0.11/0.12 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.11/0.13 % Command : vampire --ignore_missing on --mode portfolio/casc [--schedule casc_hol_2020] -p tptp -om szs -t %d %s 0.13/0.34 % Computer : n016.cluster.edu 0.13/0.34 % Model : x86_64 x86_64 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.13/0.34 % Memory : 8042.1875MB 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64 0.13/0.34 % CPULimit : 960 0.13/0.34 % WCLimit : 120 0.13/0.34 % DateTime : Tue Aug 9 03:25:42 EDT 2022 0.13/0.34 % CPUTime : 0.13/0.35 This is a FOF_ problem 0.13/0.35 Running vampire --ignore_missing on --mode casc -t 960 /export/starexec/sandbox/benchmark/theBenchmark.p 0.13/0.36 % (5076)Running in auto input_syntax mode. Trying TPTP 0.21/0.42 WARNING Broken Constraint: if lrs_weight_limit_only(on) has been set then saturation_algorithm(discount) is equal to lrs 0.21/0.42 % (5079)lrs+1_3_awrs=decay:awrsf=4:afp=10000:afq=1.0:amm=off:anc=none:bd=off:cond=on:fsr=off:fde=unused:gs=on:lwlo=on:nm=16:nwc=1:sas=z3:stl=30:ss=axioms:s2a=on:st=1.2:sos=theory:sp=frequency_3 on theBenchmark 0.21/0.42 % (5082)dis+1002_8_awrs=converge:awrsf=64:av=off:cond=fast:fsr=off:gsp=on:lma=on:nm=64:nwc=1.2:s2a=on:sos=on:sp=frequency:urr=on:updr=off:uhcvi=on_12 on theBenchmark 0.21/0.42 % (5081)dis+1_3_add=large:afp=4000:afq=1.0:anc=none:gs=on:gsem=off:inw=on:lcm=reverse:lwlo=on:nm=64:nwc=1:sas=z3:sos=all:sac=on:thi=all:uwa=all:updr=off:uhcvi=on_12 on theBenchmark 0.21/0.42 % (5083)dis+1_8_afp=4000:afq=1.1:amm=sco:gsp=on:nm=64:newcnf=on:nwc=4:sac=on:sp=occurrence:updr=off_191 on theBenchmark 0.21/0.43 % (5078)dis+1002_8:1_awrs=converge:awrsf=256:anc=all_dependent:br=off:fsr=off:fde=none:gs=on:gsaa=from_current:gsem=on:irw=on:nm=64:nwc=1:sas=z3:s2a=on:sp=frequency:thf=on:uwa=interpreted_only:urr=on_7 on theBenchmark 0.21/0.43 % (5077)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_2 on theBenchmark 0.21/0.43 % (5080)lrs-11_4:1_afp=4000:afq=2.0:anc=none:br=off:gs=on:lwlo=on:nm=64:nwc=3:stl=30:urr=on_3 on theBenchmark 0.21/0.44 % (5084)dis+10_128_add=large:afr=on:afp=4000:afq=1.0:amm=off:anc=none:lma=on:nm=2:nwc=1:sp=reverse_arity_3 on theBenchmark 2.05/0.62 % (5078)Refutation not found, incomplete strategy% (5078)------------------------------ 2.05/0.62 % (5078)Version: Vampire 4.7 (commit 2d02e4655 on 2022-07-11 21:15:24 +0200) 2.05/0.62 % (5078)Linked with Z3 4.8.13.0 f03d756e086f81f2596157241e0decfb1c982299 z3-4.8.4-5390-gf03d756e0 2.05/0.62 % (5078)Termination reason: Refutation not found, incomplete strategy 2.05/0.62 2.05/0.62 % (5078)Memory used [KB]: 10106 2.05/0.62 % (5078)Time elapsed: 0.190 s 2.05/0.62 % (5078)------------------------------ 2.05/0.62 % (5078)------------------------------ 2.18/0.66 % (5085)lrs+1003_2:3_afr=on:afp=100000:afq=1.1:amm=off:anc=none:bs=on:fde=unused:gs=on:inw=on:nm=0:newcnf=on:nwc=1:sas=z3:stl=30:sac=on:sp=occurrence:tha=off:updr=off:uhcvi=on_2 on theBenchmark 2.18/0.68 % (5080)Refutation not found, incomplete strategy% (5080)------------------------------ 2.18/0.68 % (5080)Version: Vampire 4.7 (commit 2d02e4655 on 2022-07-11 21:15:24 +0200) 2.18/0.68 % (5080)Linked with Z3 4.8.13.0 f03d756e086f81f2596157241e0decfb1c982299 z3-4.8.4-5390-gf03d756e0 2.18/0.68 % (5080)Termination reason: Refutation not found, incomplete strategy 2.18/0.68 2.18/0.68 % (5080)Memory used [KB]: 18933 2.18/0.68 % (5080)Time elapsed: 0.248 s 2.18/0.68 % (5080)------------------------------ 2.18/0.68 % (5080)------------------------------ 2.75/0.71 % (5086)dis+11_24_afp=40000:afq=1.1:amm=sco:anc=none:bs=on:gs=on:gsem=off:lcm=predicate:lma=on:nm=2:nwc=1:sos=on:sac=on:updr=off_91 on theBenchmark 2.75/0.75 % (5086)First to succeed. 2.75/0.76 % (5086)Refutation found. Thanks to Tanya! 2.75/0.76 % SZS status Theorem for theBenchmark 2.75/0.76 % SZS output start Proof for theBenchmark 2.75/0.76 fof(f1757,plain,( 2.75/0.76 $false), 2.75/0.76 inference(avatar_sat_refutation,[],[f1219,f1231,f1244,f1267,f1274,f1295,f1308,f1319,f1322,f1365,f1429,f1457,f1582,f1586,f1593,f1617,f1720,f1735,f1756])). 2.75/0.76 fof(f1756,plain,( 2.75/0.76 ~spl117_132), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1755])). 2.75/0.76 fof(f1755,plain,( 2.75/0.76 $false | ~spl117_132), 2.75/0.76 inference(subsumption_resolution,[],[f1754,f1190])). 2.75/0.76 fof(f1190,plain,( 2.75/0.76 sP25(sK114)), 2.75/0.76 inference(resolution,[],[f1187,f349])). 2.75/0.76 fof(f349,plain,( 2.75/0.76 ( ! [X0] : (~sP27(X0) | sP25(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f167])). 2.75/0.76 fof(f167,plain,( 2.75/0.76 ! [X0] : ((sP26(X0) & (sP23(X0) | ! [X1] : (~r1(X0,X1) | ! [X2] : (p1(X2) | sP22(X2) | ~r1(X1,X2)))) & sP25(X0) & (! [X3] : (p1(X3) | ~r1(X0,X3)) | ! [X4] : (sP19(X4) | ~r1(X0,X4)) | sP20(X0) | ~p1(X0))) | ~sP27(X0))), 2.75/0.76 inference(rectify,[],[f166])). 2.75/0.76 fof(f166,plain,( 2.75/0.76 ! [X131] : ((sP26(X131) & (sP23(X131) | ! [X140] : (~r1(X131,X140) | ! [X141] : (p1(X141) | sP22(X141) | ~r1(X140,X141)))) & sP25(X131) & (! [X148] : (p1(X148) | ~r1(X131,X148)) | ! [X149] : (sP19(X149) | ~r1(X131,X149)) | sP20(X131) | ~p1(X131))) | ~sP27(X131))), 2.75/0.76 inference(nnf_transformation,[],[f34])). 2.75/0.76 fof(f34,plain,( 2.75/0.76 ! [X131] : ((sP26(X131) & (sP23(X131) | ! [X140] : (~r1(X131,X140) | ! [X141] : (p1(X141) | sP22(X141) | ~r1(X140,X141)))) & sP25(X131) & (! [X148] : (p1(X148) | ~r1(X131,X148)) | ! [X149] : (sP19(X149) | ~r1(X131,X149)) | sP20(X131) | ~p1(X131))) | ~sP27(X131))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP27])])). 2.75/0.76 fof(f1187,plain,( 2.75/0.76 sP27(sK114)), 2.75/0.76 inference(resolution,[],[f1185,f430])). 2.75/0.76 fof(f430,plain,( 2.75/0.76 r1(sK113,sK114)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f286,plain,( 2.75/0.76 ! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((sP53(X9) & sP52(X9)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(sK106,X1)) & ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | (sP50(X12) & sP49(X12)))) | ~r1(sK106,X10)) & ! [X13] : (~r1(sK106,X13) | ! [X14] : (~r1(X13,X14) | (sP47(X14) & sP46(X14)))) & ! [X15] : ((sP44(X15) & sP43(X15)) | ~r1(sK106,X15)) & ! [X16] : (~r1(sK106,X16) | ! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | (sP41(X19) & sP40(X19))) | ~r1(X17,X18)) | ~r1(X16,X17))) & ! [X20] : (! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : ((sP38(X24) & sP37(X24)) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(sK106,X20)) & ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : ((sP35(X30) & sP34(X30)) | ~r1(X29,X30)) | ~r1(X28,X29)) | ~r1(X27,X28)))) | ~r1(sK106,X25)) & ! [X31] : (~r1(sK106,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : ((sP32(X37) & sP31(X37)) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35)))))) & ((r1(sK107,sK108) & (r1(sK108,sK109) & (r1(sK109,sK110) & ((r1(sK111,sK112) & (r1(sK112,sK113) & (! [X46] : (~r1(sK114,X46) | p1(X46) | sP29(X46)) & (! [X48] : (~r1(sK115,X48) | p1(X48)) & r1(sK114,sK115)) & (r1(sK114,sK116) & ~p1(sK116)) & r1(sK113,sK114)))) & r1(sK110,sK111))))) & r1(sK106,sK107)) & ! [X50] : (~r1(sK106,X50) | ! [X51] : (~r1(X50,X51) | ! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (! [X55] : (! [X56] : (! [X57] : (sP27(X57) | ~r1(X56,X57)) | ~r1(X55,X56)) | ~r1(X54,X55)) | ~r1(X53,X54)))))) & ! [X58] : (! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (~r1(X64,X65) | ! [X66] : (! [X67] : (~r1(X66,X67) | (sP14(X67) & sP13(X67))) | ~r1(X65,X66)))) | ~r1(X62,X63)) | ~r1(X61,X62)) | ~r1(X60,X61)) | ~r1(X59,X60))) | ~r1(sK106,X58)) & ! [X68] : (~r1(sK106,X68) | ! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (! [X72] : (~r1(X71,X72) | ! [X73] : (! [X74] : (! [X75] : (~r1(X74,X75) | ! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | (sP11(X78) & sP10(X78)))) | ~r1(X75,X76))) | ~r1(X73,X74)) | ~r1(X72,X73))) | ~r1(X70,X71))))) & ! [X79] : (! [X80] : (! [X81] : (~r1(X80,X81) | ! [X82] : (~r1(X81,X82) | ! [X83] : (! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (~r1(X85,X86) | ! [X87] : (! [X88] : (! [X89] : (! [X90] : ((sP8(X90) & sP7(X90)) | ~r1(X89,X90)) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87))) | ~r1(X84,X85))) | ~r1(X82,X83)))) | ~r1(X79,X80)) | ~r1(sK106,X79)) & ! [X91] : (~r1(sK106,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (~r1(X92,X93) | ! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (! [X98] : (~r1(X97,X98) | ! [X99] : (! [X100] : (! [X101] : (~r1(X100,X101) | ! [X102] : (~r1(X101,X102) | ! [X103] : ((sP5(X103) & sP4(X103)) | ~r1(X102,X103)))) | ~r1(X99,X100)) | ~r1(X98,X99))) | ~r1(X96,X97)) | ~r1(X95,X96)) | ~r1(X94,X95)))))) & ! [X104] : (! [X105] : (! [X106] : (! [X107] : (! [X108] : (! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : ((sP2(X117) & sP1(X117)) | ~r1(X116,X117)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110))) | ~r1(X107,X108)) | ~r1(X106,X107)) | ~r1(X105,X106)) | ~r1(X104,X105)) | ~r1(sK106,X104))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK106,sK107,sK108,sK109,sK110,sK111,sK112,sK113,sK114,sK115,sK116])],[f274,f285,f284,f283,f282,f281,f280,f279,f278,f277,f276,f275])). 2.75/0.76 fof(f275,plain,( 2.75/0.76 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((sP53(X9) & sP52(X9)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | (sP50(X12) & sP49(X12)))) | ~r1(X0,X10)) & ! [X13] : (~r1(X0,X13) | ! [X14] : (~r1(X13,X14) | (sP47(X14) & sP46(X14)))) & ! [X15] : ((sP44(X15) & sP43(X15)) | ~r1(X0,X15)) & ! [X16] : (~r1(X0,X16) | ! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | (sP41(X19) & sP40(X19))) | ~r1(X17,X18)) | ~r1(X16,X17))) & ! [X20] : (! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : ((sP38(X24) & sP37(X24)) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X0,X20)) & ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : ((sP35(X30) & sP34(X30)) | ~r1(X29,X30)) | ~r1(X28,X29)) | ~r1(X27,X28)))) | ~r1(X0,X25)) & ! [X31] : (~r1(X0,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : ((sP32(X37) & sP31(X37)) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35)))))) & ? [X38] : (? [X39] : (r1(X38,X39) & ? [X40] : (r1(X39,X40) & ? [X41] : (r1(X40,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42))))) & r1(X0,X38)) & ! [X50] : (~r1(X0,X50) | ! [X51] : (~r1(X50,X51) | ! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (! [X55] : (! [X56] : (! [X57] : (sP27(X57) | ~r1(X56,X57)) | ~r1(X55,X56)) | ~r1(X54,X55)) | ~r1(X53,X54)))))) & ! [X58] : (! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (~r1(X64,X65) | ! [X66] : (! [X67] : (~r1(X66,X67) | (sP14(X67) & sP13(X67))) | ~r1(X65,X66)))) | ~r1(X62,X63)) | ~r1(X61,X62)) | ~r1(X60,X61)) | ~r1(X59,X60))) | ~r1(X0,X58)) & ! [X68] : (~r1(X0,X68) | ! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (! [X72] : (~r1(X71,X72) | ! [X73] : (! [X74] : (! [X75] : (~r1(X74,X75) | ! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | (sP11(X78) & sP10(X78)))) | ~r1(X75,X76))) | ~r1(X73,X74)) | ~r1(X72,X73))) | ~r1(X70,X71))))) & ! [X79] : (! [X80] : (! [X81] : (~r1(X80,X81) | ! [X82] : (~r1(X81,X82) | ! [X83] : (! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (~r1(X85,X86) | ! [X87] : (! [X88] : (! [X89] : (! [X90] : ((sP8(X90) & sP7(X90)) | ~r1(X89,X90)) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87))) | ~r1(X84,X85))) | ~r1(X82,X83)))) | ~r1(X79,X80)) | ~r1(X0,X79)) & ! [X91] : (~r1(X0,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (~r1(X92,X93) | ! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (! [X98] : (~r1(X97,X98) | ! [X99] : (! [X100] : (! [X101] : (~r1(X100,X101) | ! [X102] : (~r1(X101,X102) | ! [X103] : ((sP5(X103) & sP4(X103)) | ~r1(X102,X103)))) | ~r1(X99,X100)) | ~r1(X98,X99))) | ~r1(X96,X97)) | ~r1(X95,X96)) | ~r1(X94,X95)))))) & ! [X104] : (! [X105] : (! [X106] : (! [X107] : (! [X108] : (! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : ((sP2(X117) & sP1(X117)) | ~r1(X116,X117)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110))) | ~r1(X107,X108)) | ~r1(X106,X107)) | ~r1(X105,X106)) | ~r1(X104,X105)) | ~r1(X0,X104))) => (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((sP53(X9) & sP52(X9)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(sK106,X1)) & ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | (sP50(X12) & sP49(X12)))) | ~r1(sK106,X10)) & ! [X13] : (~r1(sK106,X13) | ! [X14] : (~r1(X13,X14) | (sP47(X14) & sP46(X14)))) & ! [X15] : ((sP44(X15) & sP43(X15)) | ~r1(sK106,X15)) & ! [X16] : (~r1(sK106,X16) | ! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | (sP41(X19) & sP40(X19))) | ~r1(X17,X18)) | ~r1(X16,X17))) & ! [X20] : (! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : ((sP38(X24) & sP37(X24)) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(sK106,X20)) & ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : ((sP35(X30) & sP34(X30)) | ~r1(X29,X30)) | ~r1(X28,X29)) | ~r1(X27,X28)))) | ~r1(sK106,X25)) & ! [X31] : (~r1(sK106,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : ((sP32(X37) & sP31(X37)) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35)))))) & ? [X38] : (? [X39] : (r1(X38,X39) & ? [X40] : (r1(X39,X40) & ? [X41] : (r1(X40,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42))))) & r1(sK106,X38)) & ! [X50] : (~r1(sK106,X50) | ! [X51] : (~r1(X50,X51) | ! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (! [X55] : (! [X56] : (! [X57] : (sP27(X57) | ~r1(X56,X57)) | ~r1(X55,X56)) | ~r1(X54,X55)) | ~r1(X53,X54)))))) & ! [X58] : (! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (~r1(X64,X65) | ! [X66] : (! [X67] : (~r1(X66,X67) | (sP14(X67) & sP13(X67))) | ~r1(X65,X66)))) | ~r1(X62,X63)) | ~r1(X61,X62)) | ~r1(X60,X61)) | ~r1(X59,X60))) | ~r1(sK106,X58)) & ! [X68] : (~r1(sK106,X68) | ! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (! [X72] : (~r1(X71,X72) | ! [X73] : (! [X74] : (! [X75] : (~r1(X74,X75) | ! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | (sP11(X78) & sP10(X78)))) | ~r1(X75,X76))) | ~r1(X73,X74)) | ~r1(X72,X73))) | ~r1(X70,X71))))) & ! [X79] : (! [X80] : (! [X81] : (~r1(X80,X81) | ! [X82] : (~r1(X81,X82) | ! [X83] : (! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (~r1(X85,X86) | ! [X87] : (! [X88] : (! [X89] : (! [X90] : ((sP8(X90) & sP7(X90)) | ~r1(X89,X90)) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87))) | ~r1(X84,X85))) | ~r1(X82,X83)))) | ~r1(X79,X80)) | ~r1(sK106,X79)) & ! [X91] : (~r1(sK106,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (~r1(X92,X93) | ! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (! [X98] : (~r1(X97,X98) | ! [X99] : (! [X100] : (! [X101] : (~r1(X100,X101) | ! [X102] : (~r1(X101,X102) | ! [X103] : ((sP5(X103) & sP4(X103)) | ~r1(X102,X103)))) | ~r1(X99,X100)) | ~r1(X98,X99))) | ~r1(X96,X97)) | ~r1(X95,X96)) | ~r1(X94,X95)))))) & ! [X104] : (! [X105] : (! [X106] : (! [X107] : (! [X108] : (! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : ((sP2(X117) & sP1(X117)) | ~r1(X116,X117)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110))) | ~r1(X107,X108)) | ~r1(X106,X107)) | ~r1(X105,X106)) | ~r1(X104,X105)) | ~r1(sK106,X104)))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f276,plain,( 2.75/0.76 ? [X38] : (? [X39] : (r1(X38,X39) & ? [X40] : (r1(X39,X40) & ? [X41] : (r1(X40,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42))))) & r1(sK106,X38)) => (? [X39] : (r1(sK107,X39) & ? [X40] : (r1(X39,X40) & ? [X41] : (r1(X40,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42))))) & r1(sK106,sK107))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f277,plain,( 2.75/0.76 ? [X39] : (r1(sK107,X39) & ? [X40] : (r1(X39,X40) & ? [X41] : (r1(X40,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42))))) => (r1(sK107,sK108) & ? [X40] : (r1(sK108,X40) & ? [X41] : (r1(X40,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42)))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f278,plain,( 2.75/0.76 ? [X40] : (r1(sK108,X40) & ? [X41] : (r1(X40,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42)))) => (r1(sK108,sK109) & ? [X41] : (r1(sK109,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f279,plain,( 2.75/0.76 ? [X41] : (r1(sK109,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42))) => (r1(sK109,sK110) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(sK110,X42)))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f280,plain,( 2.75/0.76 ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(sK110,X42)) => (? [X43] : (r1(sK111,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(sK110,sK111))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f281,plain,( 2.75/0.76 ? [X43] : (r1(sK111,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) => (r1(sK111,sK112) & ? [X44] : (r1(sK112,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f282,plain,( 2.75/0.76 ? [X44] : (r1(sK112,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45))) => (r1(sK112,sK113) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(sK113,X45)))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f283,plain,( 2.75/0.76 ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(sK113,X45)) => (! [X46] : (~r1(sK114,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(sK114,X47)) & ? [X49] : (r1(sK114,X49) & ~p1(X49)) & r1(sK113,sK114))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f284,plain,( 2.75/0.76 ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(sK114,X47)) => (! [X48] : (~r1(sK115,X48) | p1(X48)) & r1(sK114,sK115))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f285,plain,( 2.75/0.76 ? [X49] : (r1(sK114,X49) & ~p1(X49)) => (r1(sK114,sK116) & ~p1(sK116))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f274,plain,( 2.75/0.76 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((sP53(X9) & sP52(X9)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (~r1(X11,X12) | (sP50(X12) & sP49(X12)))) | ~r1(X0,X10)) & ! [X13] : (~r1(X0,X13) | ! [X14] : (~r1(X13,X14) | (sP47(X14) & sP46(X14)))) & ! [X15] : ((sP44(X15) & sP43(X15)) | ~r1(X0,X15)) & ! [X16] : (~r1(X0,X16) | ! [X17] : (! [X18] : (! [X19] : (~r1(X18,X19) | (sP41(X19) & sP40(X19))) | ~r1(X17,X18)) | ~r1(X16,X17))) & ! [X20] : (! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : ((sP38(X24) & sP37(X24)) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(X20,X21)) | ~r1(X0,X20)) & ! [X25] : (! [X26] : (~r1(X25,X26) | ! [X27] : (~r1(X26,X27) | ! [X28] : (! [X29] : (! [X30] : ((sP35(X30) & sP34(X30)) | ~r1(X29,X30)) | ~r1(X28,X29)) | ~r1(X27,X28)))) | ~r1(X0,X25)) & ! [X31] : (~r1(X0,X31) | ! [X32] : (~r1(X31,X32) | ! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : ((sP32(X37) & sP31(X37)) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35)))))) & ? [X38] : (? [X39] : (r1(X38,X39) & ? [X40] : (r1(X39,X40) & ? [X41] : (r1(X40,X41) & ? [X42] : (? [X43] : (r1(X42,X43) & ? [X44] : (r1(X43,X44) & ? [X45] : (! [X46] : (~r1(X45,X46) | p1(X46) | sP29(X46)) & ? [X47] : (! [X48] : (~r1(X47,X48) | p1(X48)) & r1(X45,X47)) & ? [X49] : (r1(X45,X49) & ~p1(X49)) & r1(X44,X45)))) & r1(X41,X42))))) & r1(X0,X38)) & ! [X50] : (~r1(X0,X50) | ! [X51] : (~r1(X50,X51) | ! [X52] : (~r1(X51,X52) | ! [X53] : (~r1(X52,X53) | ! [X54] : (! [X55] : (! [X56] : (! [X57] : (sP27(X57) | ~r1(X56,X57)) | ~r1(X55,X56)) | ~r1(X54,X55)) | ~r1(X53,X54)))))) & ! [X58] : (! [X59] : (~r1(X58,X59) | ! [X60] : (! [X61] : (! [X62] : (! [X63] : (! [X64] : (~r1(X63,X64) | ! [X65] : (~r1(X64,X65) | ! [X66] : (! [X67] : (~r1(X66,X67) | (sP14(X67) & sP13(X67))) | ~r1(X65,X66)))) | ~r1(X62,X63)) | ~r1(X61,X62)) | ~r1(X60,X61)) | ~r1(X59,X60))) | ~r1(X0,X58)) & ! [X68] : (~r1(X0,X68) | ! [X69] : (~r1(X68,X69) | ! [X70] : (~r1(X69,X70) | ! [X71] : (! [X72] : (~r1(X71,X72) | ! [X73] : (! [X74] : (! [X75] : (~r1(X74,X75) | ! [X76] : (! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | (sP11(X78) & sP10(X78)))) | ~r1(X75,X76))) | ~r1(X73,X74)) | ~r1(X72,X73))) | ~r1(X70,X71))))) & ! [X79] : (! [X80] : (! [X81] : (~r1(X80,X81) | ! [X82] : (~r1(X81,X82) | ! [X83] : (! [X84] : (~r1(X83,X84) | ! [X85] : (! [X86] : (~r1(X85,X86) | ! [X87] : (! [X88] : (! [X89] : (! [X90] : ((sP8(X90) & sP7(X90)) | ~r1(X89,X90)) | ~r1(X88,X89)) | ~r1(X87,X88)) | ~r1(X86,X87))) | ~r1(X84,X85))) | ~r1(X82,X83)))) | ~r1(X79,X80)) | ~r1(X0,X79)) & ! [X91] : (~r1(X0,X91) | ! [X92] : (~r1(X91,X92) | ! [X93] : (~r1(X92,X93) | ! [X94] : (~r1(X93,X94) | ! [X95] : (! [X96] : (! [X97] : (! [X98] : (~r1(X97,X98) | ! [X99] : (! [X100] : (! [X101] : (~r1(X100,X101) | ! [X102] : (~r1(X101,X102) | ! [X103] : ((sP5(X103) & sP4(X103)) | ~r1(X102,X103)))) | ~r1(X99,X100)) | ~r1(X98,X99))) | ~r1(X96,X97)) | ~r1(X95,X96)) | ~r1(X94,X95)))))) & ! [X104] : (! [X105] : (! [X106] : (! [X107] : (! [X108] : (! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : ((sP2(X117) & sP1(X117)) | ~r1(X116,X117)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110))) | ~r1(X107,X108)) | ~r1(X106,X107)) | ~r1(X105,X106)) | ~r1(X104,X105)) | ~r1(X0,X104)))), 2.75/0.76 inference(rectify,[],[f61])). 2.75/0.76 fof(f61,plain,( 2.75/0.76 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((sP53(X9) & sP52(X9)) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | (sP50(X21) & sP49(X21)))) | ~r1(X0,X19)) & ! [X31] : (~r1(X0,X31) | ! [X32] : (~r1(X31,X32) | (sP47(X32) & sP46(X32)))) & ! [X42] : ((sP44(X42) & sP43(X42)) | ~r1(X0,X42)) & ! [X52] : (~r1(X0,X52) | ! [X53] : (! [X54] : (! [X55] : (~r1(X54,X55) | (sP41(X55) & sP40(X55))) | ~r1(X53,X54)) | ~r1(X52,X53))) & ! [X65] : (! [X66] : (! [X67] : (! [X68] : (~r1(X67,X68) | ! [X69] : ((sP38(X69) & sP37(X69)) | ~r1(X68,X69))) | ~r1(X66,X67)) | ~r1(X65,X66)) | ~r1(X0,X65)) & ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (! [X84] : ((sP35(X84) & sP34(X84)) | ~r1(X83,X84)) | ~r1(X82,X83)) | ~r1(X81,X82)))) | ~r1(X0,X79)) & ! [X94] : (~r1(X0,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (~r1(X96,X97) | ! [X98] : (! [X99] : (! [X100] : ((sP32(X100) & sP31(X100)) | ~r1(X99,X100)) | ~r1(X98,X99)) | ~r1(X97,X98)))))) & ? [X110] : (? [X111] : (r1(X110,X111) & ? [X112] : (r1(X111,X112) & ? [X113] : (r1(X112,X113) & ? [X114] : (? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (! [X118] : (~r1(X117,X118) | p1(X118) | sP29(X118)) & ? [X121] : (! [X122] : (~r1(X121,X122) | p1(X122)) & r1(X117,X121)) & ? [X123] : (r1(X117,X123) & ~p1(X123)) & r1(X116,X117)))) & r1(X113,X114))))) & r1(X0,X110)) & ! [X124] : (~r1(X0,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (! [X129] : (! [X130] : (! [X131] : (sP27(X131) | ~r1(X130,X131)) | ~r1(X129,X130)) | ~r1(X128,X129)) | ~r1(X127,X128)))))) & ! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (~r1(X163,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (! [X167] : (~r1(X166,X167) | (sP14(X167) & sP13(X167))) | ~r1(X165,X166)))) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160))) | ~r1(X0,X158)) & ! [X177] : (~r1(X0,X177) | ! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (! [X181] : (~r1(X180,X181) | ! [X182] : (! [X183] : (! [X184] : (~r1(X183,X184) | ! [X185] : (! [X186] : (~r1(X185,X186) | ! [X187] : (~r1(X186,X187) | (sP11(X187) & sP10(X187)))) | ~r1(X184,X185))) | ~r1(X182,X183)) | ~r1(X181,X182))) | ~r1(X179,X180))))) & ! [X197] : (! [X198] : (! [X199] : (~r1(X198,X199) | ! [X200] : (~r1(X199,X200) | ! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (! [X206] : (! [X207] : (! [X208] : ((sP8(X208) & sP7(X208)) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)) | ~r1(X204,X205))) | ~r1(X202,X203))) | ~r1(X200,X201)))) | ~r1(X197,X198)) | ~r1(X0,X197)) & ! [X218] : (~r1(X0,X218) | ! [X219] : (~r1(X218,X219) | ! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (! [X223] : (! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : ((sP5(X230) & sP4(X230)) | ~r1(X229,X230)))) | ~r1(X226,X227)) | ~r1(X225,X226))) | ~r1(X223,X224)) | ~r1(X222,X223)) | ~r1(X221,X222)))))) & ! [X240] : (! [X241] : (! [X242] : (! [X243] : (! [X244] : (! [X245] : (~r1(X244,X245) | ! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : ((sP2(X253) & sP1(X253)) | ~r1(X252,X253)) | ~r1(X251,X252))) | ~r1(X249,X250)) | ~r1(X248,X249)))) | ~r1(X245,X246))) | ~r1(X243,X244)) | ~r1(X242,X243)) | ~r1(X241,X242)) | ~r1(X240,X241)) | ~r1(X0,X240)))), 2.75/0.76 inference(definition_folding,[],[f6,f60,f59,f58,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,f9,f8,f7])). 2.75/0.76 fof(f7,plain,( 2.75/0.76 ! [X253] : (? [X254] : (r1(X253,X254) & ! [X255] : (! [X256] : (~r1(X255,X256) | p1(X256)) | ~p1(X255) | ~r1(X254,X255)) & ~p1(X254)) | ~sP0(X253))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP0])])). 2.75/0.76 fof(f8,plain,( 2.75/0.76 ! [X253] : (! [X259] : (~r1(X253,X259) | ! [X260] : (! [X261] : (~r1(X260,X261) | p1(X261)) | ~r1(X259,X260)) | ? [X262] : (~p1(X262) & r1(X259,X262))) | ~sP1(X253))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP1])])). 2.75/0.76 fof(f9,plain,( 2.75/0.76 ! [X253] : (sP0(X253) | ! [X257] : (~r1(X253,X257) | ? [X258] : (r1(X257,X258) & ~p1(X258))) | p1(X253) | ~sP2(X253))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP2])])). 2.75/0.76 fof(f10,plain,( 2.75/0.76 ! [X230] : (? [X231] : (~p1(X231) & ! [X232] : (! [X233] : (p1(X233) | ~r1(X232,X233)) | ~p1(X232) | ~r1(X231,X232)) & r1(X230,X231)) | ~sP3(X230))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP3])])). 2.75/0.76 fof(f11,plain,( 2.75/0.76 ! [X230] : (! [X236] : (? [X237] : (r1(X236,X237) & ~p1(X237)) | ! [X238] : (! [X239] : (p1(X239) | ~r1(X238,X239)) | ~r1(X236,X238)) | ~r1(X230,X236)) | ~sP4(X230))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP4])])). 2.75/0.76 fof(f12,plain,( 2.75/0.76 ! [X230] : (sP3(X230) | ! [X234] : (~r1(X230,X234) | ? [X235] : (~p1(X235) & r1(X234,X235))) | p1(X230) | ~sP5(X230))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP5])])). 2.75/0.76 fof(f13,plain,( 2.75/0.76 ! [X208] : (? [X209] : (r1(X208,X209) & ! [X210] : (~p1(X210) | ! [X211] : (p1(X211) | ~r1(X210,X211)) | ~r1(X209,X210)) & ~p1(X209)) | ~sP6(X208))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP6])])). 2.75/0.76 fof(f14,plain,( 2.75/0.76 ! [X208] : (! [X214] : (? [X215] : (~p1(X215) & r1(X214,X215)) | ! [X216] : (! [X217] : (~r1(X216,X217) | p1(X217)) | ~r1(X214,X216)) | ~r1(X208,X214)) | ~sP7(X208))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP7])])). 2.75/0.76 fof(f15,plain,( 2.75/0.76 ! [X208] : (p1(X208) | sP6(X208) | ! [X212] : (~r1(X208,X212) | ? [X213] : (r1(X212,X213) & ~p1(X213))) | ~sP8(X208))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP8])])). 2.75/0.76 fof(f16,plain,( 2.75/0.76 ! [X187] : (? [X192] : (! [X193] : (~p1(X193) | ! [X194] : (~r1(X193,X194) | p1(X194)) | ~r1(X192,X193)) & ~p1(X192) & r1(X187,X192)) | ~sP9(X187))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP9])])). 2.75/0.76 fof(f17,plain,( 2.75/0.76 ! [X187] : (sP9(X187) | ! [X195] : (~r1(X187,X195) | ? [X196] : (~p1(X196) & r1(X195,X196))) | p1(X187) | ~sP10(X187))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP10])])). 2.75/0.76 fof(f18,plain,( 2.75/0.76 ! [X187] : (! [X188] : (~r1(X187,X188) | ! [X189] : (! [X190] : (p1(X190) | ~r1(X189,X190)) | ~r1(X188,X189)) | ? [X191] : (~p1(X191) & r1(X188,X191))) | ~sP11(X187))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP11])])). 2.75/0.76 fof(f19,plain,( 2.75/0.76 ! [X167] : (? [X168] : (~p1(X168) & ! [X169] : (~r1(X168,X169) | ! [X170] : (~r1(X169,X170) | p1(X170)) | ~p1(X169)) & r1(X167,X168)) | ~sP12(X167))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP12])])). 2.75/0.76 fof(f20,plain,( 2.75/0.76 ! [X167] : (! [X173] : (! [X174] : (! [X175] : (~r1(X174,X175) | p1(X175)) | ~r1(X173,X174)) | ? [X176] : (r1(X173,X176) & ~p1(X176)) | ~r1(X167,X173)) | ~sP13(X167))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP13])])). 2.75/0.76 fof(f21,plain,( 2.75/0.76 ! [X167] : (p1(X167) | sP12(X167) | ! [X171] : (~r1(X167,X171) | ? [X172] : (r1(X171,X172) & ~p1(X172))) | ~sP14(X167))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP14])])). 2.75/0.76 fof(f22,plain,( 2.75/0.76 ! [X154] : (? [X155] : (~p1(X155) & r1(X154,X155)) | ~sP15(X154))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP15])])). 2.75/0.76 fof(f23,plain,( 2.75/0.76 ! [X152] : (! [X154] : ((p1(X154) & sP15(X154)) | ! [X156] : (~r1(X154,X156) | ~p1(X156) | ! [X157] : (~r1(X156,X157) | p1(X157))) | ~r1(X152,X154)) | ~sP16(X152))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP16])])). 2.75/0.76 fof(f24,plain,( 2.75/0.76 ! [X152] : (? [X153] : (~p1(X153) & r1(X152,X153)) | ~sP17(X152))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP17])])). 2.75/0.76 fof(f25,plain,( 2.75/0.76 ! [X150] : (? [X151] : (~p1(X151) & r1(X150,X151)) | ~sP18(X150))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP18])])). 2.75/0.76 fof(f26,plain,( 2.75/0.76 ! [X149] : (? [X150] : (sP18(X150) & p1(X150) & r1(X149,X150)) | ~sP19(X149))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP19])])). 2.75/0.76 fof(f27,plain,( 2.75/0.76 ! [X131] : (? [X152] : (sP17(X152) & p1(X152) & sP16(X152) & r1(X131,X152)) | ~sP20(X131))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP20])])). 2.75/0.76 fof(f28,plain,( 2.75/0.76 ! [X142] : (? [X143] : (~p1(X143) & r1(X142,X143)) | ~sP21(X142))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP21])])). 2.75/0.76 fof(f29,plain,( 2.75/0.76 ! [X141] : (? [X142] : (r1(X141,X142) & sP21(X142) & p1(X142)) | ~sP22(X141))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP22])])). 2.75/0.76 fof(f30,plain,( 2.75/0.76 ! [X131] : (? [X137] : (r1(X131,X137) & ! [X138] : (~r1(X137,X138) | ~p1(X138) | ! [X139] : (p1(X139) | ~r1(X138,X139))) & ~p1(X137)) | ~sP23(X131))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP23])])). 2.75/0.76 fof(f31,plain,( 2.75/0.76 ! [X131] : (? [X134] : (~p1(X134) & ! [X135] : (~r1(X134,X135) | ~p1(X135) | ! [X136] : (~r1(X135,X136) | p1(X136))) & r1(X131,X134)) | ~sP24(X131))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP24])])). 2.75/0.76 fof(f32,plain,( 2.75/0.76 ! [X131] : (! [X144] : (! [X145] : (! [X146] : (~r1(X145,X146) | p1(X146)) | ~r1(X144,X145)) | ? [X147] : (r1(X144,X147) & ~p1(X147)) | ~r1(X131,X144)) | ~sP25(X131))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP25])])). 2.75/0.76 fof(f33,plain,( 2.75/0.76 ! [X131] : (p1(X131) | ! [X132] : (? [X133] : (~p1(X133) & r1(X132,X133)) | ~r1(X131,X132)) | sP24(X131) | ~sP26(X131))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP26])])). 2.75/0.76 fof(f35,plain,( 2.75/0.76 ! [X119] : (? [X120] : (~p1(X120) & r1(X119,X120)) | ~sP28(X119))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP28])])). 2.75/0.76 fof(f36,plain,( 2.75/0.76 ! [X118] : (? [X119] : (r1(X118,X119) & sP28(X119) & p1(X119)) | ~sP29(X118))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP29])])). 2.75/0.76 fof(f37,plain,( 2.75/0.76 ! [X100] : (? [X101] : (r1(X100,X101) & ! [X102] : (! [X103] : (p1(X103) | ~r1(X102,X103)) | ~p1(X102) | ~r1(X101,X102)) & ~p1(X101)) | ~sP30(X100))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP30])])). 2.75/0.76 fof(f38,plain,( 2.75/0.76 ! [X100] : (! [X106] : (? [X107] : (~p1(X107) & r1(X106,X107)) | ! [X108] : (~r1(X106,X108) | ! [X109] : (~r1(X108,X109) | p1(X109))) | ~r1(X100,X106)) | ~sP31(X100))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP31])])). 2.75/0.76 fof(f39,plain,( 2.75/0.76 ! [X100] : (sP30(X100) | ! [X104] : (? [X105] : (~p1(X105) & r1(X104,X105)) | ~r1(X100,X104)) | p1(X100) | ~sP32(X100))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP32])])). 2.75/0.76 fof(f40,plain,( 2.75/0.76 ! [X84] : (? [X91] : (! [X92] : (! [X93] : (p1(X93) | ~r1(X92,X93)) | ~p1(X92) | ~r1(X91,X92)) & ~p1(X91) & r1(X84,X91)) | ~sP33(X84))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP33])])). 2.75/0.76 fof(f41,plain,( 2.75/0.76 ! [X84] : (! [X89] : (? [X90] : (~p1(X90) & r1(X89,X90)) | ~r1(X84,X89)) | sP33(X84) | p1(X84) | ~sP34(X84))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP34])])). 2.75/0.76 fof(f42,plain,( 2.75/0.76 ! [X84] : (! [X85] : (~r1(X84,X85) | ? [X86] : (~p1(X86) & r1(X85,X86)) | ! [X87] : (~r1(X85,X87) | ! [X88] : (~r1(X87,X88) | p1(X88)))) | ~sP35(X84))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP35])])). 2.75/0.76 fof(f43,plain,( 2.75/0.76 ! [X69] : (? [X70] : (~p1(X70) & ! [X71] : (! [X72] : (~r1(X71,X72) | p1(X72)) | ~p1(X71) | ~r1(X70,X71)) & r1(X69,X70)) | ~sP36(X69))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP36])])). 2.75/0.76 fof(f44,plain,( 2.75/0.76 ! [X69] : (! [X75] : (~r1(X69,X75) | ? [X76] : (r1(X75,X76) & ~p1(X76)) | ! [X77] : (! [X78] : (p1(X78) | ~r1(X77,X78)) | ~r1(X75,X77))) | ~sP37(X69))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP37])])). 2.75/0.76 fof(f45,plain,( 2.75/0.76 ! [X69] : (p1(X69) | sP36(X69) | ! [X73] : (? [X74] : (r1(X73,X74) & ~p1(X74)) | ~r1(X69,X73)) | ~sP38(X69))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP38])])). 2.75/0.76 fof(f46,plain,( 2.75/0.76 ! [X55] : (? [X62] : (r1(X55,X62) & ~p1(X62) & ! [X63] : (! [X64] : (~r1(X63,X64) | p1(X64)) | ~p1(X63) | ~r1(X62,X63))) | ~sP39(X55))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP39])])). 2.75/0.76 fof(f47,plain,( 2.75/0.76 ! [X55] : (! [X60] : (? [X61] : (~p1(X61) & r1(X60,X61)) | ~r1(X55,X60)) | sP39(X55) | p1(X55) | ~sP40(X55))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP40])])). 2.75/0.76 fof(f48,plain,( 2.75/0.76 ! [X55] : (! [X56] : (~r1(X55,X56) | ! [X57] : (~r1(X56,X57) | ! [X58] : (~r1(X57,X58) | p1(X58))) | ? [X59] : (r1(X56,X59) & ~p1(X59))) | ~sP41(X55))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP41])])). 2.75/0.76 fof(f49,plain,( 2.75/0.76 ! [X42] : (? [X43] : (r1(X42,X43) & ! [X44] : (! [X45] : (p1(X45) | ~r1(X44,X45)) | ~p1(X44) | ~r1(X43,X44)) & ~p1(X43)) | ~sP42(X42))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP42])])). 2.75/0.76 fof(f50,plain,( 2.75/0.76 ! [X42] : (! [X48] : (? [X49] : (~p1(X49) & r1(X48,X49)) | ! [X50] : (! [X51] : (~r1(X50,X51) | p1(X51)) | ~r1(X48,X50)) | ~r1(X42,X48)) | ~sP43(X42))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP43])])). 2.75/0.76 fof(f51,plain,( 2.75/0.76 ! [X42] : (sP42(X42) | ! [X46] : (? [X47] : (r1(X46,X47) & ~p1(X47)) | ~r1(X42,X46)) | p1(X42) | ~sP44(X42))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP44])])). 2.75/0.76 fof(f52,plain,( 2.75/0.76 ! [X32] : (? [X37] : (r1(X32,X37) & ~p1(X37) & ! [X38] : (~r1(X37,X38) | ~p1(X38) | ! [X39] : (p1(X39) | ~r1(X38,X39)))) | ~sP45(X32))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP45])])). 2.75/0.76 fof(f53,plain,( 2.75/0.76 ! [X32] : (p1(X32) | sP45(X32) | ! [X40] : (? [X41] : (r1(X40,X41) & ~p1(X41)) | ~r1(X32,X40)) | ~sP46(X32))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP46])])). 2.75/0.76 fof(f54,plain,( 2.75/0.76 ! [X32] : (! [X33] : (? [X34] : (~p1(X34) & r1(X33,X34)) | ! [X35] : (~r1(X33,X35) | ! [X36] : (p1(X36) | ~r1(X35,X36))) | ~r1(X32,X33)) | ~sP47(X32))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP47])])). 2.75/0.76 fof(f55,plain,( 2.75/0.76 ! [X21] : (? [X24] : (r1(X21,X24) & ! [X25] : (~r1(X24,X25) | ~p1(X25) | ! [X26] : (~r1(X25,X26) | p1(X26))) & ~p1(X24)) | ~sP48(X21))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP48])])). 2.75/0.76 fof(f56,plain,( 2.75/0.76 ! [X21] : (! [X27] : (? [X28] : (~p1(X28) & r1(X27,X28)) | ! [X29] : (! [X30] : (p1(X30) | ~r1(X29,X30)) | ~r1(X27,X29)) | ~r1(X21,X27)) | ~sP49(X21))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP49])])). 2.75/0.76 fof(f57,plain,( 2.75/0.76 ! [X21] : (! [X22] : (? [X23] : (r1(X22,X23) & ~p1(X23)) | ~r1(X21,X22)) | sP48(X21) | p1(X21) | ~sP50(X21))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP50])])). 2.75/0.76 fof(f58,plain,( 2.75/0.76 ! [X9] : (? [X16] : (r1(X9,X16) & ! [X17] : (! [X18] : (~r1(X17,X18) | p1(X18)) | ~p1(X17) | ~r1(X16,X17)) & ~p1(X16)) | ~sP51(X9))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP51])])). 2.75/0.76 fof(f59,plain,( 2.75/0.76 ! [X9] : (p1(X9) | ! [X14] : (~r1(X9,X14) | ? [X15] : (~p1(X15) & r1(X14,X15))) | sP51(X9) | ~sP52(X9))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP52])])). 2.75/0.76 fof(f60,plain,( 2.75/0.76 ! [X9] : (! [X10] : (! [X11] : (! [X12] : (p1(X12) | ~r1(X11,X12)) | ~r1(X10,X11)) | ? [X13] : (r1(X10,X13) & ~p1(X13)) | ~r1(X9,X10)) | ~sP53(X9))), 2.75/0.76 introduced(predicate_definition_introduction,[new_symbols(naming,[sP53])])). 2.75/0.76 fof(f6,plain,( 2.75/0.76 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((! [X10] : (! [X11] : (! [X12] : (p1(X12) | ~r1(X11,X12)) | ~r1(X10,X11)) | ? [X13] : (r1(X10,X13) & ~p1(X13)) | ~r1(X9,X10)) & (p1(X9) | ! [X14] : (~r1(X9,X14) | ? [X15] : (~p1(X15) & r1(X14,X15))) | ? [X16] : (r1(X9,X16) & ! [X17] : (! [X18] : (~r1(X17,X18) | p1(X18)) | ~p1(X17) | ~r1(X16,X17)) & ~p1(X16)))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ((! [X22] : (? [X23] : (r1(X22,X23) & ~p1(X23)) | ~r1(X21,X22)) | ? [X24] : (r1(X21,X24) & ! [X25] : (~r1(X24,X25) | ~p1(X25) | ! [X26] : (~r1(X25,X26) | p1(X26))) & ~p1(X24)) | p1(X21)) & ! [X27] : (? [X28] : (~p1(X28) & r1(X27,X28)) | ! [X29] : (! [X30] : (p1(X30) | ~r1(X29,X30)) | ~r1(X27,X29)) | ~r1(X21,X27))))) | ~r1(X0,X19)) & ! [X31] : (~r1(X0,X31) | ! [X32] : (~r1(X31,X32) | (! [X33] : (? [X34] : (~p1(X34) & r1(X33,X34)) | ! [X35] : (~r1(X33,X35) | ! [X36] : (p1(X36) | ~r1(X35,X36))) | ~r1(X32,X33)) & (p1(X32) | ? [X37] : (r1(X32,X37) & ~p1(X37) & ! [X38] : (~r1(X37,X38) | ~p1(X38) | ! [X39] : (p1(X39) | ~r1(X38,X39)))) | ! [X40] : (? [X41] : (r1(X40,X41) & ~p1(X41)) | ~r1(X32,X40)))))) & ! [X42] : (((? [X43] : (r1(X42,X43) & ! [X44] : (! [X45] : (p1(X45) | ~r1(X44,X45)) | ~p1(X44) | ~r1(X43,X44)) & ~p1(X43)) | ! [X46] : (? [X47] : (r1(X46,X47) & ~p1(X47)) | ~r1(X42,X46)) | p1(X42)) & ! [X48] : (? [X49] : (~p1(X49) & r1(X48,X49)) | ! [X50] : (! [X51] : (~r1(X50,X51) | p1(X51)) | ~r1(X48,X50)) | ~r1(X42,X48))) | ~r1(X0,X42)) & ! [X52] : (~r1(X0,X52) | ! [X53] : (! [X54] : (! [X55] : (~r1(X54,X55) | (! [X56] : (~r1(X55,X56) | ! [X57] : (~r1(X56,X57) | ! [X58] : (~r1(X57,X58) | p1(X58))) | ? [X59] : (r1(X56,X59) & ~p1(X59))) & (! [X60] : (? [X61] : (~p1(X61) & r1(X60,X61)) | ~r1(X55,X60)) | ? [X62] : (r1(X55,X62) & ~p1(X62) & ! [X63] : (! [X64] : (~r1(X63,X64) | p1(X64)) | ~p1(X63) | ~r1(X62,X63))) | p1(X55)))) | ~r1(X53,X54)) | ~r1(X52,X53))) & ! [X65] : (! [X66] : (! [X67] : (! [X68] : (~r1(X67,X68) | ! [X69] : (((p1(X69) | ? [X70] : (~p1(X70) & ! [X71] : (! [X72] : (~r1(X71,X72) | p1(X72)) | ~p1(X71) | ~r1(X70,X71)) & r1(X69,X70)) | ! [X73] : (? [X74] : (r1(X73,X74) & ~p1(X74)) | ~r1(X69,X73))) & ! [X75] : (~r1(X69,X75) | ? [X76] : (r1(X75,X76) & ~p1(X76)) | ! [X77] : (! [X78] : (p1(X78) | ~r1(X77,X78)) | ~r1(X75,X77)))) | ~r1(X68,X69))) | ~r1(X66,X67)) | ~r1(X65,X66)) | ~r1(X0,X65)) & ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (! [X84] : ((! [X85] : (~r1(X84,X85) | ? [X86] : (~p1(X86) & r1(X85,X86)) | ! [X87] : (~r1(X85,X87) | ! [X88] : (~r1(X87,X88) | p1(X88)))) & (! [X89] : (? [X90] : (~p1(X90) & r1(X89,X90)) | ~r1(X84,X89)) | ? [X91] : (! [X92] : (! [X93] : (p1(X93) | ~r1(X92,X93)) | ~p1(X92) | ~r1(X91,X92)) & ~p1(X91) & r1(X84,X91)) | p1(X84))) | ~r1(X83,X84)) | ~r1(X82,X83)) | ~r1(X81,X82)))) | ~r1(X0,X79)) & ! [X94] : (~r1(X0,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (~r1(X96,X97) | ! [X98] : (! [X99] : (! [X100] : (((? [X101] : (r1(X100,X101) & ! [X102] : (! [X103] : (p1(X103) | ~r1(X102,X103)) | ~p1(X102) | ~r1(X101,X102)) & ~p1(X101)) | ! [X104] : (? [X105] : (~p1(X105) & r1(X104,X105)) | ~r1(X100,X104)) | p1(X100)) & ! [X106] : (? [X107] : (~p1(X107) & r1(X106,X107)) | ! [X108] : (~r1(X106,X108) | ! [X109] : (~r1(X108,X109) | p1(X109))) | ~r1(X100,X106))) | ~r1(X99,X100)) | ~r1(X98,X99)) | ~r1(X97,X98)))))) & ? [X110] : (? [X111] : (r1(X110,X111) & ? [X112] : (r1(X111,X112) & ? [X113] : (r1(X112,X113) & ? [X114] : (? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (! [X118] : (~r1(X117,X118) | p1(X118) | ? [X119] : (r1(X118,X119) & ? [X120] : (~p1(X120) & r1(X119,X120)) & p1(X119))) & ? [X121] : (! [X122] : (~r1(X121,X122) | p1(X122)) & r1(X117,X121)) & ? [X123] : (r1(X117,X123) & ~p1(X123)) & r1(X116,X117)))) & r1(X113,X114))))) & r1(X0,X110)) & ! [X124] : (~r1(X0,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (! [X129] : (! [X130] : (! [X131] : (((p1(X131) | ! [X132] : (? [X133] : (~p1(X133) & r1(X132,X133)) | ~r1(X131,X132)) | ? [X134] : (~p1(X134) & ! [X135] : (~r1(X134,X135) | ~p1(X135) | ! [X136] : (~r1(X135,X136) | p1(X136))) & r1(X131,X134))) & (? [X137] : (r1(X131,X137) & ! [X138] : (~r1(X137,X138) | ~p1(X138) | ! [X139] : (p1(X139) | ~r1(X138,X139))) & ~p1(X137)) | ! [X140] : (~r1(X131,X140) | ! [X141] : (p1(X141) | ? [X142] : (r1(X141,X142) & ? [X143] : (~p1(X143) & r1(X142,X143)) & p1(X142)) | ~r1(X140,X141)))) & ! [X144] : (! [X145] : (! [X146] : (~r1(X145,X146) | p1(X146)) | ~r1(X144,X145)) | ? [X147] : (r1(X144,X147) & ~p1(X147)) | ~r1(X131,X144)) & (! [X148] : (p1(X148) | ~r1(X131,X148)) | ! [X149] : (? [X150] : (? [X151] : (~p1(X151) & r1(X150,X151)) & p1(X150) & r1(X149,X150)) | ~r1(X131,X149)) | ? [X152] : (? [X153] : (~p1(X153) & r1(X152,X153)) & p1(X152) & ! [X154] : ((p1(X154) & ? [X155] : (~p1(X155) & r1(X154,X155))) | ! [X156] : (~r1(X154,X156) | ~p1(X156) | ! [X157] : (~r1(X156,X157) | p1(X157))) | ~r1(X152,X154)) & r1(X131,X152)) | ~p1(X131))) | ~r1(X130,X131)) | ~r1(X129,X130)) | ~r1(X128,X129)) | ~r1(X127,X128)))))) & ! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (~r1(X163,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (! [X167] : (~r1(X166,X167) | ((p1(X167) | ? [X168] : (~p1(X168) & ! [X169] : (~r1(X168,X169) | ! [X170] : (~r1(X169,X170) | p1(X170)) | ~p1(X169)) & r1(X167,X168)) | ! [X171] : (~r1(X167,X171) | ? [X172] : (r1(X171,X172) & ~p1(X172)))) & ! [X173] : (! [X174] : (! [X175] : (~r1(X174,X175) | p1(X175)) | ~r1(X173,X174)) | ? [X176] : (r1(X173,X176) & ~p1(X176)) | ~r1(X167,X173)))) | ~r1(X165,X166)))) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160))) | ~r1(X0,X158)) & ! [X177] : (~r1(X0,X177) | ! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (! [X181] : (~r1(X180,X181) | ! [X182] : (! [X183] : (! [X184] : (~r1(X183,X184) | ! [X185] : (! [X186] : (~r1(X185,X186) | ! [X187] : (~r1(X186,X187) | (! [X188] : (~r1(X187,X188) | ! [X189] : (! [X190] : (p1(X190) | ~r1(X189,X190)) | ~r1(X188,X189)) | ? [X191] : (~p1(X191) & r1(X188,X191))) & (? [X192] : (! [X193] : (~p1(X193) | ! [X194] : (~r1(X193,X194) | p1(X194)) | ~r1(X192,X193)) & ~p1(X192) & r1(X187,X192)) | ! [X195] : (~r1(X187,X195) | ? [X196] : (~p1(X196) & r1(X195,X196))) | p1(X187))))) | ~r1(X184,X185))) | ~r1(X182,X183)) | ~r1(X181,X182))) | ~r1(X179,X180))))) & ! [X197] : (! [X198] : (! [X199] : (~r1(X198,X199) | ! [X200] : (~r1(X199,X200) | ! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (! [X206] : (! [X207] : (! [X208] : (((p1(X208) | ? [X209] : (r1(X208,X209) & ! [X210] : (~p1(X210) | ! [X211] : (p1(X211) | ~r1(X210,X211)) | ~r1(X209,X210)) & ~p1(X209)) | ! [X212] : (~r1(X208,X212) | ? [X213] : (r1(X212,X213) & ~p1(X213)))) & ! [X214] : (? [X215] : (~p1(X215) & r1(X214,X215)) | ! [X216] : (! [X217] : (~r1(X216,X217) | p1(X217)) | ~r1(X214,X216)) | ~r1(X208,X214))) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)) | ~r1(X204,X205))) | ~r1(X202,X203))) | ~r1(X200,X201)))) | ~r1(X197,X198)) | ~r1(X0,X197)) & ! [X218] : (~r1(X0,X218) | ! [X219] : (~r1(X218,X219) | ! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (! [X223] : (! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : (((? [X231] : (~p1(X231) & ! [X232] : (! [X233] : (p1(X233) | ~r1(X232,X233)) | ~p1(X232) | ~r1(X231,X232)) & r1(X230,X231)) | ! [X234] : (~r1(X230,X234) | ? [X235] : (~p1(X235) & r1(X234,X235))) | p1(X230)) & ! [X236] : (? [X237] : (r1(X236,X237) & ~p1(X237)) | ! [X238] : (! [X239] : (p1(X239) | ~r1(X238,X239)) | ~r1(X236,X238)) | ~r1(X230,X236))) | ~r1(X229,X230)))) | ~r1(X226,X227)) | ~r1(X225,X226))) | ~r1(X223,X224)) | ~r1(X222,X223)) | ~r1(X221,X222)))))) & ! [X240] : (! [X241] : (! [X242] : (! [X243] : (! [X244] : (! [X245] : (~r1(X244,X245) | ! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (((? [X254] : (r1(X253,X254) & ! [X255] : (! [X256] : (~r1(X255,X256) | p1(X256)) | ~p1(X255) | ~r1(X254,X255)) & ~p1(X254)) | ! [X257] : (~r1(X253,X257) | ? [X258] : (r1(X257,X258) & ~p1(X258))) | p1(X253)) & ! [X259] : (~r1(X253,X259) | ! [X260] : (! [X261] : (~r1(X260,X261) | p1(X261)) | ~r1(X259,X260)) | ? [X262] : (~p1(X262) & r1(X259,X262)))) | ~r1(X252,X253)) | ~r1(X251,X252))) | ~r1(X249,X250)) | ~r1(X248,X249)))) | ~r1(X245,X246))) | ~r1(X243,X244)) | ~r1(X242,X243)) | ~r1(X241,X242)) | ~r1(X240,X241)) | ~r1(X0,X240)))), 2.75/0.76 inference(flattening,[],[f5])). 2.75/0.76 fof(f5,plain,( 2.75/0.76 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((! [X10] : (! [X11] : (! [X12] : (p1(X12) | ~r1(X11,X12)) | ~r1(X10,X11)) | ? [X13] : (r1(X10,X13) & ~p1(X13)) | ~r1(X9,X10)) & (p1(X9) | ! [X14] : (~r1(X9,X14) | ? [X15] : (~p1(X15) & r1(X14,X15))) | ? [X16] : (r1(X9,X16) & ! [X17] : (! [X18] : (~r1(X17,X18) | p1(X18)) | ~p1(X17) | ~r1(X16,X17)) & ~p1(X16)))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & (! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ((! [X22] : (? [X23] : (r1(X22,X23) & ~p1(X23)) | ~r1(X21,X22)) | ? [X24] : (r1(X21,X24) & ! [X25] : (~r1(X24,X25) | ~p1(X25) | ! [X26] : (~r1(X25,X26) | p1(X26))) & ~p1(X24)) | p1(X21)) & ! [X27] : (? [X28] : (~p1(X28) & r1(X27,X28)) | ! [X29] : (! [X30] : (p1(X30) | ~r1(X29,X30)) | ~r1(X27,X29)) | ~r1(X21,X27))))) | ~r1(X0,X19)) & ! [X31] : (~r1(X0,X31) | ! [X32] : (~r1(X31,X32) | (! [X33] : (? [X34] : (~p1(X34) & r1(X33,X34)) | ! [X35] : (~r1(X33,X35) | ! [X36] : (p1(X36) | ~r1(X35,X36))) | ~r1(X32,X33)) & (p1(X32) | ? [X37] : (r1(X32,X37) & ~p1(X37) & ! [X38] : (~r1(X37,X38) | ~p1(X38) | ! [X39] : (p1(X39) | ~r1(X38,X39)))) | ! [X40] : (? [X41] : (r1(X40,X41) & ~p1(X41)) | ~r1(X32,X40)))))) & ! [X42] : (((? [X43] : (r1(X42,X43) & ! [X44] : (! [X45] : (p1(X45) | ~r1(X44,X45)) | ~p1(X44) | ~r1(X43,X44)) & ~p1(X43)) | ! [X46] : (? [X47] : (r1(X46,X47) & ~p1(X47)) | ~r1(X42,X46)) | p1(X42)) & ! [X48] : (? [X49] : (~p1(X49) & r1(X48,X49)) | ! [X50] : (! [X51] : (~r1(X50,X51) | p1(X51)) | ~r1(X48,X50)) | ~r1(X42,X48))) | ~r1(X0,X42)) & ! [X52] : (~r1(X0,X52) | ! [X53] : (! [X54] : (! [X55] : (~r1(X54,X55) | (! [X56] : (~r1(X55,X56) | ! [X57] : (~r1(X56,X57) | ! [X58] : (~r1(X57,X58) | p1(X58))) | ? [X59] : (r1(X56,X59) & ~p1(X59))) & (! [X60] : (? [X61] : (~p1(X61) & r1(X60,X61)) | ~r1(X55,X60)) | ? [X62] : (r1(X55,X62) & ~p1(X62) & ! [X63] : (! [X64] : (~r1(X63,X64) | p1(X64)) | ~p1(X63) | ~r1(X62,X63))) | p1(X55)))) | ~r1(X53,X54)) | ~r1(X52,X53))) & ! [X65] : (! [X66] : (! [X67] : (! [X68] : (~r1(X67,X68) | ! [X69] : (((p1(X69) | ? [X70] : (~p1(X70) & ! [X71] : (! [X72] : (~r1(X71,X72) | p1(X72)) | ~p1(X71) | ~r1(X70,X71)) & r1(X69,X70)) | ! [X73] : (? [X74] : (r1(X73,X74) & ~p1(X74)) | ~r1(X69,X73))) & ! [X75] : (~r1(X69,X75) | ? [X76] : (r1(X75,X76) & ~p1(X76)) | ! [X77] : (! [X78] : (p1(X78) | ~r1(X77,X78)) | ~r1(X75,X77)))) | ~r1(X68,X69))) | ~r1(X66,X67)) | ~r1(X65,X66)) | ~r1(X0,X65)) & ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (! [X84] : ((! [X85] : (~r1(X84,X85) | ? [X86] : (~p1(X86) & r1(X85,X86)) | ! [X87] : (~r1(X85,X87) | ! [X88] : (~r1(X87,X88) | p1(X88)))) & (! [X89] : (? [X90] : (~p1(X90) & r1(X89,X90)) | ~r1(X84,X89)) | ? [X91] : (! [X92] : (! [X93] : (p1(X93) | ~r1(X92,X93)) | ~p1(X92) | ~r1(X91,X92)) & ~p1(X91) & r1(X84,X91)) | p1(X84))) | ~r1(X83,X84)) | ~r1(X82,X83)) | ~r1(X81,X82)))) | ~r1(X0,X79)) & ! [X94] : (~r1(X0,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (~r1(X96,X97) | ! [X98] : (! [X99] : (! [X100] : (((? [X101] : (r1(X100,X101) & ! [X102] : (! [X103] : (p1(X103) | ~r1(X102,X103)) | ~p1(X102) | ~r1(X101,X102)) & ~p1(X101)) | ! [X104] : (? [X105] : (~p1(X105) & r1(X104,X105)) | ~r1(X100,X104)) | p1(X100)) & ! [X106] : (? [X107] : (~p1(X107) & r1(X106,X107)) | ! [X108] : (~r1(X106,X108) | ! [X109] : (~r1(X108,X109) | p1(X109))) | ~r1(X100,X106))) | ~r1(X99,X100)) | ~r1(X98,X99)) | ~r1(X97,X98)))))) & ? [X110] : (? [X111] : (r1(X110,X111) & ? [X112] : (r1(X111,X112) & ? [X113] : (r1(X112,X113) & ? [X114] : (? [X115] : (r1(X114,X115) & ? [X116] : (r1(X115,X116) & ? [X117] : (! [X118] : (~r1(X117,X118) | p1(X118) | ? [X119] : (r1(X118,X119) & ? [X120] : (~p1(X120) & r1(X119,X120)) & p1(X119))) & ? [X121] : (! [X122] : (~r1(X121,X122) | p1(X122)) & r1(X117,X121)) & ? [X123] : (r1(X117,X123) & ~p1(X123)) & r1(X116,X117)))) & r1(X113,X114))))) & r1(X0,X110))) & ! [X124] : (~r1(X0,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (! [X129] : (! [X130] : (! [X131] : (((p1(X131) | ! [X132] : (? [X133] : (~p1(X133) & r1(X132,X133)) | ~r1(X131,X132)) | ? [X134] : (~p1(X134) & ! [X135] : (~r1(X134,X135) | ~p1(X135) | ! [X136] : (~r1(X135,X136) | p1(X136))) & r1(X131,X134))) & (? [X137] : (r1(X131,X137) & ! [X138] : (~r1(X137,X138) | ~p1(X138) | ! [X139] : (p1(X139) | ~r1(X138,X139))) & ~p1(X137)) | ! [X140] : (~r1(X131,X140) | ! [X141] : (p1(X141) | ? [X142] : (r1(X141,X142) & ? [X143] : (~p1(X143) & r1(X142,X143)) & p1(X142)) | ~r1(X140,X141)))) & ! [X144] : (! [X145] : (! [X146] : (~r1(X145,X146) | p1(X146)) | ~r1(X144,X145)) | ? [X147] : (r1(X144,X147) & ~p1(X147)) | ~r1(X131,X144)) & (! [X148] : (p1(X148) | ~r1(X131,X148)) | ! [X149] : (? [X150] : (? [X151] : (~p1(X151) & r1(X150,X151)) & p1(X150) & r1(X149,X150)) | ~r1(X131,X149)) | ? [X152] : (? [X153] : (~p1(X153) & r1(X152,X153)) & p1(X152) & ! [X154] : ((p1(X154) & ? [X155] : (~p1(X155) & r1(X154,X155))) | ! [X156] : (~r1(X154,X156) | ~p1(X156) | ! [X157] : (~r1(X156,X157) | p1(X157))) | ~r1(X152,X154)) & r1(X131,X152)) | ~p1(X131))) | ~r1(X130,X131)) | ~r1(X129,X130)) | ~r1(X128,X129)) | ~r1(X127,X128)))))) & ! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (~r1(X163,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (! [X167] : (~r1(X166,X167) | ((p1(X167) | ? [X168] : (~p1(X168) & ! [X169] : (~r1(X168,X169) | ! [X170] : (~r1(X169,X170) | p1(X170)) | ~p1(X169)) & r1(X167,X168)) | ! [X171] : (~r1(X167,X171) | ? [X172] : (r1(X171,X172) & ~p1(X172)))) & ! [X173] : (! [X174] : (! [X175] : (~r1(X174,X175) | p1(X175)) | ~r1(X173,X174)) | ? [X176] : (r1(X173,X176) & ~p1(X176)) | ~r1(X167,X173)))) | ~r1(X165,X166)))) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160))) | ~r1(X0,X158)) & ! [X177] : (~r1(X0,X177) | ! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (! [X181] : (~r1(X180,X181) | ! [X182] : (! [X183] : (! [X184] : (~r1(X183,X184) | ! [X185] : (! [X186] : (~r1(X185,X186) | ! [X187] : (~r1(X186,X187) | (! [X188] : (~r1(X187,X188) | ! [X189] : (! [X190] : (p1(X190) | ~r1(X189,X190)) | ~r1(X188,X189)) | ? [X191] : (~p1(X191) & r1(X188,X191))) & (? [X192] : (! [X193] : (~p1(X193) | ! [X194] : (~r1(X193,X194) | p1(X194)) | ~r1(X192,X193)) & ~p1(X192) & r1(X187,X192)) | ! [X195] : (~r1(X187,X195) | ? [X196] : (~p1(X196) & r1(X195,X196))) | p1(X187))))) | ~r1(X184,X185))) | ~r1(X182,X183)) | ~r1(X181,X182))) | ~r1(X179,X180))))) & ! [X197] : (! [X198] : (! [X199] : (~r1(X198,X199) | ! [X200] : (~r1(X199,X200) | ! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (! [X206] : (! [X207] : (! [X208] : (((p1(X208) | ? [X209] : (r1(X208,X209) & ! [X210] : (~p1(X210) | ! [X211] : (p1(X211) | ~r1(X210,X211)) | ~r1(X209,X210)) & ~p1(X209)) | ! [X212] : (~r1(X208,X212) | ? [X213] : (r1(X212,X213) & ~p1(X213)))) & ! [X214] : (? [X215] : (~p1(X215) & r1(X214,X215)) | ! [X216] : (! [X217] : (~r1(X216,X217) | p1(X217)) | ~r1(X214,X216)) | ~r1(X208,X214))) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)) | ~r1(X204,X205))) | ~r1(X202,X203))) | ~r1(X200,X201)))) | ~r1(X197,X198)) | ~r1(X0,X197)) & ! [X218] : (~r1(X0,X218) | ! [X219] : (~r1(X218,X219) | ! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (! [X223] : (! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : (((? [X231] : (~p1(X231) & ! [X232] : (! [X233] : (p1(X233) | ~r1(X232,X233)) | ~p1(X232) | ~r1(X231,X232)) & r1(X230,X231)) | ! [X234] : (~r1(X230,X234) | ? [X235] : (~p1(X235) & r1(X234,X235))) | p1(X230)) & ! [X236] : (? [X237] : (r1(X236,X237) & ~p1(X237)) | ! [X238] : (! [X239] : (p1(X239) | ~r1(X238,X239)) | ~r1(X236,X238)) | ~r1(X230,X236))) | ~r1(X229,X230)))) | ~r1(X226,X227)) | ~r1(X225,X226))) | ~r1(X223,X224)) | ~r1(X222,X223)) | ~r1(X221,X222)))))) & ! [X240] : (! [X241] : (! [X242] : (! [X243] : (! [X244] : (! [X245] : (~r1(X244,X245) | ! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (((? [X254] : (r1(X253,X254) & ! [X255] : (! [X256] : (~r1(X255,X256) | p1(X256)) | ~p1(X255) | ~r1(X254,X255)) & ~p1(X254)) | ! [X257] : (~r1(X253,X257) | ? [X258] : (r1(X257,X258) & ~p1(X258))) | p1(X253)) & ! [X259] : (~r1(X253,X259) | ! [X260] : (! [X261] : (~r1(X260,X261) | p1(X261)) | ~r1(X259,X260)) | ? [X262] : (~p1(X262) & r1(X259,X262)))) | ~r1(X252,X253)) | ~r1(X251,X252))) | ~r1(X249,X250)) | ~r1(X248,X249)))) | ~r1(X245,X246))) | ~r1(X243,X244)) | ~r1(X242,X243)) | ~r1(X241,X242)) | ~r1(X240,X241)) | ~r1(X0,X240)))), 2.75/0.76 inference(ennf_transformation,[],[f4])). 2.75/0.76 fof(f4,plain,( 2.75/0.76 ? [X0] : ~(~! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((! [X10] : (! [X11] : (! [X12] : (p1(X12) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~! [X13] : (~r1(X10,X13) | p1(X13)) | ~r1(X9,X10)) & (p1(X9) | ! [X14] : (~r1(X9,X14) | ~! [X15] : (p1(X15) | ~r1(X14,X15))) | ~! [X16] : (~r1(X9,X16) | ~! [X17] : (! [X18] : (~r1(X17,X18) | p1(X18)) | ~p1(X17) | ~r1(X16,X17)) | p1(X16)))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) | ~(! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ((! [X22] : (~! [X23] : (~r1(X22,X23) | p1(X23)) | ~r1(X21,X22)) | ~! [X24] : (~r1(X21,X24) | ~! [X25] : (~r1(X24,X25) | ~p1(X25) | ! [X26] : (~r1(X25,X26) | p1(X26))) | p1(X24)) | p1(X21)) & ! [X27] : (~! [X28] : (p1(X28) | ~r1(X27,X28)) | ! [X29] : (! [X30] : (p1(X30) | ~r1(X29,X30)) | ~r1(X27,X29)) | ~r1(X21,X27))))) | ~r1(X0,X19)) & ! [X31] : (~r1(X0,X31) | ! [X32] : (~r1(X31,X32) | (! [X33] : (~! [X34] : (p1(X34) | ~r1(X33,X34)) | ! [X35] : (~r1(X33,X35) | ! [X36] : (p1(X36) | ~r1(X35,X36))) | ~r1(X32,X33)) & (p1(X32) | ~! [X37] : (~r1(X32,X37) | p1(X37) | ~! [X38] : (~r1(X37,X38) | ~p1(X38) | ! [X39] : (p1(X39) | ~r1(X38,X39)))) | ! [X40] : (~! [X41] : (~r1(X40,X41) | p1(X41)) | ~r1(X32,X40)))))) & ! [X42] : (((~! [X43] : (~r1(X42,X43) | ~! [X44] : (! [X45] : (p1(X45) | ~r1(X44,X45)) | ~p1(X44) | ~r1(X43,X44)) | p1(X43)) | ! [X46] : (~! [X47] : (~r1(X46,X47) | p1(X47)) | ~r1(X42,X46)) | p1(X42)) & ! [X48] : (~! [X49] : (p1(X49) | ~r1(X48,X49)) | ! [X50] : (! [X51] : (~r1(X50,X51) | p1(X51)) | ~r1(X48,X50)) | ~r1(X42,X48))) | ~r1(X0,X42)) & ! [X52] : (~r1(X0,X52) | ! [X53] : (! [X54] : (! [X55] : (~r1(X54,X55) | (! [X56] : (~r1(X55,X56) | ! [X57] : (~r1(X56,X57) | ! [X58] : (~r1(X57,X58) | p1(X58))) | ~! [X59] : (~r1(X56,X59) | p1(X59))) & (! [X60] : (~! [X61] : (p1(X61) | ~r1(X60,X61)) | ~r1(X55,X60)) | ~! [X62] : (~r1(X55,X62) | p1(X62) | ~! [X63] : (! [X64] : (~r1(X63,X64) | p1(X64)) | ~p1(X63) | ~r1(X62,X63))) | p1(X55)))) | ~r1(X53,X54)) | ~r1(X52,X53))) & ! [X65] : (! [X66] : (! [X67] : (! [X68] : (~r1(X67,X68) | ! [X69] : (((p1(X69) | ~! [X70] : (p1(X70) | ~! [X71] : (! [X72] : (~r1(X71,X72) | p1(X72)) | ~p1(X71) | ~r1(X70,X71)) | ~r1(X69,X70)) | ! [X73] : (~! [X74] : (~r1(X73,X74) | p1(X74)) | ~r1(X69,X73))) & ! [X75] : (~r1(X69,X75) | ~! [X76] : (~r1(X75,X76) | p1(X76)) | ! [X77] : (! [X78] : (p1(X78) | ~r1(X77,X78)) | ~r1(X75,X77)))) | ~r1(X68,X69))) | ~r1(X66,X67)) | ~r1(X65,X66)) | ~r1(X0,X65)) & ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (! [X84] : ((! [X85] : (~r1(X84,X85) | ~! [X86] : (p1(X86) | ~r1(X85,X86)) | ! [X87] : (~r1(X85,X87) | ! [X88] : (~r1(X87,X88) | p1(X88)))) & (! [X89] : (~! [X90] : (p1(X90) | ~r1(X89,X90)) | ~r1(X84,X89)) | ~! [X91] : (~! [X92] : (! [X93] : (p1(X93) | ~r1(X92,X93)) | ~p1(X92) | ~r1(X91,X92)) | p1(X91) | ~r1(X84,X91)) | p1(X84))) | ~r1(X83,X84)) | ~r1(X82,X83)) | ~r1(X81,X82)))) | ~r1(X0,X79)) & ! [X94] : (~r1(X0,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (~r1(X96,X97) | ! [X98] : (! [X99] : (! [X100] : (((~! [X101] : (~r1(X100,X101) | ~! [X102] : (! [X103] : (p1(X103) | ~r1(X102,X103)) | ~p1(X102) | ~r1(X101,X102)) | p1(X101)) | ! [X104] : (~! [X105] : (p1(X105) | ~r1(X104,X105)) | ~r1(X100,X104)) | p1(X100)) & ! [X106] : (~! [X107] : (p1(X107) | ~r1(X106,X107)) | ! [X108] : (~r1(X106,X108) | ! [X109] : (~r1(X108,X109) | p1(X109))) | ~r1(X100,X106))) | ~r1(X99,X100)) | ~r1(X98,X99)) | ~r1(X97,X98)))))) & ~! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (~r1(X112,X113) | ! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (~! [X118] : (~r1(X117,X118) | p1(X118) | ~! [X119] : (~r1(X118,X119) | ! [X120] : (p1(X120) | ~r1(X119,X120)) | ~p1(X119))) | ! [X121] : (~! [X122] : (~r1(X121,X122) | p1(X122)) | ~r1(X117,X121)) | ! [X123] : (~r1(X117,X123) | p1(X123)) | ~r1(X116,X117)))) | ~r1(X113,X114))))) | ~r1(X0,X110))) | ~! [X124] : (~r1(X0,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (! [X129] : (! [X130] : (! [X131] : (((p1(X131) | ! [X132] : (~! [X133] : (p1(X133) | ~r1(X132,X133)) | ~r1(X131,X132)) | ~! [X134] : (p1(X134) | ~! [X135] : (~r1(X134,X135) | ~p1(X135) | ! [X136] : (~r1(X135,X136) | p1(X136))) | ~r1(X131,X134))) & (~! [X137] : (~r1(X131,X137) | ~! [X138] : (~r1(X137,X138) | ~p1(X138) | ! [X139] : (p1(X139) | ~r1(X138,X139))) | p1(X137)) | ! [X140] : (~r1(X131,X140) | ! [X141] : (p1(X141) | ~! [X142] : (~r1(X141,X142) | ! [X143] : (p1(X143) | ~r1(X142,X143)) | ~p1(X142)) | ~r1(X140,X141)))) & ! [X144] : (! [X145] : (! [X146] : (~r1(X145,X146) | p1(X146)) | ~r1(X144,X145)) | ~! [X147] : (~r1(X144,X147) | p1(X147)) | ~r1(X131,X144)) & (! [X148] : (p1(X148) | ~r1(X131,X148)) | ! [X149] : (~! [X150] : (! [X151] : (p1(X151) | ~r1(X150,X151)) | ~p1(X150) | ~r1(X149,X150)) | ~r1(X131,X149)) | ~! [X152] : (! [X153] : (p1(X153) | ~r1(X152,X153)) | ~p1(X152) | ~! [X154] : (~(~p1(X154) | ! [X155] : (p1(X155) | ~r1(X154,X155))) | ! [X156] : (~r1(X154,X156) | ~p1(X156) | ! [X157] : (~r1(X156,X157) | p1(X157))) | ~r1(X152,X154)) | ~r1(X131,X152)) | ~p1(X131))) | ~r1(X130,X131)) | ~r1(X129,X130)) | ~r1(X128,X129)) | ~r1(X127,X128)))))) | ~! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (~r1(X163,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (! [X167] : (~r1(X166,X167) | ((p1(X167) | ~! [X168] : (p1(X168) | ~! [X169] : (~r1(X168,X169) | ! [X170] : (~r1(X169,X170) | p1(X170)) | ~p1(X169)) | ~r1(X167,X168)) | ! [X171] : (~r1(X167,X171) | ~! [X172] : (~r1(X171,X172) | p1(X172)))) & ! [X173] : (! [X174] : (! [X175] : (~r1(X174,X175) | p1(X175)) | ~r1(X173,X174)) | ~! [X176] : (~r1(X173,X176) | p1(X176)) | ~r1(X167,X173)))) | ~r1(X165,X166)))) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160))) | ~r1(X0,X158)) | ~! [X177] : (~r1(X0,X177) | ! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (! [X181] : (~r1(X180,X181) | ! [X182] : (! [X183] : (! [X184] : (~r1(X183,X184) | ! [X185] : (! [X186] : (~r1(X185,X186) | ! [X187] : (~r1(X186,X187) | (! [X188] : (~r1(X187,X188) | ! [X189] : (! [X190] : (p1(X190) | ~r1(X189,X190)) | ~r1(X188,X189)) | ~! [X191] : (p1(X191) | ~r1(X188,X191))) & (~! [X192] : (~! [X193] : (~p1(X193) | ! [X194] : (~r1(X193,X194) | p1(X194)) | ~r1(X192,X193)) | p1(X192) | ~r1(X187,X192)) | ! [X195] : (~r1(X187,X195) | ~! [X196] : (p1(X196) | ~r1(X195,X196))) | p1(X187))))) | ~r1(X184,X185))) | ~r1(X182,X183)) | ~r1(X181,X182))) | ~r1(X179,X180))))) | ~! [X197] : (! [X198] : (! [X199] : (~r1(X198,X199) | ! [X200] : (~r1(X199,X200) | ! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (! [X206] : (! [X207] : (! [X208] : (((p1(X208) | ~! [X209] : (~r1(X208,X209) | ~! [X210] : (~p1(X210) | ! [X211] : (p1(X211) | ~r1(X210,X211)) | ~r1(X209,X210)) | p1(X209)) | ! [X212] : (~r1(X208,X212) | ~! [X213] : (~r1(X212,X213) | p1(X213)))) & ! [X214] : (~! [X215] : (p1(X215) | ~r1(X214,X215)) | ! [X216] : (! [X217] : (~r1(X216,X217) | p1(X217)) | ~r1(X214,X216)) | ~r1(X208,X214))) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)) | ~r1(X204,X205))) | ~r1(X202,X203))) | ~r1(X200,X201)))) | ~r1(X197,X198)) | ~r1(X0,X197)) | ~! [X218] : (~r1(X0,X218) | ! [X219] : (~r1(X218,X219) | ! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (! [X223] : (! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : (((~! [X231] : (p1(X231) | ~! [X232] : (! [X233] : (p1(X233) | ~r1(X232,X233)) | ~p1(X232) | ~r1(X231,X232)) | ~r1(X230,X231)) | ! [X234] : (~r1(X230,X234) | ~! [X235] : (p1(X235) | ~r1(X234,X235))) | p1(X230)) & ! [X236] : (~! [X237] : (~r1(X236,X237) | p1(X237)) | ! [X238] : (! [X239] : (p1(X239) | ~r1(X238,X239)) | ~r1(X236,X238)) | ~r1(X230,X236))) | ~r1(X229,X230)))) | ~r1(X226,X227)) | ~r1(X225,X226))) | ~r1(X223,X224)) | ~r1(X222,X223)) | ~r1(X221,X222)))))) | ~! [X240] : (! [X241] : (! [X242] : (! [X243] : (! [X244] : (! [X245] : (~r1(X244,X245) | ! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (((~! [X254] : (~r1(X253,X254) | ~! [X255] : (! [X256] : (~r1(X255,X256) | p1(X256)) | ~p1(X255) | ~r1(X254,X255)) | p1(X254)) | ! [X257] : (~r1(X253,X257) | ~! [X258] : (~r1(X257,X258) | p1(X258))) | p1(X253)) & ! [X259] : (~r1(X253,X259) | ! [X260] : (! [X261] : (~r1(X260,X261) | p1(X261)) | ~r1(X259,X260)) | ~! [X262] : (p1(X262) | ~r1(X259,X262)))) | ~r1(X252,X253)) | ~r1(X251,X252))) | ~r1(X249,X250)) | ~r1(X248,X249)))) | ~r1(X245,X246))) | ~r1(X243,X244)) | ~r1(X242,X243)) | ~r1(X241,X242)) | ~r1(X240,X241)) | ~r1(X0,X240)))), 2.75/0.76 inference(flattening,[],[f3])). 2.75/0.76 fof(f3,plain,( 2.75/0.76 ~~? [X0] : ~(~! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (! [X9] : ((! [X10] : (! [X11] : (! [X12] : (p1(X12) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~! [X13] : (~r1(X10,X13) | p1(X13)) | ~r1(X9,X10)) & (p1(X9) | ! [X14] : (~r1(X9,X14) | ~! [X15] : (p1(X15) | ~r1(X14,X15))) | ~! [X16] : (~r1(X9,X16) | ~! [X17] : (! [X18] : (~r1(X17,X18) | p1(X18)) | ~p1(X17) | ~r1(X16,X17)) | p1(X16)))) | ~r1(X8,X9)) | ~r1(X7,X8)) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) | ~(! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (~r1(X20,X21) | ((! [X22] : (~! [X23] : (~r1(X22,X23) | p1(X23)) | ~r1(X21,X22)) | ~! [X24] : (~r1(X21,X24) | ~! [X25] : (~r1(X24,X25) | ~p1(X25) | ! [X26] : (~r1(X25,X26) | p1(X26))) | p1(X24)) | p1(X21)) & ! [X27] : (~! [X28] : (p1(X28) | ~r1(X27,X28)) | ! [X29] : (! [X30] : (p1(X30) | ~r1(X29,X30)) | ~r1(X27,X29)) | ~r1(X21,X27))))) | ~r1(X0,X19)) & ! [X31] : (~r1(X0,X31) | ! [X32] : (~r1(X31,X32) | (! [X33] : (~! [X34] : (p1(X34) | ~r1(X33,X34)) | ! [X35] : (~r1(X33,X35) | ! [X36] : (p1(X36) | ~r1(X35,X36))) | ~r1(X32,X33)) & (p1(X32) | ~! [X37] : (~r1(X32,X37) | p1(X37) | ~! [X38] : (~r1(X37,X38) | ~p1(X38) | ! [X39] : (p1(X39) | ~r1(X38,X39)))) | ! [X40] : (~! [X41] : (~r1(X40,X41) | p1(X41)) | ~r1(X32,X40)))))) & ! [X42] : (((~! [X43] : (~r1(X42,X43) | ~! [X44] : (! [X45] : (p1(X45) | ~r1(X44,X45)) | ~p1(X44) | ~r1(X43,X44)) | p1(X43)) | ! [X46] : (~! [X47] : (~r1(X46,X47) | p1(X47)) | ~r1(X42,X46)) | p1(X42)) & ! [X48] : (~! [X49] : (p1(X49) | ~r1(X48,X49)) | ! [X50] : (! [X51] : (~r1(X50,X51) | p1(X51)) | ~r1(X48,X50)) | ~r1(X42,X48))) | ~r1(X0,X42)) & ! [X52] : (~r1(X0,X52) | ! [X53] : (! [X54] : (! [X55] : (~r1(X54,X55) | (! [X56] : (~r1(X55,X56) | ! [X57] : (~r1(X56,X57) | ! [X58] : (~r1(X57,X58) | p1(X58))) | ~! [X59] : (~r1(X56,X59) | p1(X59))) & (! [X60] : (~! [X61] : (p1(X61) | ~r1(X60,X61)) | ~r1(X55,X60)) | ~! [X62] : (~r1(X55,X62) | p1(X62) | ~! [X63] : (! [X64] : (~r1(X63,X64) | p1(X64)) | ~p1(X63) | ~r1(X62,X63))) | p1(X55)))) | ~r1(X53,X54)) | ~r1(X52,X53))) & ! [X65] : (! [X66] : (! [X67] : (! [X68] : (~r1(X67,X68) | ! [X69] : (((p1(X69) | ~! [X70] : (p1(X70) | ~! [X71] : (! [X72] : (~r1(X71,X72) | p1(X72)) | ~p1(X71) | ~r1(X70,X71)) | ~r1(X69,X70)) | ! [X73] : (~! [X74] : (~r1(X73,X74) | p1(X74)) | ~r1(X69,X73))) & ! [X75] : (~r1(X69,X75) | ~! [X76] : (~r1(X75,X76) | p1(X76)) | ! [X77] : (! [X78] : (p1(X78) | ~r1(X77,X78)) | ~r1(X75,X77)))) | ~r1(X68,X69))) | ~r1(X66,X67)) | ~r1(X65,X66)) | ~r1(X0,X65)) & ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (! [X84] : ((! [X85] : (~r1(X84,X85) | ~! [X86] : (p1(X86) | ~r1(X85,X86)) | ! [X87] : (~r1(X85,X87) | ! [X88] : (~r1(X87,X88) | p1(X88)))) & (! [X89] : (~! [X90] : (p1(X90) | ~r1(X89,X90)) | ~r1(X84,X89)) | ~! [X91] : (~! [X92] : (! [X93] : (p1(X93) | ~r1(X92,X93)) | ~p1(X92) | ~r1(X91,X92)) | p1(X91) | ~r1(X84,X91)) | p1(X84))) | ~r1(X83,X84)) | ~r1(X82,X83)) | ~r1(X81,X82)))) | ~r1(X0,X79)) & ! [X94] : (~r1(X0,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (~r1(X96,X97) | ! [X98] : (! [X99] : (! [X100] : (((~! [X101] : (~r1(X100,X101) | ~! [X102] : (! [X103] : (p1(X103) | ~r1(X102,X103)) | ~p1(X102) | ~r1(X101,X102)) | p1(X101)) | ! [X104] : (~! [X105] : (p1(X105) | ~r1(X104,X105)) | ~r1(X100,X104)) | p1(X100)) & ! [X106] : (~! [X107] : (p1(X107) | ~r1(X106,X107)) | ! [X108] : (~r1(X106,X108) | ! [X109] : (~r1(X108,X109) | p1(X109))) | ~r1(X100,X106))) | ~r1(X99,X100)) | ~r1(X98,X99)) | ~r1(X97,X98)))))) & ~! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (~r1(X112,X113) | ! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (~! [X118] : (~r1(X117,X118) | p1(X118) | ~! [X119] : (~r1(X118,X119) | ! [X120] : (p1(X120) | ~r1(X119,X120)) | ~p1(X119))) | ! [X121] : (~! [X122] : (~r1(X121,X122) | p1(X122)) | ~r1(X117,X121)) | ! [X123] : (~r1(X117,X123) | p1(X123)) | ~r1(X116,X117)))) | ~r1(X113,X114))))) | ~r1(X0,X110))) | ~! [X124] : (~r1(X0,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (~r1(X125,X126) | ! [X127] : (~r1(X126,X127) | ! [X128] : (! [X129] : (! [X130] : (! [X131] : (((p1(X131) | ! [X132] : (~! [X133] : (p1(X133) | ~r1(X132,X133)) | ~r1(X131,X132)) | ~! [X134] : (p1(X134) | ~! [X135] : (~r1(X134,X135) | ~p1(X135) | ! [X136] : (~r1(X135,X136) | p1(X136))) | ~r1(X131,X134))) & (~! [X137] : (~r1(X131,X137) | ~! [X138] : (~r1(X137,X138) | ~p1(X138) | ! [X139] : (p1(X139) | ~r1(X138,X139))) | p1(X137)) | ! [X140] : (~r1(X131,X140) | ! [X141] : (p1(X141) | ~! [X142] : (~r1(X141,X142) | ! [X143] : (p1(X143) | ~r1(X142,X143)) | ~p1(X142)) | ~r1(X140,X141)))) & ! [X144] : (! [X145] : (! [X146] : (~r1(X145,X146) | p1(X146)) | ~r1(X144,X145)) | ~! [X147] : (~r1(X144,X147) | p1(X147)) | ~r1(X131,X144)) & (! [X148] : (p1(X148) | ~r1(X131,X148)) | ! [X149] : (~! [X150] : (! [X151] : (p1(X151) | ~r1(X150,X151)) | ~p1(X150) | ~r1(X149,X150)) | ~r1(X131,X149)) | ~! [X152] : (! [X153] : (p1(X153) | ~r1(X152,X153)) | ~p1(X152) | ~! [X154] : (~(~p1(X154) | ! [X155] : (p1(X155) | ~r1(X154,X155))) | ! [X156] : (~r1(X154,X156) | ~p1(X156) | ! [X157] : (~r1(X156,X157) | p1(X157))) | ~r1(X152,X154)) | ~r1(X131,X152)) | ~p1(X131))) | ~r1(X130,X131)) | ~r1(X129,X130)) | ~r1(X128,X129)) | ~r1(X127,X128)))))) | ~! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (! [X162] : (! [X163] : (! [X164] : (~r1(X163,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (! [X167] : (~r1(X166,X167) | ((p1(X167) | ~! [X168] : (p1(X168) | ~! [X169] : (~r1(X168,X169) | ! [X170] : (~r1(X169,X170) | p1(X170)) | ~p1(X169)) | ~r1(X167,X168)) | ! [X171] : (~r1(X167,X171) | ~! [X172] : (~r1(X171,X172) | p1(X172)))) & ! [X173] : (! [X174] : (! [X175] : (~r1(X174,X175) | p1(X175)) | ~r1(X173,X174)) | ~! [X176] : (~r1(X173,X176) | p1(X176)) | ~r1(X167,X173)))) | ~r1(X165,X166)))) | ~r1(X162,X163)) | ~r1(X161,X162)) | ~r1(X160,X161)) | ~r1(X159,X160))) | ~r1(X0,X158)) | ~! [X177] : (~r1(X0,X177) | ! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (! [X181] : (~r1(X180,X181) | ! [X182] : (! [X183] : (! [X184] : (~r1(X183,X184) | ! [X185] : (! [X186] : (~r1(X185,X186) | ! [X187] : (~r1(X186,X187) | (! [X188] : (~r1(X187,X188) | ! [X189] : (! [X190] : (p1(X190) | ~r1(X189,X190)) | ~r1(X188,X189)) | ~! [X191] : (p1(X191) | ~r1(X188,X191))) & (~! [X192] : (~! [X193] : (~p1(X193) | ! [X194] : (~r1(X193,X194) | p1(X194)) | ~r1(X192,X193)) | p1(X192) | ~r1(X187,X192)) | ! [X195] : (~r1(X187,X195) | ~! [X196] : (p1(X196) | ~r1(X195,X196))) | p1(X187))))) | ~r1(X184,X185))) | ~r1(X182,X183)) | ~r1(X181,X182))) | ~r1(X179,X180))))) | ~! [X197] : (! [X198] : (! [X199] : (~r1(X198,X199) | ! [X200] : (~r1(X199,X200) | ! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (! [X206] : (! [X207] : (! [X208] : (((p1(X208) | ~! [X209] : (~r1(X208,X209) | ~! [X210] : (~p1(X210) | ! [X211] : (p1(X211) | ~r1(X210,X211)) | ~r1(X209,X210)) | p1(X209)) | ! [X212] : (~r1(X208,X212) | ~! [X213] : (~r1(X212,X213) | p1(X213)))) & ! [X214] : (~! [X215] : (p1(X215) | ~r1(X214,X215)) | ! [X216] : (! [X217] : (~r1(X216,X217) | p1(X217)) | ~r1(X214,X216)) | ~r1(X208,X214))) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)) | ~r1(X204,X205))) | ~r1(X202,X203))) | ~r1(X200,X201)))) | ~r1(X197,X198)) | ~r1(X0,X197)) | ~! [X218] : (~r1(X0,X218) | ! [X219] : (~r1(X218,X219) | ! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (! [X223] : (! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : (((~! [X231] : (p1(X231) | ~! [X232] : (! [X233] : (p1(X233) | ~r1(X232,X233)) | ~p1(X232) | ~r1(X231,X232)) | ~r1(X230,X231)) | ! [X234] : (~r1(X230,X234) | ~! [X235] : (p1(X235) | ~r1(X234,X235))) | p1(X230)) & ! [X236] : (~! [X237] : (~r1(X236,X237) | p1(X237)) | ! [X238] : (! [X239] : (p1(X239) | ~r1(X238,X239)) | ~r1(X236,X238)) | ~r1(X230,X236))) | ~r1(X229,X230)))) | ~r1(X226,X227)) | ~r1(X225,X226))) | ~r1(X223,X224)) | ~r1(X222,X223)) | ~r1(X221,X222)))))) | ~! [X240] : (! [X241] : (! [X242] : (! [X243] : (! [X244] : (! [X245] : (~r1(X244,X245) | ! [X246] : (! [X247] : (~r1(X246,X247) | ! [X248] : (~r1(X247,X248) | ! [X249] : (! [X250] : (! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (((~! [X254] : (~r1(X253,X254) | ~! [X255] : (! [X256] : (~r1(X255,X256) | p1(X256)) | ~p1(X255) | ~r1(X254,X255)) | p1(X254)) | ! [X257] : (~r1(X253,X257) | ~! [X258] : (~r1(X257,X258) | p1(X258))) | p1(X253)) & ! [X259] : (~r1(X253,X259) | ! [X260] : (! [X261] : (~r1(X260,X261) | p1(X261)) | ~r1(X259,X260)) | ~! [X262] : (p1(X262) | ~r1(X259,X262)))) | ~r1(X252,X253)) | ~r1(X251,X252))) | ~r1(X249,X250)) | ~r1(X248,X249)))) | ~r1(X245,X246))) | ~r1(X243,X244)) | ~r1(X242,X243)) | ~r1(X241,X242)) | ~r1(X240,X241)) | ~r1(X0,X240)))), 2.75/0.76 inference(rectify,[],[f2])). 2.75/0.76 fof(f2,negated_conjecture,( 2.75/0.76 ~~? [X0] : ~(~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : ((! [X0] : (! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) & (p1(X1) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (p1(X1) | ~r1(X0,X1))) | ~! [X0] : (~r1(X1,X0) | ~! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~p1(X1) | ~r1(X0,X1)) | p1(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~(! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ((! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ~! [X1] : (~r1(X0,X1) | ~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | p1(X0)) | p1(X1)) & ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X0,X1)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | (! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~r1(X0,X1)) & (p1(X0) | ~! [X1] : (~r1(X0,X1) | p1(X1) | ~! [X0] : (~r1(X1,X0) | ~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1)))) | ! [X1] : (~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)))))) & ! [X1] : (((~! [X0] : (~r1(X1,X0) | ~! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~r1(X0,X1)) | p1(X0)) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | p1(X1)) & ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~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) | p1(X1))) | ~! [X0] : (~r1(X1,X0) | p1(X0))) & (! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | p1(X1) | ~! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~p1(X0) | ~r1(X1,X0))) | p1(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) & ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (((p1(X1) | ~! [X0] : (p1(X0) | ~! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0))) & ! [X0] : (~r1(X1,X0) | ~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) & ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : ((! [X1] : (~r1(X0,X1) | ~! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | p1(X1)))) & (! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (~! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0) | ~r1(X1,X0)) | p1(X1) | ~r1(X0,X1)) | p1(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) & ! [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] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~r1(X0,X1)) | p1(X0)) | ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | p1(X1)) & ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~r1(X1,X0))) | ~r1(X0,X1)) | ~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] : (~! [X1] : (~r1(X0,X1) | p1(X1) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0))) | ! [X1] : (~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (((p1(X0) | ! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (p1(X1) | ~! [X0] : (~r1(X1,X0) | ~p1(X0) | ! [X1] : (~r1(X0,X1) | p1(X1))) | ~r1(X0,X1))) & (~! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | ~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (p1(X0) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1)) | ~r1(X1,X0)))) & ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) & (! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (~! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~! [X0] : (~(~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ! [X1] : (~r1(X0,X1) | ~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~p1(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ((p1(X0) | ~! [X1] : (p1(X1) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | p1(X1)) | ~p1(X0)) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | p1(X0)))) & ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~! [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] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (p1(X1) | ~r1(X0,X1))) & (~! [X0] : (~! [X1] : (~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (p1(X1) | ~r1(X0,X1))) | p1(X1))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(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] : (! [X0] : (! [X1] : (! [X0] : (((p1(X0) | ~! [X1] : (~r1(X0,X1) | ~! [X0] : (~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | p1(X0)))) & ! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (! [X1] : (~r1(X0,X1) | p1(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(X1,X0)) | ~r1(X0,X1)) | ~! [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] : (p1(X0) | ~! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (p1(X1) | ~r1(X0,X1))) | p1(X1)) & ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (! [X0] : (p1(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)))))) | ~! [X1] : (! [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] : (((~! [X1] : (~r1(X0,X1) | ~! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~p1(X0) | ~r1(X1,X0)) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | p1(X0))) | p1(X0)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (p1(X0) | ~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)))), 2.75/0.76 inference(negated_conjecture,[],[f1])). 2.75/0.76 fof(f1,conjecture,( 2.75/0.76 ~? [X0] : ~(~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : ((! [X0] : (! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) & (p1(X1) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (p1(X1) | ~r1(X0,X1))) | ~! [X0] : (~r1(X1,X0) | ~! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~p1(X1) | ~r1(X0,X1)) | p1(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~(! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ((! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | ~! [X1] : (~r1(X0,X1) | ~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | p1(X0)) | p1(X1)) & ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X0,X1)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | (! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~r1(X0,X1)) & (p1(X0) | ~! [X1] : (~r1(X0,X1) | p1(X1) | ~! [X0] : (~r1(X1,X0) | ~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1)))) | ! [X1] : (~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)))))) & ! [X1] : (((~! [X0] : (~r1(X1,X0) | ~! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~r1(X0,X1)) | p1(X0)) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | p1(X1)) & ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~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) | p1(X1))) | ~! [X0] : (~r1(X1,X0) | p1(X0))) & (! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | p1(X1) | ~! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~p1(X0) | ~r1(X1,X0))) | p1(X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) & ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (((p1(X1) | ~! [X0] : (p1(X0) | ~! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0))) & ! [X0] : (~r1(X1,X0) | ~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) & ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : ((! [X1] : (~r1(X0,X1) | ~! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | p1(X1)))) & (! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (~! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0) | ~r1(X1,X0)) | p1(X1) | ~r1(X0,X1)) | p1(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) & ! [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] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~r1(X0,X1)) | p1(X0)) | ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | p1(X1)) & ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~r1(X1,X0))) | ~r1(X0,X1)) | ~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] : (~! [X1] : (~r1(X0,X1) | p1(X1) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0))) | ! [X1] : (~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (((p1(X0) | ! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (p1(X1) | ~! [X0] : (~r1(X1,X0) | ~p1(X0) | ! [X1] : (~r1(X0,X1) | p1(X1))) | ~r1(X0,X1))) & (~! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | ~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (p1(X0) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1)) | ~r1(X1,X0)))) & ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) & (! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (~! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~! [X0] : (~(~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ! [X1] : (~r1(X0,X1) | ~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~p1(X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))))) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ((p1(X0) | ~! [X1] : (p1(X1) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | p1(X1)) | ~p1(X0)) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | p1(X0)))) & ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~! [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] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (p1(X1) | ~r1(X0,X1))) & (~! [X0] : (~! [X1] : (~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (p1(X1) | ~r1(X0,X1))) | p1(X1))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(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] : (! [X0] : (! [X1] : (! [X0] : (((p1(X0) | ~! [X1] : (~r1(X0,X1) | ~! [X0] : (~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | p1(X0)))) & ! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (! [X1] : (~r1(X0,X1) | p1(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(X1,X0)) | ~r1(X0,X1)) | ~! [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] : (p1(X0) | ~! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (p1(X1) | ~r1(X0,X1))) | p1(X1)) & ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (! [X0] : (p1(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)))))) | ~! [X1] : (! [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] : (((~! [X1] : (~r1(X0,X1) | ~! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~p1(X0) | ~r1(X1,X0)) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | p1(X0))) | p1(X0)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (p1(X0) | ~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)))), 2.75/0.76 file('/export/starexec/sandbox/benchmark/theBenchmark.p',main)). 2.75/0.76 fof(f1185,plain,( 2.75/0.76 ( ! [X0] : (~r1(sK113,X0) | sP27(X0)) )), 2.75/0.76 inference(resolution,[],[f1182,f436])). 2.75/0.76 fof(f436,plain,( 2.75/0.76 r1(sK112,sK113)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1182,plain,( 2.75/0.76 ( ! [X0,X1] : (~r1(sK112,X0) | ~r1(X0,X1) | sP27(X1)) )), 2.75/0.76 inference(resolution,[],[f1180,f437])). 2.75/0.76 fof(f437,plain,( 2.75/0.76 r1(sK111,sK112)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1180,plain,( 2.75/0.76 ( ! [X2,X0,X1] : (~r1(sK111,X2) | ~r1(X2,X0) | ~r1(X0,X1) | sP27(X1)) )), 2.75/0.76 inference(resolution,[],[f1178,f429])). 2.75/0.76 fof(f429,plain,( 2.75/0.76 r1(sK110,sK111)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1178,plain,( 2.75/0.76 ( ! [X2,X3,X0,X1] : (~r1(sK110,X3) | ~r1(X1,X0) | ~r1(X2,X1) | ~r1(X3,X2) | sP27(X0)) )), 2.75/0.76 inference(resolution,[],[f1176,f438])). 2.75/0.76 fof(f438,plain,( 2.75/0.76 r1(sK109,sK110)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1176,plain,( 2.75/0.76 ( ! [X2,X3,X0,X1,X4] : (~r1(sK109,X0) | sP27(X1) | ~r1(X2,X1) | ~r1(X3,X2) | ~r1(X4,X3) | ~r1(X0,X4)) )), 2.75/0.76 inference(resolution,[],[f1175,f439])). 2.75/0.76 fof(f439,plain,( 2.75/0.76 r1(sK108,sK109)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1175,plain,( 2.75/0.76 ( ! [X2,X3,X0,X1,X4,X5] : (~r1(sK108,X0) | ~r1(X0,X1) | sP27(X2) | ~r1(X3,X2) | ~r1(X4,X3) | ~r1(X5,X4) | ~r1(X1,X5)) )), 2.75/0.76 inference(resolution,[],[f921,f440])). 2.75/0.76 fof(f440,plain,( 2.75/0.76 r1(sK107,sK108)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f921,plain,( 2.75/0.76 ( ! [X2,X3,X0,X1,X6,X4,X5] : (~r1(sK107,X0) | ~r1(X0,X1) | ~r1(X1,X2) | sP27(X3) | ~r1(X4,X3) | ~r1(X5,X4) | ~r1(X6,X5) | ~r1(X2,X6)) )), 2.75/0.76 inference(resolution,[],[f427,f428])). 2.75/0.76 fof(f428,plain,( 2.75/0.76 r1(sK106,sK107)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f427,plain,( 2.75/0.76 ( ! [X50,X51,X56,X54,X57,X55,X52,X53] : (~r1(sK106,X50) | ~r1(X50,X51) | ~r1(X51,X52) | ~r1(X52,X53) | sP27(X57) | ~r1(X56,X57) | ~r1(X55,X56) | ~r1(X54,X55) | ~r1(X53,X54)) )), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1754,plain,( 2.75/0.76 ~sP25(sK114) | ~spl117_132), 2.75/0.76 inference(resolution,[],[f1456,f433])). 2.75/0.76 fof(f433,plain,( 2.75/0.76 r1(sK114,sK115)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1456,plain,( 2.75/0.76 ( ! [X2] : (~r1(X2,sK115) | ~sP25(X2)) ) | ~spl117_132), 2.75/0.76 inference(avatar_component_clause,[],[f1455])). 2.75/0.76 fof(f1455,plain,( 2.75/0.76 spl117_132 <=> ! [X2] : (~r1(X2,sK115) | ~sP25(X2))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_132])])). 2.75/0.76 fof(f1735,plain,( 2.75/0.76 ~spl117_100 | ~spl117_105), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1734])). 2.75/0.76 fof(f1734,plain,( 2.75/0.76 $false | (~spl117_100 | ~spl117_105)), 2.75/0.76 inference(subsumption_resolution,[],[f1733,f1722])). 2.75/0.76 fof(f1722,plain,( 2.75/0.76 sP28(sK78(sK82(sK114))) | ~spl117_105), 2.75/0.76 inference(resolution,[],[f1239,f344])). 2.75/0.76 fof(f344,plain,( 2.75/0.76 ( ! [X0] : (~sP29(X0) | sP28(sK78(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f161])). 2.75/0.76 fof(f161,plain,( 2.75/0.76 ! [X0] : ((r1(X0,sK78(X0)) & sP28(sK78(X0)) & p1(sK78(X0))) | ~sP29(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK78])],[f159,f160])). 2.75/0.76 fof(f160,plain,( 2.75/0.76 ! [X0] : (? [X1] : (r1(X0,X1) & sP28(X1) & p1(X1)) => (r1(X0,sK78(X0)) & sP28(sK78(X0)) & p1(sK78(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f159,plain,( 2.75/0.76 ! [X0] : (? [X1] : (r1(X0,X1) & sP28(X1) & p1(X1)) | ~sP29(X0))), 2.75/0.76 inference(rectify,[],[f158])). 2.75/0.76 fof(f158,plain,( 2.75/0.76 ! [X118] : (? [X119] : (r1(X118,X119) & sP28(X119) & p1(X119)) | ~sP29(X118))), 2.75/0.76 inference(nnf_transformation,[],[f36])). 2.75/0.76 fof(f1239,plain,( 2.75/0.76 sP29(sK82(sK114)) | ~spl117_105), 2.75/0.76 inference(avatar_component_clause,[],[f1237])). 2.75/0.76 fof(f1237,plain,( 2.75/0.76 spl117_105 <=> sP29(sK82(sK114))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_105])])). 2.75/0.76 fof(f1733,plain,( 2.75/0.76 ~sP28(sK78(sK82(sK114))) | (~spl117_100 | ~spl117_105)), 2.75/0.76 inference(resolution,[],[f1732,f347])). 2.75/0.76 fof(f347,plain,( 2.75/0.76 ( ! [X0] : (~p1(sK79(X0)) | ~sP28(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f165])). 2.75/0.76 fof(f165,plain,( 2.75/0.76 ! [X0] : ((~p1(sK79(X0)) & r1(X0,sK79(X0))) | ~sP28(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK79])],[f163,f164])). 2.75/0.76 fof(f164,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) => (~p1(sK79(X0)) & r1(X0,sK79(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f163,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) | ~sP28(X0))), 2.75/0.76 inference(rectify,[],[f162])). 2.75/0.76 fof(f162,plain,( 2.75/0.76 ! [X119] : (? [X120] : (~p1(X120) & r1(X119,X120)) | ~sP28(X119))), 2.75/0.76 inference(nnf_transformation,[],[f35])). 2.75/0.76 fof(f1732,plain,( 2.75/0.76 p1(sK79(sK78(sK82(sK114)))) | (~spl117_100 | ~spl117_105)), 2.75/0.76 inference(resolution,[],[f1731,f1728])). 2.75/0.76 fof(f1728,plain,( 2.75/0.76 r1(sK78(sK82(sK114)),sK79(sK78(sK82(sK114)))) | ~spl117_105), 2.75/0.76 inference(resolution,[],[f1722,f346])). 2.75/0.76 fof(f346,plain,( 2.75/0.76 ( ! [X0] : (~sP28(X0) | r1(X0,sK79(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f165])). 2.75/0.76 fof(f1731,plain,( 2.75/0.76 ( ! [X0] : (~r1(sK78(sK82(sK114)),X0) | p1(X0)) ) | (~spl117_100 | ~spl117_105)), 2.75/0.76 inference(subsumption_resolution,[],[f1730,f1721])). 2.75/0.76 fof(f1721,plain,( 2.75/0.76 p1(sK78(sK82(sK114))) | ~spl117_105), 2.75/0.76 inference(resolution,[],[f1239,f343])). 2.75/0.76 fof(f343,plain,( 2.75/0.76 ( ! [X0] : (~sP29(X0) | p1(sK78(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f161])). 2.75/0.76 fof(f1730,plain,( 2.75/0.76 ( ! [X0] : (~r1(sK78(sK82(sK114)),X0) | p1(X0) | ~p1(sK78(sK82(sK114)))) ) | (~spl117_100 | ~spl117_105)), 2.75/0.76 inference(resolution,[],[f1717,f1723])). 2.75/0.76 fof(f1723,plain,( 2.75/0.76 r1(sK82(sK114),sK78(sK82(sK114))) | ~spl117_105), 2.75/0.76 inference(resolution,[],[f1239,f345])). 2.75/0.76 fof(f345,plain,( 2.75/0.76 ( ! [X0] : (~sP29(X0) | r1(X0,sK78(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f161])). 2.75/0.76 fof(f1717,plain,( 2.75/0.76 ( ! [X0,X1] : (~r1(sK82(sK114),X0) | ~r1(X0,X1) | p1(X1) | ~p1(X0)) ) | ~spl117_100), 2.75/0.76 inference(resolution,[],[f1215,f357])). 2.75/0.76 fof(f357,plain,( 2.75/0.76 ( ! [X2,X3,X0] : (~sP24(X0) | ~p1(X2) | ~r1(X2,X3) | p1(X3) | ~r1(sK82(X0),X2)) )), 2.75/0.76 inference(cnf_transformation,[],[f179])). 2.75/0.76 fof(f179,plain,( 2.75/0.76 ! [X0] : ((~p1(sK82(X0)) & ! [X2] : (~r1(sK82(X0),X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3))) & r1(X0,sK82(X0))) | ~sP24(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK82])],[f177,f178])). 2.75/0.76 fof(f178,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & ! [X2] : (~r1(X1,X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3))) & r1(X0,X1)) => (~p1(sK82(X0)) & ! [X2] : (~r1(sK82(X0),X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3))) & r1(X0,sK82(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f177,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & ! [X2] : (~r1(X1,X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3))) & r1(X0,X1)) | ~sP24(X0))), 2.75/0.76 inference(rectify,[],[f176])). 2.75/0.76 fof(f176,plain,( 2.75/0.76 ! [X131] : (? [X134] : (~p1(X134) & ! [X135] : (~r1(X134,X135) | ~p1(X135) | ! [X136] : (~r1(X135,X136) | p1(X136))) & r1(X131,X134)) | ~sP24(X131))), 2.75/0.76 inference(nnf_transformation,[],[f31])). 2.75/0.76 fof(f1215,plain,( 2.75/0.76 sP24(sK114) | ~spl117_100), 2.75/0.76 inference(avatar_component_clause,[],[f1213])). 2.75/0.76 fof(f1213,plain,( 2.75/0.76 spl117_100 <=> sP24(sK114)), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_100])])). 2.75/0.76 fof(f1720,plain,( 2.75/0.76 ~spl117_100 | ~spl117_106), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1719])). 2.75/0.76 fof(f1719,plain,( 2.75/0.76 $false | (~spl117_100 | ~spl117_106)), 2.75/0.76 inference(subsumption_resolution,[],[f1718,f1215])). 2.75/0.76 fof(f1718,plain,( 2.75/0.76 ~sP24(sK114) | ~spl117_106), 2.75/0.76 inference(resolution,[],[f1243,f358])). 2.75/0.76 fof(f358,plain,( 2.75/0.76 ( ! [X0] : (~p1(sK82(X0)) | ~sP24(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f179])). 2.75/0.76 fof(f1243,plain,( 2.75/0.76 p1(sK82(sK114)) | ~spl117_106), 2.75/0.76 inference(avatar_component_clause,[],[f1241])). 2.75/0.76 fof(f1241,plain,( 2.75/0.76 spl117_106 <=> p1(sK82(sK114))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_106])])). 2.75/0.76 fof(f1617,plain,( 2.75/0.76 ~spl117_103 | ~spl117_127), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1616])). 2.75/0.76 fof(f1616,plain,( 2.75/0.76 $false | (~spl117_103 | ~spl117_127)), 2.75/0.76 inference(subsumption_resolution,[],[f1615,f1600])). 2.75/0.76 fof(f1600,plain,( 2.75/0.76 sP18(sK87(sK115)) | ~spl117_103), 2.75/0.76 inference(resolution,[],[f1596,f373])). 2.75/0.76 fof(f373,plain,( 2.75/0.76 ( ! [X0] : (~sP19(X0) | sP18(sK87(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f199])). 2.75/0.76 fof(f199,plain,( 2.75/0.76 ! [X0] : ((sP18(sK87(X0)) & p1(sK87(X0)) & r1(X0,sK87(X0))) | ~sP19(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK87])],[f197,f198])). 2.75/0.76 fof(f198,plain,( 2.75/0.76 ! [X0] : (? [X1] : (sP18(X1) & p1(X1) & r1(X0,X1)) => (sP18(sK87(X0)) & p1(sK87(X0)) & r1(X0,sK87(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f197,plain,( 2.75/0.76 ! [X0] : (? [X1] : (sP18(X1) & p1(X1) & r1(X0,X1)) | ~sP19(X0))), 2.75/0.76 inference(rectify,[],[f196])). 2.75/0.76 fof(f196,plain,( 2.75/0.76 ! [X149] : (? [X150] : (sP18(X150) & p1(X150) & r1(X149,X150)) | ~sP19(X149))), 2.75/0.76 inference(nnf_transformation,[],[f26])). 2.75/0.76 fof(f1596,plain,( 2.75/0.76 sP19(sK115) | ~spl117_103), 2.75/0.76 inference(resolution,[],[f1227,f433])). 2.75/0.76 fof(f1227,plain,( 2.75/0.76 ( ! [X1] : (~r1(sK114,X1) | sP19(X1)) ) | ~spl117_103), 2.75/0.76 inference(avatar_component_clause,[],[f1226])). 2.75/0.76 fof(f1226,plain,( 2.75/0.76 spl117_103 <=> ! [X1] : (sP19(X1) | ~r1(sK114,X1))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_103])])). 2.75/0.76 fof(f1615,plain,( 2.75/0.76 ~sP18(sK87(sK115)) | (~spl117_103 | ~spl117_127)), 2.75/0.76 inference(resolution,[],[f1614,f375])). 2.75/0.76 fof(f375,plain,( 2.75/0.76 ( ! [X0] : (~p1(sK88(X0)) | ~sP18(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f203])). 2.75/0.76 fof(f203,plain,( 2.75/0.76 ! [X0] : ((~p1(sK88(X0)) & r1(X0,sK88(X0))) | ~sP18(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK88])],[f201,f202])). 2.75/0.76 fof(f202,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) => (~p1(sK88(X0)) & r1(X0,sK88(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f201,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) | ~sP18(X0))), 2.75/0.76 inference(rectify,[],[f200])). 2.75/0.76 fof(f200,plain,( 2.75/0.76 ! [X150] : (? [X151] : (~p1(X151) & r1(X150,X151)) | ~sP18(X150))), 2.75/0.76 inference(nnf_transformation,[],[f25])). 2.75/0.76 fof(f1614,plain,( 2.75/0.76 p1(sK88(sK87(sK115))) | (~spl117_103 | ~spl117_127)), 2.75/0.76 inference(resolution,[],[f1609,f1607])). 2.75/0.76 fof(f1607,plain,( 2.75/0.76 r1(sK87(sK115),sK88(sK87(sK115))) | ~spl117_103), 2.75/0.76 inference(resolution,[],[f1600,f374])). 2.75/0.76 fof(f374,plain,( 2.75/0.76 ( ! [X0] : (~sP18(X0) | r1(X0,sK88(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f203])). 2.75/0.76 fof(f1609,plain,( 2.75/0.76 ( ! [X0] : (~r1(sK87(sK115),X0) | p1(X0)) ) | (~spl117_103 | ~spl117_127)), 2.75/0.76 inference(resolution,[],[f1598,f1428])). 2.75/0.76 fof(f1428,plain,( 2.75/0.76 ( ! [X4,X5] : (~r1(sK115,X4) | ~r1(X4,X5) | p1(X5)) ) | ~spl117_127), 2.75/0.76 inference(avatar_component_clause,[],[f1427])). 2.75/0.76 fof(f1427,plain,( 2.75/0.76 spl117_127 <=> ! [X4,X5] : (~r1(sK115,X4) | ~r1(X4,X5) | p1(X5))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_127])])). 2.75/0.76 fof(f1598,plain,( 2.75/0.76 r1(sK115,sK87(sK115)) | ~spl117_103), 2.75/0.76 inference(resolution,[],[f1596,f371])). 2.75/0.76 fof(f371,plain,( 2.75/0.76 ( ! [X0] : (~sP19(X0) | r1(X0,sK87(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f199])). 2.75/0.76 fof(f1593,plain,( 2.75/0.76 ~spl117_115 | ~spl117_148), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1592])). 2.75/0.76 fof(f1592,plain,( 2.75/0.76 $false | (~spl117_115 | ~spl117_148)), 2.75/0.76 inference(subsumption_resolution,[],[f1591,f1367])). 2.75/0.76 fof(f1367,plain,( 2.75/0.76 sP21(sK84(sK89(sK86(sK114)))) | ~spl117_115), 2.75/0.76 inference(resolution,[],[f1360,f363])). 2.75/0.76 fof(f363,plain,( 2.75/0.76 ( ! [X0] : (~sP22(X0) | sP21(sK84(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f187])). 2.75/0.76 fof(f187,plain,( 2.75/0.76 ! [X0] : ((r1(X0,sK84(X0)) & sP21(sK84(X0)) & p1(sK84(X0))) | ~sP22(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK84])],[f185,f186])). 2.75/0.76 fof(f186,plain,( 2.75/0.76 ! [X0] : (? [X1] : (r1(X0,X1) & sP21(X1) & p1(X1)) => (r1(X0,sK84(X0)) & sP21(sK84(X0)) & p1(sK84(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f185,plain,( 2.75/0.76 ! [X0] : (? [X1] : (r1(X0,X1) & sP21(X1) & p1(X1)) | ~sP22(X0))), 2.75/0.76 inference(rectify,[],[f184])). 2.75/0.76 fof(f184,plain,( 2.75/0.76 ! [X141] : (? [X142] : (r1(X141,X142) & sP21(X142) & p1(X142)) | ~sP22(X141))), 2.75/0.76 inference(nnf_transformation,[],[f29])). 2.75/0.76 fof(f1360,plain,( 2.75/0.76 sP22(sK89(sK86(sK114))) | ~spl117_115), 2.75/0.76 inference(avatar_component_clause,[],[f1358])). 2.75/0.76 fof(f1358,plain,( 2.75/0.76 spl117_115 <=> sP22(sK89(sK86(sK114)))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_115])])). 2.75/0.76 fof(f1591,plain,( 2.75/0.76 ~sP21(sK84(sK89(sK86(sK114)))) | (~spl117_115 | ~spl117_148)), 2.75/0.76 inference(resolution,[],[f1590,f366])). 2.75/0.76 fof(f366,plain,( 2.75/0.76 ( ! [X0] : (~p1(sK85(X0)) | ~sP21(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f191])). 2.75/0.76 fof(f191,plain,( 2.75/0.76 ! [X0] : ((~p1(sK85(X0)) & r1(X0,sK85(X0))) | ~sP21(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK85])],[f189,f190])). 2.75/0.76 fof(f190,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) => (~p1(sK85(X0)) & r1(X0,sK85(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f189,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) | ~sP21(X0))), 2.75/0.76 inference(rectify,[],[f188])). 2.75/0.76 fof(f188,plain,( 2.75/0.76 ! [X142] : (? [X143] : (~p1(X143) & r1(X142,X143)) | ~sP21(X142))), 2.75/0.76 inference(nnf_transformation,[],[f28])). 2.75/0.76 fof(f1590,plain,( 2.75/0.76 p1(sK85(sK84(sK89(sK86(sK114))))) | (~spl117_115 | ~spl117_148)), 2.75/0.76 inference(resolution,[],[f1589,f1369])). 2.75/0.76 fof(f1369,plain,( 2.75/0.76 r1(sK84(sK89(sK86(sK114))),sK85(sK84(sK89(sK86(sK114))))) | ~spl117_115), 2.75/0.76 inference(resolution,[],[f1367,f365])). 2.75/0.76 fof(f365,plain,( 2.75/0.76 ( ! [X0] : (~sP21(X0) | r1(X0,sK85(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f191])). 2.75/0.76 fof(f1589,plain,( 2.75/0.76 ( ! [X0] : (~r1(sK84(sK89(sK86(sK114))),X0) | p1(X0)) ) | (~spl117_115 | ~spl117_148)), 2.75/0.76 inference(subsumption_resolution,[],[f1587,f1366])). 2.75/0.76 fof(f1366,plain,( 2.75/0.76 p1(sK84(sK89(sK86(sK114)))) | ~spl117_115), 2.75/0.76 inference(resolution,[],[f1360,f362])). 2.75/0.76 fof(f362,plain,( 2.75/0.76 ( ! [X0] : (~sP22(X0) | p1(sK84(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f187])). 2.75/0.76 fof(f1587,plain,( 2.75/0.76 ( ! [X0] : (~p1(sK84(sK89(sK86(sK114)))) | p1(X0) | ~r1(sK84(sK89(sK86(sK114))),X0)) ) | (~spl117_115 | ~spl117_148)), 2.75/0.76 inference(resolution,[],[f1581,f1368])). 2.75/0.76 fof(f1368,plain,( 2.75/0.76 r1(sK89(sK86(sK114)),sK84(sK89(sK86(sK114)))) | ~spl117_115), 2.75/0.76 inference(resolution,[],[f1360,f364])). 2.75/0.76 fof(f364,plain,( 2.75/0.76 ( ! [X0] : (~sP22(X0) | r1(X0,sK84(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f187])). 2.75/0.76 fof(f1581,plain,( 2.75/0.76 ( ! [X0,X1] : (~r1(sK89(sK86(sK114)),X0) | ~p1(X0) | p1(X1) | ~r1(X0,X1)) ) | ~spl117_148), 2.75/0.76 inference(avatar_component_clause,[],[f1580])). 2.75/0.76 fof(f1580,plain,( 2.75/0.76 spl117_148 <=> ! [X0,X1] : (~p1(X0) | ~r1(sK89(sK86(sK114)),X0) | p1(X1) | ~r1(X0,X1))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_148])])). 2.75/0.76 fof(f1586,plain,( 2.75/0.76 ~spl117_102 | ~spl117_116), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1585])). 2.75/0.76 fof(f1585,plain,( 2.75/0.76 $false | (~spl117_102 | ~spl117_116)), 2.75/0.76 inference(subsumption_resolution,[],[f1584,f1278])). 2.75/0.76 fof(f1278,plain,( 2.75/0.76 sP17(sK86(sK114)) | ~spl117_102), 2.75/0.76 inference(resolution,[],[f1224,f370])). 2.75/0.76 fof(f370,plain,( 2.75/0.76 ( ! [X0] : (~sP20(X0) | sP17(sK86(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f195])). 2.75/0.76 fof(f195,plain,( 2.75/0.76 ! [X0] : ((sP17(sK86(X0)) & p1(sK86(X0)) & sP16(sK86(X0)) & r1(X0,sK86(X0))) | ~sP20(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK86])],[f193,f194])). 2.75/0.76 fof(f194,plain,( 2.75/0.76 ! [X0] : (? [X1] : (sP17(X1) & p1(X1) & sP16(X1) & r1(X0,X1)) => (sP17(sK86(X0)) & p1(sK86(X0)) & sP16(sK86(X0)) & r1(X0,sK86(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f193,plain,( 2.75/0.76 ! [X0] : (? [X1] : (sP17(X1) & p1(X1) & sP16(X1) & r1(X0,X1)) | ~sP20(X0))), 2.75/0.76 inference(rectify,[],[f192])). 2.75/0.76 fof(f192,plain,( 2.75/0.76 ! [X131] : (? [X152] : (sP17(X152) & p1(X152) & sP16(X152) & r1(X131,X152)) | ~sP20(X131))), 2.75/0.76 inference(nnf_transformation,[],[f27])). 2.75/0.76 fof(f1224,plain,( 2.75/0.76 sP20(sK114) | ~spl117_102), 2.75/0.76 inference(avatar_component_clause,[],[f1222])). 2.75/0.76 fof(f1222,plain,( 2.75/0.76 spl117_102 <=> sP20(sK114)), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_102])])). 2.75/0.76 fof(f1584,plain,( 2.75/0.76 ~sP17(sK86(sK114)) | ~spl117_116), 2.75/0.76 inference(resolution,[],[f1364,f377])). 2.75/0.76 fof(f377,plain,( 2.75/0.76 ( ! [X0] : (~p1(sK89(X0)) | ~sP17(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f207])). 2.75/0.76 fof(f207,plain,( 2.75/0.76 ! [X0] : ((~p1(sK89(X0)) & r1(X0,sK89(X0))) | ~sP17(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK89])],[f205,f206])). 2.75/0.76 fof(f206,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) => (~p1(sK89(X0)) & r1(X0,sK89(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f205,plain,( 2.75/0.76 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) | ~sP17(X0))), 2.75/0.76 inference(rectify,[],[f204])). 2.75/0.76 fof(f204,plain,( 2.75/0.76 ! [X152] : (? [X153] : (~p1(X153) & r1(X152,X153)) | ~sP17(X152))), 2.75/0.76 inference(nnf_transformation,[],[f24])). 2.75/0.76 fof(f1364,plain,( 2.75/0.76 p1(sK89(sK86(sK114))) | ~spl117_116), 2.75/0.76 inference(avatar_component_clause,[],[f1362])). 2.75/0.76 fof(f1362,plain,( 2.75/0.76 spl117_116 <=> p1(sK89(sK86(sK114)))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_116])])). 2.75/0.76 fof(f1582,plain,( 2.75/0.76 spl117_116 | spl117_148 | ~spl117_102), 2.75/0.76 inference(avatar_split_clause,[],[f1537,f1222,f1580,f1362])). 2.75/0.76 fof(f1537,plain,( 2.75/0.76 ( ! [X0,X1] : (~p1(X0) | ~r1(X0,X1) | p1(X1) | ~r1(sK89(sK86(sK114)),X0) | p1(sK89(sK86(sK114)))) ) | ~spl117_102), 2.75/0.76 inference(resolution,[],[f1280,f1281])). 2.75/0.76 fof(f1281,plain,( 2.75/0.76 r1(sK86(sK114),sK89(sK86(sK114))) | ~spl117_102), 2.75/0.76 inference(resolution,[],[f1278,f376])). 2.75/0.76 fof(f376,plain,( 2.75/0.76 ( ! [X0] : (~sP17(X0) | r1(X0,sK89(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f207])). 2.75/0.76 fof(f1280,plain,( 2.75/0.76 ( ! [X3,X4,X5] : (~r1(sK86(sK114),X3) | ~p1(X4) | ~r1(X4,X5) | p1(X5) | ~r1(X3,X4) | p1(X3)) ) | ~spl117_102), 2.75/0.76 inference(resolution,[],[f1276,f379])). 2.75/0.76 fof(f379,plain,( 2.75/0.76 ( ! [X2,X3,X0,X1] : (~sP16(X0) | ~r1(X1,X2) | ~p1(X2) | ~r1(X2,X3) | p1(X3) | ~r1(X0,X1) | p1(X1)) )), 2.75/0.76 inference(cnf_transformation,[],[f209])). 2.75/0.76 fof(f209,plain,( 2.75/0.76 ! [X0] : (! [X1] : ((p1(X1) & sP15(X1)) | ! [X2] : (~r1(X1,X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3))) | ~r1(X0,X1)) | ~sP16(X0))), 2.75/0.76 inference(rectify,[],[f208])). 2.75/0.76 fof(f208,plain,( 2.75/0.76 ! [X152] : (! [X154] : ((p1(X154) & sP15(X154)) | ! [X156] : (~r1(X154,X156) | ~p1(X156) | ! [X157] : (~r1(X156,X157) | p1(X157))) | ~r1(X152,X154)) | ~sP16(X152))), 2.75/0.76 inference(nnf_transformation,[],[f23])). 2.75/0.76 fof(f1276,plain,( 2.75/0.76 sP16(sK86(sK114)) | ~spl117_102), 2.75/0.76 inference(resolution,[],[f1224,f368])). 2.75/0.76 fof(f368,plain,( 2.75/0.76 ( ! [X0] : (~sP20(X0) | sP16(sK86(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f195])). 2.75/0.76 fof(f1457,plain,( 2.75/0.76 spl117_132 | spl117_127 | ~spl117_126), 2.75/0.76 inference(avatar_split_clause,[],[f1431,f1423,f1427,f1455])). 2.75/0.76 fof(f1423,plain,( 2.75/0.76 spl117_126 <=> r1(sK115,sK81(sK115))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_126])])). 2.75/0.76 fof(f1431,plain,( 2.75/0.76 ( ! [X2,X0,X1] : (p1(X0) | ~r1(sK115,X1) | ~r1(X1,X0) | ~r1(X2,sK115) | ~sP25(X2)) ) | ~spl117_126), 2.75/0.76 inference(resolution,[],[f1430,f354])). 2.75/0.76 fof(f354,plain,( 2.75/0.76 ( ! [X2,X3,X0,X1] : (~p1(sK81(X1)) | p1(X3) | ~r1(X1,X2) | ~r1(X2,X3) | ~r1(X0,X1) | ~sP25(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f175])). 2.75/0.76 fof(f175,plain,( 2.75/0.76 ! [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | p1(X3)) | ~r1(X1,X2)) | (r1(X1,sK81(X1)) & ~p1(sK81(X1))) | ~r1(X0,X1)) | ~sP25(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK81])],[f173,f174])). 2.75/0.76 fof(f174,plain,( 2.75/0.76 ! [X1] : (? [X4] : (r1(X1,X4) & ~p1(X4)) => (r1(X1,sK81(X1)) & ~p1(sK81(X1))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f173,plain,( 2.75/0.76 ! [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | p1(X3)) | ~r1(X1,X2)) | ? [X4] : (r1(X1,X4) & ~p1(X4)) | ~r1(X0,X1)) | ~sP25(X0))), 2.75/0.76 inference(rectify,[],[f172])). 2.75/0.76 fof(f172,plain,( 2.75/0.76 ! [X131] : (! [X144] : (! [X145] : (! [X146] : (~r1(X145,X146) | p1(X146)) | ~r1(X144,X145)) | ? [X147] : (r1(X144,X147) & ~p1(X147)) | ~r1(X131,X144)) | ~sP25(X131))), 2.75/0.76 inference(nnf_transformation,[],[f32])). 2.75/0.76 fof(f1430,plain,( 2.75/0.76 p1(sK81(sK115)) | ~spl117_126), 2.75/0.76 inference(resolution,[],[f1425,f434])). 2.75/0.76 fof(f434,plain,( 2.75/0.76 ( ! [X48] : (~r1(sK115,X48) | p1(X48)) )), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1425,plain,( 2.75/0.76 r1(sK115,sK81(sK115)) | ~spl117_126), 2.75/0.76 inference(avatar_component_clause,[],[f1423])). 2.75/0.76 fof(f1429,plain,( 2.75/0.76 spl117_126 | spl117_127), 2.75/0.76 inference(avatar_split_clause,[],[f1420,f1427,f1423])). 2.75/0.76 fof(f1420,plain,( 2.75/0.76 ( ! [X4,X5] : (~r1(sK115,X4) | r1(sK115,sK81(sK115)) | p1(X5) | ~r1(X4,X5)) )), 2.75/0.76 inference(resolution,[],[f1193,f433])). 2.75/0.76 fof(f1193,plain,( 2.75/0.76 ( ! [X2,X0,X1] : (~r1(sK114,X1) | ~r1(X1,X2) | r1(X1,sK81(X1)) | p1(X0) | ~r1(X2,X0)) )), 2.75/0.76 inference(resolution,[],[f1190,f355])). 2.75/0.76 fof(f355,plain,( 2.75/0.76 ( ! [X2,X3,X0,X1] : (~sP25(X0) | p1(X3) | ~r1(X1,X2) | r1(X1,sK81(X1)) | ~r1(X0,X1) | ~r1(X2,X3)) )), 2.75/0.76 inference(cnf_transformation,[],[f175])). 2.75/0.76 fof(f1365,plain,( 2.75/0.76 spl117_115 | spl117_116 | ~spl117_102 | ~spl117_108), 2.75/0.76 inference(avatar_split_clause,[],[f1344,f1293,f1222,f1362,f1358])). 2.75/0.76 fof(f1293,plain,( 2.75/0.76 spl117_108 <=> ! [X2,X3] : (~r1(sK114,X2) | ~r1(X2,X3) | p1(X3) | sP22(X3))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_108])])). 2.75/0.76 fof(f1344,plain,( 2.75/0.76 p1(sK89(sK86(sK114))) | sP22(sK89(sK86(sK114))) | (~spl117_102 | ~spl117_108)), 2.75/0.76 inference(resolution,[],[f1324,f1281])). 2.75/0.76 fof(f1324,plain,( 2.75/0.76 ( ! [X1] : (~r1(sK86(sK114),X1) | p1(X1) | sP22(X1)) ) | (~spl117_102 | ~spl117_108)), 2.75/0.76 inference(resolution,[],[f1294,f1275])). 2.75/0.76 fof(f1275,plain,( 2.75/0.76 r1(sK114,sK86(sK114)) | ~spl117_102), 2.75/0.76 inference(resolution,[],[f1224,f367])). 2.75/0.76 fof(f367,plain,( 2.75/0.76 ( ! [X0] : (~sP20(X0) | r1(X0,sK86(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f195])). 2.75/0.76 fof(f1294,plain,( 2.75/0.76 ( ! [X2,X3] : (~r1(sK114,X2) | ~r1(X2,X3) | p1(X3) | sP22(X3)) ) | ~spl117_108), 2.75/0.76 inference(avatar_component_clause,[],[f1293])). 2.75/0.76 fof(f1322,plain,( 2.75/0.76 ~spl117_107 | ~spl117_110), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1321])). 2.75/0.76 fof(f1321,plain,( 2.75/0.76 $false | (~spl117_107 | ~spl117_110)), 2.75/0.76 inference(subsumption_resolution,[],[f1320,f1291])). 2.75/0.76 fof(f1291,plain,( 2.75/0.76 sP23(sK114) | ~spl117_107), 2.75/0.76 inference(avatar_component_clause,[],[f1289])). 2.75/0.76 fof(f1289,plain,( 2.75/0.76 spl117_107 <=> sP23(sK114)), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_107])])). 2.75/0.76 fof(f1320,plain,( 2.75/0.76 ~sP23(sK114) | ~spl117_110), 2.75/0.76 inference(resolution,[],[f1307,f359])). 2.75/0.76 fof(f359,plain,( 2.75/0.76 ( ! [X0] : (~p1(sK83(X0)) | ~sP23(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f183])). 2.75/0.76 fof(f183,plain,( 2.75/0.76 ! [X0] : ((r1(X0,sK83(X0)) & ! [X2] : (~r1(sK83(X0),X2) | ~p1(X2) | ! [X3] : (p1(X3) | ~r1(X2,X3))) & ~p1(sK83(X0))) | ~sP23(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK83])],[f181,f182])). 2.75/0.76 fof(f182,plain,( 2.75/0.76 ! [X0] : (? [X1] : (r1(X0,X1) & ! [X2] : (~r1(X1,X2) | ~p1(X2) | ! [X3] : (p1(X3) | ~r1(X2,X3))) & ~p1(X1)) => (r1(X0,sK83(X0)) & ! [X2] : (~r1(sK83(X0),X2) | ~p1(X2) | ! [X3] : (p1(X3) | ~r1(X2,X3))) & ~p1(sK83(X0))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f181,plain,( 2.75/0.76 ! [X0] : (? [X1] : (r1(X0,X1) & ! [X2] : (~r1(X1,X2) | ~p1(X2) | ! [X3] : (p1(X3) | ~r1(X2,X3))) & ~p1(X1)) | ~sP23(X0))), 2.75/0.76 inference(rectify,[],[f180])). 2.75/0.76 fof(f180,plain,( 2.75/0.76 ! [X131] : (? [X137] : (r1(X131,X137) & ! [X138] : (~r1(X137,X138) | ~p1(X138) | ! [X139] : (p1(X139) | ~r1(X138,X139))) & ~p1(X137)) | ~sP23(X131))), 2.75/0.76 inference(nnf_transformation,[],[f30])). 2.75/0.76 fof(f1307,plain,( 2.75/0.76 p1(sK83(sK114)) | ~spl117_110), 2.75/0.76 inference(avatar_component_clause,[],[f1305])). 2.75/0.76 fof(f1305,plain,( 2.75/0.76 spl117_110 <=> p1(sK83(sK114))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_110])])). 2.75/0.76 fof(f1319,plain,( 2.75/0.76 ~spl117_107 | ~spl117_109), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1318])). 2.75/0.76 fof(f1318,plain,( 2.75/0.76 $false | (~spl117_107 | ~spl117_109)), 2.75/0.76 inference(subsumption_resolution,[],[f1317,f1310])). 2.75/0.76 fof(f1310,plain,( 2.75/0.76 sP28(sK78(sK83(sK114))) | ~spl117_109), 2.75/0.76 inference(resolution,[],[f1303,f344])). 2.75/0.76 fof(f1303,plain,( 2.75/0.76 sP29(sK83(sK114)) | ~spl117_109), 2.75/0.76 inference(avatar_component_clause,[],[f1301])). 2.75/0.76 fof(f1301,plain,( 2.75/0.76 spl117_109 <=> sP29(sK83(sK114))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_109])])). 2.75/0.76 fof(f1317,plain,( 2.75/0.76 ~sP28(sK78(sK83(sK114))) | (~spl117_107 | ~spl117_109)), 2.75/0.76 inference(resolution,[],[f1316,f347])). 2.75/0.76 fof(f1316,plain,( 2.75/0.76 p1(sK79(sK78(sK83(sK114)))) | (~spl117_107 | ~spl117_109)), 2.75/0.76 inference(resolution,[],[f1315,f1312])). 2.75/0.76 fof(f1312,plain,( 2.75/0.76 r1(sK78(sK83(sK114)),sK79(sK78(sK83(sK114)))) | ~spl117_109), 2.75/0.76 inference(resolution,[],[f1310,f346])). 2.75/0.76 fof(f1315,plain,( 2.75/0.76 ( ! [X1] : (~r1(sK78(sK83(sK114)),X1) | p1(X1)) ) | (~spl117_107 | ~spl117_109)), 2.75/0.76 inference(subsumption_resolution,[],[f1314,f1309])). 2.75/0.76 fof(f1309,plain,( 2.75/0.76 p1(sK78(sK83(sK114))) | ~spl117_109), 2.75/0.76 inference(resolution,[],[f1303,f343])). 2.75/0.76 fof(f1314,plain,( 2.75/0.76 ( ! [X1] : (p1(X1) | ~r1(sK78(sK83(sK114)),X1) | ~p1(sK78(sK83(sK114)))) ) | (~spl117_107 | ~spl117_109)), 2.75/0.76 inference(resolution,[],[f1296,f1311])). 2.75/0.76 fof(f1311,plain,( 2.75/0.76 r1(sK83(sK114),sK78(sK83(sK114))) | ~spl117_109), 2.75/0.76 inference(resolution,[],[f1303,f345])). 2.75/0.76 fof(f1296,plain,( 2.75/0.76 ( ! [X0,X1] : (~r1(sK83(sK114),X0) | p1(X1) | ~r1(X0,X1) | ~p1(X0)) ) | ~spl117_107), 2.75/0.76 inference(resolution,[],[f1291,f360])). 2.75/0.76 fof(f360,plain,( 2.75/0.76 ( ! [X2,X3,X0] : (~sP23(X0) | ~p1(X2) | p1(X3) | ~r1(X2,X3) | ~r1(sK83(X0),X2)) )), 2.75/0.76 inference(cnf_transformation,[],[f183])). 2.75/0.76 fof(f1308,plain,( 2.75/0.76 spl117_109 | spl117_110 | ~spl117_107), 2.75/0.76 inference(avatar_split_clause,[],[f1298,f1289,f1305,f1301])). 2.75/0.76 fof(f1298,plain,( 2.75/0.76 p1(sK83(sK114)) | sP29(sK83(sK114)) | ~spl117_107), 2.75/0.76 inference(resolution,[],[f1297,f435])). 2.75/0.76 fof(f435,plain,( 2.75/0.76 ( ! [X46] : (~r1(sK114,X46) | p1(X46) | sP29(X46)) )), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1297,plain,( 2.75/0.76 r1(sK114,sK83(sK114)) | ~spl117_107), 2.75/0.76 inference(resolution,[],[f1291,f361])). 2.75/0.76 fof(f361,plain,( 2.75/0.76 ( ! [X0] : (~sP23(X0) | r1(X0,sK83(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f183])). 2.75/0.76 fof(f1295,plain,( 2.75/0.76 spl117_107 | spl117_108), 2.75/0.76 inference(avatar_split_clause,[],[f1191,f1293,f1289])). 2.75/0.76 fof(f1191,plain,( 2.75/0.76 ( ! [X2,X3] : (~r1(sK114,X2) | p1(X3) | sP22(X3) | ~r1(X2,X3) | sP23(sK114)) )), 2.75/0.76 inference(resolution,[],[f1187,f350])). 2.75/0.76 fof(f350,plain,( 2.75/0.76 ( ! [X2,X0,X1] : (~sP27(X0) | ~r1(X0,X1) | p1(X2) | sP22(X2) | ~r1(X1,X2) | sP23(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f167])). 2.75/0.76 fof(f1274,plain,( 2.75/0.76 ~spl117_104), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1273])). 2.75/0.76 fof(f1273,plain,( 2.75/0.76 $false | ~spl117_104), 2.75/0.76 inference(subsumption_resolution,[],[f1270,f431])). 2.75/0.76 fof(f431,plain,( 2.75/0.76 ~p1(sK116)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1270,plain,( 2.75/0.76 p1(sK116) | ~spl117_104), 2.75/0.76 inference(resolution,[],[f1230,f432])). 2.75/0.76 fof(f432,plain,( 2.75/0.76 r1(sK114,sK116)), 2.75/0.76 inference(cnf_transformation,[],[f286])). 2.75/0.76 fof(f1230,plain,( 2.75/0.76 ( ! [X0] : (~r1(sK114,X0) | p1(X0)) ) | ~spl117_104), 2.75/0.76 inference(avatar_component_clause,[],[f1229])). 2.75/0.76 fof(f1229,plain,( 2.75/0.76 spl117_104 <=> ! [X0] : (~r1(sK114,X0) | p1(X0))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_104])])). 2.75/0.76 fof(f1267,plain,( 2.75/0.76 spl117_99 | spl117_100 | ~spl117_101), 2.75/0.76 inference(avatar_contradiction_clause,[],[f1266])). 2.75/0.76 fof(f1266,plain,( 2.75/0.76 $false | (spl117_99 | spl117_100 | ~spl117_101)), 2.75/0.76 inference(subsumption_resolution,[],[f1265,f1192])). 2.75/0.76 fof(f1192,plain,( 2.75/0.76 sP26(sK114)), 2.75/0.76 inference(resolution,[],[f1187,f351])). 2.75/0.76 fof(f351,plain,( 2.75/0.76 ( ! [X0] : (~sP27(X0) | sP26(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f167])). 2.75/0.76 fof(f1265,plain,( 2.75/0.76 ~sP26(sK114) | (spl117_99 | spl117_100 | ~spl117_101)), 2.75/0.76 inference(subsumption_resolution,[],[f1264,f1214])). 2.75/0.76 fof(f1214,plain,( 2.75/0.76 ~sP24(sK114) | spl117_100), 2.75/0.76 inference(avatar_component_clause,[],[f1213])). 2.75/0.76 fof(f1264,plain,( 2.75/0.76 sP24(sK114) | ~sP26(sK114) | (spl117_99 | ~spl117_101)), 2.75/0.76 inference(subsumption_resolution,[],[f1263,f1210])). 2.75/0.76 fof(f1210,plain,( 2.75/0.76 ~p1(sK114) | spl117_99), 2.75/0.76 inference(avatar_component_clause,[],[f1209])). 2.75/0.76 fof(f1209,plain,( 2.75/0.76 spl117_99 <=> p1(sK114)), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_99])])). 2.75/0.76 fof(f1263,plain,( 2.75/0.76 p1(sK114) | sP24(sK114) | ~sP26(sK114) | ~spl117_101), 2.75/0.76 inference(resolution,[],[f1251,f433])). 2.75/0.76 fof(f1251,plain,( 2.75/0.76 ( ! [X0] : (~r1(X0,sK115) | p1(X0) | sP24(X0) | ~sP26(X0)) ) | ~spl117_101), 2.75/0.76 inference(resolution,[],[f1250,f353])). 2.75/0.76 fof(f353,plain,( 2.75/0.76 ( ! [X0,X1] : (~p1(sK80(X1)) | p1(X0) | ~r1(X0,X1) | sP24(X0) | ~sP26(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f171])). 2.75/0.76 fof(f171,plain,( 2.75/0.76 ! [X0] : (p1(X0) | ! [X1] : ((~p1(sK80(X1)) & r1(X1,sK80(X1))) | ~r1(X0,X1)) | sP24(X0) | ~sP26(X0))), 2.75/0.76 inference(skolemisation,[status(esa),new_symbols(skolem,[sK80])],[f169,f170])). 2.75/0.76 fof(f170,plain,( 2.75/0.76 ! [X1] : (? [X2] : (~p1(X2) & r1(X1,X2)) => (~p1(sK80(X1)) & r1(X1,sK80(X1))))), 2.75/0.76 introduced(choice_axiom,[])). 2.75/0.76 fof(f169,plain,( 2.75/0.76 ! [X0] : (p1(X0) | ! [X1] : (? [X2] : (~p1(X2) & r1(X1,X2)) | ~r1(X0,X1)) | sP24(X0) | ~sP26(X0))), 2.75/0.76 inference(rectify,[],[f168])). 2.75/0.76 fof(f168,plain,( 2.75/0.76 ! [X131] : (p1(X131) | ! [X132] : (? [X133] : (~p1(X133) & r1(X132,X133)) | ~r1(X131,X132)) | sP24(X131) | ~sP26(X131))), 2.75/0.76 inference(nnf_transformation,[],[f33])). 2.75/0.76 fof(f1250,plain,( 2.75/0.76 p1(sK80(sK115)) | ~spl117_101), 2.75/0.76 inference(resolution,[],[f1247,f434])). 2.75/0.76 fof(f1247,plain,( 2.75/0.76 r1(sK115,sK80(sK115)) | ~spl117_101), 2.75/0.76 inference(resolution,[],[f1218,f433])). 2.75/0.76 fof(f1218,plain,( 2.75/0.76 ( ! [X0] : (~r1(sK114,X0) | r1(X0,sK80(X0))) ) | ~spl117_101), 2.75/0.76 inference(avatar_component_clause,[],[f1217])). 2.75/0.76 fof(f1217,plain,( 2.75/0.76 spl117_101 <=> ! [X0] : (r1(X0,sK80(X0)) | ~r1(sK114,X0))), 2.75/0.76 introduced(avatar_definition,[new_symbols(naming,[spl117_101])])). 2.75/0.76 fof(f1244,plain,( 2.75/0.76 spl117_105 | spl117_106 | ~spl117_100), 2.75/0.76 inference(avatar_split_clause,[],[f1235,f1213,f1241,f1237])). 2.75/0.76 fof(f1235,plain,( 2.75/0.76 p1(sK82(sK114)) | sP29(sK82(sK114)) | ~spl117_100), 2.75/0.76 inference(resolution,[],[f1232,f435])). 2.75/0.76 fof(f1232,plain,( 2.75/0.76 r1(sK114,sK82(sK114)) | ~spl117_100), 2.75/0.76 inference(resolution,[],[f1215,f356])). 2.75/0.76 fof(f356,plain,( 2.75/0.76 ( ! [X0] : (~sP24(X0) | r1(X0,sK82(X0))) )), 2.75/0.76 inference(cnf_transformation,[],[f179])). 2.75/0.76 fof(f1231,plain,( 2.75/0.76 spl117_102 | spl117_103 | spl117_104 | ~spl117_99), 2.75/0.76 inference(avatar_split_clause,[],[f1220,f1209,f1229,f1226,f1222])). 2.75/0.76 fof(f1220,plain,( 2.75/0.76 ( ! [X0,X1] : (~r1(sK114,X0) | sP19(X1) | ~r1(sK114,X1) | sP20(sK114) | p1(X0)) ) | ~spl117_99), 2.75/0.76 inference(subsumption_resolution,[],[f1189,f1211])). 2.75/0.76 fof(f1211,plain,( 2.75/0.76 p1(sK114) | ~spl117_99), 2.75/0.76 inference(avatar_component_clause,[],[f1209])). 2.75/0.76 fof(f1189,plain,( 2.75/0.76 ( ! [X0,X1] : (~r1(sK114,X0) | sP19(X1) | ~r1(sK114,X1) | sP20(sK114) | ~p1(sK114) | p1(X0)) )), 2.75/0.76 inference(resolution,[],[f1187,f348])). 2.75/0.76 fof(f348,plain,( 2.75/0.76 ( ! [X3,X0,X4] : (~sP27(X0) | ~r1(X0,X3) | sP19(X4) | ~r1(X0,X4) | sP20(X0) | ~p1(X0) | p1(X3)) )), 2.75/0.76 inference(cnf_transformation,[],[f167])). 2.75/0.76 fof(f1219,plain,( 2.75/0.76 spl117_99 | spl117_100 | spl117_101), 2.75/0.76 inference(avatar_split_clause,[],[f1194,f1217,f1213,f1209])). 2.75/0.76 fof(f1194,plain,( 2.75/0.76 ( ! [X0] : (r1(X0,sK80(X0)) | ~r1(sK114,X0) | sP24(sK114) | p1(sK114)) )), 2.75/0.76 inference(resolution,[],[f1192,f352])). 2.75/0.76 fof(f352,plain,( 2.75/0.76 ( ! [X0,X1] : (~sP26(X0) | r1(X1,sK80(X1)) | ~r1(X0,X1) | sP24(X0) | p1(X0)) )), 2.75/0.76 inference(cnf_transformation,[],[f171])). 2.75/0.76 % SZS output end Proof for theBenchmark 2.75/0.76 % (5086)------------------------------ 2.75/0.76 % (5086)Version: Vampire 4.7 (commit 2d02e4655 on 2022-07-11 21:15:24 +0200) 2.75/0.76 % (5086)Linked with Z3 4.8.13.0 f03d756e086f81f2596157241e0decfb1c982299 z3-4.8.4-5390-gf03d756e0 2.75/0.76 % (5086)Termination reason: Refutation 2.75/0.76 2.75/0.76 % (5086)Memory used [KB]: 11897 2.75/0.76 % (5086)Time elapsed: 0.045 s 2.75/0.76 % (5086)------------------------------ 2.75/0.76 % (5086)------------------------------ 2.75/0.76 % (5076)Success in time 0.402 s 2.75/0.76 EOF