0.00/0.03 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.00/0.04 % Command : iproveropt_run.sh %d %s 0.02/0.24 % Computer : n022.star.cs.uiowa.edu 0.02/0.24 % Model : x86_64 x86_64 0.02/0.24 % CPU : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz 0.02/0.24 % Memory : 32218.625MB 0.02/0.24 % OS : Linux 3.10.0-693.2.2.el7.x86_64 0.02/0.24 % CPULimit : 300 0.02/0.24 % DateTime : Sat Jul 14 04:57:09 CDT 2018 0.02/0.24 % CPUTime : 0.02/0.25 0.02/0.25 %---------------- iProver v2.8 (CASC-J9) ----------------% 0.02/0.25 0.06/0.26 warning: prop_lit_to_fof_flag: true 0.06/0.26 warning: use_rec_defs_flag: true 0.06/0.26 warning: def_merge_tr_red_non_prop_flag: true 0.06/0.26 warning: finite_models commented: preprocess_after_flattening 0.06/0.26 warning: pred_elim_qbf: true 0.06/0.26 warning: dbg_qbf_res_prep_flag: true 0.06/0.26 0.06/0.26 ------ iProver source info 0.06/0.26 0.06/0.26 git: date: 2018-07-06 14:03:16 +0100 0.06/0.26 git: sha1: a23ae0111c2c203083e5922e8bb09a201cc5ec4f 0.06/0.26 git: non_committed_changes: false 0.06/0.26 git: last_make_outside_of_git: false 0.06/0.26 0.06/0.26 0.06/0.26 ------ Parsing... 0.06/0.26 ------ Clausification by vclausify_rel & Parsing by iProver... 0.06/0.26 0.06/0.28 0.06/0.28 0.06/0.28 ------ Preprocessing... sf_s rm: 3 0s sf_e pe_s pe:1:0s pe:2:0s pe:4:0s pe:8:0s pe:16:0s pe:32:0s pe_e sf_s rm: 0 0s sf_e pe_s pe_e 0.06/0.37 0.06/0.37 ------ Preprocessing... scvd_s sp: 36 0s scvd_e snvd_s sp: 0 0s snvd_e 0.06/0.38 ------ Proving... 0.06/0.38 ------ Problem Properties 0.06/0.38 0.06/0.38 0.06/0.38 clauses 257 0.06/0.38 conjectures 39 0.06/0.38 EPR 99 0.06/0.38 Horn 156 0.06/0.38 unary 10 0.06/0.38 binary 0 0.06/0.38 lits 1021 0.06/0.38 lits eq 0 0.06/0.38 0.06/0.38 ------ Schedule dynamic 5 is on 0.06/0.38 0.06/0.38 ------ Input Options "--resolution_flag false --inst_lit_sel_side none" Time Limit: 10. 0.06/0.38 0.06/0.38 0.06/0.38 ------ Current options: 0.06/0.38 0.06/0.38 0.06/0.38 0.06/0.38 0.06/0.38 0.06/0.38 ------ Proving... 7.11/7.37 7.11/7.37 7.11/7.37 % SZS status Theorem 7.11/7.37 7.17/7.38 7.17/7.38 % SZS output start CNFRefutation 7.17/7.38 7.17/7.40 fof(f2,conjecture,( 7.17/7.40 ~? [X0] : ~(~(~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (((~(~p118(X0) & p117(X0)) | (~! [X1] : (~r1(X0,X1) | ~(p118(X1) & ~p119(X1) & ~p19(X1))) & ~! [X1] : (~r1(X0,X1) | ~(p19(X1) & ~p119(X1) & p118(X1))))) & (~(p116(X0) & ~p117(X0)) | (~! [X1] : (~r1(X0,X1) | ~(~p18(X1) & ~p118(X1) & p117(X1))) & ~! [X1] : (~r1(X0,X1) | ~(p18(X1) & ~p118(X1) & p117(X1))))) & ((~! [X1] : (~(p17(X1) & p116(X1) & ~p117(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(~p17(X1) & p116(X1) & ~p117(X1)))) | ~(~p116(X0) & p115(X0))) & ((~! [X1] : (~(p16(X1) & ~p116(X1) & p115(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(~p16(X1) & p115(X1) & ~p116(X1)) | ~r1(X0,X1))) | ~(~p115(X0) & p114(X0))) & ((~! [X1] : (~(p113(X1) & ~p114(X1) & p14(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(p113(X1) & ~p114(X1) & ~p14(X1)))) | ~(p112(X0) & ~p113(X0))) & ((~! [X1] : (~(~p111(X1) & p110(X1) & p11(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(p110(X1) & ~p111(X1) & ~p11(X1)) | ~r1(X0,X1))) | ~(~p110(X0) & p109(X0))) & (~(~p108(X0) & p107(X0)) | (~! [X1] : (~r1(X0,X1) | ~(p9(X1) & p108(X1) & ~p109(X1))) & ~! [X1] : (~(~p9(X1) & ~p109(X1) & p108(X1)) | ~r1(X0,X1)))) & ((~! [X1] : (~(p106(X1) & ~p107(X1) & p7(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(~p107(X1) & p106(X1) & ~p7(X1)))) | ~(p105(X0) & ~p106(X0))) & (~(p103(X0) & ~p104(X0)) | (~! [X1] : (~(p5(X1) & p104(X1) & ~p105(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(p104(X1) & ~p105(X1) & ~p5(X1))))) & (~(~p103(X0) & p102(X0)) | (~! [X1] : (~(~p104(X1) & p103(X1) & p4(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(~p4(X1) & ~p104(X1) & p103(X1)) | ~r1(X0,X1)))) & (~(~p102(X0) & p101(X0)) | (~! [X1] : (~(p3(X1) & ~p103(X1) & p102(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(~p3(X1) & p102(X1) & ~p103(X1)) | ~r1(X0,X1)))) & (~p119(X0) | ((~p20(X0) | ! [X1] : (~r1(X0,X1) | p20(X1) | ~p119(X1))) & (p20(X0) | ! [X1] : (~r1(X0,X1) | ~p119(X1) | ~p20(X1))))) & (~p118(X0) | ((p19(X0) | ! [X1] : (~r1(X0,X1) | ~p118(X1) | ~p19(X1))) & (~p19(X0) | ! [X1] : (~p118(X1) | p19(X1) | ~r1(X0,X1))))) & (((p17(X0) | ! [X1] : (~p17(X1) | ~p116(X1) | ~r1(X0,X1))) & (! [X1] : (~r1(X0,X1) | p17(X1) | ~p116(X1)) | ~p17(X0))) | ~p116(X0)) & (~p112(X0) | ((! [X1] : (~r1(X0,X1) | ~p112(X1) | ~p13(X1)) | p13(X0)) & (~p13(X0) | ! [X1] : (p13(X1) | ~p112(X1) | ~r1(X0,X1))))) & (((! [X1] : (~p111(X1) | p12(X1) | ~r1(X0,X1)) | ~p12(X0)) & (p12(X0) | ! [X1] : (~r1(X0,X1) | ~p12(X1) | ~p111(X1)))) | ~p111(X0)) & (~p108(X0) | ((! [X1] : (~r1(X0,X1) | p9(X1) | ~p108(X1)) | ~p9(X0)) & (p9(X0) | ! [X1] : (~r1(X0,X1) | ~p9(X1) | ~p108(X1))))) & (((~p7(X0) | ! [X1] : (~p106(X1) | p7(X1) | ~r1(X0,X1))) & (! [X1] : (~p7(X1) | ~p106(X1) | ~r1(X0,X1)) | p7(X0))) | ~p106(X0)) & (~p105(X0) | ((p6(X0) | ! [X1] : (~p6(X1) | ~p105(X1) | ~r1(X0,X1))) & (~p6(X0) | ! [X1] : (~r1(X0,X1) | ~p105(X1) | p6(X1))))) & (~p104(X0) | ((~p5(X0) | ! [X1] : (~r1(X0,X1) | p5(X1) | ~p104(X1))) & (p5(X0) | ! [X1] : (~r1(X0,X1) | ~p104(X1) | ~p5(X1))))) & (p120(X0) | ~p121(X0)) & (p118(X0) | ~p119(X0)) & (p117(X0) | ~p118(X0)) & (p115(X0) | ~p116(X0)) & (~p114(X0) | p113(X0)) & (~p112(X0) | p111(X0)) & (~p110(X0) | p109(X0)) & (p108(X0) | ~p109(X0)) & (~p107(X0) | p106(X0)) & (p105(X0) | ~p106(X0)) & (~p105(X0) | p104(X0)) & (p103(X0) | ~p104(X0)) & (p101(X0) | ~p102(X0)) & (~p101(X0) | p100(X0)) & (~p103(X0) | p102(X0)) & (~p108(X0) | p107(X0)) & (p110(X0) | ~p111(X0)) & (~p113(X0) | p112(X0)) & (~p115(X0) | p114(X0)) & (~p117(X0) | p116(X0)) & (p119(X0) | ~p120(X0)) & (((~p1(X0) | ! [X1] : (~r1(X0,X1) | ~p100(X1) | p1(X1))) & (p1(X0) | ! [X1] : (~r1(X0,X1) | ~p1(X1) | ~p100(X1)))) | ~p100(X0)) & (((p2(X0) | ! [X1] : (~p2(X1) | ~p101(X1) | ~r1(X0,X1))) & (! [X1] : (~r1(X0,X1) | p2(X1) | ~p101(X1)) | ~p2(X0))) | ~p101(X0)) & (~p102(X0) | ((! [X1] : (~r1(X0,X1) | p3(X1) | ~p102(X1)) | ~p3(X0)) & (! [X1] : (~r1(X0,X1) | ~p3(X1) | ~p102(X1)) | p3(X0)))) & (((! [X1] : (p4(X1) | ~p103(X1) | ~r1(X0,X1)) | ~p4(X0)) & (! [X1] : (~r1(X0,X1) | ~p103(X1) | ~p4(X1)) | p4(X0))) | ~p103(X0)) & (~p107(X0) | ((! [X1] : (~r1(X0,X1) | p8(X1) | ~p107(X1)) | ~p8(X0)) & (! [X1] : (~p8(X1) | ~p107(X1) | ~r1(X0,X1)) | p8(X0)))) & (((! [X1] : (~r1(X0,X1) | p10(X1) | ~p109(X1)) | ~p10(X0)) & (p10(X0) | ! [X1] : (~r1(X0,X1) | ~p10(X1) | ~p109(X1)))) | ~p109(X0)) & (((~p11(X0) | ! [X1] : (~r1(X0,X1) | p11(X1) | ~p110(X1))) & (! [X1] : (~p11(X1) | ~p110(X1) | ~r1(X0,X1)) | p11(X0))) | ~p110(X0)) & (((p14(X0) | ! [X1] : (~r1(X0,X1) | ~p113(X1) | ~p14(X1))) & (~p14(X0) | ! [X1] : (~p113(X1) | p14(X1) | ~r1(X0,X1)))) | ~p113(X0)) & (((! [X1] : (~p114(X1) | p15(X1) | ~r1(X0,X1)) | ~p15(X0)) & (p15(X0) | ! [X1] : (~r1(X0,X1) | ~p15(X1) | ~p114(X1)))) | ~p114(X0)) & (((p16(X0) | ! [X1] : (~r1(X0,X1) | ~p115(X1) | ~p16(X1))) & (~p16(X0) | ! [X1] : (~r1(X0,X1) | p16(X1) | ~p115(X1)))) | ~p115(X0)) & (((p18(X0) | ! [X1] : (~p18(X1) | ~p117(X1) | ~r1(X0,X1))) & (! [X1] : (p18(X1) | ~p117(X1) | ~r1(X0,X1)) | ~p18(X0))) | ~p117(X0)) & (((p21(X0) | ! [X1] : (~p120(X1) | ~p21(X1) | ~r1(X0,X1))) & (! [X1] : (p21(X1) | ~p120(X1) | ~r1(X0,X1)) | ~p21(X0))) | ~p120(X0)) & (~(p100(X0) & ~p101(X0)) | (~! [X1] : (~r1(X0,X1) | ~(~p102(X1) & p101(X1) & p2(X1))) & ~! [X1] : (~r1(X0,X1) | ~(~p102(X1) & p101(X1) & ~p2(X1))))) & (~(p104(X0) & ~p105(X0)) | (~! [X1] : (~(p105(X1) & ~p106(X1) & p6(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(~p6(X1) & p105(X1) & ~p106(X1))))) & (~(~p107(X0) & p106(X0)) | (~! [X1] : (~r1(X0,X1) | ~(~p8(X1) & p107(X1) & ~p108(X1))) & ~! [X1] : (~r1(X0,X1) | ~(~p108(X1) & p107(X1) & p8(X1))))) & (~(p108(X0) & ~p109(X0)) | (~! [X1] : (~r1(X0,X1) | ~(~p10(X1) & p109(X1) & ~p110(X1))) & ~! [X1] : (~(p10(X1) & ~p110(X1) & p109(X1)) | ~r1(X0,X1)))) & (~(~p111(X0) & p110(X0)) | (~! [X1] : (~(p12(X1) & ~p112(X1) & p111(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(~p12(X1) & p111(X1) & ~p112(X1)) | ~r1(X0,X1)))) & ((~! [X1] : (~(p112(X1) & ~p113(X1) & ~p13(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(~p113(X1) & p112(X1) & p13(X1)))) | ~(~p112(X0) & p111(X0))) & ((~! [X1] : (~r1(X0,X1) | ~(~p115(X1) & p114(X1) & ~p15(X1))) & ~! [X1] : (~(p114(X1) & ~p115(X1) & p15(X1)) | ~r1(X0,X1))) | ~(~p114(X0) & p113(X0))) & ((~! [X1] : (~(p20(X1) & p119(X1) & ~p120(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(p119(X1) & ~p120(X1) & ~p20(X1)) | ~r1(X0,X1))) | ~(~p119(X0) & p118(X0))) & (~(~p120(X0) & p119(X0)) | (~! [X1] : (~r1(X0,X1) | ~(p120(X1) & ~p121(X1) & ~p21(X1))) & ~! [X1] : (~r1(X0,X1) | ~(~p121(X1) & p120(X1) & p21(X1)))))) | ~r1(X1,X0)))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (p8(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))), 7.17/7.40 file('/export/starexec/sandbox/benchmark/theBenchmark.p',unknown)). 7.17/7.40 7.17/7.40 fof(f3,negated_conjecture,( 7.17/7.40 ~~? [X0] : ~(~(~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (((~(~p118(X0) & p117(X0)) | (~! [X1] : (~r1(X0,X1) | ~(p118(X1) & ~p119(X1) & ~p19(X1))) & ~! [X1] : (~r1(X0,X1) | ~(p19(X1) & ~p119(X1) & p118(X1))))) & (~(p116(X0) & ~p117(X0)) | (~! [X1] : (~r1(X0,X1) | ~(~p18(X1) & ~p118(X1) & p117(X1))) & ~! [X1] : (~r1(X0,X1) | ~(p18(X1) & ~p118(X1) & p117(X1))))) & ((~! [X1] : (~(p17(X1) & p116(X1) & ~p117(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(~p17(X1) & p116(X1) & ~p117(X1)))) | ~(~p116(X0) & p115(X0))) & ((~! [X1] : (~(p16(X1) & ~p116(X1) & p115(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(~p16(X1) & p115(X1) & ~p116(X1)) | ~r1(X0,X1))) | ~(~p115(X0) & p114(X0))) & ((~! [X1] : (~(p113(X1) & ~p114(X1) & p14(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(p113(X1) & ~p114(X1) & ~p14(X1)))) | ~(p112(X0) & ~p113(X0))) & ((~! [X1] : (~(~p111(X1) & p110(X1) & p11(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(p110(X1) & ~p111(X1) & ~p11(X1)) | ~r1(X0,X1))) | ~(~p110(X0) & p109(X0))) & (~(~p108(X0) & p107(X0)) | (~! [X1] : (~r1(X0,X1) | ~(p9(X1) & p108(X1) & ~p109(X1))) & ~! [X1] : (~(~p9(X1) & ~p109(X1) & p108(X1)) | ~r1(X0,X1)))) & ((~! [X1] : (~(p106(X1) & ~p107(X1) & p7(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(~p107(X1) & p106(X1) & ~p7(X1)))) | ~(p105(X0) & ~p106(X0))) & (~(p103(X0) & ~p104(X0)) | (~! [X1] : (~(p5(X1) & p104(X1) & ~p105(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(p104(X1) & ~p105(X1) & ~p5(X1))))) & (~(~p103(X0) & p102(X0)) | (~! [X1] : (~(~p104(X1) & p103(X1) & p4(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(~p4(X1) & ~p104(X1) & p103(X1)) | ~r1(X0,X1)))) & (~(~p102(X0) & p101(X0)) | (~! [X1] : (~(p3(X1) & ~p103(X1) & p102(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(~p3(X1) & p102(X1) & ~p103(X1)) | ~r1(X0,X1)))) & (~p119(X0) | ((~p20(X0) | ! [X1] : (~r1(X0,X1) | p20(X1) | ~p119(X1))) & (p20(X0) | ! [X1] : (~r1(X0,X1) | ~p119(X1) | ~p20(X1))))) & (~p118(X0) | ((p19(X0) | ! [X1] : (~r1(X0,X1) | ~p118(X1) | ~p19(X1))) & (~p19(X0) | ! [X1] : (~p118(X1) | p19(X1) | ~r1(X0,X1))))) & (((p17(X0) | ! [X1] : (~p17(X1) | ~p116(X1) | ~r1(X0,X1))) & (! [X1] : (~r1(X0,X1) | p17(X1) | ~p116(X1)) | ~p17(X0))) | ~p116(X0)) & (~p112(X0) | ((! [X1] : (~r1(X0,X1) | ~p112(X1) | ~p13(X1)) | p13(X0)) & (~p13(X0) | ! [X1] : (p13(X1) | ~p112(X1) | ~r1(X0,X1))))) & (((! [X1] : (~p111(X1) | p12(X1) | ~r1(X0,X1)) | ~p12(X0)) & (p12(X0) | ! [X1] : (~r1(X0,X1) | ~p12(X1) | ~p111(X1)))) | ~p111(X0)) & (~p108(X0) | ((! [X1] : (~r1(X0,X1) | p9(X1) | ~p108(X1)) | ~p9(X0)) & (p9(X0) | ! [X1] : (~r1(X0,X1) | ~p9(X1) | ~p108(X1))))) & (((~p7(X0) | ! [X1] : (~p106(X1) | p7(X1) | ~r1(X0,X1))) & (! [X1] : (~p7(X1) | ~p106(X1) | ~r1(X0,X1)) | p7(X0))) | ~p106(X0)) & (~p105(X0) | ((p6(X0) | ! [X1] : (~p6(X1) | ~p105(X1) | ~r1(X0,X1))) & (~p6(X0) | ! [X1] : (~r1(X0,X1) | ~p105(X1) | p6(X1))))) & (~p104(X0) | ((~p5(X0) | ! [X1] : (~r1(X0,X1) | p5(X1) | ~p104(X1))) & (p5(X0) | ! [X1] : (~r1(X0,X1) | ~p104(X1) | ~p5(X1))))) & (p120(X0) | ~p121(X0)) & (p118(X0) | ~p119(X0)) & (p117(X0) | ~p118(X0)) & (p115(X0) | ~p116(X0)) & (~p114(X0) | p113(X0)) & (~p112(X0) | p111(X0)) & (~p110(X0) | p109(X0)) & (p108(X0) | ~p109(X0)) & (~p107(X0) | p106(X0)) & (p105(X0) | ~p106(X0)) & (~p105(X0) | p104(X0)) & (p103(X0) | ~p104(X0)) & (p101(X0) | ~p102(X0)) & (~p101(X0) | p100(X0)) & (~p103(X0) | p102(X0)) & (~p108(X0) | p107(X0)) & (p110(X0) | ~p111(X0)) & (~p113(X0) | p112(X0)) & (~p115(X0) | p114(X0)) & (~p117(X0) | p116(X0)) & (p119(X0) | ~p120(X0)) & (((~p1(X0) | ! [X1] : (~r1(X0,X1) | ~p100(X1) | p1(X1))) & (p1(X0) | ! [X1] : (~r1(X0,X1) | ~p1(X1) | ~p100(X1)))) | ~p100(X0)) & (((p2(X0) | ! [X1] : (~p2(X1) | ~p101(X1) | ~r1(X0,X1))) & (! [X1] : (~r1(X0,X1) | p2(X1) | ~p101(X1)) | ~p2(X0))) | ~p101(X0)) & (~p102(X0) | ((! [X1] : (~r1(X0,X1) | p3(X1) | ~p102(X1)) | ~p3(X0)) & (! [X1] : (~r1(X0,X1) | ~p3(X1) | ~p102(X1)) | p3(X0)))) & (((! [X1] : (p4(X1) | ~p103(X1) | ~r1(X0,X1)) | ~p4(X0)) & (! [X1] : (~r1(X0,X1) | ~p103(X1) | ~p4(X1)) | p4(X0))) | ~p103(X0)) & (~p107(X0) | ((! [X1] : (~r1(X0,X1) | p8(X1) | ~p107(X1)) | ~p8(X0)) & (! [X1] : (~p8(X1) | ~p107(X1) | ~r1(X0,X1)) | p8(X0)))) & (((! [X1] : (~r1(X0,X1) | p10(X1) | ~p109(X1)) | ~p10(X0)) & (p10(X0) | ! [X1] : (~r1(X0,X1) | ~p10(X1) | ~p109(X1)))) | ~p109(X0)) & (((~p11(X0) | ! [X1] : (~r1(X0,X1) | p11(X1) | ~p110(X1))) & (! [X1] : (~p11(X1) | ~p110(X1) | ~r1(X0,X1)) | p11(X0))) | ~p110(X0)) & (((p14(X0) | ! [X1] : (~r1(X0,X1) | ~p113(X1) | ~p14(X1))) & (~p14(X0) | ! [X1] : (~p113(X1) | p14(X1) | ~r1(X0,X1)))) | ~p113(X0)) & (((! [X1] : (~p114(X1) | p15(X1) | ~r1(X0,X1)) | ~p15(X0)) & (p15(X0) | ! [X1] : (~r1(X0,X1) | ~p15(X1) | ~p114(X1)))) | ~p114(X0)) & (((p16(X0) | ! [X1] : (~r1(X0,X1) | ~p115(X1) | ~p16(X1))) & (~p16(X0) | ! [X1] : (~r1(X0,X1) | p16(X1) | ~p115(X1)))) | ~p115(X0)) & (((p18(X0) | ! [X1] : (~p18(X1) | ~p117(X1) | ~r1(X0,X1))) & (! [X1] : (p18(X1) | ~p117(X1) | ~r1(X0,X1)) | ~p18(X0))) | ~p117(X0)) & (((p21(X0) | ! [X1] : (~p120(X1) | ~p21(X1) | ~r1(X0,X1))) & (! [X1] : (p21(X1) | ~p120(X1) | ~r1(X0,X1)) | ~p21(X0))) | ~p120(X0)) & (~(p100(X0) & ~p101(X0)) | (~! [X1] : (~r1(X0,X1) | ~(~p102(X1) & p101(X1) & p2(X1))) & ~! [X1] : (~r1(X0,X1) | ~(~p102(X1) & p101(X1) & ~p2(X1))))) & (~(p104(X0) & ~p105(X0)) | (~! [X1] : (~(p105(X1) & ~p106(X1) & p6(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(~p6(X1) & p105(X1) & ~p106(X1))))) & (~(~p107(X0) & p106(X0)) | (~! [X1] : (~r1(X0,X1) | ~(~p8(X1) & p107(X1) & ~p108(X1))) & ~! [X1] : (~r1(X0,X1) | ~(~p108(X1) & p107(X1) & p8(X1))))) & (~(p108(X0) & ~p109(X0)) | (~! [X1] : (~r1(X0,X1) | ~(~p10(X1) & p109(X1) & ~p110(X1))) & ~! [X1] : (~(p10(X1) & ~p110(X1) & p109(X1)) | ~r1(X0,X1)))) & (~(~p111(X0) & p110(X0)) | (~! [X1] : (~(p12(X1) & ~p112(X1) & p111(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(~p12(X1) & p111(X1) & ~p112(X1)) | ~r1(X0,X1)))) & ((~! [X1] : (~(p112(X1) & ~p113(X1) & ~p13(X1)) | ~r1(X0,X1)) & ~! [X1] : (~r1(X0,X1) | ~(~p113(X1) & p112(X1) & p13(X1)))) | ~(~p112(X0) & p111(X0))) & ((~! [X1] : (~r1(X0,X1) | ~(~p115(X1) & p114(X1) & ~p15(X1))) & ~! [X1] : (~(p114(X1) & ~p115(X1) & p15(X1)) | ~r1(X0,X1))) | ~(~p114(X0) & p113(X0))) & ((~! [X1] : (~(p20(X1) & p119(X1) & ~p120(X1)) | ~r1(X0,X1)) & ~! [X1] : (~(p119(X1) & ~p120(X1) & ~p20(X1)) | ~r1(X0,X1))) | ~(~p119(X0) & p118(X0))) & (~(~p120(X0) & p119(X0)) | (~! [X1] : (~r1(X0,X1) | ~(p120(X1) & ~p121(X1) & ~p21(X1))) & ~! [X1] : (~r1(X0,X1) | ~(~p121(X1) & p120(X1) & p21(X1)))))) | ~r1(X1,X0)))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (p8(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)))), 7.17/7.40 inference(negated_conjecture,[],[f2])). 7.17/7.40 7.17/7.40 fof(f4,plain,( 7.17/7.40 ~~? [X0] : ~(~(~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (((~(~p118(X20) & p117(X20)) | (~! [X21] : (~r1(X20,X21) | ~(p118(X21) & ~p119(X21) & ~p19(X21))) & ~! [X22] : (~r1(X20,X22) | ~(p19(X22) & ~p119(X22) & p118(X22))))) & (~(p116(X20) & ~p117(X20)) | (~! [X23] : (~r1(X20,X23) | ~(~p18(X23) & ~p118(X23) & p117(X23))) & ~! [X24] : (~r1(X20,X24) | ~(p18(X24) & ~p118(X24) & p117(X24))))) & ((~! [X25] : (~(p17(X25) & p116(X25) & ~p117(X25)) | ~r1(X20,X25)) & ~! [X26] : (~r1(X20,X26) | ~(~p17(X26) & p116(X26) & ~p117(X26)))) | ~(~p116(X20) & p115(X20))) & ((~! [X27] : (~(p16(X27) & ~p116(X27) & p115(X27)) | ~r1(X20,X27)) & ~! [X28] : (~(~p16(X28) & p115(X28) & ~p116(X28)) | ~r1(X20,X28))) | ~(~p115(X20) & p114(X20))) & ((~! [X29] : (~(p113(X29) & ~p114(X29) & p14(X29)) | ~r1(X20,X29)) & ~! [X30] : (~r1(X20,X30) | ~(p113(X30) & ~p114(X30) & ~p14(X30)))) | ~(p112(X20) & ~p113(X20))) & ((~! [X31] : (~(~p111(X31) & p110(X31) & p11(X31)) | ~r1(X20,X31)) & ~! [X32] : (~(p110(X32) & ~p111(X32) & ~p11(X32)) | ~r1(X20,X32))) | ~(~p110(X20) & p109(X20))) & (~(~p108(X20) & p107(X20)) | (~! [X33] : (~r1(X20,X33) | ~(p9(X33) & p108(X33) & ~p109(X33))) & ~! [X34] : (~(~p9(X34) & ~p109(X34) & p108(X34)) | ~r1(X20,X34)))) & ((~! [X35] : (~(p106(X35) & ~p107(X35) & p7(X35)) | ~r1(X20,X35)) & ~! [X36] : (~r1(X20,X36) | ~(~p107(X36) & p106(X36) & ~p7(X36)))) | ~(p105(X20) & ~p106(X20))) & (~(p103(X20) & ~p104(X20)) | (~! [X37] : (~(p5(X37) & p104(X37) & ~p105(X37)) | ~r1(X20,X37)) & ~! [X38] : (~r1(X20,X38) | ~(p104(X38) & ~p105(X38) & ~p5(X38))))) & (~(~p103(X20) & p102(X20)) | (~! [X39] : (~(~p104(X39) & p103(X39) & p4(X39)) | ~r1(X20,X39)) & ~! [X40] : (~(~p4(X40) & ~p104(X40) & p103(X40)) | ~r1(X20,X40)))) & (~(~p102(X20) & p101(X20)) | (~! [X41] : (~(p3(X41) & ~p103(X41) & p102(X41)) | ~r1(X20,X41)) & ~! [X42] : (~(~p3(X42) & p102(X42) & ~p103(X42)) | ~r1(X20,X42)))) & (~p119(X20) | ((~p20(X20) | ! [X43] : (~r1(X20,X43) | p20(X43) | ~p119(X43))) & (p20(X20) | ! [X44] : (~r1(X20,X44) | ~p119(X44) | ~p20(X44))))) & (~p118(X20) | ((p19(X20) | ! [X45] : (~r1(X20,X45) | ~p118(X45) | ~p19(X45))) & (~p19(X20) | ! [X46] : (~p118(X46) | p19(X46) | ~r1(X20,X46))))) & (((p17(X20) | ! [X47] : (~p17(X47) | ~p116(X47) | ~r1(X20,X47))) & (! [X48] : (~r1(X20,X48) | p17(X48) | ~p116(X48)) | ~p17(X20))) | ~p116(X20)) & (~p112(X20) | ((! [X49] : (~r1(X20,X49) | ~p112(X49) | ~p13(X49)) | p13(X20)) & (~p13(X20) | ! [X50] : (p13(X50) | ~p112(X50) | ~r1(X20,X50))))) & (((! [X51] : (~p111(X51) | p12(X51) | ~r1(X20,X51)) | ~p12(X20)) & (p12(X20) | ! [X52] : (~r1(X20,X52) | ~p12(X52) | ~p111(X52)))) | ~p111(X20)) & (~p108(X20) | ((! [X53] : (~r1(X20,X53) | p9(X53) | ~p108(X53)) | ~p9(X20)) & (p9(X20) | ! [X54] : (~r1(X20,X54) | ~p9(X54) | ~p108(X54))))) & (((~p7(X20) | ! [X55] : (~p106(X55) | p7(X55) | ~r1(X20,X55))) & (! [X56] : (~p7(X56) | ~p106(X56) | ~r1(X20,X56)) | p7(X20))) | ~p106(X20)) & (~p105(X20) | ((p6(X20) | ! [X57] : (~p6(X57) | ~p105(X57) | ~r1(X20,X57))) & (~p6(X20) | ! [X58] : (~r1(X20,X58) | ~p105(X58) | p6(X58))))) & (~p104(X20) | ((~p5(X20) | ! [X59] : (~r1(X20,X59) | p5(X59) | ~p104(X59))) & (p5(X20) | ! [X60] : (~r1(X20,X60) | ~p104(X60) | ~p5(X60))))) & (p120(X20) | ~p121(X20)) & (p118(X20) | ~p119(X20)) & (p117(X20) | ~p118(X20)) & (p115(X20) | ~p116(X20)) & (~p114(X20) | p113(X20)) & (~p112(X20) | p111(X20)) & (~p110(X20) | p109(X20)) & (p108(X20) | ~p109(X20)) & (~p107(X20) | p106(X20)) & (p105(X20) | ~p106(X20)) & (~p105(X20) | p104(X20)) & (p103(X20) | ~p104(X20)) & (p101(X20) | ~p102(X20)) & (~p101(X20) | p100(X20)) & (~p103(X20) | p102(X20)) & (~p108(X20) | p107(X20)) & (p110(X20) | ~p111(X20)) & (~p113(X20) | p112(X20)) & (~p115(X20) | p114(X20)) & (~p117(X20) | p116(X20)) & (p119(X20) | ~p120(X20)) & (((~p1(X20) | ! [X61] : (~r1(X20,X61) | ~p100(X61) | p1(X61))) & (p1(X20) | ! [X62] : (~r1(X20,X62) | ~p1(X62) | ~p100(X62)))) | ~p100(X20)) & (((p2(X20) | ! [X63] : (~p2(X63) | ~p101(X63) | ~r1(X20,X63))) & (! [X64] : (~r1(X20,X64) | p2(X64) | ~p101(X64)) | ~p2(X20))) | ~p101(X20)) & (~p102(X20) | ((! [X65] : (~r1(X20,X65) | p3(X65) | ~p102(X65)) | ~p3(X20)) & (! [X66] : (~r1(X20,X66) | ~p3(X66) | ~p102(X66)) | p3(X20)))) & (((! [X67] : (p4(X67) | ~p103(X67) | ~r1(X20,X67)) | ~p4(X20)) & (! [X68] : (~r1(X20,X68) | ~p103(X68) | ~p4(X68)) | p4(X20))) | ~p103(X20)) & (~p107(X20) | ((! [X69] : (~r1(X20,X69) | p8(X69) | ~p107(X69)) | ~p8(X20)) & (! [X70] : (~p8(X70) | ~p107(X70) | ~r1(X20,X70)) | p8(X20)))) & (((! [X71] : (~r1(X20,X71) | p10(X71) | ~p109(X71)) | ~p10(X20)) & (p10(X20) | ! [X72] : (~r1(X20,X72) | ~p10(X72) | ~p109(X72)))) | ~p109(X20)) & (((~p11(X20) | ! [X73] : (~r1(X20,X73) | p11(X73) | ~p110(X73))) & (! [X74] : (~p11(X74) | ~p110(X74) | ~r1(X20,X74)) | p11(X20))) | ~p110(X20)) & (((p14(X20) | ! [X75] : (~r1(X20,X75) | ~p113(X75) | ~p14(X75))) & (~p14(X20) | ! [X76] : (~p113(X76) | p14(X76) | ~r1(X20,X76)))) | ~p113(X20)) & (((! [X77] : (~p114(X77) | p15(X77) | ~r1(X20,X77)) | ~p15(X20)) & (p15(X20) | ! [X78] : (~r1(X20,X78) | ~p15(X78) | ~p114(X78)))) | ~p114(X20)) & (((p16(X20) | ! [X79] : (~r1(X20,X79) | ~p115(X79) | ~p16(X79))) & (~p16(X20) | ! [X80] : (~r1(X20,X80) | p16(X80) | ~p115(X80)))) | ~p115(X20)) & (((p18(X20) | ! [X81] : (~p18(X81) | ~p117(X81) | ~r1(X20,X81))) & (! [X82] : (p18(X82) | ~p117(X82) | ~r1(X20,X82)) | ~p18(X20))) | ~p117(X20)) & (((p21(X20) | ! [X83] : (~p120(X83) | ~p21(X83) | ~r1(X20,X83))) & (! [X84] : (p21(X84) | ~p120(X84) | ~r1(X20,X84)) | ~p21(X20))) | ~p120(X20)) & (~(p100(X20) & ~p101(X20)) | (~! [X85] : (~r1(X20,X85) | ~(~p102(X85) & p101(X85) & p2(X85))) & ~! [X86] : (~r1(X20,X86) | ~(~p102(X86) & p101(X86) & ~p2(X86))))) & (~(p104(X20) & ~p105(X20)) | (~! [X87] : (~(p105(X87) & ~p106(X87) & p6(X87)) | ~r1(X20,X87)) & ~! [X88] : (~r1(X20,X88) | ~(~p6(X88) & p105(X88) & ~p106(X88))))) & (~(~p107(X20) & p106(X20)) | (~! [X89] : (~r1(X20,X89) | ~(~p8(X89) & p107(X89) & ~p108(X89))) & ~! [X90] : (~r1(X20,X90) | ~(~p108(X90) & p107(X90) & p8(X90))))) & (~(p108(X20) & ~p109(X20)) | (~! [X91] : (~r1(X20,X91) | ~(~p10(X91) & p109(X91) & ~p110(X91))) & ~! [X92] : (~(p10(X92) & ~p110(X92) & p109(X92)) | ~r1(X20,X92)))) & (~(~p111(X20) & p110(X20)) | (~! [X93] : (~(p12(X93) & ~p112(X93) & p111(X93)) | ~r1(X20,X93)) & ~! [X94] : (~(~p12(X94) & p111(X94) & ~p112(X94)) | ~r1(X20,X94)))) & ((~! [X95] : (~(p112(X95) & ~p113(X95) & ~p13(X95)) | ~r1(X20,X95)) & ~! [X96] : (~r1(X20,X96) | ~(~p113(X96) & p112(X96) & p13(X96)))) | ~(~p112(X20) & p111(X20))) & ((~! [X97] : (~r1(X20,X97) | ~(~p115(X97) & p114(X97) & ~p15(X97))) & ~! [X98] : (~(p114(X98) & ~p115(X98) & p15(X98)) | ~r1(X20,X98))) | ~(~p114(X20) & p113(X20))) & ((~! [X99] : (~(p20(X99) & p119(X99) & ~p120(X99)) | ~r1(X20,X99)) & ~! [X100] : (~(p119(X100) & ~p120(X100) & ~p20(X100)) | ~r1(X20,X100))) | ~(~p119(X20) & p118(X20))) & (~(~p120(X20) & p119(X20)) | (~! [X101] : (~r1(X20,X101) | ~(p120(X101) & ~p121(X101) & ~p21(X101))) & ~! [X102] : (~r1(X20,X102) | ~(~p121(X102) & p120(X102) & p21(X102)))))) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2)))) | ~! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (! [X107] : (~r1(X106,X107) | ! [X108] : (! [X109] : (! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (! [X118] : (! [X119] : (! [X120] : (! [X121] : (! [X122] : (p8(X122) | ~r1(X121,X122)) | ~r1(X120,X121)) | ~r1(X119,X120)) | ~r1(X118,X119)) | ~r1(X117,X118)) | ~r1(X116,X117)))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110)) | ~r1(X108,X109)) | ~r1(X107,X108))) | ~r1(X105,X106))) | ~r1(X103,X104)) | ~r1(X0,X103)))), 7.17/7.40 inference(rectify,[],[f3])). 7.17/7.40 7.17/7.40 fof(f5,plain,( 7.17/7.40 ? [X0] : ~(~(~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (((~(~p118(X20) & p117(X20)) | (~! [X21] : (~r1(X20,X21) | ~(p118(X21) & ~p119(X21) & ~p19(X21))) & ~! [X22] : (~r1(X20,X22) | ~(p19(X22) & ~p119(X22) & p118(X22))))) & (~(p116(X20) & ~p117(X20)) | (~! [X23] : (~r1(X20,X23) | ~(~p18(X23) & ~p118(X23) & p117(X23))) & ~! [X24] : (~r1(X20,X24) | ~(p18(X24) & ~p118(X24) & p117(X24))))) & ((~! [X25] : (~(p17(X25) & p116(X25) & ~p117(X25)) | ~r1(X20,X25)) & ~! [X26] : (~r1(X20,X26) | ~(~p17(X26) & p116(X26) & ~p117(X26)))) | ~(~p116(X20) & p115(X20))) & ((~! [X27] : (~(p16(X27) & ~p116(X27) & p115(X27)) | ~r1(X20,X27)) & ~! [X28] : (~(~p16(X28) & p115(X28) & ~p116(X28)) | ~r1(X20,X28))) | ~(~p115(X20) & p114(X20))) & ((~! [X29] : (~(p113(X29) & ~p114(X29) & p14(X29)) | ~r1(X20,X29)) & ~! [X30] : (~r1(X20,X30) | ~(p113(X30) & ~p114(X30) & ~p14(X30)))) | ~(p112(X20) & ~p113(X20))) & ((~! [X31] : (~(~p111(X31) & p110(X31) & p11(X31)) | ~r1(X20,X31)) & ~! [X32] : (~(p110(X32) & ~p111(X32) & ~p11(X32)) | ~r1(X20,X32))) | ~(~p110(X20) & p109(X20))) & (~(~p108(X20) & p107(X20)) | (~! [X33] : (~r1(X20,X33) | ~(p9(X33) & p108(X33) & ~p109(X33))) & ~! [X34] : (~(~p9(X34) & ~p109(X34) & p108(X34)) | ~r1(X20,X34)))) & ((~! [X35] : (~(p106(X35) & ~p107(X35) & p7(X35)) | ~r1(X20,X35)) & ~! [X36] : (~r1(X20,X36) | ~(~p107(X36) & p106(X36) & ~p7(X36)))) | ~(p105(X20) & ~p106(X20))) & (~(p103(X20) & ~p104(X20)) | (~! [X37] : (~(p5(X37) & p104(X37) & ~p105(X37)) | ~r1(X20,X37)) & ~! [X38] : (~r1(X20,X38) | ~(p104(X38) & ~p105(X38) & ~p5(X38))))) & (~(~p103(X20) & p102(X20)) | (~! [X39] : (~(~p104(X39) & p103(X39) & p4(X39)) | ~r1(X20,X39)) & ~! [X40] : (~(~p4(X40) & ~p104(X40) & p103(X40)) | ~r1(X20,X40)))) & (~(~p102(X20) & p101(X20)) | (~! [X41] : (~(p3(X41) & ~p103(X41) & p102(X41)) | ~r1(X20,X41)) & ~! [X42] : (~(~p3(X42) & p102(X42) & ~p103(X42)) | ~r1(X20,X42)))) & (~p119(X20) | ((~p20(X20) | ! [X43] : (~r1(X20,X43) | p20(X43) | ~p119(X43))) & (p20(X20) | ! [X44] : (~r1(X20,X44) | ~p119(X44) | ~p20(X44))))) & (~p118(X20) | ((p19(X20) | ! [X45] : (~r1(X20,X45) | ~p118(X45) | ~p19(X45))) & (~p19(X20) | ! [X46] : (~p118(X46) | p19(X46) | ~r1(X20,X46))))) & (((p17(X20) | ! [X47] : (~p17(X47) | ~p116(X47) | ~r1(X20,X47))) & (! [X48] : (~r1(X20,X48) | p17(X48) | ~p116(X48)) | ~p17(X20))) | ~p116(X20)) & (~p112(X20) | ((! [X49] : (~r1(X20,X49) | ~p112(X49) | ~p13(X49)) | p13(X20)) & (~p13(X20) | ! [X50] : (p13(X50) | ~p112(X50) | ~r1(X20,X50))))) & (((! [X51] : (~p111(X51) | p12(X51) | ~r1(X20,X51)) | ~p12(X20)) & (p12(X20) | ! [X52] : (~r1(X20,X52) | ~p12(X52) | ~p111(X52)))) | ~p111(X20)) & (~p108(X20) | ((! [X53] : (~r1(X20,X53) | p9(X53) | ~p108(X53)) | ~p9(X20)) & (p9(X20) | ! [X54] : (~r1(X20,X54) | ~p9(X54) | ~p108(X54))))) & (((~p7(X20) | ! [X55] : (~p106(X55) | p7(X55) | ~r1(X20,X55))) & (! [X56] : (~p7(X56) | ~p106(X56) | ~r1(X20,X56)) | p7(X20))) | ~p106(X20)) & (~p105(X20) | ((p6(X20) | ! [X57] : (~p6(X57) | ~p105(X57) | ~r1(X20,X57))) & (~p6(X20) | ! [X58] : (~r1(X20,X58) | ~p105(X58) | p6(X58))))) & (~p104(X20) | ((~p5(X20) | ! [X59] : (~r1(X20,X59) | p5(X59) | ~p104(X59))) & (p5(X20) | ! [X60] : (~r1(X20,X60) | ~p104(X60) | ~p5(X60))))) & (p120(X20) | ~p121(X20)) & (p118(X20) | ~p119(X20)) & (p117(X20) | ~p118(X20)) & (p115(X20) | ~p116(X20)) & (~p114(X20) | p113(X20)) & (~p112(X20) | p111(X20)) & (~p110(X20) | p109(X20)) & (p108(X20) | ~p109(X20)) & (~p107(X20) | p106(X20)) & (p105(X20) | ~p106(X20)) & (~p105(X20) | p104(X20)) & (p103(X20) | ~p104(X20)) & (p101(X20) | ~p102(X20)) & (~p101(X20) | p100(X20)) & (~p103(X20) | p102(X20)) & (~p108(X20) | p107(X20)) & (p110(X20) | ~p111(X20)) & (~p113(X20) | p112(X20)) & (~p115(X20) | p114(X20)) & (~p117(X20) | p116(X20)) & (p119(X20) | ~p120(X20)) & (((~p1(X20) | ! [X61] : (~r1(X20,X61) | ~p100(X61) | p1(X61))) & (p1(X20) | ! [X62] : (~r1(X20,X62) | ~p1(X62) | ~p100(X62)))) | ~p100(X20)) & (((p2(X20) | ! [X63] : (~p2(X63) | ~p101(X63) | ~r1(X20,X63))) & (! [X64] : (~r1(X20,X64) | p2(X64) | ~p101(X64)) | ~p2(X20))) | ~p101(X20)) & (~p102(X20) | ((! [X65] : (~r1(X20,X65) | p3(X65) | ~p102(X65)) | ~p3(X20)) & (! [X66] : (~r1(X20,X66) | ~p3(X66) | ~p102(X66)) | p3(X20)))) & (((! [X67] : (p4(X67) | ~p103(X67) | ~r1(X20,X67)) | ~p4(X20)) & (! [X68] : (~r1(X20,X68) | ~p103(X68) | ~p4(X68)) | p4(X20))) | ~p103(X20)) & (~p107(X20) | ((! [X69] : (~r1(X20,X69) | p8(X69) | ~p107(X69)) | ~p8(X20)) & (! [X70] : (~p8(X70) | ~p107(X70) | ~r1(X20,X70)) | p8(X20)))) & (((! [X71] : (~r1(X20,X71) | p10(X71) | ~p109(X71)) | ~p10(X20)) & (p10(X20) | ! [X72] : (~r1(X20,X72) | ~p10(X72) | ~p109(X72)))) | ~p109(X20)) & (((~p11(X20) | ! [X73] : (~r1(X20,X73) | p11(X73) | ~p110(X73))) & (! [X74] : (~p11(X74) | ~p110(X74) | ~r1(X20,X74)) | p11(X20))) | ~p110(X20)) & (((p14(X20) | ! [X75] : (~r1(X20,X75) | ~p113(X75) | ~p14(X75))) & (~p14(X20) | ! [X76] : (~p113(X76) | p14(X76) | ~r1(X20,X76)))) | ~p113(X20)) & (((! [X77] : (~p114(X77) | p15(X77) | ~r1(X20,X77)) | ~p15(X20)) & (p15(X20) | ! [X78] : (~r1(X20,X78) | ~p15(X78) | ~p114(X78)))) | ~p114(X20)) & (((p16(X20) | ! [X79] : (~r1(X20,X79) | ~p115(X79) | ~p16(X79))) & (~p16(X20) | ! [X80] : (~r1(X20,X80) | p16(X80) | ~p115(X80)))) | ~p115(X20)) & (((p18(X20) | ! [X81] : (~p18(X81) | ~p117(X81) | ~r1(X20,X81))) & (! [X82] : (p18(X82) | ~p117(X82) | ~r1(X20,X82)) | ~p18(X20))) | ~p117(X20)) & (((p21(X20) | ! [X83] : (~p120(X83) | ~p21(X83) | ~r1(X20,X83))) & (! [X84] : (p21(X84) | ~p120(X84) | ~r1(X20,X84)) | ~p21(X20))) | ~p120(X20)) & (~(p100(X20) & ~p101(X20)) | (~! [X85] : (~r1(X20,X85) | ~(~p102(X85) & p101(X85) & p2(X85))) & ~! [X86] : (~r1(X20,X86) | ~(~p102(X86) & p101(X86) & ~p2(X86))))) & (~(p104(X20) & ~p105(X20)) | (~! [X87] : (~(p105(X87) & ~p106(X87) & p6(X87)) | ~r1(X20,X87)) & ~! [X88] : (~r1(X20,X88) | ~(~p6(X88) & p105(X88) & ~p106(X88))))) & (~(~p107(X20) & p106(X20)) | (~! [X89] : (~r1(X20,X89) | ~(~p8(X89) & p107(X89) & ~p108(X89))) & ~! [X90] : (~r1(X20,X90) | ~(~p108(X90) & p107(X90) & p8(X90))))) & (~(p108(X20) & ~p109(X20)) | (~! [X91] : (~r1(X20,X91) | ~(~p10(X91) & p109(X91) & ~p110(X91))) & ~! [X92] : (~(p10(X92) & ~p110(X92) & p109(X92)) | ~r1(X20,X92)))) & (~(~p111(X20) & p110(X20)) | (~! [X93] : (~(p12(X93) & ~p112(X93) & p111(X93)) | ~r1(X20,X93)) & ~! [X94] : (~(~p12(X94) & p111(X94) & ~p112(X94)) | ~r1(X20,X94)))) & ((~! [X95] : (~(p112(X95) & ~p113(X95) & ~p13(X95)) | ~r1(X20,X95)) & ~! [X96] : (~r1(X20,X96) | ~(~p113(X96) & p112(X96) & p13(X96)))) | ~(~p112(X20) & p111(X20))) & ((~! [X97] : (~r1(X20,X97) | ~(~p115(X97) & p114(X97) & ~p15(X97))) & ~! [X98] : (~(p114(X98) & ~p115(X98) & p15(X98)) | ~r1(X20,X98))) | ~(~p114(X20) & p113(X20))) & ((~! [X99] : (~(p20(X99) & p119(X99) & ~p120(X99)) | ~r1(X20,X99)) & ~! [X100] : (~(p119(X100) & ~p120(X100) & ~p20(X100)) | ~r1(X20,X100))) | ~(~p119(X20) & p118(X20))) & (~(~p120(X20) & p119(X20)) | (~! [X101] : (~r1(X20,X101) | ~(p120(X101) & ~p121(X101) & ~p21(X101))) & ~! [X102] : (~r1(X20,X102) | ~(~p121(X102) & p120(X102) & p21(X102)))))) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2)))) | ~! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (! [X107] : (~r1(X106,X107) | ! [X108] : (! [X109] : (! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (! [X118] : (! [X119] : (! [X120] : (! [X121] : (! [X122] : (p8(X122) | ~r1(X121,X122)) | ~r1(X120,X121)) | ~r1(X119,X120)) | ~r1(X118,X119)) | ~r1(X117,X118)) | ~r1(X116,X117)))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110)) | ~r1(X108,X109)) | ~r1(X107,X108))) | ~r1(X105,X106))) | ~r1(X103,X104)) | ~r1(X0,X103)))), 7.17/7.40 inference(flattening,[],[f4])). 7.17/7.40 7.17/7.40 fof(f6,plain,( 7.17/7.40 ? [X0] : ~(~(~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (((~(~p118(X20) & p117(X20)) | (~! [X21] : (~r1(X20,X21) | ~(p118(X21) & ~p119(X21) & ~p19(X21))) & ~! [X22] : (~r1(X20,X22) | ~(p19(X22) & ~p119(X22) & p118(X22))))) & (~(p116(X20) & ~p117(X20)) | (~! [X23] : (~r1(X20,X23) | ~(~p18(X23) & ~p118(X23) & p117(X23))) & ~! [X24] : (~r1(X20,X24) | ~(p18(X24) & ~p118(X24) & p117(X24))))) & ((~! [X25] : (~(p17(X25) & p116(X25) & ~p117(X25)) | ~r1(X20,X25)) & ~! [X26] : (~r1(X20,X26) | ~(~p17(X26) & p116(X26) & ~p117(X26)))) | ~(~p116(X20) & p115(X20))) & ((~! [X27] : (~(p16(X27) & ~p116(X27) & p115(X27)) | ~r1(X20,X27)) & ~! [X28] : (~(~p16(X28) & p115(X28) & ~p116(X28)) | ~r1(X20,X28))) | ~(~p115(X20) & p114(X20))) & ((~! [X29] : (~(p113(X29) & ~p114(X29) & p14(X29)) | ~r1(X20,X29)) & ~! [X30] : (~r1(X20,X30) | ~(p113(X30) & ~p114(X30) & ~p14(X30)))) | ~(p112(X20) & ~p113(X20))) & ((~! [X31] : (~(~p111(X31) & p110(X31) & p11(X31)) | ~r1(X20,X31)) & ~! [X32] : (~(p110(X32) & ~p111(X32) & ~p11(X32)) | ~r1(X20,X32))) | ~(~p110(X20) & p109(X20))) & (~(~p108(X20) & p107(X20)) | (~! [X33] : (~r1(X20,X33) | ~(p9(X33) & p108(X33) & ~p109(X33))) & ~! [X34] : (~(~p9(X34) & ~p109(X34) & p108(X34)) | ~r1(X20,X34)))) & ((~! [X35] : (~(p106(X35) & ~p107(X35) & p7(X35)) | ~r1(X20,X35)) & ~! [X36] : (~r1(X20,X36) | ~(~p107(X36) & p106(X36) & ~p7(X36)))) | ~(p105(X20) & ~p106(X20))) & (~(p103(X20) & ~p104(X20)) | (~! [X37] : (~(p5(X37) & p104(X37) & ~p105(X37)) | ~r1(X20,X37)) & ~! [X38] : (~r1(X20,X38) | ~(p104(X38) & ~p105(X38) & ~p5(X38))))) & (~(~p103(X20) & p102(X20)) | (~! [X39] : (~(~p104(X39) & p103(X39) & p4(X39)) | ~r1(X20,X39)) & ~! [X40] : (~(~p4(X40) & ~p104(X40) & p103(X40)) | ~r1(X20,X40)))) & (~(~p102(X20) & p101(X20)) | (~! [X41] : (~(p3(X41) & ~p103(X41) & p102(X41)) | ~r1(X20,X41)) & ~! [X42] : (~(~p3(X42) & p102(X42) & ~p103(X42)) | ~r1(X20,X42)))) & (~p119(X20) | ((~p20(X20) | ! [X43] : (~r1(X20,X43) | p20(X43) | ~p119(X43))) & (p20(X20) | ! [X44] : (~r1(X20,X44) | ~p119(X44) | ~p20(X44))))) & (~p118(X20) | ((p19(X20) | ! [X45] : (~r1(X20,X45) | ~p118(X45) | ~p19(X45))) & (~p19(X20) | ! [X46] : (~p118(X46) | p19(X46) | ~r1(X20,X46))))) & (((p17(X20) | ! [X47] : (~p17(X47) | ~p116(X47) | ~r1(X20,X47))) & (! [X48] : (~r1(X20,X48) | p17(X48) | ~p116(X48)) | ~p17(X20))) | ~p116(X20)) & (~p112(X20) | ((! [X49] : (~r1(X20,X49) | ~p112(X49) | ~p13(X49)) | p13(X20)) & (~p13(X20) | ! [X50] : (p13(X50) | ~p112(X50) | ~r1(X20,X50))))) & (((! [X51] : (~p111(X51) | p12(X51) | ~r1(X20,X51)) | ~p12(X20)) & (p12(X20) | ! [X52] : (~r1(X20,X52) | ~p12(X52) | ~p111(X52)))) | ~p111(X20)) & (~p108(X20) | ((! [X53] : (~r1(X20,X53) | p9(X53) | ~p108(X53)) | ~p9(X20)) & (p9(X20) | ! [X54] : (~r1(X20,X54) | ~p9(X54) | ~p108(X54))))) & (((~p7(X20) | ! [X55] : (~p106(X55) | p7(X55) | ~r1(X20,X55))) & (! [X56] : (~p7(X56) | ~p106(X56) | ~r1(X20,X56)) | p7(X20))) | ~p106(X20)) & (~p105(X20) | ((p6(X20) | ! [X57] : (~p6(X57) | ~p105(X57) | ~r1(X20,X57))) & (~p6(X20) | ! [X58] : (~r1(X20,X58) | ~p105(X58) | p6(X58))))) & (~p104(X20) | ((~p5(X20) | ! [X59] : (~r1(X20,X59) | p5(X59) | ~p104(X59))) & (p5(X20) | ! [X60] : (~r1(X20,X60) | ~p104(X60) | ~p5(X60))))) & (p118(X20) | ~p119(X20)) & (p117(X20) | ~p118(X20)) & (p115(X20) | ~p116(X20)) & (~p114(X20) | p113(X20)) & (~p112(X20) | p111(X20)) & (~p110(X20) | p109(X20)) & (p108(X20) | ~p109(X20)) & (~p107(X20) | p106(X20)) & (p105(X20) | ~p106(X20)) & (~p105(X20) | p104(X20)) & (p103(X20) | ~p104(X20)) & (p101(X20) | ~p102(X20)) & (~p101(X20) | p100(X20)) & (~p103(X20) | p102(X20)) & (~p108(X20) | p107(X20)) & (p110(X20) | ~p111(X20)) & (~p113(X20) | p112(X20)) & (~p115(X20) | p114(X20)) & (~p117(X20) | p116(X20)) & (p119(X20) | ~p120(X20)) & (((~p1(X20) | ! [X61] : (~r1(X20,X61) | ~p100(X61) | p1(X61))) & (p1(X20) | ! [X62] : (~r1(X20,X62) | ~p1(X62) | ~p100(X62)))) | ~p100(X20)) & (((p2(X20) | ! [X63] : (~p2(X63) | ~p101(X63) | ~r1(X20,X63))) & (! [X64] : (~r1(X20,X64) | p2(X64) | ~p101(X64)) | ~p2(X20))) | ~p101(X20)) & (~p102(X20) | ((! [X65] : (~r1(X20,X65) | p3(X65) | ~p102(X65)) | ~p3(X20)) & (! [X66] : (~r1(X20,X66) | ~p3(X66) | ~p102(X66)) | p3(X20)))) & (((! [X67] : (p4(X67) | ~p103(X67) | ~r1(X20,X67)) | ~p4(X20)) & (! [X68] : (~r1(X20,X68) | ~p103(X68) | ~p4(X68)) | p4(X20))) | ~p103(X20)) & (~p107(X20) | ((! [X69] : (~r1(X20,X69) | p8(X69) | ~p107(X69)) | ~p8(X20)) & (! [X70] : (~p8(X70) | ~p107(X70) | ~r1(X20,X70)) | p8(X20)))) & (((! [X71] : (~r1(X20,X71) | p10(X71) | ~p109(X71)) | ~p10(X20)) & (p10(X20) | ! [X72] : (~r1(X20,X72) | ~p10(X72) | ~p109(X72)))) | ~p109(X20)) & (((~p11(X20) | ! [X73] : (~r1(X20,X73) | p11(X73) | ~p110(X73))) & (! [X74] : (~p11(X74) | ~p110(X74) | ~r1(X20,X74)) | p11(X20))) | ~p110(X20)) & (((p14(X20) | ! [X75] : (~r1(X20,X75) | ~p113(X75) | ~p14(X75))) & (~p14(X20) | ! [X76] : (~p113(X76) | p14(X76) | ~r1(X20,X76)))) | ~p113(X20)) & (((! [X77] : (~p114(X77) | p15(X77) | ~r1(X20,X77)) | ~p15(X20)) & (p15(X20) | ! [X78] : (~r1(X20,X78) | ~p15(X78) | ~p114(X78)))) | ~p114(X20)) & (((p16(X20) | ! [X79] : (~r1(X20,X79) | ~p115(X79) | ~p16(X79))) & (~p16(X20) | ! [X80] : (~r1(X20,X80) | p16(X80) | ~p115(X80)))) | ~p115(X20)) & (((p18(X20) | ! [X81] : (~p18(X81) | ~p117(X81) | ~r1(X20,X81))) & (! [X82] : (p18(X82) | ~p117(X82) | ~r1(X20,X82)) | ~p18(X20))) | ~p117(X20)) & (((p21(X20) | ! [X83] : (~p120(X83) | ~p21(X83) | ~r1(X20,X83))) & (! [X84] : (p21(X84) | ~p120(X84) | ~r1(X20,X84)) | ~p21(X20))) | ~p120(X20)) & (~(p100(X20) & ~p101(X20)) | (~! [X85] : (~r1(X20,X85) | ~(~p102(X85) & p101(X85) & p2(X85))) & ~! [X86] : (~r1(X20,X86) | ~(~p102(X86) & p101(X86) & ~p2(X86))))) & (~(p104(X20) & ~p105(X20)) | (~! [X87] : (~(p105(X87) & ~p106(X87) & p6(X87)) | ~r1(X20,X87)) & ~! [X88] : (~r1(X20,X88) | ~(~p6(X88) & p105(X88) & ~p106(X88))))) & (~(~p107(X20) & p106(X20)) | (~! [X89] : (~r1(X20,X89) | ~(~p8(X89) & p107(X89) & ~p108(X89))) & ~! [X90] : (~r1(X20,X90) | ~(~p108(X90) & p107(X90) & p8(X90))))) & (~(p108(X20) & ~p109(X20)) | (~! [X91] : (~r1(X20,X91) | ~(~p10(X91) & p109(X91) & ~p110(X91))) & ~! [X92] : (~(p10(X92) & ~p110(X92) & p109(X92)) | ~r1(X20,X92)))) & (~(~p111(X20) & p110(X20)) | (~! [X93] : (~(p12(X93) & ~p112(X93) & p111(X93)) | ~r1(X20,X93)) & ~! [X94] : (~(~p12(X94) & p111(X94) & ~p112(X94)) | ~r1(X20,X94)))) & ((~! [X95] : (~(p112(X95) & ~p113(X95) & ~p13(X95)) | ~r1(X20,X95)) & ~! [X96] : (~r1(X20,X96) | ~(~p113(X96) & p112(X96) & p13(X96)))) | ~(~p112(X20) & p111(X20))) & ((~! [X97] : (~r1(X20,X97) | ~(~p115(X97) & p114(X97) & ~p15(X97))) & ~! [X98] : (~(p114(X98) & ~p115(X98) & p15(X98)) | ~r1(X20,X98))) | ~(~p114(X20) & p113(X20))) & ((~! [X99] : (~(p20(X99) & p119(X99) & ~p120(X99)) | ~r1(X20,X99)) & ~! [X100] : (~(p119(X100) & ~p120(X100) & ~p20(X100)) | ~r1(X20,X100))) | ~(~p119(X20) & p118(X20))) & (~(~p120(X20) & p119(X20)) | (~! [X101] : (~r1(X20,X101) | ~(p120(X101) & ~p21(X101))) & ~! [X102] : (~r1(X20,X102) | ~(p120(X102) & p21(X102)))))) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2)))) | ~! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (! [X107] : (~r1(X106,X107) | ! [X108] : (! [X109] : (! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (! [X118] : (! [X119] : (! [X120] : (! [X121] : (! [X122] : (p8(X122) | ~r1(X121,X122)) | ~r1(X120,X121)) | ~r1(X119,X120)) | ~r1(X118,X119)) | ~r1(X117,X118)) | ~r1(X116,X117)))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110)) | ~r1(X108,X109)) | ~r1(X107,X108))) | ~r1(X105,X106))) | ~r1(X103,X104)) | ~r1(X0,X103)))), 7.17/7.40 inference(pure_predicate_removal,[],[f5])). 7.17/7.40 7.17/7.40 fof(f7,plain,( 7.17/7.40 ? [X0] : ((~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : ((((p118(X20) | ~p117(X20)) | (? [X21] : (r1(X20,X21) & (p118(X21) & ~p119(X21) & ~p19(X21))) & ? [X22] : (r1(X20,X22) & (p19(X22) & ~p119(X22) & p118(X22))))) & ((~p116(X20) | p117(X20)) | (? [X23] : (r1(X20,X23) & (~p18(X23) & ~p118(X23) & p117(X23))) & ? [X24] : (r1(X20,X24) & (p18(X24) & ~p118(X24) & p117(X24))))) & ((? [X25] : ((p17(X25) & p116(X25) & ~p117(X25)) & r1(X20,X25)) & ? [X26] : (r1(X20,X26) & (~p17(X26) & p116(X26) & ~p117(X26)))) | (p116(X20) | ~p115(X20))) & ((? [X27] : ((p16(X27) & ~p116(X27) & p115(X27)) & r1(X20,X27)) & ? [X28] : ((~p16(X28) & p115(X28) & ~p116(X28)) & r1(X20,X28))) | (p115(X20) | ~p114(X20))) & ((? [X29] : ((p113(X29) & ~p114(X29) & p14(X29)) & r1(X20,X29)) & ? [X30] : (r1(X20,X30) & (p113(X30) & ~p114(X30) & ~p14(X30)))) | (~p112(X20) | p113(X20))) & ((? [X31] : ((~p111(X31) & p110(X31) & p11(X31)) & r1(X20,X31)) & ? [X32] : ((p110(X32) & ~p111(X32) & ~p11(X32)) & r1(X20,X32))) | (p110(X20) | ~p109(X20))) & ((p108(X20) | ~p107(X20)) | (? [X33] : (r1(X20,X33) & (p9(X33) & p108(X33) & ~p109(X33))) & ? [X34] : ((~p9(X34) & ~p109(X34) & p108(X34)) & r1(X20,X34)))) & ((? [X35] : ((p106(X35) & ~p107(X35) & p7(X35)) & r1(X20,X35)) & ? [X36] : (r1(X20,X36) & (~p107(X36) & p106(X36) & ~p7(X36)))) | (~p105(X20) | p106(X20))) & ((~p103(X20) | p104(X20)) | (? [X37] : ((p5(X37) & p104(X37) & ~p105(X37)) & r1(X20,X37)) & ? [X38] : (r1(X20,X38) & (p104(X38) & ~p105(X38) & ~p5(X38))))) & ((p103(X20) | ~p102(X20)) | (? [X39] : ((~p104(X39) & p103(X39) & p4(X39)) & r1(X20,X39)) & ? [X40] : ((~p4(X40) & ~p104(X40) & p103(X40)) & r1(X20,X40)))) & ((p102(X20) | ~p101(X20)) | (? [X41] : ((p3(X41) & ~p103(X41) & p102(X41)) & r1(X20,X41)) & ? [X42] : ((~p3(X42) & p102(X42) & ~p103(X42)) & r1(X20,X42)))) & (~p119(X20) | ((~p20(X20) | ! [X43] : (~r1(X20,X43) | p20(X43) | ~p119(X43))) & (p20(X20) | ! [X44] : (~r1(X20,X44) | ~p119(X44) | ~p20(X44))))) & (~p118(X20) | ((p19(X20) | ! [X45] : (~r1(X20,X45) | ~p118(X45) | ~p19(X45))) & (~p19(X20) | ! [X46] : (~p118(X46) | p19(X46) | ~r1(X20,X46))))) & (((p17(X20) | ! [X47] : (~p17(X47) | ~p116(X47) | ~r1(X20,X47))) & (! [X48] : (~r1(X20,X48) | p17(X48) | ~p116(X48)) | ~p17(X20))) | ~p116(X20)) & (~p112(X20) | ((! [X49] : (~r1(X20,X49) | ~p112(X49) | ~p13(X49)) | p13(X20)) & (~p13(X20) | ! [X50] : (p13(X50) | ~p112(X50) | ~r1(X20,X50))))) & (((! [X51] : (~p111(X51) | p12(X51) | ~r1(X20,X51)) | ~p12(X20)) & (p12(X20) | ! [X52] : (~r1(X20,X52) | ~p12(X52) | ~p111(X52)))) | ~p111(X20)) & (~p108(X20) | ((! [X53] : (~r1(X20,X53) | p9(X53) | ~p108(X53)) | ~p9(X20)) & (p9(X20) | ! [X54] : (~r1(X20,X54) | ~p9(X54) | ~p108(X54))))) & (((~p7(X20) | ! [X55] : (~p106(X55) | p7(X55) | ~r1(X20,X55))) & (! [X56] : (~p7(X56) | ~p106(X56) | ~r1(X20,X56)) | p7(X20))) | ~p106(X20)) & (~p105(X20) | ((p6(X20) | ! [X57] : (~p6(X57) | ~p105(X57) | ~r1(X20,X57))) & (~p6(X20) | ! [X58] : (~r1(X20,X58) | ~p105(X58) | p6(X58))))) & (~p104(X20) | ((~p5(X20) | ! [X59] : (~r1(X20,X59) | p5(X59) | ~p104(X59))) & (p5(X20) | ! [X60] : (~r1(X20,X60) | ~p104(X60) | ~p5(X60))))) & (p118(X20) | ~p119(X20)) & (p117(X20) | ~p118(X20)) & (p115(X20) | ~p116(X20)) & (~p114(X20) | p113(X20)) & (~p112(X20) | p111(X20)) & (~p110(X20) | p109(X20)) & (p108(X20) | ~p109(X20)) & (~p107(X20) | p106(X20)) & (p105(X20) | ~p106(X20)) & (~p105(X20) | p104(X20)) & (p103(X20) | ~p104(X20)) & (p101(X20) | ~p102(X20)) & (~p101(X20) | p100(X20)) & (~p103(X20) | p102(X20)) & (~p108(X20) | p107(X20)) & (p110(X20) | ~p111(X20)) & (~p113(X20) | p112(X20)) & (~p115(X20) | p114(X20)) & (~p117(X20) | p116(X20)) & (p119(X20) | ~p120(X20)) & (((~p1(X20) | ! [X61] : (~r1(X20,X61) | ~p100(X61) | p1(X61))) & (p1(X20) | ! [X62] : (~r1(X20,X62) | ~p1(X62) | ~p100(X62)))) | ~p100(X20)) & (((p2(X20) | ! [X63] : (~p2(X63) | ~p101(X63) | ~r1(X20,X63))) & (! [X64] : (~r1(X20,X64) | p2(X64) | ~p101(X64)) | ~p2(X20))) | ~p101(X20)) & (~p102(X20) | ((! [X65] : (~r1(X20,X65) | p3(X65) | ~p102(X65)) | ~p3(X20)) & (! [X66] : (~r1(X20,X66) | ~p3(X66) | ~p102(X66)) | p3(X20)))) & (((! [X67] : (p4(X67) | ~p103(X67) | ~r1(X20,X67)) | ~p4(X20)) & (! [X68] : (~r1(X20,X68) | ~p103(X68) | ~p4(X68)) | p4(X20))) | ~p103(X20)) & (~p107(X20) | ((! [X69] : (~r1(X20,X69) | p8(X69) | ~p107(X69)) | ~p8(X20)) & (! [X70] : (~p8(X70) | ~p107(X70) | ~r1(X20,X70)) | p8(X20)))) & (((! [X71] : (~r1(X20,X71) | p10(X71) | ~p109(X71)) | ~p10(X20)) & (p10(X20) | ! [X72] : (~r1(X20,X72) | ~p10(X72) | ~p109(X72)))) | ~p109(X20)) & (((~p11(X20) | ! [X73] : (~r1(X20,X73) | p11(X73) | ~p110(X73))) & (! [X74] : (~p11(X74) | ~p110(X74) | ~r1(X20,X74)) | p11(X20))) | ~p110(X20)) & (((p14(X20) | ! [X75] : (~r1(X20,X75) | ~p113(X75) | ~p14(X75))) & (~p14(X20) | ! [X76] : (~p113(X76) | p14(X76) | ~r1(X20,X76)))) | ~p113(X20)) & (((! [X77] : (~p114(X77) | p15(X77) | ~r1(X20,X77)) | ~p15(X20)) & (p15(X20) | ! [X78] : (~r1(X20,X78) | ~p15(X78) | ~p114(X78)))) | ~p114(X20)) & (((p16(X20) | ! [X79] : (~r1(X20,X79) | ~p115(X79) | ~p16(X79))) & (~p16(X20) | ! [X80] : (~r1(X20,X80) | p16(X80) | ~p115(X80)))) | ~p115(X20)) & (((p18(X20) | ! [X81] : (~p18(X81) | ~p117(X81) | ~r1(X20,X81))) & (! [X82] : (p18(X82) | ~p117(X82) | ~r1(X20,X82)) | ~p18(X20))) | ~p117(X20)) & (((p21(X20) | ! [X83] : (~p120(X83) | ~p21(X83) | ~r1(X20,X83))) & (! [X84] : (p21(X84) | ~p120(X84) | ~r1(X20,X84)) | ~p21(X20))) | ~p120(X20)) & ((~p100(X20) | p101(X20)) | (? [X85] : (r1(X20,X85) & (~p102(X85) & p101(X85) & p2(X85))) & ? [X86] : (r1(X20,X86) & (~p102(X86) & p101(X86) & ~p2(X86))))) & ((~p104(X20) | p105(X20)) | (? [X87] : ((p105(X87) & ~p106(X87) & p6(X87)) & r1(X20,X87)) & ? [X88] : (r1(X20,X88) & (~p6(X88) & p105(X88) & ~p106(X88))))) & ((p107(X20) | ~p106(X20)) | (? [X89] : (r1(X20,X89) & (~p8(X89) & p107(X89) & ~p108(X89))) & ? [X90] : (r1(X20,X90) & (~p108(X90) & p107(X90) & p8(X90))))) & ((~p108(X20) | p109(X20)) | (? [X91] : (r1(X20,X91) & (~p10(X91) & p109(X91) & ~p110(X91))) & ? [X92] : ((p10(X92) & ~p110(X92) & p109(X92)) & r1(X20,X92)))) & ((p111(X20) | ~p110(X20)) | (? [X93] : ((p12(X93) & ~p112(X93) & p111(X93)) & r1(X20,X93)) & ? [X94] : ((~p12(X94) & p111(X94) & ~p112(X94)) & r1(X20,X94)))) & ((? [X95] : ((p112(X95) & ~p113(X95) & ~p13(X95)) & r1(X20,X95)) & ? [X96] : (r1(X20,X96) & (~p113(X96) & p112(X96) & p13(X96)))) | (p112(X20) | ~p111(X20))) & ((? [X97] : (r1(X20,X97) & (~p115(X97) & p114(X97) & ~p15(X97))) & ? [X98] : ((p114(X98) & ~p115(X98) & p15(X98)) & r1(X20,X98))) | (p114(X20) | ~p113(X20))) & ((? [X99] : ((p20(X99) & p119(X99) & ~p120(X99)) & r1(X20,X99)) & ? [X100] : ((p119(X100) & ~p120(X100) & ~p20(X100)) & r1(X20,X100))) | (p119(X20) | ~p118(X20))) & ((p120(X20) | ~p119(X20)) | (? [X101] : (r1(X20,X101) & (p120(X101) & ~p21(X101))) & ? [X102] : (r1(X20,X102) & (p120(X102) & p21(X102)))))) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2)))) & ! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (! [X107] : (~r1(X106,X107) | ! [X108] : (! [X109] : (! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (! [X118] : (! [X119] : (! [X120] : (! [X121] : (! [X122] : (p8(X122) | ~r1(X121,X122)) | ~r1(X120,X121)) | ~r1(X119,X120)) | ~r1(X118,X119)) | ~r1(X117,X118)) | ~r1(X116,X117)))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110)) | ~r1(X108,X109)) | ~r1(X107,X108))) | ~r1(X105,X106))) | ~r1(X103,X104)) | ~r1(X0,X103)))), 7.17/7.40 inference(ennf_transformation,[],[f6])). 7.17/7.40 7.17/7.40 fof(f8,plain,( 7.17/7.40 ? [X0] : (~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (((p118(X20) | ~p117(X20) | (? [X21] : (r1(X20,X21) & p118(X21) & ~p119(X21) & ~p19(X21)) & ? [X22] : (r1(X20,X22) & p19(X22) & ~p119(X22) & p118(X22)))) & (~p116(X20) | p117(X20) | (? [X23] : (r1(X20,X23) & ~p18(X23) & ~p118(X23) & p117(X23)) & ? [X24] : (r1(X20,X24) & p18(X24) & ~p118(X24) & p117(X24)))) & ((? [X25] : (p17(X25) & p116(X25) & ~p117(X25) & r1(X20,X25)) & ? [X26] : (r1(X20,X26) & ~p17(X26) & p116(X26) & ~p117(X26))) | p116(X20) | ~p115(X20)) & ((? [X27] : (p16(X27) & ~p116(X27) & p115(X27) & r1(X20,X27)) & ? [X28] : (~p16(X28) & p115(X28) & ~p116(X28) & r1(X20,X28))) | p115(X20) | ~p114(X20)) & ((? [X29] : (p113(X29) & ~p114(X29) & p14(X29) & r1(X20,X29)) & ? [X30] : (r1(X20,X30) & p113(X30) & ~p114(X30) & ~p14(X30))) | ~p112(X20) | p113(X20)) & ((? [X31] : (~p111(X31) & p110(X31) & p11(X31) & r1(X20,X31)) & ? [X32] : (p110(X32) & ~p111(X32) & ~p11(X32) & r1(X20,X32))) | p110(X20) | ~p109(X20)) & (p108(X20) | ~p107(X20) | (? [X33] : (r1(X20,X33) & p9(X33) & p108(X33) & ~p109(X33)) & ? [X34] : (~p9(X34) & ~p109(X34) & p108(X34) & r1(X20,X34)))) & ((? [X35] : (p106(X35) & ~p107(X35) & p7(X35) & r1(X20,X35)) & ? [X36] : (r1(X20,X36) & ~p107(X36) & p106(X36) & ~p7(X36))) | ~p105(X20) | p106(X20)) & (~p103(X20) | p104(X20) | (? [X37] : (p5(X37) & p104(X37) & ~p105(X37) & r1(X20,X37)) & ? [X38] : (r1(X20,X38) & p104(X38) & ~p105(X38) & ~p5(X38)))) & (p103(X20) | ~p102(X20) | (? [X39] : (~p104(X39) & p103(X39) & p4(X39) & r1(X20,X39)) & ? [X40] : (~p4(X40) & ~p104(X40) & p103(X40) & r1(X20,X40)))) & (p102(X20) | ~p101(X20) | (? [X41] : (p3(X41) & ~p103(X41) & p102(X41) & r1(X20,X41)) & ? [X42] : (~p3(X42) & p102(X42) & ~p103(X42) & r1(X20,X42)))) & (~p119(X20) | ((~p20(X20) | ! [X43] : (~r1(X20,X43) | p20(X43) | ~p119(X43))) & (p20(X20) | ! [X44] : (~r1(X20,X44) | ~p119(X44) | ~p20(X44))))) & (~p118(X20) | ((p19(X20) | ! [X45] : (~r1(X20,X45) | ~p118(X45) | ~p19(X45))) & (~p19(X20) | ! [X46] : (~p118(X46) | p19(X46) | ~r1(X20,X46))))) & (((p17(X20) | ! [X47] : (~p17(X47) | ~p116(X47) | ~r1(X20,X47))) & (! [X48] : (~r1(X20,X48) | p17(X48) | ~p116(X48)) | ~p17(X20))) | ~p116(X20)) & (~p112(X20) | ((! [X49] : (~r1(X20,X49) | ~p112(X49) | ~p13(X49)) | p13(X20)) & (~p13(X20) | ! [X50] : (p13(X50) | ~p112(X50) | ~r1(X20,X50))))) & (((! [X51] : (~p111(X51) | p12(X51) | ~r1(X20,X51)) | ~p12(X20)) & (p12(X20) | ! [X52] : (~r1(X20,X52) | ~p12(X52) | ~p111(X52)))) | ~p111(X20)) & (~p108(X20) | ((! [X53] : (~r1(X20,X53) | p9(X53) | ~p108(X53)) | ~p9(X20)) & (p9(X20) | ! [X54] : (~r1(X20,X54) | ~p9(X54) | ~p108(X54))))) & (((~p7(X20) | ! [X55] : (~p106(X55) | p7(X55) | ~r1(X20,X55))) & (! [X56] : (~p7(X56) | ~p106(X56) | ~r1(X20,X56)) | p7(X20))) | ~p106(X20)) & (~p105(X20) | ((p6(X20) | ! [X57] : (~p6(X57) | ~p105(X57) | ~r1(X20,X57))) & (~p6(X20) | ! [X58] : (~r1(X20,X58) | ~p105(X58) | p6(X58))))) & (~p104(X20) | ((~p5(X20) | ! [X59] : (~r1(X20,X59) | p5(X59) | ~p104(X59))) & (p5(X20) | ! [X60] : (~r1(X20,X60) | ~p104(X60) | ~p5(X60))))) & (p118(X20) | ~p119(X20)) & (p117(X20) | ~p118(X20)) & (p115(X20) | ~p116(X20)) & (~p114(X20) | p113(X20)) & (~p112(X20) | p111(X20)) & (~p110(X20) | p109(X20)) & (p108(X20) | ~p109(X20)) & (~p107(X20) | p106(X20)) & (p105(X20) | ~p106(X20)) & (~p105(X20) | p104(X20)) & (p103(X20) | ~p104(X20)) & (p101(X20) | ~p102(X20)) & (~p101(X20) | p100(X20)) & (~p103(X20) | p102(X20)) & (~p108(X20) | p107(X20)) & (p110(X20) | ~p111(X20)) & (~p113(X20) | p112(X20)) & (~p115(X20) | p114(X20)) & (~p117(X20) | p116(X20)) & (p119(X20) | ~p120(X20)) & (((~p1(X20) | ! [X61] : (~r1(X20,X61) | ~p100(X61) | p1(X61))) & (p1(X20) | ! [X62] : (~r1(X20,X62) | ~p1(X62) | ~p100(X62)))) | ~p100(X20)) & (((p2(X20) | ! [X63] : (~p2(X63) | ~p101(X63) | ~r1(X20,X63))) & (! [X64] : (~r1(X20,X64) | p2(X64) | ~p101(X64)) | ~p2(X20))) | ~p101(X20)) & (~p102(X20) | ((! [X65] : (~r1(X20,X65) | p3(X65) | ~p102(X65)) | ~p3(X20)) & (! [X66] : (~r1(X20,X66) | ~p3(X66) | ~p102(X66)) | p3(X20)))) & (((! [X67] : (p4(X67) | ~p103(X67) | ~r1(X20,X67)) | ~p4(X20)) & (! [X68] : (~r1(X20,X68) | ~p103(X68) | ~p4(X68)) | p4(X20))) | ~p103(X20)) & (~p107(X20) | ((! [X69] : (~r1(X20,X69) | p8(X69) | ~p107(X69)) | ~p8(X20)) & (! [X70] : (~p8(X70) | ~p107(X70) | ~r1(X20,X70)) | p8(X20)))) & (((! [X71] : (~r1(X20,X71) | p10(X71) | ~p109(X71)) | ~p10(X20)) & (p10(X20) | ! [X72] : (~r1(X20,X72) | ~p10(X72) | ~p109(X72)))) | ~p109(X20)) & (((~p11(X20) | ! [X73] : (~r1(X20,X73) | p11(X73) | ~p110(X73))) & (! [X74] : (~p11(X74) | ~p110(X74) | ~r1(X20,X74)) | p11(X20))) | ~p110(X20)) & (((p14(X20) | ! [X75] : (~r1(X20,X75) | ~p113(X75) | ~p14(X75))) & (~p14(X20) | ! [X76] : (~p113(X76) | p14(X76) | ~r1(X20,X76)))) | ~p113(X20)) & (((! [X77] : (~p114(X77) | p15(X77) | ~r1(X20,X77)) | ~p15(X20)) & (p15(X20) | ! [X78] : (~r1(X20,X78) | ~p15(X78) | ~p114(X78)))) | ~p114(X20)) & (((p16(X20) | ! [X79] : (~r1(X20,X79) | ~p115(X79) | ~p16(X79))) & (~p16(X20) | ! [X80] : (~r1(X20,X80) | p16(X80) | ~p115(X80)))) | ~p115(X20)) & (((p18(X20) | ! [X81] : (~p18(X81) | ~p117(X81) | ~r1(X20,X81))) & (! [X82] : (p18(X82) | ~p117(X82) | ~r1(X20,X82)) | ~p18(X20))) | ~p117(X20)) & (((p21(X20) | ! [X83] : (~p120(X83) | ~p21(X83) | ~r1(X20,X83))) & (! [X84] : (p21(X84) | ~p120(X84) | ~r1(X20,X84)) | ~p21(X20))) | ~p120(X20)) & (~p100(X20) | p101(X20) | (? [X85] : (r1(X20,X85) & ~p102(X85) & p101(X85) & p2(X85)) & ? [X86] : (r1(X20,X86) & ~p102(X86) & p101(X86) & ~p2(X86)))) & (~p104(X20) | p105(X20) | (? [X87] : (p105(X87) & ~p106(X87) & p6(X87) & r1(X20,X87)) & ? [X88] : (r1(X20,X88) & ~p6(X88) & p105(X88) & ~p106(X88)))) & (p107(X20) | ~p106(X20) | (? [X89] : (r1(X20,X89) & ~p8(X89) & p107(X89) & ~p108(X89)) & ? [X90] : (r1(X20,X90) & ~p108(X90) & p107(X90) & p8(X90)))) & (~p108(X20) | p109(X20) | (? [X91] : (r1(X20,X91) & ~p10(X91) & p109(X91) & ~p110(X91)) & ? [X92] : (p10(X92) & ~p110(X92) & p109(X92) & r1(X20,X92)))) & (p111(X20) | ~p110(X20) | (? [X93] : (p12(X93) & ~p112(X93) & p111(X93) & r1(X20,X93)) & ? [X94] : (~p12(X94) & p111(X94) & ~p112(X94) & r1(X20,X94)))) & ((? [X95] : (p112(X95) & ~p113(X95) & ~p13(X95) & r1(X20,X95)) & ? [X96] : (r1(X20,X96) & ~p113(X96) & p112(X96) & p13(X96))) | p112(X20) | ~p111(X20)) & ((? [X97] : (r1(X20,X97) & ~p115(X97) & p114(X97) & ~p15(X97)) & ? [X98] : (p114(X98) & ~p115(X98) & p15(X98) & r1(X20,X98))) | p114(X20) | ~p113(X20)) & ((? [X99] : (p20(X99) & p119(X99) & ~p120(X99) & r1(X20,X99)) & ? [X100] : (p119(X100) & ~p120(X100) & ~p20(X100) & r1(X20,X100))) | p119(X20) | ~p118(X20)) & (p120(X20) | ~p119(X20) | (? [X101] : (r1(X20,X101) & p120(X101) & ~p21(X101)) & ? [X102] : (r1(X20,X102) & p120(X102) & p21(X102))))) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2))) & ! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (! [X107] : (~r1(X106,X107) | ! [X108] : (! [X109] : (! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (! [X118] : (! [X119] : (! [X120] : (! [X121] : (! [X122] : (p8(X122) | ~r1(X121,X122)) | ~r1(X120,X121)) | ~r1(X119,X120)) | ~r1(X118,X119)) | ~r1(X117,X118)) | ~r1(X116,X117)))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110)) | ~r1(X108,X109)) | ~r1(X107,X108))) | ~r1(X105,X106))) | ~r1(X103,X104)) | ~r1(X0,X103)))), 7.17/7.40 inference(flattening,[],[f7])). 7.17/7.40 7.17/7.40 fof(f50,plain,( 7.17/7.40 ! [X20] : ((sP18(X20) & sP17(X20) & sP16(X20) & sP15(X20) & sP14(X20) & sP13(X20) & sP12(X20) & sP11(X20) & sP10(X20) & sP9(X20) & sP8(X20) & sP40(X20) & sP39(X20) & sP38(X20) & sP37(X20) & sP36(X20) & sP35(X20) & sP34(X20) & sP33(X20) & sP32(X20) & (p118(X20) | ~p119(X20)) & (p117(X20) | ~p118(X20)) & (p115(X20) | ~p116(X20)) & (~p114(X20) | p113(X20)) & (~p112(X20) | p111(X20)) & (~p110(X20) | p109(X20)) & (p108(X20) | ~p109(X20)) & (~p107(X20) | p106(X20)) & (p105(X20) | ~p106(X20)) & (~p105(X20) | p104(X20)) & (p103(X20) | ~p104(X20)) & (p101(X20) | ~p102(X20)) & (~p101(X20) | p100(X20)) & (~p103(X20) | p102(X20)) & (~p108(X20) | p107(X20)) & (p110(X20) | ~p111(X20)) & (~p113(X20) | p112(X20)) & (~p115(X20) | p114(X20)) & (~p117(X20) | p116(X20)) & (p119(X20) | ~p120(X20)) & sP31(X20) & sP30(X20) & sP29(X20) & sP28(X20) & sP27(X20) & sP26(X20) & sP25(X20) & sP24(X20) & sP23(X20) & sP22(X20) & sP21(X20) & sP20(X20) & sP7(X20) & sP6(X20) & sP5(X20) & sP4(X20) & sP3(X20) & sP2(X20) & sP1(X20) & sP0(X20) & sP19(X20)) | ~sP41(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP41])])). 7.17/7.40 7.17/7.40 fof(f49,plain,( 7.17/7.40 ! [X20] : (~p119(X20) | ((~p20(X20) | ! [X43] : (~r1(X20,X43) | p20(X43) | ~p119(X43))) & (p20(X20) | ! [X44] : (~r1(X20,X44) | ~p119(X44) | ~p20(X44)))) | ~sP40(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP40])])). 7.17/7.40 7.17/7.40 fof(f48,plain,( 7.17/7.40 ! [X20] : (~p118(X20) | ((p19(X20) | ! [X45] : (~r1(X20,X45) | ~p118(X45) | ~p19(X45))) & (~p19(X20) | ! [X46] : (~p118(X46) | p19(X46) | ~r1(X20,X46)))) | ~sP39(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP39])])). 7.17/7.40 7.17/7.40 fof(f47,plain,( 7.17/7.40 ! [X20] : (((p17(X20) | ! [X47] : (~p17(X47) | ~p116(X47) | ~r1(X20,X47))) & (! [X48] : (~r1(X20,X48) | p17(X48) | ~p116(X48)) | ~p17(X20))) | ~p116(X20) | ~sP38(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP38])])). 7.17/7.40 7.17/7.40 fof(f46,plain,( 7.17/7.40 ! [X20] : (~p112(X20) | ((! [X49] : (~r1(X20,X49) | ~p112(X49) | ~p13(X49)) | p13(X20)) & (~p13(X20) | ! [X50] : (p13(X50) | ~p112(X50) | ~r1(X20,X50)))) | ~sP37(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP37])])). 7.17/7.40 7.17/7.40 fof(f45,plain,( 7.17/7.40 ! [X20] : (((! [X51] : (~p111(X51) | p12(X51) | ~r1(X20,X51)) | ~p12(X20)) & (p12(X20) | ! [X52] : (~r1(X20,X52) | ~p12(X52) | ~p111(X52)))) | ~p111(X20) | ~sP36(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP36])])). 7.17/7.40 7.17/7.40 fof(f44,plain,( 7.17/7.40 ! [X20] : (~p108(X20) | ((! [X53] : (~r1(X20,X53) | p9(X53) | ~p108(X53)) | ~p9(X20)) & (p9(X20) | ! [X54] : (~r1(X20,X54) | ~p9(X54) | ~p108(X54)))) | ~sP35(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP35])])). 7.17/7.40 7.17/7.40 fof(f43,plain,( 7.17/7.40 ! [X20] : (((~p7(X20) | ! [X55] : (~p106(X55) | p7(X55) | ~r1(X20,X55))) & (! [X56] : (~p7(X56) | ~p106(X56) | ~r1(X20,X56)) | p7(X20))) | ~p106(X20) | ~sP34(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP34])])). 7.17/7.40 7.17/7.40 fof(f42,plain,( 7.17/7.40 ! [X20] : (~p105(X20) | ((p6(X20) | ! [X57] : (~p6(X57) | ~p105(X57) | ~r1(X20,X57))) & (~p6(X20) | ! [X58] : (~r1(X20,X58) | ~p105(X58) | p6(X58)))) | ~sP33(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP33])])). 7.17/7.40 7.17/7.40 fof(f41,plain,( 7.17/7.40 ! [X20] : (~p104(X20) | ((~p5(X20) | ! [X59] : (~r1(X20,X59) | p5(X59) | ~p104(X59))) & (p5(X20) | ! [X60] : (~r1(X20,X60) | ~p104(X60) | ~p5(X60)))) | ~sP32(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP32])])). 7.17/7.40 7.17/7.40 fof(f40,plain,( 7.17/7.40 ! [X20] : (((~p1(X20) | ! [X61] : (~r1(X20,X61) | ~p100(X61) | p1(X61))) & (p1(X20) | ! [X62] : (~r1(X20,X62) | ~p1(X62) | ~p100(X62)))) | ~p100(X20) | ~sP31(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP31])])). 7.17/7.40 7.17/7.40 fof(f39,plain,( 7.17/7.40 ! [X20] : (((p2(X20) | ! [X63] : (~p2(X63) | ~p101(X63) | ~r1(X20,X63))) & (! [X64] : (~r1(X20,X64) | p2(X64) | ~p101(X64)) | ~p2(X20))) | ~p101(X20) | ~sP30(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP30])])). 7.17/7.40 7.17/7.40 fof(f38,plain,( 7.17/7.40 ! [X20] : (~p102(X20) | ((! [X65] : (~r1(X20,X65) | p3(X65) | ~p102(X65)) | ~p3(X20)) & (! [X66] : (~r1(X20,X66) | ~p3(X66) | ~p102(X66)) | p3(X20))) | ~sP29(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP29])])). 7.17/7.40 7.17/7.40 fof(f37,plain,( 7.17/7.40 ! [X20] : (((! [X67] : (p4(X67) | ~p103(X67) | ~r1(X20,X67)) | ~p4(X20)) & (! [X68] : (~r1(X20,X68) | ~p103(X68) | ~p4(X68)) | p4(X20))) | ~p103(X20) | ~sP28(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP28])])). 7.17/7.40 7.17/7.40 fof(f36,plain,( 7.17/7.40 ! [X20] : (~p107(X20) | ((! [X69] : (~r1(X20,X69) | p8(X69) | ~p107(X69)) | ~p8(X20)) & (! [X70] : (~p8(X70) | ~p107(X70) | ~r1(X20,X70)) | p8(X20))) | ~sP27(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP27])])). 7.17/7.40 7.17/7.40 fof(f35,plain,( 7.17/7.40 ! [X20] : (((! [X71] : (~r1(X20,X71) | p10(X71) | ~p109(X71)) | ~p10(X20)) & (p10(X20) | ! [X72] : (~r1(X20,X72) | ~p10(X72) | ~p109(X72)))) | ~p109(X20) | ~sP26(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP26])])). 7.17/7.40 7.17/7.40 fof(f34,plain,( 7.17/7.40 ! [X20] : (((~p11(X20) | ! [X73] : (~r1(X20,X73) | p11(X73) | ~p110(X73))) & (! [X74] : (~p11(X74) | ~p110(X74) | ~r1(X20,X74)) | p11(X20))) | ~p110(X20) | ~sP25(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP25])])). 7.17/7.40 7.17/7.40 fof(f33,plain,( 7.17/7.40 ! [X20] : (((p14(X20) | ! [X75] : (~r1(X20,X75) | ~p113(X75) | ~p14(X75))) & (~p14(X20) | ! [X76] : (~p113(X76) | p14(X76) | ~r1(X20,X76)))) | ~p113(X20) | ~sP24(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP24])])). 7.17/7.40 7.17/7.40 fof(f32,plain,( 7.17/7.40 ! [X20] : (((! [X77] : (~p114(X77) | p15(X77) | ~r1(X20,X77)) | ~p15(X20)) & (p15(X20) | ! [X78] : (~r1(X20,X78) | ~p15(X78) | ~p114(X78)))) | ~p114(X20) | ~sP23(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP23])])). 7.17/7.40 7.17/7.40 fof(f31,plain,( 7.17/7.40 ! [X20] : (((p16(X20) | ! [X79] : (~r1(X20,X79) | ~p115(X79) | ~p16(X79))) & (~p16(X20) | ! [X80] : (~r1(X20,X80) | p16(X80) | ~p115(X80)))) | ~p115(X20) | ~sP22(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP22])])). 7.17/7.40 7.17/7.40 fof(f30,plain,( 7.17/7.40 ! [X20] : (((p18(X20) | ! [X81] : (~p18(X81) | ~p117(X81) | ~r1(X20,X81))) & (! [X82] : (p18(X82) | ~p117(X82) | ~r1(X20,X82)) | ~p18(X20))) | ~p117(X20) | ~sP21(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP21])])). 7.17/7.40 7.17/7.40 fof(f29,plain,( 7.17/7.40 ! [X20] : (((p21(X20) | ! [X83] : (~p120(X83) | ~p21(X83) | ~r1(X20,X83))) & (! [X84] : (p21(X84) | ~p120(X84) | ~r1(X20,X84)) | ~p21(X20))) | ~p120(X20) | ~sP20(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP20])])). 7.17/7.40 7.17/7.40 fof(f28,plain,( 7.17/7.40 ! [X20] : (p120(X20) | ~p119(X20) | (? [X101] : (r1(X20,X101) & p120(X101) & ~p21(X101)) & ? [X102] : (r1(X20,X102) & p120(X102) & p21(X102))) | ~sP19(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP19])])). 7.17/7.40 7.17/7.40 fof(f27,plain,( 7.17/7.40 ! [X20] : (p118(X20) | ~p117(X20) | (? [X21] : (r1(X20,X21) & p118(X21) & ~p119(X21) & ~p19(X21)) & ? [X22] : (r1(X20,X22) & p19(X22) & ~p119(X22) & p118(X22))) | ~sP18(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP18])])). 7.17/7.40 7.17/7.40 fof(f26,plain,( 7.17/7.40 ! [X20] : (~p116(X20) | p117(X20) | (? [X23] : (r1(X20,X23) & ~p18(X23) & ~p118(X23) & p117(X23)) & ? [X24] : (r1(X20,X24) & p18(X24) & ~p118(X24) & p117(X24))) | ~sP17(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP17])])). 7.17/7.40 7.17/7.40 fof(f25,plain,( 7.17/7.40 ! [X20] : ((? [X25] : (p17(X25) & p116(X25) & ~p117(X25) & r1(X20,X25)) & ? [X26] : (r1(X20,X26) & ~p17(X26) & p116(X26) & ~p117(X26))) | p116(X20) | ~p115(X20) | ~sP16(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP16])])). 7.17/7.40 7.17/7.40 fof(f24,plain,( 7.17/7.40 ! [X20] : ((? [X27] : (p16(X27) & ~p116(X27) & p115(X27) & r1(X20,X27)) & ? [X28] : (~p16(X28) & p115(X28) & ~p116(X28) & r1(X20,X28))) | p115(X20) | ~p114(X20) | ~sP15(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP15])])). 7.17/7.40 7.17/7.40 fof(f23,plain,( 7.17/7.40 ! [X20] : ((? [X29] : (p113(X29) & ~p114(X29) & p14(X29) & r1(X20,X29)) & ? [X30] : (r1(X20,X30) & p113(X30) & ~p114(X30) & ~p14(X30))) | ~p112(X20) | p113(X20) | ~sP14(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP14])])). 7.17/7.40 7.17/7.40 fof(f22,plain,( 7.17/7.40 ! [X20] : ((? [X31] : (~p111(X31) & p110(X31) & p11(X31) & r1(X20,X31)) & ? [X32] : (p110(X32) & ~p111(X32) & ~p11(X32) & r1(X20,X32))) | p110(X20) | ~p109(X20) | ~sP13(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP13])])). 7.17/7.40 7.17/7.40 fof(f21,plain,( 7.17/7.40 ! [X20] : (p108(X20) | ~p107(X20) | (? [X33] : (r1(X20,X33) & p9(X33) & p108(X33) & ~p109(X33)) & ? [X34] : (~p9(X34) & ~p109(X34) & p108(X34) & r1(X20,X34))) | ~sP12(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP12])])). 7.17/7.40 7.17/7.40 fof(f20,plain,( 7.17/7.40 ! [X20] : ((? [X35] : (p106(X35) & ~p107(X35) & p7(X35) & r1(X20,X35)) & ? [X36] : (r1(X20,X36) & ~p107(X36) & p106(X36) & ~p7(X36))) | ~p105(X20) | p106(X20) | ~sP11(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP11])])). 7.17/7.40 7.17/7.40 fof(f19,plain,( 7.17/7.40 ! [X20] : (~p103(X20) | p104(X20) | (? [X37] : (p5(X37) & p104(X37) & ~p105(X37) & r1(X20,X37)) & ? [X38] : (r1(X20,X38) & p104(X38) & ~p105(X38) & ~p5(X38))) | ~sP10(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP10])])). 7.17/7.40 7.17/7.40 fof(f18,plain,( 7.17/7.40 ! [X20] : (p103(X20) | ~p102(X20) | (? [X39] : (~p104(X39) & p103(X39) & p4(X39) & r1(X20,X39)) & ? [X40] : (~p4(X40) & ~p104(X40) & p103(X40) & r1(X20,X40))) | ~sP9(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP9])])). 7.17/7.40 7.17/7.40 fof(f17,plain,( 7.17/7.40 ! [X20] : (p102(X20) | ~p101(X20) | (? [X41] : (p3(X41) & ~p103(X41) & p102(X41) & r1(X20,X41)) & ? [X42] : (~p3(X42) & p102(X42) & ~p103(X42) & r1(X20,X42))) | ~sP8(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP8])])). 7.17/7.40 7.17/7.40 fof(f16,plain,( 7.17/7.40 ! [X20] : (~p100(X20) | p101(X20) | (? [X85] : (r1(X20,X85) & ~p102(X85) & p101(X85) & p2(X85)) & ? [X86] : (r1(X20,X86) & ~p102(X86) & p101(X86) & ~p2(X86))) | ~sP7(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP7])])). 7.17/7.40 7.17/7.40 fof(f15,plain,( 7.17/7.40 ! [X20] : (~p104(X20) | p105(X20) | (? [X87] : (p105(X87) & ~p106(X87) & p6(X87) & r1(X20,X87)) & ? [X88] : (r1(X20,X88) & ~p6(X88) & p105(X88) & ~p106(X88))) | ~sP6(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP6])])). 7.17/7.40 7.17/7.40 fof(f14,plain,( 7.17/7.40 ! [X20] : (p107(X20) | ~p106(X20) | (? [X89] : (r1(X20,X89) & ~p8(X89) & p107(X89) & ~p108(X89)) & ? [X90] : (r1(X20,X90) & ~p108(X90) & p107(X90) & p8(X90))) | ~sP5(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP5])])). 7.17/7.40 7.17/7.40 fof(f13,plain,( 7.17/7.40 ! [X20] : (~p108(X20) | p109(X20) | (? [X91] : (r1(X20,X91) & ~p10(X91) & p109(X91) & ~p110(X91)) & ? [X92] : (p10(X92) & ~p110(X92) & p109(X92) & r1(X20,X92))) | ~sP4(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP4])])). 7.17/7.40 7.17/7.40 fof(f12,plain,( 7.17/7.40 ! [X20] : (p111(X20) | ~p110(X20) | (? [X93] : (p12(X93) & ~p112(X93) & p111(X93) & r1(X20,X93)) & ? [X94] : (~p12(X94) & p111(X94) & ~p112(X94) & r1(X20,X94))) | ~sP3(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP3])])). 7.17/7.40 7.17/7.40 fof(f11,plain,( 7.17/7.40 ! [X20] : ((? [X95] : (p112(X95) & ~p113(X95) & ~p13(X95) & r1(X20,X95)) & ? [X96] : (r1(X20,X96) & ~p113(X96) & p112(X96) & p13(X96))) | p112(X20) | ~p111(X20) | ~sP2(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP2])])). 7.17/7.40 7.17/7.40 fof(f10,plain,( 7.17/7.40 ! [X20] : ((? [X97] : (r1(X20,X97) & ~p115(X97) & p114(X97) & ~p15(X97)) & ? [X98] : (p114(X98) & ~p115(X98) & p15(X98) & r1(X20,X98))) | p114(X20) | ~p113(X20) | ~sP1(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP1])])). 7.17/7.40 7.17/7.40 fof(f9,plain,( 7.17/7.40 ! [X20] : ((? [X99] : (p20(X99) & p119(X99) & ~p120(X99) & r1(X20,X99)) & ? [X100] : (p119(X100) & ~p120(X100) & ~p20(X100) & r1(X20,X100))) | p119(X20) | ~p118(X20) | ~sP0(X20))), 7.17/7.40 introduced(predicate_definition_introduction,[new_symbols(naming,[sP0])])). 7.17/7.40 7.17/7.40 fof(f51,plain,( 7.17/7.40 ? [X0] : (~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (sP41(X20) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2))) & ! [X103] : (! [X104] : (! [X105] : (~r1(X104,X105) | ! [X106] : (! [X107] : (~r1(X106,X107) | ! [X108] : (! [X109] : (! [X110] : (! [X111] : (~r1(X110,X111) | ! [X112] : (~r1(X111,X112) | ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (! [X118] : (! [X119] : (! [X120] : (! [X121] : (! [X122] : (p8(X122) | ~r1(X121,X122)) | ~r1(X120,X121)) | ~r1(X119,X120)) | ~r1(X118,X119)) | ~r1(X117,X118)) | ~r1(X116,X117)))) | ~r1(X113,X114)) | ~r1(X112,X113)))) | ~r1(X109,X110)) | ~r1(X108,X109)) | ~r1(X107,X108))) | ~r1(X105,X106))) | ~r1(X103,X104)) | ~r1(X0,X103)))), 7.17/7.40 inference(definition_folding,[],[f8,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])). 7.17/7.40 7.17/7.40 fof(f196,plain,( 7.17/7.40 ? [X0] : (~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (sP41(X20) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2))) & ! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (! [X38] : (! [X39] : (! [X40] : (p8(X40) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35)))) | ~r1(X31,X32)) | ~r1(X30,X31)))) | ~r1(X27,X28)) | ~r1(X26,X27)) | ~r1(X25,X26))) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(X0,X21)))), 7.17/7.40 inference(rectify,[],[f51])). 7.17/7.40 7.17/7.40 fof(f197,plain,( 7.17/7.40 ? [X0] : (~p101(X0) & p100(X0) & ! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (sP41(X20) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2))) & ! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (! [X38] : (! [X39] : (! [X40] : (p8(X40) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35)))) | ~r1(X31,X32)) | ~r1(X30,X31)))) | ~r1(X27,X28)) | ~r1(X26,X27)) | ~r1(X25,X26))) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(X0,X21))) => (~p101(sK82) & p100(sK82) & ! [X1] : (~r1(sK82,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (sP41(X20) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2))) & ! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (! [X38] : (! [X39] : (! [X40] : (p8(X40) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35)))) | ~r1(X31,X32)) | ~r1(X30,X31)))) | ~r1(X27,X28)) | ~r1(X26,X27)) | ~r1(X25,X26))) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(sK82,X21)))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f198,plain,( 7.17/7.40 ~p101(sK82) & p100(sK82) & ! [X1] : (~r1(sK82,X1) | ! [X2] : (! [X3] : (! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (! [X7] : (! [X8] : (! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (~r1(X15,X16) | ! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (~r1(X18,X19) | ! [X20] : (sP41(X20) | ~r1(X19,X20)))) | ~r1(X16,X17))))) | ~r1(X12,X13)) | ~r1(X11,X12)) | ~r1(X10,X11)) | ~r1(X9,X10))) | ~r1(X7,X8)) | ~r1(X6,X7)) | ~r1(X5,X6)) | ~r1(X4,X5))) | ~r1(X2,X3)) | ~r1(X1,X2))) & ! [X21] : (! [X22] : (! [X23] : (~r1(X22,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (! [X27] : (! [X28] : (! [X29] : (~r1(X28,X29) | ! [X30] : (~r1(X29,X30) | ! [X31] : (! [X32] : (! [X33] : (~r1(X32,X33) | ! [X34] : (~r1(X33,X34) | ! [X35] : (! [X36] : (! [X37] : (! [X38] : (! [X39] : (! [X40] : (p8(X40) | ~r1(X39,X40)) | ~r1(X38,X39)) | ~r1(X37,X38)) | ~r1(X36,X37)) | ~r1(X35,X36)) | ~r1(X34,X35)))) | ~r1(X31,X32)) | ~r1(X30,X31)))) | ~r1(X27,X28)) | ~r1(X26,X27)) | ~r1(X25,X26))) | ~r1(X23,X24))) | ~r1(X21,X22)) | ~r1(sK82,X21))), 7.17/7.40 inference(skolemisation,[status(esa),new_symbols(skolem,[sK82])],[f196,f197])). 7.17/7.40 7.17/7.40 fof(f461,plain,( 7.17/7.40 ( ! [X30,X28,X26,X24,X39,X37,X33,X35,X23,X21,X31,X29,X27,X25,X38,X36,X34,X32,X40,X22] : (~r1(X22,X23) | ~r1(X24,X25) | ~r1(X28,X29) | ~r1(X29,X30) | ~r1(X32,X33) | ~r1(X33,X34) | p8(X40) | ~r1(X39,X40) | ~r1(X38,X39) | ~r1(X37,X38) | ~r1(X36,X37) | ~r1(X35,X36) | ~r1(X34,X35) | ~r1(X31,X32) | ~r1(X30,X31) | ~r1(X27,X28) | ~r1(X26,X27) | ~r1(X25,X26) | ~r1(X23,X24) | ~r1(X21,X22) | ~r1(sK82,X21)) )), 7.17/7.40 inference(cnf_transformation,[],[f198])). 7.17/7.40 7.17/7.40 fof(f462,plain,( 7.17/7.40 ( ! [X6,X4,X2,X14,X12,X10,X8,X19,X17,X7,X5,X3,X1,X15,X13,X11,X9,X20,X18,X16] : (~r1(sK82,X1) | ~r1(X3,X4) | ~r1(X8,X9) | ~r1(X13,X14) | ~r1(X14,X15) | ~r1(X15,X16) | ~r1(X17,X18) | ~r1(X18,X19) | sP41(X20) | ~r1(X19,X20) | ~r1(X16,X17) | ~r1(X12,X13) | ~r1(X11,X12) | ~r1(X10,X11) | ~r1(X9,X10) | ~r1(X7,X8) | ~r1(X6,X7) | ~r1(X5,X6) | ~r1(X4,X5) | ~r1(X2,X3) | ~r1(X1,X2)) )), 7.17/7.40 inference(cnf_transformation,[],[f198])). 7.17/7.40 7.17/7.40 fof(f463,plain,( 7.17/7.40 p100(sK82)), 7.17/7.40 inference(cnf_transformation,[],[f198])). 7.17/7.40 7.17/7.40 fof(f464,plain,( 7.17/7.40 ~p101(sK82)), 7.17/7.40 inference(cnf_transformation,[],[f198])). 7.17/7.40 7.17/7.40 fof(f156,plain,( 7.17/7.40 ! [X20] : (~p100(X20) | p101(X20) | (? [X85] : (r1(X20,X85) & ~p102(X85) & p101(X85) & p2(X85)) & ? [X86] : (r1(X20,X86) & ~p102(X86) & p101(X86) & ~p2(X86))) | ~sP7(X20))), 7.17/7.40 inference(nnf_transformation,[],[f16])). 7.17/7.40 7.17/7.40 fof(f157,plain,( 7.17/7.40 ! [X0] : (~p100(X0) | p101(X0) | (? [X1] : (r1(X0,X1) & ~p102(X1) & p101(X1) & p2(X1)) & ? [X2] : (r1(X0,X2) & ~p102(X2) & p101(X2) & ~p2(X2))) | ~sP7(X0))), 7.17/7.40 inference(rectify,[],[f156])). 7.17/7.40 7.17/7.40 fof(f159,plain,( 7.17/7.40 ! [X0] : (? [X2] : (r1(X0,X2) & ~p102(X2) & p101(X2) & ~p2(X2)) => (r1(X0,sK67(X0)) & ~p102(sK67(X0)) & p101(sK67(X0)) & ~p2(sK67(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f158,plain,( 7.17/7.40 ! [X0] : (? [X1] : (r1(X0,X1) & ~p102(X1) & p101(X1) & p2(X1)) => (r1(X0,sK66(X0)) & ~p102(sK66(X0)) & p101(sK66(X0)) & p2(sK66(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f160,plain,( 7.17/7.40 ! [X0] : (~p100(X0) | p101(X0) | ((r1(X0,sK66(X0)) & ~p102(sK66(X0)) & p101(sK66(X0)) & p2(sK66(X0))) & (r1(X0,sK67(X0)) & ~p102(sK67(X0)) & p101(sK67(X0)) & ~p2(sK67(X0)))) | ~sP7(X0))), 7.17/7.40 inference(skolemisation,[status(esa),new_symbols(skolem,[sK66,sK67])],[f157,f159,f158])). 7.17/7.40 7.17/7.40 fof(f398,plain,( 7.17/7.40 ( ! [X0] : (~p100(X0) | p101(X0) | p101(sK67(X0)) | ~sP7(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f160])). 7.17/7.40 7.17/7.40 fof(f399,plain,( 7.17/7.40 ( ! [X0] : (~p100(X0) | p101(X0) | ~p102(sK67(X0)) | ~sP7(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f160])). 7.17/7.40 7.17/7.40 fof(f400,plain,( 7.17/7.40 ( ! [X0] : (~p100(X0) | p101(X0) | r1(X0,sK67(X0)) | ~sP7(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f160])). 7.17/7.40 7.17/7.40 fof(f52,plain,( 7.17/7.40 ! [X20] : ((sP18(X20) & sP17(X20) & sP16(X20) & sP15(X20) & sP14(X20) & sP13(X20) & sP12(X20) & sP11(X20) & sP10(X20) & sP9(X20) & sP8(X20) & sP40(X20) & sP39(X20) & sP38(X20) & sP37(X20) & sP36(X20) & sP35(X20) & sP34(X20) & sP33(X20) & sP32(X20) & (p118(X20) | ~p119(X20)) & (p117(X20) | ~p118(X20)) & (p115(X20) | ~p116(X20)) & (~p114(X20) | p113(X20)) & (~p112(X20) | p111(X20)) & (~p110(X20) | p109(X20)) & (p108(X20) | ~p109(X20)) & (~p107(X20) | p106(X20)) & (p105(X20) | ~p106(X20)) & (~p105(X20) | p104(X20)) & (p103(X20) | ~p104(X20)) & (p101(X20) | ~p102(X20)) & (~p101(X20) | p100(X20)) & (~p103(X20) | p102(X20)) & (~p108(X20) | p107(X20)) & (p110(X20) | ~p111(X20)) & (~p113(X20) | p112(X20)) & (~p115(X20) | p114(X20)) & (~p117(X20) | p116(X20)) & (p119(X20) | ~p120(X20)) & sP31(X20) & sP30(X20) & sP29(X20) & sP28(X20) & sP27(X20) & sP26(X20) & sP25(X20) & sP24(X20) & sP23(X20) & sP22(X20) & sP21(X20) & sP20(X20) & sP7(X20) & sP6(X20) & sP5(X20) & sP4(X20) & sP3(X20) & sP2(X20) & sP1(X20) & sP0(X20) & sP19(X20)) | ~sP41(X20))), 7.17/7.40 inference(nnf_transformation,[],[f50])). 7.17/7.40 7.17/7.40 fof(f53,plain,( 7.17/7.40 ! [X0] : ((sP18(X0) & sP17(X0) & sP16(X0) & sP15(X0) & sP14(X0) & sP13(X0) & sP12(X0) & sP11(X0) & sP10(X0) & sP9(X0) & sP8(X0) & sP40(X0) & sP39(X0) & sP38(X0) & sP37(X0) & sP36(X0) & sP35(X0) & sP34(X0) & sP33(X0) & sP32(X0) & (p118(X0) | ~p119(X0)) & (p117(X0) | ~p118(X0)) & (p115(X0) | ~p116(X0)) & (~p114(X0) | p113(X0)) & (~p112(X0) | p111(X0)) & (~p110(X0) | p109(X0)) & (p108(X0) | ~p109(X0)) & (~p107(X0) | p106(X0)) & (p105(X0) | ~p106(X0)) & (~p105(X0) | p104(X0)) & (p103(X0) | ~p104(X0)) & (p101(X0) | ~p102(X0)) & (~p101(X0) | p100(X0)) & (~p103(X0) | p102(X0)) & (~p108(X0) | p107(X0)) & (p110(X0) | ~p111(X0)) & (~p113(X0) | p112(X0)) & (~p115(X0) | p114(X0)) & (~p117(X0) | p116(X0)) & (p119(X0) | ~p120(X0)) & sP31(X0) & sP30(X0) & sP29(X0) & sP28(X0) & sP27(X0) & sP26(X0) & sP25(X0) & sP24(X0) & sP23(X0) & sP22(X0) & sP21(X0) & sP20(X0) & sP7(X0) & sP6(X0) & sP5(X0) & sP4(X0) & sP3(X0) & sP2(X0) & sP1(X0) & sP0(X0) & sP19(X0)) | ~sP41(X0))), 7.17/7.40 inference(rectify,[],[f52])). 7.17/7.40 7.17/7.40 fof(f208,plain,( 7.17/7.40 ( ! [X0] : (sP7(X0) | ~sP41(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f53])). 7.17/7.40 7.17/7.40 fof(f1,axiom,( 7.17/7.40 ! [X0] : r1(X0,X0)), 7.17/7.40 file('/export/starexec/sandbox/benchmark/theBenchmark.p',unknown)). 7.17/7.40 7.17/7.40 fof(f199,plain,( 7.17/7.40 ( ! [X0] : (r1(X0,X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f1])). 7.17/7.40 7.17/7.40 fof(f250,plain,( 7.17/7.40 ( ! [X0] : (sP8(X0) | ~sP41(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f53])). 7.17/7.40 7.17/7.40 fof(f151,plain,( 7.17/7.40 ! [X20] : (p102(X20) | ~p101(X20) | (? [X41] : (p3(X41) & ~p103(X41) & p102(X41) & r1(X20,X41)) & ? [X42] : (~p3(X42) & p102(X42) & ~p103(X42) & r1(X20,X42))) | ~sP8(X20))), 7.17/7.40 inference(nnf_transformation,[],[f17])). 7.17/7.40 7.17/7.40 fof(f152,plain,( 7.17/7.40 ! [X0] : (p102(X0) | ~p101(X0) | (? [X1] : (p3(X1) & ~p103(X1) & p102(X1) & r1(X0,X1)) & ? [X2] : (~p3(X2) & p102(X2) & ~p103(X2) & r1(X0,X2))) | ~sP8(X0))), 7.17/7.40 inference(rectify,[],[f151])). 7.17/7.40 7.17/7.40 fof(f154,plain,( 7.17/7.40 ! [X0] : (? [X2] : (~p3(X2) & p102(X2) & ~p103(X2) & r1(X0,X2)) => (~p3(sK65(X0)) & p102(sK65(X0)) & ~p103(sK65(X0)) & r1(X0,sK65(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f153,plain,( 7.17/7.40 ! [X0] : (? [X1] : (p3(X1) & ~p103(X1) & p102(X1) & r1(X0,X1)) => (p3(sK64(X0)) & ~p103(sK64(X0)) & p102(sK64(X0)) & r1(X0,sK64(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f155,plain,( 7.17/7.40 ! [X0] : (p102(X0) | ~p101(X0) | ((p3(sK64(X0)) & ~p103(sK64(X0)) & p102(sK64(X0)) & r1(X0,sK64(X0))) & (~p3(sK65(X0)) & p102(sK65(X0)) & ~p103(sK65(X0)) & r1(X0,sK65(X0)))) | ~sP8(X0))), 7.17/7.40 inference(skolemisation,[status(esa),new_symbols(skolem,[sK64,sK65])],[f152,f154,f153])). 7.17/7.40 7.17/7.40 fof(f390,plain,( 7.17/7.40 ( ! [X0] : (p102(X0) | ~p101(X0) | ~p103(sK65(X0)) | ~sP8(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f155])). 7.17/7.40 7.17/7.40 fof(f391,plain,( 7.17/7.40 ( ! [X0] : (p102(X0) | ~p101(X0) | p102(sK65(X0)) | ~sP8(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f155])). 7.17/7.40 7.17/7.40 fof(f389,plain,( 7.17/7.40 ( ! [X0] : (p102(X0) | ~p101(X0) | r1(X0,sK65(X0)) | ~sP8(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f155])). 7.17/7.40 7.17/7.40 fof(f251,plain,( 7.17/7.40 ( ! [X0] : (sP9(X0) | ~sP41(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f53])). 7.17/7.40 7.17/7.40 fof(f146,plain,( 7.17/7.40 ! [X20] : (p103(X20) | ~p102(X20) | (? [X39] : (~p104(X39) & p103(X39) & p4(X39) & r1(X20,X39)) & ? [X40] : (~p4(X40) & ~p104(X40) & p103(X40) & r1(X20,X40))) | ~sP9(X20))), 7.17/7.40 inference(nnf_transformation,[],[f18])). 7.17/7.40 7.17/7.40 fof(f147,plain,( 7.17/7.40 ! [X0] : (p103(X0) | ~p102(X0) | (? [X1] : (~p104(X1) & p103(X1) & p4(X1) & r1(X0,X1)) & ? [X2] : (~p4(X2) & ~p104(X2) & p103(X2) & r1(X0,X2))) | ~sP9(X0))), 7.17/7.40 inference(rectify,[],[f146])). 7.17/7.40 7.17/7.40 fof(f149,plain,( 7.17/7.40 ! [X0] : (? [X2] : (~p4(X2) & ~p104(X2) & p103(X2) & r1(X0,X2)) => (~p4(sK63(X0)) & ~p104(sK63(X0)) & p103(sK63(X0)) & r1(X0,sK63(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f148,plain,( 7.17/7.40 ! [X0] : (? [X1] : (~p104(X1) & p103(X1) & p4(X1) & r1(X0,X1)) => (~p104(sK62(X0)) & p103(sK62(X0)) & p4(sK62(X0)) & r1(X0,sK62(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f150,plain,( 7.17/7.40 ! [X0] : (p103(X0) | ~p102(X0) | ((~p104(sK62(X0)) & p103(sK62(X0)) & p4(sK62(X0)) & r1(X0,sK62(X0))) & (~p4(sK63(X0)) & ~p104(sK63(X0)) & p103(sK63(X0)) & r1(X0,sK63(X0)))) | ~sP9(X0))), 7.17/7.40 inference(skolemisation,[status(esa),new_symbols(skolem,[sK62,sK63])],[f147,f149,f148])). 7.17/7.40 7.17/7.40 fof(f381,plain,( 7.17/7.40 ( ! [X0] : (p103(X0) | ~p102(X0) | r1(X0,sK63(X0)) | ~sP9(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f150])). 7.17/7.40 7.17/7.40 fof(f382,plain,( 7.17/7.40 ( ! [X0] : (p103(X0) | ~p102(X0) | p103(sK63(X0)) | ~sP9(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f150])). 7.17/7.40 7.17/7.40 fof(f383,plain,( 7.17/7.40 ( ! [X0] : (p103(X0) | ~p102(X0) | ~p104(sK63(X0)) | ~sP9(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f150])). 7.17/7.40 7.17/7.40 fof(f252,plain,( 7.17/7.40 ( ! [X0] : (sP10(X0) | ~sP41(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f53])). 7.17/7.40 7.17/7.40 fof(f141,plain,( 7.17/7.40 ! [X20] : (~p103(X20) | p104(X20) | (? [X37] : (p5(X37) & p104(X37) & ~p105(X37) & r1(X20,X37)) & ? [X38] : (r1(X20,X38) & p104(X38) & ~p105(X38) & ~p5(X38))) | ~sP10(X20))), 7.17/7.40 inference(nnf_transformation,[],[f19])). 7.17/7.40 7.17/7.40 fof(f142,plain,( 7.17/7.40 ! [X0] : (~p103(X0) | p104(X0) | (? [X1] : (p5(X1) & p104(X1) & ~p105(X1) & r1(X0,X1)) & ? [X2] : (r1(X0,X2) & p104(X2) & ~p105(X2) & ~p5(X2))) | ~sP10(X0))), 7.17/7.40 inference(rectify,[],[f141])). 7.17/7.40 7.17/7.40 fof(f144,plain,( 7.17/7.40 ! [X0] : (? [X2] : (r1(X0,X2) & p104(X2) & ~p105(X2) & ~p5(X2)) => (r1(X0,sK61(X0)) & p104(sK61(X0)) & ~p105(sK61(X0)) & ~p5(sK61(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f143,plain,( 7.17/7.40 ! [X0] : (? [X1] : (p5(X1) & p104(X1) & ~p105(X1) & r1(X0,X1)) => (p5(sK60(X0)) & p104(sK60(X0)) & ~p105(sK60(X0)) & r1(X0,sK60(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f145,plain,( 7.17/7.40 ! [X0] : (~p103(X0) | p104(X0) | ((p5(sK60(X0)) & p104(sK60(X0)) & ~p105(sK60(X0)) & r1(X0,sK60(X0))) & (r1(X0,sK61(X0)) & p104(sK61(X0)) & ~p105(sK61(X0)) & ~p5(sK61(X0)))) | ~sP10(X0))), 7.17/7.40 inference(skolemisation,[status(esa),new_symbols(skolem,[sK60,sK61])],[f142,f144,f143])). 7.17/7.40 7.17/7.40 fof(f378,plain,( 7.17/7.40 ( ! [X0] : (~p103(X0) | p104(X0) | ~p105(sK60(X0)) | ~sP10(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f145])). 7.17/7.40 7.17/7.40 fof(f379,plain,( 7.17/7.40 ( ! [X0] : (~p103(X0) | p104(X0) | p104(sK60(X0)) | ~sP10(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f145])). 7.17/7.40 7.17/7.40 fof(f377,plain,( 7.17/7.40 ( ! [X0] : (~p103(X0) | p104(X0) | r1(X0,sK60(X0)) | ~sP10(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f145])). 7.17/7.40 7.17/7.40 fof(f207,plain,( 7.17/7.40 ( ! [X0] : (sP6(X0) | ~sP41(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f53])). 7.17/7.40 7.17/7.40 fof(f161,plain,( 7.17/7.40 ! [X20] : (~p104(X20) | p105(X20) | (? [X87] : (p105(X87) & ~p106(X87) & p6(X87) & r1(X20,X87)) & ? [X88] : (r1(X20,X88) & ~p6(X88) & p105(X88) & ~p106(X88))) | ~sP6(X20))), 7.17/7.40 inference(nnf_transformation,[],[f15])). 7.17/7.40 7.17/7.40 fof(f162,plain,( 7.17/7.40 ! [X0] : (~p104(X0) | p105(X0) | (? [X1] : (p105(X1) & ~p106(X1) & p6(X1) & r1(X0,X1)) & ? [X2] : (r1(X0,X2) & ~p6(X2) & p105(X2) & ~p106(X2))) | ~sP6(X0))), 7.17/7.40 inference(rectify,[],[f161])). 7.17/7.40 7.17/7.40 fof(f164,plain,( 7.17/7.40 ! [X0] : (? [X2] : (r1(X0,X2) & ~p6(X2) & p105(X2) & ~p106(X2)) => (r1(X0,sK69(X0)) & ~p6(sK69(X0)) & p105(sK69(X0)) & ~p106(sK69(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f163,plain,( 7.17/7.40 ! [X0] : (? [X1] : (p105(X1) & ~p106(X1) & p6(X1) & r1(X0,X1)) => (p105(sK68(X0)) & ~p106(sK68(X0)) & p6(sK68(X0)) & r1(X0,sK68(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f165,plain,( 7.17/7.40 ! [X0] : (~p104(X0) | p105(X0) | ((p105(sK68(X0)) & ~p106(sK68(X0)) & p6(sK68(X0)) & r1(X0,sK68(X0))) & (r1(X0,sK69(X0)) & ~p6(sK69(X0)) & p105(sK69(X0)) & ~p106(sK69(X0)))) | ~sP6(X0))), 7.17/7.40 inference(skolemisation,[status(esa),new_symbols(skolem,[sK68,sK69])],[f162,f164,f163])). 7.17/7.40 7.17/7.40 fof(f409,plain,( 7.17/7.40 ( ! [X0] : (~p104(X0) | p105(X0) | r1(X0,sK68(X0)) | ~sP6(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f165])). 7.17/7.40 7.17/7.40 fof(f206,plain,( 7.17/7.40 ( ! [X0] : (sP5(X0) | ~sP41(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f53])). 7.17/7.40 7.17/7.40 fof(f166,plain,( 7.17/7.40 ! [X20] : (p107(X20) | ~p106(X20) | (? [X89] : (r1(X20,X89) & ~p8(X89) & p107(X89) & ~p108(X89)) & ? [X90] : (r1(X20,X90) & ~p108(X90) & p107(X90) & p8(X90))) | ~sP5(X20))), 7.17/7.40 inference(nnf_transformation,[],[f14])). 7.17/7.40 7.17/7.40 fof(f167,plain,( 7.17/7.40 ! [X0] : (p107(X0) | ~p106(X0) | (? [X1] : (r1(X0,X1) & ~p8(X1) & p107(X1) & ~p108(X1)) & ? [X2] : (r1(X0,X2) & ~p108(X2) & p107(X2) & p8(X2))) | ~sP5(X0))), 7.17/7.40 inference(rectify,[],[f166])). 7.17/7.40 7.17/7.40 fof(f169,plain,( 7.17/7.40 ! [X0] : (? [X2] : (r1(X0,X2) & ~p108(X2) & p107(X2) & p8(X2)) => (r1(X0,sK71(X0)) & ~p108(sK71(X0)) & p107(sK71(X0)) & p8(sK71(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f168,plain,( 7.17/7.40 ! [X0] : (? [X1] : (r1(X0,X1) & ~p8(X1) & p107(X1) & ~p108(X1)) => (r1(X0,sK70(X0)) & ~p8(sK70(X0)) & p107(sK70(X0)) & ~p108(sK70(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f170,plain,( 7.17/7.40 ! [X0] : (p107(X0) | ~p106(X0) | ((r1(X0,sK70(X0)) & ~p8(sK70(X0)) & p107(sK70(X0)) & ~p108(sK70(X0))) & (r1(X0,sK71(X0)) & ~p108(sK71(X0)) & p107(sK71(X0)) & p8(sK71(X0)))) | ~sP5(X0))), 7.17/7.40 inference(skolemisation,[status(esa),new_symbols(skolem,[sK70,sK71])],[f167,f169,f168])). 7.17/7.40 7.17/7.40 fof(f419,plain,( 7.17/7.40 ( ! [X0] : (p107(X0) | ~p106(X0) | ~p8(sK70(X0)) | ~sP5(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f170])). 7.17/7.40 7.17/7.40 fof(f411,plain,( 7.17/7.40 ( ! [X0] : (~p104(X0) | p105(X0) | ~p106(sK68(X0)) | ~sP6(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f165])). 7.17/7.40 7.17/7.40 fof(f412,plain,( 7.17/7.40 ( ! [X0] : (~p104(X0) | p105(X0) | p105(sK68(X0)) | ~sP6(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f165])). 7.17/7.40 7.17/7.40 fof(f253,plain,( 7.17/7.40 ( ! [X0] : (sP11(X0) | ~sP41(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f53])). 7.17/7.40 7.17/7.40 fof(f136,plain,( 7.17/7.40 ! [X20] : ((? [X35] : (p106(X35) & ~p107(X35) & p7(X35) & r1(X20,X35)) & ? [X36] : (r1(X20,X36) & ~p107(X36) & p106(X36) & ~p7(X36))) | ~p105(X20) | p106(X20) | ~sP11(X20))), 7.17/7.40 inference(nnf_transformation,[],[f20])). 7.17/7.40 7.17/7.40 fof(f137,plain,( 7.17/7.40 ! [X0] : ((? [X1] : (p106(X1) & ~p107(X1) & p7(X1) & r1(X0,X1)) & ? [X2] : (r1(X0,X2) & ~p107(X2) & p106(X2) & ~p7(X2))) | ~p105(X0) | p106(X0) | ~sP11(X0))), 7.17/7.40 inference(rectify,[],[f136])). 7.17/7.40 7.17/7.40 fof(f139,plain,( 7.17/7.40 ! [X0] : (? [X2] : (r1(X0,X2) & ~p107(X2) & p106(X2) & ~p7(X2)) => (r1(X0,sK59(X0)) & ~p107(sK59(X0)) & p106(sK59(X0)) & ~p7(sK59(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f138,plain,( 7.17/7.40 ! [X0] : (? [X1] : (p106(X1) & ~p107(X1) & p7(X1) & r1(X0,X1)) => (p106(sK58(X0)) & ~p107(sK58(X0)) & p7(sK58(X0)) & r1(X0,sK58(X0))))), 7.17/7.40 introduced(choice_axiom,[])). 7.17/7.40 7.17/7.40 fof(f140,plain,( 7.17/7.40 ! [X0] : (((p106(sK58(X0)) & ~p107(sK58(X0)) & p7(sK58(X0)) & r1(X0,sK58(X0))) & (r1(X0,sK59(X0)) & ~p107(sK59(X0)) & p106(sK59(X0)) & ~p7(sK59(X0)))) | ~p105(X0) | p106(X0) | ~sP11(X0))), 7.17/7.40 inference(skolemisation,[status(esa),new_symbols(skolem,[sK58,sK59])],[f137,f139,f138])). 7.17/7.40 7.17/7.40 fof(f372,plain,( 7.17/7.40 ( ! [X0] : (p106(sK58(X0)) | ~p105(X0) | p106(X0) | ~sP11(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f140])). 7.17/7.40 7.17/7.40 fof(f371,plain,( 7.17/7.40 ( ! [X0] : (~p107(sK58(X0)) | ~p105(X0) | p106(X0) | ~sP11(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f140])). 7.17/7.40 7.17/7.40 fof(f420,plain,( 7.17/7.40 ( ! [X0] : (p107(X0) | ~p106(X0) | r1(X0,sK70(X0)) | ~sP5(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f170])). 7.17/7.40 7.17/7.40 fof(f369,plain,( 7.17/7.40 ( ! [X0] : (r1(X0,sK58(X0)) | ~p105(X0) | p106(X0) | ~sP11(X0)) )), 7.17/7.40 inference(cnf_transformation,[],[f140])). 7.17/7.40 7.17/7.40 cnf(c_265,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) 7.17/7.40 | ~ r1(X2,X3) 7.17/7.40 | ~ r1(X4,X5) 7.17/7.40 | ~ r1(X5,X6) 7.17/7.40 | ~ r1(X7,X8) 7.17/7.40 | ~ r1(X8,X9) 7.17/7.40 | ~ r1(X10,X11) 7.17/7.40 | ~ r1(X12,X10) 7.17/7.40 | ~ r1(X13,X12) 7.17/7.40 | ~ r1(X14,X13) 7.17/7.40 | ~ r1(X15,X14) 7.17/7.40 | ~ r1(X9,X15) 7.17/7.40 | ~ r1(X16,X7) 7.17/7.40 | ~ r1(X6,X16) 7.17/7.40 | ~ r1(X17,X4) 7.17/7.40 | ~ r1(X18,X17) 7.17/7.40 | ~ r1(X3,X18) 7.17/7.40 | ~ r1(X1,X2) 7.17/7.40 | ~ r1(X19,X0) 7.17/7.40 | ~ r1(sK82,X19) 7.17/7.40 | p8(X11) ), 7.17/7.40 inference(cnf_transformation,[],[f461]) ). 7.17/7.40 7.17/7.40 cnf(c_4582,negated_conjecture, 7.17/7.40 ( sP4_iProver_split(X0,X1) 7.17/7.40 | ~ r1(X0,X2) 7.17/7.40 | ~ sP5_iProver_split(X1,X2) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP5_iProver_split])], 7.17/7.40 [c_265]) ). 7.17/7.40 7.17/7.40 cnf(c_182451,plain, 7.17/7.40 ( ~ sP5_iProver_split(X0,sK67(sK82)) 7.17/7.40 | sP4_iProver_split(X1,X0) 7.17/7.40 | ~ r1(X1,sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4582]) ). 7.17/7.40 7.17/7.40 cnf(c_182452,plain, 7.17/7.40 ( ~ sP5_iProver_split(sK82,sK67(sK82)) 7.17/7.40 | sP4_iProver_split(sK82,sK82) 7.17/7.40 | ~ r1(sK82,sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_182451]) ). 7.17/7.40 7.17/7.40 cnf(c_4587,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | sP9_iProver_split(X1) | ~ sP10_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP10_iProver_split])], 7.17/7.40 [c_265]) ). 7.17/7.40 7.17/7.40 cnf(c_158714,plain, 7.17/7.40 ( ~ r1(X0,sK63(sK65(sK67(sK82)))) 7.17/7.40 | ~ sP10_iProver_split(X0) 7.17/7.40 | sP9_iProver_split(sK63(sK65(sK67(sK82)))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4587]) ). 7.17/7.40 7.17/7.40 cnf(c_161552,plain, 7.17/7.40 ( ~ r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) 7.17/7.40 | ~ sP10_iProver_split(sK65(sK67(sK82))) 7.17/7.40 | sP9_iProver_split(sK63(sK65(sK67(sK82)))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_158714]) ). 7.17/7.40 7.17/7.40 cnf(c_264,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) 7.17/7.40 | ~ r1(X2,X3) 7.17/7.40 | ~ r1(X4,X5) 7.17/7.40 | ~ r1(X5,X6) 7.17/7.40 | ~ r1(X6,X7) 7.17/7.40 | ~ r1(X8,X9) 7.17/7.40 | ~ r1(X9,X10) 7.17/7.40 | ~ r1(X10,X11) 7.17/7.40 | ~ r1(X7,X8) 7.17/7.40 | ~ r1(X12,X4) 7.17/7.40 | ~ r1(X13,X12) 7.17/7.40 | ~ r1(X14,X13) 7.17/7.40 | ~ r1(X3,X14) 7.17/7.40 | ~ r1(X15,X2) 7.17/7.40 | ~ r1(X16,X15) 7.17/7.40 | ~ r1(X17,X16) 7.17/7.40 | ~ r1(X1,X17) 7.17/7.40 | ~ r1(X18,X0) 7.17/7.40 | ~ r1(X19,X18) 7.17/7.40 | ~ r1(sK82,X19) 7.17/7.40 | sP41(X11) ), 7.17/7.40 inference(cnf_transformation,[],[f462]) ). 7.17/7.40 7.17/7.40 cnf(c_267,plain, 7.17/7.40 ( ~ r1(sK82,sK82) | sP41(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_263,negated_conjecture, 7.17/7.40 ( p100(sK82) ), 7.17/7.40 inference(cnf_transformation,[],[f463]) ). 7.17/7.40 7.17/7.40 cnf(c_262,negated_conjecture, 7.17/7.40 ( ~ p101(sK82) ), 7.17/7.40 inference(cnf_transformation,[],[f464]) ). 7.17/7.40 7.17/7.40 cnf(c_204,plain, 7.17/7.40 ( ~ sP7(X0) | ~ p100(X0) | p101(X0) | p101(sK67(X0)) ), 7.17/7.40 inference(cnf_transformation,[],[f398]) ). 7.17/7.40 7.17/7.40 cnf(c_325,plain, 7.17/7.40 ( ~ sP7(sK82) | ~ p100(sK82) | p101(sK67(sK82)) | p101(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_204]) ). 7.17/7.40 7.17/7.40 cnf(c_203,plain, 7.17/7.40 ( ~ sP7(X0) | ~ p100(X0) | ~ p102(sK67(X0)) | p101(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f399]) ). 7.17/7.40 7.17/7.40 cnf(c_326,plain, 7.17/7.40 ( ~ sP7(sK82) | ~ p100(sK82) | ~ p102(sK67(sK82)) | p101(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_203]) ). 7.17/7.40 7.17/7.40 cnf(c_202,plain, 7.17/7.40 ( r1(X0,sK67(X0)) | ~ sP7(X0) | ~ p100(X0) | p101(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f400]) ). 7.17/7.40 7.17/7.40 cnf(c_327,plain, 7.17/7.40 ( r1(sK82,sK67(sK82)) | ~ sP7(sK82) | ~ p100(sK82) | p101(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_202]) ). 7.17/7.40 7.17/7.40 cnf(c_53,plain, 7.17/7.40 ( sP7(X0) | ~ sP41(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f208]) ). 7.17/7.40 7.17/7.40 cnf(c_426,plain, 7.17/7.40 ( sP7(sK82) | ~ sP41(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_53]) ). 7.17/7.40 7.17/7.40 cnf(c_0,plain,( r1(X0,X0) ),inference(cnf_transformation,[],[f199]) ). 7.17/7.40 7.17/7.40 cnf(c_478,plain, 7.17/7.40 ( r1(sK82,sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_0]) ). 7.17/7.40 7.17/7.40 cnf(c_4583,negated_conjecture, 7.17/7.40 ( sP5_iProver_split(X0,X1) 7.17/7.40 | ~ r1(X1,X2) 7.17/7.40 | ~ sP6_iProver_split(X0,X2) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP6_iProver_split])], 7.17/7.40 [c_265]) ). 7.17/7.40 7.17/7.40 cnf(c_4674,plain, 7.17/7.40 ( ~ sP6_iProver_split(sK82,sK82) 7.17/7.40 | sP5_iProver_split(sK82,sK82) 7.17/7.40 | ~ r1(sK82,sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4583]) ). 7.17/7.40 7.17/7.40 cnf(c_4675,plain, 7.17/7.40 ( ~ sP5_iProver_split(sK82,sK82) 7.17/7.40 | sP4_iProver_split(sK82,sK82) 7.17/7.40 | ~ r1(sK82,sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4582]) ). 7.17/7.40 7.17/7.40 cnf(c_4581,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | ~ r1(X2,X0) | ~ sP4_iProver_split(X1,X2) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP4_iProver_split])], 7.17/7.40 [c_265]) ). 7.17/7.40 7.17/7.40 cnf(c_4676,plain, 7.17/7.40 ( ~ sP4_iProver_split(sK82,sK82) | ~ r1(sK82,sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4581]) ). 7.17/7.40 7.17/7.40 cnf(c_4624,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | ~ r1(sK82,X0) | sP24_iProver_split(X1) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4682,plain, 7.17/7.40 ( ~ r1(sK82,sK82) | sP24_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4624]) ). 7.17/7.40 7.17/7.40 cnf(c_4623,negated_conjecture, 7.17/7.40 ( sP5_iProver_split(X0,X1) 7.17/7.40 | sP23_iProver_split(X1) 7.17/7.40 | ~ sP24_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP24_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4683,plain, 7.17/7.40 ( sP5_iProver_split(sK82,sK82) 7.17/7.40 | ~ sP24_iProver_split(sK82) 7.17/7.40 | sP23_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4623]) ). 7.17/7.40 7.17/7.40 cnf(c_4622,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | sP22_iProver_split(X1) | ~ sP23_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP23_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4684,plain, 7.17/7.40 ( ~ r1(sK82,sK82) 7.17/7.40 | ~ sP23_iProver_split(sK82) 7.17/7.40 | sP22_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4622]) ). 7.17/7.40 7.17/7.40 cnf(c_4621,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | sP21_iProver_split(X1) | ~ sP22_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP22_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4685,plain, 7.17/7.40 ( ~ r1(sK82,sK82) 7.17/7.40 | ~ sP22_iProver_split(sK82) 7.17/7.40 | sP21_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4621]) ). 7.17/7.40 7.17/7.40 cnf(c_4620,negated_conjecture, 7.17/7.40 ( sP5_iProver_split(X0,X1) 7.17/7.40 | sP20_iProver_split(X1) 7.17/7.40 | ~ sP21_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP21_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4686,plain, 7.17/7.40 ( sP5_iProver_split(sK82,sK82) 7.17/7.40 | ~ sP21_iProver_split(sK82) 7.17/7.40 | sP20_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4620]) ). 7.17/7.40 7.17/7.40 cnf(c_4619,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | sP19_iProver_split(X1) | ~ sP20_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP20_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4687,plain, 7.17/7.40 ( ~ r1(sK82,sK82) 7.17/7.40 | ~ sP20_iProver_split(sK82) 7.17/7.40 | sP19_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4619]) ). 7.17/7.40 7.17/7.40 cnf(c_4618,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | sP18_iProver_split(X1) | ~ sP19_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP19_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4688,plain, 7.17/7.40 ( ~ r1(sK82,sK82) 7.17/7.40 | ~ sP19_iProver_split(sK82) 7.17/7.40 | sP18_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4618]) ). 7.17/7.40 7.17/7.40 cnf(c_4617,negated_conjecture, 7.17/7.40 ( sP17_iProver_split(X0,X1) 7.17/7.40 | ~ r1(X1,X2) 7.17/7.40 | sP41(X2) 7.17/7.40 | ~ sP18_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP18_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4632,negated_conjecture, 7.17/7.40 ( sP17_iProver_split(X0,X1) 7.17/7.40 | ~ sP18_iProver_split(X0) 7.17/7.40 | ~ sP25_iProver_split(X1) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP25_iProver_split])], 7.17/7.40 [c_4617]) ). 7.17/7.40 7.17/7.40 cnf(c_4689,plain, 7.17/7.40 ( sP17_iProver_split(sK82,sK82) 7.17/7.40 | ~ sP25_iProver_split(sK82) 7.17/7.40 | ~ sP18_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4632]) ). 7.17/7.40 7.17/7.40 cnf(c_4616,negated_conjecture, 7.17/7.40 ( sP16_iProver_split(X0,X1) 7.17/7.40 | ~ r1(X1,X2) 7.17/7.40 | ~ sP17_iProver_split(X0,X2) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP17_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4690,plain, 7.17/7.40 ( ~ sP17_iProver_split(sK82,sK82) 7.17/7.40 | sP16_iProver_split(sK82,sK82) 7.17/7.40 | ~ r1(sK82,sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4616]) ). 7.17/7.40 7.17/7.40 cnf(c_4615,negated_conjecture, 7.17/7.40 ( sP15_iProver_split(X0,X1) 7.17/7.40 | ~ r1(X1,X2) 7.17/7.40 | ~ sP16_iProver_split(X0,X2) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP16_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4691,plain, 7.17/7.40 ( ~ sP16_iProver_split(sK82,sK82) 7.17/7.40 | sP15_iProver_split(sK82,sK82) 7.17/7.40 | ~ r1(sK82,sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4615]) ). 7.17/7.40 7.17/7.40 cnf(c_4614,negated_conjecture, 7.17/7.40 ( sP6_iProver_split(X0,X1) 7.17/7.40 | ~ r1(X1,X2) 7.17/7.40 | ~ sP15_iProver_split(X0,X2) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP15_iProver_split])], 7.17/7.40 [c_264]) ). 7.17/7.40 7.17/7.40 cnf(c_4692,plain, 7.17/7.40 ( ~ sP15_iProver_split(sK82,sK82) 7.17/7.40 | sP6_iProver_split(sK82,sK82) 7.17/7.40 | ~ r1(sK82,sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4614]) ). 7.17/7.40 7.17/7.40 cnf(c_11,plain, 7.17/7.40 ( sP8(X0) | ~ sP41(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f250]) ). 7.17/7.40 7.17/7.40 cnf(c_196,plain, 7.17/7.40 ( p102(X0) | ~ p101(X0) | ~ p103(sK65(X0)) | ~ sP8(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f390]) ). 7.17/7.40 7.17/7.40 cnf(c_3040,plain, 7.17/7.40 ( p102(X0) | ~ p101(X0) | ~ p103(sK65(X0)) | ~ sP41(X0) ), 7.17/7.40 inference(resolution,[status(thm)],[c_11,c_196]) ). 7.17/7.40 7.17/7.40 cnf(c_4693,plain, 7.17/7.40 ( p102(sK67(sK82)) 7.17/7.40 | ~ p101(sK67(sK82)) 7.17/7.40 | ~ p103(sK65(sK67(sK82))) 7.17/7.40 | ~ sP41(sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_3040]) ). 7.17/7.40 7.17/7.40 cnf(c_195,plain, 7.17/7.40 ( p102(X0) | p102(sK65(X0)) | ~ p101(X0) | ~ sP8(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f391]) ). 7.17/7.40 7.17/7.40 cnf(c_3053,plain, 7.17/7.40 ( p102(X0) | p102(sK65(X0)) | ~ p101(X0) | ~ sP41(X0) ), 7.17/7.40 inference(resolution,[status(thm)],[c_11,c_195]) ). 7.17/7.40 7.17/7.40 cnf(c_4695,plain, 7.17/7.40 ( p102(sK67(sK82)) 7.17/7.40 | p102(sK65(sK67(sK82))) 7.17/7.40 | ~ p101(sK67(sK82)) 7.17/7.40 | ~ sP41(sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_3053]) ). 7.17/7.40 7.17/7.40 cnf(c_197,plain, 7.17/7.40 ( r1(X0,sK65(X0)) | p102(X0) | ~ p101(X0) | ~ sP8(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f389]) ). 7.17/7.40 7.17/7.40 cnf(c_3027,plain, 7.17/7.40 ( r1(X0,sK65(X0)) | p102(X0) | ~ p101(X0) | ~ sP41(X0) ), 7.17/7.40 inference(resolution,[status(thm)],[c_11,c_197]) ). 7.17/7.40 7.17/7.40 cnf(c_4705,plain, 7.17/7.40 ( r1(sK67(sK82),sK65(sK67(sK82))) 7.17/7.40 | p102(sK67(sK82)) 7.17/7.40 | ~ p101(sK67(sK82)) 7.17/7.40 | ~ sP41(sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_3027]) ). 7.17/7.40 7.17/7.40 cnf(c_4633,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | sP25_iProver_split(X0) | sP41(X1) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[])], 7.17/7.40 [c_4617]) ). 7.17/7.40 7.17/7.40 cnf(c_4711,plain, 7.17/7.40 ( ~ r1(X0,sK67(sK82)) | sP25_iProver_split(X0) | sP41(sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4633]) ). 7.17/7.40 7.17/7.40 cnf(c_4712,plain, 7.17/7.40 ( ~ r1(sK82,sK67(sK82)) 7.17/7.40 | sP25_iProver_split(sK82) 7.17/7.40 | sP41(sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4711]) ). 7.17/7.40 7.17/7.40 cnf(c_10,plain, 7.17/7.40 ( sP9(X0) | ~ sP41(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f251]) ). 7.17/7.40 7.17/7.40 cnf(c_189,plain, 7.17/7.40 ( r1(X0,sK63(X0)) | ~ p102(X0) | p103(X0) | ~ sP9(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f381]) ). 7.17/7.40 7.17/7.40 cnf(c_2883,plain, 7.17/7.40 ( r1(X0,sK63(X0)) | ~ p102(X0) | p103(X0) | ~ sP41(X0) ), 7.17/7.40 inference(resolution,[status(thm)],[c_10,c_189]) ). 7.17/7.40 7.17/7.40 cnf(c_4733,plain, 7.17/7.40 ( r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) 7.17/7.40 | ~ p102(sK65(sK67(sK82))) 7.17/7.40 | p103(sK65(sK67(sK82))) 7.17/7.40 | ~ sP41(sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_2883]) ). 7.17/7.40 7.17/7.40 cnf(c_4778,plain, 7.17/7.40 ( ~ r1(X0,sK65(sK67(sK82))) 7.17/7.40 | sP25_iProver_split(X0) 7.17/7.40 | sP41(sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4633]) ). 7.17/7.40 7.17/7.40 cnf(c_4830,plain, 7.17/7.40 ( ~ r1(sK67(sK82),sK65(sK67(sK82))) 7.17/7.40 | sP25_iProver_split(sK67(sK82)) 7.17/7.40 | sP41(sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4778]) ). 7.17/7.40 7.17/7.40 cnf(c_4851,plain, 7.17/7.40 ( sP17_iProver_split(X0,sK67(sK82)) 7.17/7.40 | ~ sP25_iProver_split(sK67(sK82)) 7.17/7.40 | ~ sP18_iProver_split(X0) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4632]) ). 7.17/7.40 7.17/7.40 cnf(c_4852,plain, 7.17/7.40 ( sP17_iProver_split(sK82,sK67(sK82)) 7.17/7.40 | ~ sP25_iProver_split(sK67(sK82)) 7.17/7.40 | ~ sP18_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4851]) ). 7.17/7.40 7.17/7.40 cnf(c_4868,plain, 7.17/7.40 ( ~ sP17_iProver_split(X0,sK67(sK82)) 7.17/7.40 | sP16_iProver_split(X0,X1) 7.17/7.40 | ~ r1(X1,sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4616]) ). 7.17/7.40 7.17/7.40 cnf(c_4869,plain, 7.17/7.40 ( ~ sP17_iProver_split(sK82,sK67(sK82)) 7.17/7.40 | sP16_iProver_split(sK82,sK82) 7.17/7.40 | ~ r1(sK82,sK67(sK82)) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4868]) ). 7.17/7.40 7.17/7.40 cnf(c_174170,plain, 7.17/7.40 ( ~ sP10_iProver_split(sK65(sK67(sK82))) 7.17/7.40 | sP9_iProver_split(sK63(sK65(sK67(sK82)))) ), 7.17/7.40 inference(global_propositional_subsumption, 7.17/7.40 [status(thm)], 7.17/7.40 [c_161552,c_267,c_263,c_262,c_325,c_326,c_327,c_426, 7.17/7.40 c_478,c_4674,c_4675,c_4676,c_4682,c_4683,c_4684,c_4685, 7.17/7.40 c_4686,c_4687,c_4688,c_4689,c_4690,c_4691,c_4692,c_4693, 7.17/7.40 c_4695,c_4705,c_4712,c_4733,c_4830,c_4852,c_4869]) ). 7.17/7.40 7.17/7.40 cnf(c_4588,negated_conjecture, 7.17/7.40 ( sP6_iProver_split(X0,X1) 7.17/7.40 | sP10_iProver_split(X1) 7.17/7.40 | ~ sP11_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP11_iProver_split])], 7.17/7.40 [c_265]) ). 7.17/7.40 7.17/7.40 cnf(c_173792,plain, 7.17/7.40 ( sP6_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.40 | ~ sP11_iProver_split(X0) 7.17/7.40 | sP10_iProver_split(sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4588]) ). 7.17/7.40 7.17/7.40 cnf(c_173793,plain, 7.17/7.40 ( sP6_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.40 | ~ sP11_iProver_split(sK82) 7.17/7.40 | sP10_iProver_split(sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_173792]) ). 7.17/7.40 7.17/7.40 cnf(c_4586,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | sP8_iProver_split(X1) | ~ sP9_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP9_iProver_split])], 7.17/7.40 [c_265]) ). 7.17/7.40 7.17/7.40 cnf(c_162348,plain, 7.17/7.40 ( ~ r1(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.40 | ~ sP9_iProver_split(X0) 7.17/7.40 | sP8_iProver_split(sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4586]) ). 7.17/7.40 7.17/7.40 cnf(c_173232,plain, 7.17/7.40 ( ~ r1(sK63(sK65(sK67(sK82))),sK60(sK63(sK65(sK67(sK82))))) 7.17/7.40 | ~ sP9_iProver_split(sK63(sK65(sK67(sK82)))) 7.17/7.40 | sP8_iProver_split(sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_162348]) ). 7.17/7.40 7.17/7.40 cnf(c_4585,negated_conjecture, 7.17/7.40 ( ~ r1(X0,X1) | sP7_iProver_split(X1) | ~ sP8_iProver_split(X0) ), 7.17/7.40 inference(splitting, 7.17/7.40 [splitting(split),new_symbols(definition,[sP8_iProver_split])], 7.17/7.40 [c_265]) ). 7.17/7.40 7.17/7.40 cnf(c_153026,plain, 7.17/7.40 ( ~ r1(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.40 | ~ sP8_iProver_split(X0) 7.17/7.40 | sP7_iProver_split(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4585]) ). 7.17/7.40 7.17/7.40 cnf(c_158327,plain, 7.17/7.40 ( ~ r1(sK60(sK63(sK65(sK67(sK82)))),sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.40 | ~ sP8_iProver_split(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.40 | sP7_iProver_split(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_153026]) ). 7.17/7.40 7.17/7.40 cnf(c_188,plain, 7.17/7.40 ( ~ p102(X0) | p103(X0) | p103(sK63(X0)) | ~ sP9(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f382]) ). 7.17/7.40 7.17/7.40 cnf(c_2897,plain, 7.17/7.40 ( ~ p102(X0) | p103(X0) | p103(sK63(X0)) | ~ sP41(X0) ), 7.17/7.40 inference(resolution,[status(thm)],[c_10,c_188]) ). 7.17/7.40 7.17/7.40 cnf(c_4739,plain, 7.17/7.40 ( ~ p102(sK65(sK67(sK82))) 7.17/7.40 | p103(sK65(sK67(sK82))) 7.17/7.40 | p103(sK63(sK65(sK67(sK82)))) 7.17/7.40 | ~ sP41(sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_2897]) ). 7.17/7.40 7.17/7.40 cnf(c_187,plain, 7.17/7.40 ( ~ p102(X0) | p103(X0) | ~ p104(sK63(X0)) | ~ sP9(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f383]) ). 7.17/7.40 7.17/7.40 cnf(c_2911,plain, 7.17/7.40 ( ~ p102(X0) | p103(X0) | ~ p104(sK63(X0)) | ~ sP41(X0) ), 7.17/7.40 inference(resolution,[status(thm)],[c_10,c_187]) ). 7.17/7.40 7.17/7.40 cnf(c_4738,plain, 7.17/7.40 ( ~ p102(sK65(sK67(sK82))) 7.17/7.40 | p103(sK65(sK67(sK82))) 7.17/7.40 | ~ p104(sK63(sK65(sK67(sK82)))) 7.17/7.40 | ~ sP41(sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_2911]) ). 7.17/7.40 7.17/7.40 cnf(c_4848,plain, 7.17/7.40 ( sP17_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.40 | ~ sP25_iProver_split(sK65(sK67(sK82))) 7.17/7.40 | ~ sP18_iProver_split(X0) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4632]) ). 7.17/7.40 7.17/7.40 cnf(c_4849,plain, 7.17/7.40 ( sP17_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.40 | ~ sP25_iProver_split(sK65(sK67(sK82))) 7.17/7.40 | ~ sP18_iProver_split(sK82) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4848]) ). 7.17/7.40 7.17/7.40 cnf(c_4866,plain, 7.17/7.40 ( ~ sP17_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.40 | sP16_iProver_split(X0,X1) 7.17/7.40 | ~ r1(X1,sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4616]) ). 7.17/7.40 7.17/7.40 cnf(c_4880,plain, 7.17/7.40 ( ~ sP17_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.40 | sP16_iProver_split(X0,sK67(sK82)) 7.17/7.40 | ~ r1(sK67(sK82),sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4866]) ). 7.17/7.40 7.17/7.40 cnf(c_4881,plain, 7.17/7.40 ( ~ sP17_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.40 | sP16_iProver_split(sK82,sK67(sK82)) 7.17/7.40 | ~ r1(sK67(sK82),sK65(sK67(sK82))) ), 7.17/7.40 inference(instantiation,[status(thm)],[c_4880]) ). 7.17/7.40 7.17/7.40 cnf(c_9,plain, 7.17/7.40 ( sP10(X0) | ~ sP41(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f252]) ). 7.17/7.40 7.17/7.40 cnf(c_176,plain, 7.17/7.40 ( ~ p103(X0) | p104(X0) | ~ p105(sK60(X0)) | ~ sP10(X0) ), 7.17/7.40 inference(cnf_transformation,[],[f378]) ). 7.17/7.40 7.17/7.41 cnf(c_2809,plain, 7.17/7.41 ( ~ p103(X0) | p104(X0) | ~ p105(sK60(X0)) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_9,c_176]) ). 7.17/7.41 7.17/7.41 cnf(c_4921,plain, 7.17/7.41 ( ~ p103(sK63(sK65(sK67(sK82)))) 7.17/7.41 | p104(sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ p105(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP41(sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_2809]) ). 7.17/7.41 7.17/7.41 cnf(c_175,plain, 7.17/7.41 ( ~ p103(X0) | p104(X0) | p104(sK60(X0)) | ~ sP10(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f379]) ). 7.17/7.41 7.17/7.41 cnf(c_2823,plain, 7.17/7.41 ( ~ p103(X0) | p104(X0) | p104(sK60(X0)) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_9,c_175]) ). 7.17/7.41 7.17/7.41 cnf(c_4920,plain, 7.17/7.41 ( ~ p103(sK63(sK65(sK67(sK82)))) 7.17/7.41 | p104(sK63(sK65(sK67(sK82)))) 7.17/7.41 | p104(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP41(sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_2823]) ). 7.17/7.41 7.17/7.41 cnf(c_177,plain, 7.17/7.41 ( r1(X0,sK60(X0)) | ~ p103(X0) | p104(X0) | ~ sP10(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f377]) ). 7.17/7.41 7.17/7.41 cnf(c_2795,plain, 7.17/7.41 ( r1(X0,sK60(X0)) | ~ p103(X0) | p104(X0) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_9,c_177]) ). 7.17/7.41 7.17/7.41 cnf(c_4917,plain, 7.17/7.41 ( r1(sK63(sK65(sK67(sK82))),sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ p103(sK63(sK65(sK67(sK82)))) 7.17/7.41 | p104(sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ sP41(sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_2795]) ). 7.17/7.41 7.17/7.41 cnf(c_5040,plain, 7.17/7.41 ( ~ r1(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP25_iProver_split(X0) 7.17/7.41 | sP41(sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4633]) ). 7.17/7.41 7.17/7.41 cnf(c_5559,plain, 7.17/7.41 ( ~ r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP25_iProver_split(sK65(sK67(sK82))) 7.17/7.41 | sP41(sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_5040]) ). 7.17/7.41 7.17/7.41 cnf(c_54,plain, 7.17/7.41 ( sP6(X0) | ~ sP41(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f207]) ). 7.17/7.41 7.17/7.41 cnf(c_209,plain, 7.17/7.41 ( r1(X0,sK68(X0)) | ~ sP6(X0) | ~ p104(X0) | p105(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f409]) ). 7.17/7.41 7.17/7.41 cnf(c_3363,plain, 7.17/7.41 ( r1(X0,sK68(X0)) | ~ p104(X0) | p105(X0) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_54,c_209]) ). 7.17/7.41 7.17/7.41 cnf(c_5728,plain, 7.17/7.41 ( r1(sK60(sK63(sK65(sK67(sK82)))),sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | ~ p104(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | p105(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP41(sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_3363]) ). 7.17/7.41 7.17/7.41 cnf(c_6111,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK67(sK82)) 7.17/7.41 | sP15_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK67(sK82)) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4615]) ). 7.17/7.41 7.17/7.41 cnf(c_6112,plain, 7.17/7.41 ( ~ sP16_iProver_split(sK82,sK67(sK82)) 7.17/7.41 | sP15_iProver_split(sK82,sK82) 7.17/7.41 | ~ r1(sK82,sK67(sK82)) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_6111]) ). 7.17/7.41 7.17/7.41 cnf(c_6744,plain, 7.17/7.41 ( ~ r1(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP25_iProver_split(X0) 7.17/7.41 | sP41(sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4633]) ). 7.17/7.41 7.17/7.41 cnf(c_7548,plain, 7.17/7.41 ( ~ r1(sK63(sK65(sK67(sK82))),sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP25_iProver_split(sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP41(sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_6744]) ). 7.17/7.41 7.17/7.41 cnf(c_6113,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | sP15_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4615]) ). 7.17/7.41 7.17/7.41 cnf(c_7628,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | sP15_iProver_split(X0,sK67(sK82)) 7.17/7.41 | ~ r1(sK67(sK82),sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_6113]) ). 7.17/7.41 7.17/7.41 cnf(c_7629,plain, 7.17/7.41 ( ~ sP16_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.41 | sP15_iProver_split(sK82,sK67(sK82)) 7.17/7.41 | ~ r1(sK67(sK82),sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_7628]) ). 7.17/7.41 7.17/7.41 cnf(c_8272,plain, 7.17/7.41 ( sP17_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ sP25_iProver_split(sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ sP18_iProver_split(X0) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4632]) ). 7.17/7.41 7.17/7.41 cnf(c_8273,plain, 7.17/7.41 ( sP17_iProver_split(sK82,sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ sP25_iProver_split(sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ sP18_iProver_split(sK82) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_8272]) ). 7.17/7.41 7.17/7.41 cnf(c_9897,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP16_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4616]) ). 7.17/7.41 7.17/7.41 cnf(c_9933,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP16_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | ~ r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_9897]) ). 7.17/7.41 7.17/7.41 cnf(c_9934,plain, 7.17/7.41 ( ~ sP17_iProver_split(sK82,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP16_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.41 | ~ r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_9933]) ). 7.17/7.41 7.17/7.41 cnf(c_9957,plain, 7.17/7.41 ( ~ sP15_iProver_split(X0,sK67(sK82)) 7.17/7.41 | sP6_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK67(sK82)) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4614]) ). 7.17/7.41 7.17/7.41 cnf(c_9958,plain, 7.17/7.41 ( ~ sP15_iProver_split(sK82,sK67(sK82)) 7.17/7.41 | sP6_iProver_split(sK82,sK82) 7.17/7.41 | ~ r1(sK82,sK67(sK82)) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_9957]) ). 7.17/7.41 7.17/7.41 cnf(c_162346,plain, 7.17/7.41 ( ~ sP8_iProver_split(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP7_iProver_split(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(global_propositional_subsumption, 7.17/7.41 [status(thm)], 7.17/7.41 [c_158327,c_267,c_263,c_262,c_325,c_326,c_327,c_426, 7.17/7.41 c_478,c_4674,c_4675,c_4676,c_4682,c_4683,c_4684,c_4685, 7.17/7.41 c_4686,c_4687,c_4688,c_4689,c_4690,c_4691,c_4692,c_4693, 7.17/7.41 c_4695,c_4705,c_4712,c_4739,c_4738,c_4733,c_4830,c_4849, 7.17/7.41 c_4852,c_4869,c_4881,c_4921,c_4920,c_4917,c_5559,c_5728, 7.17/7.41 c_6112,c_7548,c_7629,c_8273,c_9934,c_9958]) ). 7.17/7.41 7.17/7.41 cnf(c_142466,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP15_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4615]) ). 7.17/7.41 7.17/7.41 cnf(c_145254,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP15_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ r1(sK63(sK65(sK67(sK82))),sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_142466]) ). 7.17/7.41 7.17/7.41 cnf(c_77967,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP15_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4615]) ). 7.17/7.41 7.17/7.41 cnf(c_87998,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP15_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ r1(sK63(sK65(sK67(sK82))),sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_77967]) ). 7.17/7.41 7.17/7.41 cnf(c_153206,plain, 7.17/7.41 ( sP15_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(global_propositional_subsumption, 7.17/7.41 [status(thm)], 7.17/7.41 [c_145254,c_267,c_263,c_262,c_325,c_326,c_327,c_426, 7.17/7.41 c_478,c_4674,c_4675,c_4676,c_4682,c_4683,c_4684,c_4685, 7.17/7.41 c_4686,c_4687,c_4688,c_4689,c_4690,c_4691,c_4692,c_4693, 7.17/7.41 c_4695,c_4705,c_4712,c_4739,c_4738,c_4733,c_4830,c_4849, 7.17/7.41 c_4852,c_4869,c_4881,c_4917,c_5559,c_6112,c_87998]) ). 7.17/7.41 7.17/7.41 cnf(c_153207,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP15_iProver_split(X0,sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(renaming,[status(thm)],[c_153206]) ). 7.17/7.41 7.17/7.41 cnf(c_153208,plain, 7.17/7.41 ( ~ sP16_iProver_split(sK82,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP15_iProver_split(sK82,sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_153207]) ). 7.17/7.41 7.17/7.41 cnf(c_129537,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP16_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4616]) ). 7.17/7.41 7.17/7.41 cnf(c_137550,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ r1(sK60(sK63(sK65(sK67(sK82)))),sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_129537]) ). 7.17/7.41 7.17/7.41 cnf(c_40253,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP16_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4616]) ). 7.17/7.41 7.17/7.41 cnf(c_41163,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ r1(sK60(sK63(sK65(sK67(sK82)))),sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_40253]) ). 7.17/7.41 7.17/7.41 cnf(c_142463,plain, 7.17/7.41 ( sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP17_iProver_split(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(global_propositional_subsumption, 7.17/7.41 [status(thm)], 7.17/7.41 [c_137550,c_267,c_263,c_262,c_325,c_326,c_327,c_426, 7.17/7.41 c_478,c_4674,c_4675,c_4676,c_4682,c_4683,c_4684,c_4685, 7.17/7.41 c_4686,c_4687,c_4688,c_4689,c_4690,c_4691,c_4692,c_4693, 7.17/7.41 c_4695,c_4705,c_4712,c_4739,c_4738,c_4733,c_4830,c_4849, 7.17/7.41 c_4852,c_4869,c_4881,c_4921,c_4920,c_4917,c_5559,c_5728, 7.17/7.41 c_6112,c_7548,c_7629,c_8273,c_9934,c_9958,c_41163]) ). 7.17/7.41 7.17/7.41 cnf(c_142464,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP16_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(renaming,[status(thm)],[c_142463]) ). 7.17/7.41 7.17/7.41 cnf(c_142465,plain, 7.17/7.41 ( ~ sP17_iProver_split(sK82,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP16_iProver_split(sK82,sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_142464]) ). 7.17/7.41 7.17/7.41 cnf(c_55,plain, 7.17/7.41 ( sP5(X0) | ~ sP41(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f206]) ). 7.17/7.41 7.17/7.41 cnf(c_215,plain, 7.17/7.41 ( ~ p8(sK70(X0)) | ~ sP5(X0) | ~ p106(X0) | p107(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f419]) ). 7.17/7.41 7.17/7.41 cnf(c_3535,plain, 7.17/7.41 ( ~ p8(sK70(X0)) | ~ p106(X0) | p107(X0) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_55,c_215]) ). 7.17/7.41 7.17/7.41 cnf(c_100022,plain, 7.17/7.41 ( ~ p8(sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) 7.17/7.41 | ~ p106(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | p107(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ sP41(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_3535]) ). 7.17/7.41 7.17/7.41 cnf(c_207,plain, 7.17/7.41 ( ~ sP6(X0) | ~ p104(X0) | p105(X0) | ~ p106(sK68(X0)) ), 7.17/7.41 inference(cnf_transformation,[],[f411]) ). 7.17/7.41 7.17/7.41 cnf(c_3391,plain, 7.17/7.41 ( ~ p104(X0) | p105(X0) | ~ p106(sK68(X0)) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_54,c_207]) ). 7.17/7.41 7.17/7.41 cnf(c_5731,plain, 7.17/7.41 ( ~ p104(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | p105(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ p106(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | ~ sP41(sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_3391]) ). 7.17/7.41 7.17/7.41 cnf(c_206,plain, 7.17/7.41 ( ~ sP6(X0) | ~ p104(X0) | p105(X0) | p105(sK68(X0)) ), 7.17/7.41 inference(cnf_transformation,[],[f412]) ). 7.17/7.41 7.17/7.41 cnf(c_3405,plain, 7.17/7.41 ( ~ p104(X0) | p105(X0) | p105(sK68(X0)) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_54,c_206]) ). 7.17/7.41 7.17/7.41 cnf(c_5730,plain, 7.17/7.41 ( ~ p104(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | p105(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | p105(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP41(sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_3405]) ). 7.17/7.41 7.17/7.41 cnf(c_8,plain, 7.17/7.41 ( sP11(X0) | ~ sP41(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f253]) ). 7.17/7.41 7.17/7.41 cnf(c_166,plain, 7.17/7.41 ( ~ p105(X0) | p106(X0) | p106(sK58(X0)) | ~ sP11(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f372]) ). 7.17/7.41 7.17/7.41 cnf(c_2693,plain, 7.17/7.41 ( ~ p105(X0) | p106(X0) | p106(sK58(X0)) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_8,c_166]) ). 7.17/7.41 7.17/7.41 cnf(c_8543,plain, 7.17/7.41 ( ~ p105(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | p106(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | p106(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ sP41(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_2693]) ). 7.17/7.41 7.17/7.41 cnf(c_167,plain, 7.17/7.41 ( ~ p105(X0) | p106(X0) | ~ p107(sK58(X0)) | ~ sP11(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f371]) ). 7.17/7.41 7.17/7.41 cnf(c_2679,plain, 7.17/7.41 ( ~ p105(X0) | p106(X0) | ~ p107(sK58(X0)) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_8,c_167]) ). 7.17/7.41 7.17/7.41 cnf(c_8542,plain, 7.17/7.41 ( ~ p105(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | p106(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | ~ p107(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ sP41(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_2679]) ). 7.17/7.41 7.17/7.41 cnf(c_10069,plain, 7.17/7.41 ( sP17_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP25_iProver_split(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP18_iProver_split(X0) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4632]) ). 7.17/7.41 7.17/7.41 cnf(c_10070,plain, 7.17/7.41 ( sP17_iProver_split(sK82,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP25_iProver_split(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | ~ sP18_iProver_split(sK82) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_10069]) ). 7.17/7.41 7.17/7.41 cnf(c_11348,plain, 7.17/7.41 ( ~ r1(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP25_iProver_split(X0) 7.17/7.41 | sP41(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4633]) ). 7.17/7.41 7.17/7.41 cnf(c_14861,plain, 7.17/7.41 ( ~ r1(sK60(sK63(sK65(sK67(sK82)))),sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP25_iProver_split(sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP41(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_11348]) ). 7.17/7.41 7.17/7.41 cnf(c_9959,plain, 7.17/7.41 ( ~ sP15_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | sP6_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4614]) ). 7.17/7.41 7.17/7.41 cnf(c_14995,plain, 7.17/7.41 ( ~ sP15_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | sP6_iProver_split(X0,sK67(sK82)) 7.17/7.41 | ~ r1(sK67(sK82),sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_9959]) ). 7.17/7.41 7.17/7.41 cnf(c_14996,plain, 7.17/7.41 ( ~ sP15_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.41 | sP6_iProver_split(sK82,sK67(sK82)) 7.17/7.41 | ~ r1(sK67(sK82),sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_14995]) ). 7.17/7.41 7.17/7.41 cnf(c_23270,plain, 7.17/7.41 ( ~ p8(sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) 7.17/7.41 | ~ p106(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | p107(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ sP41(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_3535]) ). 7.17/7.41 7.17/7.41 cnf(c_40255,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP16_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4616]) ). 7.17/7.41 7.17/7.41 cnf(c_41170,plain, 7.17/7.41 ( ~ sP17_iProver_split(X0,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP16_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ r1(sK63(sK65(sK67(sK82))),sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_40255]) ). 7.17/7.41 7.17/7.41 cnf(c_41171,plain, 7.17/7.41 ( ~ sP17_iProver_split(sK82,sK60(sK63(sK65(sK67(sK82))))) 7.17/7.41 | sP16_iProver_split(sK82,sK63(sK65(sK67(sK82)))) 7.17/7.41 | ~ r1(sK63(sK65(sK67(sK82))),sK60(sK63(sK65(sK67(sK82))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_41170]) ). 7.17/7.41 7.17/7.41 cnf(c_77972,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP15_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4615]) ). 7.17/7.41 7.17/7.41 cnf(c_88011,plain, 7.17/7.41 ( ~ sP16_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP15_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | ~ r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_77972]) ). 7.17/7.41 7.17/7.41 cnf(c_88012,plain, 7.17/7.41 ( ~ sP16_iProver_split(sK82,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP15_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.41 | ~ r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_88011]) ). 7.17/7.41 7.17/7.41 cnf(c_93726,plain, 7.17/7.41 ( ~ sP6_iProver_split(X0,sK67(sK82)) 7.17/7.41 | sP5_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK67(sK82)) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4583]) ). 7.17/7.41 7.17/7.41 cnf(c_93727,plain, 7.17/7.41 ( ~ sP6_iProver_split(sK82,sK67(sK82)) 7.17/7.41 | sP5_iProver_split(sK82,sK82) 7.17/7.41 | ~ r1(sK82,sK67(sK82)) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_93726]) ). 7.17/7.41 7.17/7.41 cnf(c_109847,plain, 7.17/7.41 ( ~ p8(sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) 7.17/7.41 | ~ sP41(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) ), 7.17/7.41 inference(global_propositional_subsumption, 7.17/7.41 [status(thm)], 7.17/7.41 [c_100022,c_267,c_263,c_262,c_325,c_326,c_327,c_426, 7.17/7.41 c_478,c_4674,c_4675,c_4676,c_4682,c_4683,c_4684,c_4685, 7.17/7.41 c_4686,c_4687,c_4688,c_4689,c_4690,c_4691,c_4692,c_4693, 7.17/7.41 c_4695,c_4705,c_4712,c_4739,c_4738,c_4733,c_4830,c_4849, 7.17/7.41 c_4852,c_4869,c_4881,c_4921,c_4920,c_4917,c_5559,c_5731, 7.17/7.41 c_5730,c_5728,c_6112,c_7548,c_7629,c_8273,c_8543,c_8542, 7.17/7.41 c_9934,c_9958,c_10070,c_14861,c_14996,c_23270,c_41171, 7.17/7.41 c_88012,c_93727]) ). 7.17/7.41 7.17/7.41 cnf(c_214,plain, 7.17/7.41 ( r1(X0,sK70(X0)) | ~ sP5(X0) | ~ p106(X0) | p107(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f420]) ). 7.17/7.41 7.17/7.41 cnf(c_3549,plain, 7.17/7.41 ( r1(X0,sK70(X0)) | ~ p106(X0) | p107(X0) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_55,c_214]) ). 7.17/7.41 7.17/7.41 cnf(c_100020,plain, 7.17/7.41 ( r1(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))),sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) 7.17/7.41 | ~ p106(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | p107(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ sP41(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_3549]) ). 7.17/7.41 7.17/7.41 cnf(c_23268,plain, 7.17/7.41 ( r1(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))),sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) 7.17/7.41 | ~ p106(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | p107(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ sP41(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_3549]) ). 7.17/7.41 7.17/7.41 cnf(c_109843,plain, 7.17/7.41 ( r1(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))),sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) 7.17/7.41 | ~ sP41(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) ), 7.17/7.41 inference(global_propositional_subsumption, 7.17/7.41 [status(thm)], 7.17/7.41 [c_100020,c_267,c_263,c_262,c_325,c_326,c_327,c_426, 7.17/7.41 c_478,c_4674,c_4675,c_4676,c_4682,c_4683,c_4684,c_4685, 7.17/7.41 c_4686,c_4687,c_4688,c_4689,c_4690,c_4691,c_4692,c_4693, 7.17/7.41 c_4695,c_4705,c_4712,c_4739,c_4738,c_4733,c_4830,c_4849, 7.17/7.41 c_4852,c_4869,c_4881,c_4921,c_4920,c_4917,c_5559,c_5731, 7.17/7.41 c_5730,c_5728,c_6112,c_7548,c_7629,c_8273,c_8543,c_8542, 7.17/7.41 c_9934,c_9958,c_10070,c_14861,c_14996,c_23268,c_41171, 7.17/7.41 c_88012,c_93727]) ). 7.17/7.41 7.17/7.41 cnf(c_93715,plain, 7.17/7.41 ( ~ sP6_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | sP5_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4583]) ). 7.17/7.41 7.17/7.41 cnf(c_96336,plain, 7.17/7.41 ( ~ sP6_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | sP5_iProver_split(X0,sK67(sK82)) 7.17/7.41 | ~ r1(sK67(sK82),sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_93715]) ). 7.17/7.41 7.17/7.41 cnf(c_96337,plain, 7.17/7.41 ( ~ sP6_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.41 | sP5_iProver_split(sK82,sK67(sK82)) 7.17/7.41 | ~ r1(sK67(sK82),sK65(sK67(sK82))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_96336]) ). 7.17/7.41 7.17/7.41 cnf(c_4584,negated_conjecture, 7.17/7.41 ( ~ r1(X0,X1) | ~ r1(X2,X0) | p8(X1) | ~ sP7_iProver_split(X2) ), 7.17/7.41 inference(splitting, 7.17/7.41 [splitting(split),new_symbols(definition,[sP7_iProver_split])], 7.17/7.41 [c_265]) ). 7.17/7.41 7.17/7.41 cnf(c_4598,negated_conjecture, 7.17/7.41 ( ~ r1(X0,X1) | sP13_iProver_split(X1) | ~ sP7_iProver_split(X0) ), 7.17/7.41 inference(splitting, 7.17/7.41 [splitting(split),new_symbols(definition,[])], 7.17/7.41 [c_4584]) ). 7.17/7.41 7.17/7.41 cnf(c_93627,plain, 7.17/7.41 ( ~ r1(X0,sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | sP13_iProver_split(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ sP7_iProver_split(X0) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4598]) ). 7.17/7.41 7.17/7.41 cnf(c_96095,plain, 7.17/7.41 ( ~ r1(sK68(sK60(sK63(sK65(sK67(sK82))))),sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | sP13_iProver_split(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ sP7_iProver_split(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_93627]) ). 7.17/7.41 7.17/7.41 cnf(c_92609,plain, 7.17/7.41 ( ~ sP15_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP6_iProver_split(X0,X1) 7.17/7.41 | ~ r1(X1,sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4614]) ). 7.17/7.41 7.17/7.41 cnf(c_93358,plain, 7.17/7.41 ( ~ sP15_iProver_split(X0,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP6_iProver_split(X0,sK65(sK67(sK82))) 7.17/7.41 | ~ r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_92609]) ). 7.17/7.41 7.17/7.41 cnf(c_93359,plain, 7.17/7.41 ( ~ sP15_iProver_split(sK82,sK63(sK65(sK67(sK82)))) 7.17/7.41 | sP6_iProver_split(sK82,sK65(sK67(sK82))) 7.17/7.41 | ~ r1(sK65(sK67(sK82)),sK63(sK65(sK67(sK82)))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_93358]) ). 7.17/7.41 7.17/7.41 cnf(c_4597,negated_conjecture, 7.17/7.41 ( ~ r1(X0,X1) | p8(X1) | ~ sP13_iProver_split(X0) ), 7.17/7.41 inference(splitting, 7.17/7.41 [splitting(split),new_symbols(definition,[sP13_iProver_split])], 7.17/7.41 [c_4584]) ). 7.17/7.41 7.17/7.41 cnf(c_40679,plain, 7.17/7.41 ( ~ r1(X0,sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) 7.17/7.41 | ~ sP13_iProver_split(X0) 7.17/7.41 | p8(sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4597]) ). 7.17/7.41 7.17/7.41 cnf(c_41097,plain, 7.17/7.41 ( ~ r1(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))),sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) 7.17/7.41 | ~ sP13_iProver_split(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | p8(sK70(sK58(sK68(sK60(sK63(sK65(sK67(sK82)))))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_40679]) ). 7.17/7.41 7.17/7.41 cnf(c_36493,plain, 7.17/7.41 ( sP17_iProver_split(X0,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | ~ sP25_iProver_split(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | ~ sP18_iProver_split(X0) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4632]) ). 7.17/7.41 7.17/7.41 cnf(c_36494,plain, 7.17/7.41 ( sP17_iProver_split(sK82,sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | ~ sP25_iProver_split(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | ~ sP18_iProver_split(sK82) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_36493]) ). 7.17/7.41 7.17/7.41 cnf(c_28393,plain, 7.17/7.41 ( ~ r1(X0,sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | sP25_iProver_split(X0) 7.17/7.41 | sP41(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_4633]) ). 7.17/7.41 7.17/7.41 cnf(c_36305,plain, 7.17/7.41 ( ~ r1(sK68(sK60(sK63(sK65(sK67(sK82))))),sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | sP25_iProver_split(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | sP41(sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_28393]) ). 7.17/7.41 7.17/7.41 cnf(c_169,plain, 7.17/7.41 ( r1(X0,sK58(X0)) | ~ p105(X0) | p106(X0) | ~ sP11(X0) ), 7.17/7.41 inference(cnf_transformation,[],[f369]) ). 7.17/7.41 7.17/7.41 cnf(c_2651,plain, 7.17/7.41 ( r1(X0,sK58(X0)) | ~ p105(X0) | p106(X0) | ~ sP41(X0) ), 7.17/7.41 inference(resolution,[status(thm)],[c_8,c_169]) ). 7.17/7.41 7.17/7.41 cnf(c_8540,plain, 7.17/7.41 ( r1(sK68(sK60(sK63(sK65(sK67(sK82))))),sK58(sK68(sK60(sK63(sK65(sK67(sK82))))))) 7.17/7.41 | ~ p105(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | p106(sK68(sK60(sK63(sK65(sK67(sK82)))))) 7.17/7.41 | ~ sP41(sK68(sK60(sK63(sK65(sK67(sK82)))))) ), 7.17/7.41 inference(instantiation,[status(thm)],[c_2651]) ). 7.17/7.41 7.17/7.41 cnf(c_4577,negated_conjecture, 7.17/7.41 ( ~ r1(X0,X1) 7.17/7.41 | ~ r1(X2,X0) 7.17/7.41 | ~ r1(sK82,X2) 7.17/7.41 | ~ sP0_iProver_split(X1) ), 7.17/7.41 inference(splitting, 7.17/7.41 [splitting(split),new_symbols(definition,[sP0_iProver_split])], 7.17/7.41 [c_265]) ). 7.17/7.41 7.17/7.41 cnf(c_4610,negated_conjecture, 7.17/7.41 ( ~ r1(X0,X1) 7.17/7.41 | ~ sP0_iProver_split(X1) 7.17/7.41 | ~ sP14_iProver_split(X0) ), 7.17/7.41 inference(splitting, 7.17/7.41 [splitting(split),new_symbols(definition,[sP14_iProver_split])], 7.17/7.41 [c_4577]) ). 7.17/7.41 7.17/7.42 cnf(c_4681,plain, 7.17/7.42 ( ~ r1(sK82,sK82) 7.17/7.42 | ~ sP14_iProver_split(sK82) 7.17/7.42 | ~ sP0_iProver_split(sK82) ), 7.17/7.42 inference(instantiation,[status(thm)],[c_4610]) ). 7.17/7.42 7.17/7.42 cnf(c_4611,negated_conjecture, 7.17/7.42 ( ~ r1(X0,X1) | ~ r1(sK82,X0) | sP14_iProver_split(X1) ), 7.17/7.42 inference(splitting, 7.17/7.42 [splitting(split),new_symbols(definition,[])], 7.17/7.42 [c_4577]) ). 7.17/7.42 7.17/7.42 cnf(c_4680,plain, 7.17/7.42 ( ~ r1(sK82,sK82) | sP14_iProver_split(sK82) ), 7.17/7.42 inference(instantiation,[status(thm)],[c_4611]) ). 7.17/7.42 7.17/7.42 cnf(c_4578,negated_conjecture, 7.17/7.42 ( ~ r1(X0,X1) | sP0_iProver_split(X0) | ~ sP1_iProver_split(X1) ), 7.17/7.42 inference(splitting, 7.17/7.42 [splitting(split),new_symbols(definition,[sP1_iProver_split])], 7.17/7.42 [c_265]) ). 7.17/7.42 7.17/7.42 cnf(c_4679,plain, 7.17/7.42 ( ~ r1(sK82,sK82) 7.17/7.42 | ~ sP1_iProver_split(sK82) 7.17/7.42 | sP0_iProver_split(sK82) ), 7.17/7.42 inference(instantiation,[status(thm)],[c_4578]) ). 7.17/7.42 7.17/7.42 cnf(c_4579,negated_conjecture, 7.17/7.42 ( ~ r1(X0,X1) | sP1_iProver_split(X0) | ~ sP2_iProver_split(X1) ), 7.17/7.42 inference(splitting, 7.17/7.42 [splitting(split),new_symbols(definition,[sP2_iProver_split])], 7.17/7.42 [c_265]) ). 7.17/7.42 7.17/7.42 cnf(c_4678,plain, 7.17/7.42 ( ~ r1(sK82,sK82) 7.17/7.42 | ~ sP2_iProver_split(sK82) 7.17/7.42 | sP1_iProver_split(sK82) ), 7.17/7.42 inference(instantiation,[status(thm)],[c_4579]) ). 7.17/7.42 7.17/7.42 cnf(c_4580,negated_conjecture, 7.17/7.42 ( ~ r1(X0,X1) | sP2_iProver_split(X0) | ~ sP3_iProver_split(X1) ), 7.17/7.42 inference(splitting, 7.17/7.42 [splitting(split),new_symbols(definition,[sP3_iProver_split])], 7.17/7.42 [c_265]) ). 7.17/7.42 7.17/7.42 cnf(c_4677,plain, 7.17/7.42 ( ~ r1(sK82,sK82) 7.17/7.42 | ~ sP3_iProver_split(sK82) 7.17/7.42 | sP2_iProver_split(sK82) ), 7.17/7.42 inference(instantiation,[status(thm)],[c_4580]) ). 7.17/7.42 7.17/7.42 cnf(c_4589,negated_conjecture, 7.17/7.42 ( sP6_iProver_split(X0,X1) 7.17/7.42 | sP11_iProver_split(X1) 7.17/7.42 | ~ sP12_iProver_split(X0) ), 7.17/7.42 inference(splitting, 7.17/7.42 [splitting(split),new_symbols(definition,[sP12_iProver_split])], 7.17/7.42 [c_265]) ). 7.17/7.42 7.17/7.42 cnf(c_4668,plain, 7.17/7.42 ( sP6_iProver_split(sK82,sK82) 7.17/7.42 | ~ sP12_iProver_split(sK82) 7.17/7.42 | sP11_iProver_split(sK82) ), 7.17/7.42 inference(instantiation,[status(thm)],[c_4589]) ). 7.17/7.42 7.17/7.42 cnf(c_4590,negated_conjecture, 7.17/7.42 ( ~ r1(X0,X1) | sP12_iProver_split(X1) | sP3_iProver_split(X0) ), 7.17/7.42 inference(splitting, 7.17/7.42 [splitting(split),new_symbols(definition,[])], 7.17/7.42 [c_265]) ). 7.17/7.42 7.17/7.42 cnf(c_4667,plain, 7.17/7.42 ( ~ r1(sK82,sK82) 7.17/7.42 | sP12_iProver_split(sK82) 7.17/7.42 | sP3_iProver_split(sK82) ), 7.17/7.42 inference(instantiation,[status(thm)],[c_4590]) ). 7.17/7.42 7.17/7.42 cnf(contradiction,plain, 7.17/7.42 ( $false ), 7.17/7.42 inference(minisat, 7.17/7.42 [status(thm)], 7.17/7.42 [c_182452,c_174170,c_173793,c_173232,c_162346,c_153208, 7.17/7.42 c_142465,c_109847,c_109843,c_96337,c_96095,c_93727, 7.17/7.42 c_93359,c_88012,c_41171,c_41097,c_36494,c_36305,c_14996, 7.17/7.42 c_14861,c_10070,c_9958,c_9934,c_8540,c_8273,c_7629, 7.17/7.42 c_7548,c_6112,c_5728,c_5730,c_5731,c_5559,c_4917,c_4920, 7.17/7.42 c_4921,c_4881,c_4869,c_4852,c_4849,c_4830,c_4733,c_4738, 7.17/7.42 c_4739,c_4712,c_4705,c_4695,c_4693,c_4692,c_4691,c_4690, 7.17/7.42 c_4689,c_4688,c_4687,c_4686,c_4685,c_4684,c_4683,c_4682, 7.17/7.42 c_4681,c_4680,c_4679,c_4678,c_4677,c_4676,c_4675,c_4674, 7.17/7.42 c_4668,c_4667,c_478,c_426,c_327,c_326,c_325,c_262,c_263, 7.17/7.42 c_267]) ). 7.17/7.42 7.17/7.42 7.17/7.42 % SZS output end CNFRefutation 7.17/7.42 7.17/7.42 ------ Statistics 7.17/7.42 7.17/7.42 ------ General 7.17/7.42 7.17/7.42 abstr_arg_filter_cycles: 0 7.17/7.42 gc_basic_clause_elim: 0 7.17/7.42 forced_gc_time: 0 7.17/7.42 parsing_time: 0.014 7.17/7.42 unif_index_cands_time: 0.108 7.17/7.42 unif_index_add_time: 0.085 7.17/7.42 out_proof_time: 0.046 7.17/7.42 total_time: 7.167 7.17/7.42 num_of_symbols: 180 7.17/7.42 num_of_terms: 52565 7.17/7.42 7.17/7.42 ------ Preprocessing 7.17/7.42 7.17/7.42 num_of_splits: 36 7.17/7.42 num_of_split_atoms: 26 7.17/7.42 num_of_reused_defs: 10 7.17/7.42 num_eq_ax_congr_red: 0 7.17/7.42 num_of_sem_filtered_clauses: 3 7.17/7.42 num_of_subtypes: 1 7.17/7.42 monotx_restored_types: 0 7.17/7.42 sat_num_of_epr_types: 0 7.17/7.42 sat_num_of_non_cyclic_types: 0 7.17/7.42 sat_guarded_non_collapsed_types: 0 7.17/7.42 num_pure_diseq_elim: 0 7.17/7.42 simp_replaced_by: 0 7.17/7.42 res_preprocessed: 487 7.17/7.42 prep_upred: 0 7.17/7.42 prep_unflattend: 0 7.17/7.42 pred_elim_cands: 42 7.17/7.42 pred_elim: 41 7.17/7.42 pred_elim_cl: 42 7.17/7.42 pred_elim_cycles: 43 7.17/7.42 merged_defs: 0 7.17/7.42 merged_defs_ncl: 0 7.17/7.42 prep_cycles: 2 7.17/7.42 pred_elim_time: 0.048 7.17/7.42 splitting_time: 0.003 7.17/7.42 sem_filter_time: 0.01 7.17/7.42 monotx_time: 0. 7.17/7.42 subtype_inf_time: 0. 7.17/7.42 7.17/7.42 ------ Problem properties 7.17/7.42 7.17/7.42 clauses: 257 7.17/7.42 conjectures: 39 7.17/7.42 epr: 99 7.17/7.42 horn: 156 7.17/7.42 unary: 10 7.17/7.42 binary: 0 7.17/7.42 lits: 1021 7.17/7.42 lits_eq: 0 7.17/7.42 7.17/7.42 ------ Propositional Solver 7.17/7.42 7.17/7.42 prop_solver_calls: 88 7.17/7.42 prop_fast_solver_calls: 151258 7.17/7.42 prop_num_of_clauses: 49384 7.17/7.42 prop_preprocess_simplified: 217421 7.17/7.42 prop_fo_subsumed: 35236 7.17/7.42 prop_solver_time: 0.071 7.17/7.42 prop_fast_solver_time: 0.201 7.17/7.42 prop_unsat_core_time: 0.006 7.17/7.42 7.17/7.42 ------ QBF 7.17/7.42 7.17/7.42 qbf_q_res: 0 7.17/7.42 qbf_num_tautologies: 0 7.17/7.42 qbf_prep_cycles: 0 7.17/7.42 7.17/7.42 ------ BMC1 7.17/7.42 7.17/7.42 bmc1_current_bound: -1 7.17/7.42 bmc1_last_solved_bound: -1 7.17/7.42 bmc1_unsat_core_size: -1 7.17/7.42 bmc1_unsat_core_parents_size: -1 7.17/7.42 bmc1_merge_next_fun: 0 7.17/7.42 bmc1_unsat_core_clauses_time: 0. 7.17/7.42 7.17/7.42 ------ Instantiation 7.17/7.42 7.17/7.42 inst_num_of_clauses: 17302 7.17/7.42 inst_num_in_passive: 10021 7.17/7.42 inst_num_in_active: 32612 7.17/7.42 inst_num_in_unprocessed: 256 7.17/7.42 inst_num_of_loops: 37698 7.17/7.42 inst_num_of_learning_restarts: 3 7.17/7.42 inst_num_moves_active_passive: 5056 7.17/7.42 inst_lit_activity: 0 7.17/7.42 inst_lit_activity_moves: 0 7.17/7.42 inst_num_tautologies: 0 7.17/7.42 inst_num_prop_implied: 0 7.17/7.42 inst_num_existing_simplified: 0 7.17/7.42 inst_num_eq_res_simplified: 0 7.17/7.42 inst_num_child_elim: 0 7.17/7.42 inst_num_of_dismatching_blockings: 0 7.17/7.42 inst_num_of_non_proper_insts: 50230 7.17/7.42 inst_num_of_duplicates: 85607 7.17/7.42 inst_inst_num_from_inst_to_res: 0 7.17/7.42 inst_dismatching_checking_time: 0.187 7.17/7.42 7.17/7.42 ------ Resolution 7.17/7.42 7.17/7.42 res_num_of_clauses: 0 7.17/7.42 res_num_in_passive: 0 7.17/7.42 res_num_in_active: 0 7.17/7.42 res_num_of_loops: 489 7.17/7.42 res_forward_subset_subsumed: 176 7.17/7.42 res_backward_subset_subsumed: 8 7.17/7.42 res_forward_subsumed: 0 7.17/7.42 res_backward_subsumed: 0 7.17/7.42 res_forward_subsumption_resolution: 0 7.17/7.42 res_backward_subsumption_resolution: 0 7.17/7.42 res_clause_to_clause_subsumption: 338 7.17/7.42 res_orphan_elimination: 0 7.17/7.42 res_tautology_del: 2312 7.17/7.42 res_num_eq_res_simplified: 0 7.17/7.42 res_num_sel_changes: 0 7.17/7.42 res_moves_from_active_to_pass: 0 7.17/7.42 7.17/7.42 USED TIME: 7.16 CPU 7.18 WC 7.17/7.43 EOF