0.00/0.03 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.00/0.04 % Command : vampire --mode casc -t %d %s 0.03/0.23 % Computer : n188.star.cs.uiowa.edu 0.03/0.23 % Model : x86_64 x86_64 0.03/0.23 % CPU : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz 0.03/0.23 % Memory : 32218.625MB 0.03/0.23 % OS : Linux 3.10.0-693.2.2.el7.x86_64 0.03/0.23 % CPULimit : 300 0.03/0.23 % DateTime : Sat Jul 14 05:14:10 CDT 2018 0.03/0.23 % CPUTime : 0.03/0.27 % lrs-11_4:1_afp=4000:afq=2.0:anc=none:br=off:gs=on:lwlo=on:nm=64:nwc=3:stl=30:urr=on_2 on theBenchmark 0.51/0.77 % Time limit reached! 0.51/0.77 % ------------------------------ 0.51/0.77 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 0.51/0.77 % Termination reason: Time limit 0.51/0.77 % Termination phase: Saturation 0.51/0.77 0.51/0.77 % Memory used [KB]: 17910 0.51/0.77 % Time elapsed: 0.500 s 0.51/0.77 % ------------------------------ 0.51/0.77 % ------------------------------ 0.59/0.80 % dis+10_50_add=large:afr=on:afp=4000:afq=1.0:amm=off:anc=none:cond=on:fsr=off:gs=on:lma=on:nm=64:nwc=1:sas=z3:sos=on:sp=occurrence:thf=on:updr=off_2 on theBenchmark 1.10/1.30 % Time limit reached! 1.10/1.30 % ------------------------------ 1.10/1.30 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 1.10/1.30 % Termination reason: Time limit 1.10/1.30 % Termination phase: Saturation 1.10/1.30 1.10/1.30 % Memory used [KB]: 5373 1.10/1.30 % Time elapsed: 0.500 s 1.10/1.30 % ------------------------------ 1.10/1.30 % ------------------------------ 1.10/1.34 % dis+11_3_afr=on:afp=4000:afq=1.4:anc=none:cond=on:fsr=off:gs=on:lcm=reverse:nm=64:nwc=1:sos=on:sp=reverse_arity_3 on theBenchmark 1.68/1.94 % Time limit reached! 1.68/1.94 % ------------------------------ 1.68/1.94 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 1.68/1.94 % Termination reason: Time limit 1.68/1.94 % Termination phase: Saturation 1.68/1.94 1.68/1.94 % Memory used [KB]: 9978 1.68/1.94 % Time elapsed: 0.600 s 1.68/1.94 % ------------------------------ 1.68/1.94 % ------------------------------ 1.75/1.97 % lrs+4_32_add=large:afp=10000:afq=1.2:amm=sco:anc=none:cond=on:fsr=off:gsp=input_only:lcm=predicate:lma=on:nm=2:nwc=1:stl=30:sac=on:sp=occurrence:urr=on_11 on theBenchmark 3.33/3.57 % Time limit reached! 3.33/3.57 % ------------------------------ 3.33/3.57 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 3.33/3.57 % Termination reason: Time limit 3.33/3.57 % Termination phase: Saturation 3.33/3.57 3.33/3.57 % Memory used [KB]: 32494 3.33/3.57 % Time elapsed: 1.600 s 3.33/3.57 % ------------------------------ 3.33/3.57 % ------------------------------ 3.39/3.60 % lrs+1_2:3_afr=on:afp=1000:afq=1.1:amm=sco:anc=none:fsr=off:fde=none:gs=on:gsaa=full_model:gsem=on:lma=on:nm=64:nwc=1.3:sas=z3:stl=30:sac=on:tha=off:uwa=one_side_interpreted:updr=off_2 on theBenchmark 3.92/4.10 % Time limit reached! 3.92/4.10 % ------------------------------ 3.92/4.10 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 3.92/4.10 % Termination reason: Time limit 3.92/4.10 % Termination phase: Saturation 3.92/4.10 3.92/4.10 % Memory used [KB]: 7931 3.92/4.10 % Time elapsed: 0.500 s 3.92/4.10 % ------------------------------ 3.92/4.10 % ------------------------------ 3.94/4.14 % dis+10_3_afp=1000:afq=2.0:amm=off:anc=none:cond=on:gs=on:inw=on:irw=on:lma=on:nm=64:nwc=1:sas=z3:sos=on:sac=on:sp=reverse_arity:updr=off_2 on theBenchmark 4.41/4.64 % Time limit reached! 4.41/4.64 % ------------------------------ 4.41/4.64 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 4.41/4.64 % Termination reason: Time limit 4.41/4.64 % Termination phase: Saturation 4.41/4.64 4.41/4.64 % Memory used [KB]: 5373 4.41/4.64 % Time elapsed: 0.500 s 4.41/4.64 % ------------------------------ 4.41/4.64 % ------------------------------ 4.47/4.67 % ins+11_32_av=off:igbrr=0.4:igrr=1/64:igrpq=1.05:igwr=on:lcm=reverse:lma=on:nm=64:newcnf=on:nwc=1:sp=reverse_arity:updr=off_55 on theBenchmark 11.77/11.97 % Time limit reached! 11.77/11.97 % ------------------------------ 11.77/11.97 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 11.77/11.97 % Termination reason: Time limit 11.77/11.97 % Termination phase: Saturation 11.77/11.97 11.77/11.97 % Memory used [KB]: 12281 11.77/11.97 % Time elapsed: 7.300 s 11.77/11.97 % ------------------------------ 11.77/11.97 % ------------------------------ 11.83/12.00 % lrs+10_5:4_afr=on:afp=40000:afq=1.2:bd=off:gsp=input_only:gs=on:inw=on:nm=0:nwc=1:sas=z3:stl=30:sos=all:sp=reverse_arity:tha=off:thf=on:urr=on_2 on theBenchmark 12.34/12.50 % Time limit reached! 12.34/12.50 % ------------------------------ 12.34/12.50 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 12.34/12.50 % Termination reason: Time limit 12.34/12.50 % Termination phase: Saturation 12.34/12.50 12.34/12.50 % Memory used [KB]: 11257 12.34/12.50 % Time elapsed: 0.500 s 12.34/12.50 % ------------------------------ 12.34/12.50 % ------------------------------ 12.37/12.54 % dis+1011_10_add=large:afr=on:afp=4000:afq=1.0:amm=off:anc=none:lma=on:nm=64:nwc=4:sac=on:sp=occurrence_75 on theBenchmark 22.34/22.44 % Time limit reached! 22.34/22.44 % ------------------------------ 22.34/22.44 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 22.34/22.44 % Termination reason: Time limit 22.34/22.44 % Termination phase: Saturation 22.34/22.44 22.34/22.44 % Memory used [KB]: 11641 22.34/22.44 % Time elapsed: 9.900 s 22.34/22.44 % ------------------------------ 22.34/22.44 % ------------------------------ 22.34/22.47 % lrs+10_4:1_av=off:bd=off:bsr=on:cond=on:fde=unused:inw=on:lcm=reverse:lma=on:lwlo=on:nm=64:nwc=5:stl=90:sp=reverse_arity:thi=strong:uwa=ground:updr=off:uwaf=on_73 on theBenchmark 31.98/32.07 % Time limit reached! 31.98/32.07 % ------------------------------ 31.98/32.07 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 31.98/32.07 % Termination reason: Time limit 31.98/32.07 % Termination phase: Saturation 31.98/32.07 31.98/32.07 % Memory used [KB]: 7931 31.98/32.07 % Time elapsed: 9.600 s 31.98/32.07 % ------------------------------ 31.98/32.07 % ------------------------------ 31.98/32.11 % dis+11_24_afp=40000:afq=1.1:amm=sco:anc=none:bs=on:gs=on:gsem=off:lcm=predicate:lma=on:nm=2:nwc=1:sos=on:sac=on:updr=off_91 on theBenchmark 32.05/32.52 % Refutation found. Thanks to Tanya! 32.05/32.52 % SZS status Theorem for theBenchmark 32.05/32.52 % SZS output start Proof for theBenchmark 32.05/32.52 fof(f1,axiom,( 32.05/32.52 ! [X0] : r1(X0,X0)), 32.05/32.52 file('/export/starexec/sandbox/benchmark/theBenchmark.p',reflexivity)). 32.05/32.52 fof(f2,conjecture,( 32.05/32.52 ~? [X0] : ~(~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (((~! [X0] : (~r1(X1,X0) | p1(X0) | ~! [X1] : (~r1(X0,X1) | ~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0)))) | ! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~! [X0] : (~r1(X1,X0) | ~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~r1(X0,X1)))) & ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (p1(X0) | ~r1(X1,X0))) | ~r1(X1,X0)) & (p1(X1) | ~! [X0] : (~! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~p1(X1) | ~r1(X0,X1)) | p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (p1(X1) | ~r1(X0,X1)))) & (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0) | ~r1(X1,X0)) | ~(~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0))))) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~(~! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (~r1(X0,X1) | p1(X1))) | ~! [X0] : (~r1(X1,X0) | p1(X0) | ~! [X1] : (~p1(X1) | ! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0))) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (p1(X0) | ~r1(X1,X0)))) | ~r1(X0,X1)))))) & ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~r1(X1,X0))) & ! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | p1(X0)) | ! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0))) & ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) & ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (p1(X0) | ~r1(X1,X0))) | ~! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0))))))) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | p1(X1))) | ~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)))) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | p1(X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~! [X0] : (~r1(X1,X0) | p1(X0)) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | p1(X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~! [X0] : (p1(X0) | ~r1(X1,X0)))) | ~r1(X0,X1))))))) | ~r1(X0,X1)))) | ~r1(X1,X0)))))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))))), 32.05/32.52 file('/export/starexec/sandbox/benchmark/theBenchmark.p',main)). 32.05/32.52 fof(f3,negated_conjecture,( 32.05/32.52 ~~? [X0] : ~(~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1))) | ~r1(X0,X1)))) | ~r1(X1,X0))) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (((~! [X0] : (~r1(X1,X0) | p1(X0) | ~! [X1] : (~r1(X0,X1) | ~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0)))) | ! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~! [X0] : (~r1(X1,X0) | ~p1(X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~r1(X0,X1)))) & ! [X0] : (~! [X1] : (p1(X1) | ~r1(X0,X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (p1(X0) | ~r1(X1,X0))) | ~r1(X1,X0)) & (p1(X1) | ~! [X0] : (~! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~p1(X1) | ~r1(X0,X1)) | p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (p1(X1) | ~r1(X0,X1)))) & (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~p1(X1) | ~! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~p1(X0) | ~r1(X1,X0)) | ~(~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0))))) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (~p1(X1) | ! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1))))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~(~! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ~! [X1] : (~r1(X0,X1) | p1(X1))) | ~! [X0] : (~r1(X1,X0) | p1(X0) | ~! [X1] : (~p1(X1) | ! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0))) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0)) | ~! [X0] : (p1(X0) | ~r1(X1,X0)))) | ~r1(X0,X1)))))) & ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~r1(X1,X0))) & ! [X1] : (~r1(X0,X1) | ~! [X0] : (~r1(X1,X0) | p1(X0)) | ! [X0] : (! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0))) & ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~! [X0] : (p1(X0) | ~r1(X1,X0)) | ! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) & ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (p1(X0) | ~r1(X1,X0))) | ~! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0))))))) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | p1(X1))) | ~! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1))))))) | ~r1(X0,X1)))) & ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | p1(X0))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~! [X0] : (~r1(X1,X0) | p1(X0))))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))))) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | p1(X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~! [X0] : (~r1(X1,X0) | p1(X0)) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | p1(X1))) | ~r1(X0,X1)))))) | ~r1(X1,X0))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~! [X1] : (~r1(X0,X1) | p1(X1)) | ! [X1] : (! [X0] : (~r1(X1,X0) | p1(X0)) | ~r1(X0,X1)) | ~r1(X1,X0)))))) | ~r1(X0,X1))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)))) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))) | ~! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (p1(X1) | ~r1(X0,X1))) | ~! [X0] : (p1(X0) | ~r1(X1,X0)))) | ~r1(X0,X1))))))) | ~r1(X0,X1)))) | ~r1(X1,X0)))))) | ~r1(X0,X1)) | ~! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (! [X0] : (! [X1] : (! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X0] : (~r1(X1,X0) | ! [X1] : (~r1(X0,X1) | ! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (! [X1] : (! [X0] : (p1(X0) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~! [X1] : (p1(X1) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1)) | ~r1(X1,X0))))) | ~r1(X1,X0)))) | ~r1(X0,X1)) | ~r1(X1,X0)) | ~r1(X0,X1))) | ~r1(X0,X1)))))), 32.05/32.52 inference(negated_conjecture,[],[f2])). 32.05/32.52 fof(f4,plain,( 32.05/32.52 ~~? [X0] : ~(~! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | ~! [X22] : (~r1(X19,X22) | p1(X22)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) | ~! [X23] : (~r1(X0,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (~! [X35] : (p1(X35) | ~r1(X34,X35)) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) | ~! [X38] : (~r1(X0,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (((~! [X49] : (~r1(X48,X49) | p1(X49) | ~! [X50] : (~r1(X49,X50) | ~p1(X50) | ! [X51] : (~r1(X50,X51) | p1(X51)))) | ! [X52] : (~r1(X48,X52) | ! [X53] : (p1(X53) | ~! [X54] : (~r1(X53,X54) | ~p1(X54) | ! [X55] : (p1(X55) | ~r1(X54,X55))) | ~r1(X52,X53)))) & ! [X56] : (~! [X57] : (p1(X57) | ~r1(X56,X57)) | ! [X58] : (~r1(X56,X58) | ! [X59] : (p1(X59) | ~r1(X58,X59))) | ~r1(X48,X56)) & (p1(X48) | ~! [X60] : (~! [X61] : (! [X62] : (~r1(X61,X62) | p1(X62)) | ~p1(X61) | ~r1(X60,X61)) | p1(X60) | ~r1(X48,X60)) | ! [X63] : (~r1(X48,X63) | ~! [X64] : (p1(X64) | ~r1(X63,X64)))) & (! [X65] : (p1(X65) | ~r1(X48,X65)) | ~p1(X48) | ~! [X66] : (~r1(X48,X66) | ! [X67] : (p1(X67) | ~r1(X66,X67)) | ~p1(X66) | ~! [X68] : (~r1(X66,X68) | ! [X69] : (! [X70] : (p1(X70) | ~r1(X69,X70)) | ~p1(X69) | ~r1(X68,X69)) | ~(~p1(X68) | ! [X71] : (~r1(X68,X71) | p1(X71))))) | ! [X72] : (~r1(X48,X72) | ~! [X73] : (~p1(X73) | ! [X74] : (~r1(X73,X74) | p1(X74)) | ~r1(X72,X73))))) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) | ~(~! [X75] : (! [X76] : (! [X77] : (! [X78] : (! [X79] : (! [X80] : (! [X81] : (~r1(X80,X81) | ! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (! [X85] : (! [X86] : (p1(X86) | ~r1(X85,X86)) | ! [X87] : (~r1(X85,X87) | ~! [X88] : (~r1(X87,X88) | p1(X88))) | ~! [X89] : (~r1(X85,X89) | p1(X89) | ~! [X90] : (~p1(X90) | ! [X91] : (p1(X91) | ~r1(X90,X91)) | ~r1(X89,X90))) | ~r1(X84,X85)) | ~r1(X83,X84))))) | ~r1(X79,X80)) | ~r1(X78,X79)) | ~r1(X77,X78)) | ~r1(X76,X77)) | ~r1(X75,X76)) | ~r1(X0,X75)) & ! [X92] : (~r1(X0,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (! [X98] : (! [X99] : (~r1(X98,X99) | ~! [X100] : (~r1(X99,X100) | p1(X100)) | ! [X101] : (! [X102] : (p1(X102) | ~r1(X101,X102)) | ~r1(X99,X101))) | ~r1(X97,X98)) | ~r1(X96,X97))))) | ~r1(X92,X93))) & ! [X103] : (~r1(X0,X103) | ! [X104] : (~r1(X103,X104) | ! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | p1(X111)) | ~r1(X109,X110)) | ~! [X112] : (p1(X112) | ~r1(X109,X112)))) | ~r1(X106,X107)))))) & ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | p1(X118))) | ~! [X119] : (p1(X119) | ~r1(X116,X119)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X0,X113)) & ! [X120] : (~r1(X0,X120) | ! [X121] : (~! [X122] : (~r1(X121,X122) | p1(X122)) | ! [X123] : (~r1(X121,X123) | ! [X124] : (~r1(X123,X124) | p1(X124))) | ~r1(X120,X121))) & ! [X125] : (~r1(X0,X125) | ~! [X126] : (~r1(X125,X126) | p1(X126)) | ! [X127] : (! [X128] : (~r1(X127,X128) | p1(X128)) | ~r1(X125,X127))) & ! [X129] : (! [X130] : (~r1(X129,X130) | ! [X131] : (~! [X132] : (p1(X132) | ~r1(X131,X132)) | ! [X133] : (~r1(X131,X133) | ! [X134] : (p1(X134) | ~r1(X133,X134))) | ~r1(X130,X131))) | ~r1(X0,X129)) & ! [X135] : (! [X136] : (~r1(X135,X136) | ! [X137] : (! [X138] : (! [X139] : (! [X140] : (! [X141] : (p1(X141) | ~r1(X140,X141)) | ~r1(X139,X140)) | ~! [X142] : (p1(X142) | ~r1(X139,X142)) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137))) | ~r1(X0,X135)) & ! [X143] : (~r1(X0,X143) | ! [X144] : (~r1(X143,X144) | ! [X145] : (~r1(X144,X145) | ! [X146] : (~r1(X145,X146) | ! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (~r1(X148,X149) | ! [X150] : (p1(X150) | ~r1(X149,X150))) | ~! [X151] : (p1(X151) | ~r1(X148,X151)) | ~r1(X147,X148))))))) & ! [X152] : (~r1(X0,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (! [X155] : (~r1(X154,X155) | ! [X156] : (~r1(X155,X156) | ! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (~r1(X160,X161) | ! [X162] : (~r1(X161,X162) | p1(X162))) | ~! [X163] : (p1(X163) | ~r1(X160,X163)) | ~r1(X159,X160))))))) | ~r1(X153,X154)))) & ! [X164] : (~r1(X0,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (~r1(X165,X166) | ! [X167] : (! [X168] : (! [X169] : (! [X170] : (! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (~! [X174] : (~r1(X173,X174) | p1(X174)) | ! [X175] : (~r1(X173,X175) | ! [X176] : (~r1(X175,X176) | p1(X176))) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~r1(X169,X170)) | ~r1(X168,X169)) | ~r1(X167,X168)) | ~r1(X166,X167)))))) | ~! [X177] : (! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (~r1(X181,X182) | ! [X183] : (! [X184] : (! [X185] : (! [X186] : (! [X187] : (~r1(X186,X187) | ! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (p1(X191) | ~r1(X190,X191)) | ~r1(X189,X190)) | ~! [X192] : (~r1(X189,X192) | p1(X192))))) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184)) | ~r1(X182,X183))) | ~r1(X180,X181))))) | ~r1(X0,X177)) | ~! [X193] : (! [X194] : (! [X195] : (~r1(X194,X195) | ! [X196] : (! [X197] : (! [X198] : (~r1(X197,X198) | ! [X199] : (~r1(X198,X199) | ! [X200] : (! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (~r1(X207,X208) | p1(X208)) | ~r1(X206,X207)) | ~! [X209] : (~r1(X206,X209) | p1(X209)) | ~r1(X205,X206))) | ~r1(X203,X204)) | ~r1(X202,X203))) | ~r1(X200,X201)) | ~r1(X199,X200)))) | ~r1(X196,X197)) | ~r1(X195,X196))) | ~r1(X193,X194)) | ~r1(X0,X193)) | ~! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (! [X213] : (~r1(X212,X213) | ! [X214] : (! [X215] : (! [X216] : (! [X217] : (! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (~! [X225] : (~r1(X224,X225) | p1(X225)) | ! [X226] : (~r1(X224,X226) | ! [X227] : (~r1(X226,X227) | p1(X227))) | ~r1(X223,X224)))))) | ~r1(X218,X219))) | ~r1(X216,X217)) | ~r1(X215,X216)) | ~r1(X214,X215)) | ~r1(X213,X214))) | ~r1(X211,X212))) | ~r1(X0,X210)) | ~! [X228] : (~r1(X0,X228) | ! [X229] : (! [X230] : (! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (! [X235] : (! [X236] : (! [X237] : (~r1(X236,X237) | ! [X238] : (! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~! [X244] : (~r1(X243,X244) | p1(X244)) | ! [X245] : (! [X246] : (~r1(X245,X246) | p1(X246)) | ~r1(X243,X245)) | ~r1(X242,X243)))))) | ~r1(X237,X238))) | ~r1(X235,X236)) | ~r1(X234,X235)) | ~r1(X233,X234)))) | ~r1(X230,X231)) | ~r1(X229,X230)) | ~r1(X228,X229))) | ~! [X247] : (! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (~r1(X252,X253) | ! [X254] : (~r1(X253,X254) | ! [X255] : (! [X256] : (~r1(X255,X256) | ! [X257] : (~r1(X256,X257) | ! [X258] : (~r1(X257,X258) | ! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (~r1(X261,X262) | ! [X263] : (~r1(X262,X263) | ! [X264] : (~r1(X263,X264) | ! [X265] : (p1(X265) | ~r1(X264,X265))) | ~! [X266] : (p1(X266) | ~r1(X263,X266)))) | ~r1(X260,X261))))))) | ~r1(X254,X255)))) | ~r1(X251,X252)))))) | ~r1(X0,X247)) | ~! [X267] : (~r1(X0,X267) | ! [X268] : (~r1(X267,X268) | ! [X269] : (! [X270] : (~r1(X269,X270) | ! [X271] : (! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (~r1(X278,X279) | ! [X280] : (! [X281] : (! [X282] : (! [X283] : (! [X284] : (! [X285] : (! [X286] : (p1(X286) | ~r1(X285,X286)) | ~r1(X284,X285)) | ~! [X287] : (p1(X287) | ~r1(X284,X287)) | ~r1(X283,X284)) | ~r1(X282,X283)) | ~r1(X281,X282)) | ~r1(X280,X281)) | ~r1(X279,X280))))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272)) | ~r1(X270,X271))) | ~r1(X268,X269)))))), 32.05/32.52 inference(rectify,[],[f3])). 32.05/32.52 fof(f5,plain,( 32.05/32.52 ? [X0] : ~(~! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | ~! [X22] : (~r1(X19,X22) | p1(X22)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) | ~! [X23] : (~r1(X0,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (~! [X35] : (p1(X35) | ~r1(X34,X35)) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) | ~! [X38] : (~r1(X0,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (((~! [X49] : (~r1(X48,X49) | p1(X49) | ~! [X50] : (~r1(X49,X50) | ~p1(X50) | ! [X51] : (~r1(X50,X51) | p1(X51)))) | ! [X52] : (~r1(X48,X52) | ! [X53] : (p1(X53) | ~! [X54] : (~r1(X53,X54) | ~p1(X54) | ! [X55] : (p1(X55) | ~r1(X54,X55))) | ~r1(X52,X53)))) & ! [X56] : (~! [X57] : (p1(X57) | ~r1(X56,X57)) | ! [X58] : (~r1(X56,X58) | ! [X59] : (p1(X59) | ~r1(X58,X59))) | ~r1(X48,X56)) & (p1(X48) | ~! [X60] : (~! [X61] : (! [X62] : (~r1(X61,X62) | p1(X62)) | ~p1(X61) | ~r1(X60,X61)) | p1(X60) | ~r1(X48,X60)) | ! [X63] : (~r1(X48,X63) | ~! [X64] : (p1(X64) | ~r1(X63,X64)))) & (! [X65] : (p1(X65) | ~r1(X48,X65)) | ~p1(X48) | ~! [X66] : (~r1(X48,X66) | ! [X67] : (p1(X67) | ~r1(X66,X67)) | ~p1(X66) | ~! [X68] : (~r1(X66,X68) | ! [X69] : (! [X70] : (p1(X70) | ~r1(X69,X70)) | ~p1(X69) | ~r1(X68,X69)) | ~(~p1(X68) | ! [X71] : (~r1(X68,X71) | p1(X71))))) | ! [X72] : (~r1(X48,X72) | ~! [X73] : (~p1(X73) | ! [X74] : (~r1(X73,X74) | p1(X74)) | ~r1(X72,X73))))) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) | ~(~! [X75] : (! [X76] : (! [X77] : (! [X78] : (! [X79] : (! [X80] : (! [X81] : (~r1(X80,X81) | ! [X82] : (~r1(X81,X82) | ! [X83] : (~r1(X82,X83) | ! [X84] : (! [X85] : (! [X86] : (p1(X86) | ~r1(X85,X86)) | ! [X87] : (~r1(X85,X87) | ~! [X88] : (~r1(X87,X88) | p1(X88))) | ~! [X89] : (~r1(X85,X89) | p1(X89) | ~! [X90] : (~p1(X90) | ! [X91] : (p1(X91) | ~r1(X90,X91)) | ~r1(X89,X90))) | ~r1(X84,X85)) | ~r1(X83,X84))))) | ~r1(X79,X80)) | ~r1(X78,X79)) | ~r1(X77,X78)) | ~r1(X76,X77)) | ~r1(X75,X76)) | ~r1(X0,X75)) & ! [X92] : (~r1(X0,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (! [X98] : (! [X99] : (~r1(X98,X99) | ~! [X100] : (~r1(X99,X100) | p1(X100)) | ! [X101] : (! [X102] : (p1(X102) | ~r1(X101,X102)) | ~r1(X99,X101))) | ~r1(X97,X98)) | ~r1(X96,X97))))) | ~r1(X92,X93))) & ! [X103] : (~r1(X0,X103) | ! [X104] : (~r1(X103,X104) | ! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | p1(X111)) | ~r1(X109,X110)) | ~! [X112] : (p1(X112) | ~r1(X109,X112)))) | ~r1(X106,X107)))))) & ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | p1(X118))) | ~! [X119] : (p1(X119) | ~r1(X116,X119)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X0,X113)) & ! [X120] : (~r1(X0,X120) | ! [X121] : (~! [X122] : (~r1(X121,X122) | p1(X122)) | ! [X123] : (~r1(X121,X123) | ! [X124] : (~r1(X123,X124) | p1(X124))) | ~r1(X120,X121))) & ! [X125] : (~r1(X0,X125) | ~! [X126] : (~r1(X125,X126) | p1(X126)) | ! [X127] : (! [X128] : (~r1(X127,X128) | p1(X128)) | ~r1(X125,X127))) & ! [X129] : (! [X130] : (~r1(X129,X130) | ! [X131] : (~! [X132] : (p1(X132) | ~r1(X131,X132)) | ! [X133] : (~r1(X131,X133) | ! [X134] : (p1(X134) | ~r1(X133,X134))) | ~r1(X130,X131))) | ~r1(X0,X129)) & ! [X135] : (! [X136] : (~r1(X135,X136) | ! [X137] : (! [X138] : (! [X139] : (! [X140] : (! [X141] : (p1(X141) | ~r1(X140,X141)) | ~r1(X139,X140)) | ~! [X142] : (p1(X142) | ~r1(X139,X142)) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137))) | ~r1(X0,X135)) & ! [X143] : (~r1(X0,X143) | ! [X144] : (~r1(X143,X144) | ! [X145] : (~r1(X144,X145) | ! [X146] : (~r1(X145,X146) | ! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (~r1(X148,X149) | ! [X150] : (p1(X150) | ~r1(X149,X150))) | ~! [X151] : (p1(X151) | ~r1(X148,X151)) | ~r1(X147,X148))))))) & ! [X152] : (~r1(X0,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (! [X155] : (~r1(X154,X155) | ! [X156] : (~r1(X155,X156) | ! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (~r1(X160,X161) | ! [X162] : (~r1(X161,X162) | p1(X162))) | ~! [X163] : (p1(X163) | ~r1(X160,X163)) | ~r1(X159,X160))))))) | ~r1(X153,X154)))) & ! [X164] : (~r1(X0,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (~r1(X165,X166) | ! [X167] : (! [X168] : (! [X169] : (! [X170] : (! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (~! [X174] : (~r1(X173,X174) | p1(X174)) | ! [X175] : (~r1(X173,X175) | ! [X176] : (~r1(X175,X176) | p1(X176))) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~r1(X169,X170)) | ~r1(X168,X169)) | ~r1(X167,X168)) | ~r1(X166,X167)))))) | ~! [X177] : (! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (~r1(X181,X182) | ! [X183] : (! [X184] : (! [X185] : (! [X186] : (! [X187] : (~r1(X186,X187) | ! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (p1(X191) | ~r1(X190,X191)) | ~r1(X189,X190)) | ~! [X192] : (~r1(X189,X192) | p1(X192))))) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184)) | ~r1(X182,X183))) | ~r1(X180,X181))))) | ~r1(X0,X177)) | ~! [X193] : (! [X194] : (! [X195] : (~r1(X194,X195) | ! [X196] : (! [X197] : (! [X198] : (~r1(X197,X198) | ! [X199] : (~r1(X198,X199) | ! [X200] : (! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (~r1(X207,X208) | p1(X208)) | ~r1(X206,X207)) | ~! [X209] : (~r1(X206,X209) | p1(X209)) | ~r1(X205,X206))) | ~r1(X203,X204)) | ~r1(X202,X203))) | ~r1(X200,X201)) | ~r1(X199,X200)))) | ~r1(X196,X197)) | ~r1(X195,X196))) | ~r1(X193,X194)) | ~r1(X0,X193)) | ~! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (! [X213] : (~r1(X212,X213) | ! [X214] : (! [X215] : (! [X216] : (! [X217] : (! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (~! [X225] : (~r1(X224,X225) | p1(X225)) | ! [X226] : (~r1(X224,X226) | ! [X227] : (~r1(X226,X227) | p1(X227))) | ~r1(X223,X224)))))) | ~r1(X218,X219))) | ~r1(X216,X217)) | ~r1(X215,X216)) | ~r1(X214,X215)) | ~r1(X213,X214))) | ~r1(X211,X212))) | ~r1(X0,X210)) | ~! [X228] : (~r1(X0,X228) | ! [X229] : (! [X230] : (! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (! [X235] : (! [X236] : (! [X237] : (~r1(X236,X237) | ! [X238] : (! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (~! [X244] : (~r1(X243,X244) | p1(X244)) | ! [X245] : (! [X246] : (~r1(X245,X246) | p1(X246)) | ~r1(X243,X245)) | ~r1(X242,X243)))))) | ~r1(X237,X238))) | ~r1(X235,X236)) | ~r1(X234,X235)) | ~r1(X233,X234)))) | ~r1(X230,X231)) | ~r1(X229,X230)) | ~r1(X228,X229))) | ~! [X247] : (! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (~r1(X252,X253) | ! [X254] : (~r1(X253,X254) | ! [X255] : (! [X256] : (~r1(X255,X256) | ! [X257] : (~r1(X256,X257) | ! [X258] : (~r1(X257,X258) | ! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (~r1(X261,X262) | ! [X263] : (~r1(X262,X263) | ! [X264] : (~r1(X263,X264) | ! [X265] : (p1(X265) | ~r1(X264,X265))) | ~! [X266] : (p1(X266) | ~r1(X263,X266)))) | ~r1(X260,X261))))))) | ~r1(X254,X255)))) | ~r1(X251,X252)))))) | ~r1(X0,X247)) | ~! [X267] : (~r1(X0,X267) | ! [X268] : (~r1(X267,X268) | ! [X269] : (! [X270] : (~r1(X269,X270) | ! [X271] : (! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (~r1(X278,X279) | ! [X280] : (! [X281] : (! [X282] : (! [X283] : (! [X284] : (! [X285] : (! [X286] : (p1(X286) | ~r1(X285,X286)) | ~r1(X284,X285)) | ~! [X287] : (p1(X287) | ~r1(X284,X287)) | ~r1(X283,X284)) | ~r1(X282,X283)) | ~r1(X281,X282)) | ~r1(X280,X281)) | ~r1(X279,X280))))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272)) | ~r1(X270,X271))) | ~r1(X268,X269)))))), 32.05/32.52 inference(flattening,[],[f4])). 32.05/32.52 fof(f6,plain,( 32.05/32.52 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | ? [X22] : (r1(X19,X22) & ~p1(X22)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X23] : (~r1(X0,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (? [X35] : (~p1(X35) & r1(X34,X35)) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) & ! [X38] : (~r1(X0,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (((? [X49] : (r1(X48,X49) & ~p1(X49) & ! [X50] : (~r1(X49,X50) | ~p1(X50) | ! [X51] : (~r1(X50,X51) | p1(X51)))) | ! [X52] : (~r1(X48,X52) | ! [X53] : (p1(X53) | ? [X54] : (r1(X53,X54) & p1(X54) & ? [X55] : (~p1(X55) & r1(X54,X55))) | ~r1(X52,X53)))) & ! [X56] : (? [X57] : (~p1(X57) & r1(X56,X57)) | ! [X58] : (~r1(X56,X58) | ! [X59] : (p1(X59) | ~r1(X58,X59))) | ~r1(X48,X56)) & (p1(X48) | ? [X60] : (! [X61] : (! [X62] : (~r1(X61,X62) | p1(X62)) | ~p1(X61) | ~r1(X60,X61)) & ~p1(X60) & r1(X48,X60)) | ! [X63] : (~r1(X48,X63) | ? [X64] : (~p1(X64) & r1(X63,X64)))) & (! [X65] : (p1(X65) | ~r1(X48,X65)) | ~p1(X48) | ? [X66] : (r1(X48,X66) & ? [X67] : (~p1(X67) & r1(X66,X67)) & p1(X66) & ! [X68] : (~r1(X66,X68) | ! [X69] : (! [X70] : (p1(X70) | ~r1(X69,X70)) | ~p1(X69) | ~r1(X68,X69)) | (p1(X68) & ? [X71] : (r1(X68,X71) & ~p1(X71))))) | ! [X72] : (~r1(X48,X72) | ? [X73] : (p1(X73) & ? [X74] : (r1(X73,X74) & ~p1(X74)) & r1(X72,X73))))) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) & (? [X75] : (? [X76] : (? [X77] : (? [X78] : (? [X79] : (? [X80] : (? [X81] : (r1(X80,X81) & ? [X82] : (r1(X81,X82) & ? [X83] : (r1(X82,X83) & ? [X84] : (? [X85] : (? [X86] : (~p1(X86) & r1(X85,X86)) & ? [X87] : (r1(X85,X87) & ! [X88] : (~r1(X87,X88) | p1(X88))) & ! [X89] : (~r1(X85,X89) | p1(X89) | ? [X90] : (p1(X90) & ? [X91] : (~p1(X91) & r1(X90,X91)) & r1(X89,X90))) & r1(X84,X85)) & r1(X83,X84))))) & r1(X79,X80)) & r1(X78,X79)) & r1(X77,X78)) & r1(X76,X77)) & r1(X75,X76)) & r1(X0,X75)) & ! [X92] : (~r1(X0,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (! [X98] : (! [X99] : (~r1(X98,X99) | ? [X100] : (r1(X99,X100) & ~p1(X100)) | ! [X101] : (! [X102] : (p1(X102) | ~r1(X101,X102)) | ~r1(X99,X101))) | ~r1(X97,X98)) | ~r1(X96,X97))))) | ~r1(X92,X93))) & ! [X103] : (~r1(X0,X103) | ! [X104] : (~r1(X103,X104) | ! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | p1(X111)) | ~r1(X109,X110)) | ? [X112] : (~p1(X112) & r1(X109,X112)))) | ~r1(X106,X107)))))) & ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | p1(X118))) | ? [X119] : (~p1(X119) & r1(X116,X119)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X0,X113)) & ! [X120] : (~r1(X0,X120) | ! [X121] : (? [X122] : (r1(X121,X122) & ~p1(X122)) | ! [X123] : (~r1(X121,X123) | ! [X124] : (~r1(X123,X124) | p1(X124))) | ~r1(X120,X121))) & ! [X125] : (~r1(X0,X125) | ? [X126] : (r1(X125,X126) & ~p1(X126)) | ! [X127] : (! [X128] : (~r1(X127,X128) | p1(X128)) | ~r1(X125,X127))) & ! [X129] : (! [X130] : (~r1(X129,X130) | ! [X131] : (? [X132] : (~p1(X132) & r1(X131,X132)) | ! [X133] : (~r1(X131,X133) | ! [X134] : (p1(X134) | ~r1(X133,X134))) | ~r1(X130,X131))) | ~r1(X0,X129)) & ! [X135] : (! [X136] : (~r1(X135,X136) | ! [X137] : (! [X138] : (! [X139] : (! [X140] : (! [X141] : (p1(X141) | ~r1(X140,X141)) | ~r1(X139,X140)) | ? [X142] : (~p1(X142) & r1(X139,X142)) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137))) | ~r1(X0,X135)) & ! [X143] : (~r1(X0,X143) | ! [X144] : (~r1(X143,X144) | ! [X145] : (~r1(X144,X145) | ! [X146] : (~r1(X145,X146) | ! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (~r1(X148,X149) | ! [X150] : (p1(X150) | ~r1(X149,X150))) | ? [X151] : (~p1(X151) & r1(X148,X151)) | ~r1(X147,X148))))))) & ! [X152] : (~r1(X0,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (! [X155] : (~r1(X154,X155) | ! [X156] : (~r1(X155,X156) | ! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (~r1(X160,X161) | ! [X162] : (~r1(X161,X162) | p1(X162))) | ? [X163] : (~p1(X163) & r1(X160,X163)) | ~r1(X159,X160))))))) | ~r1(X153,X154)))) & ! [X164] : (~r1(X0,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (~r1(X165,X166) | ! [X167] : (! [X168] : (! [X169] : (! [X170] : (! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (? [X174] : (r1(X173,X174) & ~p1(X174)) | ! [X175] : (~r1(X173,X175) | ! [X176] : (~r1(X175,X176) | p1(X176))) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~r1(X169,X170)) | ~r1(X168,X169)) | ~r1(X167,X168)) | ~r1(X166,X167)))))) & ! [X177] : (! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (~r1(X181,X182) | ! [X183] : (! [X184] : (! [X185] : (! [X186] : (! [X187] : (~r1(X186,X187) | ! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (p1(X191) | ~r1(X190,X191)) | ~r1(X189,X190)) | ? [X192] : (r1(X189,X192) & ~p1(X192))))) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184)) | ~r1(X182,X183))) | ~r1(X180,X181))))) | ~r1(X0,X177)) & ! [X193] : (! [X194] : (! [X195] : (~r1(X194,X195) | ! [X196] : (! [X197] : (! [X198] : (~r1(X197,X198) | ! [X199] : (~r1(X198,X199) | ! [X200] : (! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (~r1(X207,X208) | p1(X208)) | ~r1(X206,X207)) | ? [X209] : (r1(X206,X209) & ~p1(X209)) | ~r1(X205,X206))) | ~r1(X203,X204)) | ~r1(X202,X203))) | ~r1(X200,X201)) | ~r1(X199,X200)))) | ~r1(X196,X197)) | ~r1(X195,X196))) | ~r1(X193,X194)) | ~r1(X0,X193)) & ! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (! [X213] : (~r1(X212,X213) | ! [X214] : (! [X215] : (! [X216] : (! [X217] : (! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (? [X225] : (r1(X224,X225) & ~p1(X225)) | ! [X226] : (~r1(X224,X226) | ! [X227] : (~r1(X226,X227) | p1(X227))) | ~r1(X223,X224)))))) | ~r1(X218,X219))) | ~r1(X216,X217)) | ~r1(X215,X216)) | ~r1(X214,X215)) | ~r1(X213,X214))) | ~r1(X211,X212))) | ~r1(X0,X210)) & ! [X228] : (~r1(X0,X228) | ! [X229] : (! [X230] : (! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (! [X235] : (! [X236] : (! [X237] : (~r1(X236,X237) | ! [X238] : (! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (? [X244] : (r1(X243,X244) & ~p1(X244)) | ! [X245] : (! [X246] : (~r1(X245,X246) | p1(X246)) | ~r1(X243,X245)) | ~r1(X242,X243)))))) | ~r1(X237,X238))) | ~r1(X235,X236)) | ~r1(X234,X235)) | ~r1(X233,X234)))) | ~r1(X230,X231)) | ~r1(X229,X230)) | ~r1(X228,X229))) & ! [X247] : (! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (~r1(X252,X253) | ! [X254] : (~r1(X253,X254) | ! [X255] : (! [X256] : (~r1(X255,X256) | ! [X257] : (~r1(X256,X257) | ! [X258] : (~r1(X257,X258) | ! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (~r1(X261,X262) | ! [X263] : (~r1(X262,X263) | ! [X264] : (~r1(X263,X264) | ! [X265] : (p1(X265) | ~r1(X264,X265))) | ? [X266] : (~p1(X266) & r1(X263,X266)))) | ~r1(X260,X261))))))) | ~r1(X254,X255)))) | ~r1(X251,X252)))))) | ~r1(X0,X247)) & ! [X267] : (~r1(X0,X267) | ! [X268] : (~r1(X267,X268) | ! [X269] : (! [X270] : (~r1(X269,X270) | ! [X271] : (! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (~r1(X278,X279) | ! [X280] : (! [X281] : (! [X282] : (! [X283] : (! [X284] : (! [X285] : (! [X286] : (p1(X286) | ~r1(X285,X286)) | ~r1(X284,X285)) | ? [X287] : (~p1(X287) & r1(X284,X287)) | ~r1(X283,X284)) | ~r1(X282,X283)) | ~r1(X281,X282)) | ~r1(X280,X281)) | ~r1(X279,X280))))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272)) | ~r1(X270,X271))) | ~r1(X268,X269)))))), 32.05/32.52 inference(ennf_transformation,[],[f5])). 32.05/32.52 fof(f7,plain,( 32.05/32.52 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | ? [X22] : (r1(X19,X22) & ~p1(X22)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X23] : (~r1(X0,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (? [X35] : (~p1(X35) & r1(X34,X35)) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) & ! [X38] : (~r1(X0,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (((? [X49] : (r1(X48,X49) & ~p1(X49) & ! [X50] : (~r1(X49,X50) | ~p1(X50) | ! [X51] : (~r1(X50,X51) | p1(X51)))) | ! [X52] : (~r1(X48,X52) | ! [X53] : (p1(X53) | ? [X54] : (r1(X53,X54) & p1(X54) & ? [X55] : (~p1(X55) & r1(X54,X55))) | ~r1(X52,X53)))) & ! [X56] : (? [X57] : (~p1(X57) & r1(X56,X57)) | ! [X58] : (~r1(X56,X58) | ! [X59] : (p1(X59) | ~r1(X58,X59))) | ~r1(X48,X56)) & (p1(X48) | ? [X60] : (! [X61] : (! [X62] : (~r1(X61,X62) | p1(X62)) | ~p1(X61) | ~r1(X60,X61)) & ~p1(X60) & r1(X48,X60)) | ! [X63] : (~r1(X48,X63) | ? [X64] : (~p1(X64) & r1(X63,X64)))) & (! [X65] : (p1(X65) | ~r1(X48,X65)) | ~p1(X48) | ? [X66] : (r1(X48,X66) & ? [X67] : (~p1(X67) & r1(X66,X67)) & p1(X66) & ! [X68] : (~r1(X66,X68) | ! [X69] : (! [X70] : (p1(X70) | ~r1(X69,X70)) | ~p1(X69) | ~r1(X68,X69)) | (p1(X68) & ? [X71] : (r1(X68,X71) & ~p1(X71))))) | ! [X72] : (~r1(X48,X72) | ? [X73] : (p1(X73) & ? [X74] : (r1(X73,X74) & ~p1(X74)) & r1(X72,X73))))) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) & ? [X75] : (? [X76] : (? [X77] : (? [X78] : (? [X79] : (? [X80] : (? [X81] : (r1(X80,X81) & ? [X82] : (r1(X81,X82) & ? [X83] : (r1(X82,X83) & ? [X84] : (? [X85] : (? [X86] : (~p1(X86) & r1(X85,X86)) & ? [X87] : (r1(X85,X87) & ! [X88] : (~r1(X87,X88) | p1(X88))) & ! [X89] : (~r1(X85,X89) | p1(X89) | ? [X90] : (p1(X90) & ? [X91] : (~p1(X91) & r1(X90,X91)) & r1(X89,X90))) & r1(X84,X85)) & r1(X83,X84))))) & r1(X79,X80)) & r1(X78,X79)) & r1(X77,X78)) & r1(X76,X77)) & r1(X75,X76)) & r1(X0,X75)) & ! [X92] : (~r1(X0,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (! [X98] : (! [X99] : (~r1(X98,X99) | ? [X100] : (r1(X99,X100) & ~p1(X100)) | ! [X101] : (! [X102] : (p1(X102) | ~r1(X101,X102)) | ~r1(X99,X101))) | ~r1(X97,X98)) | ~r1(X96,X97))))) | ~r1(X92,X93))) & ! [X103] : (~r1(X0,X103) | ! [X104] : (~r1(X103,X104) | ! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | p1(X111)) | ~r1(X109,X110)) | ? [X112] : (~p1(X112) & r1(X109,X112)))) | ~r1(X106,X107)))))) & ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | p1(X118))) | ? [X119] : (~p1(X119) & r1(X116,X119)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X0,X113)) & ! [X120] : (~r1(X0,X120) | ! [X121] : (? [X122] : (r1(X121,X122) & ~p1(X122)) | ! [X123] : (~r1(X121,X123) | ! [X124] : (~r1(X123,X124) | p1(X124))) | ~r1(X120,X121))) & ! [X125] : (~r1(X0,X125) | ? [X126] : (r1(X125,X126) & ~p1(X126)) | ! [X127] : (! [X128] : (~r1(X127,X128) | p1(X128)) | ~r1(X125,X127))) & ! [X129] : (! [X130] : (~r1(X129,X130) | ! [X131] : (? [X132] : (~p1(X132) & r1(X131,X132)) | ! [X133] : (~r1(X131,X133) | ! [X134] : (p1(X134) | ~r1(X133,X134))) | ~r1(X130,X131))) | ~r1(X0,X129)) & ! [X135] : (! [X136] : (~r1(X135,X136) | ! [X137] : (! [X138] : (! [X139] : (! [X140] : (! [X141] : (p1(X141) | ~r1(X140,X141)) | ~r1(X139,X140)) | ? [X142] : (~p1(X142) & r1(X139,X142)) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137))) | ~r1(X0,X135)) & ! [X143] : (~r1(X0,X143) | ! [X144] : (~r1(X143,X144) | ! [X145] : (~r1(X144,X145) | ! [X146] : (~r1(X145,X146) | ! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (~r1(X148,X149) | ! [X150] : (p1(X150) | ~r1(X149,X150))) | ? [X151] : (~p1(X151) & r1(X148,X151)) | ~r1(X147,X148))))))) & ! [X152] : (~r1(X0,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (! [X155] : (~r1(X154,X155) | ! [X156] : (~r1(X155,X156) | ! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (~r1(X160,X161) | ! [X162] : (~r1(X161,X162) | p1(X162))) | ? [X163] : (~p1(X163) & r1(X160,X163)) | ~r1(X159,X160))))))) | ~r1(X153,X154)))) & ! [X164] : (~r1(X0,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (~r1(X165,X166) | ! [X167] : (! [X168] : (! [X169] : (! [X170] : (! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (? [X174] : (r1(X173,X174) & ~p1(X174)) | ! [X175] : (~r1(X173,X175) | ! [X176] : (~r1(X175,X176) | p1(X176))) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~r1(X169,X170)) | ~r1(X168,X169)) | ~r1(X167,X168)) | ~r1(X166,X167))))) & ! [X177] : (! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (~r1(X181,X182) | ! [X183] : (! [X184] : (! [X185] : (! [X186] : (! [X187] : (~r1(X186,X187) | ! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (p1(X191) | ~r1(X190,X191)) | ~r1(X189,X190)) | ? [X192] : (r1(X189,X192) & ~p1(X192))))) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184)) | ~r1(X182,X183))) | ~r1(X180,X181))))) | ~r1(X0,X177)) & ! [X193] : (! [X194] : (! [X195] : (~r1(X194,X195) | ! [X196] : (! [X197] : (! [X198] : (~r1(X197,X198) | ! [X199] : (~r1(X198,X199) | ! [X200] : (! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (~r1(X207,X208) | p1(X208)) | ~r1(X206,X207)) | ? [X209] : (r1(X206,X209) & ~p1(X209)) | ~r1(X205,X206))) | ~r1(X203,X204)) | ~r1(X202,X203))) | ~r1(X200,X201)) | ~r1(X199,X200)))) | ~r1(X196,X197)) | ~r1(X195,X196))) | ~r1(X193,X194)) | ~r1(X0,X193)) & ! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (! [X213] : (~r1(X212,X213) | ! [X214] : (! [X215] : (! [X216] : (! [X217] : (! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (? [X225] : (r1(X224,X225) & ~p1(X225)) | ! [X226] : (~r1(X224,X226) | ! [X227] : (~r1(X226,X227) | p1(X227))) | ~r1(X223,X224)))))) | ~r1(X218,X219))) | ~r1(X216,X217)) | ~r1(X215,X216)) | ~r1(X214,X215)) | ~r1(X213,X214))) | ~r1(X211,X212))) | ~r1(X0,X210)) & ! [X228] : (~r1(X0,X228) | ! [X229] : (! [X230] : (! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (! [X235] : (! [X236] : (! [X237] : (~r1(X236,X237) | ! [X238] : (! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (? [X244] : (r1(X243,X244) & ~p1(X244)) | ! [X245] : (! [X246] : (~r1(X245,X246) | p1(X246)) | ~r1(X243,X245)) | ~r1(X242,X243)))))) | ~r1(X237,X238))) | ~r1(X235,X236)) | ~r1(X234,X235)) | ~r1(X233,X234)))) | ~r1(X230,X231)) | ~r1(X229,X230)) | ~r1(X228,X229))) & ! [X247] : (! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (~r1(X252,X253) | ! [X254] : (~r1(X253,X254) | ! [X255] : (! [X256] : (~r1(X255,X256) | ! [X257] : (~r1(X256,X257) | ! [X258] : (~r1(X257,X258) | ! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (~r1(X261,X262) | ! [X263] : (~r1(X262,X263) | ! [X264] : (~r1(X263,X264) | ! [X265] : (p1(X265) | ~r1(X264,X265))) | ? [X266] : (~p1(X266) & r1(X263,X266)))) | ~r1(X260,X261))))))) | ~r1(X254,X255)))) | ~r1(X251,X252)))))) | ~r1(X0,X247)) & ! [X267] : (~r1(X0,X267) | ! [X268] : (~r1(X267,X268) | ! [X269] : (! [X270] : (~r1(X269,X270) | ! [X271] : (! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (~r1(X278,X279) | ! [X280] : (! [X281] : (! [X282] : (! [X283] : (! [X284] : (! [X285] : (! [X286] : (p1(X286) | ~r1(X285,X286)) | ~r1(X284,X285)) | ? [X287] : (~p1(X287) & r1(X284,X287)) | ~r1(X283,X284)) | ~r1(X282,X283)) | ~r1(X281,X282)) | ~r1(X280,X281)) | ~r1(X279,X280))))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272)) | ~r1(X270,X271))) | ~r1(X268,X269)))))), 32.05/32.52 inference(flattening,[],[f6])). 32.05/32.52 fof(f8,plain,( 32.05/32.52 ! [X90] : (? [X91] : (~p1(X91) & r1(X90,X91)) | ~sP0(X90))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP0])])). 32.05/32.52 fof(f9,plain,( 32.05/32.52 ! [X89] : (? [X90] : (p1(X90) & sP0(X90) & r1(X89,X90)) | ~sP1(X89))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP1])])). 32.05/32.52 fof(f10,plain,( 32.05/32.52 ! [X73] : (? [X74] : (r1(X73,X74) & ~p1(X74)) | ~sP2(X73))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP2])])). 32.05/32.52 fof(f11,plain,( 32.05/32.52 ! [X72] : (? [X73] : (p1(X73) & sP2(X73) & r1(X72,X73)) | ~sP3(X72))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP3])])). 32.05/32.52 fof(f12,plain,( 32.05/32.52 ! [X68] : (? [X71] : (r1(X68,X71) & ~p1(X71)) | ~sP4(X68))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP4])])). 32.05/32.52 fof(f13,plain,( 32.05/32.52 ! [X66] : (! [X68] : (~r1(X66,X68) | ! [X69] : (! [X70] : (p1(X70) | ~r1(X69,X70)) | ~p1(X69) | ~r1(X68,X69)) | (p1(X68) & sP4(X68))) | ~sP5(X66))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP5])])). 32.05/32.52 fof(f14,plain,( 32.05/32.52 ! [X66] : (? [X67] : (~p1(X67) & r1(X66,X67)) | ~sP6(X66))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP6])])). 32.05/32.52 fof(f15,plain,( 32.05/32.52 ! [X48] : (? [X66] : (r1(X48,X66) & sP6(X66) & p1(X66) & sP5(X66)) | ~sP7(X48))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP7])])). 32.05/32.52 fof(f16,plain,( 32.05/32.52 ! [X48] : (? [X60] : (! [X61] : (! [X62] : (~r1(X61,X62) | p1(X62)) | ~p1(X61) | ~r1(X60,X61)) & ~p1(X60) & r1(X48,X60)) | ~sP8(X48))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP8])])). 32.05/32.52 fof(f17,plain,( 32.05/32.52 ! [X54] : (? [X55] : (~p1(X55) & r1(X54,X55)) | ~sP9(X54))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP9])])). 32.05/32.52 fof(f18,plain,( 32.05/32.52 ! [X53] : (? [X54] : (r1(X53,X54) & p1(X54) & sP9(X54)) | ~sP10(X53))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP10])])). 32.05/32.52 fof(f19,plain,( 32.05/32.52 ! [X48] : (? [X49] : (r1(X48,X49) & ~p1(X49) & ! [X50] : (~r1(X49,X50) | ~p1(X50) | ! [X51] : (~r1(X50,X51) | p1(X51)))) | ~sP11(X48))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP11])])). 32.05/32.52 fof(f20,plain,( 32.05/32.52 ! [X48] : (p1(X48) | sP8(X48) | ! [X63] : (~r1(X48,X63) | ? [X64] : (~p1(X64) & r1(X63,X64))) | ~sP12(X48))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP12])])). 32.05/32.52 fof(f21,plain,( 32.05/32.52 ! [X48] : (! [X56] : (? [X57] : (~p1(X57) & r1(X56,X57)) | ! [X58] : (~r1(X56,X58) | ! [X59] : (p1(X59) | ~r1(X58,X59))) | ~r1(X48,X56)) | ~sP13(X48))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP13])])). 32.05/32.52 fof(f22,plain,( 32.05/32.52 ! [X48] : (((sP11(X48) | ! [X52] : (~r1(X48,X52) | ! [X53] : (p1(X53) | sP10(X53) | ~r1(X52,X53)))) & sP13(X48) & sP12(X48) & (! [X65] : (p1(X65) | ~r1(X48,X65)) | ~p1(X48) | sP7(X48) | ! [X72] : (~r1(X48,X72) | sP3(X72)))) | ~sP14(X48))), 32.05/32.52 introduced(predicate_definition_introduction,[new_symbols(naming,[sP14])])). 32.05/32.53 fof(f23,plain,( 32.05/32.53 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | ? [X22] : (r1(X19,X22) & ~p1(X22)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X23] : (~r1(X0,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (? [X35] : (~p1(X35) & r1(X34,X35)) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) & ! [X38] : (~r1(X0,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (sP14(X48) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) & ? [X75] : (? [X76] : (? [X77] : (? [X78] : (? [X79] : (? [X80] : (? [X81] : (r1(X80,X81) & ? [X82] : (r1(X81,X82) & ? [X83] : (r1(X82,X83) & ? [X84] : (? [X85] : (? [X86] : (~p1(X86) & r1(X85,X86)) & ? [X87] : (r1(X85,X87) & ! [X88] : (~r1(X87,X88) | p1(X88))) & ! [X89] : (~r1(X85,X89) | p1(X89) | sP1(X89)) & r1(X84,X85)) & r1(X83,X84))))) & r1(X79,X80)) & r1(X78,X79)) & r1(X77,X78)) & r1(X76,X77)) & r1(X75,X76)) & r1(X0,X75)) & ! [X92] : (~r1(X0,X92) | ! [X93] : (! [X94] : (~r1(X93,X94) | ! [X95] : (~r1(X94,X95) | ! [X96] : (~r1(X95,X96) | ! [X97] : (! [X98] : (! [X99] : (~r1(X98,X99) | ? [X100] : (r1(X99,X100) & ~p1(X100)) | ! [X101] : (! [X102] : (p1(X102) | ~r1(X101,X102)) | ~r1(X99,X101))) | ~r1(X97,X98)) | ~r1(X96,X97))))) | ~r1(X92,X93))) & ! [X103] : (~r1(X0,X103) | ! [X104] : (~r1(X103,X104) | ! [X105] : (~r1(X104,X105) | ! [X106] : (~r1(X105,X106) | ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (~r1(X108,X109) | ! [X110] : (! [X111] : (~r1(X110,X111) | p1(X111)) | ~r1(X109,X110)) | ? [X112] : (~p1(X112) & r1(X109,X112)))) | ~r1(X106,X107)))))) & ! [X113] : (! [X114] : (! [X115] : (~r1(X114,X115) | ! [X116] : (! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | p1(X118))) | ? [X119] : (~p1(X119) & r1(X116,X119)) | ~r1(X115,X116))) | ~r1(X113,X114)) | ~r1(X0,X113)) & ! [X120] : (~r1(X0,X120) | ! [X121] : (? [X122] : (r1(X121,X122) & ~p1(X122)) | ! [X123] : (~r1(X121,X123) | ! [X124] : (~r1(X123,X124) | p1(X124))) | ~r1(X120,X121))) & ! [X125] : (~r1(X0,X125) | ? [X126] : (r1(X125,X126) & ~p1(X126)) | ! [X127] : (! [X128] : (~r1(X127,X128) | p1(X128)) | ~r1(X125,X127))) & ! [X129] : (! [X130] : (~r1(X129,X130) | ! [X131] : (? [X132] : (~p1(X132) & r1(X131,X132)) | ! [X133] : (~r1(X131,X133) | ! [X134] : (p1(X134) | ~r1(X133,X134))) | ~r1(X130,X131))) | ~r1(X0,X129)) & ! [X135] : (! [X136] : (~r1(X135,X136) | ! [X137] : (! [X138] : (! [X139] : (! [X140] : (! [X141] : (p1(X141) | ~r1(X140,X141)) | ~r1(X139,X140)) | ? [X142] : (~p1(X142) & r1(X139,X142)) | ~r1(X138,X139)) | ~r1(X137,X138)) | ~r1(X136,X137))) | ~r1(X0,X135)) & ! [X143] : (~r1(X0,X143) | ! [X144] : (~r1(X143,X144) | ! [X145] : (~r1(X144,X145) | ! [X146] : (~r1(X145,X146) | ! [X147] : (~r1(X146,X147) | ! [X148] : (! [X149] : (~r1(X148,X149) | ! [X150] : (p1(X150) | ~r1(X149,X150))) | ? [X151] : (~p1(X151) & r1(X148,X151)) | ~r1(X147,X148))))))) & ! [X152] : (~r1(X0,X152) | ! [X153] : (~r1(X152,X153) | ! [X154] : (! [X155] : (~r1(X154,X155) | ! [X156] : (~r1(X155,X156) | ! [X157] : (~r1(X156,X157) | ! [X158] : (~r1(X157,X158) | ! [X159] : (~r1(X158,X159) | ! [X160] : (! [X161] : (~r1(X160,X161) | ! [X162] : (~r1(X161,X162) | p1(X162))) | ? [X163] : (~p1(X163) & r1(X160,X163)) | ~r1(X159,X160))))))) | ~r1(X153,X154)))) & ! [X164] : (~r1(X0,X164) | ! [X165] : (~r1(X164,X165) | ! [X166] : (~r1(X165,X166) | ! [X167] : (! [X168] : (! [X169] : (! [X170] : (! [X171] : (! [X172] : (~r1(X171,X172) | ! [X173] : (? [X174] : (r1(X173,X174) & ~p1(X174)) | ! [X175] : (~r1(X173,X175) | ! [X176] : (~r1(X175,X176) | p1(X176))) | ~r1(X172,X173))) | ~r1(X170,X171)) | ~r1(X169,X170)) | ~r1(X168,X169)) | ~r1(X167,X168)) | ~r1(X166,X167))))) & ! [X177] : (! [X178] : (~r1(X177,X178) | ! [X179] : (~r1(X178,X179) | ! [X180] : (~r1(X179,X180) | ! [X181] : (! [X182] : (~r1(X181,X182) | ! [X183] : (! [X184] : (! [X185] : (! [X186] : (! [X187] : (~r1(X186,X187) | ! [X188] : (~r1(X187,X188) | ! [X189] : (~r1(X188,X189) | ! [X190] : (! [X191] : (p1(X191) | ~r1(X190,X191)) | ~r1(X189,X190)) | ? [X192] : (r1(X189,X192) & ~p1(X192))))) | ~r1(X185,X186)) | ~r1(X184,X185)) | ~r1(X183,X184)) | ~r1(X182,X183))) | ~r1(X180,X181))))) | ~r1(X0,X177)) & ! [X193] : (! [X194] : (! [X195] : (~r1(X194,X195) | ! [X196] : (! [X197] : (! [X198] : (~r1(X197,X198) | ! [X199] : (~r1(X198,X199) | ! [X200] : (! [X201] : (! [X202] : (~r1(X201,X202) | ! [X203] : (! [X204] : (! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (~r1(X207,X208) | p1(X208)) | ~r1(X206,X207)) | ? [X209] : (r1(X206,X209) & ~p1(X209)) | ~r1(X205,X206))) | ~r1(X203,X204)) | ~r1(X202,X203))) | ~r1(X200,X201)) | ~r1(X199,X200)))) | ~r1(X196,X197)) | ~r1(X195,X196))) | ~r1(X193,X194)) | ~r1(X0,X193)) & ! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (! [X213] : (~r1(X212,X213) | ! [X214] : (! [X215] : (! [X216] : (! [X217] : (! [X218] : (~r1(X217,X218) | ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (? [X225] : (r1(X224,X225) & ~p1(X225)) | ! [X226] : (~r1(X224,X226) | ! [X227] : (~r1(X226,X227) | p1(X227))) | ~r1(X223,X224)))))) | ~r1(X218,X219))) | ~r1(X216,X217)) | ~r1(X215,X216)) | ~r1(X214,X215)) | ~r1(X213,X214))) | ~r1(X211,X212))) | ~r1(X0,X210)) & ! [X228] : (~r1(X0,X228) | ! [X229] : (! [X230] : (! [X231] : (! [X232] : (~r1(X231,X232) | ! [X233] : (~r1(X232,X233) | ! [X234] : (! [X235] : (! [X236] : (! [X237] : (~r1(X236,X237) | ! [X238] : (! [X239] : (~r1(X238,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (~r1(X240,X241) | ! [X242] : (~r1(X241,X242) | ! [X243] : (? [X244] : (r1(X243,X244) & ~p1(X244)) | ! [X245] : (! [X246] : (~r1(X245,X246) | p1(X246)) | ~r1(X243,X245)) | ~r1(X242,X243)))))) | ~r1(X237,X238))) | ~r1(X235,X236)) | ~r1(X234,X235)) | ~r1(X233,X234)))) | ~r1(X230,X231)) | ~r1(X229,X230)) | ~r1(X228,X229))) & ! [X247] : (! [X248] : (~r1(X247,X248) | ! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (~r1(X252,X253) | ! [X254] : (~r1(X253,X254) | ! [X255] : (! [X256] : (~r1(X255,X256) | ! [X257] : (~r1(X256,X257) | ! [X258] : (~r1(X257,X258) | ! [X259] : (~r1(X258,X259) | ! [X260] : (~r1(X259,X260) | ! [X261] : (! [X262] : (~r1(X261,X262) | ! [X263] : (~r1(X262,X263) | ! [X264] : (~r1(X263,X264) | ! [X265] : (p1(X265) | ~r1(X264,X265))) | ? [X266] : (~p1(X266) & r1(X263,X266)))) | ~r1(X260,X261))))))) | ~r1(X254,X255)))) | ~r1(X251,X252)))))) | ~r1(X0,X247)) & ! [X267] : (~r1(X0,X267) | ! [X268] : (~r1(X267,X268) | ! [X269] : (! [X270] : (~r1(X269,X270) | ! [X271] : (! [X272] : (! [X273] : (! [X274] : (~r1(X273,X274) | ! [X275] : (~r1(X274,X275) | ! [X276] : (! [X277] : (~r1(X276,X277) | ! [X278] : (~r1(X277,X278) | ! [X279] : (~r1(X278,X279) | ! [X280] : (! [X281] : (! [X282] : (! [X283] : (! [X284] : (! [X285] : (! [X286] : (p1(X286) | ~r1(X285,X286)) | ~r1(X284,X285)) | ? [X287] : (~p1(X287) & r1(X284,X287)) | ~r1(X283,X284)) | ~r1(X282,X283)) | ~r1(X281,X282)) | ~r1(X280,X281)) | ~r1(X279,X280))))) | ~r1(X275,X276)))) | ~r1(X272,X273)) | ~r1(X271,X272)) | ~r1(X270,X271))) | ~r1(X268,X269)))))), 32.05/32.53 inference(definition_folding,[],[f7,f22,f21,f20,f19,f18,f17,f16,f15,f14,f13,f12,f11,f10,f9,f8])). 32.05/32.53 fof(f24,plain,( 32.05/32.53 ! [X48] : (((sP11(X48) | ! [X52] : (~r1(X48,X52) | ! [X53] : (p1(X53) | sP10(X53) | ~r1(X52,X53)))) & sP13(X48) & sP12(X48) & (! [X65] : (p1(X65) | ~r1(X48,X65)) | ~p1(X48) | sP7(X48) | ! [X72] : (~r1(X48,X72) | sP3(X72)))) | ~sP14(X48))), 32.05/32.53 inference(nnf_transformation,[],[f22])). 32.05/32.53 fof(f25,plain,( 32.05/32.53 ! [X0] : (((sP11(X0) | ! [X1] : (~r1(X0,X1) | ! [X2] : (p1(X2) | sP10(X2) | ~r1(X1,X2)))) & sP13(X0) & sP12(X0) & (! [X3] : (p1(X3) | ~r1(X0,X3)) | ~p1(X0) | sP7(X0) | ! [X4] : (~r1(X0,X4) | sP3(X4)))) | ~sP14(X0))), 32.05/32.53 inference(rectify,[],[f24])). 32.05/32.53 fof(f26,plain,( 32.05/32.53 ! [X48] : (! [X56] : (? [X57] : (~p1(X57) & r1(X56,X57)) | ! [X58] : (~r1(X56,X58) | ! [X59] : (p1(X59) | ~r1(X58,X59))) | ~r1(X48,X56)) | ~sP13(X48))), 32.05/32.53 inference(nnf_transformation,[],[f21])). 32.05/32.53 fof(f27,plain,( 32.05/32.53 ! [X0] : (! [X1] : (? [X2] : (~p1(X2) & r1(X1,X2)) | ! [X3] : (~r1(X1,X3) | ! [X4] : (p1(X4) | ~r1(X3,X4))) | ~r1(X0,X1)) | ~sP13(X0))), 32.05/32.53 inference(rectify,[],[f26])). 32.05/32.53 fof(f28,plain,( 32.05/32.53 ! [X1] : (? [X2] : (~p1(X2) & r1(X1,X2)) => (~p1(sK15(X1)) & r1(X1,sK15(X1))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f29,plain,( 32.05/32.53 ! [X0] : (! [X1] : ((~p1(sK15(X1)) & r1(X1,sK15(X1))) | ! [X3] : (~r1(X1,X3) | ! [X4] : (p1(X4) | ~r1(X3,X4))) | ~r1(X0,X1)) | ~sP13(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK15])],[f27,f28])). 32.05/32.53 fof(f30,plain,( 32.05/32.53 ! [X48] : (p1(X48) | sP8(X48) | ! [X63] : (~r1(X48,X63) | ? [X64] : (~p1(X64) & r1(X63,X64))) | ~sP12(X48))), 32.05/32.53 inference(nnf_transformation,[],[f20])). 32.05/32.53 fof(f31,plain,( 32.05/32.53 ! [X0] : (p1(X0) | sP8(X0) | ! [X1] : (~r1(X0,X1) | ? [X2] : (~p1(X2) & r1(X1,X2))) | ~sP12(X0))), 32.05/32.53 inference(rectify,[],[f30])). 32.05/32.53 fof(f32,plain,( 32.05/32.53 ! [X1] : (? [X2] : (~p1(X2) & r1(X1,X2)) => (~p1(sK16(X1)) & r1(X1,sK16(X1))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f33,plain,( 32.05/32.53 ! [X0] : (p1(X0) | sP8(X0) | ! [X1] : (~r1(X0,X1) | (~p1(sK16(X1)) & r1(X1,sK16(X1)))) | ~sP12(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK16])],[f31,f32])). 32.05/32.53 fof(f34,plain,( 32.05/32.53 ! [X48] : (? [X49] : (r1(X48,X49) & ~p1(X49) & ! [X50] : (~r1(X49,X50) | ~p1(X50) | ! [X51] : (~r1(X50,X51) | p1(X51)))) | ~sP11(X48))), 32.05/32.53 inference(nnf_transformation,[],[f19])). 32.05/32.53 fof(f35,plain,( 32.05/32.53 ! [X0] : (? [X1] : (r1(X0,X1) & ~p1(X1) & ! [X2] : (~r1(X1,X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3)))) | ~sP11(X0))), 32.05/32.53 inference(rectify,[],[f34])). 32.05/32.53 fof(f36,plain,( 32.05/32.53 ! [X0] : (? [X1] : (r1(X0,X1) & ~p1(X1) & ! [X2] : (~r1(X1,X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3)))) => (r1(X0,sK17(X0)) & ~p1(sK17(X0)) & ! [X2] : (~r1(sK17(X0),X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3)))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f37,plain,( 32.05/32.53 ! [X0] : ((r1(X0,sK17(X0)) & ~p1(sK17(X0)) & ! [X2] : (~r1(sK17(X0),X2) | ~p1(X2) | ! [X3] : (~r1(X2,X3) | p1(X3)))) | ~sP11(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK17])],[f35,f36])). 32.05/32.53 fof(f38,plain,( 32.05/32.53 ! [X53] : (? [X54] : (r1(X53,X54) & p1(X54) & sP9(X54)) | ~sP10(X53))), 32.05/32.53 inference(nnf_transformation,[],[f18])). 32.05/32.53 fof(f39,plain,( 32.05/32.53 ! [X0] : (? [X1] : (r1(X0,X1) & p1(X1) & sP9(X1)) | ~sP10(X0))), 32.05/32.53 inference(rectify,[],[f38])). 32.05/32.53 fof(f40,plain,( 32.05/32.53 ! [X0] : (? [X1] : (r1(X0,X1) & p1(X1) & sP9(X1)) => (r1(X0,sK18(X0)) & p1(sK18(X0)) & sP9(sK18(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f41,plain,( 32.05/32.53 ! [X0] : ((r1(X0,sK18(X0)) & p1(sK18(X0)) & sP9(sK18(X0))) | ~sP10(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK18])],[f39,f40])). 32.05/32.53 fof(f42,plain,( 32.05/32.53 ! [X54] : (? [X55] : (~p1(X55) & r1(X54,X55)) | ~sP9(X54))), 32.05/32.53 inference(nnf_transformation,[],[f17])). 32.05/32.53 fof(f43,plain,( 32.05/32.53 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) | ~sP9(X0))), 32.05/32.53 inference(rectify,[],[f42])). 32.05/32.53 fof(f44,plain,( 32.05/32.53 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) => (~p1(sK19(X0)) & r1(X0,sK19(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f45,plain,( 32.05/32.53 ! [X0] : ((~p1(sK19(X0)) & r1(X0,sK19(X0))) | ~sP9(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK19])],[f43,f44])). 32.05/32.53 fof(f46,plain,( 32.05/32.53 ! [X48] : (? [X60] : (! [X61] : (! [X62] : (~r1(X61,X62) | p1(X62)) | ~p1(X61) | ~r1(X60,X61)) & ~p1(X60) & r1(X48,X60)) | ~sP8(X48))), 32.05/32.53 inference(nnf_transformation,[],[f16])). 32.05/32.53 fof(f47,plain,( 32.05/32.53 ! [X0] : (? [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | p1(X3)) | ~p1(X2) | ~r1(X1,X2)) & ~p1(X1) & r1(X0,X1)) | ~sP8(X0))), 32.05/32.53 inference(rectify,[],[f46])). 32.05/32.53 fof(f48,plain,( 32.05/32.53 ! [X0] : (? [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | p1(X3)) | ~p1(X2) | ~r1(X1,X2)) & ~p1(X1) & r1(X0,X1)) => (! [X2] : (! [X3] : (~r1(X2,X3) | p1(X3)) | ~p1(X2) | ~r1(sK20(X0),X2)) & ~p1(sK20(X0)) & r1(X0,sK20(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f49,plain,( 32.05/32.53 ! [X0] : ((! [X2] : (! [X3] : (~r1(X2,X3) | p1(X3)) | ~p1(X2) | ~r1(sK20(X0),X2)) & ~p1(sK20(X0)) & r1(X0,sK20(X0))) | ~sP8(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK20])],[f47,f48])). 32.05/32.53 fof(f50,plain,( 32.05/32.53 ! [X48] : (? [X66] : (r1(X48,X66) & sP6(X66) & p1(X66) & sP5(X66)) | ~sP7(X48))), 32.05/32.53 inference(nnf_transformation,[],[f15])). 32.05/32.53 fof(f51,plain,( 32.05/32.53 ! [X0] : (? [X1] : (r1(X0,X1) & sP6(X1) & p1(X1) & sP5(X1)) | ~sP7(X0))), 32.05/32.53 inference(rectify,[],[f50])). 32.05/32.53 fof(f52,plain,( 32.05/32.53 ! [X0] : (? [X1] : (r1(X0,X1) & sP6(X1) & p1(X1) & sP5(X1)) => (r1(X0,sK21(X0)) & sP6(sK21(X0)) & p1(sK21(X0)) & sP5(sK21(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f53,plain,( 32.05/32.53 ! [X0] : ((r1(X0,sK21(X0)) & sP6(sK21(X0)) & p1(sK21(X0)) & sP5(sK21(X0))) | ~sP7(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK21])],[f51,f52])). 32.05/32.53 fof(f54,plain,( 32.05/32.53 ! [X66] : (? [X67] : (~p1(X67) & r1(X66,X67)) | ~sP6(X66))), 32.05/32.53 inference(nnf_transformation,[],[f14])). 32.05/32.53 fof(f55,plain,( 32.05/32.53 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) | ~sP6(X0))), 32.05/32.53 inference(rectify,[],[f54])). 32.05/32.53 fof(f56,plain,( 32.05/32.53 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) => (~p1(sK22(X0)) & r1(X0,sK22(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f57,plain,( 32.05/32.53 ! [X0] : ((~p1(sK22(X0)) & r1(X0,sK22(X0))) | ~sP6(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK22])],[f55,f56])). 32.05/32.53 fof(f58,plain,( 32.05/32.53 ! [X66] : (! [X68] : (~r1(X66,X68) | ! [X69] : (! [X70] : (p1(X70) | ~r1(X69,X70)) | ~p1(X69) | ~r1(X68,X69)) | (p1(X68) & sP4(X68))) | ~sP5(X66))), 32.05/32.53 inference(nnf_transformation,[],[f13])). 32.05/32.53 fof(f59,plain,( 32.05/32.53 ! [X0] : (! [X1] : (~r1(X0,X1) | ! [X2] : (! [X3] : (p1(X3) | ~r1(X2,X3)) | ~p1(X2) | ~r1(X1,X2)) | (p1(X1) & sP4(X1))) | ~sP5(X0))), 32.05/32.53 inference(rectify,[],[f58])). 32.05/32.53 fof(f64,plain,( 32.05/32.53 ! [X72] : (? [X73] : (p1(X73) & sP2(X73) & r1(X72,X73)) | ~sP3(X72))), 32.05/32.53 inference(nnf_transformation,[],[f11])). 32.05/32.53 fof(f65,plain,( 32.05/32.53 ! [X0] : (? [X1] : (p1(X1) & sP2(X1) & r1(X0,X1)) | ~sP3(X0))), 32.05/32.53 inference(rectify,[],[f64])). 32.05/32.53 fof(f66,plain,( 32.05/32.53 ! [X0] : (? [X1] : (p1(X1) & sP2(X1) & r1(X0,X1)) => (p1(sK24(X0)) & sP2(sK24(X0)) & r1(X0,sK24(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f67,plain,( 32.05/32.53 ! [X0] : ((p1(sK24(X0)) & sP2(sK24(X0)) & r1(X0,sK24(X0))) | ~sP3(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK24])],[f65,f66])). 32.05/32.53 fof(f68,plain,( 32.05/32.53 ! [X73] : (? [X74] : (r1(X73,X74) & ~p1(X74)) | ~sP2(X73))), 32.05/32.53 inference(nnf_transformation,[],[f10])). 32.05/32.53 fof(f69,plain,( 32.05/32.53 ! [X0] : (? [X1] : (r1(X0,X1) & ~p1(X1)) | ~sP2(X0))), 32.05/32.53 inference(rectify,[],[f68])). 32.05/32.53 fof(f70,plain,( 32.05/32.53 ! [X0] : (? [X1] : (r1(X0,X1) & ~p1(X1)) => (r1(X0,sK25(X0)) & ~p1(sK25(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f71,plain,( 32.05/32.53 ! [X0] : ((r1(X0,sK25(X0)) & ~p1(sK25(X0))) | ~sP2(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK25])],[f69,f70])). 32.05/32.53 fof(f72,plain,( 32.05/32.53 ! [X89] : (? [X90] : (p1(X90) & sP0(X90) & r1(X89,X90)) | ~sP1(X89))), 32.05/32.53 inference(nnf_transformation,[],[f9])). 32.05/32.53 fof(f73,plain,( 32.05/32.53 ! [X0] : (? [X1] : (p1(X1) & sP0(X1) & r1(X0,X1)) | ~sP1(X0))), 32.05/32.53 inference(rectify,[],[f72])). 32.05/32.53 fof(f74,plain,( 32.05/32.53 ! [X0] : (? [X1] : (p1(X1) & sP0(X1) & r1(X0,X1)) => (p1(sK26(X0)) & sP0(sK26(X0)) & r1(X0,sK26(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f75,plain,( 32.05/32.53 ! [X0] : ((p1(sK26(X0)) & sP0(sK26(X0)) & r1(X0,sK26(X0))) | ~sP1(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK26])],[f73,f74])). 32.05/32.53 fof(f76,plain,( 32.05/32.53 ! [X90] : (? [X91] : (~p1(X91) & r1(X90,X91)) | ~sP0(X90))), 32.05/32.53 inference(nnf_transformation,[],[f8])). 32.05/32.53 fof(f77,plain,( 32.05/32.53 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) | ~sP0(X0))), 32.05/32.53 inference(rectify,[],[f76])). 32.05/32.53 fof(f78,plain,( 32.05/32.53 ! [X0] : (? [X1] : (~p1(X1) & r1(X0,X1)) => (~p1(sK27(X0)) & r1(X0,sK27(X0))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f79,plain,( 32.05/32.53 ! [X0] : ((~p1(sK27(X0)) & r1(X0,sK27(X0))) | ~sP0(X0))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK27])],[f77,f78])). 32.05/32.53 fof(f80,plain,( 32.05/32.53 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | ? [X22] : (r1(X19,X22) & ~p1(X22)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X23] : (~r1(X0,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (? [X35] : (~p1(X35) & r1(X34,X35)) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) & ! [X38] : (~r1(X0,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (sP14(X48) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) & ? [X49] : (? [X50] : (? [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) & r1(X50,X51)) & r1(X49,X50)) & r1(X0,X49)) & ! [X64] : (~r1(X0,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (~r1(X67,X68) | ! [X69] : (! [X70] : (! [X71] : (~r1(X70,X71) | ? [X72] : (r1(X71,X72) & ~p1(X72)) | ! [X73] : (! [X74] : (p1(X74) | ~r1(X73,X74)) | ~r1(X71,X73))) | ~r1(X69,X70)) | ~r1(X68,X69))))) | ~r1(X64,X65))) & ! [X75] : (~r1(X0,X75) | ! [X76] : (~r1(X75,X76) | ! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (~r1(X82,X83) | p1(X83)) | ~r1(X81,X82)) | ? [X84] : (~p1(X84) & r1(X81,X84)))) | ~r1(X78,X79)))))) & ! [X85] : (! [X86] : (! [X87] : (~r1(X86,X87) | ! [X88] : (! [X89] : (~r1(X88,X89) | ! [X90] : (~r1(X89,X90) | p1(X90))) | ? [X91] : (~p1(X91) & r1(X88,X91)) | ~r1(X87,X88))) | ~r1(X85,X86)) | ~r1(X0,X85)) & ! [X92] : (~r1(X0,X92) | ! [X93] : (? [X94] : (r1(X93,X94) & ~p1(X94)) | ! [X95] : (~r1(X93,X95) | ! [X96] : (~r1(X95,X96) | p1(X96))) | ~r1(X92,X93))) & ! [X97] : (~r1(X0,X97) | ? [X98] : (r1(X97,X98) & ~p1(X98)) | ! [X99] : (! [X100] : (~r1(X99,X100) | p1(X100)) | ~r1(X97,X99))) & ! [X101] : (! [X102] : (~r1(X101,X102) | ! [X103] : (? [X104] : (~p1(X104) & r1(X103,X104)) | ! [X105] : (~r1(X103,X105) | ! [X106] : (p1(X106) | ~r1(X105,X106))) | ~r1(X102,X103))) | ~r1(X0,X101)) & ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (! [X110] : (! [X111] : (! [X112] : (! [X113] : (p1(X113) | ~r1(X112,X113)) | ~r1(X111,X112)) | ? [X114] : (~p1(X114) & r1(X111,X114)) | ~r1(X110,X111)) | ~r1(X109,X110)) | ~r1(X108,X109))) | ~r1(X0,X107)) & ! [X115] : (~r1(X0,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | ! [X119] : (~r1(X118,X119) | ! [X120] : (! [X121] : (~r1(X120,X121) | ! [X122] : (p1(X122) | ~r1(X121,X122))) | ? [X123] : (~p1(X123) & r1(X120,X123)) | ~r1(X119,X120))))))) & ! [X124] : (~r1(X0,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (~r1(X128,X129) | ! [X130] : (~r1(X129,X130) | ! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (~r1(X132,X133) | ! [X134] : (~r1(X133,X134) | p1(X134))) | ? [X135] : (~p1(X135) & r1(X132,X135)) | ~r1(X131,X132))))))) | ~r1(X125,X126)))) & ! [X136] : (~r1(X0,X136) | ! [X137] : (~r1(X136,X137) | ! [X138] : (~r1(X137,X138) | ! [X139] : (! [X140] : (! [X141] : (! [X142] : (! [X143] : (! [X144] : (~r1(X143,X144) | ! [X145] : (? [X146] : (r1(X145,X146) & ~p1(X146)) | ! [X147] : (~r1(X145,X147) | ! [X148] : (~r1(X147,X148) | p1(X148))) | ~r1(X144,X145))) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141)) | ~r1(X139,X140)) | ~r1(X138,X139))))) & ! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (~r1(X159,X160) | ! [X161] : (~r1(X160,X161) | ! [X162] : (! [X163] : (p1(X163) | ~r1(X162,X163)) | ~r1(X161,X162)) | ? [X164] : (r1(X161,X164) & ~p1(X164))))) | ~r1(X157,X158)) | ~r1(X156,X157)) | ~r1(X155,X156)) | ~r1(X154,X155))) | ~r1(X152,X153))))) | ~r1(X0,X149)) & ! [X165] : (! [X166] : (! [X167] : (~r1(X166,X167) | ! [X168] : (! [X169] : (! [X170] : (~r1(X169,X170) | ! [X171] : (~r1(X170,X171) | ! [X172] : (! [X173] : (! [X174] : (~r1(X173,X174) | ! [X175] : (! [X176] : (! [X177] : (~r1(X176,X177) | ! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | p1(X180)) | ~r1(X178,X179)) | ? [X181] : (r1(X178,X181) & ~p1(X181)) | ~r1(X177,X178))) | ~r1(X175,X176)) | ~r1(X174,X175))) | ~r1(X172,X173)) | ~r1(X171,X172)))) | ~r1(X168,X169)) | ~r1(X167,X168))) | ~r1(X165,X166)) | ~r1(X0,X165)) & ! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (~r1(X184,X185) | ! [X186] : (! [X187] : (! [X188] : (! [X189] : (! [X190] : (~r1(X189,X190) | ! [X191] : (! [X192] : (~r1(X191,X192) | ! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (? [X197] : (r1(X196,X197) & ~p1(X197)) | ! [X198] : (~r1(X196,X198) | ! [X199] : (~r1(X198,X199) | p1(X199))) | ~r1(X195,X196)))))) | ~r1(X190,X191))) | ~r1(X188,X189)) | ~r1(X187,X188)) | ~r1(X186,X187)) | ~r1(X185,X186))) | ~r1(X183,X184))) | ~r1(X0,X182)) & ! [X200] : (~r1(X0,X200) | ! [X201] : (! [X202] : (! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (! [X209] : (~r1(X208,X209) | ! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (~r1(X211,X212) | ! [X213] : (~r1(X212,X213) | ! [X214] : (~r1(X213,X214) | ! [X215] : (? [X216] : (r1(X215,X216) & ~p1(X216)) | ! [X217] : (! [X218] : (~r1(X217,X218) | p1(X218)) | ~r1(X215,X217)) | ~r1(X214,X215)))))) | ~r1(X209,X210))) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)))) | ~r1(X202,X203)) | ~r1(X201,X202)) | ~r1(X200,X201))) & ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (~r1(X225,X226) | ! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (~r1(X230,X231) | ! [X232] : (~r1(X231,X232) | ! [X233] : (! [X234] : (~r1(X233,X234) | ! [X235] : (~r1(X234,X235) | ! [X236] : (~r1(X235,X236) | ! [X237] : (p1(X237) | ~r1(X236,X237))) | ? [X238] : (~p1(X238) & r1(X235,X238)))) | ~r1(X232,X233))))))) | ~r1(X226,X227)))) | ~r1(X223,X224)))))) | ~r1(X0,X219)) & ! [X239] : (~r1(X0,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (! [X242] : (~r1(X241,X242) | ! [X243] : (! [X244] : (! [X245] : (! [X246] : (~r1(X245,X246) | ! [X247] : (~r1(X246,X247) | ! [X248] : (! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (! [X254] : (! [X255] : (! [X256] : (! [X257] : (! [X258] : (p1(X258) | ~r1(X257,X258)) | ~r1(X256,X257)) | ? [X259] : (~p1(X259) & r1(X256,X259)) | ~r1(X255,X256)) | ~r1(X254,X255)) | ~r1(X253,X254)) | ~r1(X252,X253)) | ~r1(X251,X252))))) | ~r1(X247,X248)))) | ~r1(X244,X245)) | ~r1(X243,X244)) | ~r1(X242,X243))) | ~r1(X240,X241)))))), 32.05/32.53 inference(rectify,[],[f23])). 32.05/32.53 fof(f81,plain,( 32.05/32.53 ? [X0] : (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | ? [X22] : (r1(X19,X22) & ~p1(X22)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(X0,X1)) & ! [X23] : (~r1(X0,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (? [X35] : (~p1(X35) & r1(X34,X35)) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) & ! [X38] : (~r1(X0,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (sP14(X48) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) & ? [X49] : (? [X50] : (? [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) & r1(X50,X51)) & r1(X49,X50)) & r1(X0,X49)) & ! [X64] : (~r1(X0,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (~r1(X67,X68) | ! [X69] : (! [X70] : (! [X71] : (~r1(X70,X71) | ? [X72] : (r1(X71,X72) & ~p1(X72)) | ! [X73] : (! [X74] : (p1(X74) | ~r1(X73,X74)) | ~r1(X71,X73))) | ~r1(X69,X70)) | ~r1(X68,X69))))) | ~r1(X64,X65))) & ! [X75] : (~r1(X0,X75) | ! [X76] : (~r1(X75,X76) | ! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (~r1(X82,X83) | p1(X83)) | ~r1(X81,X82)) | ? [X84] : (~p1(X84) & r1(X81,X84)))) | ~r1(X78,X79)))))) & ! [X85] : (! [X86] : (! [X87] : (~r1(X86,X87) | ! [X88] : (! [X89] : (~r1(X88,X89) | ! [X90] : (~r1(X89,X90) | p1(X90))) | ? [X91] : (~p1(X91) & r1(X88,X91)) | ~r1(X87,X88))) | ~r1(X85,X86)) | ~r1(X0,X85)) & ! [X92] : (~r1(X0,X92) | ! [X93] : (? [X94] : (r1(X93,X94) & ~p1(X94)) | ! [X95] : (~r1(X93,X95) | ! [X96] : (~r1(X95,X96) | p1(X96))) | ~r1(X92,X93))) & ! [X97] : (~r1(X0,X97) | ? [X98] : (r1(X97,X98) & ~p1(X98)) | ! [X99] : (! [X100] : (~r1(X99,X100) | p1(X100)) | ~r1(X97,X99))) & ! [X101] : (! [X102] : (~r1(X101,X102) | ! [X103] : (? [X104] : (~p1(X104) & r1(X103,X104)) | ! [X105] : (~r1(X103,X105) | ! [X106] : (p1(X106) | ~r1(X105,X106))) | ~r1(X102,X103))) | ~r1(X0,X101)) & ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (! [X110] : (! [X111] : (! [X112] : (! [X113] : (p1(X113) | ~r1(X112,X113)) | ~r1(X111,X112)) | ? [X114] : (~p1(X114) & r1(X111,X114)) | ~r1(X110,X111)) | ~r1(X109,X110)) | ~r1(X108,X109))) | ~r1(X0,X107)) & ! [X115] : (~r1(X0,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | ! [X119] : (~r1(X118,X119) | ! [X120] : (! [X121] : (~r1(X120,X121) | ! [X122] : (p1(X122) | ~r1(X121,X122))) | ? [X123] : (~p1(X123) & r1(X120,X123)) | ~r1(X119,X120))))))) & ! [X124] : (~r1(X0,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (~r1(X128,X129) | ! [X130] : (~r1(X129,X130) | ! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (~r1(X132,X133) | ! [X134] : (~r1(X133,X134) | p1(X134))) | ? [X135] : (~p1(X135) & r1(X132,X135)) | ~r1(X131,X132))))))) | ~r1(X125,X126)))) & ! [X136] : (~r1(X0,X136) | ! [X137] : (~r1(X136,X137) | ! [X138] : (~r1(X137,X138) | ! [X139] : (! [X140] : (! [X141] : (! [X142] : (! [X143] : (! [X144] : (~r1(X143,X144) | ! [X145] : (? [X146] : (r1(X145,X146) & ~p1(X146)) | ! [X147] : (~r1(X145,X147) | ! [X148] : (~r1(X147,X148) | p1(X148))) | ~r1(X144,X145))) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141)) | ~r1(X139,X140)) | ~r1(X138,X139))))) & ! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (~r1(X159,X160) | ! [X161] : (~r1(X160,X161) | ! [X162] : (! [X163] : (p1(X163) | ~r1(X162,X163)) | ~r1(X161,X162)) | ? [X164] : (r1(X161,X164) & ~p1(X164))))) | ~r1(X157,X158)) | ~r1(X156,X157)) | ~r1(X155,X156)) | ~r1(X154,X155))) | ~r1(X152,X153))))) | ~r1(X0,X149)) & ! [X165] : (! [X166] : (! [X167] : (~r1(X166,X167) | ! [X168] : (! [X169] : (! [X170] : (~r1(X169,X170) | ! [X171] : (~r1(X170,X171) | ! [X172] : (! [X173] : (! [X174] : (~r1(X173,X174) | ! [X175] : (! [X176] : (! [X177] : (~r1(X176,X177) | ! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | p1(X180)) | ~r1(X178,X179)) | ? [X181] : (r1(X178,X181) & ~p1(X181)) | ~r1(X177,X178))) | ~r1(X175,X176)) | ~r1(X174,X175))) | ~r1(X172,X173)) | ~r1(X171,X172)))) | ~r1(X168,X169)) | ~r1(X167,X168))) | ~r1(X165,X166)) | ~r1(X0,X165)) & ! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (~r1(X184,X185) | ! [X186] : (! [X187] : (! [X188] : (! [X189] : (! [X190] : (~r1(X189,X190) | ! [X191] : (! [X192] : (~r1(X191,X192) | ! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (? [X197] : (r1(X196,X197) & ~p1(X197)) | ! [X198] : (~r1(X196,X198) | ! [X199] : (~r1(X198,X199) | p1(X199))) | ~r1(X195,X196)))))) | ~r1(X190,X191))) | ~r1(X188,X189)) | ~r1(X187,X188)) | ~r1(X186,X187)) | ~r1(X185,X186))) | ~r1(X183,X184))) | ~r1(X0,X182)) & ! [X200] : (~r1(X0,X200) | ! [X201] : (! [X202] : (! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (! [X209] : (~r1(X208,X209) | ! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (~r1(X211,X212) | ! [X213] : (~r1(X212,X213) | ! [X214] : (~r1(X213,X214) | ! [X215] : (? [X216] : (r1(X215,X216) & ~p1(X216)) | ! [X217] : (! [X218] : (~r1(X217,X218) | p1(X218)) | ~r1(X215,X217)) | ~r1(X214,X215)))))) | ~r1(X209,X210))) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)))) | ~r1(X202,X203)) | ~r1(X201,X202)) | ~r1(X200,X201))) & ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (~r1(X225,X226) | ! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (~r1(X230,X231) | ! [X232] : (~r1(X231,X232) | ! [X233] : (! [X234] : (~r1(X233,X234) | ! [X235] : (~r1(X234,X235) | ! [X236] : (~r1(X235,X236) | ! [X237] : (p1(X237) | ~r1(X236,X237))) | ? [X238] : (~p1(X238) & r1(X235,X238)))) | ~r1(X232,X233))))))) | ~r1(X226,X227)))) | ~r1(X223,X224)))))) | ~r1(X0,X219)) & ! [X239] : (~r1(X0,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (! [X242] : (~r1(X241,X242) | ! [X243] : (! [X244] : (! [X245] : (! [X246] : (~r1(X245,X246) | ! [X247] : (~r1(X246,X247) | ! [X248] : (! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (! [X254] : (! [X255] : (! [X256] : (! [X257] : (! [X258] : (p1(X258) | ~r1(X257,X258)) | ~r1(X256,X257)) | ? [X259] : (~p1(X259) & r1(X256,X259)) | ~r1(X255,X256)) | ~r1(X254,X255)) | ~r1(X253,X254)) | ~r1(X252,X253)) | ~r1(X251,X252))))) | ~r1(X247,X248)))) | ~r1(X244,X245)) | ~r1(X243,X244)) | ~r1(X242,X243))) | ~r1(X240,X241))))) => (! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | ? [X22] : (r1(X19,X22) & ~p1(X22)) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(sK28,X1)) & ! [X23] : (~r1(sK28,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : (? [X35] : (~p1(X35) & r1(X34,X35)) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) & ! [X38] : (~r1(sK28,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (sP14(X48) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) & ? [X49] : (? [X50] : (? [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) & r1(X50,X51)) & r1(X49,X50)) & r1(sK28,X49)) & ! [X64] : (~r1(sK28,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (~r1(X67,X68) | ! [X69] : (! [X70] : (! [X71] : (~r1(X70,X71) | ? [X72] : (r1(X71,X72) & ~p1(X72)) | ! [X73] : (! [X74] : (p1(X74) | ~r1(X73,X74)) | ~r1(X71,X73))) | ~r1(X69,X70)) | ~r1(X68,X69))))) | ~r1(X64,X65))) & ! [X75] : (~r1(sK28,X75) | ! [X76] : (~r1(X75,X76) | ! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (~r1(X82,X83) | p1(X83)) | ~r1(X81,X82)) | ? [X84] : (~p1(X84) & r1(X81,X84)))) | ~r1(X78,X79)))))) & ! [X85] : (! [X86] : (! [X87] : (~r1(X86,X87) | ! [X88] : (! [X89] : (~r1(X88,X89) | ! [X90] : (~r1(X89,X90) | p1(X90))) | ? [X91] : (~p1(X91) & r1(X88,X91)) | ~r1(X87,X88))) | ~r1(X85,X86)) | ~r1(sK28,X85)) & ! [X92] : (~r1(sK28,X92) | ! [X93] : (? [X94] : (r1(X93,X94) & ~p1(X94)) | ! [X95] : (~r1(X93,X95) | ! [X96] : (~r1(X95,X96) | p1(X96))) | ~r1(X92,X93))) & ! [X97] : (~r1(sK28,X97) | ? [X98] : (r1(X97,X98) & ~p1(X98)) | ! [X99] : (! [X100] : (~r1(X99,X100) | p1(X100)) | ~r1(X97,X99))) & ! [X101] : (! [X102] : (~r1(X101,X102) | ! [X103] : (? [X104] : (~p1(X104) & r1(X103,X104)) | ! [X105] : (~r1(X103,X105) | ! [X106] : (p1(X106) | ~r1(X105,X106))) | ~r1(X102,X103))) | ~r1(sK28,X101)) & ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (! [X110] : (! [X111] : (! [X112] : (! [X113] : (p1(X113) | ~r1(X112,X113)) | ~r1(X111,X112)) | ? [X114] : (~p1(X114) & r1(X111,X114)) | ~r1(X110,X111)) | ~r1(X109,X110)) | ~r1(X108,X109))) | ~r1(sK28,X107)) & ! [X115] : (~r1(sK28,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | ! [X119] : (~r1(X118,X119) | ! [X120] : (! [X121] : (~r1(X120,X121) | ! [X122] : (p1(X122) | ~r1(X121,X122))) | ? [X123] : (~p1(X123) & r1(X120,X123)) | ~r1(X119,X120))))))) & ! [X124] : (~r1(sK28,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (~r1(X128,X129) | ! [X130] : (~r1(X129,X130) | ! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (~r1(X132,X133) | ! [X134] : (~r1(X133,X134) | p1(X134))) | ? [X135] : (~p1(X135) & r1(X132,X135)) | ~r1(X131,X132))))))) | ~r1(X125,X126)))) & ! [X136] : (~r1(sK28,X136) | ! [X137] : (~r1(X136,X137) | ! [X138] : (~r1(X137,X138) | ! [X139] : (! [X140] : (! [X141] : (! [X142] : (! [X143] : (! [X144] : (~r1(X143,X144) | ! [X145] : (? [X146] : (r1(X145,X146) & ~p1(X146)) | ! [X147] : (~r1(X145,X147) | ! [X148] : (~r1(X147,X148) | p1(X148))) | ~r1(X144,X145))) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141)) | ~r1(X139,X140)) | ~r1(X138,X139))))) & ! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (~r1(X159,X160) | ! [X161] : (~r1(X160,X161) | ! [X162] : (! [X163] : (p1(X163) | ~r1(X162,X163)) | ~r1(X161,X162)) | ? [X164] : (r1(X161,X164) & ~p1(X164))))) | ~r1(X157,X158)) | ~r1(X156,X157)) | ~r1(X155,X156)) | ~r1(X154,X155))) | ~r1(X152,X153))))) | ~r1(sK28,X149)) & ! [X165] : (! [X166] : (! [X167] : (~r1(X166,X167) | ! [X168] : (! [X169] : (! [X170] : (~r1(X169,X170) | ! [X171] : (~r1(X170,X171) | ! [X172] : (! [X173] : (! [X174] : (~r1(X173,X174) | ! [X175] : (! [X176] : (! [X177] : (~r1(X176,X177) | ! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | p1(X180)) | ~r1(X178,X179)) | ? [X181] : (r1(X178,X181) & ~p1(X181)) | ~r1(X177,X178))) | ~r1(X175,X176)) | ~r1(X174,X175))) | ~r1(X172,X173)) | ~r1(X171,X172)))) | ~r1(X168,X169)) | ~r1(X167,X168))) | ~r1(X165,X166)) | ~r1(sK28,X165)) & ! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (~r1(X184,X185) | ! [X186] : (! [X187] : (! [X188] : (! [X189] : (! [X190] : (~r1(X189,X190) | ! [X191] : (! [X192] : (~r1(X191,X192) | ! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : (? [X197] : (r1(X196,X197) & ~p1(X197)) | ! [X198] : (~r1(X196,X198) | ! [X199] : (~r1(X198,X199) | p1(X199))) | ~r1(X195,X196)))))) | ~r1(X190,X191))) | ~r1(X188,X189)) | ~r1(X187,X188)) | ~r1(X186,X187)) | ~r1(X185,X186))) | ~r1(X183,X184))) | ~r1(sK28,X182)) & ! [X200] : (~r1(sK28,X200) | ! [X201] : (! [X202] : (! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (! [X209] : (~r1(X208,X209) | ! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (~r1(X211,X212) | ! [X213] : (~r1(X212,X213) | ! [X214] : (~r1(X213,X214) | ! [X215] : (? [X216] : (r1(X215,X216) & ~p1(X216)) | ! [X217] : (! [X218] : (~r1(X217,X218) | p1(X218)) | ~r1(X215,X217)) | ~r1(X214,X215)))))) | ~r1(X209,X210))) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)))) | ~r1(X202,X203)) | ~r1(X201,X202)) | ~r1(X200,X201))) & ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (~r1(X225,X226) | ! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (~r1(X230,X231) | ! [X232] : (~r1(X231,X232) | ! [X233] : (! [X234] : (~r1(X233,X234) | ! [X235] : (~r1(X234,X235) | ! [X236] : (~r1(X235,X236) | ! [X237] : (p1(X237) | ~r1(X236,X237))) | ? [X238] : (~p1(X238) & r1(X235,X238)))) | ~r1(X232,X233))))))) | ~r1(X226,X227)))) | ~r1(X223,X224)))))) | ~r1(sK28,X219)) & ! [X239] : (~r1(sK28,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (! [X242] : (~r1(X241,X242) | ! [X243] : (! [X244] : (! [X245] : (! [X246] : (~r1(X245,X246) | ! [X247] : (~r1(X246,X247) | ! [X248] : (! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (! [X254] : (! [X255] : (! [X256] : (! [X257] : (! [X258] : (p1(X258) | ~r1(X257,X258)) | ~r1(X256,X257)) | ? [X259] : (~p1(X259) & r1(X256,X259)) | ~r1(X255,X256)) | ~r1(X254,X255)) | ~r1(X253,X254)) | ~r1(X252,X253)) | ~r1(X251,X252))))) | ~r1(X247,X248)))) | ~r1(X244,X245)) | ~r1(X243,X244)) | ~r1(X242,X243))) | ~r1(X240,X241)))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f82,plain,( 32.05/32.53 ! [X19] : (? [X22] : (r1(X19,X22) & ~p1(X22)) => (r1(X19,sK29(X19)) & ~p1(sK29(X19))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f83,plain,( 32.05/32.53 ! [X34] : (? [X35] : (~p1(X35) & r1(X34,X35)) => (~p1(sK30(X34)) & r1(X34,sK30(X34))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f84,plain,( 32.05/32.53 ( ! [X0] : (? [X49] : (? [X50] : (? [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) & r1(X50,X51)) & r1(X49,X50)) & r1(X0,X49)) => (? [X50] : (? [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) & r1(X50,X51)) & r1(sK31,X50)) & r1(X0,sK31))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f85,plain,( 32.05/32.53 ( ! [X49] : (? [X50] : (? [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) & r1(X50,X51)) & r1(X49,X50)) => (? [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) & r1(sK32,X51)) & r1(X49,sK32))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f86,plain,( 32.05/32.53 ( ! [X50] : (? [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) & r1(X50,X51)) => (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(sK33,X52)) & r1(X50,sK33))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f87,plain,( 32.05/32.53 ( ! [X51] : (? [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) & r1(X51,X52)) => (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(sK34,X53)) & r1(X51,sK34))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f88,plain,( 32.05/32.53 ( ! [X52] : (? [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) & r1(X52,X53)) => (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(sK35,X54)) & r1(X52,sK35))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f89,plain,( 32.05/32.53 ( ! [X53] : (? [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,X54)) => (? [X55] : (r1(sK36,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) & r1(X53,sK36))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f90,plain,( 32.05/32.53 ( ! [X54] : (? [X55] : (r1(X54,X55) & ? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) => (r1(X54,sK37) & ? [X56] : (r1(sK37,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58)))))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f91,plain,( 32.05/32.53 ( ! [X55] : (? [X56] : (r1(X55,X56) & ? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58)))) => (r1(X55,sK38) & ? [X57] : (r1(sK38,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f92,plain,( 32.05/32.53 ( ! [X56] : (? [X57] : (r1(X56,X57) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58))) => (r1(X56,sK39) & ? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(sK39,X58)))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f93,plain,( 32.05/32.53 ( ! [X57] : (? [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) & r1(X57,X58)) => (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(sK40,X59)) & r1(X57,sK40))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f94,plain,( 32.05/32.53 ( ! [X58] : (? [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) & ? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(X59,X63) | p1(X63) | sP1(X63)) & r1(X58,X59)) => (? [X60] : (~p1(X60) & r1(sK41,X60)) & ? [X61] : (r1(sK41,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) & ! [X63] : (~r1(sK41,X63) | p1(X63) | sP1(X63)) & r1(X58,sK41))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f95,plain,( 32.05/32.53 ( ! [X59] : (? [X60] : (~p1(X60) & r1(X59,X60)) => (~p1(sK42) & r1(X59,sK42))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f96,plain,( 32.05/32.53 ( ! [X59] : (? [X61] : (r1(X59,X61) & ! [X62] : (~r1(X61,X62) | p1(X62))) => (r1(X59,sK43) & ! [X62] : (~r1(sK43,X62) | p1(X62)))) )), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f97,plain,( 32.05/32.53 ! [X71] : (? [X72] : (r1(X71,X72) & ~p1(X72)) => (r1(X71,sK44(X71)) & ~p1(sK44(X71))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f98,plain,( 32.05/32.53 ! [X81] : (? [X84] : (~p1(X84) & r1(X81,X84)) => (~p1(sK45(X81)) & r1(X81,sK45(X81))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f99,plain,( 32.05/32.53 ! [X88] : (? [X91] : (~p1(X91) & r1(X88,X91)) => (~p1(sK46(X88)) & r1(X88,sK46(X88))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f100,plain,( 32.05/32.53 ! [X93] : (? [X94] : (r1(X93,X94) & ~p1(X94)) => (r1(X93,sK47(X93)) & ~p1(sK47(X93))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f101,plain,( 32.05/32.53 ! [X97] : (? [X98] : (r1(X97,X98) & ~p1(X98)) => (r1(X97,sK48(X97)) & ~p1(sK48(X97))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f102,plain,( 32.05/32.53 ! [X103] : (? [X104] : (~p1(X104) & r1(X103,X104)) => (~p1(sK49(X103)) & r1(X103,sK49(X103))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f103,plain,( 32.05/32.53 ! [X111] : (? [X114] : (~p1(X114) & r1(X111,X114)) => (~p1(sK50(X111)) & r1(X111,sK50(X111))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f104,plain,( 32.05/32.53 ! [X120] : (? [X123] : (~p1(X123) & r1(X120,X123)) => (~p1(sK51(X120)) & r1(X120,sK51(X120))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f105,plain,( 32.05/32.53 ! [X132] : (? [X135] : (~p1(X135) & r1(X132,X135)) => (~p1(sK52(X132)) & r1(X132,sK52(X132))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f106,plain,( 32.05/32.53 ! [X145] : (? [X146] : (r1(X145,X146) & ~p1(X146)) => (r1(X145,sK53(X145)) & ~p1(sK53(X145))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f107,plain,( 32.05/32.53 ! [X161] : (? [X164] : (r1(X161,X164) & ~p1(X164)) => (r1(X161,sK54(X161)) & ~p1(sK54(X161))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f108,plain,( 32.05/32.53 ! [X178] : (? [X181] : (r1(X178,X181) & ~p1(X181)) => (r1(X178,sK55(X178)) & ~p1(sK55(X178))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f109,plain,( 32.05/32.53 ! [X196] : (? [X197] : (r1(X196,X197) & ~p1(X197)) => (r1(X196,sK56(X196)) & ~p1(sK56(X196))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f110,plain,( 32.05/32.53 ! [X215] : (? [X216] : (r1(X215,X216) & ~p1(X216)) => (r1(X215,sK57(X215)) & ~p1(sK57(X215))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f111,plain,( 32.05/32.53 ! [X235] : (? [X238] : (~p1(X238) & r1(X235,X238)) => (~p1(sK58(X235)) & r1(X235,sK58(X235))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f112,plain,( 32.05/32.53 ! [X256] : (? [X259] : (~p1(X259) & r1(X256,X259)) => (~p1(sK59(X256)) & r1(X256,sK59(X256))))), 32.05/32.53 introduced(choice_axiom,[])). 32.05/32.53 fof(f113,plain,( 32.05/32.53 ! [X1] : (! [X2] : (! [X3] : (~r1(X2,X3) | ! [X4] : (~r1(X3,X4) | ! [X5] : (! [X6] : (~r1(X5,X6) | ! [X7] : (! [X8] : (~r1(X7,X8) | ! [X9] : (~r1(X8,X9) | ! [X10] : (! [X11] : (~r1(X10,X11) | ! [X12] : (! [X13] : (! [X14] : (~r1(X13,X14) | ! [X15] : (~r1(X14,X15) | ! [X16] : (! [X17] : (! [X18] : (~r1(X17,X18) | ! [X19] : (! [X20] : (~r1(X19,X20) | ! [X21] : (p1(X21) | ~r1(X20,X21))) | (r1(X19,sK29(X19)) & ~p1(sK29(X19))) | ~r1(X18,X19))) | ~r1(X16,X17)) | ~r1(X15,X16)))) | ~r1(X12,X13)) | ~r1(X11,X12))) | ~r1(X9,X10)))) | ~r1(X6,X7))) | ~r1(X4,X5)))) | ~r1(X1,X2)) | ~r1(sK28,X1)) & ! [X23] : (~r1(sK28,X23) | ! [X24] : (! [X25] : (~r1(X24,X25) | ! [X26] : (~r1(X25,X26) | ! [X27] : (! [X28] : (~r1(X27,X28) | ! [X29] : (! [X30] : (~r1(X29,X30) | ! [X31] : (~r1(X30,X31) | ! [X32] : (! [X33] : (! [X34] : ((~p1(sK30(X34)) & r1(X34,sK30(X34))) | ! [X36] : (! [X37] : (p1(X37) | ~r1(X36,X37)) | ~r1(X34,X36)) | ~r1(X33,X34)) | ~r1(X32,X33)) | ~r1(X31,X32)))) | ~r1(X28,X29))) | ~r1(X26,X27)))) | ~r1(X23,X24))) & ! [X38] : (~r1(sK28,X38) | ! [X39] : (! [X40] : (! [X41] : (! [X42] : (! [X43] : (~r1(X42,X43) | ! [X44] : (! [X45] : (~r1(X44,X45) | ! [X46] : (! [X47] : (~r1(X46,X47) | ! [X48] : (sP14(X48) | ~r1(X47,X48))) | ~r1(X45,X46))) | ~r1(X43,X44))) | ~r1(X41,X42)) | ~r1(X40,X41)) | ~r1(X39,X40)) | ~r1(X38,X39))) & (((((((r1(sK36,sK37) & (r1(sK37,sK38) & (r1(sK38,sK39) & (((~p1(sK42) & r1(sK41,sK42)) & (r1(sK41,sK43) & ! [X62] : (~r1(sK43,X62) | p1(X62))) & ! [X63] : (~r1(sK41,X63) | p1(X63) | sP1(X63)) & r1(sK40,sK41)) & r1(sK39,sK40))))) & r1(sK35,sK36)) & r1(sK34,sK35)) & r1(sK33,sK34)) & r1(sK32,sK33)) & r1(sK31,sK32)) & r1(sK28,sK31)) & ! [X64] : (~r1(sK28,X64) | ! [X65] : (! [X66] : (~r1(X65,X66) | ! [X67] : (~r1(X66,X67) | ! [X68] : (~r1(X67,X68) | ! [X69] : (! [X70] : (! [X71] : (~r1(X70,X71) | (r1(X71,sK44(X71)) & ~p1(sK44(X71))) | ! [X73] : (! [X74] : (p1(X74) | ~r1(X73,X74)) | ~r1(X71,X73))) | ~r1(X69,X70)) | ~r1(X68,X69))))) | ~r1(X64,X65))) & ! [X75] : (~r1(sK28,X75) | ! [X76] : (~r1(X75,X76) | ! [X77] : (~r1(X76,X77) | ! [X78] : (~r1(X77,X78) | ! [X79] : (! [X80] : (~r1(X79,X80) | ! [X81] : (~r1(X80,X81) | ! [X82] : (! [X83] : (~r1(X82,X83) | p1(X83)) | ~r1(X81,X82)) | (~p1(sK45(X81)) & r1(X81,sK45(X81))))) | ~r1(X78,X79)))))) & ! [X85] : (! [X86] : (! [X87] : (~r1(X86,X87) | ! [X88] : (! [X89] : (~r1(X88,X89) | ! [X90] : (~r1(X89,X90) | p1(X90))) | (~p1(sK46(X88)) & r1(X88,sK46(X88))) | ~r1(X87,X88))) | ~r1(X85,X86)) | ~r1(sK28,X85)) & ! [X92] : (~r1(sK28,X92) | ! [X93] : ((r1(X93,sK47(X93)) & ~p1(sK47(X93))) | ! [X95] : (~r1(X93,X95) | ! [X96] : (~r1(X95,X96) | p1(X96))) | ~r1(X92,X93))) & ! [X97] : (~r1(sK28,X97) | (r1(X97,sK48(X97)) & ~p1(sK48(X97))) | ! [X99] : (! [X100] : (~r1(X99,X100) | p1(X100)) | ~r1(X97,X99))) & ! [X101] : (! [X102] : (~r1(X101,X102) | ! [X103] : ((~p1(sK49(X103)) & r1(X103,sK49(X103))) | ! [X105] : (~r1(X103,X105) | ! [X106] : (p1(X106) | ~r1(X105,X106))) | ~r1(X102,X103))) | ~r1(sK28,X101)) & ! [X107] : (! [X108] : (~r1(X107,X108) | ! [X109] : (! [X110] : (! [X111] : (! [X112] : (! [X113] : (p1(X113) | ~r1(X112,X113)) | ~r1(X111,X112)) | (~p1(sK50(X111)) & r1(X111,sK50(X111))) | ~r1(X110,X111)) | ~r1(X109,X110)) | ~r1(X108,X109))) | ~r1(sK28,X107)) & ! [X115] : (~r1(sK28,X115) | ! [X116] : (~r1(X115,X116) | ! [X117] : (~r1(X116,X117) | ! [X118] : (~r1(X117,X118) | ! [X119] : (~r1(X118,X119) | ! [X120] : (! [X121] : (~r1(X120,X121) | ! [X122] : (p1(X122) | ~r1(X121,X122))) | (~p1(sK51(X120)) & r1(X120,sK51(X120))) | ~r1(X119,X120))))))) & ! [X124] : (~r1(sK28,X124) | ! [X125] : (~r1(X124,X125) | ! [X126] : (! [X127] : (~r1(X126,X127) | ! [X128] : (~r1(X127,X128) | ! [X129] : (~r1(X128,X129) | ! [X130] : (~r1(X129,X130) | ! [X131] : (~r1(X130,X131) | ! [X132] : (! [X133] : (~r1(X132,X133) | ! [X134] : (~r1(X133,X134) | p1(X134))) | (~p1(sK52(X132)) & r1(X132,sK52(X132))) | ~r1(X131,X132))))))) | ~r1(X125,X126)))) & ! [X136] : (~r1(sK28,X136) | ! [X137] : (~r1(X136,X137) | ! [X138] : (~r1(X137,X138) | ! [X139] : (! [X140] : (! [X141] : (! [X142] : (! [X143] : (! [X144] : (~r1(X143,X144) | ! [X145] : ((r1(X145,sK53(X145)) & ~p1(sK53(X145))) | ! [X147] : (~r1(X145,X147) | ! [X148] : (~r1(X147,X148) | p1(X148))) | ~r1(X144,X145))) | ~r1(X142,X143)) | ~r1(X141,X142)) | ~r1(X140,X141)) | ~r1(X139,X140)) | ~r1(X138,X139))))) & ! [X149] : (! [X150] : (~r1(X149,X150) | ! [X151] : (~r1(X150,X151) | ! [X152] : (~r1(X151,X152) | ! [X153] : (! [X154] : (~r1(X153,X154) | ! [X155] : (! [X156] : (! [X157] : (! [X158] : (! [X159] : (~r1(X158,X159) | ! [X160] : (~r1(X159,X160) | ! [X161] : (~r1(X160,X161) | ! [X162] : (! [X163] : (p1(X163) | ~r1(X162,X163)) | ~r1(X161,X162)) | (r1(X161,sK54(X161)) & ~p1(sK54(X161)))))) | ~r1(X157,X158)) | ~r1(X156,X157)) | ~r1(X155,X156)) | ~r1(X154,X155))) | ~r1(X152,X153))))) | ~r1(sK28,X149)) & ! [X165] : (! [X166] : (! [X167] : (~r1(X166,X167) | ! [X168] : (! [X169] : (! [X170] : (~r1(X169,X170) | ! [X171] : (~r1(X170,X171) | ! [X172] : (! [X173] : (! [X174] : (~r1(X173,X174) | ! [X175] : (! [X176] : (! [X177] : (~r1(X176,X177) | ! [X178] : (! [X179] : (! [X180] : (~r1(X179,X180) | p1(X180)) | ~r1(X178,X179)) | (r1(X178,sK55(X178)) & ~p1(sK55(X178))) | ~r1(X177,X178))) | ~r1(X175,X176)) | ~r1(X174,X175))) | ~r1(X172,X173)) | ~r1(X171,X172)))) | ~r1(X168,X169)) | ~r1(X167,X168))) | ~r1(X165,X166)) | ~r1(sK28,X165)) & ! [X182] : (! [X183] : (~r1(X182,X183) | ! [X184] : (! [X185] : (~r1(X184,X185) | ! [X186] : (! [X187] : (! [X188] : (! [X189] : (! [X190] : (~r1(X189,X190) | ! [X191] : (! [X192] : (~r1(X191,X192) | ! [X193] : (~r1(X192,X193) | ! [X194] : (~r1(X193,X194) | ! [X195] : (~r1(X194,X195) | ! [X196] : ((r1(X196,sK56(X196)) & ~p1(sK56(X196))) | ! [X198] : (~r1(X196,X198) | ! [X199] : (~r1(X198,X199) | p1(X199))) | ~r1(X195,X196)))))) | ~r1(X190,X191))) | ~r1(X188,X189)) | ~r1(X187,X188)) | ~r1(X186,X187)) | ~r1(X185,X186))) | ~r1(X183,X184))) | ~r1(sK28,X182)) & ! [X200] : (~r1(sK28,X200) | ! [X201] : (! [X202] : (! [X203] : (! [X204] : (~r1(X203,X204) | ! [X205] : (~r1(X204,X205) | ! [X206] : (! [X207] : (! [X208] : (! [X209] : (~r1(X208,X209) | ! [X210] : (! [X211] : (~r1(X210,X211) | ! [X212] : (~r1(X211,X212) | ! [X213] : (~r1(X212,X213) | ! [X214] : (~r1(X213,X214) | ! [X215] : ((r1(X215,sK57(X215)) & ~p1(sK57(X215))) | ! [X217] : (! [X218] : (~r1(X217,X218) | p1(X218)) | ~r1(X215,X217)) | ~r1(X214,X215)))))) | ~r1(X209,X210))) | ~r1(X207,X208)) | ~r1(X206,X207)) | ~r1(X205,X206)))) | ~r1(X202,X203)) | ~r1(X201,X202)) | ~r1(X200,X201))) & ! [X219] : (! [X220] : (~r1(X219,X220) | ! [X221] : (~r1(X220,X221) | ! [X222] : (~r1(X221,X222) | ! [X223] : (~r1(X222,X223) | ! [X224] : (! [X225] : (~r1(X224,X225) | ! [X226] : (~r1(X225,X226) | ! [X227] : (! [X228] : (~r1(X227,X228) | ! [X229] : (~r1(X228,X229) | ! [X230] : (~r1(X229,X230) | ! [X231] : (~r1(X230,X231) | ! [X232] : (~r1(X231,X232) | ! [X233] : (! [X234] : (~r1(X233,X234) | ! [X235] : (~r1(X234,X235) | ! [X236] : (~r1(X235,X236) | ! [X237] : (p1(X237) | ~r1(X236,X237))) | (~p1(sK58(X235)) & r1(X235,sK58(X235))))) | ~r1(X232,X233))))))) | ~r1(X226,X227)))) | ~r1(X223,X224)))))) | ~r1(sK28,X219)) & ! [X239] : (~r1(sK28,X239) | ! [X240] : (~r1(X239,X240) | ! [X241] : (! [X242] : (~r1(X241,X242) | ! [X243] : (! [X244] : (! [X245] : (! [X246] : (~r1(X245,X246) | ! [X247] : (~r1(X246,X247) | ! [X248] : (! [X249] : (~r1(X248,X249) | ! [X250] : (~r1(X249,X250) | ! [X251] : (~r1(X250,X251) | ! [X252] : (! [X253] : (! [X254] : (! [X255] : (! [X256] : (! [X257] : (! [X258] : (p1(X258) | ~r1(X257,X258)) | ~r1(X256,X257)) | (~p1(sK59(X256)) & r1(X256,sK59(X256))) | ~r1(X255,X256)) | ~r1(X254,X255)) | ~r1(X253,X254)) | ~r1(X252,X253)) | ~r1(X251,X252))))) | ~r1(X247,X248)))) | ~r1(X244,X245)) | ~r1(X243,X244)) | ~r1(X242,X243))) | ~r1(X240,X241))))), 32.05/32.53 inference(skolemisation,[status(esa),new_symbols(skolem,[sK28,sK29,sK30,sK31,sK32,sK33,sK34,sK35,sK36,sK37,sK38,sK39,sK40,sK41,sK42,sK43,sK44,sK45,sK46,sK47,sK48,sK49,sK50,sK51,sK52,sK53,sK54,sK55,sK56,sK57,sK58,sK59])],[f80,f112,f111,f110,f109,f108,f107,f106,f105,f104,f103,f102,f101,f100,f99,f98,f97,f96,f95,f94,f93,f92,f91,f90,f89,f88,f87,f86,f85,f84,f83,f82,f81])). 32.05/32.53 fof(f114,plain,( 32.05/32.53 ( ! [X4,X0,X3] : (~sP14(X0) | ~r1(X0,X3) | ~p1(X0) | sP7(X0) | ~r1(X0,X4) | sP3(X4) | p1(X3)) )), 32.05/32.53 inference(cnf_transformation,[],[f25])). 32.05/32.53 fof(f115,plain,( 32.05/32.53 ( ! [X0] : (~sP14(X0) | sP12(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f25])). 32.05/32.53 fof(f116,plain,( 32.05/32.53 ( ! [X0] : (~sP14(X0) | sP13(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f25])). 32.05/32.53 fof(f117,plain,( 32.05/32.53 ( ! [X2,X0,X1] : (~sP14(X0) | ~r1(X0,X1) | p1(X2) | sP10(X2) | ~r1(X1,X2) | sP11(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f25])). 32.05/32.53 fof(f118,plain,( 32.05/32.53 ( ! [X4,X0,X3,X1] : (~sP13(X0) | ~r1(X1,X3) | p1(X4) | ~r1(X3,X4) | ~r1(X0,X1) | r1(X1,sK15(X1))) )), 32.05/32.53 inference(cnf_transformation,[],[f29])). 32.05/32.53 fof(f119,plain,( 32.05/32.53 ( ! [X4,X0,X3,X1] : (~p1(sK15(X1)) | ~r1(X1,X3) | p1(X4) | ~r1(X3,X4) | ~r1(X0,X1) | ~sP13(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f29])). 32.05/32.53 fof(f120,plain,( 32.05/32.53 ( ! [X0,X1] : (~sP12(X0) | sP8(X0) | ~r1(X0,X1) | r1(X1,sK16(X1)) | p1(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f33])). 32.05/32.53 fof(f121,plain,( 32.05/32.53 ( ! [X0,X1] : (~p1(sK16(X1)) | sP8(X0) | ~r1(X0,X1) | p1(X0) | ~sP12(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f33])). 32.05/32.53 fof(f122,plain,( 32.05/32.53 ( ! [X2,X0,X3] : (~sP11(X0) | ~p1(X2) | ~r1(X2,X3) | p1(X3) | ~r1(sK17(X0),X2)) )), 32.05/32.53 inference(cnf_transformation,[],[f37])). 32.05/32.53 fof(f123,plain,( 32.05/32.53 ( ! [X0] : (~p1(sK17(X0)) | ~sP11(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f37])). 32.05/32.53 fof(f124,plain,( 32.05/32.53 ( ! [X0] : (~sP11(X0) | r1(X0,sK17(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f37])). 32.05/32.53 fof(f125,plain,( 32.05/32.53 ( ! [X0] : (~sP10(X0) | sP9(sK18(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f41])). 32.05/32.53 fof(f126,plain,( 32.05/32.53 ( ! [X0] : (~sP10(X0) | p1(sK18(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f41])). 32.05/32.53 fof(f127,plain,( 32.05/32.53 ( ! [X0] : (~sP10(X0) | r1(X0,sK18(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f41])). 32.05/32.53 fof(f128,plain,( 32.05/32.53 ( ! [X0] : (~sP9(X0) | r1(X0,sK19(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f45])). 32.05/32.53 fof(f129,plain,( 32.05/32.53 ( ! [X0] : (~p1(sK19(X0)) | ~sP9(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f45])). 32.05/32.53 fof(f130,plain,( 32.05/32.53 ( ! [X0] : (~sP8(X0) | r1(X0,sK20(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f49])). 32.05/32.53 fof(f131,plain,( 32.05/32.53 ( ! [X0] : (~p1(sK20(X0)) | ~sP8(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f49])). 32.05/32.53 fof(f132,plain,( 32.05/32.53 ( ! [X2,X0,X3] : (~sP8(X0) | p1(X3) | ~p1(X2) | ~r1(sK20(X0),X2) | ~r1(X2,X3)) )), 32.05/32.53 inference(cnf_transformation,[],[f49])). 32.05/32.53 fof(f133,plain,( 32.05/32.53 ( ! [X0] : (~sP7(X0) | sP5(sK21(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f53])). 32.05/32.53 fof(f135,plain,( 32.05/32.53 ( ! [X0] : (~sP7(X0) | sP6(sK21(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f53])). 32.05/32.53 fof(f136,plain,( 32.05/32.53 ( ! [X0] : (~sP7(X0) | r1(X0,sK21(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f53])). 32.05/32.53 fof(f137,plain,( 32.05/32.53 ( ! [X0] : (~sP6(X0) | r1(X0,sK22(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f57])). 32.05/32.53 fof(f138,plain,( 32.05/32.53 ( ! [X0] : (~p1(sK22(X0)) | ~sP6(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f57])). 32.05/32.53 fof(f140,plain,( 32.05/32.53 ( ! [X2,X0,X3,X1] : (~sP5(X0) | p1(X3) | ~r1(X2,X3) | ~p1(X2) | ~r1(X1,X2) | p1(X1) | ~r1(X0,X1)) )), 32.05/32.53 inference(cnf_transformation,[],[f59])). 32.05/32.53 fof(f143,plain,( 32.05/32.53 ( ! [X0] : (~sP3(X0) | r1(X0,sK24(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f67])). 32.05/32.53 fof(f144,plain,( 32.05/32.53 ( ! [X0] : (~sP3(X0) | sP2(sK24(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f67])). 32.05/32.53 fof(f146,plain,( 32.05/32.53 ( ! [X0] : (~p1(sK25(X0)) | ~sP2(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f71])). 32.05/32.53 fof(f147,plain,( 32.05/32.53 ( ! [X0] : (~sP2(X0) | r1(X0,sK25(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f71])). 32.05/32.53 fof(f148,plain,( 32.05/32.53 ( ! [X0] : (~sP1(X0) | r1(X0,sK26(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f75])). 32.05/32.53 fof(f149,plain,( 32.05/32.53 ( ! [X0] : (~sP1(X0) | sP0(sK26(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f75])). 32.05/32.53 fof(f150,plain,( 32.05/32.53 ( ! [X0] : (~sP1(X0) | p1(sK26(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f75])). 32.05/32.53 fof(f151,plain,( 32.05/32.53 ( ! [X0] : (~sP0(X0) | r1(X0,sK27(X0))) )), 32.05/32.53 inference(cnf_transformation,[],[f79])). 32.05/32.53 fof(f152,plain,( 32.05/32.53 ( ! [X0] : (~p1(sK27(X0)) | ~sP0(X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f79])). 32.05/32.53 fof(f185,plain,( 32.05/32.53 r1(sK28,sK31)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f186,plain,( 32.05/32.53 r1(sK31,sK32)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f187,plain,( 32.05/32.53 r1(sK32,sK33)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f188,plain,( 32.05/32.53 r1(sK33,sK34)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f189,plain,( 32.05/32.53 r1(sK34,sK35)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f190,plain,( 32.05/32.53 r1(sK35,sK36)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f191,plain,( 32.05/32.53 r1(sK39,sK40)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f192,plain,( 32.05/32.53 r1(sK40,sK41)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f193,plain,( 32.05/32.53 ( ! [X63] : (~r1(sK41,X63) | p1(X63) | sP1(X63)) )), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f194,plain,( 32.05/32.53 ( ! [X62] : (~r1(sK43,X62) | p1(X62)) )), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f195,plain,( 32.05/32.53 r1(sK41,sK43)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f196,plain,( 32.05/32.53 r1(sK41,sK42)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f197,plain,( 32.05/32.53 ~p1(sK42)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f198,plain,( 32.05/32.53 r1(sK38,sK39)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f199,plain,( 32.05/32.53 r1(sK37,sK38)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f200,plain,( 32.05/32.53 r1(sK36,sK37)), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f201,plain,( 32.05/32.53 ( ! [X39,X47,X45,X43,X41,X48,X38,X46,X44,X42,X40] : (~r1(sK28,X38) | ~r1(X42,X43) | ~r1(X44,X45) | ~r1(X46,X47) | sP14(X48) | ~r1(X47,X48) | ~r1(X45,X46) | ~r1(X43,X44) | ~r1(X41,X42) | ~r1(X40,X41) | ~r1(X39,X40) | ~r1(X38,X39)) )), 32.05/32.53 inference(cnf_transformation,[],[f113])). 32.05/32.53 fof(f206,plain,( 32.05/32.53 ( ! [X0] : (r1(X0,X0)) )), 32.05/32.53 inference(cnf_transformation,[],[f1])). 32.05/32.53 fof(f223,plain,( 32.05/32.53 spl60_3 <=> ~p1(sK41)), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_3])])). 32.05/32.53 fof(f224,plain,( 32.05/32.53 ~p1(sK41) | ~spl60_3), 32.05/32.53 inference(avatar_component_clause,[],[f223])). 32.05/32.53 fof(f226,plain,( 32.05/32.53 spl60_2 <=> p1(sK41)), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_2])])). 32.05/32.53 fof(f227,plain,( 32.05/32.53 p1(sK41) | ~spl60_2), 32.05/32.53 inference(avatar_component_clause,[],[f226])). 32.05/32.53 fof(f585,plain,( 32.05/32.53 ( ! [X6,X4,X2,X0,X8,X7,X5,X3,X1,X9] : (~r1(sK31,X9) | ~r1(X2,X3) | ~r1(X4,X5) | sP14(X6) | ~r1(X5,X6) | ~r1(X3,X4) | ~r1(X1,X2) | ~r1(X7,X0) | ~r1(X8,X7) | ~r1(X9,X8) | ~r1(X0,X1)) )), 32.05/32.53 inference(resolution,[],[f201,f185])). 32.05/32.53 fof(f619,plain,( 32.05/32.53 ( ! [X6,X4,X2,X0,X8,X7,X5,X3,X1] : (~r1(sK32,X8) | ~r1(X2,X3) | sP14(X4) | ~r1(X3,X4) | ~r1(X1,X2) | ~r1(X5,X0) | ~r1(X6,X7) | ~r1(X8,X6) | ~r1(X0,X1) | ~r1(X7,X5)) )), 32.05/32.53 inference(resolution,[],[f585,f186])). 32.05/32.53 fof(f621,plain,( 32.05/32.53 ( ! [X6,X4,X2,X0,X7,X5,X3,X1] : (~r1(sK33,X6) | sP14(X2) | ~r1(X1,X2) | ~r1(X3,X0) | ~r1(X4,X5) | ~r1(X6,X7) | ~r1(X0,X1) | ~r1(X5,X3) | ~r1(X7,X4)) )), 32.05/32.53 inference(resolution,[],[f619,f187])). 32.05/32.53 fof(f624,plain,( 32.05/32.53 ( ! [X6,X4,X2,X0,X5,X3,X1] : (~r1(sK34,X6) | ~r1(X1,X0) | ~r1(X2,X3) | ~r1(X4,X5) | sP14(X0) | ~r1(X3,X1) | ~r1(X5,X2) | ~r1(X6,X4)) )), 32.05/32.53 inference(resolution,[],[f621,f188])). 32.05/32.53 fof(f626,plain,( 32.05/32.53 ( ! [X4,X2,X0,X5,X3,X1] : (~r1(sK35,X4) | ~r1(X2,X3) | ~r1(X4,X5) | sP14(X1) | ~r1(X3,X0) | ~r1(X5,X2) | ~r1(X0,X1)) )), 32.05/32.53 inference(resolution,[],[f624,f189])). 32.05/32.53 fof(f631,plain,( 32.05/32.53 ( ! [X4,X2,X0,X3,X1] : (~r1(sK36,X2) | ~r1(X0,X1) | sP14(X3) | ~r1(X1,X4) | ~r1(X2,X0) | ~r1(X4,X3)) )), 32.05/32.53 inference(resolution,[],[f626,f190])). 32.05/32.53 fof(f633,plain,( 32.05/32.53 ( ! [X2,X0,X3,X1] : (~r1(sK37,X0) | sP14(X2) | ~r1(X1,X3) | ~r1(X0,X1) | ~r1(X3,X2)) )), 32.05/32.53 inference(resolution,[],[f631,f200])). 32.05/32.53 fof(f635,plain,( 32.05/32.53 ( ! [X2,X0,X1] : (~r1(sK38,X1) | ~r1(X1,X2) | sP14(X0) | ~r1(X2,X0)) )), 32.05/32.53 inference(resolution,[],[f633,f199])). 32.05/32.53 fof(f638,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(sK39,X0) | sP14(X1) | ~r1(X0,X1)) )), 32.05/32.53 inference(resolution,[],[f635,f198])). 32.05/32.53 fof(f640,plain,( 32.05/32.53 ( ! [X0] : (~r1(sK40,X0) | sP14(X0)) )), 32.05/32.53 inference(resolution,[],[f638,f191])). 32.05/32.53 fof(f642,plain,( 32.05/32.53 sP14(sK41)), 32.05/32.53 inference(resolution,[],[f640,f192])). 32.05/32.53 fof(f644,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(sK41,X0) | ~p1(sK41) | sP7(sK41) | ~r1(sK41,X1) | sP3(X1) | p1(X0)) )), 32.05/32.53 inference(resolution,[],[f642,f114])). 32.05/32.53 fof(f645,plain,( 32.05/32.53 sP12(sK41)), 32.05/32.53 inference(resolution,[],[f642,f115])). 32.05/32.53 fof(f646,plain,( 32.05/32.53 sP13(sK41)), 32.05/32.53 inference(resolution,[],[f642,f116])). 32.05/32.53 fof(f647,plain,( 32.05/32.53 ( ! [X2,X3] : (~r1(sK41,X2) | p1(X3) | sP10(X3) | ~r1(X2,X3) | sP11(sK41)) )), 32.05/32.53 inference(resolution,[],[f642,f117])). 32.05/32.53 fof(f648,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(sK41,X0) | sP7(sK41) | ~r1(sK41,X1) | sP3(X1) | p1(X0)) ) | ~spl60_2), 32.05/32.53 inference(subsumption_resolution,[],[f644,f227])). 32.05/32.53 fof(f653,plain,( 32.05/32.53 ( ! [X0] : (sP8(sK41) | ~r1(sK41,X0) | r1(X0,sK16(X0)) | p1(sK41)) )), 32.05/32.53 inference(resolution,[],[f645,f120])). 32.05/32.53 fof(f654,plain,( 32.05/32.53 ( ! [X2,X0,X1] : (~r1(sK41,X0) | p1(X2) | ~r1(X1,X2) | ~r1(X0,X1) | r1(X0,sK15(X0))) )), 32.05/32.53 inference(resolution,[],[f646,f118])). 32.05/32.53 fof(f720,plain,( 32.05/32.53 spl60_56 <=> sP11(sK41)), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_56])])). 32.05/32.53 fof(f721,plain,( 32.05/32.53 sP11(sK41) | ~spl60_56), 32.05/32.53 inference(avatar_component_clause,[],[f720])). 32.05/32.53 fof(f723,plain,( 32.05/32.53 spl60_58 <=> ! [X3,X2] : (~r1(sK41,X2) | ~r1(X2,X3) | p1(X3) | sP10(X3))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_58])])). 32.05/32.53 fof(f724,plain,( 32.05/32.53 ( ! [X2,X3] : (~r1(sK41,X2) | ~r1(X2,X3) | p1(X3) | sP10(X3)) ) | ~spl60_58), 32.05/32.53 inference(avatar_component_clause,[],[f723])). 32.05/32.53 fof(f725,plain,( 32.05/32.53 spl60_56 | spl60_58), 32.05/32.53 inference(avatar_split_clause,[],[f647,f723,f720])). 32.05/32.53 fof(f741,plain,( 32.05/32.53 spl60_60 <=> ! [X1] : (~r1(sK41,X1) | sP3(X1))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_60])])). 32.05/32.53 fof(f742,plain,( 32.05/32.53 ( ! [X1] : (~r1(sK41,X1) | sP3(X1)) ) | ~spl60_60), 32.05/32.53 inference(avatar_component_clause,[],[f741])). 32.05/32.53 fof(f747,plain,( 32.05/32.53 spl60_62 <=> sP7(sK41)), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_62])])). 32.05/32.53 fof(f748,plain,( 32.05/32.53 sP7(sK41) | ~spl60_62), 32.05/32.53 inference(avatar_component_clause,[],[f747])). 32.05/32.53 fof(f750,plain,( 32.05/32.53 spl60_64 <=> ! [X0] : (~r1(sK41,X0) | p1(X0))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_64])])). 32.05/32.53 fof(f751,plain,( 32.05/32.53 ( ! [X0] : (~r1(sK41,X0) | p1(X0)) ) | ~spl60_64), 32.05/32.53 inference(avatar_component_clause,[],[f750])). 32.05/32.53 fof(f752,plain,( 32.05/32.53 spl60_60 | spl60_62 | spl60_64 | ~spl60_2), 32.05/32.53 inference(avatar_split_clause,[],[f648,f226,f750,f747,f741])). 32.05/32.53 fof(f753,plain,( 32.05/32.53 sP3(sK43) | ~spl60_60), 32.05/32.53 inference(resolution,[],[f742,f195])). 32.05/32.53 fof(f756,plain,( 32.05/32.53 r1(sK43,sK24(sK43)) | ~spl60_60), 32.05/32.53 inference(resolution,[],[f753,f143])). 32.05/32.53 fof(f757,plain,( 32.05/32.53 sP2(sK24(sK43)) | ~spl60_60), 32.05/32.53 inference(resolution,[],[f753,f144])). 32.05/32.53 fof(f767,plain,( 32.05/32.53 r1(sK24(sK43),sK25(sK24(sK43))) | ~spl60_60), 32.05/32.53 inference(resolution,[],[f757,f147])). 32.05/32.53 fof(f2675,plain,( 32.05/32.53 ( ! [X0,X1] : (p1(X0) | ~r1(X1,X0) | ~r1(sK43,X1) | r1(sK43,sK15(sK43))) )), 32.05/32.53 inference(resolution,[],[f654,f195])). 32.05/32.53 fof(f2683,plain,( 32.05/32.53 spl60_352 <=> r1(sK43,sK15(sK43))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_352])])). 32.05/32.53 fof(f2684,plain,( 32.05/32.53 r1(sK43,sK15(sK43)) | ~spl60_352), 32.05/32.53 inference(avatar_component_clause,[],[f2683])). 32.05/32.53 fof(f2686,plain,( 32.05/32.53 spl60_354 <=> ! [X1,X0] : (p1(X0) | ~r1(sK43,X1) | ~r1(X1,X0))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_354])])). 32.05/32.53 fof(f2687,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(sK43,X1) | p1(X0) | ~r1(X1,X0)) ) | ~spl60_354), 32.05/32.53 inference(avatar_component_clause,[],[f2686])). 32.05/32.53 fof(f2688,plain,( 32.05/32.53 spl60_352 | spl60_354), 32.05/32.53 inference(avatar_split_clause,[],[f2675,f2686,f2683])). 32.05/32.53 fof(f2689,plain,( 32.05/32.53 ( ! [X0] : (~r1(sK24(sK43),X0) | p1(X0)) ) | (~spl60_60 | ~spl60_354)), 32.05/32.53 inference(resolution,[],[f2687,f756])). 32.05/32.53 fof(f2691,plain,( 32.05/32.53 p1(sK25(sK24(sK43))) | (~spl60_60 | ~spl60_354)), 32.05/32.53 inference(resolution,[],[f2689,f767])). 32.05/32.53 fof(f2693,plain,( 32.05/32.53 ~sP2(sK24(sK43)) | (~spl60_60 | ~spl60_354)), 32.05/32.53 inference(resolution,[],[f2691,f146])). 32.05/32.53 fof(f2694,plain,( 32.05/32.53 $false | (~spl60_60 | ~spl60_354)), 32.05/32.53 inference(subsumption_resolution,[],[f2693,f757])). 32.05/32.53 fof(f2695,plain,( 32.05/32.53 ~spl60_60 | ~spl60_354), 32.05/32.53 inference(avatar_contradiction_clause,[],[f2694])). 32.05/32.53 fof(f2696,plain,( 32.05/32.53 p1(sK15(sK43)) | ~spl60_352), 32.05/32.53 inference(resolution,[],[f2684,f194])). 32.05/32.53 fof(f2697,plain,( 32.05/32.53 ( ! [X2,X0,X1] : (~r1(sK43,X0) | p1(X1) | ~r1(X0,X1) | ~r1(X2,sK43) | ~sP13(X2)) ) | ~spl60_352), 32.05/32.53 inference(resolution,[],[f2696,f119])). 32.05/32.53 fof(f2735,plain,( 32.05/32.53 r1(sK41,sK17(sK41)) | ~spl60_56), 32.05/32.53 inference(resolution,[],[f721,f124])). 32.05/32.53 fof(f2738,plain,( 32.05/32.53 p1(sK17(sK41)) | sP1(sK17(sK41)) | ~spl60_56), 32.05/32.53 inference(resolution,[],[f2735,f193])). 32.05/32.53 fof(f2747,plain,( 32.05/32.53 spl60_364 <=> sP1(sK17(sK41))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_364])])). 32.05/32.53 fof(f2748,plain,( 32.05/32.53 sP1(sK17(sK41)) | ~spl60_364), 32.05/32.53 inference(avatar_component_clause,[],[f2747])). 32.05/32.53 fof(f2753,plain,( 32.05/32.53 spl60_366 <=> p1(sK17(sK41))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_366])])). 32.05/32.53 fof(f2754,plain,( 32.05/32.53 p1(sK17(sK41)) | ~spl60_366), 32.05/32.53 inference(avatar_component_clause,[],[f2753])). 32.05/32.53 fof(f2755,plain,( 32.05/32.53 spl60_364 | spl60_366 | ~spl60_56), 32.05/32.53 inference(avatar_split_clause,[],[f2738,f720,f2753,f2747])). 32.05/32.53 fof(f2839,plain,( 32.05/32.53 spl60_376 <=> ! [X2] : (~r1(X2,sK43) | ~sP13(X2))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_376])])). 32.05/32.53 fof(f2840,plain,( 32.05/32.53 ( ! [X2] : (~r1(X2,sK43) | ~sP13(X2)) ) | ~spl60_376), 32.05/32.53 inference(avatar_component_clause,[],[f2839])). 32.05/32.53 fof(f2841,plain,( 32.05/32.53 spl60_376 | spl60_354 | ~spl60_352), 32.05/32.53 inference(avatar_split_clause,[],[f2697,f2683,f2686,f2839])). 32.05/32.53 fof(f2843,plain,( 32.05/32.53 ~sP13(sK41) | ~spl60_376), 32.05/32.53 inference(resolution,[],[f2840,f195])). 32.05/32.53 fof(f2844,plain,( 32.05/32.53 $false | ~spl60_376), 32.05/32.53 inference(subsumption_resolution,[],[f2843,f646])). 32.05/32.53 fof(f2845,plain,( 32.05/32.53 ~spl60_376), 32.05/32.53 inference(avatar_contradiction_clause,[],[f2844])). 32.05/32.53 fof(f2885,plain,( 32.05/32.53 r1(sK17(sK41),sK26(sK17(sK41))) | ~spl60_364), 32.05/32.53 inference(resolution,[],[f2748,f148])). 32.05/32.53 fof(f2886,plain,( 32.05/32.53 sP0(sK26(sK17(sK41))) | ~spl60_364), 32.05/32.53 inference(resolution,[],[f2748,f149])). 32.05/32.53 fof(f2887,plain,( 32.05/32.53 p1(sK26(sK17(sK41))) | ~spl60_364), 32.05/32.53 inference(resolution,[],[f2748,f150])). 32.05/32.53 fof(f2891,plain,( 32.05/32.53 r1(sK26(sK17(sK41)),sK27(sK26(sK17(sK41)))) | ~spl60_364), 32.05/32.53 inference(resolution,[],[f2886,f151])). 32.05/32.53 fof(f2903,plain,( 32.05/32.53 ( ! [X0] : (sP8(sK41) | ~r1(sK41,X0) | r1(X0,sK16(X0))) ) | ~spl60_3), 32.05/32.53 inference(subsumption_resolution,[],[f653,f224])). 32.05/32.53 fof(f2907,plain,( 32.05/32.53 spl60_384 <=> ! [X0] : (~r1(sK41,X0) | r1(X0,sK16(X0)))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_384])])). 32.05/32.53 fof(f2908,plain,( 32.05/32.53 ( ! [X0] : (~r1(sK41,X0) | r1(X0,sK16(X0))) ) | ~spl60_384), 32.05/32.53 inference(avatar_component_clause,[],[f2907])). 32.05/32.53 fof(f2910,plain,( 32.05/32.53 spl60_387 <=> ~sP8(sK41)), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_387])])). 32.05/32.53 fof(f2911,plain,( 32.05/32.53 ~sP8(sK41) | ~spl60_387), 32.05/32.53 inference(avatar_component_clause,[],[f2910])). 32.05/32.53 fof(f2913,plain,( 32.05/32.53 spl60_386 <=> sP8(sK41)), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_386])])). 32.05/32.53 fof(f2914,plain,( 32.05/32.53 sP8(sK41) | ~spl60_386), 32.05/32.53 inference(avatar_component_clause,[],[f2913])). 32.05/32.53 fof(f2915,plain,( 32.05/32.53 spl60_384 | spl60_386 | spl60_3), 32.05/32.53 inference(avatar_split_clause,[],[f2903,f223,f2913,f2907])). 32.05/32.53 fof(f2950,plain,( 32.05/32.53 spl60_393 <=> ~sP10(sK20(sK41))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_393])])). 32.05/32.53 fof(f2951,plain,( 32.05/32.53 ~sP10(sK20(sK41)) | ~spl60_393), 32.05/32.53 inference(avatar_component_clause,[],[f2950])). 32.05/32.53 fof(f2953,plain,( 32.05/32.53 spl60_392 <=> sP10(sK20(sK41))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_392])])). 32.05/32.53 fof(f2954,plain,( 32.05/32.53 sP10(sK20(sK41)) | ~spl60_392), 32.05/32.53 inference(avatar_component_clause,[],[f2953])). 32.05/32.53 fof(f2956,plain,( 32.05/32.53 spl60_395 <=> ~p1(sK20(sK41))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_395])])). 32.05/32.53 fof(f2957,plain,( 32.05/32.53 ~p1(sK20(sK41)) | ~spl60_395), 32.05/32.53 inference(avatar_component_clause,[],[f2956])). 32.05/32.53 fof(f2959,plain,( 32.05/32.53 spl60_394 <=> p1(sK20(sK41))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_394])])). 32.05/32.53 fof(f2960,plain,( 32.05/32.53 p1(sK20(sK41)) | ~spl60_394), 32.05/32.53 inference(avatar_component_clause,[],[f2959])). 32.05/32.53 fof(f2964,plain,( 32.05/32.53 sP6(sK21(sK41)) | ~spl60_62), 32.05/32.53 inference(resolution,[],[f748,f135])). 32.05/32.53 fof(f2965,plain,( 32.05/32.53 r1(sK41,sK21(sK41)) | ~spl60_62), 32.05/32.53 inference(resolution,[],[f748,f136])). 32.05/32.53 fof(f2968,plain,( 32.05/32.53 r1(sK21(sK41),sK22(sK21(sK41))) | ~spl60_62), 32.05/32.53 inference(resolution,[],[f2964,f137])). 32.05/32.53 fof(f2970,plain,( 32.05/32.53 ( ! [X0,X1] : (p1(X0) | ~r1(X1,X0) | ~r1(sK21(sK41),X1) | r1(sK21(sK41),sK15(sK21(sK41)))) ) | ~spl60_62), 32.05/32.53 inference(resolution,[],[f2965,f654])). 32.05/32.53 fof(f2984,plain,( 32.05/32.53 ~sP11(sK41) | ~spl60_366), 32.05/32.53 inference(resolution,[],[f2754,f123])). 32.05/32.53 fof(f2985,plain,( 32.05/32.53 $false | (~spl60_56 | ~spl60_366)), 32.05/32.53 inference(subsumption_resolution,[],[f2984,f721])). 32.05/32.53 fof(f2986,plain,( 32.05/32.53 ~spl60_56 | ~spl60_366), 32.05/32.53 inference(avatar_contradiction_clause,[],[f2985])). 32.05/32.53 fof(f5968,plain,( 32.05/32.53 spl60_756 <=> r1(sK21(sK41),sK15(sK21(sK41)))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_756])])). 32.05/32.53 fof(f5969,plain,( 32.05/32.53 r1(sK21(sK41),sK15(sK21(sK41))) | ~spl60_756), 32.05/32.53 inference(avatar_component_clause,[],[f5968])). 32.05/32.53 fof(f5971,plain,( 32.05/32.53 spl60_758 <=> ! [X1,X0] : (p1(X0) | ~r1(sK21(sK41),X1) | ~r1(X1,X0))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_758])])). 32.05/32.53 fof(f5972,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(sK21(sK41),X1) | p1(X0) | ~r1(X1,X0)) ) | ~spl60_758), 32.05/32.53 inference(avatar_component_clause,[],[f5971])). 32.05/32.53 fof(f5973,plain,( 32.05/32.53 spl60_756 | spl60_758 | ~spl60_62), 32.05/32.53 inference(avatar_split_clause,[],[f2970,f747,f5971,f5968])). 32.05/32.53 fof(f5975,plain,( 32.05/32.53 ( ! [X1] : (~r1(sK21(sK41),X1) | p1(X1)) ) | ~spl60_758), 32.05/32.53 inference(resolution,[],[f5972,f206])). 32.05/32.53 fof(f5976,plain,( 32.05/32.53 p1(sK22(sK21(sK41))) | (~spl60_62 | ~spl60_758)), 32.05/32.53 inference(resolution,[],[f5975,f2968])). 32.05/32.53 fof(f5978,plain,( 32.05/32.53 ~sP6(sK21(sK41)) | (~spl60_62 | ~spl60_758)), 32.05/32.53 inference(resolution,[],[f5976,f138])). 32.05/32.53 fof(f5979,plain,( 32.05/32.53 $false | (~spl60_62 | ~spl60_758)), 32.05/32.53 inference(subsumption_resolution,[],[f5978,f2964])). 32.05/32.53 fof(f5980,plain,( 32.05/32.53 ~spl60_62 | ~spl60_758), 32.05/32.53 inference(avatar_contradiction_clause,[],[f5979])). 32.05/32.53 fof(f5983,plain,( 32.05/32.53 p1(sK42) | ~spl60_64), 32.05/32.53 inference(resolution,[],[f751,f196])). 32.05/32.53 fof(f5988,plain,( 32.05/32.53 $false | ~spl60_64), 32.05/32.53 inference(subsumption_resolution,[],[f5983,f197])). 32.05/32.53 fof(f5989,plain,( 32.05/32.53 ~spl60_64), 32.05/32.53 inference(avatar_contradiction_clause,[],[f5988])). 32.05/32.53 fof(f6068,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(sK20(sK41),X1) | ~p1(X1) | p1(X0) | ~r1(X1,X0)) ) | ~spl60_386), 32.05/32.53 inference(resolution,[],[f2914,f132])). 32.05/32.53 fof(f6069,plain,( 32.05/32.53 ~sP8(sK41) | ~spl60_394), 32.05/32.53 inference(resolution,[],[f2960,f131])). 32.05/32.53 fof(f6070,plain,( 32.05/32.53 $false | (~spl60_386 | ~spl60_394)), 32.05/32.53 inference(subsumption_resolution,[],[f6069,f2914])). 32.05/32.53 fof(f6071,plain,( 32.05/32.53 ~spl60_386 | ~spl60_394), 32.05/32.53 inference(avatar_contradiction_clause,[],[f6070])). 32.05/32.53 fof(f6072,plain,( 32.05/32.53 sP9(sK18(sK20(sK41))) | ~spl60_392), 32.05/32.53 inference(resolution,[],[f2954,f125])). 32.05/32.53 fof(f6073,plain,( 32.05/32.53 p1(sK18(sK20(sK41))) | ~spl60_392), 32.05/32.53 inference(resolution,[],[f2954,f126])). 32.05/32.53 fof(f6074,plain,( 32.05/32.53 r1(sK20(sK41),sK18(sK20(sK41))) | ~spl60_392), 32.05/32.53 inference(resolution,[],[f2954,f127])). 32.05/32.53 fof(f6079,plain,( 32.05/32.53 r1(sK18(sK20(sK41)),sK19(sK18(sK20(sK41)))) | ~spl60_392), 32.05/32.53 inference(resolution,[],[f6072,f128])). 32.05/32.53 fof(f6136,plain,( 32.05/32.53 ( ! [X0] : (~p1(sK18(sK20(sK41))) | p1(X0) | ~r1(sK18(sK20(sK41)),X0)) ) | (~spl60_386 | ~spl60_392)), 32.05/32.53 inference(resolution,[],[f6068,f6074])). 32.05/32.53 fof(f6139,plain,( 32.05/32.53 ( ! [X0] : (~r1(sK18(sK20(sK41)),X0) | p1(X0)) ) | (~spl60_386 | ~spl60_392)), 32.05/32.53 inference(subsumption_resolution,[],[f6136,f6073])). 32.05/32.53 fof(f6141,plain,( 32.05/32.53 p1(sK19(sK18(sK20(sK41)))) | (~spl60_386 | ~spl60_392)), 32.05/32.53 inference(resolution,[],[f6139,f6079])). 32.05/32.53 fof(f6143,plain,( 32.05/32.53 ~sP9(sK18(sK20(sK41))) | (~spl60_386 | ~spl60_392)), 32.05/32.53 inference(resolution,[],[f6141,f129])). 32.05/32.53 fof(f6144,plain,( 32.05/32.53 $false | (~spl60_386 | ~spl60_392)), 32.05/32.53 inference(subsumption_resolution,[],[f6143,f6072])). 32.05/32.53 fof(f6145,plain,( 32.05/32.53 ~spl60_386 | ~spl60_392), 32.05/32.53 inference(avatar_contradiction_clause,[],[f6144])). 32.05/32.53 fof(f6159,plain,( 32.05/32.53 r1(sK43,sK16(sK43)) | ~spl60_384), 32.05/32.53 inference(resolution,[],[f2908,f195])). 32.05/32.53 fof(f6163,plain,( 32.05/32.53 p1(sK16(sK43)) | ~spl60_384), 32.05/32.53 inference(resolution,[],[f6159,f194])). 32.05/32.53 fof(f6164,plain,( 32.05/32.53 ( ! [X0] : (~r1(X0,sK43) | sP8(X0) | p1(X0) | ~sP12(X0)) ) | ~spl60_384), 32.05/32.53 inference(resolution,[],[f6163,f121])). 32.05/32.53 fof(f6253,plain,( 32.05/32.53 sP8(sK41) | p1(sK41) | ~sP12(sK41) | ~spl60_384), 32.05/32.53 inference(resolution,[],[f6164,f195])). 32.05/32.53 fof(f6254,plain,( 32.05/32.53 p1(sK41) | ~sP12(sK41) | (~spl60_384 | ~spl60_387)), 32.05/32.53 inference(subsumption_resolution,[],[f6253,f2911])). 32.05/32.53 fof(f6255,plain,( 32.05/32.53 ~sP12(sK41) | (~spl60_3 | ~spl60_384 | ~spl60_387)), 32.05/32.53 inference(subsumption_resolution,[],[f6254,f224])). 32.05/32.53 fof(f6256,plain,( 32.05/32.53 $false | (~spl60_3 | ~spl60_384 | ~spl60_387)), 32.05/32.53 inference(subsumption_resolution,[],[f6255,f645])). 32.05/32.53 fof(f6257,plain,( 32.05/32.53 spl60_3 | ~spl60_384 | spl60_387), 32.05/32.53 inference(avatar_contradiction_clause,[],[f6256])). 32.05/32.53 fof(f6259,plain,( 32.05/32.53 sP5(sK21(sK41)) | ~spl60_62), 32.05/32.53 inference(resolution,[],[f748,f133])). 32.05/32.53 fof(f6262,plain,( 32.05/32.53 r1(sK41,sK21(sK41)) | ~spl60_62), 32.05/32.53 inference(resolution,[],[f748,f136])). 32.05/32.53 fof(f6264,plain,( 32.05/32.53 ( ! [X4,X5,X3] : (~r1(sK21(sK41),X5) | ~r1(X4,X3) | ~p1(X4) | ~r1(X5,X4) | p1(X5) | p1(X3)) ) | ~spl60_62), 32.05/32.53 inference(resolution,[],[f6259,f140])). 32.05/32.53 fof(f6269,plain,( 32.05/32.53 ( ! [X0] : (~r1(sK21(sK41),X0) | p1(X0) | sP10(X0)) ) | (~spl60_58 | ~spl60_62)), 32.05/32.53 inference(resolution,[],[f6262,f724])). 32.05/32.53 fof(f6274,plain,( 32.05/32.53 p1(sK15(sK21(sK41))) | sP10(sK15(sK21(sK41))) | (~spl60_58 | ~spl60_62 | ~spl60_756)), 32.05/32.53 inference(resolution,[],[f6269,f5969])). 32.05/32.53 fof(f6282,plain,( 32.05/32.53 spl60_792 <=> sP10(sK15(sK21(sK41)))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_792])])). 32.05/32.53 fof(f6283,plain,( 32.05/32.53 sP10(sK15(sK21(sK41))) | ~spl60_792), 32.05/32.53 inference(avatar_component_clause,[],[f6282])). 32.05/32.53 fof(f6288,plain,( 32.05/32.53 spl60_794 <=> p1(sK15(sK21(sK41)))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_794])])). 32.05/32.53 fof(f6289,plain,( 32.05/32.53 p1(sK15(sK21(sK41))) | ~spl60_794), 32.05/32.53 inference(avatar_component_clause,[],[f6288])). 32.05/32.53 fof(f6290,plain,( 32.05/32.53 spl60_792 | spl60_794 | ~spl60_58 | ~spl60_62 | ~spl60_756), 32.05/32.53 inference(avatar_split_clause,[],[f6274,f5968,f747,f723,f6288,f6282])). 32.05/32.53 fof(f6291,plain,( 32.05/32.53 sP9(sK18(sK15(sK21(sK41)))) | ~spl60_792), 32.05/32.53 inference(resolution,[],[f6283,f125])). 32.05/32.53 fof(f6292,plain,( 32.05/32.53 p1(sK18(sK15(sK21(sK41)))) | ~spl60_792), 32.05/32.53 inference(resolution,[],[f6283,f126])). 32.05/32.53 fof(f6293,plain,( 32.05/32.53 r1(sK15(sK21(sK41)),sK18(sK15(sK21(sK41)))) | ~spl60_792), 32.05/32.53 inference(resolution,[],[f6283,f127])). 32.05/32.53 fof(f6294,plain,( 32.05/32.53 r1(sK18(sK15(sK21(sK41))),sK19(sK18(sK15(sK21(sK41))))) | ~spl60_792), 32.05/32.53 inference(resolution,[],[f6291,f128])). 32.05/32.53 fof(f9746,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(X0,X1) | ~p1(X0) | ~r1(sK15(sK21(sK41)),X0) | p1(sK15(sK21(sK41))) | p1(X1)) ) | (~spl60_62 | ~spl60_756)), 32.05/32.53 inference(resolution,[],[f6264,f5969])). 32.05/32.53 fof(f9850,plain,( 32.05/32.53 spl60_1192 <=> ! [X1,X0] : (~r1(X0,X1) | p1(X1) | ~r1(sK15(sK21(sK41)),X0) | ~p1(X0))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_1192])])). 32.05/32.53 fof(f9851,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(sK15(sK21(sK41)),X0) | p1(X1) | ~r1(X0,X1) | ~p1(X0)) ) | ~spl60_1192), 32.05/32.53 inference(avatar_component_clause,[],[f9850])). 32.05/32.53 fof(f9853,plain,( 32.05/32.53 ( ! [X0] : (p1(X0) | ~r1(sK18(sK15(sK21(sK41))),X0) | ~p1(sK18(sK15(sK21(sK41))))) ) | (~spl60_792 | ~spl60_1192)), 32.05/32.53 inference(resolution,[],[f9851,f6293])). 32.05/32.53 fof(f9855,plain,( 32.05/32.53 ( ! [X0] : (~r1(sK18(sK15(sK21(sK41))),X0) | p1(X0)) ) | (~spl60_792 | ~spl60_1192)), 32.05/32.53 inference(subsumption_resolution,[],[f9853,f6292])). 32.05/32.53 fof(f9856,plain,( 32.05/32.53 p1(sK19(sK18(sK15(sK21(sK41))))) | (~spl60_792 | ~spl60_1192)), 32.05/32.53 inference(resolution,[],[f9855,f6294])). 32.05/32.53 fof(f9858,plain,( 32.05/32.53 ~sP9(sK18(sK15(sK21(sK41)))) | (~spl60_792 | ~spl60_1192)), 32.05/32.53 inference(resolution,[],[f9856,f129])). 32.05/32.53 fof(f9859,plain,( 32.05/32.53 $false | (~spl60_792 | ~spl60_1192)), 32.05/32.53 inference(subsumption_resolution,[],[f9858,f6291])). 32.05/32.53 fof(f9860,plain,( 32.05/32.53 ~spl60_792 | ~spl60_1192), 32.05/32.53 inference(avatar_contradiction_clause,[],[f9859])). 32.05/32.53 fof(f9899,plain,( 32.05/32.53 spl60_794 | spl60_1192 | ~spl60_62 | ~spl60_756), 32.05/32.53 inference(avatar_split_clause,[],[f9746,f5968,f747,f9850,f6288])). 32.05/32.53 fof(f9900,plain,( 32.05/32.53 ( ! [X2,X0,X1] : (~r1(sK21(sK41),X0) | p1(X1) | ~r1(X0,X1) | ~r1(X2,sK21(sK41)) | ~sP13(X2)) ) | ~spl60_794), 32.05/32.53 inference(resolution,[],[f6289,f119])). 32.05/32.53 fof(f9902,plain,( 32.05/32.53 spl60_1202 <=> ! [X2] : (~r1(X2,sK21(sK41)) | ~sP13(X2))), 32.05/32.53 introduced(avatar_definition,[new_symbols(naming,[spl60_1202])])). 32.05/32.53 fof(f9903,plain,( 32.05/32.53 ( ! [X2] : (~r1(X2,sK21(sK41)) | ~sP13(X2)) ) | ~spl60_1202), 32.05/32.53 inference(avatar_component_clause,[],[f9902])). 32.05/32.53 fof(f9904,plain,( 32.05/32.53 spl60_1202 | spl60_758 | ~spl60_794), 32.05/32.53 inference(avatar_split_clause,[],[f9900,f6288,f5971,f9902])). 32.05/32.53 fof(f9906,plain,( 32.05/32.53 ~sP13(sK41) | (~spl60_62 | ~spl60_1202)), 32.05/32.53 inference(resolution,[],[f9903,f6262])). 32.05/32.53 fof(f9907,plain,( 32.05/32.53 $false | (~spl60_62 | ~spl60_1202)), 32.05/32.53 inference(subsumption_resolution,[],[f9906,f646])). 32.05/32.53 fof(f9908,plain,( 32.05/32.53 ~spl60_62 | ~spl60_1202), 32.05/32.53 inference(avatar_contradiction_clause,[],[f9907])). 32.05/32.53 fof(f9910,plain,( 32.05/32.53 ( ! [X0,X1] : (~r1(sK17(sK41),X0) | ~r1(X0,X1) | p1(X1) | ~p1(X0)) ) | ~spl60_56), 32.05/32.53 inference(resolution,[],[f721,f122])). 32.05/32.53 fof(f10188,plain,( 32.05/32.53 ( ! [X1] : (~r1(sK26(sK17(sK41)),X1) | p1(X1) | ~p1(sK26(sK17(sK41)))) ) | (~spl60_56 | ~spl60_364)), 32.05/32.53 inference(resolution,[],[f9910,f2885])). 32.05/32.53 fof(f10190,plain,( 32.05/32.53 ( ! [X1] : (~r1(sK26(sK17(sK41)),X1) | p1(X1)) ) | (~spl60_56 | ~spl60_364)), 32.05/32.53 inference(subsumption_resolution,[],[f10188,f2887])). 32.05/32.53 fof(f10191,plain,( 32.05/32.53 p1(sK27(sK26(sK17(sK41)))) | (~spl60_56 | ~spl60_364)), 32.05/32.53 inference(resolution,[],[f10190,f2891])). 32.05/32.53 fof(f10196,plain,( 32.05/32.53 ~sP0(sK26(sK17(sK41))) | (~spl60_56 | ~spl60_364)), 32.05/32.53 inference(resolution,[],[f10191,f152])). 32.05/32.53 fof(f10197,plain,( 32.05/32.53 $false | (~spl60_56 | ~spl60_364)), 32.05/32.53 inference(subsumption_resolution,[],[f10196,f2886])). 32.05/32.53 fof(f10198,plain,( 32.05/32.53 ~spl60_56 | ~spl60_364), 32.05/32.53 inference(avatar_contradiction_clause,[],[f10197])). 32.05/32.53 fof(f10201,plain,( 32.05/32.53 r1(sK41,sK20(sK41)) | ~spl60_386), 32.05/32.53 inference(resolution,[],[f2914,f130])). 32.05/32.53 fof(f10213,plain,( 32.05/32.53 ( ! [X6] : (~r1(sK41,X6) | p1(X6) | sP10(X6)) ) | ~spl60_58), 32.05/32.53 inference(resolution,[],[f724,f206])). 32.05/32.53 fof(f10226,plain,( 32.05/32.53 p1(sK20(sK41)) | sP10(sK20(sK41)) | (~spl60_58 | ~spl60_386)), 32.05/32.53 inference(resolution,[],[f10213,f10201])). 32.05/32.53 fof(f10231,plain,( 32.05/32.53 sP10(sK20(sK41)) | (~spl60_58 | ~spl60_386 | ~spl60_395)), 32.05/32.53 inference(subsumption_resolution,[],[f10226,f2957])). 32.05/32.53 fof(f10232,plain,( 32.05/32.53 $false | (~spl60_58 | ~spl60_386 | ~spl60_393 | ~spl60_395)), 32.05/32.53 inference(subsumption_resolution,[],[f10231,f2951])). 32.05/32.53 fof(f10233,plain,( 32.05/32.53 ~spl60_58 | ~spl60_386 | spl60_393 | spl60_395), 32.05/32.53 inference(avatar_contradiction_clause,[],[f10232])). 32.05/32.53 fof(f10235,plain,( 32.05/32.53 $false), 32.05/32.53 inference(avatar_sat_refutation,[],[f725,f752,f2688,f2695,f2755,f2841,f2845,f2915,f2986,f5973,f5980,f5989,f6071,f6145,f6257,f6290,f9860,f9899,f9904,f9908,f10198,f10233])). 32.05/32.53 % SZS output end Proof for theBenchmark 32.05/32.53 % ------------------------------ 32.05/32.53 % Version: Vampire 4.2.2 (commit 552c234 on 2018-07-02 14:53:33 +0100) 32.05/32.53 % Termination reason: Refutation 32.05/32.53 32.05/32.53 % Memory used [KB]: 14967 32.05/32.53 % Time elapsed: 0.424 s 32.05/32.53 % ------------------------------ 32.05/32.53 % ------------------------------ 32.05/32.53 % Success in time 32.292 s 32.05/32.54 EOF