0.03/0.11	% Problem    : theBenchmark.p : TPTP v0.0.0. Released v0.0.0.
0.03/0.13	% Command    : run_vampire %s %d
0.13/0.34	% Computer   : n026.cluster.edu
0.13/0.34	% Model      : x86_64 x86_64
0.13/0.34	% CPU        : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
0.13/0.34	% Memory     : 8042.1875MB
0.13/0.34	% OS         : Linux 3.10.0-693.el7.x86_64
0.13/0.34	% CPULimit   : 1200
0.13/0.34	% WCLimit    : 120
0.13/0.34	% DateTime   : Tue Jul 13 12:01:14 EDT 2021
0.13/0.34	% CPUTime    : 
0.13/0.34	This is a THF_ problem
0.13/0.34	Running vampire --ignore_missing on --mode casc_hol --cores 0 -t 120 /export/starexec/sandbox2/benchmark/theBenchmark.p
0.13/0.34	Running in auto input_syntax mode. Trying TPTP
0.20/0.38	% (14408)dis+10_128_acc=on:add=off:add=off:afp=4000:afq=1.4:amm=off:bd=preordered:cond=on:fsr=off:fde=unused:gs=on:gsem=on:irw=on:lma=on:nm=64:nwc=1.2:nicw=on:sos=on:sp=occurrence:updr=off:uhcvi=on:thsq=on_40 on theBenchmark
0.20/0.39	% (14402)lrs+1010_8_add=off:afp=100000:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afq=1.0:amm=off:anc=none:irw=on:nm=16:newcnf=on:nwc=1.1:nicw=on:stl=30:sp=reverse_arity:urr=on:thsq=on_13 on theBenchmark
0.20/0.39	% (14401)dis+10_128_acc=on:add=off:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afp=4000:afq=1.4:amm=off:bd=preordered:cond=on:fsr=off:fde=unused:gs=on:gsem=on:irw=on:lma=on:nm=64:nwc=1.2:nicw=on:sos=on:sp=occurrence:updr=off:uhcvi=on:thsq=on_2 on theBenchmark
0.20/0.39	% (14402)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.39	% (14400)lrs+1011_8_add=large:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afp=100000:afq=1.1:er=filter:gsp=input_only:gs=on:gsem=on:lma=on:nm=6:nwc=1:stl=30:sd=2:ss=axioms:st=1.5:sos=on:thsq=on_3 on theBenchmark
0.20/0.39	% (14399)lrs-11_4:1_afp=4000:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afq=2.0:anc=none:br=off:gs=on:lwlo=on:nm=64:nwc=3:stl=30:urr=on:thsq=on_2 on theBenchmark
0.20/0.39	% (14411)lrs+1010_3_av=off:fsr=off:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:gs=on:gsem=off:nm=2:newcnf=on:nwc=2:stl=30:sp=reverse_arity:urr=on:updr=off:thsq=on_9 on theBenchmark
0.20/0.39	% (14411)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.40	% (14398)ott+1002_2_av=off:bd=preordered:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:irw=on:lma=on:nm=64:nwc=10:sp=reverse_arity:updr=off:thsq=on_2 on theBenchmark
0.20/0.40	% (14416)ott+11_20_afr=on:afp=100000:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afq=1.0:amm=sco:anc=all:bsr=on:irw=on:lma=on:nm=4:nwc=1.2:sac=on:sp=occurrence:thsq=on_6 on theBenchmark
0.20/0.40	% (14420)dis+10_4_av=off:bsr=on:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:cond=fast:er=filter:fde=none:gsp=input_only:lcm=reverse:lma=on:nwc=4:sp=occurrence:urr=on:thsq=on_8 on theBenchmark
0.20/0.40	% (14424)lrs+1_4_afp=100000:afq=1.2:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:anc=none:bd=off:cond=on:gs=on:gsem=off:nm=64:nwc=1:sd=2:ss=axioms:st=2.0:sos=all:updr=off:thsq=on_300 on theBenchmark
0.20/0.40	% (14412)lrs+1002_1_av=off:er=filter:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:fsr=off:gs=on:gsem=off:irw=on:lma=on:nm=4:nwc=1:stl=30:sd=3:ss=axioms:st=1.5:sos=on:thsq=on_1 on theBenchmark
0.20/0.41	% (14404)lrs+1011_5:1_acc=on:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:amm=off:anc=all_dependent:bd=off:ccuc=small_ones:fde=unused:gs=on:gsaa=full_model:gsem=off:lcm=predicate:lwlo=on:nm=6:newcnf=on:nwc=2.5:stl=30:sp=occurrence:updr=off:thsq=on_3 on theBenchmark
0.20/0.41	% (14423)lrs+1010_8_add=off:afp=100000:csup=on:inj=off:cases=on:chr=off:e2e=on:cnfonf=eager:afq=1.0:amm=off:anc=none:irw=on:nm=16:newcnf=on:nwc=1.1:nicw=on:stl=30:sp=reverse_arity:urr=on:thsq=on_13 on theBenchmark
0.20/0.41	% (14422)lrs+1011_5_add=large:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afp=1000:afq=1.2:anc=none:fsr=off:irw=on:lma=on:nm=64:newcnf=on:nwc=1:stl=30:sd=3:ss=axioms:st=2.0:sos=on:sac=on:sp=reverse_arity:urr=on:updr=off:thsq=on_130 on theBenchmark
0.20/0.41	% (14403)ott+1002_8:1_add=off:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afr=on:afp=100000:afq=1.1:amm=off:anc=none:bd=off:bs=unit_only:fsr=off:gs=on:gsem=off:nm=32:nwc=10:sp=occurrence:urr=on:updr=off:thsq=on_14 on theBenchmark
0.20/0.41	% (14423)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.41	% (14422)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.42	% (14404)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.42	% (14420)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
0.20/0.42	% (14421)lrs+1002_1_add=large:csup=on:inj=on:fe=off:chr=on:cases=on:cnfonf=eager:afr=on:afp=1000:afq=1.1:amm=sco:anc=none:er=known:fsr=off:gs=on:gsem=off:lma=on:nm=2:newcnf=on:nwc=2:stl=30:sd=1:ss=axioms:st=5.0:sp=reverse_arity:updr=off:thsq=on_50 on theBenchmark
0.20/0.42	% (14421)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.42	% (14400)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
0.20/0.42	% (14426)dis+1002_4_add=large:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afp=40000:afq=1.0:anc=none:cond=fast:fde=none:gs=on:gsaa=full_model:lma=on:lwlo=on:nm=0:nwc=1.5:sp=reverse_arity:tha=off_300 on theBenchmark
0.20/0.42	% (14425)lrs-11_4:1_afp=4000:csup=on:inj=on:mXXn=1:cases=on:e2e=on:cnfonf=eager:afq=2.0:anc=none:br=off:gs=on:lwlo=on:nm=64:nwc=3:stl=30:urr=on:thsq=on_186 on theBenchmark
0.20/0.43	% (14418)lrs+10_12_add=off:afp=100000:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afq=1.4:amm=sco:anc=none:cond=on:lma=on:nm=64:nwc=1.3:stl=30:sac=on:urr=on:thsq=on_41 on theBenchmark
0.20/0.43	% (14417)dis+1002_3:1_acc=model:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afr=on:afp=40000:afq=1.1:anc=none:ccuc=first:fsr=off:gsp=input_only:irw=on:nm=16:nwc=1:sos=all:thsq=on_8 on theBenchmark
0.20/0.43	% (14415)lrs+1011_5:1_acc=on:csup=on:inj=on:e2e=on:prag=on:cases=on:cnfonf=eager:amm=off:anc=all_dependent:bd=off:ccuc=small_ones:fde=unused:gs=on:gsaa=full_model:gsem=off:lcm=predicate:lwlo=on:nm=6:newcnf=on:nwc=2.5:stl=30:sp=occurrence:updr=off:thsq=on_30 on theBenchmark
0.20/0.43	% (14414)lrs+1010_3:2_afr=on:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afp=100000:afq=1.1:anc=none:gsp=input_only:irw=on:lwlo=on:nm=2:newcnf=on:nwc=1.7:sac=on:sp=occurrence:thsq=on_300 on theBenchmark
0.20/0.43	% (14427)dis-11_3_add=off:afp=40000:csup=on:inj=on:chr=on:e2e=on:prag=on:cases=on:cnfonf=eager:afq=1.0:fde=all:amm=sco:anc=none:gs=on:irw=on:lcm=reverse:nm=6:nwc=1:sd=4:ss=axioms:st=3.0:sos=on:sac=on:thsq=on_50 on theBenchmark
0.20/0.43	% (14415)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.43	% (14414)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.43	% (14413)ott+2_2_afp=10000:afq=1.4:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:amm=off:anc=none:gsp=input_only:gs=on:gsem=off:irw=on:lcm=predicate:nm=32:nwc=1.5:sos=on:sp=reverse_arity:thsq=on_7 on theBenchmark
0.20/0.43	% (14407)dis+1_2:3_acc=on:add=large:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afp=40000:afq=2.0:amm=sco:anc=none:er=filter:fsr=off:gsp=input_only:gs=on:gsem=off:nm=64:newcnf=on:nwc=1:thsq=on_3 on theBenchmark
0.20/0.43	% (14406)dis+1010_3:2_av=off:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:gsp=input_only:nm=2:nwc=1:sp=reverse_arity:urr=ec_only:thsq=on_29 on theBenchmark
0.20/0.43	% (14410)dis+1002_6_add=large:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afp=40000:afq=2.0:bsr=on:cond=on:irw=on:lma=on:nm=2:nwc=2.5:nicw=on:sp=reverse_arity:updr=off:thsq=on_2 on theBenchmark
0.20/0.43	% (14409)dis-11_3_add=off:afp=40000:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afq=1.0:amm=sco:anc=none:gs=on:irw=on:lcm=reverse:nm=6:nwc=1:sd=4:ss=axioms:st=3.0:sos=on:sac=on:thsq=on_2 on theBenchmark
0.20/0.44	% (14419)lrs-11_4:1_afp=4000:csup=on:inj=on:chr=on:cases=on:cnfonf=lazy_gen:afq=2.0:anc=none:br=off:gs=on:lwlo=on:nm=64:nwc=3:stl=30:urr=on:thsq=on_30 on theBenchmark
0.20/0.44	% (14407)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.44	% (14405)lrs+4_3_av=off:br=off:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:nm=0:newcnf=on:nwc=1:stl=30:sp=occurrence:urr=on:thsq=on_32 on theBenchmark
0.20/0.44	% (14405)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
0.20/0.45	% (14417)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
0.20/0.45	% (14414)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
0.20/0.46	% (14406)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
0.20/0.46	% (14413)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
0.20/0.46	% (14407)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
4.13/0.88	% (14412)Time limit reached!
4.13/0.88	% (14412)------------------------------
4.13/0.88	% (14412)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
4.13/0.88	% (14412)Termination reason: Time limit
4.13/0.88	% (14412)Termination phase: Saturation
4.13/0.88	
4.13/0.88	% (14412)Memory used [KB]: 9850
4.13/0.88	% (14412)Time elapsed: 0.500 s
4.13/0.88	% (14412)------------------------------
4.13/0.88	% (14412)------------------------------
4.52/0.94	% (14428)dis+1011_10_add=large:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afr=on:afp=4000:afq=1.0:amm=off:anc=none:lma=on:nm=64:nwc=4:sac=on:sp=occurrence:thsq=on_75 on theBenchmark
5.18/1.06	% (14401)Time limit reached!
5.18/1.06	% (14401)------------------------------
5.18/1.06	% (14401)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
5.18/1.06	% (14401)Termination reason: Time limit
5.18/1.06	
5.18/1.06	% (14401)Memory used [KB]: 13816
5.18/1.06	% (14401)Time elapsed: 0.702 s
5.18/1.06	% (14401)------------------------------
5.18/1.06	% (14401)------------------------------
5.18/1.07	% (14409)Time limit reached!
5.18/1.07	% (14409)------------------------------
5.18/1.07	% (14409)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
5.18/1.07	% (14409)Termination reason: Time limit
5.18/1.07	
5.18/1.07	% (14409)Memory used [KB]: 13176
5.18/1.07	% (14409)Time elapsed: 0.711 s
5.18/1.07	% (14409)------------------------------
5.18/1.07	% (14409)------------------------------
5.18/1.07	% (14410)Time limit reached!
5.18/1.07	% (14410)------------------------------
5.18/1.07	% (14410)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
5.18/1.07	% (14410)Termination reason: Time limit
5.18/1.07	
5.18/1.07	% (14410)Memory used [KB]: 10106
5.18/1.07	% (14410)Time elapsed: 0.711 s
5.18/1.07	% (14410)------------------------------
5.18/1.07	% (14410)------------------------------
5.71/1.10	% (14399)Time limit reached!
5.71/1.10	% (14399)------------------------------
5.71/1.10	% (14399)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
5.71/1.10	% (14399)Termination reason: Time limit
5.71/1.10	% (14399)Termination phase: Saturation
5.71/1.10	
5.71/1.10	% (14399)Memory used [KB]: 14583
5.71/1.10	% (14399)Time elapsed: 0.700 s
5.71/1.10	% (14399)------------------------------
5.71/1.10	% (14399)------------------------------
5.71/1.10	% (14398)Time limit reached!
5.71/1.10	% (14398)------------------------------
5.71/1.10	% (14398)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
5.71/1.11	% (14429)dis+1010_3:2_av=off:csup=on:prag=on:chr=on:cases=on:bet=on:cnfonf=lazy_not_be_gen:gsp=input_only:nm=2:nwc=1:sp=reverse_arity:urr=ec_only:thsq=on_29 on theBenchmark
5.71/1.11	% (14398)Termination reason: Time limit
5.71/1.11	
5.71/1.11	% (14398)Memory used [KB]: 5117
5.71/1.11	% (14398)Time elapsed: 0.743 s
5.71/1.11	% (14398)------------------------------
5.71/1.11	% (14398)------------------------------
5.71/1.11	% (14430)lrs+1011_8_add=large:csup=on:inj=on:prag=on:cases=on:cnfonf=eager:afp=100000:afq=1.1:er=filter:gsp=input_only:gs=on:gsem=on:lma=on:nm=6:nwc=1:stl=30:sd=2:ss=axioms:st=1.5:sos=on:thsq=on_26 on theBenchmark
5.71/1.11	% (14431)lrs+1011_8_add=large:csup=on:fe=off:cases=on:cnfonf=eager:afp=100000:afq=1.1:er=filter:gsp=input_only:gs=on:gsem=on:lma=on:nm=6:nwc=1:stl=30:sd=2:ss=axioms:st=1.5:sos=on:thsq=on_30 on theBenchmark
5.71/1.12	% (14431)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
5.71/1.12	% (14430)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
5.71/1.14	% (14432)dis+1002_4_add=large:csup=on:narr=off:inj=on:prag=on:cbe=off:cases=on:cnfonf=eager:afp=40000:afq=1.0:anc=none:cond=fast:fde=none:gs=on:gsaa=full_model:lma=on:lwlo=on:nm=0:nwc=1.5:sp=reverse_arity:thsq=on_27 on theBenchmark
5.71/1.15	% (14433)dis+1_3_add=large:afp=4000:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afq=1.0:anc=none:gs=on:gsem=off:inw=on:lcm=reverse:lwlo=on:nm=64:nwc=1:sos=all:sac=on:updr=off:uhcvi=on:thsq=on_125 on theBenchmark
6.87/1.26	% (14400)Time limit reached!
6.87/1.26	% (14400)------------------------------
6.87/1.26	% (14400)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
6.87/1.26	% (14400)Termination reason: Time limit
6.87/1.26	
6.87/1.26	% (14400)Memory used [KB]: 15223
6.87/1.26	% (14400)Time elapsed: 0.901 s
6.87/1.26	% (14400)------------------------------
6.87/1.26	% (14400)------------------------------
6.87/1.28	% (14407)Time limit reached!
6.87/1.28	% (14407)------------------------------
6.87/1.28	% (14407)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
6.87/1.28	% (14407)Termination reason: Time limit
6.87/1.28	% (14407)Termination phase: Saturation
6.87/1.28	
6.87/1.28	% (14407)Memory used [KB]: 14711
6.87/1.28	% (14407)Time elapsed: 0.900 s
6.87/1.28	% (14407)------------------------------
6.87/1.28	% (14407)------------------------------
6.87/1.28	% (14404)Time limit reached!
6.87/1.28	% (14404)------------------------------
6.87/1.28	% (14404)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
6.87/1.28	% (14404)Termination reason: Time limit
6.87/1.28	
6.87/1.28	% (14404)Memory used [KB]: 15863
6.87/1.28	% (14404)Time elapsed: 0.906 s
6.87/1.28	% (14404)------------------------------
6.87/1.28	% (14404)------------------------------
6.87/1.30	% (14429)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
7.35/1.31	% (14434)dis+1010_3:1_av=off:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:irw=on:nm=32:nwc=1:sos=all:urr=ec_only:updr=off:thsq=on_77 on theBenchmark
7.35/1.32	% (14435)lrs+1011_5:4_acc=on:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:add=large:afr=on:afp=10000:afq=2.0:amm=sco:anc=none:bsr=on:ccuc=first:cond=on:fde=unused:gs=on:gsaa=from_current:gsem=off:irw=on:nm=2:newcnf=on:nwc=1.2:stl=30:sos=on:sac=on:sp=reverse_arity:updr=off:thsq=on_126 on theBenchmark
7.35/1.32	% (14435)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
7.35/1.33	% (14436)lrs+1002_1_add=large:csup=on:narr=off:inj=on:fe=off:chr=on:cases=on:cnfonf=eager:afr=on:afp=1000:afq=1.1:amm=sco:anc=none:er=known:fsr=off:gs=on:gsem=off:lma=on:nm=2:newcnf=on:nwc=2:stl=30:sd=1:ss=axioms:st=5.0:sp=reverse_arity:updr=off:thsq=on_50 on theBenchmark
7.35/1.34	% (14436)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
11.65/1.87	% (14416)Time limit reached!
11.65/1.87	% (14416)------------------------------
11.65/1.87	% (14416)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
11.65/1.87	% (14416)Termination reason: Time limit
11.65/1.87	% (14416)Termination phase: Saturation
11.65/1.87	
11.65/1.87	% (14416)Memory used [KB]: 10490
11.65/1.87	% (14416)Time elapsed: 1.500 s
11.65/1.87	% (14416)------------------------------
11.65/1.87	% (14416)------------------------------
12.33/1.92	% (14437)lrs-3_4:1_afp=1000:afq=1.4:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:amm=sco:fde=none:gs=on:lcm=reverse:lma=on:nwc=1.5:stl=30:sd=1:ss=axioms:sp=reverse_arity:urr=on:updr=off:uhcvi=on:thsq=on_11 on theBenchmark
13.53/2.07	% (14413)Time limit reached!
13.53/2.07	% (14413)------------------------------
13.53/2.07	% (14413)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
13.53/2.07	% (14413)Termination reason: Time limit
13.53/2.07	
13.53/2.07	% (14413)Memory used [KB]: 16247
13.53/2.07	% (14413)Time elapsed: 1.710 s
13.53/2.07	% (14413)------------------------------
13.53/2.07	% (14413)------------------------------
14.13/2.14	% (14438)ott+11_2:1_add=large:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:afp=40000:afq=2.0:amm=sco:anc=none:br=off:cond=on:irw=on:nwc=1:sd=2:ss=axioms:st=2.0:sos=all:urr=on:updr=off:thsq=on_9 on theBenchmark
15.96/2.37	% (14417)Time limit reached!
15.96/2.37	% (14417)------------------------------
15.96/2.37	% (14417)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
15.96/2.37	% (14417)Termination reason: Time limit
15.96/2.37	% (14417)Termination phase: Saturation
15.96/2.37	
15.96/2.37	% (14417)Memory used [KB]: 16886
15.96/2.37	% (14417)Time elapsed: 2.0000 s
15.96/2.37	% (14417)------------------------------
15.96/2.37	% (14417)------------------------------
16.45/2.44	% (14439)lrs+1011_8_add=large:csup=off:cases=on:cnfonf=eager:afp=100000:afq=1.1:er=filter:gsp=input_only:gs=on:gsem=on:lma=on:nm=6:nwc=1:stl=30:sd=2:ss=axioms:st=1.5:sos=on:thsq=on_13 on theBenchmark
16.45/2.45	% (14439)WARNING: Not using GeneralSplitting currently not compatible with polymorphic/higher-order inputs.
16.45/2.48	% (14420)Time limit reached!
16.45/2.48	% (14420)------------------------------
16.45/2.48	% (14420)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
16.45/2.48	% (14420)Termination reason: Time limit
16.45/2.48	
16.45/2.48	% (14420)Memory used [KB]: 9083
16.45/2.48	% (14420)Time elapsed: 2.098 s
16.45/2.48	% (14420)------------------------------
16.45/2.48	% (14420)------------------------------
17.15/2.54	% (14440)lrs+1011_2:1_av=off:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:irw=on:lwlo=on:nm=16:newcnf=on:nwc=2:sd=4:ss=axioms:st=3.0:sp=occurrence:thsq=on_300 on theBenchmark
17.15/2.54	% (14440)WARNING: Not using newCnf currently not compatible with polymorphic/higher-order inputs.
17.69/2.62	% (14411)Time limit reached!
17.69/2.62	% (14411)------------------------------
17.69/2.62	% (14411)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
17.69/2.62	% (14411)Termination reason: Time limit
17.69/2.62	
17.69/2.62	% (14411)Memory used [KB]: 23666
17.69/2.62	% (14411)Time elapsed: 2.240 s
17.69/2.62	% (14411)------------------------------
17.69/2.62	% (14411)------------------------------
18.33/2.68	% (14441)dis+1011_4_av=off:cond=on:csup=on:inj=on:chr=on:cases=on:cnfonf=eager:irw=on:lma=on:nm=2:nwc=1:sos=all:sp=occurrence:thsq=on_5 on theBenchmark
23.04/3.27	% (14439)First to succeed.
23.53/3.35	% (14439)Refutation found. Thanks to Tanya!
23.53/3.35	% SZS status Theorem for theBenchmark
23.53/3.35	% SZS output start Proof for theBenchmark
23.53/3.35	thf(type_def_6, type, a: $tType).
23.53/3.35	thf(type_def_7, type, >: ($tType * $tType) > $tType).
23.53/3.35	thf(func_def_11, type, sP0: (a > a > $o) > (a > a > $o) > a > a > $o).
23.53/3.35	thf(func_def_12, type, sP1: (a > a > $o) > (a > a > $o) > a > a > $o).
23.53/3.35	thf(func_def_13, type, sP2: a > (a > a > $o) > (a > a > $o) > a > $o).
23.53/3.35	thf(func_def_14, type, sP3: (a > a > $o) > a > a > $o).
23.53/3.35	thf(func_def_15, type, sP4: (a > a > $o) > a > (a > a > $o) > a > $o).
23.53/3.35	thf(func_def_16, type, sP5: (a > a > $o) > (a > a > $o) > a > a > $o).
23.53/3.35	thf(func_def_17, type, sP6: (a > a > $o) > (a > a > $o) > $o).
23.53/3.35	thf(func_def_18, type, sK7: (a > a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_19, type, sK8: (a > a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_20, type, sK9: (a > a > $o) > (a > a > $o) > a > $o).
23.53/3.35	thf(func_def_21, type, sK10: (a > $o) > (a > a > $o) > (a > a > $o) > a > a).
23.53/3.35	thf(func_def_22, type, sK11: (a > $o) > (a > a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_23, type, sK12: (a > $o) > (a > a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_24, type, sK13: (a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_25, type, sK14: (a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_26, type, sK15: (a > $o) > a > (a > a > $o) > a).
23.53/3.35	thf(func_def_27, type, sK16: (a > $o) > (a > a > $o) > a > a).
23.53/3.35	thf(func_def_28, type, sK17: (a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_29, type, sK18: (a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_30, type, sK19: a > (a > a > $o) > (a > a > $o) > a > a > $o).
23.53/3.35	thf(func_def_31, type, sK20: (a > $o) > (a > a > $o) > (a > a > $o) > a > a).
23.53/3.35	thf(func_def_32, type, sK21: (a > $o) > (a > a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_33, type, sK22: (a > $o) > (a > a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_34, type, sK23: (a > $o) > (a > a > $o) > (a > a > $o) > a > a).
23.53/3.35	thf(func_def_35, type, sK24: (a > $o) > (a > a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_36, type, sK25: (a > $o) > (a > a > $o) > (a > a > $o) > a).
23.53/3.35	thf(func_def_37, type, sK26: a > a > $o).
23.53/3.35	thf(func_def_38, type, sK27: a > a > $o).
23.53/3.35	thf(func_def_39, type, sK28: a).
23.53/3.35	thf(func_def_40, type, sK29: a).
23.53/3.35	thf(func_def_41, type, sK30: a).
23.53/3.35	thf(func_def_42, type, sK31: a).
23.53/3.35	thf(func_def_43, type, sK32: a).
23.53/3.35	thf(func_def_44, type, sK33: a > $o).
23.53/3.35	thf(func_def_49, type, kCOMB: !>[X0: $tType, X1: $tType]:(X0 > X1 > X0)).
23.53/3.35	thf(func_def_50, type, bCOMB: !>[X0: $tType, X1: $tType, X2: $tType]:((X1 > X2) > (X0 > X1) > X0 > X2)).
23.53/3.35	thf(func_def_51, type, vAND: $o > $o > $o).
23.53/3.35	thf(func_def_52, type, vOR: $o > $o > $o).
23.53/3.35	thf(func_def_53, type, vIMP: $o > $o > $o).
23.53/3.35	thf(func_def_54, type, vNOT: $o > $o).
23.53/3.35	thf(func_def_55, type, vEQ: !>[X0: $tType]:(X0 > X0 > $o)).
23.53/3.35	thf(f2498,plain,(
23.53/3.35	  $false),
23.53/3.35	  inference(avatar_sat_refutation,[],[f116,f121,f126,f257,f258,f595,f833,f868,f893,f929,f942,f955,f1144,f1210,f1233,f1244,f1266,f1332,f1405,f1443,f1444,f1445,f1455,f1547,f1609,f1651,f1668,f1669,f1704,f1791,f1825,f2055,f2082,f2116,f2130,f2167,f2192,f2212,f2236,f2263,f2318,f2336,f2372,f2488,f2493,f2497])).
23.53/3.35	thf(f2497,plain,(
23.53/3.35	  spl34_74 | spl34_75 | ~spl34_2 | ~spl34_4 | ~spl34_68 | spl34_69 | spl34_71 | spl34_76),
23.53/3.35	  inference(avatar_split_clause,[],[f2496,f1182,f1140,f1132,f1128,f118,f109,f1178,f1174])).
23.53/3.35	thf(f1174,plain,(
23.53/3.35	  spl34_74 <=> ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_74])])).
23.53/3.35	thf(f1178,plain,(
23.53/3.35	  spl34_75 <=> ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_75])])).
23.53/3.35	thf(f109,plain,(
23.53/3.35	  spl34_2 <=> ($true = ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_2])])).
23.53/3.35	thf(f118,plain,(
23.53/3.35	  spl34_4 <=> ($true = ((((sP1 @ sK26) @ sK27) @ sK30) @ sK31))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_4])])).
23.53/3.35	thf(f1128,plain,(
23.53/3.35	  spl34_68 <=> ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_68])])).
23.53/3.35	thf(f1132,plain,(
23.53/3.35	  spl34_69 <=> ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_69])])).
23.53/3.35	thf(f1140,plain,(
23.53/3.35	  spl34_71 <=> ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_71])])).
23.53/3.35	thf(f1182,plain,(
23.53/3.35	  spl34_76 <=> ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_76])])).
23.53/3.35	thf(f2496,plain,(
23.53/3.35	  ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_2 | ~spl34_4 | ~spl34_68 | spl34_69 | spl34_71 | spl34_76)),
23.53/3.35	  inference(subsumption_resolution,[],[f2495,f1133])).
23.53/3.35	thf(f1133,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | spl34_69),
23.53/3.35	  inference(avatar_component_clause,[],[f1132])).
23.53/3.35	thf(f2495,plain,(
23.53/3.35	  ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4 | ~spl34_68 | spl34_71 | spl34_76)),
23.53/3.35	  inference(subsumption_resolution,[],[f2494,f1141])).
23.53/3.35	thf(f1141,plain,(
23.53/3.35	  ($true != ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | spl34_71),
23.53/3.35	  inference(avatar_component_clause,[],[f1140])).
23.53/3.35	thf(f2494,plain,(
23.53/3.35	  ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4 | ~spl34_68 | spl34_76)),
23.53/3.35	  inference(subsumption_resolution,[],[f1750,f1183])).
23.53/3.35	thf(f1183,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | spl34_76),
23.53/3.35	  inference(avatar_component_clause,[],[f1182])).
23.53/3.35	thf(f1750,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4 | ~spl34_68)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1749])).
23.53/3.35	thf(f1749,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4 | ~spl34_68)),
23.53/3.35	  inference(superposition,[],[f1717,f1130])).
23.53/3.35	thf(f1130,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ~spl34_68),
23.53/3.35	  inference(avatar_component_clause,[],[f1128])).
23.53/3.35	thf(f1717,plain,(
23.53/3.35	  ( ! [X3 : a > $o] : (($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ X3) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ X3) @ sK26) @ sK27))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ X3) @ sK26) @ sK27)) @ (((sK22 @ X3) @ sK26) @ sK27))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = (X3 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1714])).
23.53/3.35	thf(f1714,plain,(
23.53/3.35	  ( ! [X3 : a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ X3) @ sK26) @ sK27))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ X3) @ sK26) @ sK27))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ X3) @ sK26) @ sK27)) @ (((sK22 @ X3) @ sK26) @ sK27))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = (X3 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.53/3.35	  inference(superposition,[],[f1057,f111])).
23.53/3.35	thf(f111,plain,(
23.53/3.35	  ($true = ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32)) | ~spl34_2),
23.53/3.35	  inference(avatar_component_clause,[],[f109])).
23.53/3.35	thf(f1057,plain,(
23.53/3.35	  ( ! [X6 : a > $o,X8 : a > a > $o,X7 : a,X9 : a] : (($true != ((((sP2 @ X7) @ sK26) @ X8) @ X9)) | ($true = (((((sK19 @ X7) @ sK26) @ X8) @ X9) @ (((sK22 @ X6) @ sK26) @ sK27))) | ($true != (((((sK19 @ X7) @ sK26) @ X8) @ X9) @ (((sK21 @ X6) @ sK26) @ sK27))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X6) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ X6) @ sK26) @ sK27)) @ (((sK22 @ X6) @ sK26) @ sK27))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ X6) @ sK26) @ sK27) @ sK30))) | ($true = (X6 @ sK31))) ) | ~spl34_4),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1054])).
23.53/3.35	thf(f1054,plain,(
23.53/3.35	  ( ! [X6 : a > $o,X8 : a > a > $o,X7 : a,X9 : a] : (($true != $true) | ($true != (((((sK19 @ X7) @ sK26) @ X8) @ X9) @ (((sK21 @ X6) @ sK26) @ sK27))) | ($true = (((((sK19 @ X7) @ sK26) @ X8) @ X9) @ (((sK22 @ X6) @ sK26) @ sK27))) | ($true != ((((sP2 @ X7) @ sK26) @ X8) @ X9)) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X6) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ X6) @ sK26) @ sK27)) @ (((sK22 @ X6) @ sK26) @ sK27))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ X6) @ sK26) @ sK27) @ sK30))) | ($true = (X6 @ sK31))) ) | ~spl34_4),
23.53/3.35	  inference(superposition,[],[f81,f971])).
23.53/3.35	thf(f971,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true = ((sK26 @ (((sK21 @ X0) @ sK26) @ sK27)) @ (((sK22 @ X0) @ sK26) @ sK27))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ X0) @ sK26) @ sK27)) @ (((sK22 @ X0) @ sK26) @ sK27))) | ($true = ((sK27 @ sK30) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (X0 @ sK31))) ) | ~spl34_4),
23.53/3.35	  inference(trivial_inequality_removal,[],[f956])).
23.53/3.35	thf(f956,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = ((sK27 @ sK30) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ X0) @ sK26) @ sK27)) @ (((sK22 @ X0) @ sK26) @ sK27))) | ($true = ((sK26 @ (((sK21 @ X0) @ sK26) @ sK27)) @ (((sK22 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK31))) ) | ~spl34_4),
23.53/3.35	  inference(superposition,[],[f84,f120])).
23.53/3.35	thf(f120,plain,(
23.53/3.35	  ($true = ((((sP1 @ sK26) @ sK27) @ sK30) @ sK31)) | ~spl34_4),
23.53/3.35	  inference(avatar_component_clause,[],[f118])).
23.53/3.35	thf(f84,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP1 @ X3) @ X2) @ X1) @ X0)) | ($true = ((X2 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X2 @ (((sK21 @ X4) @ X3) @ X2)) @ (((sK22 @ X4) @ X3) @ X2))) | ($true = ((X3 @ (((sK21 @ X4) @ X3) @ X2)) @ (((sK22 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f44])).
23.53/3.35	thf(f44,plain,(
23.53/3.35	  ! [X0 : a,X1 : a,X2 : a > a > $o,X3 : a > a > $o] : (! [X4 : a > $o] : (($true = (X4 @ X0)) | (($true != (X4 @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) & (($true = ((X2 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))))) | (($true != (X4 @ (((sK22 @ X4) @ X3) @ X2))) & ($true = (X4 @ (((sK21 @ X4) @ X3) @ X2))) & (($true = ((X2 @ (((sK21 @ X4) @ X3) @ X2)) @ (((sK22 @ X4) @ X3) @ X2))) | ($true = ((X3 @ (((sK21 @ X4) @ X3) @ X2)) @ (((sK22 @ X4) @ X3) @ X2)))))) | ($true != ((((sP1 @ X3) @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(skolemisation,[status(esa),new_symbols(skolem,[sK20,sK21,sK22])],[f41,f43,f42])).
23.53/3.35	thf(f42,plain,(
23.53/3.35	  ! [X1 : a,X2 : a > a > $o,X3 : a > a > $o,X4 : a > $o] : (? [X5 : a] : (((X4 @ X5) != $true) & (($true = ((X2 @ X1) @ X5)) | ($true = ((X3 @ X1) @ X5)))) => (($true != (X4 @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) & (($true = ((X2 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f43,plain,(
23.53/3.35	  ! [X2 : a > a > $o,X3 : a > a > $o,X4 : a > $o] : (? [X6 : a,X7 : a] : (((X4 @ X7) != $true) & ((X4 @ X6) = $true) & (($true = ((X2 @ X6) @ X7)) | ($true = ((X3 @ X6) @ X7)))) => (($true != (X4 @ (((sK22 @ X4) @ X3) @ X2))) & ($true = (X4 @ (((sK21 @ X4) @ X3) @ X2))) & (($true = ((X2 @ (((sK21 @ X4) @ X3) @ X2)) @ (((sK22 @ X4) @ X3) @ X2))) | ($true = ((X3 @ (((sK21 @ X4) @ X3) @ X2)) @ (((sK22 @ X4) @ X3) @ X2))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f41,plain,(
23.53/3.35	  ! [X0 : a,X1 : a,X2 : a > a > $o,X3 : a > a > $o] : (! [X4 : a > $o] : (($true = (X4 @ X0)) | ? [X5 : a] : (((X4 @ X5) != $true) & (($true = ((X2 @ X1) @ X5)) | ($true = ((X3 @ X1) @ X5)))) | ? [X6 : a,X7 : a] : (((X4 @ X7) != $true) & ((X4 @ X6) = $true) & (($true = ((X2 @ X6) @ X7)) | ($true = ((X3 @ X6) @ X7))))) | ($true != ((((sP1 @ X3) @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(rectify,[],[f40])).
23.53/3.35	thf(f40,plain,(
23.53/3.35	  ! [X19 : a,X18 : a,X1 : a > a > $o,X0 : a > a > $o] : (! [X21 : a > $o] : (($true = (X21 @ X19)) | ? [X22 : a] : (($true != (X21 @ X22)) & (($true = ((X1 @ X18) @ X22)) | ($true = ((X0 @ X18) @ X22)))) | ? [X23 : a,X24 : a] : (($true != (X21 @ X24)) & ($true = (X21 @ X23)) & (($true = ((X1 @ X23) @ X24)) | ($true = ((X0 @ X23) @ X24))))) | ($true != ((((sP1 @ X0) @ X1) @ X18) @ X19)))),
23.53/3.35	  inference(nnf_transformation,[],[f9])).
23.53/3.35	thf(f9,plain,(
23.53/3.35	  ! [X19 : a,X18 : a,X1 : a > a > $o,X0 : a > a > $o] : (! [X21 : a > $o] : (($true = (X21 @ X19)) | ? [X22 : a] : (($true != (X21 @ X22)) & (($true = ((X1 @ X18) @ X22)) | ($true = ((X0 @ X18) @ X22)))) | ? [X23 : a,X24 : a] : (($true != (X21 @ X24)) & ($true = (X21 @ X23)) & (($true = ((X1 @ X23) @ X24)) | ($true = ((X0 @ X23) @ X24))))) | ~($true = ((((sP1 @ X0) @ X1) @ X18) @ X19)))),
23.53/3.35	  introduced(predicate_definition_introduction,[new_symbols(naming,[=])])).
23.53/3.35	thf(f81,plain,(
23.53/3.35	  ( ! [X6 : a,X2 : a > a > $o,X0 : a,X5 : a,X3 : a,X1 : a > a > $o] : (($true != ((X2 @ X5) @ X6)) | ($true != (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X5)) | ($true = (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X6)) | ($true != ((((sP2 @ X3) @ X2) @ X1) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f39])).
23.53/3.35	thf(f39,plain,(
23.53/3.35	  ! [X0 : a,X1 : a > a > $o,X2 : a > a > $o,X3 : a] : ((($true != (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X0)) & ! [X5 : a,X6 : a] : (($true = (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X6)) | ($true != (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X5)) | ((((X1 @ X5) @ X6) != $true) & ($true != ((X2 @ X5) @ X6)))) & ! [X7 : a] : (($true = (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X7)) | (($true != ((X1 @ X3) @ X7)) & ($true != ((X2 @ X3) @ X7))))) | ($true != ((((sP2 @ X3) @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(skolemisation,[status(esa),new_symbols(skolem,[sK19])],[f37,f38])).
23.53/3.35	thf(f38,plain,(
23.53/3.35	  ! [X0 : a,X1 : a > a > $o,X2 : a > a > $o,X3 : a] : (? [X4 : a > $o] : (($true != (X4 @ X0)) & ! [X5 : a,X6 : a] : (((X4 @ X6) = $true) | ((X4 @ X5) != $true) | ((((X1 @ X5) @ X6) != $true) & ($true != ((X2 @ X5) @ X6)))) & ! [X7 : a] : (((X4 @ X7) = $true) | (($true != ((X1 @ X3) @ X7)) & ($true != ((X2 @ X3) @ X7))))) => (($true != (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X0)) & ! [X6 : a,X5 : a] : (($true = (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X6)) | ($true != (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X5)) | ((((X1 @ X5) @ X6) != $true) & ($true != ((X2 @ X5) @ X6)))) & ! [X7 : a] : (($true = (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X7)) | (($true != ((X1 @ X3) @ X7)) & ($true != ((X2 @ X3) @ X7))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f37,plain,(
23.53/3.35	  ! [X0 : a,X1 : a > a > $o,X2 : a > a > $o,X3 : a] : (? [X4 : a > $o] : (($true != (X4 @ X0)) & ! [X5 : a,X6 : a] : (((X4 @ X6) = $true) | ((X4 @ X5) != $true) | ((((X1 @ X5) @ X6) != $true) & ($true != ((X2 @ X5) @ X6)))) & ! [X7 : a] : (((X4 @ X7) = $true) | (($true != ((X1 @ X3) @ X7)) & ($true != ((X2 @ X3) @ X7))))) | ($true != ((((sP2 @ X3) @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(rectify,[],[f36])).
23.53/3.35	thf(f36,plain,(
23.53/3.35	  ! [X20 : a,X1 : a > a > $o,X0 : a > a > $o,X18 : a] : (? [X29 : a > $o] : (($true != (X29 @ X20)) & ! [X30 : a,X31 : a] : (($true = (X29 @ X31)) | ($true != (X29 @ X30)) | (($true != ((X1 @ X30) @ X31)) & ($true != ((X0 @ X30) @ X31)))) & ! [X32 : a] : (($true = (X29 @ X32)) | (($true != ((X1 @ X18) @ X32)) & ($true != ((X0 @ X18) @ X32))))) | ($true != ((((sP2 @ X18) @ X0) @ X1) @ X20)))),
23.53/3.35	  inference(nnf_transformation,[],[f10])).
23.53/3.35	thf(f10,plain,(
23.53/3.35	  ! [X20 : a,X1 : a > a > $o,X0 : a > a > $o,X18 : a] : (? [X29 : a > $o] : (($true != (X29 @ X20)) & ! [X30 : a,X31 : a] : (($true = (X29 @ X31)) | ($true != (X29 @ X30)) | (($true != ((X1 @ X30) @ X31)) & ($true != ((X0 @ X30) @ X31)))) & ! [X32 : a] : (($true = (X29 @ X32)) | (($true != ((X1 @ X18) @ X32)) & ($true != ((X0 @ X18) @ X32))))) | ~($true = ((((sP2 @ X18) @ X0) @ X1) @ X20)))),
23.53/3.35	  introduced(predicate_definition_introduction,[new_symbols(naming,[=])])).
23.53/3.35	thf(f2493,plain,(
23.53/3.35	  spl34_70 | ~spl34_4 | spl34_69 | spl34_71 | ~spl34_77),
23.53/3.35	  inference(avatar_split_clause,[],[f2492,f1230,f1140,f1132,f118,f1136])).
23.53/3.35	thf(f1136,plain,(
23.53/3.35	  spl34_70 <=> ($true = ((sK26 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_70])])).
23.53/3.35	thf(f1230,plain,(
23.53/3.35	  spl34_77 <=> ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_77])])).
23.53/3.35	thf(f2492,plain,(
23.53/3.35	  ($true = ((sK26 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | (~spl34_4 | spl34_69 | spl34_71 | ~spl34_77)),
23.53/3.35	  inference(subsumption_resolution,[],[f2491,f1133])).
23.53/3.35	thf(f2491,plain,(
23.53/3.35	  ($true = ((sK26 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_4 | spl34_71 | ~spl34_77)),
23.53/3.35	  inference(subsumption_resolution,[],[f2424,f1141])).
23.53/3.35	thf(f2424,plain,(
23.53/3.35	  ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK26 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_4 | ~spl34_77)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2421])).
23.53/3.35	thf(f2421,plain,(
23.53/3.35	  ($true != $true) | ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK26 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_4 | ~spl34_77)),
23.53/3.35	  inference(superposition,[],[f969,f1231])).
23.53/3.35	thf(f1231,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ~spl34_77),
23.53/3.35	  inference(avatar_component_clause,[],[f1230])).
23.53/3.35	thf(f969,plain,(
23.53/3.35	  ( ! [X2 : a > $o] : (($true != (X2 @ ((((sK20 @ X2) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ X2) @ sK26) @ sK27)) @ (((sK22 @ X2) @ sK26) @ sK27))) | ($true = ((sK26 @ (((sK21 @ X2) @ sK26) @ sK27)) @ (((sK22 @ X2) @ sK26) @ sK27))) | ($true = (X2 @ sK31))) ) | ~spl34_4),
23.53/3.35	  inference(trivial_inequality_removal,[],[f958])).
23.53/3.35	thf(f958,plain,(
23.53/3.35	  ( ! [X2 : a > $o] : (($true != $true) | ($true != (X2 @ ((((sK20 @ X2) @ sK26) @ sK27) @ sK30))) | ($true = ((sK27 @ (((sK21 @ X2) @ sK26) @ sK27)) @ (((sK22 @ X2) @ sK26) @ sK27))) | ($true = ((sK26 @ (((sK21 @ X2) @ sK26) @ sK27)) @ (((sK22 @ X2) @ sK26) @ sK27))) | ($true = (X2 @ sK31))) ) | ~spl34_4),
23.53/3.35	  inference(superposition,[],[f87,f120])).
23.53/3.35	thf(f87,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP1 @ X3) @ X2) @ X1) @ X0)) | ($true != (X4 @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X2 @ (((sK21 @ X4) @ X3) @ X2)) @ (((sK22 @ X4) @ X3) @ X2))) | ($true = ((X3 @ (((sK21 @ X4) @ X3) @ X2)) @ (((sK22 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f44])).
23.53/3.35	thf(f2488,plain,(
23.53/3.35	  ~spl34_2 | ~spl34_68 | ~spl34_70 | spl34_76),
23.53/3.35	  inference(avatar_contradiction_clause,[],[f2487])).
23.53/3.35	thf(f2487,plain,(
23.53/3.35	  $false | (~spl34_2 | ~spl34_68 | ~spl34_70 | spl34_76)),
23.53/3.35	  inference(subsumption_resolution,[],[f2486,f1130])).
23.53/3.35	thf(f2486,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | (~spl34_2 | ~spl34_70 | spl34_76)),
23.53/3.35	  inference(subsumption_resolution,[],[f2485,f1183])).
23.53/3.35	thf(f2485,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | (~spl34_2 | ~spl34_70)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2484])).
23.53/3.35	thf(f2484,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | (~spl34_2 | ~spl34_70)),
23.53/3.35	  inference(superposition,[],[f2448,f111])).
23.53/3.35	thf(f2448,plain,(
23.53/3.35	  ( ! [X6 : a,X4 : a,X5 : a > a > $o] : (($true != ((((sP2 @ X4) @ sK26) @ X5) @ X6)) | ($true = (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true != (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)))) ) | ~spl34_70),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2445])).
23.53/3.35	thf(f2445,plain,(
23.53/3.35	  ( ! [X6 : a,X4 : a,X5 : a > a > $o] : (($true != $true) | ($true != (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true != ((((sP2 @ X4) @ sK26) @ X5) @ X6))) ) | ~spl34_70),
23.53/3.35	  inference(superposition,[],[f81,f1138])).
23.53/3.35	thf(f1138,plain,(
23.53/3.35	  ($true = ((sK26 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ~spl34_70),
23.53/3.35	  inference(avatar_component_clause,[],[f1136])).
23.53/3.35	thf(f2372,plain,(
23.53/3.35	  ~spl34_1 | ~spl34_53 | ~spl34_54),
23.53/3.35	  inference(avatar_contradiction_clause,[],[f2371])).
23.53/3.35	thf(f2371,plain,(
23.53/3.35	  $false | (~spl34_1 | ~spl34_53 | ~spl34_54)),
23.53/3.35	  inference(subsumption_resolution,[],[f2370,f882])).
23.53/3.35	thf(f882,plain,(
23.53/3.35	  ($true = (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ~spl34_53),
23.53/3.35	  inference(trivial_inequality_removal,[],[f873])).
23.53/3.35	thf(f873,plain,(
23.53/3.35	  ($true != $true) | ($true = (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ~spl34_53),
23.53/3.35	  inference(superposition,[],[f98,f828])).
23.53/3.35	thf(f828,plain,(
23.53/3.35	  ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ~spl34_53),
23.53/3.35	  inference(avatar_component_clause,[],[f826])).
23.53/3.35	thf(f826,plain,(
23.53/3.35	  spl34_53 <=> ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_53])])).
23.53/3.35	thf(f98,plain,(
23.53/3.35	  ( ! [X8 : a] : (($true != ((sK26 @ sK28) @ X8)) | ($true = (sK33 @ X8))) )),
23.53/3.35	  inference(cnf_transformation,[],[f54])).
23.53/3.35	thf(f54,plain,(
23.53/3.35	  (($true = ((sP6 @ sK26) @ sK27)) | (($true = ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32)) & ($true = ((((sP1 @ sK26) @ sK27) @ sK30) @ sK31)) & ($true = ((((sP0 @ sK27) @ sK26) @ sK31) @ sK32))) | ($true = ((((sP5 @ sK26) @ sK27) @ sK28) @ sK29))) & (($true != (sK33 @ sK29)) & ! [X8 : a] : (($true = (sK33 @ X8)) | (($true != ((sK27 @ sK28) @ X8)) & ($true != ((sK26 @ sK28) @ X8)))) & ! [X9 : a,X10 : a] : (($true = (sK33 @ X10)) | ($true != (sK33 @ X9)) | (($true != ((sK27 @ X9) @ X10)) & ($true != ((sK26 @ X9) @ X10)))))),
23.53/3.35	  inference(skolemisation,[status(esa),new_symbols(skolem,[sK26,sK27,sK28,sK29,sK30,sK31,sK32,sK33])],[f50,f53,f52,f51])).
23.53/3.35	thf(f51,plain,(
23.53/3.35	  ? [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((($true = ((sP6 @ X0) @ X1)) | ? [X4 : a,X5 : a,X6 : a] : (($true = ((((sP2 @ X4) @ X0) @ X1) @ X6)) & ($true = ((((sP1 @ X0) @ X1) @ X4) @ X5)) & ($true = ((((sP0 @ X1) @ X0) @ X5) @ X6))) | ($true = ((((sP5 @ X0) @ X1) @ X2) @ X3))) & ? [X7 : a > $o] : (($true != (X7 @ X3)) & ! [X8 : a] : (($true = (X7 @ X8)) | (($true != ((X1 @ X2) @ X8)) & ($true != ((X0 @ X2) @ X8)))) & ! [X9 : a,X10 : a] : (($true = (X7 @ X10)) | ($true != (X7 @ X9)) | (($true != ((X1 @ X9) @ X10)) & ($true != ((X0 @ X9) @ X10)))))) => ((($true = ((sP6 @ sK26) @ sK27)) | ? [X6 : a,X5 : a,X4 : a] : (($true = ((((sP2 @ X4) @ sK26) @ sK27) @ X6)) & ($true = ((((sP1 @ sK26) @ sK27) @ X4) @ X5)) & ($true = ((((sP0 @ sK27) @ sK26) @ X5) @ X6))) | ($true = ((((sP5 @ sK26) @ sK27) @ sK28) @ sK29))) & ? [X7 : a > $o] : (($true != (X7 @ sK29)) & ! [X8 : a] : (($true = (X7 @ X8)) | (($true != ((sK27 @ sK28) @ X8)) & ($true != ((sK26 @ sK28) @ X8)))) & ! [X10 : a,X9 : a] : (($true = (X7 @ X10)) | ($true != (X7 @ X9)) | (($true != ((sK27 @ X9) @ X10)) & ($true != ((sK26 @ X9) @ X10))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f52,plain,(
23.53/3.35	  ? [X6 : a,X5 : a,X4 : a] : (($true = ((((sP2 @ X4) @ sK26) @ sK27) @ X6)) & ($true = ((((sP1 @ sK26) @ sK27) @ X4) @ X5)) & ($true = ((((sP0 @ sK27) @ sK26) @ X5) @ X6))) => (($true = ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32)) & ($true = ((((sP1 @ sK26) @ sK27) @ sK30) @ sK31)) & ($true = ((((sP0 @ sK27) @ sK26) @ sK31) @ sK32)))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f53,plain,(
23.53/3.35	  ? [X7 : a > $o] : (($true != (X7 @ sK29)) & ! [X8 : a] : (($true = (X7 @ X8)) | (($true != ((sK27 @ sK28) @ X8)) & ($true != ((sK26 @ sK28) @ X8)))) & ! [X10 : a,X9 : a] : (($true = (X7 @ X10)) | ($true != (X7 @ X9)) | (($true != ((sK27 @ X9) @ X10)) & ($true != ((sK26 @ X9) @ X10))))) => (($true != (sK33 @ sK29)) & ! [X8 : a] : (($true = (sK33 @ X8)) | (($true != ((sK27 @ sK28) @ X8)) & ($true != ((sK26 @ sK28) @ X8)))) & ! [X10 : a,X9 : a] : (($true = (sK33 @ X10)) | ($true != (sK33 @ X9)) | (($true != ((sK27 @ X9) @ X10)) & ($true != ((sK26 @ X9) @ X10)))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f50,plain,(
23.53/3.35	  ? [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((($true = ((sP6 @ X0) @ X1)) | ? [X4 : a,X5 : a,X6 : a] : (($true = ((((sP2 @ X4) @ X0) @ X1) @ X6)) & ($true = ((((sP1 @ X0) @ X1) @ X4) @ X5)) & ($true = ((((sP0 @ X1) @ X0) @ X5) @ X6))) | ($true = ((((sP5 @ X0) @ X1) @ X2) @ X3))) & ? [X7 : a > $o] : (($true != (X7 @ X3)) & ! [X8 : a] : (($true = (X7 @ X8)) | (($true != ((X1 @ X2) @ X8)) & ($true != ((X0 @ X2) @ X8)))) & ! [X9 : a,X10 : a] : (($true = (X7 @ X10)) | ($true != (X7 @ X9)) | (($true != ((X1 @ X9) @ X10)) & ($true != ((X0 @ X9) @ X10))))))),
23.53/3.35	  inference(rectify,[],[f15])).
23.53/3.35	thf(f15,plain,(
23.53/3.35	  ? [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((($true = ((sP6 @ X0) @ X1)) | ? [X18 : a,X19 : a,X20 : a] : (($true = ((((sP2 @ X18) @ X0) @ X1) @ X20)) & ($true = ((((sP1 @ X0) @ X1) @ X18) @ X19)) & ($true = ((((sP0 @ X1) @ X0) @ X19) @ X20))) | ($true = ((((sP5 @ X0) @ X1) @ X2) @ X3))) & ? [X37 : a > $o] : (($true != (X37 @ X3)) & ! [X38 : a] : (($true = (X37 @ X38)) | (($true != ((X1 @ X2) @ X38)) & ($true != ((X0 @ X2) @ X38)))) & ! [X39 : a,X40 : a] : (($true = (X37 @ X40)) | ($true != (X37 @ X39)) | (($true != ((X1 @ X39) @ X40)) & ($true != ((X0 @ X39) @ X40))))))),
23.53/3.35	  inference(definition_folding,[],[f7,f14,f13,f12,f11,f10,f9,f8])).
23.53/3.35	thf(f8,plain,(
23.53/3.35	  ! [X20 : a,X19 : a,X0 : a > a > $o,X1 : a > a > $o] : (! [X25 : a > $o] : (($true = (X25 @ X20)) | ? [X26 : a] : (($true != (X25 @ X26)) & (($true = ((X0 @ X19) @ X26)) | ($true = ((X1 @ X19) @ X26)))) | ? [X27 : a,X28 : a] : (($true != (X25 @ X28)) & ($true = (X25 @ X27)) & (($true = ((X1 @ X27) @ X28)) | ($true = ((X0 @ X27) @ X28))))) | ~($true = ((((sP0 @ X1) @ X0) @ X19) @ X20)))),
23.53/3.35	  introduced(predicate_definition_introduction,[new_symbols(naming,[=])])).
23.53/3.35	thf(f11,plain,(
23.53/3.35	  ! [X5 : a,X4 : a,X1 : a > a > $o] : (! [X10 : a > $o] : (($true = (X10 @ X5)) | ? [X11 : a] : (($true != (X10 @ X11)) & ($true = ((X1 @ X4) @ X11))) | ? [X12 : a,X13 : a] : (($true != (X10 @ X13)) & ($true = (X10 @ X12)) & ($true = ((X1 @ X12) @ X13)))) | ~($true = (((sP3 @ X1) @ X4) @ X5)))),
23.53/3.35	  introduced(predicate_definition_introduction,[new_symbols(naming,[=])])).
23.53/3.35	thf(f12,plain,(
23.53/3.35	  ! [X5 : a,X0 : a > a > $o,X4 : a,X1 : a > a > $o] : (! [X6 : a > $o] : (($true = (X6 @ X5)) | ? [X7 : a,X8 : a] : (($true != (X6 @ X8)) & ($true = ((X0 @ X7) @ X8)) & ($true = (X6 @ X7))) | ? [X9 : a] : (($true != (X6 @ X9)) & ($true = ((X0 @ X4) @ X9)))) | ($true = (((sP3 @ X1) @ X4) @ X5)) | ~($true = ((((sP4 @ X1) @ X4) @ X0) @ X5)))),
23.53/3.35	  introduced(predicate_definition_introduction,[new_symbols(naming,[=])])).
23.53/3.35	thf(f13,plain,(
23.53/3.35	  ! [X3 : a,X2 : a,X1 : a > a > $o,X0 : a > a > $o] : (! [X33 : a > $o] : (($true = (X33 @ X3)) | ? [X34 : a] : (($true != (X33 @ X34)) & (($true = ((X1 @ X2) @ X34)) | ($true = ((X0 @ X2) @ X34)))) | ? [X35 : a,X36 : a] : (($true != (X33 @ X36)) & ($true = (X33 @ X35)) & (($true = ((X0 @ X35) @ X36)) | ($true = ((X1 @ X35) @ X36))))) | ~($true = ((((sP5 @ X0) @ X1) @ X2) @ X3)))),
23.53/3.35	  introduced(predicate_definition_introduction,[new_symbols(naming,[=])])).
23.53/3.35	thf(f14,plain,(
23.53/3.35	  ! [X1 : a > a > $o,X0 : a > a > $o] : (? [X4 : a,X5 : a] : (? [X14 : a > $o] : (($true != (X14 @ X5)) & ! [X15 : a,X16 : a] : (($true = (X14 @ X16)) | ($true != (X14 @ X15)) | (($true != ((X1 @ X15) @ X16)) & ($true != ((X0 @ X15) @ X16)))) & ! [X17 : a] : (($true = (X14 @ X17)) | (($true != ((X0 @ X4) @ X17)) & ($true != ((X1 @ X4) @ X17))))) & ($true = ((((sP4 @ X1) @ X4) @ X0) @ X5))) | ~($true = ((sP6 @ X0) @ X1)))),
23.53/3.35	  introduced(predicate_definition_introduction,[new_symbols(naming,[=])])).
23.53/3.35	thf(f7,plain,(
23.53/3.35	  ? [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((? [X4 : a,X5 : a] : (? [X14 : a > $o] : (($true != (X14 @ X5)) & ! [X15 : a,X16 : a] : (($true = (X14 @ X16)) | ($true != (X14 @ X15)) | (($true != ((X1 @ X15) @ X16)) & ($true != ((X0 @ X15) @ X16)))) & ! [X17 : a] : (($true = (X14 @ X17)) | (($true != ((X0 @ X4) @ X17)) & ($true != ((X1 @ X4) @ X17))))) & (! [X6 : a > $o] : (($true = (X6 @ X5)) | ? [X7 : a,X8 : a] : (($true != (X6 @ X8)) & ($true = ((X0 @ X7) @ X8)) & ($true = (X6 @ X7))) | ? [X9 : a] : (($true != (X6 @ X9)) & ($true = ((X0 @ X4) @ X9)))) | ! [X10 : a > $o] : (($true = (X10 @ X5)) | ? [X11 : a] : (($true != (X10 @ X11)) & ($true = ((X1 @ X4) @ X11))) | ? [X12 : a,X13 : a] : (($true != (X10 @ X13)) & ($true = (X10 @ X12)) & ($true = ((X1 @ X12) @ X13)))))) | ? [X18 : a,X19 : a,X20 : a] : (? [X29 : a > $o] : (($true != (X29 @ X20)) & ! [X30 : a,X31 : a] : (($true = (X29 @ X31)) | ($true != (X29 @ X30)) | (($true != ((X1 @ X30) @ X31)) & ($true != ((X0 @ X30) @ X31)))) & ! [X32 : a] : (($true = (X29 @ X32)) | (($true != ((X1 @ X18) @ X32)) & ($true != ((X0 @ X18) @ X32))))) & ! [X21 : a > $o] : (($true = (X21 @ X19)) | ? [X22 : a] : (($true != (X21 @ X22)) & (($true = ((X1 @ X18) @ X22)) | ($true = ((X0 @ X18) @ X22)))) | ? [X23 : a,X24 : a] : (($true != (X21 @ X24)) & ($true = (X21 @ X23)) & (($true = ((X1 @ X23) @ X24)) | ($true = ((X0 @ X23) @ X24))))) & ! [X25 : a > $o] : (($true = (X25 @ X20)) | ? [X26 : a] : (($true != (X25 @ X26)) & (($true = ((X0 @ X19) @ X26)) | ($true = ((X1 @ X19) @ X26)))) | ? [X27 : a,X28 : a] : (($true != (X25 @ X28)) & ($true = (X25 @ X27)) & (($true = ((X1 @ X27) @ X28)) | ($true = ((X0 @ X27) @ X28)))))) | ! [X33 : a > $o] : (($true = (X33 @ X3)) | ? [X34 : a] : (($true != (X33 @ X34)) & (($true = ((X1 @ X2) @ X34)) | ($true = ((X0 @ X2) @ X34)))) | ? [X35 : a,X36 : a] : (($true != (X33 @ X36)) & ($true = (X33 @ X35)) & (($true = ((X0 @ X35) @ X36)) | ($true = ((X1 @ X35) @ X36)))))) & ? [X37 : a > $o] : (($true != (X37 @ X3)) & ! [X38 : a] : (($true = (X37 @ X38)) | (($true != ((X1 @ X2) @ X38)) & ($true != ((X0 @ X2) @ X38)))) & ! [X39 : a,X40 : a] : (($true = (X37 @ X40)) | ($true != (X37 @ X39)) | (($true != ((X1 @ X39) @ X40)) & ($true != ((X0 @ X39) @ X40))))))),
23.53/3.35	  inference(flattening,[],[f6])).
23.53/3.35	thf(f6,plain,(
23.53/3.35	  ? [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((? [X4 : a,X5 : a] : (? [X14 : a > $o] : (($true != (X14 @ X5)) & (! [X15 : a,X16 : a] : (($true = (X14 @ X16)) | (($true != (X14 @ X15)) | (($true != ((X1 @ X15) @ X16)) & ($true != ((X0 @ X15) @ X16))))) & ! [X17 : a] : (($true = (X14 @ X17)) | (($true != ((X0 @ X4) @ X17)) & ($true != ((X1 @ X4) @ X17)))))) & (! [X6 : a > $o] : (($true = (X6 @ X5)) | (? [X7 : a,X8 : a] : (($true != (X6 @ X8)) & (($true = ((X0 @ X7) @ X8)) & ($true = (X6 @ X7)))) | ? [X9 : a] : (($true != (X6 @ X9)) & ($true = ((X0 @ X4) @ X9))))) | ! [X10 : a > $o] : (($true = (X10 @ X5)) | (? [X11 : a] : (($true != (X10 @ X11)) & ($true = ((X1 @ X4) @ X11))) | ? [X12 : a,X13 : a] : (($true != (X10 @ X13)) & (($true = (X10 @ X12)) & ($true = ((X1 @ X12) @ X13)))))))) | ? [X18 : a,X19 : a,X20 : a] : (? [X29 : a > $o] : (($true != (X29 @ X20)) & (! [X30 : a,X31 : a] : (($true = (X29 @ X31)) | (($true != (X29 @ X30)) | (($true != ((X1 @ X30) @ X31)) & ($true != ((X0 @ X30) @ X31))))) & ! [X32 : a] : (($true = (X29 @ X32)) | (($true != ((X1 @ X18) @ X32)) & ($true != ((X0 @ X18) @ X32)))))) & (! [X21 : a > $o] : (($true = (X21 @ X19)) | (? [X22 : a] : (($true != (X21 @ X22)) & (($true = ((X1 @ X18) @ X22)) | ($true = ((X0 @ X18) @ X22)))) | ? [X23 : a,X24 : a] : (($true != (X21 @ X24)) & (($true = (X21 @ X23)) & (($true = ((X1 @ X23) @ X24)) | ($true = ((X0 @ X23) @ X24))))))) & ! [X25 : a > $o] : (($true = (X25 @ X20)) | (? [X26 : a] : (($true != (X25 @ X26)) & (($true = ((X0 @ X19) @ X26)) | ($true = ((X1 @ X19) @ X26)))) | ? [X27 : a,X28 : a] : (($true != (X25 @ X28)) & (($true = (X25 @ X27)) & (($true = ((X1 @ X27) @ X28)) | ($true = ((X0 @ X27) @ X28))))))))) | ! [X33 : a > $o] : (($true = (X33 @ X3)) | (? [X34 : a] : (($true != (X33 @ X34)) & (($true = ((X1 @ X2) @ X34)) | ($true = ((X0 @ X2) @ X34)))) | ? [X35 : a,X36 : a] : (($true != (X33 @ X36)) & (($true = (X33 @ X35)) & (($true = ((X0 @ X35) @ X36)) | ($true = ((X1 @ X35) @ X36)))))))) & ? [X37 : a > $o] : (($true != (X37 @ X3)) & (! [X38 : a] : (($true = (X37 @ X38)) | (($true != ((X1 @ X2) @ X38)) & ($true != ((X0 @ X2) @ X38)))) & ! [X39 : a,X40 : a] : (($true = (X37 @ X40)) | (($true != (X37 @ X39)) | (($true != ((X1 @ X39) @ X40)) & ($true != ((X0 @ X39) @ X40))))))))),
23.53/3.35	  inference(ennf_transformation,[],[f5])).
23.53/3.35	thf(f5,plain,(
23.53/3.35	  ~! [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((! [X4 : a,X5 : a] : ((! [X6 : a > $o] : ((! [X7 : a,X8 : a] : ((($true = ((X0 @ X7) @ X8)) & ($true = (X6 @ X7))) => ($true = (X6 @ X8))) & ! [X9 : a] : (($true = ((X0 @ X4) @ X9)) => ($true = (X6 @ X9)))) => ($true = (X6 @ X5))) | ! [X10 : a > $o] : ((! [X11 : a] : (($true = ((X1 @ X4) @ X11)) => ($true = (X10 @ X11))) & ! [X12 : a,X13 : a] : ((($true = (X10 @ X12)) & ($true = ((X1 @ X12) @ X13))) => ($true = (X10 @ X13)))) => ($true = (X10 @ X5)))) => ! [X14 : a > $o] : ((! [X15 : a,X16 : a] : ((($true = (X14 @ X15)) & (($true = ((X1 @ X15) @ X16)) | ($true = ((X0 @ X15) @ X16)))) => ($true = (X14 @ X16))) & ! [X17 : a] : ((($true = ((X0 @ X4) @ X17)) | ($true = ((X1 @ X4) @ X17))) => ($true = (X14 @ X17)))) => ($true = (X14 @ X5)))) & ! [X18 : a,X19 : a,X20 : a] : ((! [X21 : a > $o] : ((! [X22 : a] : ((($true = ((X1 @ X18) @ X22)) | ($true = ((X0 @ X18) @ X22))) => ($true = (X21 @ X22))) & ! [X23 : a,X24 : a] : ((($true = (X21 @ X23)) & (($true = ((X1 @ X23) @ X24)) | ($true = ((X0 @ X23) @ X24)))) => ($true = (X21 @ X24)))) => ($true = (X21 @ X19))) & ! [X25 : a > $o] : ((! [X26 : a] : ((($true = ((X0 @ X19) @ X26)) | ($true = ((X1 @ X19) @ X26))) => ($true = (X25 @ X26))) & ! [X27 : a,X28 : a] : ((($true = (X25 @ X27)) & (($true = ((X1 @ X27) @ X28)) | ($true = ((X0 @ X27) @ X28)))) => ($true = (X25 @ X28)))) => ($true = (X25 @ X20)))) => ! [X29 : a > $o] : ((! [X30 : a,X31 : a] : ((($true = (X29 @ X30)) & (($true = ((X1 @ X30) @ X31)) | ($true = ((X0 @ X30) @ X31)))) => ($true = (X29 @ X31))) & ! [X32 : a] : ((($true = ((X1 @ X18) @ X32)) | ($true = ((X0 @ X18) @ X32))) => ($true = (X29 @ X32)))) => ($true = (X29 @ X20)))) & ~! [X33 : a > $o] : ((! [X34 : a] : ((($true = ((X1 @ X2) @ X34)) | ($true = ((X0 @ X2) @ X34))) => ($true = (X33 @ X34))) & ! [X35 : a,X36 : a] : ((($true = (X33 @ X35)) & (($true = ((X0 @ X35) @ X36)) | ($true = ((X1 @ X35) @ X36)))) => ($true = (X33 @ X36)))) => ($true = (X33 @ X3)))) | ! [X37 : a > $o] : ((! [X38 : a] : ((($true = ((X1 @ X2) @ X38)) | ($true = ((X0 @ X2) @ X38))) => ($true = (X37 @ X38))) & ! [X39 : a,X40 : a] : ((($true = (X37 @ X39)) & (($true = ((X1 @ X39) @ X40)) | ($true = ((X0 @ X39) @ X40)))) => ($true = (X37 @ X40)))) => ($true = (X37 @ X3))))),
23.53/3.35	  inference(fool_elimination,[],[f4])).
23.53/3.35	thf(f4,plain,(
23.53/3.35	  ~! [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((! [X4 : a,X5 : a] : ((! [X6 : a > $o] : ((! [X7 : a,X8 : a] : ((((X0 @ X7) @ X8) & (X6 @ X7)) => (X6 @ X8)) & ! [X9 : a] : (((X0 @ X4) @ X9) => (X6 @ X9))) => (X6 @ X5)) | ! [X10 : a > $o] : ((! [X11 : a] : (((X1 @ X4) @ X11) => (X10 @ X11)) & ! [X12 : a,X13 : a] : (((X10 @ X12) & ((X1 @ X12) @ X13)) => (X10 @ X13))) => (X10 @ X5))) => ! [X14 : a > $o] : ((! [X15 : a,X16 : a] : (((X14 @ X15) & (((X1 @ X15) @ X16) | ((X0 @ X15) @ X16))) => (X14 @ X16)) & ! [X17 : a] : ((((X0 @ X4) @ X17) | ((X1 @ X4) @ X17)) => (X14 @ X17))) => (X14 @ X5))) & ! [X18 : a,X19 : a,X20 : a] : ((! [X21 : a > $o] : ((! [X22 : a] : ((((X1 @ X18) @ X22) | ((X0 @ X18) @ X22)) => (X21 @ X22)) & ! [X23 : a,X24 : a] : (((X21 @ X23) & (((X1 @ X23) @ X24) | ((X0 @ X23) @ X24))) => (X21 @ X24))) => (X21 @ X19)) & ! [X25 : a > $o] : ((! [X26 : a] : ((((X0 @ X19) @ X26) | ((X1 @ X19) @ X26)) => (X25 @ X26)) & ! [X27 : a,X28 : a] : (((X25 @ X27) & (((X1 @ X27) @ X28) | ((X0 @ X27) @ X28))) => (X25 @ X28))) => (X25 @ X20))) => ! [X29 : a > $o] : ((! [X30 : a,X31 : a] : (((X29 @ X30) & (((X1 @ X30) @ X31) | ((X0 @ X30) @ X31))) => (X29 @ X31)) & ! [X32 : a] : ((((X1 @ X18) @ X32) | ((X0 @ X18) @ X32)) => (X29 @ X32))) => (X29 @ X20))) & ~! [X33 : a > $o] : ((! [X34 : a] : ((((X1 @ X2) @ X34) | ((X0 @ X2) @ X34)) => (X33 @ X34)) & ! [X35 : a,X36 : a] : (((X33 @ X35) & (((X0 @ X35) @ X36) | ((X1 @ X35) @ X36))) => (X33 @ X36))) => (X33 @ X3))) | ! [X37 : a > $o] : ((! [X38 : a] : ((((X1 @ X2) @ X38) | ((X0 @ X2) @ X38)) => (X37 @ X38)) & ! [X39 : a,X40 : a] : (((X37 @ X39) & (((X1 @ X39) @ X40) | ((X0 @ X39) @ X40))) => (X37 @ X40))) => (X37 @ X3)))),
23.53/3.35	  inference(rectify,[],[f2])).
23.53/3.35	thf(f2,negated_conjecture,(
23.53/3.35	  ~! [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((! [X8 : a,X9 : a] : ((! [X4 : a > $o] : ((! [X5 : a,X6 : a] : ((((X0 @ X5) @ X6) & (X4 @ X5)) => (X4 @ X6)) & ! [X7 : a] : (((X0 @ X8) @ X7) => (X4 @ X7))) => (X4 @ X9)) | ! [X4 : a > $o] : ((! [X7 : a] : (((X1 @ X8) @ X7) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & ((X1 @ X5) @ X6)) => (X4 @ X6))) => (X4 @ X9))) => ! [X4 : a > $o] : ((! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6)) & ! [X7 : a] : ((((X0 @ X8) @ X7) | ((X1 @ X8) @ X7)) => (X4 @ X7))) => (X4 @ X9))) & ! [X8 : a,X9 : a,X10 : a] : ((! [X4 : a > $o] : ((! [X7 : a] : ((((X1 @ X8) @ X7) | ((X0 @ X8) @ X7)) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6))) => (X4 @ X9)) & ! [X4 : a > $o] : ((! [X7 : a] : ((((X0 @ X9) @ X7) | ((X1 @ X9) @ X7)) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6))) => (X4 @ X10))) => ! [X4 : a > $o] : ((! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6)) & ! [X7 : a] : ((((X1 @ X8) @ X7) | ((X0 @ X8) @ X7)) => (X4 @ X7))) => (X4 @ X10))) & ~! [X4 : a > $o] : ((! [X7 : a] : ((((X1 @ X2) @ X7) | ((X0 @ X2) @ X7)) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & (((X0 @ X5) @ X6) | ((X1 @ X5) @ X6))) => (X4 @ X6))) => (X4 @ X3))) | ! [X4 : a > $o] : ((! [X7 : a] : ((((X1 @ X2) @ X7) | ((X0 @ X2) @ X7)) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6))) => (X4 @ X3)))),
23.53/3.35	  inference(negated_conjecture,[],[f1])).
23.53/3.35	thf(f1,conjecture,(
23.53/3.35	  ! [X0 : a > a > $o,X1 : a > a > $o,X2 : a,X3 : a] : ((! [X8 : a,X9 : a] : ((! [X4 : a > $o] : ((! [X5 : a,X6 : a] : ((((X0 @ X5) @ X6) & (X4 @ X5)) => (X4 @ X6)) & ! [X7 : a] : (((X0 @ X8) @ X7) => (X4 @ X7))) => (X4 @ X9)) | ! [X4 : a > $o] : ((! [X7 : a] : (((X1 @ X8) @ X7) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & ((X1 @ X5) @ X6)) => (X4 @ X6))) => (X4 @ X9))) => ! [X4 : a > $o] : ((! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6)) & ! [X7 : a] : ((((X0 @ X8) @ X7) | ((X1 @ X8) @ X7)) => (X4 @ X7))) => (X4 @ X9))) & ! [X8 : a,X9 : a,X10 : a] : ((! [X4 : a > $o] : ((! [X7 : a] : ((((X1 @ X8) @ X7) | ((X0 @ X8) @ X7)) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6))) => (X4 @ X9)) & ! [X4 : a > $o] : ((! [X7 : a] : ((((X0 @ X9) @ X7) | ((X1 @ X9) @ X7)) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6))) => (X4 @ X10))) => ! [X4 : a > $o] : ((! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6)) & ! [X7 : a] : ((((X1 @ X8) @ X7) | ((X0 @ X8) @ X7)) => (X4 @ X7))) => (X4 @ X10))) & ~! [X4 : a > $o] : ((! [X7 : a] : ((((X1 @ X2) @ X7) | ((X0 @ X2) @ X7)) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & (((X0 @ X5) @ X6) | ((X1 @ X5) @ X6))) => (X4 @ X6))) => (X4 @ X3))) | ! [X4 : a > $o] : ((! [X7 : a] : ((((X1 @ X2) @ X7) | ((X0 @ X2) @ X7)) => (X4 @ X7)) & ! [X5 : a,X6 : a] : (((X4 @ X5) & (((X1 @ X5) @ X6) | ((X0 @ X5) @ X6))) => (X4 @ X6))) => (X4 @ X3)))),
23.53/3.35	  file('/export/starexec/sandbox2/benchmark/theBenchmark.p',cTHM251H_pme)).
23.53/3.35	thf(f2370,plain,(
23.53/3.35	  ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.53/3.35	  inference(subsumption_resolution,[],[f2369,f100])).
23.53/3.35	thf(f100,plain,(
23.53/3.35	  ($true != (sK33 @ sK29))),
23.53/3.35	  inference(cnf_transformation,[],[f54])).
23.53/3.35	thf(f2369,plain,(
23.53/3.35	  ($true = (sK33 @ sK29)) | ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2368])).
23.53/3.35	thf(f2368,plain,(
23.53/3.35	  ($true != $true) | ($true = (sK33 @ sK29)) | ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.53/3.35	  inference(superposition,[],[f2341,f107])).
23.53/3.35	thf(f107,plain,(
23.53/3.35	  ($true = ((((sP5 @ sK26) @ sK27) @ sK28) @ sK29)) | ~spl34_1),
23.53/3.35	  inference(avatar_component_clause,[],[f105])).
23.53/3.35	thf(f105,plain,(
23.53/3.35	  spl34_1 <=> ($true = ((((sP5 @ sK26) @ sK27) @ sK28) @ sK29))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_1])])).
23.53/3.35	thf(f2341,plain,(
23.53/3.35	  ( ! [X4 : a,X5 : a] : (($true != ((((sP5 @ sK26) @ sK27) @ X4) @ X5)) | ($true = (sK33 @ X5)) | ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ X4)))) ) | ~spl34_54),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2340])).
23.53/3.35	thf(f2340,plain,(
23.53/3.35	  ( ! [X4 : a,X5 : a] : (($true != $true) | ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ X4))) | ($true = (sK33 @ X5)) | ($true != ((((sP5 @ sK26) @ sK27) @ X4) @ X5))) ) | ~spl34_54),
23.53/3.35	  inference(superposition,[],[f66,f832])).
23.53/3.35	thf(f832,plain,(
23.53/3.35	  ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | ~spl34_54),
23.53/3.35	  inference(avatar_component_clause,[],[f830])).
23.53/3.35	thf(f830,plain,(
23.53/3.35	  spl34_54 <=> ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_54])])).
23.53/3.35	thf(f66,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != (X4 @ (((sK12 @ X4) @ X3) @ X2))) | ($true != (X4 @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ X0)) | ($true != ((((sP5 @ X3) @ X2) @ X1) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f25])).
23.53/3.35	thf(f25,plain,(
23.53/3.35	  ! [X0 : a,X1 : a,X2 : a > a > $o,X3 : a > a > $o] : (! [X4 : a > $o] : (($true = (X4 @ X0)) | (($true != (X4 @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) & (($true = ((X2 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))))) | (($true != (X4 @ (((sK12 @ X4) @ X3) @ X2))) & ($true = (X4 @ (((sK11 @ X4) @ X3) @ X2))) & (($true = ((X3 @ (((sK11 @ X4) @ X3) @ X2)) @ (((sK12 @ X4) @ X3) @ X2))) | ($true = ((X2 @ (((sK11 @ X4) @ X3) @ X2)) @ (((sK12 @ X4) @ X3) @ X2)))))) | ($true != ((((sP5 @ X3) @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(skolemisation,[status(esa),new_symbols(skolem,[sK10,sK11,sK12])],[f22,f24,f23])).
23.53/3.35	thf(f23,plain,(
23.53/3.35	  ! [X1 : a,X2 : a > a > $o,X3 : a > a > $o,X4 : a > $o] : (? [X5 : a] : (((X4 @ X5) != $true) & (($true = ((X2 @ X1) @ X5)) | ($true = ((X3 @ X1) @ X5)))) => (($true != (X4 @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) & (($true = ((X2 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f24,plain,(
23.53/3.35	  ! [X2 : a > a > $o,X3 : a > a > $o,X4 : a > $o] : (? [X6 : a,X7 : a] : (((X4 @ X7) != $true) & ((X4 @ X6) = $true) & (($true = ((X3 @ X6) @ X7)) | ($true = ((X2 @ X6) @ X7)))) => (($true != (X4 @ (((sK12 @ X4) @ X3) @ X2))) & ($true = (X4 @ (((sK11 @ X4) @ X3) @ X2))) & (($true = ((X3 @ (((sK11 @ X4) @ X3) @ X2)) @ (((sK12 @ X4) @ X3) @ X2))) | ($true = ((X2 @ (((sK11 @ X4) @ X3) @ X2)) @ (((sK12 @ X4) @ X3) @ X2))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f22,plain,(
23.53/3.35	  ! [X0 : a,X1 : a,X2 : a > a > $o,X3 : a > a > $o] : (! [X4 : a > $o] : (($true = (X4 @ X0)) | ? [X5 : a] : (((X4 @ X5) != $true) & (($true = ((X2 @ X1) @ X5)) | ($true = ((X3 @ X1) @ X5)))) | ? [X6 : a,X7 : a] : (((X4 @ X7) != $true) & ((X4 @ X6) = $true) & (($true = ((X3 @ X6) @ X7)) | ($true = ((X2 @ X6) @ X7))))) | ($true != ((((sP5 @ X3) @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(rectify,[],[f21])).
23.53/3.35	thf(f21,plain,(
23.53/3.35	  ! [X3 : a,X2 : a,X1 : a > a > $o,X0 : a > a > $o] : (! [X33 : a > $o] : (($true = (X33 @ X3)) | ? [X34 : a] : (($true != (X33 @ X34)) & (($true = ((X1 @ X2) @ X34)) | ($true = ((X0 @ X2) @ X34)))) | ? [X35 : a,X36 : a] : (($true != (X33 @ X36)) & ($true = (X33 @ X35)) & (($true = ((X0 @ X35) @ X36)) | ($true = ((X1 @ X35) @ X36))))) | ($true != ((((sP5 @ X0) @ X1) @ X2) @ X3)))),
23.53/3.35	  inference(nnf_transformation,[],[f13])).
23.53/3.35	thf(f2336,plain,(
23.53/3.35	  spl34_54 | ~spl34_1 | ~spl34_53 | ~spl34_57),
23.53/3.35	  inference(avatar_split_clause,[],[f2332,f865,f826,f105,f830])).
23.53/3.35	thf(f865,plain,(
23.53/3.35	  spl34_57 <=> ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_57])])).
23.53/3.35	thf(f2332,plain,(
23.53/3.35	  ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_53 | ~spl34_57)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2331])).
23.53/3.35	thf(f2331,plain,(
23.53/3.35	  ($true != $true) | ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_53 | ~spl34_57)),
23.53/3.35	  inference(superposition,[],[f2324,f867])).
23.53/3.35	thf(f867,plain,(
23.53/3.35	  ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ~spl34_57),
23.53/3.35	  inference(avatar_component_clause,[],[f865])).
23.53/3.35	thf(f2324,plain,(
23.53/3.35	  ( ! [X1 : a] : (($true != ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ X1)) | ($true = (sK33 @ X1))) ) | (~spl34_1 | ~spl34_53)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2323])).
23.53/3.35	thf(f2323,plain,(
23.53/3.35	  ( ! [X1 : a] : (($true != $true) | ($true = (sK33 @ X1)) | ($true != ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ X1))) ) | (~spl34_1 | ~spl34_53)),
23.53/3.35	  inference(superposition,[],[f96,f2321])).
23.53/3.35	thf(f2321,plain,(
23.53/3.35	  ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_53)),
23.53/3.35	  inference(subsumption_resolution,[],[f2320,f100])).
23.53/3.35	thf(f2320,plain,(
23.53/3.35	  ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | (~spl34_1 | ~spl34_53)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f887])).
23.53/3.35	thf(f887,plain,(
23.53/3.35	  ($true != $true) | ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | (~spl34_1 | ~spl34_53)),
23.53/3.35	  inference(superposition,[],[f614,f882])).
23.53/3.35	thf(f614,plain,(
23.53/3.35	  ( ! [X3 : a > $o] : (($true != (X3 @ ((((sK10 @ X3) @ sK26) @ sK27) @ sK28))) | ($true = (X3 @ (((sK11 @ X3) @ sK26) @ sK27))) | ($true = (X3 @ sK29))) ) | ~spl34_1),
23.53/3.35	  inference(trivial_inequality_removal,[],[f605])).
23.53/3.35	thf(f605,plain,(
23.53/3.35	  ( ! [X3 : a > $o] : (($true != $true) | ($true != (X3 @ ((((sK10 @ X3) @ sK26) @ sK27) @ sK28))) | ($true = (X3 @ (((sK11 @ X3) @ sK26) @ sK27))) | ($true = (X3 @ sK29))) ) | ~spl34_1),
23.53/3.35	  inference(superposition,[],[f65,f107])).
23.53/3.35	thf(f65,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP5 @ X3) @ X2) @ X1) @ X0)) | ($true != (X4 @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ (((sK11 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f25])).
23.53/3.35	thf(f96,plain,(
23.53/3.35	  ( ! [X10 : a,X9 : a] : (($true != (sK33 @ X9)) | ($true = (sK33 @ X10)) | ($true != ((sK26 @ X9) @ X10))) )),
23.53/3.35	  inference(cnf_transformation,[],[f54])).
23.53/3.35	thf(f2318,plain,(
23.53/3.35	  ~spl34_1 | ~spl34_52 | spl34_54 | ~spl34_57),
23.53/3.35	  inference(avatar_contradiction_clause,[],[f2317])).
23.53/3.35	thf(f2317,plain,(
23.53/3.35	  $false | (~spl34_1 | ~spl34_52 | spl34_54 | ~spl34_57)),
23.53/3.35	  inference(subsumption_resolution,[],[f2316,f831])).
23.53/3.35	thf(f831,plain,(
23.53/3.35	  ($true != (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | spl34_54),
23.53/3.35	  inference(avatar_component_clause,[],[f830])).
23.53/3.35	thf(f2316,plain,(
23.53/3.35	  ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_52 | ~spl34_57)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2307])).
23.53/3.35	thf(f2307,plain,(
23.53/3.35	  ($true != $true) | ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_52 | ~spl34_57)),
23.53/3.35	  inference(superposition,[],[f2287,f867])).
23.53/3.35	thf(f2287,plain,(
23.53/3.35	  ( ! [X1 : a] : (($true != ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ X1)) | ($true = (sK33 @ X1))) ) | (~spl34_1 | ~spl34_52)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2286])).
23.53/3.35	thf(f2286,plain,(
23.53/3.35	  ( ! [X1 : a] : (($true != $true) | ($true = (sK33 @ X1)) | ($true != ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ X1))) ) | (~spl34_1 | ~spl34_52)),
23.53/3.35	  inference(superposition,[],[f96,f2268])).
23.53/3.35	thf(f2268,plain,(
23.53/3.35	  ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_52)),
23.53/3.35	  inference(subsumption_resolution,[],[f2265,f100])).
23.53/3.35	thf(f2265,plain,(
23.53/3.35	  ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | (~spl34_1 | ~spl34_52)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f854])).
23.53/3.35	thf(f854,plain,(
23.53/3.35	  ($true != $true) | ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | (~spl34_1 | ~spl34_52)),
23.53/3.35	  inference(superposition,[],[f614,f844])).
23.53/3.35	thf(f844,plain,(
23.53/3.35	  ($true = (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ~spl34_52),
23.53/3.35	  inference(trivial_inequality_removal,[],[f835])).
23.53/3.35	thf(f835,plain,(
23.53/3.35	  ($true != $true) | ($true = (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ~spl34_52),
23.53/3.35	  inference(superposition,[],[f99,f824])).
23.53/3.35	thf(f824,plain,(
23.53/3.35	  ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ~spl34_52),
23.53/3.35	  inference(avatar_component_clause,[],[f822])).
23.53/3.35	thf(f822,plain,(
23.53/3.35	  spl34_52 <=> ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_52])])).
23.53/3.35	thf(f99,plain,(
23.53/3.35	  ( ! [X8 : a] : (($true != ((sK27 @ sK28) @ X8)) | ($true = (sK33 @ X8))) )),
23.53/3.35	  inference(cnf_transformation,[],[f54])).
23.53/3.35	thf(f2263,plain,(
23.53/3.35	  ~spl34_2 | ~spl34_104 | ~spl34_105 | spl34_109),
23.53/3.35	  inference(avatar_contradiction_clause,[],[f2262])).
23.53/3.35	thf(f2262,plain,(
23.53/3.35	  $false | (~spl34_2 | ~spl34_104 | ~spl34_105 | spl34_109)),
23.53/3.35	  inference(subsumption_resolution,[],[f2261,f2044])).
23.53/3.35	thf(f2044,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ~spl34_104),
23.53/3.35	  inference(avatar_component_clause,[],[f2042])).
23.53/3.35	thf(f2042,plain,(
23.53/3.35	  spl34_104 <=> ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_104])])).
23.53/3.35	thf(f2261,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_105 | spl34_109)),
23.53/3.35	  inference(subsumption_resolution,[],[f2260,f2080])).
23.53/3.35	thf(f2080,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | spl34_109),
23.53/3.35	  inference(avatar_component_clause,[],[f2079])).
23.53/3.35	thf(f2079,plain,(
23.53/3.35	  spl34_109 <=> ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_109])])).
23.53/3.35	thf(f2260,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_105)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2259])).
23.53/3.35	thf(f2259,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_105)),
23.53/3.35	  inference(superposition,[],[f2229,f111])).
23.53/3.35	thf(f2229,plain,(
23.53/3.35	  ( ! [X6 : a,X4 : a,X5 : a > a > $o] : (($true != ((((sP2 @ X4) @ sK26) @ X5) @ X6)) | ($true = (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)))) ) | ~spl34_105),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2226])).
23.53/3.35	thf(f2226,plain,(
23.53/3.35	  ( ! [X6 : a,X4 : a,X5 : a > a > $o] : (($true != $true) | ($true != (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != ((((sP2 @ X4) @ sK26) @ X5) @ X6))) ) | ~spl34_105),
23.53/3.35	  inference(superposition,[],[f81,f2048])).
23.53/3.35	thf(f2048,plain,(
23.53/3.35	  ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ~spl34_105),
23.53/3.35	  inference(avatar_component_clause,[],[f2046])).
23.53/3.35	thf(f2046,plain,(
23.53/3.35	  spl34_105 <=> ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_105])])).
23.53/3.35	thf(f2236,plain,(
23.53/3.35	  ~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_108 | ~spl34_109),
23.53/3.35	  inference(avatar_contradiction_clause,[],[f2235])).
23.53/3.35	thf(f2235,plain,(
23.53/3.35	  $false | (~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_108 | ~spl34_109)),
23.53/3.35	  inference(subsumption_resolution,[],[f2234,f1134])).
23.53/3.35	thf(f1134,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ~spl34_69),
23.53/3.35	  inference(avatar_component_clause,[],[f1132])).
23.53/3.35	thf(f2234,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_5 | ~spl34_108 | ~spl34_109)),
23.53/3.35	  inference(subsumption_resolution,[],[f2233,f2190])).
23.53/3.35	thf(f2190,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_2 | ~spl34_5 | ~spl34_109)),
23.53/3.35	  inference(subsumption_resolution,[],[f2189,f1716])).
23.53/3.35	thf(f1716,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | ~spl34_2),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1715])).
23.53/3.35	thf(f1715,plain,(
23.53/3.35	  ($true != $true) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | ~spl34_2),
23.53/3.35	  inference(superposition,[],[f83,f111])).
23.53/3.35	thf(f83,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X0 : a,X3 : a,X1 : a > a > $o] : (($true != ((((sP2 @ X3) @ X2) @ X1) @ X0)) | ($true != (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f39])).
23.53/3.35	thf(f2189,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_5 | ~spl34_109)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2188])).
23.53/3.35	thf(f2188,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_5 | ~spl34_109)),
23.53/3.35	  inference(superposition,[],[f2174,f125])).
23.53/3.35	thf(f125,plain,(
23.53/3.35	  ($true = ((((sP0 @ sK27) @ sK26) @ sK31) @ sK32)) | ~spl34_5),
23.53/3.35	  inference(avatar_component_clause,[],[f123])).
23.53/3.35	thf(f123,plain,(
23.53/3.35	  spl34_5 <=> ($true = ((((sP0 @ sK27) @ sK26) @ sK31) @ sK32))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_5])])).
23.53/3.35	thf(f2174,plain,(
23.53/3.35	  ( ! [X12 : a,X13 : a] : (($true != ((((sP0 @ sK27) @ sK26) @ X12) @ X13)) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ X13)) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ X12)))) ) | ~spl34_109),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2173])).
23.53/3.35	thf(f2173,plain,(
23.53/3.35	  ( ! [X12 : a,X13 : a] : (($true != $true) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ X12))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ X13)) | ($true != ((((sP0 @ sK27) @ sK26) @ X12) @ X13))) ) | ~spl34_109),
23.53/3.35	  inference(superposition,[],[f95,f2081])).
23.53/3.35	thf(f2081,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ~spl34_109),
23.53/3.35	  inference(avatar_component_clause,[],[f2079])).
23.53/3.35	thf(f95,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != (X4 @ (((sK25 @ X4) @ X3) @ X2))) | ($true != (X4 @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ X0)) | ($true != ((((sP0 @ X3) @ X2) @ X1) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f49])).
23.53/3.35	thf(f49,plain,(
23.53/3.35	  ! [X0 : a,X1 : a,X2 : a > a > $o,X3 : a > a > $o] : (! [X4 : a > $o] : (($true = (X4 @ X0)) | (($true != (X4 @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) & (($true = ((X2 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))))) | (($true != (X4 @ (((sK25 @ X4) @ X3) @ X2))) & ($true = (X4 @ (((sK24 @ X4) @ X3) @ X2))) & (($true = ((X3 @ (((sK24 @ X4) @ X3) @ X2)) @ (((sK25 @ X4) @ X3) @ X2))) | ($true = ((X2 @ (((sK24 @ X4) @ X3) @ X2)) @ (((sK25 @ X4) @ X3) @ X2)))))) | ($true != ((((sP0 @ X3) @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(skolemisation,[status(esa),new_symbols(skolem,[sK23,sK24,sK25])],[f46,f48,f47])).
23.53/3.35	thf(f47,plain,(
23.53/3.35	  ! [X1 : a,X2 : a > a > $o,X3 : a > a > $o,X4 : a > $o] : (? [X5 : a] : (((X4 @ X5) != $true) & (($true = ((X2 @ X1) @ X5)) | ($true = ((X3 @ X1) @ X5)))) => (($true != (X4 @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) & (($true = ((X2 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f48,plain,(
23.53/3.35	  ! [X2 : a > a > $o,X3 : a > a > $o,X4 : a > $o] : (? [X6 : a,X7 : a] : (((X4 @ X7) != $true) & ((X4 @ X6) = $true) & (($true = ((X3 @ X6) @ X7)) | ($true = ((X2 @ X6) @ X7)))) => (($true != (X4 @ (((sK25 @ X4) @ X3) @ X2))) & ($true = (X4 @ (((sK24 @ X4) @ X3) @ X2))) & (($true = ((X3 @ (((sK24 @ X4) @ X3) @ X2)) @ (((sK25 @ X4) @ X3) @ X2))) | ($true = ((X2 @ (((sK24 @ X4) @ X3) @ X2)) @ (((sK25 @ X4) @ X3) @ X2))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f46,plain,(
23.53/3.35	  ! [X0 : a,X1 : a,X2 : a > a > $o,X3 : a > a > $o] : (! [X4 : a > $o] : (($true = (X4 @ X0)) | ? [X5 : a] : (((X4 @ X5) != $true) & (($true = ((X2 @ X1) @ X5)) | ($true = ((X3 @ X1) @ X5)))) | ? [X6 : a,X7 : a] : (((X4 @ X7) != $true) & ((X4 @ X6) = $true) & (($true = ((X3 @ X6) @ X7)) | ($true = ((X2 @ X6) @ X7))))) | ($true != ((((sP0 @ X3) @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(rectify,[],[f45])).
23.53/3.35	thf(f45,plain,(
23.53/3.35	  ! [X20 : a,X19 : a,X0 : a > a > $o,X1 : a > a > $o] : (! [X25 : a > $o] : (($true = (X25 @ X20)) | ? [X26 : a] : (($true != (X25 @ X26)) & (($true = ((X0 @ X19) @ X26)) | ($true = ((X1 @ X19) @ X26)))) | ? [X27 : a,X28 : a] : (($true != (X25 @ X28)) & ($true = (X25 @ X27)) & (($true = ((X1 @ X27) @ X28)) | ($true = ((X0 @ X27) @ X28))))) | ($true != ((((sP0 @ X1) @ X0) @ X19) @ X20)))),
23.53/3.35	  inference(nnf_transformation,[],[f8])).
23.53/3.35	thf(f2233,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_108)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2232])).
23.53/3.35	thf(f2232,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_108)),
23.53/3.35	  inference(superposition,[],[f2219,f111])).
23.53/3.35	thf(f2219,plain,(
23.53/3.35	  ( ! [X8 : a > a > $o,X7 : a,X9 : a] : (($true != ((((sP2 @ X7) @ X8) @ sK27) @ X9)) | ($true = (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ sK31))) ) | ~spl34_108),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2218])).
23.53/3.35	thf(f2218,plain,(
23.53/3.35	  ( ! [X8 : a > a > $o,X7 : a,X9 : a] : (($true != $true) | ($true != (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ sK31)) | ($true = (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != ((((sP2 @ X7) @ X8) @ sK27) @ X9))) ) | ~spl34_108),
23.53/3.35	  inference(superposition,[],[f82,f2077])).
23.53/3.35	thf(f2077,plain,(
23.53/3.35	  ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ~spl34_108),
23.53/3.35	  inference(avatar_component_clause,[],[f2075])).
23.53/3.35	thf(f2075,plain,(
23.53/3.35	  spl34_108 <=> ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_108])])).
23.53/3.35	thf(f82,plain,(
23.53/3.35	  ( ! [X6 : a,X2 : a > a > $o,X0 : a,X5 : a,X3 : a,X1 : a > a > $o] : ((((X1 @ X5) @ X6) != $true) | ($true != (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X5)) | ($true = (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X6)) | ($true != ((((sP2 @ X3) @ X2) @ X1) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f39])).
23.53/3.35	thf(f2212,plain,(
23.53/3.35	  spl34_108 | ~spl34_2 | ~spl34_5 | spl34_107 | ~spl34_109),
23.53/3.35	  inference(avatar_split_clause,[],[f2211,f2079,f2071,f123,f109,f2075])).
23.53/3.35	thf(f2071,plain,(
23.53/3.35	  spl34_107 <=> ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_107])])).
23.53/3.35	thf(f2211,plain,(
23.53/3.35	  ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_2 | ~spl34_5 | spl34_107 | ~spl34_109)),
23.53/3.35	  inference(subsumption_resolution,[],[f2210,f2072])).
23.53/3.35	thf(f2072,plain,(
23.53/3.35	  ($true != ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | spl34_107),
23.53/3.35	  inference(avatar_component_clause,[],[f2071])).
23.53/3.35	thf(f2210,plain,(
23.53/3.35	  ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_2 | ~spl34_5 | ~spl34_109)),
23.53/3.35	  inference(subsumption_resolution,[],[f2204,f1716])).
23.53/3.35	thf(f2204,plain,(
23.53/3.35	  ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_5 | ~spl34_109)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2203])).
23.53/3.35	thf(f2203,plain,(
23.53/3.35	  ($true != $true) | ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_5 | ~spl34_109)),
23.53/3.35	  inference(superposition,[],[f2175,f125])).
23.53/3.35	thf(f2175,plain,(
23.53/3.35	  ( ! [X10 : a,X11 : a] : (($true != ((((sP0 @ sK27) @ sK26) @ X10) @ X11)) | ($true = ((sK27 @ X10) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ X10))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ X11)) | ($true = ((sK26 @ X10) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ X10)))) ) | ~spl34_109),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2172])).
23.53/3.35	thf(f2172,plain,(
23.53/3.35	  ( ! [X10 : a,X11 : a] : (($true != $true) | ($true = ((sK26 @ X10) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ X10))) | ($true = ((sK27 @ X10) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ X10))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ X11)) | ($true != ((((sP0 @ sK27) @ sK26) @ X10) @ X11))) ) | ~spl34_109),
23.53/3.35	  inference(superposition,[],[f92,f2081])).
23.53/3.35	thf(f92,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != (X4 @ (((sK25 @ X4) @ X3) @ X2))) | ($true = ((X2 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ X0)) | ($true != ((((sP0 @ X3) @ X2) @ X1) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f49])).
23.53/3.35	thf(f2192,plain,(
23.53/3.35	  ~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_107 | ~spl34_109),
23.53/3.35	  inference(avatar_contradiction_clause,[],[f2191])).
23.53/3.35	thf(f2191,plain,(
23.53/3.35	  $false | (~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_107 | ~spl34_109)),
23.53/3.35	  inference(subsumption_resolution,[],[f2190,f2149])).
23.53/3.35	thf(f2149,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_2 | ~spl34_69 | ~spl34_107)),
23.53/3.35	  inference(subsumption_resolution,[],[f2148,f1134])).
23.53/3.35	thf(f2148,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_107)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2147])).
23.53/3.35	thf(f2147,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_107)),
23.53/3.35	  inference(superposition,[],[f2137,f111])).
23.53/3.35	thf(f2137,plain,(
23.53/3.35	  ( ! [X6 : a,X4 : a,X5 : a > a > $o] : (($true != ((((sP2 @ X4) @ sK26) @ X5) @ X6)) | ($true = (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ sK31))) ) | ~spl34_107),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2134])).
23.53/3.35	thf(f2134,plain,(
23.53/3.35	  ( ! [X6 : a,X4 : a,X5 : a > a > $o] : (($true != $true) | ($true != (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ sK31)) | ($true = (((((sK19 @ X4) @ sK26) @ X5) @ X6) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != ((((sP2 @ X4) @ sK26) @ X5) @ X6))) ) | ~spl34_107),
23.53/3.35	  inference(superposition,[],[f81,f2073])).
23.53/3.35	thf(f2073,plain,(
23.53/3.35	  ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ~spl34_107),
23.53/3.35	  inference(avatar_component_clause,[],[f2071])).
23.53/3.35	thf(f2167,plain,(
23.53/3.35	  spl34_105 | spl34_106 | ~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_107),
23.53/3.35	  inference(avatar_split_clause,[],[f2166,f2071,f1132,f123,f109,f2050,f2046])).
23.53/3.35	thf(f2050,plain,(
23.53/3.35	  spl34_106 <=> ($true = ((sK27 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_106])])).
23.53/3.35	thf(f2166,plain,(
23.53/3.35	  ($true = ((sK27 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_107)),
23.53/3.35	  inference(subsumption_resolution,[],[f2158,f1716])).
23.53/3.35	thf(f2158,plain,(
23.53/3.35	  ($true = ((sK27 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_107)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2155])).
23.53/3.35	thf(f2155,plain,(
23.53/3.35	  ($true != $true) | ($true = ((sK27 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_107)),
23.53/3.35	  inference(superposition,[],[f487,f2149])).
23.53/3.35	thf(f487,plain,(
23.53/3.35	  ( ! [X2 : a > $o] : (($true != (X2 @ ((((sK23 @ X2) @ sK27) @ sK26) @ sK31))) | ($true = ((sK27 @ (((sK24 @ X2) @ sK27) @ sK26)) @ (((sK25 @ X2) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ X2) @ sK27) @ sK26)) @ (((sK25 @ X2) @ sK27) @ sK26))) | ($true = (X2 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(trivial_inequality_removal,[],[f476])).
23.53/3.35	thf(f476,plain,(
23.53/3.35	  ( ! [X2 : a > $o] : (($true != $true) | ($true != (X2 @ ((((sK23 @ X2) @ sK27) @ sK26) @ sK31))) | ($true = ((sK27 @ (((sK24 @ X2) @ sK27) @ sK26)) @ (((sK25 @ X2) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ X2) @ sK27) @ sK26)) @ (((sK25 @ X2) @ sK27) @ sK26))) | ($true = (X2 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(superposition,[],[f93,f125])).
23.53/3.35	thf(f93,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP0 @ X3) @ X2) @ X1) @ X0)) | ($true != (X4 @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ (((sK24 @ X4) @ X3) @ X2)) @ (((sK25 @ X4) @ X3) @ X2))) | ($true = ((X2 @ (((sK24 @ X4) @ X3) @ X2)) @ (((sK25 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f49])).
23.53/3.35	thf(f2130,plain,(
23.53/3.35	  spl34_109 | ~spl34_2 | ~spl34_104 | ~spl34_106),
23.53/3.35	  inference(avatar_split_clause,[],[f2129,f2050,f2042,f109,f2079])).
23.53/3.35	thf(f2129,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_104 | ~spl34_106)),
23.53/3.35	  inference(subsumption_resolution,[],[f2128,f2044])).
23.53/3.35	thf(f2128,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_106)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2127])).
23.53/3.35	thf(f2127,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_106)),
23.53/3.35	  inference(superposition,[],[f2121,f111])).
23.53/3.35	thf(f2121,plain,(
23.53/3.35	  ( ! [X8 : a > a > $o,X7 : a,X9 : a] : (($true != ((((sP2 @ X7) @ X8) @ sK27) @ X9)) | ($true = (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)))) ) | ~spl34_106),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2120])).
23.53/3.35	thf(f2120,plain,(
23.53/3.35	  ( ! [X8 : a > a > $o,X7 : a,X9 : a] : (($true != $true) | ($true != (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != ((((sP2 @ X7) @ X8) @ sK27) @ X9))) ) | ~spl34_106),
23.53/3.35	  inference(superposition,[],[f82,f2052])).
23.53/3.35	thf(f2052,plain,(
23.53/3.35	  ($true = ((sK27 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ~spl34_106),
23.53/3.35	  inference(avatar_component_clause,[],[f2050])).
23.53/3.35	thf(f2116,plain,(
23.53/3.35	  spl34_105 | spl34_106 | ~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_108),
23.53/3.35	  inference(avatar_split_clause,[],[f2115,f2075,f1132,f123,f109,f2050,f2046])).
23.53/3.35	thf(f2115,plain,(
23.53/3.35	  ($true = ((sK27 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_108)),
23.53/3.35	  inference(subsumption_resolution,[],[f2110,f1716])).
23.53/3.35	thf(f2110,plain,(
23.53/3.35	  ($true = ((sK27 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_108)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2107])).
23.53/3.35	thf(f2107,plain,(
23.53/3.35	  ($true != $true) | ($true = ((sK27 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_2 | ~spl34_5 | ~spl34_69 | ~spl34_108)),
23.53/3.35	  inference(superposition,[],[f487,f2101])).
23.53/3.35	thf(f2101,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | (~spl34_2 | ~spl34_69 | ~spl34_108)),
23.53/3.35	  inference(subsumption_resolution,[],[f2100,f1134])).
23.53/3.35	thf(f2100,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_108)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2099])).
23.53/3.35	thf(f2099,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_108)),
23.53/3.35	  inference(superposition,[],[f2089,f111])).
23.53/3.35	thf(f2089,plain,(
23.53/3.35	  ( ! [X8 : a > a > $o,X7 : a,X9 : a] : (($true != ((((sP2 @ X7) @ X8) @ sK27) @ X9)) | ($true = (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ sK31))) ) | ~spl34_108),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2088])).
23.53/3.35	thf(f2088,plain,(
23.53/3.35	  ( ! [X8 : a > a > $o,X7 : a,X9 : a] : (($true != $true) | ($true != (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ sK31)) | ($true = (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true != ((((sP2 @ X7) @ X8) @ sK27) @ X9))) ) | ~spl34_108),
23.53/3.35	  inference(superposition,[],[f82,f2077])).
23.53/3.35	thf(f2082,plain,(
23.53/3.35	  spl34_105 | spl34_107 | spl34_108 | spl34_109 | ~spl34_2 | ~spl34_5 | ~spl34_104),
23.53/3.35	  inference(avatar_split_clause,[],[f2069,f2042,f123,f109,f2079,f2075,f2071,f2046])).
23.53/3.35	thf(f2069,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_5 | ~spl34_104)),
23.53/3.35	  inference(subsumption_resolution,[],[f2068,f1716])).
23.53/3.35	thf(f2068,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_2 | ~spl34_5 | ~spl34_104)),
23.53/3.35	  inference(subsumption_resolution,[],[f2067,f111])).
23.53/3.35	thf(f2067,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32)) | ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_5 | ~spl34_104)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2056])).
23.53/3.35	thf(f2056,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true != ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32)) | ($true = ((sK27 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26)) @ (((sK25 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_5 | ~spl34_104)),
23.53/3.35	  inference(superposition,[],[f801,f2044])).
23.53/3.35	thf(f801,plain,(
23.53/3.35	  ( ! [X12 : a > a > $o,X10 : a > $o,X13 : a,X11 : a] : (($true != (((((sK19 @ X11) @ X12) @ sK27) @ X13) @ (((sK24 @ X10) @ sK27) @ sK26))) | ($true = (((((sK19 @ X11) @ X12) @ sK27) @ X13) @ (((sK25 @ X10) @ sK27) @ sK26))) | ($true != ((((sP2 @ X11) @ X12) @ sK27) @ X13)) | ($true = ((sK27 @ sK31) @ ((((sK23 @ X10) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X10) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ (((sK24 @ X10) @ sK27) @ sK26)) @ (((sK25 @ X10) @ sK27) @ sK26))) | ($true = (X10 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(trivial_inequality_removal,[],[f800])).
23.53/3.35	thf(f800,plain,(
23.53/3.35	  ( ! [X12 : a > a > $o,X10 : a > $o,X13 : a,X11 : a] : (($true != $true) | ($true != (((((sK19 @ X11) @ X12) @ sK27) @ X13) @ (((sK24 @ X10) @ sK27) @ sK26))) | ($true = (((((sK19 @ X11) @ X12) @ sK27) @ X13) @ (((sK25 @ X10) @ sK27) @ sK26))) | ($true != ((((sP2 @ X11) @ X12) @ sK27) @ X13)) | ($true = ((sK27 @ sK31) @ ((((sK23 @ X10) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X10) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ (((sK24 @ X10) @ sK27) @ sK26)) @ (((sK25 @ X10) @ sK27) @ sK26))) | ($true = (X10 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(superposition,[],[f82,f489])).
23.53/3.35	thf(f489,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true = ((sK27 @ (((sK24 @ X0) @ sK27) @ sK26)) @ (((sK25 @ X0) @ sK27) @ sK26))) | ($true = ((sK27 @ sK31) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ (((sK24 @ X0) @ sK27) @ sK26)) @ (((sK25 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(trivial_inequality_removal,[],[f474])).
23.53/3.35	thf(f474,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = ((sK27 @ sK31) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = ((sK27 @ (((sK24 @ X0) @ sK27) @ sK26)) @ (((sK25 @ X0) @ sK27) @ sK26))) | ($true = ((sK26 @ (((sK24 @ X0) @ sK27) @ sK26)) @ (((sK25 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(superposition,[],[f90,f125])).
23.53/3.35	thf(f90,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP0 @ X3) @ X2) @ X1) @ X0)) | ($true = ((X2 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ (((sK24 @ X4) @ X3) @ X2)) @ (((sK25 @ X4) @ X3) @ X2))) | ($true = ((X2 @ (((sK24 @ X4) @ X3) @ X2)) @ (((sK25 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f49])).
23.53/3.35	thf(f2055,plain,(
23.53/3.35	  spl34_104 | ~spl34_2 | ~spl34_5 | ~spl34_69),
23.53/3.35	  inference(avatar_split_clause,[],[f2054,f1132,f123,f109,f2042])).
23.53/3.35	thf(f2054,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(subsumption_resolution,[],[f2033,f1716])).
23.53/3.35	thf(f2033,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2032])).
23.53/3.35	thf(f2032,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(duplicate_literal_removal,[],[f2031])).
23.53/3.35	thf(f2031,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK24 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK27) @ sK26))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK32)) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(superposition,[],[f486,f2024])).
23.53/3.35	thf(f2024,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = (X0 @ (((sK24 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(subsumption_resolution,[],[f2023,f1134])).
23.53/3.35	thf(f2023,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ($true = (X0 @ (((sK24 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f2022])).
23.53/3.35	thf(f2022,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ($true = (X0 @ (((sK24 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(duplicate_literal_removal,[],[f2021])).
23.53/3.35	thf(f2021,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = (X0 @ (((sK24 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(superposition,[],[f1894,f111])).
23.53/3.35	thf(f1894,plain,(
23.53/3.35	  ( ! [X6 : a > $o,X8 : a > a > $o,X7 : a,X9 : a] : (($true != ((((sP2 @ X7) @ sK26) @ X8) @ X9)) | ($true = (((((sK19 @ X7) @ sK26) @ X8) @ X9) @ ((((sK23 @ X6) @ sK27) @ sK26) @ sK31))) | ($true != (((((sK19 @ X7) @ sK26) @ X8) @ X9) @ sK31)) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X6) @ sK27) @ sK26) @ sK31))) | ($true = (X6 @ (((sK24 @ X6) @ sK27) @ sK26))) | ($true = (X6 @ sK32))) ) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1885])).
23.53/3.35	thf(f1885,plain,(
23.53/3.35	  ( ! [X6 : a > $o,X8 : a > a > $o,X7 : a,X9 : a] : (($true != $true) | ($true != (((((sK19 @ X7) @ sK26) @ X8) @ X9) @ sK31)) | ($true = (((((sK19 @ X7) @ sK26) @ X8) @ X9) @ ((((sK23 @ X6) @ sK27) @ sK26) @ sK31))) | ($true != ((((sP2 @ X7) @ sK26) @ X8) @ X9)) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X6) @ sK27) @ sK26) @ sK31))) | ($true = (X6 @ (((sK24 @ X6) @ sK27) @ sK26))) | ($true = (X6 @ sK32))) ) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(superposition,[],[f81,f1856])).
23.53/3.35	thf(f1856,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true = ((sK26 @ sK31) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = (X0 @ (((sK24 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | (~spl34_2 | ~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(subsumption_resolution,[],[f1843,f111])).
23.53/3.35	thf(f1843,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true != ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32)) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = (X0 @ (((sK24 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | (~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1828])).
23.53/3.35	thf(f1828,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true != ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32)) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X0) @ sK27) @ sK26) @ sK31))) | ($true = (X0 @ (((sK24 @ X0) @ sK27) @ sK26))) | ($true = (X0 @ sK32))) ) | (~spl34_5 | ~spl34_69)),
23.53/3.35	  inference(superposition,[],[f671,f1134])).
23.53/3.35	thf(f671,plain,(
23.53/3.35	  ( ! [X12 : a > a > $o,X10 : a > $o,X13 : a,X11 : a] : (($true != (((((sK19 @ X11) @ X12) @ sK27) @ X13) @ sK31)) | ($true = (((((sK19 @ X11) @ X12) @ sK27) @ X13) @ ((((sK23 @ X10) @ sK27) @ sK26) @ sK31))) | ($true != ((((sP2 @ X11) @ X12) @ sK27) @ X13)) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X10) @ sK27) @ sK26) @ sK31))) | ($true = (X10 @ (((sK24 @ X10) @ sK27) @ sK26))) | ($true = (X10 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(trivial_inequality_removal,[],[f667])).
23.53/3.35	thf(f667,plain,(
23.53/3.35	  ( ! [X12 : a > a > $o,X10 : a > $o,X13 : a,X11 : a] : (($true != $true) | ($true != (((((sK19 @ X11) @ X12) @ sK27) @ X13) @ sK31)) | ($true = (((((sK19 @ X11) @ X12) @ sK27) @ X13) @ ((((sK23 @ X10) @ sK27) @ sK26) @ sK31))) | ($true != ((((sP2 @ X11) @ X12) @ sK27) @ X13)) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X10) @ sK27) @ sK26) @ sK31))) | ($true = (X10 @ (((sK24 @ X10) @ sK27) @ sK26))) | ($true = (X10 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(superposition,[],[f82,f488])).
23.53/3.35	thf(f488,plain,(
23.53/3.35	  ( ! [X1 : a > $o] : (($true = ((sK27 @ sK31) @ ((((sK23 @ X1) @ sK27) @ sK26) @ sK31))) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X1) @ sK27) @ sK26) @ sK31))) | ($true = (X1 @ (((sK24 @ X1) @ sK27) @ sK26))) | ($true = (X1 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(trivial_inequality_removal,[],[f475])).
23.53/3.35	thf(f475,plain,(
23.53/3.35	  ( ! [X1 : a > $o] : (($true != $true) | ($true = ((sK26 @ sK31) @ ((((sK23 @ X1) @ sK27) @ sK26) @ sK31))) | ($true = ((sK27 @ sK31) @ ((((sK23 @ X1) @ sK27) @ sK26) @ sK31))) | ($true = (X1 @ (((sK24 @ X1) @ sK27) @ sK26))) | ($true = (X1 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(superposition,[],[f91,f125])).
23.53/3.35	thf(f91,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP0 @ X3) @ X2) @ X1) @ X0)) | ($true = ((X2 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ (((sK24 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f49])).
23.53/3.35	thf(f486,plain,(
23.53/3.35	  ( ! [X3 : a > $o] : (($true != (X3 @ ((((sK23 @ X3) @ sK27) @ sK26) @ sK31))) | ($true = (X3 @ (((sK24 @ X3) @ sK27) @ sK26))) | ($true = (X3 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(trivial_inequality_removal,[],[f477])).
23.53/3.35	thf(f477,plain,(
23.53/3.35	  ( ! [X3 : a > $o] : (($true != $true) | ($true != (X3 @ ((((sK23 @ X3) @ sK27) @ sK26) @ sK31))) | ($true = (X3 @ (((sK24 @ X3) @ sK27) @ sK26))) | ($true = (X3 @ sK32))) ) | ~spl34_5),
23.53/3.35	  inference(superposition,[],[f94,f125])).
23.53/3.35	thf(f94,plain,(
23.53/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP0 @ X3) @ X2) @ X1) @ X0)) | ($true != (X4 @ ((((sK23 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ (((sK24 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f49])).
23.53/3.35	thf(f1825,plain,(
23.53/3.35	  ~spl34_2 | ~spl34_74 | spl34_77),
23.53/3.35	  inference(avatar_contradiction_clause,[],[f1824])).
23.53/3.35	thf(f1824,plain,(
23.53/3.35	  $false | (~spl34_2 | ~spl34_74 | spl34_77)),
23.53/3.35	  inference(subsumption_resolution,[],[f1823,f1232])).
23.53/3.35	thf(f1232,plain,(
23.53/3.35	  ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | spl34_77),
23.53/3.35	  inference(avatar_component_clause,[],[f1230])).
23.53/3.35	thf(f1823,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_2 | ~spl34_74)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1822])).
23.53/3.35	thf(f1822,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_2 | ~spl34_74)),
23.53/3.35	  inference(superposition,[],[f1798,f111])).
23.53/3.35	thf(f1798,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X3 : a] : (($true != ((((sP2 @ sK30) @ X2) @ sK27) @ X3)) | ($true = (((((sK19 @ sK30) @ X2) @ sK27) @ X3) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30)))) ) | ~spl34_74),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1793])).
23.53/3.35	thf(f1793,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X3 : a] : (($true != $true) | ($true = (((((sK19 @ sK30) @ X2) @ sK27) @ X3) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true != ((((sP2 @ sK30) @ X2) @ sK27) @ X3))) ) | ~spl34_74),
23.53/3.35	  inference(superposition,[],[f80,f1176])).
23.53/3.35	thf(f1176,plain,(
23.53/3.35	  ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ~spl34_74),
23.53/3.35	  inference(avatar_component_clause,[],[f1174])).
23.53/3.35	thf(f80,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X0 : a,X7 : a,X3 : a,X1 : a > a > $o] : (($true != ((X1 @ X3) @ X7)) | ($true = (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X7)) | ($true != ((((sP2 @ X3) @ X2) @ X1) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f39])).
23.53/3.35	thf(f1791,plain,(
23.53/3.35	  spl34_76 | ~spl34_2 | ~spl34_68 | ~spl34_71),
23.53/3.35	  inference(avatar_split_clause,[],[f1790,f1140,f1128,f109,f1182])).
23.53/3.35	thf(f1790,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | (~spl34_2 | ~spl34_68 | ~spl34_71)),
23.53/3.35	  inference(subsumption_resolution,[],[f1783,f1130])).
23.53/3.35	thf(f1783,plain,(
23.53/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | (~spl34_2 | ~spl34_71)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1782])).
23.53/3.35	thf(f1782,plain,(
23.53/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | (~spl34_2 | ~spl34_71)),
23.53/3.35	  inference(superposition,[],[f1257,f111])).
23.53/3.35	thf(f1257,plain,(
23.53/3.35	  ( ! [X8 : a > a > $o,X7 : a,X9 : a] : (($true != ((((sP2 @ X7) @ X8) @ sK27) @ X9)) | ($true = (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true != (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)))) ) | ~spl34_71),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1256])).
23.53/3.35	thf(f1256,plain,(
23.53/3.35	  ( ! [X8 : a > a > $o,X7 : a,X9 : a] : (($true != $true) | ($true != (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ X7) @ X8) @ sK27) @ X9) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true != ((((sP2 @ X7) @ X8) @ sK27) @ X9))) ) | ~spl34_71),
23.53/3.35	  inference(superposition,[],[f82,f1142])).
23.53/3.35	thf(f1142,plain,(
23.53/3.35	  ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ~spl34_71),
23.53/3.35	  inference(avatar_component_clause,[],[f1140])).
23.53/3.35	thf(f1704,plain,(
23.53/3.35	  ~spl34_3 | ~spl34_6 | ~spl34_89 | ~spl34_90),
23.53/3.35	  inference(avatar_contradiction_clause,[],[f1703])).
23.53/3.35	thf(f1703,plain,(
23.53/3.35	  $false | (~spl34_3 | ~spl34_6 | ~spl34_89 | ~spl34_90)),
23.53/3.35	  inference(subsumption_resolution,[],[f1702,f1623])).
23.53/3.35	thf(f1623,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_3 | ~spl34_89)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1614])).
23.53/3.35	thf(f1614,plain,(
23.53/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_3 | ~spl34_89)),
23.53/3.35	  inference(superposition,[],[f1277,f1604])).
23.53/3.35	thf(f1604,plain,(
23.53/3.35	  ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ~spl34_89),
23.53/3.35	  inference(avatar_component_clause,[],[f1602])).
23.53/3.35	thf(f1602,plain,(
23.53/3.35	  spl34_89 <=> ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27))))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_89])])).
23.53/3.35	thf(f1277,plain,(
23.53/3.35	  ( ! [X0 : a] : (($true != ((sK27 @ ((sK7 @ sK26) @ sK27)) @ X0)) | ($true = (((sK9 @ sK26) @ sK27) @ X0))) ) | ~spl34_3),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1268])).
23.53/3.35	thf(f1268,plain,(
23.53/3.35	  ( ! [X0 : a] : (($true != $true) | ($true != ((sK27 @ ((sK7 @ sK26) @ sK27)) @ X0)) | ($true = (((sK9 @ sK26) @ sK27) @ X0))) ) | ~spl34_3),
23.53/3.35	  inference(superposition,[],[f56,f115])).
23.53/3.35	thf(f115,plain,(
23.53/3.35	  ($true = ((sP6 @ sK26) @ sK27)) | ~spl34_3),
23.53/3.35	  inference(avatar_component_clause,[],[f113])).
23.53/3.35	thf(f113,plain,(
23.53/3.35	  spl34_3 <=> ($true = ((sP6 @ sK26) @ sK27))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_3])])).
23.53/3.35	thf(f56,plain,(
23.53/3.35	  ( ! [X0 : a > a > $o,X7 : a,X1 : a > a > $o] : (($true != ((sP6 @ X1) @ X0)) | ($true != ((X0 @ ((sK7 @ X1) @ X0)) @ X7)) | ($true = (((sK9 @ X1) @ X0) @ X7))) )),
23.53/3.35	  inference(cnf_transformation,[],[f20])).
23.53/3.35	thf(f20,plain,(
23.53/3.35	  ! [X0 : a > a > $o,X1 : a > a > $o] : (((($true != (((sK9 @ X1) @ X0) @ ((sK8 @ X1) @ X0))) & ! [X5 : a,X6 : a] : (($true = (((sK9 @ X1) @ X0) @ X6)) | ($true != (((sK9 @ X1) @ X0) @ X5)) | ((((X0 @ X5) @ X6) != $true) & (((X1 @ X5) @ X6) != $true))) & ! [X7 : a] : (($true = (((sK9 @ X1) @ X0) @ X7)) | (($true != ((X1 @ ((sK7 @ X1) @ X0)) @ X7)) & ($true != ((X0 @ ((sK7 @ X1) @ X0)) @ X7))))) & ($true = ((((sP4 @ X0) @ ((sK7 @ X1) @ X0)) @ X1) @ ((sK8 @ X1) @ X0)))) | ($true != ((sP6 @ X1) @ X0)))),
23.53/3.35	  inference(skolemisation,[status(esa),new_symbols(skolem,[sK7,sK8,sK9])],[f17,f19,f18])).
23.53/3.35	thf(f18,plain,(
23.53/3.35	  ! [X0 : a > a > $o,X1 : a > a > $o] : (? [X2 : a,X3 : a] : (? [X4 : a > $o] : (((X4 @ X3) != $true) & ! [X5 : a,X6 : a] : (((X4 @ X6) = $true) | ((X4 @ X5) != $true) | ((((X0 @ X5) @ X6) != $true) & (((X1 @ X5) @ X6) != $true))) & ! [X7 : a] : (((X4 @ X7) = $true) | ((((X1 @ X2) @ X7) != $true) & (((X0 @ X2) @ X7) != $true)))) & ($true = ((((sP4 @ X0) @ X2) @ X1) @ X3))) => (? [X4 : a > $o] : (($true != (X4 @ ((sK8 @ X1) @ X0))) & ! [X5 : a,X6 : a] : (((X4 @ X6) = $true) | ((X4 @ X5) != $true) | ((((X0 @ X5) @ X6) != $true) & (((X1 @ X5) @ X6) != $true))) & ! [X7 : a] : (((X4 @ X7) = $true) | (($true != ((X1 @ ((sK7 @ X1) @ X0)) @ X7)) & ($true != ((X0 @ ((sK7 @ X1) @ X0)) @ X7))))) & ($true = ((((sP4 @ X0) @ ((sK7 @ X1) @ X0)) @ X1) @ ((sK8 @ X1) @ X0)))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f19,plain,(
23.53/3.35	  ! [X0 : a > a > $o,X1 : a > a > $o] : (? [X4 : a > $o] : (($true != (X4 @ ((sK8 @ X1) @ X0))) & ! [X5 : a,X6 : a] : (((X4 @ X6) = $true) | ((X4 @ X5) != $true) | ((((X0 @ X5) @ X6) != $true) & (((X1 @ X5) @ X6) != $true))) & ! [X7 : a] : (((X4 @ X7) = $true) | (($true != ((X1 @ ((sK7 @ X1) @ X0)) @ X7)) & ($true != ((X0 @ ((sK7 @ X1) @ X0)) @ X7))))) => (($true != (((sK9 @ X1) @ X0) @ ((sK8 @ X1) @ X0))) & ! [X6 : a,X5 : a] : (($true = (((sK9 @ X1) @ X0) @ X6)) | ($true != (((sK9 @ X1) @ X0) @ X5)) | ((((X0 @ X5) @ X6) != $true) & (((X1 @ X5) @ X6) != $true))) & ! [X7 : a] : (($true = (((sK9 @ X1) @ X0) @ X7)) | (($true != ((X1 @ ((sK7 @ X1) @ X0)) @ X7)) & ($true != ((X0 @ ((sK7 @ X1) @ X0)) @ X7))))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f17,plain,(
23.53/3.35	  ! [X0 : a > a > $o,X1 : a > a > $o] : (? [X2 : a,X3 : a] : (? [X4 : a > $o] : (((X4 @ X3) != $true) & ! [X5 : a,X6 : a] : (((X4 @ X6) = $true) | ((X4 @ X5) != $true) | ((((X0 @ X5) @ X6) != $true) & (((X1 @ X5) @ X6) != $true))) & ! [X7 : a] : (((X4 @ X7) = $true) | ((((X1 @ X2) @ X7) != $true) & (((X0 @ X2) @ X7) != $true)))) & ($true = ((((sP4 @ X0) @ X2) @ X1) @ X3))) | ($true != ((sP6 @ X1) @ X0)))),
23.53/3.35	  inference(rectify,[],[f16])).
23.53/3.35	thf(f16,plain,(
23.53/3.35	  ! [X1 : a > a > $o,X0 : a > a > $o] : (? [X4 : a,X5 : a] : (? [X14 : a > $o] : (($true != (X14 @ X5)) & ! [X15 : a,X16 : a] : (($true = (X14 @ X16)) | ($true != (X14 @ X15)) | (($true != ((X1 @ X15) @ X16)) & ($true != ((X0 @ X15) @ X16)))) & ! [X17 : a] : (($true = (X14 @ X17)) | (($true != ((X0 @ X4) @ X17)) & ($true != ((X1 @ X4) @ X17))))) & ($true = ((((sP4 @ X1) @ X4) @ X0) @ X5))) | ($true != ((sP6 @ X0) @ X1)))),
23.53/3.35	  inference(nnf_transformation,[],[f14])).
23.53/3.35	thf(f1702,plain,(
23.53/3.35	  ($true != (((sK9 @ sK26) @ sK27) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_3 | ~spl34_6 | ~spl34_90)),
23.53/3.35	  inference(subsumption_resolution,[],[f1701,f1273])).
23.53/3.35	thf(f1273,plain,(
23.53/3.35	  ($true != (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ~spl34_3),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1272])).
23.53/3.35	thf(f1272,plain,(
23.53/3.35	  ($true != $true) | ($true != (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ~spl34_3),
23.53/3.35	  inference(superposition,[],[f60,f115])).
23.53/3.35	thf(f60,plain,(
23.53/3.35	  ( ! [X0 : a > a > $o,X1 : a > a > $o] : (($true != ((sP6 @ X1) @ X0)) | ($true != (((sK9 @ X1) @ X0) @ ((sK8 @ X1) @ X0)))) )),
23.53/3.35	  inference(cnf_transformation,[],[f20])).
23.53/3.35	thf(f1701,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true != (((sK9 @ sK26) @ sK27) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_6 | ~spl34_90)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1700])).
23.53/3.35	thf(f1700,plain,(
23.53/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true != (((sK9 @ sK26) @ sK27) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_6 | ~spl34_90)),
23.53/3.35	  inference(superposition,[],[f1656,f146])).
23.53/3.35	thf(f146,plain,(
23.53/3.35	  ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ~spl34_6),
23.53/3.35	  inference(avatar_component_clause,[],[f144])).
23.53/3.35	thf(f144,plain,(
23.53/3.35	  spl34_6 <=> ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_6])])).
23.53/3.35	thf(f1656,plain,(
23.53/3.35	  ( ! [X4 : a,X5 : a] : (($true != (((sP3 @ sK27) @ X4) @ X5)) | ($true = (((sK9 @ sK26) @ sK27) @ X5)) | ($true != (((sK9 @ sK26) @ sK27) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ X4)))) ) | ~spl34_90),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1655])).
23.53/3.35	thf(f1655,plain,(
23.53/3.35	  ( ! [X4 : a,X5 : a] : (($true != $true) | ($true != (((sK9 @ sK26) @ sK27) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ X4))) | ($true = (((sK9 @ sK26) @ sK27) @ X5)) | ($true != (((sP3 @ sK27) @ X4) @ X5))) ) | ~spl34_90),
23.53/3.35	  inference(superposition,[],[f78,f1608])).
23.53/3.35	thf(f1608,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ~spl34_90),
23.53/3.35	  inference(avatar_component_clause,[],[f1606])).
23.53/3.35	thf(f1606,plain,(
23.53/3.35	  spl34_90 <=> ($true = (((sK9 @ sK26) @ sK27) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_90])])).
23.53/3.35	thf(f78,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X0 : a,X3 : a > $o,X1 : a] : (($true != (X3 @ ((sK18 @ X3) @ X2))) | ($true != (X3 @ (((sK16 @ X3) @ X2) @ X1))) | ($true = (X3 @ X0)) | ($true != (((sP3 @ X2) @ X1) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f35])).
23.53/3.35	thf(f35,plain,(
23.53/3.35	  ! [X0 : a,X1 : a,X2 : a > a > $o] : (! [X3 : a > $o] : (($true = (X3 @ X0)) | (($true != (X3 @ (((sK16 @ X3) @ X2) @ X1))) & ($true = ((X2 @ X1) @ (((sK16 @ X3) @ X2) @ X1)))) | (($true != (X3 @ ((sK18 @ X3) @ X2))) & ($true = (X3 @ ((sK17 @ X3) @ X2))) & ($true = ((X2 @ ((sK17 @ X3) @ X2)) @ ((sK18 @ X3) @ X2))))) | ($true != (((sP3 @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(skolemisation,[status(esa),new_symbols(skolem,[sK16,sK17,sK18])],[f32,f34,f33])).
23.53/3.35	thf(f33,plain,(
23.53/3.35	  ! [X1 : a,X2 : a > a > $o,X3 : a > $o] : (? [X4 : a] : (($true != (X3 @ X4)) & ($true = ((X2 @ X1) @ X4))) => (($true != (X3 @ (((sK16 @ X3) @ X2) @ X1))) & ($true = ((X2 @ X1) @ (((sK16 @ X3) @ X2) @ X1)))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f34,plain,(
23.53/3.35	  ! [X2 : a > a > $o,X3 : a > $o] : (? [X5 : a,X6 : a] : (($true != (X3 @ X6)) & ($true = (X3 @ X5)) & ($true = ((X2 @ X5) @ X6))) => (($true != (X3 @ ((sK18 @ X3) @ X2))) & ($true = (X3 @ ((sK17 @ X3) @ X2))) & ($true = ((X2 @ ((sK17 @ X3) @ X2)) @ ((sK18 @ X3) @ X2)))))),
23.53/3.35	  introduced(choice_axiom,[])).
23.53/3.35	thf(f32,plain,(
23.53/3.35	  ! [X0 : a,X1 : a,X2 : a > a > $o] : (! [X3 : a > $o] : (($true = (X3 @ X0)) | ? [X4 : a] : (($true != (X3 @ X4)) & ($true = ((X2 @ X1) @ X4))) | ? [X5 : a,X6 : a] : (($true != (X3 @ X6)) & ($true = (X3 @ X5)) & ($true = ((X2 @ X5) @ X6)))) | ($true != (((sP3 @ X2) @ X1) @ X0)))),
23.53/3.35	  inference(rectify,[],[f31])).
23.53/3.35	thf(f31,plain,(
23.53/3.35	  ! [X5 : a,X4 : a,X1 : a > a > $o] : (! [X10 : a > $o] : (($true = (X10 @ X5)) | ? [X11 : a] : (($true != (X10 @ X11)) & ($true = ((X1 @ X4) @ X11))) | ? [X12 : a,X13 : a] : (($true != (X10 @ X13)) & ($true = (X10 @ X12)) & ($true = ((X1 @ X12) @ X13)))) | ($true != (((sP3 @ X1) @ X4) @ X5)))),
23.53/3.35	  inference(nnf_transformation,[],[f11])).
23.53/3.35	thf(f1669,plain,(
23.53/3.35	  spl34_83 | ~spl34_3 | ~spl34_6 | ~spl34_89),
23.53/3.35	  inference(avatar_split_clause,[],[f1632,f1602,f144,f113,f1542])).
23.53/3.35	thf(f1542,plain,(
23.53/3.35	  spl34_83 <=> ($true = ((sK27 @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27)) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_83])])).
23.53/3.35	thf(f1632,plain,(
23.53/3.35	  ($true = ((sK27 @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27)) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | (~spl34_3 | ~spl34_6 | ~spl34_89)),
23.53/3.35	  inference(subsumption_resolution,[],[f1629,f1273])).
23.53/3.35	thf(f1629,plain,(
23.53/3.35	  ($true = ((sK27 @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27)) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_6 | ~spl34_89)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1626])).
23.53/3.35	thf(f1626,plain,(
23.53/3.35	  ($true != $true) | ($true = ((sK27 @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27)) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_6 | ~spl34_89)),
23.53/3.35	  inference(superposition,[],[f1481,f1623])).
23.53/3.35	thf(f1481,plain,(
23.53/3.35	  ( ! [X2 : a > $o] : (($true != (X2 @ (((sK16 @ X2) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = ((sK27 @ ((sK17 @ X2) @ sK27)) @ ((sK18 @ X2) @ sK27))) | ($true = (X2 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_6),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1470])).
23.53/3.35	thf(f1470,plain,(
23.53/3.35	  ( ! [X2 : a > $o] : (($true != $true) | ($true != (X2 @ (((sK16 @ X2) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = ((sK27 @ ((sK17 @ X2) @ sK27)) @ ((sK18 @ X2) @ sK27))) | ($true = (X2 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_6),
23.53/3.35	  inference(superposition,[],[f76,f146])).
23.53/3.35	thf(f76,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X0 : a,X3 : a > $o,X1 : a] : (($true != (((sP3 @ X2) @ X1) @ X0)) | ($true != (X3 @ (((sK16 @ X3) @ X2) @ X1))) | ($true = ((X2 @ ((sK17 @ X3) @ X2)) @ ((sK18 @ X3) @ X2))) | ($true = (X3 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f35])).
23.53/3.35	thf(f1668,plain,(
23.53/3.35	  spl34_89 | ~spl34_3 | ~spl34_6 | ~spl34_90),
23.53/3.35	  inference(avatar_split_clause,[],[f1664,f1606,f144,f113,f1602])).
23.53/3.35	thf(f1664,plain,(
23.53/3.35	  ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_3 | ~spl34_6 | ~spl34_90)),
23.53/3.35	  inference(subsumption_resolution,[],[f1663,f1273])).
23.53/3.35	thf(f1663,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_6 | ~spl34_90)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1662])).
23.53/3.35	thf(f1662,plain,(
23.53/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_6 | ~spl34_90)),
23.53/3.35	  inference(superposition,[],[f1657,f146])).
23.53/3.35	thf(f1657,plain,(
23.53/3.35	  ( ! [X2 : a,X3 : a] : (($true != (((sP3 @ sK27) @ X2) @ X3)) | ($true = (((sK9 @ sK26) @ sK27) @ X3)) | ($true = ((sK27 @ X2) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ X2)))) ) | ~spl34_90),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1654])).
23.53/3.35	thf(f1654,plain,(
23.53/3.35	  ( ! [X2 : a,X3 : a] : (($true != $true) | ($true = ((sK27 @ X2) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ X2))) | ($true = (((sK9 @ sK26) @ sK27) @ X3)) | ($true != (((sP3 @ sK27) @ X2) @ X3))) ) | ~spl34_90),
23.53/3.35	  inference(superposition,[],[f75,f1608])).
23.53/3.35	thf(f75,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X0 : a,X3 : a > $o,X1 : a] : (($true != (X3 @ ((sK18 @ X3) @ X2))) | ($true = ((X2 @ X1) @ (((sK16 @ X3) @ X2) @ X1))) | ($true = (X3 @ X0)) | ($true != (((sP3 @ X2) @ X1) @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f35])).
23.53/3.35	thf(f1651,plain,(
23.53/3.35	  spl34_90 | ~spl34_3 | ~spl34_82 | ~spl34_83),
23.53/3.35	  inference(avatar_split_clause,[],[f1644,f1542,f1538,f113,f1606])).
23.53/3.35	thf(f1538,plain,(
23.53/3.35	  spl34_82 <=> ($true = (((sK9 @ sK26) @ sK27) @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_82])])).
23.53/3.35	thf(f1644,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | (~spl34_3 | ~spl34_82 | ~spl34_83)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1635])).
23.53/3.35	thf(f1635,plain,(
23.53/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | (~spl34_3 | ~spl34_82 | ~spl34_83)),
23.53/3.35	  inference(superposition,[],[f1550,f1544])).
23.53/3.35	thf(f1544,plain,(
23.53/3.35	  ($true = ((sK27 @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27)) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ~spl34_83),
23.53/3.35	  inference(avatar_component_clause,[],[f1542])).
23.53/3.35	thf(f1550,plain,(
23.53/3.35	  ( ! [X1 : a] : (($true != ((sK27 @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27)) @ X1)) | ($true = (((sK9 @ sK26) @ sK27) @ X1))) ) | (~spl34_3 | ~spl34_82)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1549])).
23.53/3.35	thf(f1549,plain,(
23.53/3.35	  ( ! [X1 : a] : (($true != $true) | ($true != ((sK27 @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27)) @ X1)) | ($true = (((sK9 @ sK26) @ sK27) @ X1))) ) | (~spl34_3 | ~spl34_82)),
23.53/3.35	  inference(superposition,[],[f1274,f1540])).
23.53/3.35	thf(f1540,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ~spl34_82),
23.53/3.35	  inference(avatar_component_clause,[],[f1538])).
23.53/3.35	thf(f1274,plain,(
23.53/3.35	  ( ! [X4 : a,X5 : a] : (($true != (((sK9 @ sK26) @ sK27) @ X4)) | ($true != ((sK27 @ X4) @ X5)) | ($true = (((sK9 @ sK26) @ sK27) @ X5))) ) | ~spl34_3),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1271])).
23.53/3.35	thf(f1271,plain,(
23.53/3.35	  ( ! [X4 : a,X5 : a] : (($true != $true) | ($true != (((sK9 @ sK26) @ sK27) @ X4)) | ($true != ((sK27 @ X4) @ X5)) | ($true = (((sK9 @ sK26) @ sK27) @ X5))) ) | ~spl34_3),
23.53/3.35	  inference(superposition,[],[f59,f115])).
23.53/3.35	thf(f59,plain,(
23.53/3.35	  ( ! [X6 : a,X0 : a > a > $o,X5 : a,X1 : a > a > $o] : (($true != ((sP6 @ X1) @ X0)) | ($true != (((sK9 @ X1) @ X0) @ X5)) | (((X0 @ X5) @ X6) != $true) | ($true = (((sK9 @ X1) @ X0) @ X6))) )),
23.53/3.35	  inference(cnf_transformation,[],[f20])).
23.53/3.35	thf(f1609,plain,(
23.53/3.35	  spl34_89 | spl34_90 | ~spl34_3 | ~spl34_6 | ~spl34_82),
23.53/3.35	  inference(avatar_split_clause,[],[f1600,f1538,f144,f113,f1606,f1602])).
23.53/3.35	thf(f1600,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | (~spl34_3 | ~spl34_6 | ~spl34_82)),
23.53/3.35	  inference(subsumption_resolution,[],[f1588,f1273])).
23.53/3.35	thf(f1588,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_6 | ~spl34_82)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1579])).
23.53/3.35	thf(f1579,plain,(
23.53/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK18 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ ((sK9 @ sK26) @ sK27)) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_6 | ~spl34_82)),
23.53/3.35	  inference(superposition,[],[f1550,f1483])).
23.53/3.35	thf(f1483,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true = ((sK27 @ ((sK17 @ X0) @ sK27)) @ ((sK18 @ X0) @ sK27))) | ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ X0) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_6),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1468])).
23.53/3.35	thf(f1468,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ X0) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = ((sK27 @ ((sK17 @ X0) @ sK27)) @ ((sK18 @ X0) @ sK27))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_6),
23.53/3.35	  inference(superposition,[],[f73,f146])).
23.53/3.35	thf(f73,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X0 : a,X3 : a > $o,X1 : a] : (($true != (((sP3 @ X2) @ X1) @ X0)) | ($true = ((X2 @ X1) @ (((sK16 @ X3) @ X2) @ X1))) | ($true = ((X2 @ ((sK17 @ X3) @ X2)) @ ((sK18 @ X3) @ X2))) | ($true = (X3 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f35])).
23.53/3.35	thf(f1547,plain,(
23.53/3.35	  spl34_82 | ~spl34_3 | ~spl34_6),
23.53/3.35	  inference(avatar_split_clause,[],[f1546,f144,f113,f1538])).
23.53/3.35	thf(f1546,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | (~spl34_3 | ~spl34_6)),
23.53/3.35	  inference(subsumption_resolution,[],[f1531,f1273])).
23.53/3.35	thf(f1531,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_6)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1530])).
23.53/3.35	thf(f1530,plain,(
23.53/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_6)),
23.53/3.35	  inference(duplicate_literal_removal,[],[f1529])).
23.53/3.35	thf(f1529,plain,(
23.53/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK17 @ ((sK9 @ sK26) @ sK27)) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_6)),
23.53/3.35	  inference(superposition,[],[f1480,f1525])).
23.53/3.35	thf(f1525,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true = (((sK9 @ sK26) @ sK27) @ (((sK16 @ X0) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (X0 @ ((sK17 @ X0) @ sK27))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27)))) ) | (~spl34_3 | ~spl34_6)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1510])).
23.53/3.35	thf(f1510,plain,(
23.53/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ (((sK16 @ X0) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (X0 @ ((sK17 @ X0) @ sK27))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27)))) ) | (~spl34_3 | ~spl34_6)),
23.53/3.35	  inference(superposition,[],[f1277,f1482])).
23.53/3.35	thf(f1482,plain,(
23.53/3.35	  ( ! [X1 : a > $o] : (($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ X1) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (X1 @ ((sK17 @ X1) @ sK27))) | ($true = (X1 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_6),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1469])).
23.53/3.35	thf(f1469,plain,(
23.53/3.35	  ( ! [X1 : a > $o] : (($true != $true) | ($true = ((sK27 @ ((sK7 @ sK26) @ sK27)) @ (((sK16 @ X1) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (X1 @ ((sK17 @ X1) @ sK27))) | ($true = (X1 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_6),
23.53/3.35	  inference(superposition,[],[f74,f146])).
23.53/3.35	thf(f74,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X0 : a,X3 : a > $o,X1 : a] : (($true != (((sP3 @ X2) @ X1) @ X0)) | ($true = ((X2 @ X1) @ (((sK16 @ X3) @ X2) @ X1))) | ($true = (X3 @ ((sK17 @ X3) @ X2))) | ($true = (X3 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f35])).
23.53/3.35	thf(f1480,plain,(
23.53/3.35	  ( ! [X3 : a > $o] : (($true != (X3 @ (((sK16 @ X3) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (X3 @ ((sK17 @ X3) @ sK27))) | ($true = (X3 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_6),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1471])).
23.53/3.35	thf(f1471,plain,(
23.53/3.35	  ( ! [X3 : a > $o] : (($true != $true) | ($true != (X3 @ (((sK16 @ X3) @ sK27) @ ((sK7 @ sK26) @ sK27)))) | ($true = (X3 @ ((sK17 @ X3) @ sK27))) | ($true = (X3 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_6),
23.53/3.35	  inference(superposition,[],[f77,f146])).
23.53/3.35	thf(f77,plain,(
23.53/3.35	  ( ! [X2 : a > a > $o,X0 : a,X3 : a > $o,X1 : a] : (($true != (((sP3 @ X2) @ X1) @ X0)) | ($true != (X3 @ (((sK16 @ X3) @ X2) @ X1))) | ($true = (X3 @ ((sK17 @ X3) @ X2))) | ($true = (X3 @ X0))) )),
23.53/3.35	  inference(cnf_transformation,[],[f35])).
23.53/3.35	thf(f1455,plain,(
23.53/3.35	  spl34_6 | ~spl34_3 | ~spl34_33),
23.53/3.35	  inference(avatar_split_clause,[],[f1452,f589,f113,f144])).
23.53/3.35	thf(f589,plain,(
23.53/3.35	  spl34_33 <=> ! [X5 : a > a > $o,X4 : a] : (($true = (((sK9 @ sK26) @ sK27) @ X4)) | ($true != ((((sP4 @ X5) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ X4)) | ($true = (((sP3 @ X5) @ ((sK7 @ sK26) @ sK27)) @ X4)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_33])])).
23.53/3.35	thf(f1452,plain,(
23.53/3.35	  ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_33)),
23.53/3.35	  inference(subsumption_resolution,[],[f1451,f1273])).
23.53/3.35	thf(f1451,plain,(
23.53/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_33)),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1450])).
23.53/3.35	thf(f1450,plain,(
23.53/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_33)),
23.53/3.35	  inference(superposition,[],[f590,f1278])).
23.53/3.35	thf(f1278,plain,(
23.53/3.35	  ($true = ((((sP4 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ ((sK8 @ sK26) @ sK27))) | ~spl34_3),
23.53/3.35	  inference(trivial_inequality_removal,[],[f1267])).
23.53/3.35	thf(f1267,plain,(
23.53/3.35	  ($true != $true) | ($true = ((((sP4 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ ((sK8 @ sK26) @ sK27))) | ~spl34_3),
23.53/3.35	  inference(superposition,[],[f55,f115])).
23.53/3.35	thf(f55,plain,(
23.53/3.35	  ( ! [X0 : a > a > $o,X1 : a > a > $o] : (($true != ((sP6 @ X1) @ X0)) | ($true = ((((sP4 @ X0) @ ((sK7 @ X1) @ X0)) @ X1) @ ((sK8 @ X1) @ X0)))) )),
23.53/3.35	  inference(cnf_transformation,[],[f20])).
23.53/3.35	thf(f590,plain,(
23.53/3.35	  ( ! [X4 : a,X5 : a > a > $o] : (($true != ((((sP4 @ X5) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ X4)) | ($true = (((sK9 @ sK26) @ sK27) @ X4)) | ($true = (((sP3 @ X5) @ ((sK7 @ sK26) @ sK27)) @ X4))) ) | ~spl34_33),
23.53/3.35	  inference(avatar_component_clause,[],[f589])).
23.53/3.35	thf(f1445,plain,(
23.53/3.35	  spl34_33 | spl34_35 | ~spl34_3 | ~spl34_78),
23.53/3.35	  inference(avatar_split_clause,[],[f1422,f1325,f113,f598,f589])).
23.53/3.35	thf(f598,plain,(
23.53/3.35	  spl34_35 <=> ($true = ((sK26 @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26)) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26)))),
23.53/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_35])])).
23.53/3.35	thf(f1325,plain,(
23.53/3.35	  spl34_78 <=> ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26)))),
23.77/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_78])])).
23.77/3.35	thf(f1422,plain,(
23.77/3.35	  ( ! [X4 : a,X5 : a > a > $o] : (($true = ((sK26 @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26)) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ X4)) | ($true = (((sP3 @ X5) @ ((sK7 @ sK26) @ sK27)) @ X4)) | ($true != ((((sP4 @ X5) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ X4))) ) | (~spl34_3 | ~spl34_78)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1421])).
23.77/3.35	thf(f1421,plain,(
23.77/3.35	  ( ! [X4 : a,X5 : a > a > $o] : (($true != $true) | ($true = ((sK26 @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26)) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ X4)) | ($true = (((sP3 @ X5) @ ((sK7 @ sK26) @ sK27)) @ X4)) | ($true != ((((sP4 @ X5) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ X4))) ) | (~spl34_3 | ~spl34_78)),
23.77/3.35	  inference(superposition,[],[f70,f1354])).
23.77/3.35	thf(f1354,plain,(
23.77/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | (~spl34_3 | ~spl34_78)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1345])).
23.77/3.35	thf(f1345,plain,(
23.77/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | (~spl34_3 | ~spl34_78)),
23.77/3.35	  inference(superposition,[],[f1276,f1327])).
23.77/3.35	thf(f1327,plain,(
23.77/3.35	  ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ~spl34_78),
23.77/3.35	  inference(avatar_component_clause,[],[f1325])).
23.77/3.35	thf(f1276,plain,(
23.77/3.35	  ( ! [X1 : a] : (($true != ((sK26 @ ((sK7 @ sK26) @ sK27)) @ X1)) | ($true = (((sK9 @ sK26) @ sK27) @ X1))) ) | ~spl34_3),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1269])).
23.77/3.35	thf(f1269,plain,(
23.77/3.35	  ( ! [X1 : a] : (($true != $true) | ($true != ((sK26 @ ((sK7 @ sK26) @ sK27)) @ X1)) | ($true = (((sK9 @ sK26) @ sK27) @ X1))) ) | ~spl34_3),
23.77/3.35	  inference(superposition,[],[f57,f115])).
23.77/3.35	thf(f57,plain,(
23.77/3.35	  ( ! [X0 : a > a > $o,X7 : a,X1 : a > a > $o] : (($true != ((sP6 @ X1) @ X0)) | ($true != ((X1 @ ((sK7 @ X1) @ X0)) @ X7)) | ($true = (((sK9 @ X1) @ X0) @ X7))) )),
23.77/3.35	  inference(cnf_transformation,[],[f20])).
23.77/3.35	thf(f70,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a,X0 : a,X3 : a > a > $o,X1 : a > a > $o] : (($true != (X4 @ (((sK15 @ X4) @ X2) @ X1))) | ($true = ((X1 @ ((sK13 @ X4) @ X1)) @ ((sK14 @ X4) @ X1))) | ($true = (X4 @ X0)) | ($true = (((sP3 @ X3) @ X2) @ X0)) | ($true != ((((sP4 @ X3) @ X2) @ X1) @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f30])).
23.77/3.35	thf(f30,plain,(
23.77/3.35	  ! [X0 : a,X1 : a > a > $o,X2 : a,X3 : a > a > $o] : (! [X4 : a > $o] : (($true = (X4 @ X0)) | (($true != (X4 @ ((sK14 @ X4) @ X1))) & ($true = ((X1 @ ((sK13 @ X4) @ X1)) @ ((sK14 @ X4) @ X1))) & ($true = (X4 @ ((sK13 @ X4) @ X1)))) | (($true != (X4 @ (((sK15 @ X4) @ X2) @ X1))) & ($true = ((X1 @ X2) @ (((sK15 @ X4) @ X2) @ X1))))) | ($true = (((sP3 @ X3) @ X2) @ X0)) | ($true != ((((sP4 @ X3) @ X2) @ X1) @ X0)))),
23.77/3.35	  inference(skolemisation,[status(esa),new_symbols(skolem,[sK13,sK14,sK15])],[f27,f29,f28])).
23.77/3.35	thf(f28,plain,(
23.77/3.35	  ! [X1 : a > a > $o,X4 : a > $o] : (? [X5 : a,X6 : a] : (((X4 @ X6) != $true) & (((X1 @ X5) @ X6) = $true) & ((X4 @ X5) = $true)) => (($true != (X4 @ ((sK14 @ X4) @ X1))) & ($true = ((X1 @ ((sK13 @ X4) @ X1)) @ ((sK14 @ X4) @ X1))) & ($true = (X4 @ ((sK13 @ X4) @ X1)))))),
23.77/3.35	  introduced(choice_axiom,[])).
23.77/3.35	thf(f29,plain,(
23.77/3.35	  ! [X1 : a > a > $o,X2 : a,X4 : a > $o] : (? [X7 : a] : (((X4 @ X7) != $true) & (((X1 @ X2) @ X7) = $true)) => (($true != (X4 @ (((sK15 @ X4) @ X2) @ X1))) & ($true = ((X1 @ X2) @ (((sK15 @ X4) @ X2) @ X1)))))),
23.77/3.35	  introduced(choice_axiom,[])).
23.77/3.35	thf(f27,plain,(
23.77/3.35	  ! [X0 : a,X1 : a > a > $o,X2 : a,X3 : a > a > $o] : (! [X4 : a > $o] : (($true = (X4 @ X0)) | ? [X5 : a,X6 : a] : (((X4 @ X6) != $true) & (((X1 @ X5) @ X6) = $true) & ((X4 @ X5) = $true)) | ? [X7 : a] : (((X4 @ X7) != $true) & (((X1 @ X2) @ X7) = $true))) | ($true = (((sP3 @ X3) @ X2) @ X0)) | ($true != ((((sP4 @ X3) @ X2) @ X1) @ X0)))),
23.77/3.35	  inference(rectify,[],[f26])).
23.77/3.35	thf(f26,plain,(
23.77/3.35	  ! [X5 : a,X0 : a > a > $o,X4 : a,X1 : a > a > $o] : (! [X6 : a > $o] : (($true = (X6 @ X5)) | ? [X7 : a,X8 : a] : (($true != (X6 @ X8)) & ($true = ((X0 @ X7) @ X8)) & ($true = (X6 @ X7))) | ? [X9 : a] : (($true != (X6 @ X9)) & ($true = ((X0 @ X4) @ X9)))) | ($true = (((sP3 @ X1) @ X4) @ X5)) | ($true != ((((sP4 @ X1) @ X4) @ X0) @ X5)))),
23.77/3.35	  inference(nnf_transformation,[],[f12])).
23.77/3.35	thf(f1444,plain,(
23.77/3.35	  spl34_79 | ~spl34_3 | ~spl34_34 | ~spl34_35),
23.77/3.35	  inference(avatar_split_clause,[],[f1417,f598,f592,f113,f1329])).
23.77/3.35	thf(f1329,plain,(
23.77/3.35	  spl34_79 <=> ($true = (((sK9 @ sK26) @ sK27) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26)))),
23.77/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_79])])).
23.77/3.35	thf(f592,plain,(
23.77/3.35	  spl34_34 <=> ($true = (((sK9 @ sK26) @ sK27) @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26)))),
23.77/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_34])])).
23.77/3.35	thf(f1417,plain,(
23.77/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | (~spl34_3 | ~spl34_34 | ~spl34_35)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1406])).
23.77/3.35	thf(f1406,plain,(
23.77/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | (~spl34_3 | ~spl34_34 | ~spl34_35)),
23.77/3.35	  inference(superposition,[],[f1284,f600])).
23.77/3.35	thf(f600,plain,(
23.77/3.35	  ($true = ((sK26 @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26)) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ~spl34_35),
23.77/3.35	  inference(avatar_component_clause,[],[f598])).
23.77/3.35	thf(f1284,plain,(
23.77/3.35	  ( ! [X0 : a] : (($true != ((sK26 @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26)) @ X0)) | ($true = (((sK9 @ sK26) @ sK27) @ X0))) ) | (~spl34_3 | ~spl34_34)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1281])).
23.77/3.35	thf(f1281,plain,(
23.77/3.35	  ( ! [X0 : a] : (($true != $true) | ($true != ((sK26 @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26)) @ X0)) | ($true = (((sK9 @ sK26) @ sK27) @ X0))) ) | (~spl34_3 | ~spl34_34)),
23.77/3.35	  inference(superposition,[],[f1275,f594])).
23.77/3.35	thf(f594,plain,(
23.77/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ~spl34_34),
23.77/3.35	  inference(avatar_component_clause,[],[f592])).
23.77/3.35	thf(f1275,plain,(
23.77/3.35	  ( ! [X2 : a,X3 : a] : (($true != (((sK9 @ sK26) @ sK27) @ X2)) | ($true != ((sK26 @ X2) @ X3)) | ($true = (((sK9 @ sK26) @ sK27) @ X3))) ) | ~spl34_3),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1270])).
23.77/3.35	thf(f1270,plain,(
23.77/3.35	  ( ! [X2 : a,X3 : a] : (($true != $true) | ($true != (((sK9 @ sK26) @ sK27) @ X2)) | ($true != ((sK26 @ X2) @ X3)) | ($true = (((sK9 @ sK26) @ sK27) @ X3))) ) | ~spl34_3),
23.77/3.35	  inference(superposition,[],[f58,f115])).
23.77/3.35	thf(f58,plain,(
23.77/3.35	  ( ! [X6 : a,X0 : a > a > $o,X5 : a,X1 : a > a > $o] : (($true != ((sP6 @ X1) @ X0)) | ($true != (((sK9 @ X1) @ X0) @ X5)) | (((X1 @ X5) @ X6) != $true) | ($true = (((sK9 @ X1) @ X0) @ X6))) )),
23.77/3.35	  inference(cnf_transformation,[],[f20])).
23.77/3.35	thf(f1443,plain,(
23.77/3.35	  ~spl34_3 | spl34_6 | ~spl34_78 | ~spl34_79),
23.77/3.35	  inference(avatar_contradiction_clause,[],[f1442])).
23.77/3.35	thf(f1442,plain,(
23.77/3.35	  $false | (~spl34_3 | spl34_6 | ~spl34_78 | ~spl34_79)),
23.77/3.35	  inference(subsumption_resolution,[],[f1441,f1273])).
23.77/3.35	thf(f1441,plain,(
23.77/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | spl34_6 | ~spl34_78 | ~spl34_79)),
23.77/3.35	  inference(subsumption_resolution,[],[f1440,f145])).
23.77/3.35	thf(f145,plain,(
23.77/3.35	  ($true != (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | spl34_6),
23.77/3.35	  inference(avatar_component_clause,[],[f144])).
23.77/3.35	thf(f1440,plain,(
23.77/3.35	  ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_78 | ~spl34_79)),
23.77/3.35	  inference(subsumption_resolution,[],[f1439,f1354])).
23.77/3.35	thf(f1439,plain,(
23.77/3.35	  ($true != (((sK9 @ sK26) @ sK27) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_79)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1438])).
23.77/3.35	thf(f1438,plain,(
23.77/3.35	  ($true != $true) | ($true != (((sK9 @ sK26) @ sK27) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_79)),
23.77/3.35	  inference(superposition,[],[f1368,f1278])).
23.77/3.35	thf(f1368,plain,(
23.77/3.35	  ( ! [X6 : a,X7 : a > a > $o,X5 : a] : (($true != ((((sP4 @ X7) @ X6) @ sK26) @ X5)) | ($true != (((sK9 @ sK26) @ sK27) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ X6) @ sK26))) | ($true = (((sP3 @ X7) @ X6) @ X5)) | ($true = (((sK9 @ sK26) @ sK27) @ X5))) ) | ~spl34_79),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1367])).
23.77/3.35	thf(f1367,plain,(
23.77/3.35	  ( ! [X6 : a,X7 : a > a > $o,X5 : a] : (($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ X5)) | ($true != (((sK9 @ sK26) @ sK27) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ X6) @ sK26))) | ($true = (((sP3 @ X7) @ X6) @ X5)) | ($true != ((((sP4 @ X7) @ X6) @ sK26) @ X5))) ) | ~spl34_79),
23.77/3.35	  inference(superposition,[],[f72,f1331])).
23.77/3.35	thf(f1331,plain,(
23.77/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ~spl34_79),
23.77/3.35	  inference(avatar_component_clause,[],[f1329])).
23.77/3.35	thf(f72,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a,X0 : a,X3 : a > a > $o,X1 : a > a > $o] : (($true != (X4 @ ((sK14 @ X4) @ X1))) | ($true = (X4 @ X0)) | ($true != (X4 @ (((sK15 @ X4) @ X2) @ X1))) | ($true = (((sP3 @ X3) @ X2) @ X0)) | ($true != ((((sP4 @ X3) @ X2) @ X1) @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f30])).
23.77/3.35	thf(f1405,plain,(
23.77/3.35	  spl34_78 | ~spl34_3 | spl34_6 | ~spl34_79),
23.77/3.35	  inference(avatar_split_clause,[],[f1404,f1329,f144,f113,f1325])).
23.77/3.35	thf(f1404,plain,(
23.77/3.35	  ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | (~spl34_3 | spl34_6 | ~spl34_79)),
23.77/3.35	  inference(subsumption_resolution,[],[f1403,f1273])).
23.77/3.35	thf(f1403,plain,(
23.77/3.35	  ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | spl34_6 | ~spl34_79)),
23.77/3.35	  inference(subsumption_resolution,[],[f1398,f145])).
23.77/3.35	thf(f1398,plain,(
23.77/3.35	  ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_79)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1397])).
23.77/3.35	thf(f1397,plain,(
23.77/3.35	  ($true != $true) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | (~spl34_3 | ~spl34_79)),
23.77/3.35	  inference(superposition,[],[f1369,f1278])).
23.77/3.35	thf(f1369,plain,(
23.77/3.35	  ( ! [X4 : a > a > $o,X2 : a,X3 : a] : (($true != ((((sP4 @ X4) @ X3) @ sK26) @ X2)) | ($true = ((sK26 @ X3) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ X3) @ sK26))) | ($true = (((sP3 @ X4) @ X3) @ X2)) | ($true = (((sK9 @ sK26) @ sK27) @ X2))) ) | ~spl34_79),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1366])).
23.77/3.35	thf(f1366,plain,(
23.77/3.35	  ( ! [X4 : a > a > $o,X2 : a,X3 : a] : (($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ X2)) | ($true = ((sK26 @ X3) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ X3) @ sK26))) | ($true = (((sP3 @ X4) @ X3) @ X2)) | ($true != ((((sP4 @ X4) @ X3) @ sK26) @ X2))) ) | ~spl34_79),
23.77/3.35	  inference(superposition,[],[f71,f1331])).
23.77/3.35	thf(f71,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a,X0 : a,X3 : a > a > $o,X1 : a > a > $o] : (($true != (X4 @ ((sK14 @ X4) @ X1))) | ($true = (X4 @ X0)) | ($true = ((X1 @ X2) @ (((sK15 @ X4) @ X2) @ X1))) | ($true = (((sP3 @ X3) @ X2) @ X0)) | ($true != ((((sP4 @ X3) @ X2) @ X1) @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f30])).
23.77/3.35	thf(f1332,plain,(
23.77/3.35	  spl34_78 | spl34_79 | ~spl34_3 | ~spl34_8 | ~spl34_34),
23.77/3.35	  inference(avatar_split_clause,[],[f1323,f592,f152,f113,f1329,f1325])).
23.77/3.35	thf(f152,plain,(
23.77/3.35	  spl34_8 <=> ! [X1 : a > $o] : (($true = ((sK26 @ ((sK13 @ X1) @ sK26)) @ ((sK14 @ X1) @ sK26))) | ($true = (X1 @ ((sK8 @ sK26) @ sK27))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ X1) @ ((sK7 @ sK26) @ sK27)) @ sK26))))),
23.77/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_8])])).
23.77/3.35	thf(f1323,plain,(
23.77/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | (~spl34_3 | ~spl34_8 | ~spl34_34)),
23.77/3.35	  inference(subsumption_resolution,[],[f1322,f1273])).
23.77/3.35	thf(f1322,plain,(
23.77/3.35	  ($true = (((sK9 @ sK26) @ sK27) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | (~spl34_3 | ~spl34_8 | ~spl34_34)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1321])).
23.77/3.35	thf(f1321,plain,(
23.77/3.35	  ($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK14 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ ((sK9 @ sK26) @ sK27)) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | (~spl34_3 | ~spl34_8 | ~spl34_34)),
23.77/3.35	  inference(superposition,[],[f1284,f153])).
23.77/3.35	thf(f153,plain,(
23.77/3.35	  ( ! [X1 : a > $o] : (($true = ((sK26 @ ((sK13 @ X1) @ sK26)) @ ((sK14 @ X1) @ sK26))) | ($true = (X1 @ ((sK8 @ sK26) @ sK27))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ X1) @ ((sK7 @ sK26) @ sK27)) @ sK26)))) ) | ~spl34_8),
23.77/3.35	  inference(avatar_component_clause,[],[f152])).
23.77/3.35	thf(f1266,plain,(
23.77/3.35	  ~spl34_2 | ~spl34_75 | spl34_77),
23.77/3.35	  inference(avatar_contradiction_clause,[],[f1265])).
23.77/3.35	thf(f1265,plain,(
23.77/3.35	  $false | (~spl34_2 | ~spl34_75 | spl34_77)),
23.77/3.35	  inference(subsumption_resolution,[],[f1264,f1232])).
23.77/3.35	thf(f1264,plain,(
23.77/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_2 | ~spl34_75)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1263])).
23.77/3.35	thf(f1263,plain,(
23.77/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_2 | ~spl34_75)),
23.77/3.35	  inference(superposition,[],[f1252,f111])).
23.77/3.35	thf(f1252,plain,(
23.77/3.35	  ( ! [X0 : a > a > $o,X1 : a] : (($true != ((((sP2 @ sK30) @ sK26) @ X0) @ X1)) | ($true = (((((sK19 @ sK30) @ sK26) @ X0) @ X1) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30)))) ) | ~spl34_75),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1245])).
23.77/3.35	thf(f1245,plain,(
23.77/3.35	  ( ! [X0 : a > a > $o,X1 : a] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ X0) @ X1) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true != ((((sP2 @ sK30) @ sK26) @ X0) @ X1))) ) | ~spl34_75),
23.77/3.35	  inference(superposition,[],[f79,f1180])).
23.77/3.35	thf(f1180,plain,(
23.77/3.35	  ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ~spl34_75),
23.77/3.35	  inference(avatar_component_clause,[],[f1178])).
23.77/3.35	thf(f79,plain,(
23.77/3.35	  ( ! [X2 : a > a > $o,X0 : a,X7 : a,X3 : a,X1 : a > a > $o] : (($true != ((X2 @ X3) @ X7)) | ($true = (((((sK19 @ X3) @ X2) @ X1) @ X0) @ X7)) | ($true != ((((sP2 @ X3) @ X2) @ X1) @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f39])).
23.77/3.35	thf(f1244,plain,(
23.77/3.35	  spl34_74 | spl34_69 | spl34_75 | ~spl34_4 | ~spl34_76),
23.77/3.35	  inference(avatar_split_clause,[],[f1241,f1182,f118,f1178,f1132,f1174])).
23.77/3.35	thf(f1241,plain,(
23.77/3.35	  ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_4 | ~spl34_76)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1240])).
23.77/3.35	thf(f1240,plain,(
23.77/3.35	  ($true != $true) | ($true = ((sK26 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ($true = ((sK27 @ sK30) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_4 | ~spl34_76)),
23.77/3.35	  inference(superposition,[],[f1222,f120])).
23.77/3.35	thf(f1222,plain,(
23.77/3.35	  ( ! [X10 : a,X11 : a] : (($true != ((((sP1 @ sK26) @ sK27) @ X10) @ X11)) | ($true = ((sK26 @ X10) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ X10))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ X11)) | ($true = ((sK27 @ X10) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ X10)))) ) | ~spl34_76),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1219])).
23.77/3.35	thf(f1219,plain,(
23.77/3.35	  ( ! [X10 : a,X11 : a] : (($true != $true) | ($true = ((sK27 @ X10) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ X10))) | ($true = ((sK26 @ X10) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ X10))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ X11)) | ($true != ((((sP1 @ sK26) @ sK27) @ X10) @ X11))) ) | ~spl34_76),
23.77/3.35	  inference(superposition,[],[f86,f1184])).
23.77/3.35	thf(f1184,plain,(
23.77/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ~spl34_76),
23.77/3.35	  inference(avatar_component_clause,[],[f1182])).
23.77/3.35	thf(f86,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != (X4 @ (((sK22 @ X4) @ X3) @ X2))) | ($true = ((X2 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ X0)) | ($true != ((((sP1 @ X3) @ X2) @ X1) @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f44])).
23.77/3.35	thf(f1233,plain,(
23.77/3.35	  ~spl34_77 | spl34_69 | ~spl34_4 | ~spl34_76),
23.77/3.35	  inference(avatar_split_clause,[],[f1228,f1182,f118,f1132,f1230])).
23.77/3.35	thf(f1228,plain,(
23.77/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_4 | ~spl34_76)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1227])).
23.77/3.35	thf(f1227,plain,(
23.77/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_4 | ~spl34_76)),
23.77/3.35	  inference(superposition,[],[f1221,f120])).
23.77/3.35	thf(f1221,plain,(
23.77/3.35	  ( ! [X12 : a,X13 : a] : (($true != ((((sP1 @ sK26) @ sK27) @ X12) @ X13)) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ X13)) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ X12)))) ) | ~spl34_76),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1220])).
23.77/3.35	thf(f1220,plain,(
23.77/3.35	  ( ! [X12 : a,X13 : a] : (($true != $true) | ($true != (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ X12))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ X13)) | ($true != ((((sP1 @ sK26) @ sK27) @ X12) @ X13))) ) | ~spl34_76),
23.77/3.35	  inference(superposition,[],[f89,f1184])).
23.77/3.35	thf(f89,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != (X4 @ (((sK22 @ X4) @ X3) @ X2))) | ($true != (X4 @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ X0)) | ($true != ((((sP1 @ X3) @ X2) @ X1) @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f44])).
23.77/3.35	thf(f1210,plain,(
23.77/3.35	  spl34_69 | spl34_70 | spl34_71 | ~spl34_2 | ~spl34_4 | ~spl34_75),
23.77/3.35	  inference(avatar_split_clause,[],[f1205,f1178,f118,f109,f1140,f1136,f1132])).
23.77/3.35	thf(f1205,plain,(
23.77/3.35	  ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK26 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4 | ~spl34_75)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1202])).
23.77/3.35	thf(f1202,plain,(
23.77/3.35	  ($true != $true) | ($true = ((sK27 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = ((sK26 @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27)) @ (((sK22 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4 | ~spl34_75)),
23.77/3.35	  inference(superposition,[],[f969,f1197])).
23.77/3.35	thf(f1197,plain,(
23.77/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_2 | ~spl34_75)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1196])).
23.77/3.35	thf(f1196,plain,(
23.77/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | (~spl34_2 | ~spl34_75)),
23.77/3.35	  inference(superposition,[],[f1193,f111])).
23.77/3.35	thf(f1193,plain,(
23.77/3.35	  ( ! [X0 : a > a > $o,X1 : a] : (($true != ((((sP2 @ sK30) @ sK26) @ X0) @ X1)) | ($true = (((((sK19 @ sK30) @ sK26) @ X0) @ X1) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30)))) ) | ~spl34_75),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1186])).
23.77/3.35	thf(f1186,plain,(
23.77/3.35	  ( ! [X0 : a > a > $o,X1 : a] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ X0) @ X1) @ ((((sK20 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27) @ sK30))) | ($true != ((((sP2 @ sK30) @ sK26) @ X0) @ X1))) ) | ~spl34_75),
23.77/3.35	  inference(superposition,[],[f79,f1180])).
23.77/3.35	thf(f1144,plain,(
23.77/3.35	  spl34_69 | spl34_68 | ~spl34_2 | ~spl34_4),
23.77/3.35	  inference(avatar_split_clause,[],[f1120,f118,f109,f1128,f1132])).
23.77/3.35	thf(f1120,plain,(
23.77/3.35	  ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1119])).
23.77/3.35	thf(f1119,plain,(
23.77/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(duplicate_literal_removal,[],[f1118])).
23.77/3.35	thf(f1118,plain,(
23.77/3.35	  ($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ (((sK21 @ ((((sK19 @ sK30) @ sK26) @ sK27) @ sK32)) @ sK26) @ sK27))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ sK31)) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(superposition,[],[f968,f1112])).
23.77/3.35	thf(f1112,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (X0 @ (((sK21 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1111])).
23.77/3.35	thf(f1111,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (X0 @ (((sK21 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(duplicate_literal_removal,[],[f1110])).
23.77/3.35	thf(f1110,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (X0 @ (((sK21 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(superposition,[],[f1075,f111])).
23.77/3.35	thf(f1075,plain,(
23.77/3.35	  ( ! [X2 : a,X0 : a > $o,X1 : a > a > $o] : (($true != ((((sP2 @ sK30) @ sK26) @ X1) @ X2)) | ($true = (((((sK19 @ sK30) @ sK26) @ X1) @ X2) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (X0 @ (((sK21 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1062])).
23.77/3.35	thf(f1062,plain,(
23.77/3.35	  ( ! [X2 : a,X0 : a > $o,X1 : a > a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ X1) @ X2) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true != ((((sP2 @ sK30) @ sK26) @ X1) @ X2)) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (X0 @ (((sK21 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(superposition,[],[f79,f1061])).
23.77/3.35	thf(f1061,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true = ((sK26 @ sK30) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (X0 @ (((sK21 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1060])).
23.77/3.35	thf(f1060,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ sK26) @ sK27) @ sK32) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X0) @ sK26) @ sK27) @ sK30))) | ($true = (X0 @ (((sK21 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK31))) ) | (~spl34_2 | ~spl34_4)),
23.77/3.35	  inference(superposition,[],[f1020,f111])).
23.77/3.35	thf(f1020,plain,(
23.77/3.35	  ( ! [X4 : a > a > $o,X5 : a,X3 : a > $o] : (($true != ((((sP2 @ sK30) @ X4) @ sK27) @ X5)) | ($true = (((((sK19 @ sK30) @ X4) @ sK27) @ X5) @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = (X3 @ (((sK21 @ X3) @ sK26) @ sK27))) | ($true = (X3 @ sK31))) ) | ~spl34_4),
23.77/3.35	  inference(trivial_inequality_removal,[],[f1012])).
23.77/3.35	thf(f1012,plain,(
23.77/3.35	  ( ! [X4 : a > a > $o,X5 : a,X3 : a > $o] : (($true != $true) | ($true = (((((sK19 @ sK30) @ X4) @ sK27) @ X5) @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true != ((((sP2 @ sK30) @ X4) @ sK27) @ X5)) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = (X3 @ (((sK21 @ X3) @ sK26) @ sK27))) | ($true = (X3 @ sK31))) ) | ~spl34_4),
23.77/3.35	  inference(superposition,[],[f80,f970])).
23.77/3.35	thf(f970,plain,(
23.77/3.35	  ( ! [X1 : a > $o] : (($true = ((sK27 @ sK30) @ ((((sK20 @ X1) @ sK26) @ sK27) @ sK30))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X1) @ sK26) @ sK27) @ sK30))) | ($true = (X1 @ (((sK21 @ X1) @ sK26) @ sK27))) | ($true = (X1 @ sK31))) ) | ~spl34_4),
23.77/3.35	  inference(trivial_inequality_removal,[],[f957])).
23.77/3.35	thf(f957,plain,(
23.77/3.35	  ( ! [X1 : a > $o] : (($true != $true) | ($true = ((sK27 @ sK30) @ ((((sK20 @ X1) @ sK26) @ sK27) @ sK30))) | ($true = ((sK26 @ sK30) @ ((((sK20 @ X1) @ sK26) @ sK27) @ sK30))) | ($true = (X1 @ (((sK21 @ X1) @ sK26) @ sK27))) | ($true = (X1 @ sK31))) ) | ~spl34_4),
23.77/3.35	  inference(superposition,[],[f85,f120])).
23.77/3.35	thf(f85,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP1 @ X3) @ X2) @ X1) @ X0)) | ($true = ((X2 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ (((sK21 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f44])).
23.77/3.35	thf(f968,plain,(
23.77/3.35	  ( ! [X3 : a > $o] : (($true != (X3 @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = (X3 @ (((sK21 @ X3) @ sK26) @ sK27))) | ($true = (X3 @ sK31))) ) | ~spl34_4),
23.77/3.35	  inference(trivial_inequality_removal,[],[f959])).
23.77/3.35	thf(f959,plain,(
23.77/3.35	  ( ! [X3 : a > $o] : (($true != $true) | ($true != (X3 @ ((((sK20 @ X3) @ sK26) @ sK27) @ sK30))) | ($true = (X3 @ (((sK21 @ X3) @ sK26) @ sK27))) | ($true = (X3 @ sK31))) ) | ~spl34_4),
23.77/3.35	  inference(superposition,[],[f88,f120])).
23.77/3.35	thf(f88,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP1 @ X3) @ X2) @ X1) @ X0)) | ($true != (X4 @ ((((sK20 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ (((sK21 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f44])).
23.77/3.35	thf(f955,plain,(
23.77/3.35	  spl34_53 | ~spl34_1 | spl34_52 | ~spl34_54),
23.77/3.35	  inference(avatar_split_clause,[],[f954,f830,f822,f105,f826])).
23.77/3.35	thf(f954,plain,(
23.77/3.35	  ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | spl34_52 | ~spl34_54)),
23.77/3.35	  inference(subsumption_resolution,[],[f953,f823])).
23.77/3.35	thf(f823,plain,(
23.77/3.35	  ($true != ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | spl34_52),
23.77/3.35	  inference(avatar_component_clause,[],[f822])).
23.77/3.35	thf(f953,plain,(
23.77/3.35	  ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.77/3.35	  inference(subsumption_resolution,[],[f952,f100])).
23.77/3.35	thf(f952,plain,(
23.77/3.35	  ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = (sK33 @ sK29)) | ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f951])).
23.77/3.35	thf(f951,plain,(
23.77/3.35	  ($true != $true) | ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = (sK33 @ sK29)) | ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.77/3.35	  inference(superposition,[],[f935,f107])).
23.77/3.35	thf(f935,plain,(
23.77/3.35	  ( ! [X2 : a,X3 : a] : (($true != ((((sP5 @ sK26) @ sK27) @ X2) @ X3)) | ($true = ((sK26 @ X2) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ X2))) | ($true = (sK33 @ X3)) | ($true = ((sK27 @ X2) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ X2)))) ) | ~spl34_54),
23.77/3.35	  inference(trivial_inequality_removal,[],[f932])).
23.77/3.35	thf(f932,plain,(
23.77/3.35	  ( ! [X2 : a,X3 : a] : (($true != $true) | ($true = ((sK27 @ X2) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ X2))) | ($true = ((sK26 @ X2) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ X2))) | ($true = (sK33 @ X3)) | ($true != ((((sP5 @ sK26) @ sK27) @ X2) @ X3))) ) | ~spl34_54),
23.77/3.35	  inference(superposition,[],[f63,f832])).
23.77/3.35	thf(f63,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != (X4 @ (((sK12 @ X4) @ X3) @ X2))) | ($true = ((X2 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ X0)) | ($true != ((((sP5 @ X3) @ X2) @ X1) @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f25])).
23.77/3.35	thf(f942,plain,(
23.77/3.35	  ~spl34_1 | ~spl34_52 | ~spl34_54),
23.77/3.35	  inference(avatar_contradiction_clause,[],[f941])).
23.77/3.35	thf(f941,plain,(
23.77/3.35	  $false | (~spl34_1 | ~spl34_52 | ~spl34_54)),
23.77/3.35	  inference(subsumption_resolution,[],[f940,f844])).
23.77/3.35	thf(f940,plain,(
23.77/3.35	  ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.77/3.35	  inference(subsumption_resolution,[],[f939,f100])).
23.77/3.35	thf(f939,plain,(
23.77/3.35	  ($true = (sK33 @ sK29)) | ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f938])).
23.77/3.35	thf(f938,plain,(
23.77/3.35	  ($true != $true) | ($true = (sK33 @ sK29)) | ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | (~spl34_1 | ~spl34_54)),
23.77/3.35	  inference(superposition,[],[f934,f107])).
23.77/3.35	thf(f934,plain,(
23.77/3.35	  ( ! [X4 : a,X5 : a] : (($true != ((((sP5 @ sK26) @ sK27) @ X4) @ X5)) | ($true = (sK33 @ X5)) | ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ X4)))) ) | ~spl34_54),
23.77/3.35	  inference(trivial_inequality_removal,[],[f933])).
23.77/3.35	thf(f933,plain,(
23.77/3.35	  ( ! [X4 : a,X5 : a] : (($true != $true) | ($true != (sK33 @ ((((sK10 @ sK33) @ sK26) @ sK27) @ X4))) | ($true = (sK33 @ X5)) | ($true != ((((sP5 @ sK26) @ sK27) @ X4) @ X5))) ) | ~spl34_54),
23.77/3.35	  inference(superposition,[],[f66,f832])).
23.77/3.35	thf(f929,plain,(
23.77/3.35	  spl34_54 | ~spl34_1 | ~spl34_56),
23.77/3.35	  inference(avatar_split_clause,[],[f928,f861,f105,f830])).
23.77/3.35	thf(f861,plain,(
23.77/3.35	  spl34_56 <=> ($true = ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27)))),
23.77/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_56])])).
23.77/3.35	thf(f928,plain,(
23.77/3.35	  ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_56)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f919])).
23.77/3.35	thf(f919,plain,(
23.77/3.35	  ($true != $true) | ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_56)),
23.77/3.35	  inference(superposition,[],[f733,f863])).
23.77/3.35	thf(f863,plain,(
23.77/3.35	  ($true = ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ~spl34_56),
23.77/3.35	  inference(avatar_component_clause,[],[f861])).
23.77/3.35	thf(f733,plain,(
23.77/3.35	  ( ! [X0 : a] : (($true != ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ X0)) | ($true = (sK33 @ X0))) ) | ~spl34_1),
23.77/3.35	  inference(trivial_inequality_removal,[],[f730])).
23.77/3.35	thf(f730,plain,(
23.77/3.35	  ( ! [X0 : a] : (($true != $true) | ($true = (sK33 @ X0)) | ($true != ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ X0))) ) | ~spl34_1),
23.77/3.35	  inference(superposition,[],[f97,f728])).
23.77/3.35	thf(f728,plain,(
23.77/3.35	  ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ~spl34_1),
23.77/3.35	  inference(subsumption_resolution,[],[f725,f100])).
23.77/3.35	thf(f725,plain,(
23.77/3.35	  ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | ~spl34_1),
23.77/3.35	  inference(trivial_inequality_removal,[],[f724])).
23.77/3.35	thf(f724,plain,(
23.77/3.35	  ($true != $true) | ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | ~spl34_1),
23.77/3.35	  inference(duplicate_literal_removal,[],[f723])).
23.77/3.35	thf(f723,plain,(
23.77/3.35	  ($true != $true) | ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | ($true = (sK33 @ (((sK11 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | ~spl34_1),
23.77/3.35	  inference(superposition,[],[f614,f719])).
23.77/3.35	thf(f719,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true = (sK33 @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = (X0 @ (((sK11 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(subsumption_resolution,[],[f709,f98])).
23.77/3.35	thf(f709,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true = (sK33 @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = (X0 @ (((sK11 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(trivial_inequality_removal,[],[f697])).
23.77/3.35	thf(f697,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (sK33 @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = (X0 @ (((sK11 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(superposition,[],[f99,f616])).
23.77/3.35	thf(f616,plain,(
23.77/3.35	  ( ! [X1 : a > $o] : (($true = ((sK27 @ sK28) @ ((((sK10 @ X1) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ X1) @ sK26) @ sK27) @ sK28))) | ($true = (X1 @ (((sK11 @ X1) @ sK26) @ sK27))) | ($true = (X1 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(trivial_inequality_removal,[],[f603])).
23.77/3.35	thf(f603,plain,(
23.77/3.35	  ( ! [X1 : a > $o] : (($true != $true) | ($true = ((sK27 @ sK28) @ ((((sK10 @ X1) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ X1) @ sK26) @ sK27) @ sK28))) | ($true = (X1 @ (((sK11 @ X1) @ sK26) @ sK27))) | ($true = (X1 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(superposition,[],[f62,f107])).
23.77/3.35	thf(f62,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP5 @ X3) @ X2) @ X1) @ X0)) | ($true = ((X2 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = (X4 @ (((sK11 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f25])).
23.77/3.35	thf(f97,plain,(
23.77/3.35	  ( ! [X10 : a,X9 : a] : (($true != (sK33 @ X9)) | ($true = (sK33 @ X10)) | ($true != ((sK27 @ X9) @ X10))) )),
23.77/3.35	  inference(cnf_transformation,[],[f54])).
23.77/3.35	thf(f893,plain,(
23.77/3.35	  spl34_56 | spl34_57 | ~spl34_1 | ~spl34_53),
23.77/3.35	  inference(avatar_split_clause,[],[f892,f826,f105,f865,f861])).
23.77/3.35	thf(f892,plain,(
23.77/3.35	  ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_53)),
23.77/3.35	  inference(subsumption_resolution,[],[f889,f100])).
23.77/3.35	thf(f889,plain,(
23.77/3.35	  ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | (~spl34_1 | ~spl34_53)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f886])).
23.77/3.35	thf(f886,plain,(
23.77/3.35	  ($true != $true) | ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | (~spl34_1 | ~spl34_53)),
23.77/3.35	  inference(superposition,[],[f615,f882])).
23.77/3.35	thf(f615,plain,(
23.77/3.35	  ( ! [X2 : a > $o] : (($true != (X2 @ ((((sK10 @ X2) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ (((sK11 @ X2) @ sK26) @ sK27)) @ (((sK12 @ X2) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ X2) @ sK26) @ sK27)) @ (((sK12 @ X2) @ sK26) @ sK27))) | ($true = (X2 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(trivial_inequality_removal,[],[f604])).
23.77/3.35	thf(f604,plain,(
23.77/3.35	  ( ! [X2 : a > $o] : (($true != $true) | ($true != (X2 @ ((((sK10 @ X2) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ (((sK11 @ X2) @ sK26) @ sK27)) @ (((sK12 @ X2) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ X2) @ sK26) @ sK27)) @ (((sK12 @ X2) @ sK26) @ sK27))) | ($true = (X2 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(superposition,[],[f64,f107])).
23.77/3.35	thf(f64,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP5 @ X3) @ X2) @ X1) @ X0)) | ($true != (X4 @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ (((sK11 @ X4) @ X3) @ X2)) @ (((sK12 @ X4) @ X3) @ X2))) | ($true = ((X2 @ (((sK11 @ X4) @ X3) @ X2)) @ (((sK12 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f25])).
23.77/3.35	thf(f868,plain,(
23.77/3.35	  spl34_56 | spl34_57 | ~spl34_1 | ~spl34_52),
23.77/3.35	  inference(avatar_split_clause,[],[f859,f822,f105,f865,f861])).
23.77/3.35	thf(f859,plain,(
23.77/3.35	  ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | (~spl34_1 | ~spl34_52)),
23.77/3.35	  inference(subsumption_resolution,[],[f856,f100])).
23.77/3.35	thf(f856,plain,(
23.77/3.35	  ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | (~spl34_1 | ~spl34_52)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f853])).
23.77/3.35	thf(f853,plain,(
23.77/3.35	  ($true != $true) | ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = (sK33 @ sK29)) | (~spl34_1 | ~spl34_52)),
23.77/3.35	  inference(superposition,[],[f615,f844])).
23.77/3.35	thf(f833,plain,(
23.77/3.35	  spl34_52 | spl34_53 | spl34_54 | ~spl34_1),
23.77/3.35	  inference(avatar_split_clause,[],[f820,f105,f830,f826,f822])).
23.77/3.35	thf(f820,plain,(
23.77/3.35	  ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ~spl34_1),
23.77/3.35	  inference(subsumption_resolution,[],[f819,f732])).
23.77/3.35	thf(f732,plain,(
23.77/3.35	  ( ! [X1 : a] : (($true != ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ X1)) | ($true = (sK33 @ X1))) ) | ~spl34_1),
23.77/3.35	  inference(trivial_inequality_removal,[],[f731])).
23.77/3.35	thf(f731,plain,(
23.77/3.35	  ( ! [X1 : a] : (($true != $true) | ($true = (sK33 @ X1)) | ($true != ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ X1))) ) | ~spl34_1),
23.77/3.35	  inference(superposition,[],[f96,f728])).
23.77/3.35	thf(f819,plain,(
23.77/3.35	  ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ~spl34_1),
23.77/3.35	  inference(subsumption_resolution,[],[f816,f100])).
23.77/3.35	thf(f816,plain,(
23.77/3.35	  ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = (sK33 @ sK29)) | ~spl34_1),
23.77/3.35	  inference(trivial_inequality_removal,[],[f807])).
23.77/3.35	thf(f807,plain,(
23.77/3.35	  ($true != $true) | ($true = (sK33 @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ (((sK11 @ sK33) @ sK26) @ sK27)) @ (((sK12 @ sK33) @ sK26) @ sK27))) | ($true = ((sK27 @ sK28) @ ((((sK10 @ sK33) @ sK26) @ sK27) @ sK28))) | ($true = (sK33 @ sK29)) | ~spl34_1),
23.77/3.35	  inference(superposition,[],[f733,f617])).
23.77/3.35	thf(f617,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true = ((sK27 @ (((sK11 @ X0) @ sK26) @ sK27)) @ (((sK12 @ X0) @ sK26) @ sK27))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ (((sK11 @ X0) @ sK26) @ sK27)) @ (((sK12 @ X0) @ sK26) @ sK27))) | ($true = ((sK27 @ sK28) @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = (X0 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(trivial_inequality_removal,[],[f602])).
23.77/3.35	thf(f602,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = ((sK27 @ sK28) @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ sK28) @ ((((sK10 @ X0) @ sK26) @ sK27) @ sK28))) | ($true = ((sK26 @ (((sK11 @ X0) @ sK26) @ sK27)) @ (((sK12 @ X0) @ sK26) @ sK27))) | ($true = ((sK27 @ (((sK11 @ X0) @ sK26) @ sK27)) @ (((sK12 @ X0) @ sK26) @ sK27))) | ($true = (X0 @ sK29))) ) | ~spl34_1),
23.77/3.35	  inference(superposition,[],[f61,f107])).
23.77/3.35	thf(f61,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a > a > $o,X0 : a,X3 : a > a > $o,X1 : a] : (($true != ((((sP5 @ X3) @ X2) @ X1) @ X0)) | ($true = ((X2 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ X1) @ ((((sK10 @ X4) @ X3) @ X2) @ X1))) | ($true = ((X3 @ (((sK11 @ X4) @ X3) @ X2)) @ (((sK12 @ X4) @ X3) @ X2))) | ($true = ((X2 @ (((sK11 @ X4) @ X3) @ X2)) @ (((sK12 @ X4) @ X3) @ X2))) | ($true = (X4 @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f25])).
23.77/3.35	thf(f595,plain,(
23.77/3.35	  spl34_33 | spl34_34 | ~spl34_3 | ~spl34_7),
23.77/3.35	  inference(avatar_split_clause,[],[f587,f148,f113,f592,f589])).
23.77/3.35	thf(f148,plain,(
23.77/3.35	  spl34_7 <=> ! [X0 : a > $o] : (($true = (X0 @ ((sK13 @ X0) @ sK26))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ X0) @ ((sK7 @ sK26) @ sK27)) @ sK26))))),
23.77/3.35	  introduced(avatar_definition,[new_symbols(naming,[spl34_7])])).
23.77/3.35	thf(f587,plain,(
23.77/3.35	  ( ! [X4 : a,X5 : a > a > $o] : (($true = (((sK9 @ sK26) @ sK27) @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ X4)) | ($true = (((sP3 @ X5) @ ((sK7 @ sK26) @ sK27)) @ X4)) | ($true != ((((sP4 @ X5) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ X4))) ) | (~spl34_3 | ~spl34_7)),
23.77/3.35	  inference(subsumption_resolution,[],[f584,f556])).
23.77/3.35	thf(f556,plain,(
23.77/3.35	  ($true != (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ~spl34_3),
23.77/3.35	  inference(trivial_inequality_removal,[],[f555])).
23.77/3.35	thf(f555,plain,(
23.77/3.35	  ($true != $true) | ($true != (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ~spl34_3),
23.77/3.35	  inference(superposition,[],[f60,f115])).
23.77/3.35	thf(f584,plain,(
23.77/3.35	  ( ! [X4 : a,X5 : a > a > $o] : (($true = (((sK9 @ sK26) @ sK27) @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ X4)) | ($true = (((sP3 @ X5) @ ((sK7 @ sK26) @ sK27)) @ X4)) | ($true != ((((sP4 @ X5) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ X4)) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27)))) ) | (~spl34_3 | ~spl34_7)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f583])).
23.77/3.35	thf(f583,plain,(
23.77/3.35	  ( ! [X4 : a,X5 : a > a > $o] : (($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ X4)) | ($true = (((sP3 @ X5) @ ((sK7 @ sK26) @ sK27)) @ X4)) | ($true != ((((sP4 @ X5) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ X4)) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27)))) ) | (~spl34_3 | ~spl34_7)),
23.77/3.35	  inference(duplicate_literal_removal,[],[f580])).
23.77/3.35	thf(f580,plain,(
23.77/3.35	  ( ! [X4 : a,X5 : a > a > $o] : (($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26))) | ($true = (((sK9 @ sK26) @ sK27) @ X4)) | ($true = (((sP3 @ X5) @ ((sK7 @ sK26) @ sK27)) @ X4)) | ($true != ((((sP4 @ X5) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ X4)) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK8 @ sK26) @ sK27))) | ($true = (((sK9 @ sK26) @ sK27) @ ((sK13 @ ((sK9 @ sK26) @ sK27)) @ sK26)))) ) | (~spl34_3 | ~spl34_7)),
23.77/3.35	  inference(superposition,[],[f68,f273])).
23.77/3.35	thf(f273,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true = (((sK9 @ sK26) @ sK27) @ (((sK15 @ X0) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27))) | ($true = (X0 @ ((sK13 @ X0) @ sK26)))) ) | (~spl34_3 | ~spl34_7)),
23.77/3.35	  inference(trivial_inequality_removal,[],[f259])).
23.77/3.35	thf(f259,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (((sK9 @ sK26) @ sK27) @ (((sK15 @ X0) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27))) | ($true = (X0 @ ((sK13 @ X0) @ sK26)))) ) | (~spl34_3 | ~spl34_7)),
23.77/3.35	  inference(superposition,[],[f213,f149])).
23.77/3.35	thf(f149,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ X0) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27))) | ($true = (X0 @ ((sK13 @ X0) @ sK26)))) ) | ~spl34_7),
23.77/3.35	  inference(avatar_component_clause,[],[f148])).
23.77/3.35	thf(f213,plain,(
23.77/3.35	  ( ! [X1 : a] : (($true != ((sK26 @ ((sK7 @ sK26) @ sK27)) @ X1)) | ($true = (((sK9 @ sK26) @ sK27) @ X1))) ) | ~spl34_3),
23.77/3.35	  inference(trivial_inequality_removal,[],[f206])).
23.77/3.35	thf(f206,plain,(
23.77/3.35	  ( ! [X1 : a] : (($true != $true) | ($true != ((sK26 @ ((sK7 @ sK26) @ sK27)) @ X1)) | ($true = (((sK9 @ sK26) @ sK27) @ X1))) ) | ~spl34_3),
23.77/3.35	  inference(superposition,[],[f57,f115])).
23.77/3.35	thf(f68,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a,X0 : a,X3 : a > a > $o,X1 : a > a > $o] : (($true != (X4 @ (((sK15 @ X4) @ X2) @ X1))) | ($true = (X4 @ ((sK13 @ X4) @ X1))) | ($true = (X4 @ X0)) | ($true = (((sP3 @ X3) @ X2) @ X0)) | ($true != ((((sP4 @ X3) @ X2) @ X1) @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f30])).
23.77/3.35	thf(f258,plain,(
23.77/3.35	  spl34_6 | spl34_7 | ~spl34_3),
23.77/3.35	  inference(avatar_split_clause,[],[f235,f113,f148,f144])).
23.77/3.35	thf(f235,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true = (X0 @ ((sK13 @ X0) @ sK26))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ X0) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_3),
23.77/3.35	  inference(trivial_inequality_removal,[],[f232])).
23.77/3.35	thf(f232,plain,(
23.77/3.35	  ( ! [X0 : a > $o] : (($true != $true) | ($true = (X0 @ ((sK13 @ X0) @ sK26))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ X0) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (X0 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_3),
23.77/3.35	  inference(superposition,[],[f67,f215])).
23.77/3.35	thf(f215,plain,(
23.77/3.35	  ($true = ((((sP4 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ ((sK8 @ sK26) @ sK27))) | ~spl34_3),
23.77/3.35	  inference(trivial_inequality_removal,[],[f204])).
23.77/3.35	thf(f204,plain,(
23.77/3.35	  ($true != $true) | ($true = ((((sP4 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ sK26) @ ((sK8 @ sK26) @ sK27))) | ~spl34_3),
23.77/3.35	  inference(superposition,[],[f55,f115])).
23.77/3.35	thf(f67,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a,X0 : a,X3 : a > a > $o,X1 : a > a > $o] : (($true != ((((sP4 @ X3) @ X2) @ X1) @ X0)) | ($true = (X4 @ ((sK13 @ X4) @ X1))) | ($true = ((X1 @ X2) @ (((sK15 @ X4) @ X2) @ X1))) | ($true = (((sP3 @ X3) @ X2) @ X0)) | ($true = (X4 @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f30])).
23.77/3.35	thf(f257,plain,(
23.77/3.35	  spl34_6 | spl34_8 | ~spl34_3),
23.77/3.35	  inference(avatar_split_clause,[],[f234,f113,f152,f144])).
23.77/3.35	thf(f234,plain,(
23.77/3.35	  ( ! [X1 : a > $o] : (($true = ((sK26 @ ((sK13 @ X1) @ sK26)) @ ((sK14 @ X1) @ sK26))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ X1) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (X1 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_3),
23.77/3.35	  inference(trivial_inequality_removal,[],[f233])).
23.77/3.35	thf(f233,plain,(
23.77/3.35	  ( ! [X1 : a > $o] : (($true != $true) | ($true = ((sK26 @ ((sK13 @ X1) @ sK26)) @ ((sK14 @ X1) @ sK26))) | ($true = ((sK26 @ ((sK7 @ sK26) @ sK27)) @ (((sK15 @ X1) @ ((sK7 @ sK26) @ sK27)) @ sK26))) | ($true = (((sP3 @ sK27) @ ((sK7 @ sK26) @ sK27)) @ ((sK8 @ sK26) @ sK27))) | ($true = (X1 @ ((sK8 @ sK26) @ sK27)))) ) | ~spl34_3),
23.77/3.35	  inference(superposition,[],[f69,f215])).
23.77/3.35	thf(f69,plain,(
23.77/3.35	  ( ! [X4 : a > $o,X2 : a,X0 : a,X3 : a > a > $o,X1 : a > a > $o] : (($true != ((((sP4 @ X3) @ X2) @ X1) @ X0)) | ($true = ((X1 @ ((sK13 @ X4) @ X1)) @ ((sK14 @ X4) @ X1))) | ($true = ((X1 @ X2) @ (((sK15 @ X4) @ X2) @ X1))) | ($true = (((sP3 @ X3) @ X2) @ X0)) | ($true = (X4 @ X0))) )),
23.77/3.35	  inference(cnf_transformation,[],[f30])).
23.77/3.35	thf(f126,plain,(
23.77/3.35	  spl34_1 | spl34_5 | spl34_3),
23.77/3.35	  inference(avatar_split_clause,[],[f101,f113,f123,f105])).
23.77/3.35	thf(f101,plain,(
23.77/3.35	  ($true = ((sP6 @ sK26) @ sK27)) | ($true = ((((sP0 @ sK27) @ sK26) @ sK31) @ sK32)) | ($true = ((((sP5 @ sK26) @ sK27) @ sK28) @ sK29))),
23.77/3.35	  inference(cnf_transformation,[],[f54])).
23.77/3.35	thf(f121,plain,(
23.77/3.35	  spl34_1 | spl34_4 | spl34_3),
23.77/3.35	  inference(avatar_split_clause,[],[f102,f113,f118,f105])).
23.77/3.35	thf(f102,plain,(
23.77/3.35	  ($true = ((sP6 @ sK26) @ sK27)) | ($true = ((((sP1 @ sK26) @ sK27) @ sK30) @ sK31)) | ($true = ((((sP5 @ sK26) @ sK27) @ sK28) @ sK29))),
23.77/3.35	  inference(cnf_transformation,[],[f54])).
23.77/3.35	thf(f116,plain,(
23.77/3.35	  spl34_1 | spl34_2 | spl34_3),
23.77/3.35	  inference(avatar_split_clause,[],[f103,f113,f109,f105])).
23.77/3.35	thf(f103,plain,(
23.77/3.35	  ($true = ((sP6 @ sK26) @ sK27)) | ($true = ((((sP2 @ sK30) @ sK26) @ sK27) @ sK32)) | ($true = ((((sP5 @ sK26) @ sK27) @ sK28) @ sK29))),
23.77/3.35	  inference(cnf_transformation,[],[f54])).
23.77/3.35	% SZS output end Proof for theBenchmark
23.77/3.35	% (14439)------------------------------
23.77/3.35	% (14439)Version: Vampire 4.6.0 (commit 0afb7ed4a on 2021-06-23 15:27:21 +0100)
23.77/3.35	% (14439)Termination reason: Refutation
23.77/3.35	
23.77/3.35	% (14439)Memory used [KB]: 15095
23.77/3.35	% (14439)Time elapsed: 0.870 s
23.77/3.35	% (14439)------------------------------
23.77/3.35	% (14439)------------------------------
23.77/3.35	% (14397)Success in time 3.01 s
23.77/3.36	EOF