.41/23.24 ( ! [X3] : (( ! [X2] : (~sP2129(X2) | ~r1(X2,X3)) ) <=> ~sP2130(X3)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2130])])). 23.41/23.24 fof(f4567,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X2,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~sP2127(X27) | ~sP2129(X2)) )), 23.41/23.24 inference(general_splitting,[],[f4565,f4566_D])). 23.41/23.24 fof(f4566,plain,( 23.41/23.24 ( ! [X2,X1] : (sP2129(X2) | ~sP2128(X1) | ~r1(X1,X2)) )), 23.41/23.24 inference(cnf_transformation,[],[f4566_D])). 23.41/23.24 fof(f4566_D,plain,( 23.41/23.24 ( ! [X2] : (( ! [X1] : (~sP2128(X1) | ~r1(X1,X2)) ) <=> ~sP2129(X2)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2129])])). 23.41/23.24 fof(f4565,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X2,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X2,X3) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X2) | ~sP2127(X27) | ~sP2128(X1)) )), 23.41/23.24 inference(general_splitting,[],[f4563,f4564_D])). 23.41/23.24 fof(f4564,plain,( 23.41/23.24 ( ! [X0,X1] : (sP2128(X1) | ~sP23(X0) | ~r1(X0,X1)) )), 23.41/23.24 inference(cnf_transformation,[],[f4564_D])). 23.41/23.24 fof(f4564_D,plain,( 23.41/23.24 ( ! [X1] : (( ! [X0] : (~sP23(X0) | ~r1(X0,X1)) ) <=> ~sP2128(X1)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2128])])). 23.41/23.24 fof(f4563,plain,( 23.41/23.24 ( ! [X24,X4,X0,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X2,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X0,X1) | ~r1(X2,X3) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X2) | ~sP23(X0) | ~sP2127(X27)) )), 23.41/23.24 inference(general_splitting,[],[f484,f4562_D])). 23.41/23.24 fof(f484,plain,( 23.41/23.24 ( ! [X28,X24,X4,X0,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X2,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X0,X1) | ~r1(X2,X3) | ~r1(X7,X8) | ~r1(X8,X9) | ~r1(X9,X10) | ~r1(X10,X11) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X14,X15) | ~r1(X16,X17) | ~r1(X17,X18) | ~r1(X18,X19) | ~r1(X19,X20) | ~r1(X21,X22) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X27,X28) | p25(X28) | p26(X28) | ~r1(X24,X25) | ~r1(X22,X23) | ~r1(X20,X21) | ~r1(X15,X16) | ~r1(X13,X14) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X3,X4) | ~r1(X1,X2) | ~sP23(X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f158])). 23.41/23.24 fof(f233766,plain,( 23.41/23.24 sP2148(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f218566,f4604])). 23.41/23.24 fof(f218566,plain,( 23.41/23.24 sP2147(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f204061,f4602])). 23.41/23.24 fof(f204061,plain,( 23.41/23.24 sP2146(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f190229,f4600])). 23.41/23.24 fof(f190229,plain,( 23.41/23.24 sP2145(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f177058,f4598])). 23.41/23.24 fof(f177058,plain,( 23.41/23.24 sP2144(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f164531,f4596])). 23.41/23.24 fof(f164531,plain,( 23.41/23.24 sP2143(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f152630,f4594])). 23.41/23.24 fof(f152630,plain,( 23.41/23.24 sP2142(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f141339,f4592])). 23.41/23.24 fof(f141339,plain,( 23.41/23.24 sP2141(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f130641,f4590])). 23.41/23.24 fof(f130641,plain,( 23.41/23.24 sP2140(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f120523,f4588])). 23.41/23.24 fof(f120523,plain,( 23.41/23.24 sP2139(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f110959,f4586])). 23.41/23.24 fof(f110959,plain,( 23.41/23.24 sP2138(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f101947,f4584])). 23.41/23.24 fof(f101947,plain,( 23.41/23.24 sP2137(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f93466,f4582])). 23.41/23.24 fof(f93466,plain,( 23.41/23.24 sP2136(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f85498,f4580])). 23.41/23.24 fof(f85498,plain,( 23.41/23.24 sP2130(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f78035,f4568])). 23.41/23.24 fof(f78035,plain,( 23.41/23.24 sP2129(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f71039,f4566])). 23.41/23.24 fof(f71039,plain,( 23.41/23.24 sP2128(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f64510,f4564])). 23.41/23.24 fof(f715,plain,( 23.41/23.24 ( ! [X0] : (r1(X0,X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f3])). 23.41/23.24 fof(f3,axiom,( 23.41/23.24 ! [X0] : r1(X0,X0)), 23.41/23.24 file('/export/starexec/sandbox2/benchmark/theBenchmark.p',reflexivity)). 23.41/23.24 fof(f472263,plain,( 23.41/23.24 ~sP2154(sK48(sK101))), 23.41/23.24 inference(unit_resulting_resolution,[],[f6450,f448895,f4622])). 23.41/23.24 fof(f4622,plain,( 23.41/23.24 ( ! [X26,X27] : (~sP2154(X27) | ~r1(X26,X27) | sP2157(X26)) )), 23.41/23.24 inference(cnf_transformation,[],[f4622_D])). 23.41/23.24 fof(f4622_D,plain,( 23.41/23.24 ( ! [X26] : (( ! [X27] : (~sP2154(X27) | ~r1(X26,X27)) ) <=> ~sP2157(X26)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2157])])). 23.41/23.24 fof(f448895,plain,( 23.41/23.24 ~sP2157(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f425745,f4624])). 23.41/23.24 fof(f4624,plain,( 23.41/23.24 ( ! [X26,X25] : (~sP2157(X26) | ~r1(X25,X26) | sP2158(X25)) )), 23.41/23.24 inference(cnf_transformation,[],[f4624_D])). 23.41/23.24 fof(f4624_D,plain,( 23.41/23.24 ( ! [X25] : (( ! [X26] : (~sP2157(X26) | ~r1(X25,X26)) ) <=> ~sP2158(X25)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2158])])). 23.41/23.24 fof(f425745,plain,( 23.41/23.24 ~sP2158(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f402911,f4626])). 23.41/23.24 fof(f4626,plain,( 23.41/23.24 ( ! [X24,X25] : (~sP2158(X25) | ~r1(X24,X25) | sP2159(X24)) )), 23.41/23.24 inference(cnf_transformation,[],[f4626_D])). 23.41/23.24 fof(f4626_D,plain,( 23.41/23.24 ( ! [X24] : (( ! [X25] : (~sP2158(X25) | ~r1(X24,X25)) ) <=> ~sP2159(X24)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2159])])). 23.41/23.24 fof(f402911,plain,( 23.41/23.24 ~sP2159(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f378226,f4628])). 23.41/23.24 fof(f4628,plain,( 23.41/23.24 ( ! [X24,X23] : (~sP2159(X24) | ~r1(X23,X24) | sP2160(X23)) )), 23.41/23.24 inference(cnf_transformation,[],[f4628_D])). 23.41/23.24 fof(f4628_D,plain,( 23.41/23.24 ( ! [X23] : (( ! [X24] : (~sP2159(X24) | ~r1(X23,X24)) ) <=> ~sP2160(X23)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2160])])). 23.41/23.24 fof(f378226,plain,( 23.41/23.24 ~sP2160(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f342746,f4630])). 23.41/23.24 fof(f4630,plain,( 23.41/23.24 ( ! [X23,X22] : (~sP2160(X23) | ~r1(X22,X23) | sP2161(X22)) )), 23.41/23.24 inference(cnf_transformation,[],[f4630_D])). 23.41/23.24 fof(f4630_D,plain,( 23.41/23.24 ( ! [X22] : (( ! [X23] : (~sP2160(X23) | ~r1(X22,X23)) ) <=> ~sP2161(X22)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2161])])). 23.41/23.24 fof(f342746,plain,( 23.41/23.24 ~sP2161(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f320657,f4658])). 23.41/23.24 fof(f4658,plain,( 23.41/23.24 ( ! [X21,X22] : (~sP2161(X22) | ~r1(X21,X22) | sP2175(X21)) )), 23.41/23.24 inference(cnf_transformation,[],[f4658_D])). 23.41/23.24 fof(f4658_D,plain,( 23.41/23.24 ( ! [X21] : (( ! [X22] : (~sP2161(X22) | ~r1(X21,X22)) ) <=> ~sP2175(X21)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2175])])). 23.41/23.24 fof(f320657,plain,( 23.41/23.24 ~sP2175(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f301766,f4660])). 23.41/23.24 fof(f4660,plain,( 23.41/23.24 ( ! [X21,X20] : (~sP2175(X21) | ~r1(X20,X21) | sP2176(X20)) )), 23.41/23.24 inference(cnf_transformation,[],[f4660_D])). 23.41/23.24 fof(f4660_D,plain,( 23.41/23.24 ( ! [X20] : (( ! [X21] : (~sP2175(X21) | ~r1(X20,X21)) ) <=> ~sP2176(X20)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2176])])). 23.41/23.24 fof(f301766,plain,( 23.41/23.24 ~sP2176(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f283645,f4662])). 23.41/23.24 fof(f4662,plain,( 23.41/23.24 ( ! [X19,X20] : (~sP2176(X20) | ~r1(X19,X20) | sP2177(X19)) )), 23.41/23.24 inference(cnf_transformation,[],[f4662_D])). 23.41/23.24 fof(f4662_D,plain,( 23.41/23.24 ( ! [X19] : (( ! [X20] : (~sP2176(X20) | ~r1(X19,X20)) ) <=> ~sP2177(X19)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2177])])). 23.41/23.24 fof(f283645,plain,( 23.41/23.24 ~sP2177(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f266286,f4664])). 23.41/23.24 fof(f4664,plain,( 23.41/23.24 ( ! [X19,X18] : (~sP2177(X19) | ~r1(X18,X19) | sP2178(X18)) )), 23.41/23.24 inference(cnf_transformation,[],[f4664_D])). 23.41/23.24 fof(f4664_D,plain,( 23.41/23.24 ( ! [X18] : (( ! [X19] : (~sP2177(X19) | ~r1(X18,X19)) ) <=> ~sP2178(X18)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2178])])). 23.41/23.24 fof(f266286,plain,( 23.41/23.24 ~sP2178(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f249658,f4666])). 23.41/23.24 fof(f4666,plain,( 23.41/23.24 ( ! [X17,X18] : (~sP2178(X18) | ~r1(X17,X18) | sP2179(X17)) )), 23.41/23.24 inference(cnf_transformation,[],[f4666_D])). 23.41/23.24 fof(f4666_D,plain,( 23.41/23.24 ( ! [X17] : (( ! [X18] : (~sP2178(X18) | ~r1(X17,X18)) ) <=> ~sP2179(X17)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2179])])). 23.41/23.24 fof(f249658,plain,( 23.41/23.24 ~sP2179(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f233760,f4667])). 23.41/23.24 fof(f4667,plain,( 23.41/23.24 ( ! [X17,X16] : (~sP2179(X17) | ~sP2174(X16) | ~r1(X16,X17)) )), 23.41/23.24 inference(general_splitting,[],[f4665,f4666_D])). 23.41/23.24 fof(f4665,plain,( 23.41/23.24 ( ! [X17,X18,X16] : (~r1(X16,X17) | ~r1(X17,X18) | ~sP2174(X16) | ~sP2178(X18)) )), 23.41/23.24 inference(general_splitting,[],[f4663,f4664_D])). 23.41/23.24 fof(f4663,plain,( 23.41/23.24 ( ! [X19,X17,X18,X16] : (~r1(X16,X17) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2174(X16) | ~sP2177(X19)) )), 23.41/23.24 inference(general_splitting,[],[f4661,f4662_D])). 23.41/23.24 fof(f4661,plain,( 23.41/23.24 ( ! [X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2174(X16) | ~sP2176(X20)) )), 23.41/23.24 inference(general_splitting,[],[f4659,f4660_D])). 23.41/23.24 fof(f4659,plain,( 23.41/23.24 ( ! [X21,X19,X17,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2174(X16) | ~sP2175(X21)) )), 23.41/23.24 inference(general_splitting,[],[f4657,f4658_D])). 23.41/23.24 fof(f4657,plain,( 23.41/23.24 ( ! [X21,X19,X17,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~sP2161(X22) | ~sP2174(X16)) )), 23.41/23.24 inference(general_splitting,[],[f4655,f4656_D])). 23.41/23.24 fof(f4656,plain,( 23.41/23.24 ( ! [X15,X16] : (sP2174(X16) | ~sP2173(X15) | ~r1(X15,X16)) )), 23.41/23.24 inference(cnf_transformation,[],[f4656_D])). 23.41/23.24 fof(f4656_D,plain,( 23.41/23.24 ( ! [X16] : (( ! [X15] : (~sP2173(X15) | ~r1(X15,X16)) ) <=> ~sP2174(X16)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2174])])). 23.41/23.24 fof(f4655,plain,( 23.41/23.24 ( ! [X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~sP2161(X22) | ~sP2173(X15)) )), 23.41/23.24 inference(general_splitting,[],[f4653,f4654_D])). 23.41/23.24 fof(f4654,plain,( 23.41/23.24 ( ! [X14,X15] : (sP2173(X15) | ~sP2172(X14) | ~r1(X14,X15)) )), 23.41/23.24 inference(cnf_transformation,[],[f4654_D])). 23.41/23.24 fof(f4654_D,plain,( 23.41/23.24 ( ! [X15] : (( ! [X14] : (~sP2172(X14) | ~r1(X14,X15)) ) <=> ~sP2173(X15)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2173])])). 23.41/23.24 fof(f4653,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X22,X20,X18,X16] : (~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2161(X22) | ~sP2172(X14)) )), 23.41/23.24 inference(general_splitting,[],[f4651,f4652_D])). 23.41/23.24 fof(f4652,plain,( 23.41/23.24 ( ! [X14,X13] : (sP2172(X14) | ~sP2171(X13) | ~r1(X13,X14)) )), 23.41/23.24 inference(cnf_transformation,[],[f4652_D])). 23.41/23.24 fof(f4652_D,plain,( 23.41/23.24 ( ! [X14] : (( ! [X13] : (~sP2171(X13) | ~r1(X13,X14)) ) <=> ~sP2172(X14)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2172])])). 23.41/23.24 fof(f4651,plain,( 23.41/23.24 ( ! [X14,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2161(X22) | ~sP2171(X13)) )), 23.41/23.24 inference(general_splitting,[],[f4649,f4650_D])). 23.41/23.24 fof(f4650,plain,( 23.41/23.24 ( ! [X12,X13] : (sP2171(X13) | ~sP2170(X12) | ~r1(X12,X13)) )), 23.41/23.24 inference(cnf_transformation,[],[f4650_D])). 23.41/23.24 fof(f4650_D,plain,( 23.41/23.24 ( ! [X13] : (( ! [X12] : (~sP2170(X12) | ~r1(X12,X13)) ) <=> ~sP2171(X13)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2171])])). 23.41/23.24 fof(f4649,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X22,X20,X18,X16] : (~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2161(X22) | ~sP2170(X12)) )), 23.41/23.24 inference(general_splitting,[],[f4647,f4648_D])). 23.41/23.24 fof(f4648,plain,( 23.41/23.24 ( ! [X12,X11] : (sP2170(X12) | ~sP2169(X11) | ~r1(X11,X12)) )), 23.41/23.24 inference(cnf_transformation,[],[f4648_D])). 23.41/23.24 fof(f4648_D,plain,( 23.41/23.24 ( ! [X12] : (( ! [X11] : (~sP2169(X11) | ~r1(X11,X12)) ) <=> ~sP2170(X12)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2170])])). 23.41/23.24 fof(f4647,plain,( 23.41/23.24 ( ! [X14,X12,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~sP2161(X22) | ~sP2169(X11)) )), 23.41/23.24 inference(general_splitting,[],[f4645,f4646_D])). 23.41/23.24 fof(f4646,plain,( 23.41/23.24 ( ! [X10,X11] : (sP2169(X11) | ~sP2168(X10) | ~r1(X10,X11)) )), 23.41/23.24 inference(cnf_transformation,[],[f4646_D])). 23.41/23.24 fof(f4646_D,plain,( 23.41/23.24 ( ! [X11] : (( ! [X10] : (~sP2168(X10) | ~r1(X10,X11)) ) <=> ~sP2169(X11)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2169])])). 23.41/23.24 fof(f4645,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X22,X20,X18,X16] : (~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~sP2161(X22) | ~sP2168(X10)) )), 23.41/23.24 inference(general_splitting,[],[f4643,f4644_D])). 23.41/23.24 fof(f4644,plain,( 23.41/23.24 ( ! [X10,X9] : (sP2168(X10) | ~sP2167(X9) | ~r1(X9,X10)) )), 23.41/23.24 inference(cnf_transformation,[],[f4644_D])). 23.41/23.24 fof(f4644_D,plain,( 23.41/23.24 ( ! [X10] : (( ! [X9] : (~sP2167(X9) | ~r1(X9,X10)) ) <=> ~sP2168(X10)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2168])])). 23.41/23.24 fof(f4643,plain,( 23.41/23.24 ( ! [X14,X12,X10,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~sP2161(X22) | ~sP2167(X9)) )), 23.41/23.24 inference(general_splitting,[],[f4641,f4642_D])). 23.41/23.24 fof(f4642,plain,( 23.41/23.24 ( ! [X8,X9] : (sP2167(X9) | ~sP2166(X8) | ~r1(X8,X9)) )), 23.41/23.24 inference(cnf_transformation,[],[f4642_D])). 23.41/23.24 fof(f4642_D,plain,( 23.41/23.24 ( ! [X9] : (( ! [X8] : (~sP2166(X8) | ~r1(X8,X9)) ) <=> ~sP2167(X9)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2167])])). 23.41/23.24 fof(f4641,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2161(X22) | ~sP2166(X8)) )), 23.41/23.24 inference(general_splitting,[],[f4639,f4640_D])). 23.41/23.24 fof(f4640,plain,( 23.41/23.24 ( ! [X8,X7] : (sP2166(X8) | ~sP2165(X7) | ~r1(X7,X8)) )), 23.41/23.24 inference(cnf_transformation,[],[f4640_D])). 23.41/23.24 fof(f4640_D,plain,( 23.41/23.24 ( ! [X8] : (( ! [X7] : (~sP2165(X7) | ~r1(X7,X8)) ) <=> ~sP2166(X8)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2166])])). 23.41/23.24 fof(f4639,plain,( 23.41/23.24 ( ! [X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2161(X22) | ~sP2165(X7)) )), 23.41/23.24 inference(general_splitting,[],[f4637,f4638_D])). 23.41/23.24 fof(f4638,plain,( 23.41/23.24 ( ! [X6,X7] : (sP2165(X7) | ~sP2164(X6) | ~r1(X6,X7)) )), 23.41/23.24 inference(cnf_transformation,[],[f4638_D])). 23.41/23.24 fof(f4638_D,plain,( 23.41/23.24 ( ! [X7] : (( ! [X6] : (~sP2164(X6) | ~r1(X6,X7)) ) <=> ~sP2165(X7)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2165])])). 23.41/23.24 fof(f4637,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2161(X22) | ~sP2164(X6)) )), 23.41/23.24 inference(general_splitting,[],[f4635,f4636_D])). 23.41/23.24 fof(f4636,plain,( 23.41/23.24 ( ! [X6,X5] : (sP2164(X6) | ~sP2163(X5) | ~r1(X5,X6)) )), 23.41/23.24 inference(cnf_transformation,[],[f4636_D])). 23.41/23.24 fof(f4636_D,plain,( 23.41/23.24 ( ! [X6] : (( ! [X5] : (~sP2163(X5) | ~r1(X5,X6)) ) <=> ~sP2164(X6)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2164])])). 23.41/23.24 fof(f4635,plain,( 23.41/23.24 ( ! [X6,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~sP2161(X22) | ~sP2163(X5)) )), 23.41/23.24 inference(general_splitting,[],[f4633,f4634_D])). 23.41/23.24 fof(f4634,plain,( 23.41/23.24 ( ! [X4,X5] : (sP2163(X5) | ~sP2162(X4) | ~r1(X4,X5)) )), 23.41/23.24 inference(cnf_transformation,[],[f4634_D])). 23.41/23.24 fof(f4634_D,plain,( 23.41/23.24 ( ! [X5] : (( ! [X4] : (~sP2162(X4) | ~r1(X4,X5)) ) <=> ~sP2163(X5)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2163])])). 23.41/23.24 fof(f4633,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2161(X22) | ~sP2162(X4)) )), 23.41/23.24 inference(general_splitting,[],[f4631,f4632_D])). 23.41/23.24 fof(f4632,plain,( 23.41/23.24 ( ! [X4,X3] : (sP2162(X4) | ~sP2156(X3) | ~r1(X3,X4)) )), 23.41/23.24 inference(cnf_transformation,[],[f4632_D])). 23.41/23.24 fof(f4632_D,plain,( 23.41/23.24 ( ! [X4] : (( ! [X3] : (~sP2156(X3) | ~r1(X3,X4)) ) <=> ~sP2162(X4)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2162])])). 23.41/23.24 fof(f4631,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X19,X17,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2156(X3) | ~sP2161(X22)) )), 23.41/23.24 inference(general_splitting,[],[f4629,f4630_D])). 23.41/23.24 fof(f4629,plain,( 23.41/23.24 ( ! [X6,X4,X14,X12,X10,X8,X21,X23,X17,X19,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2156(X3) | ~sP2160(X23)) )), 23.41/23.24 inference(general_splitting,[],[f4627,f4628_D])). 23.41/23.24 fof(f4627,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X23,X17,X19,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2156(X3) | ~sP2159(X24)) )), 23.41/23.24 inference(general_splitting,[],[f4625,f4626_D])). 23.41/23.24 fof(f4625,plain,( 23.41/23.24 ( ! [X24,X6,X4,X14,X12,X10,X8,X21,X23,X17,X19,X25,X7,X5,X3,X15,X13,X11,X9,X22,X20,X18,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2156(X3) | ~sP2158(X25)) )), 23.41/23.24 inference(general_splitting,[],[f4623,f4624_D])). 23.41/23.24 fof(f4623,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2156(X3) | ~sP2157(X26)) )), 23.41/23.24 inference(general_splitting,[],[f4621,f4622_D])). 23.41/23.24 fof(f4621,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~sP2154(X27) | ~sP2156(X3)) )), 23.41/23.24 inference(general_splitting,[],[f4619,f4620_D])). 23.41/23.24 fof(f4620,plain,( 23.41/23.24 ( ! [X3,X1] : (sP2156(X3) | ~sP2155(X1) | ~r1(X1,X3)) )), 23.41/23.24 inference(cnf_transformation,[],[f4620_D])). 23.41/23.24 fof(f4620_D,plain,( 23.41/23.24 ( ! [X3] : (( ! [X1] : (~sP2155(X1) | ~r1(X1,X3)) ) <=> ~sP2156(X3)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2156])])). 23.41/23.24 fof(f4619,plain,( 23.41/23.24 ( ! [X24,X4,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~r1(X1,X3) | ~sP2154(X27) | ~sP2155(X1)) )), 23.41/23.24 inference(general_splitting,[],[f4617,f4618_D])). 23.41/23.24 fof(f4618,plain,( 23.41/23.24 ( ! [X0,X1] : (sP2155(X1) | ~sP22(X0) | ~r1(X0,X1)) )), 23.41/23.24 inference(cnf_transformation,[],[f4618_D])). 23.41/23.24 fof(f4618_D,plain,( 23.41/23.24 ( ! [X1] : (( ! [X0] : (~sP22(X0) | ~r1(X0,X1)) ) <=> ~sP2155(X1)) )), 23.41/23.24 introduced(general_splitting_component_introduction,[new_symbols(naming,[sP2155])])). 23.41/23.24 fof(f4617,plain,( 23.41/23.24 ( ! [X24,X4,X0,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X25,X26) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP22(X0) | ~sP2154(X27)) )), 23.41/23.24 inference(general_splitting,[],[f487,f4616_D])). 23.41/23.24 fof(f487,plain,( 23.41/23.24 ( ! [X28,X24,X4,X0,X12,X8,X21,X17,X25,X5,X1,X13,X9,X22,X18,X26,X6,X14,X10,X23,X19,X27,X7,X3,X15,X11,X20,X16] : (~r1(X3,X4) | ~r1(X5,X6) | ~r1(X6,X7) | ~r1(X7,X8) | ~r1(X9,X10) | ~r1(X11,X12) | ~r1(X12,X13) | ~r1(X13,X14) | ~r1(X16,X17) | ~r1(X20,X21) | ~r1(X21,X22) | ~r1(X22,X23) | ~r1(X23,X24) | ~r1(X25,X26) | ~p25(X28) | ~p24(X28) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X24,X25) | ~r1(X19,X20) | ~r1(X18,X19) | ~r1(X17,X18) | ~r1(X15,X16) | ~r1(X14,X15) | ~r1(X10,X11) | ~r1(X8,X9) | ~r1(X4,X5) | ~r1(X1,X3) | ~r1(X0,X1) | ~sP22(X0)) )), 23.41/23.24 inference(cnf_transformation,[],[f162])). 23.41/23.24 fof(f233760,plain,( 23.41/23.24 sP2174(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f218560,f4656])). 23.41/23.24 fof(f218560,plain,( 23.41/23.24 sP2173(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f204055,f4654])). 23.41/23.24 fof(f204055,plain,( 23.41/23.24 sP2172(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f190223,f4652])). 23.41/23.24 fof(f190223,plain,( 23.41/23.24 sP2171(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f177052,f4650])). 23.41/23.24 fof(f177052,plain,( 23.41/23.24 sP2170(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f164525,f4648])). 23.41/23.24 fof(f164525,plain,( 23.41/23.24 sP2169(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f152624,f4646])). 23.41/23.24 fof(f152624,plain,( 23.41/23.24 sP2168(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f141333,f4644])). 23.41/23.24 fof(f141333,plain,( 23.41/23.24 sP2167(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f130635,f4642])). 23.41/23.24 fof(f130635,plain,( 23.41/23.24 sP2166(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f120517,f4640])). 23.41/23.24 fof(f120517,plain,( 23.41/23.24 sP2165(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f110953,f4638])). 23.41/23.24 fof(f110953,plain,( 23.41/23.24 sP2164(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f101941,f4636])). 23.41/23.24 fof(f101941,plain,( 23.41/23.24 sP2163(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f93460,f4634])). 23.41/23.24 fof(f93460,plain,( 23.41/23.24 sP2162(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f85492,f4632])). 23.41/23.24 fof(f85492,plain,( 23.41/23.24 sP2156(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f78029,f4620])). 23.41/23.24 fof(f78029,plain,( 23.41/23.24 sP2155(sK101)), 23.41/23.24 inference(unit_resulting_resolution,[],[f715,f71035,f4618])). 23.41/23.24 % SZS output end Proof for theBenchmark 23.41/23.24 % ------------------------------ 23.41/23.24 % Version: Vampire 4.4.0 (commit 7916d27 on 2019-08-23 08:50:16 +0100) 23.41/23.24 % Termination reason: Refutation 23.41/23.24 23.41/23.24 % Memory used [KB]: 274665 23.41/23.24 % Time elapsed: 4.848 s 23.41/23.24 % ------------------------------ 23.41/23.24 % ------------------------------ 23.41/23.26 % Success in time 22.889 s 23.41/23.26 EOF