TSTP Solution File: GRP569-1 by Vampire-SAT---4.8
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%------------------------------------------------------------------------------
% File : Vampire-SAT---4.8
% Problem : GRP569-1 : TPTP v8.1.2. Released v2.6.0.
% Transfm : none
% Format : tptp:raw
% Command : vampire --mode casc_sat -m 16384 --cores 7 -t %d %s
% Computer : n003.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 300s
% DateTime : Tue Apr 30 12:07:35 EDT 2024
% Result : Unsatisfiable 0.15s 0.39s
% Output : Refutation 0.15s
% Verified :
% SZS Type : Refutation
% Derivation depth : 11
% Number of leaves : 20
% Syntax : Number of formulae : 80 ( 11 unt; 0 def)
% Number of atoms : 232 ( 63 equ)
% Maximal formula atoms : 7 ( 2 avg)
% Number of connectives : 292 ( 140 ~; 137 |; 0 &)
% ( 15 <=>; 0 =>; 0 <=; 0 <~>)
% Maximal formula depth : 8 ( 4 avg)
% Maximal term depth : 7 ( 2 avg)
% Number of predicates : 17 ( 15 usr; 16 prp; 0-2 aty)
% Number of functors : 5 ( 5 usr; 2 con; 0-2 aty)
% Number of variables : 106 ( 106 !; 0 ?)
% Comments :
%------------------------------------------------------------------------------
fof(f149,plain,
$false,
inference(avatar_sat_refutation,[],[f12,f18,f22,f26,f35,f41,f50,f55,f78,f83,f111,f116,f121,f140,f147,f148]) ).
fof(f148,plain,
( spl0_2
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10 ),
inference(avatar_split_clause,[],[f99,f81,f53,f33,f20,f15]) ).
fof(f15,plain,
( spl0_2
<=> identity = double_divide(identity,identity) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_2])]) ).
fof(f20,plain,
( spl0_3
<=> ! [X0] : identity = double_divide(X0,double_divide(X0,identity)) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_3])]) ).
fof(f33,plain,
( spl0_5
<=> ! [X0] : double_divide(double_divide(X0,identity),double_divide(identity,identity)) = X0 ),
introduced(avatar_definition,[new_symbols(naming,[spl0_5])]) ).
fof(f53,plain,
( spl0_8
<=> ! [X2,X0,X1] : double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))) = double_divide(X1,identity) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_8])]) ).
fof(f81,plain,
( spl0_10
<=> ! [X1] : double_divide(identity,double_divide(X1,double_divide(identity,identity))) = double_divide(double_divide(X1,identity),identity) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_10])]) ).
fof(f99,plain,
( identity = double_divide(identity,identity)
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10 ),
inference(forward_demodulation,[],[f98,f21]) ).
fof(f21,plain,
( ! [X0] : identity = double_divide(X0,double_divide(X0,identity))
| ~ spl0_3 ),
inference(avatar_component_clause,[],[f20]) ).
fof(f98,plain,
( ! [X0] : double_divide(identity,identity) = double_divide(X0,double_divide(X0,identity))
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10 ),
inference(forward_demodulation,[],[f97,f34]) ).
fof(f34,plain,
( ! [X0] : double_divide(double_divide(X0,identity),double_divide(identity,identity)) = X0
| ~ spl0_5 ),
inference(avatar_component_clause,[],[f33]) ).
fof(f97,plain,
( ! [X0] : double_divide(identity,identity) = double_divide(X0,double_divide(double_divide(double_divide(X0,identity),identity),double_divide(identity,identity)))
| ~ spl0_3
| ~ spl0_8
| ~ spl0_10 ),
inference(forward_demodulation,[],[f89,f84]) ).
fof(f84,plain,
( double_divide(identity,identity) = double_divide(double_divide(identity,identity),identity)
| ~ spl0_3
| ~ spl0_10 ),
inference(superposition,[],[f82,f21]) ).
fof(f82,plain,
( ! [X1] : double_divide(identity,double_divide(X1,double_divide(identity,identity))) = double_divide(double_divide(X1,identity),identity)
| ~ spl0_10 ),
inference(avatar_component_clause,[],[f81]) ).
fof(f89,plain,
( ! [X0] : double_divide(identity,identity) = double_divide(X0,double_divide(double_divide(double_divide(X0,identity),identity),double_divide(double_divide(identity,identity),identity)))
| ~ spl0_8
| ~ spl0_10 ),
inference(superposition,[],[f54,f82]) ).
fof(f54,plain,
( ! [X2,X0,X1] : double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))) = double_divide(X1,identity)
| ~ spl0_8 ),
inference(avatar_component_clause,[],[f53]) ).
fof(f147,plain,
( spl0_15
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10
| ~ spl0_13
| ~ spl0_14 ),
inference(avatar_split_clause,[],[f143,f138,f119,f81,f53,f33,f20,f145]) ).
fof(f145,plain,
( spl0_15
<=> ! [X1,X3] : double_divide(X3,identity) = double_divide(double_divide(X1,identity),double_divide(identity,double_divide(X3,X1))) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_15])]) ).
fof(f119,plain,
( spl0_13
<=> ! [X0,X1] : double_divide(X1,identity) = double_divide(X0,double_divide(double_divide(X1,identity),X0)) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_13])]) ).
fof(f138,plain,
( spl0_14
<=> ! [X1,X3] : double_divide(X3,identity) = double_divide(double_divide(X1,identity),double_divide(double_divide(X3,X1),double_divide(double_divide(identity,identity),identity))) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_14])]) ).
fof(f143,plain,
( ! [X3,X1] : double_divide(X3,identity) = double_divide(double_divide(X1,identity),double_divide(identity,double_divide(X3,X1)))
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10
| ~ spl0_13
| ~ spl0_14 ),
inference(forward_demodulation,[],[f142,f130]) ).
fof(f130,plain,
( ! [X0] : double_divide(X0,identity) = double_divide(identity,X0)
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10
| ~ spl0_13 ),
inference(forward_demodulation,[],[f122,f99]) ).
fof(f122,plain,
( ! [X0] : double_divide(X0,identity) = double_divide(double_divide(identity,identity),X0)
| ~ spl0_5
| ~ spl0_13 ),
inference(superposition,[],[f120,f34]) ).
fof(f120,plain,
( ! [X0,X1] : double_divide(X1,identity) = double_divide(X0,double_divide(double_divide(X1,identity),X0))
| ~ spl0_13 ),
inference(avatar_component_clause,[],[f119]) ).
fof(f142,plain,
( ! [X3,X1] : double_divide(X3,identity) = double_divide(double_divide(X1,identity),double_divide(double_divide(X3,X1),identity))
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10
| ~ spl0_13
| ~ spl0_14 ),
inference(forward_demodulation,[],[f141,f21]) ).
fof(f141,plain,
( ! [X3,X1] : double_divide(X3,identity) = double_divide(double_divide(X1,identity),double_divide(double_divide(X3,X1),double_divide(identity,double_divide(identity,identity))))
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10
| ~ spl0_13
| ~ spl0_14 ),
inference(forward_demodulation,[],[f139,f130]) ).
fof(f139,plain,
( ! [X3,X1] : double_divide(X3,identity) = double_divide(double_divide(X1,identity),double_divide(double_divide(X3,X1),double_divide(double_divide(identity,identity),identity)))
| ~ spl0_14 ),
inference(avatar_component_clause,[],[f138]) ).
fof(f140,plain,
( spl0_14
| ~ spl0_4
| ~ spl0_8 ),
inference(avatar_split_clause,[],[f69,f53,f24,f138]) ).
fof(f24,plain,
( spl0_4
<=> ! [X2,X0,X1] : double_divide(double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))),double_divide(identity,identity)) = X1 ),
introduced(avatar_definition,[new_symbols(naming,[spl0_4])]) ).
fof(f69,plain,
( ! [X3,X1] : double_divide(X3,identity) = double_divide(double_divide(X1,identity),double_divide(double_divide(X3,X1),double_divide(double_divide(identity,identity),identity)))
| ~ spl0_4
| ~ spl0_8 ),
inference(forward_demodulation,[],[f57,f54]) ).
fof(f57,plain,
( ! [X2,X3,X0,X1] : double_divide(double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))),double_divide(double_divide(X3,X1),double_divide(double_divide(identity,identity),identity))) = double_divide(X3,identity)
| ~ spl0_4
| ~ spl0_8 ),
inference(superposition,[],[f54,f25]) ).
fof(f25,plain,
( ! [X2,X0,X1] : double_divide(double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))),double_divide(identity,identity)) = X1
| ~ spl0_4 ),
inference(avatar_component_clause,[],[f24]) ).
fof(f121,plain,
( spl0_13
| ~ spl0_3
| ~ spl0_4
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10
| ~ spl0_12 ),
inference(avatar_split_clause,[],[f117,f114,f81,f53,f33,f24,f20,f119]) ).
fof(f114,plain,
( spl0_12
<=> ! [X0,X1] : double_divide(X1,identity) = double_divide(X0,double_divide(double_divide(X1,identity),double_divide(double_divide(X0,identity),identity))) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_12])]) ).
fof(f117,plain,
( ! [X0,X1] : double_divide(X1,identity) = double_divide(X0,double_divide(double_divide(X1,identity),X0))
| ~ spl0_3
| ~ spl0_4
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10
| ~ spl0_12 ),
inference(forward_demodulation,[],[f115,f107]) ).
fof(f107,plain,
( ! [X1] : double_divide(double_divide(X1,identity),identity) = X1
| ~ spl0_3
| ~ spl0_4
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10 ),
inference(forward_demodulation,[],[f106,f105]) ).
fof(f105,plain,
( ! [X0,X1] : double_divide(X1,identity) = double_divide(identity,double_divide(double_divide(X1,double_divide(double_divide(X0,identity),identity)),double_divide(double_divide(X0,identity),identity)))
| ~ spl0_3
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10 ),
inference(forward_demodulation,[],[f93,f99]) ).
fof(f93,plain,
( ! [X0,X1] : double_divide(X1,identity) = double_divide(identity,double_divide(double_divide(X1,double_divide(double_divide(X0,identity),identity)),double_divide(double_divide(X0,double_divide(identity,identity)),identity)))
| ~ spl0_8
| ~ spl0_10 ),
inference(superposition,[],[f54,f82]) ).
fof(f106,plain,
( ! [X0,X1] : double_divide(double_divide(identity,double_divide(double_divide(X1,double_divide(double_divide(X0,identity),identity)),double_divide(double_divide(X0,identity),identity))),identity) = X1
| ~ spl0_3
| ~ spl0_4
| ~ spl0_5
| ~ spl0_8
| ~ spl0_10 ),
inference(forward_demodulation,[],[f94,f99]) ).
fof(f94,plain,
( ! [X0,X1] : double_divide(double_divide(identity,double_divide(double_divide(X1,double_divide(double_divide(X0,identity),identity)),double_divide(double_divide(X0,double_divide(identity,identity)),identity))),double_divide(identity,identity)) = X1
| ~ spl0_4
| ~ spl0_10 ),
inference(superposition,[],[f25,f82]) ).
fof(f115,plain,
( ! [X0,X1] : double_divide(X1,identity) = double_divide(X0,double_divide(double_divide(X1,identity),double_divide(double_divide(X0,identity),identity)))
| ~ spl0_12 ),
inference(avatar_component_clause,[],[f114]) ).
fof(f116,plain,
( spl0_12
| ~ spl0_4
| ~ spl0_5
| ~ spl0_6 ),
inference(avatar_split_clause,[],[f45,f39,f33,f24,f114]) ).
fof(f39,plain,
( spl0_6
<=> ! [X0,X1] : double_divide(double_divide(X0,double_divide(double_divide(X1,identity),double_divide(double_divide(X0,identity),identity))),double_divide(identity,identity)) = X1 ),
introduced(avatar_definition,[new_symbols(naming,[spl0_6])]) ).
fof(f45,plain,
( ! [X0,X1] : double_divide(X1,identity) = double_divide(X0,double_divide(double_divide(X1,identity),double_divide(double_divide(X0,identity),identity)))
| ~ spl0_4
| ~ spl0_5
| ~ spl0_6 ),
inference(forward_demodulation,[],[f43,f36]) ).
fof(f36,plain,
( ! [X0] : double_divide(X0,identity) = double_divide(double_divide(identity,double_divide(X0,double_divide(identity,identity))),double_divide(identity,identity))
| ~ spl0_4
| ~ spl0_5 ),
inference(superposition,[],[f25,f34]) ).
fof(f43,plain,
( ! [X0,X1] : double_divide(X0,double_divide(double_divide(X1,identity),double_divide(double_divide(X0,identity),identity))) = double_divide(double_divide(identity,double_divide(X1,double_divide(identity,identity))),double_divide(identity,identity))
| ~ spl0_4
| ~ spl0_6 ),
inference(superposition,[],[f25,f40]) ).
fof(f40,plain,
( ! [X0,X1] : double_divide(double_divide(X0,double_divide(double_divide(X1,identity),double_divide(double_divide(X0,identity),identity))),double_divide(identity,identity)) = X1
| ~ spl0_6 ),
inference(avatar_component_clause,[],[f39]) ).
fof(f111,plain,
( spl0_11
| ~ spl0_4
| ~ spl0_5 ),
inference(avatar_split_clause,[],[f36,f33,f24,f109]) ).
fof(f109,plain,
( spl0_11
<=> ! [X0] : double_divide(X0,identity) = double_divide(double_divide(identity,double_divide(X0,double_divide(identity,identity))),double_divide(identity,identity)) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_11])]) ).
fof(f83,plain,
( spl0_10
| ~ spl0_4
| ~ spl0_8 ),
inference(avatar_split_clause,[],[f71,f53,f24,f81]) ).
fof(f71,plain,
( ! [X1] : double_divide(identity,double_divide(X1,double_divide(identity,identity))) = double_divide(double_divide(X1,identity),identity)
| ~ spl0_4
| ~ spl0_8 ),
inference(forward_demodulation,[],[f62,f54]) ).
fof(f62,plain,
( ! [X2,X0,X1] : double_divide(identity,double_divide(X1,double_divide(identity,identity))) = double_divide(double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))),identity)
| ~ spl0_4
| ~ spl0_8 ),
inference(superposition,[],[f54,f25]) ).
fof(f78,plain,
( spl0_9
| ~ spl0_4 ),
inference(avatar_split_clause,[],[f28,f24,f76]) ).
fof(f76,plain,
( spl0_9
<=> ! [X0,X3,X2,X1] : double_divide(double_divide(double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))),double_divide(double_divide(X3,X1),double_divide(double_divide(identity,identity),identity))),double_divide(identity,identity)) = X3 ),
introduced(avatar_definition,[new_symbols(naming,[spl0_9])]) ).
fof(f28,plain,
( ! [X2,X3,X0,X1] : double_divide(double_divide(double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))),double_divide(double_divide(X3,X1),double_divide(double_divide(identity,identity),identity))),double_divide(identity,identity)) = X3
| ~ spl0_4 ),
inference(superposition,[],[f25,f25]) ).
fof(f55,plain,
( spl0_8
| ~ spl0_4
| ~ spl0_5
| ~ spl0_7 ),
inference(avatar_split_clause,[],[f51,f48,f33,f24,f53]) ).
fof(f48,plain,
( spl0_7
<=> ! [X2,X0,X1] : double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))) = double_divide(double_divide(identity,double_divide(X1,double_divide(identity,identity))),double_divide(identity,identity)) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_7])]) ).
fof(f51,plain,
( ! [X2,X0,X1] : double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))) = double_divide(X1,identity)
| ~ spl0_4
| ~ spl0_5
| ~ spl0_7 ),
inference(forward_demodulation,[],[f49,f36]) ).
fof(f49,plain,
( ! [X2,X0,X1] : double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))) = double_divide(double_divide(identity,double_divide(X1,double_divide(identity,identity))),double_divide(identity,identity))
| ~ spl0_7 ),
inference(avatar_component_clause,[],[f48]) ).
fof(f50,plain,
( spl0_7
| ~ spl0_4 ),
inference(avatar_split_clause,[],[f30,f24,f48]) ).
fof(f30,plain,
( ! [X2,X0,X1] : double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))) = double_divide(double_divide(identity,double_divide(X1,double_divide(identity,identity))),double_divide(identity,identity))
| ~ spl0_4 ),
inference(superposition,[],[f25,f25]) ).
fof(f41,plain,
( spl0_6
| ~ spl0_3
| ~ spl0_4 ),
inference(avatar_split_clause,[],[f27,f24,f20,f39]) ).
fof(f27,plain,
( ! [X0,X1] : double_divide(double_divide(X0,double_divide(double_divide(X1,identity),double_divide(double_divide(X0,identity),identity))),double_divide(identity,identity)) = X1
| ~ spl0_3
| ~ spl0_4 ),
inference(superposition,[],[f25,f21]) ).
fof(f35,plain,
( spl0_5
| ~ spl0_3
| ~ spl0_4 ),
inference(avatar_split_clause,[],[f31,f24,f20,f33]) ).
fof(f31,plain,
( ! [X0] : double_divide(double_divide(X0,identity),double_divide(identity,identity)) = X0
| ~ spl0_3
| ~ spl0_4 ),
inference(forward_demodulation,[],[f29,f21]) ).
fof(f29,plain,
( ! [X0] : double_divide(double_divide(X0,double_divide(identity,double_divide(identity,identity))),double_divide(identity,identity)) = X0
| ~ spl0_3
| ~ spl0_4 ),
inference(superposition,[],[f25,f21]) ).
fof(f26,plain,
spl0_4,
inference(avatar_split_clause,[],[f1,f24]) ).
fof(f1,axiom,
! [X2,X0,X1] : double_divide(double_divide(X0,double_divide(double_divide(X1,double_divide(X0,X2)),double_divide(X2,identity))),double_divide(identity,identity)) = X1,
file('/export/starexec/sandbox/benchmark/theBenchmark.p',single_axiom) ).
fof(f22,plain,
spl0_3,
inference(avatar_split_clause,[],[f7,f20]) ).
fof(f7,plain,
! [X0] : identity = double_divide(X0,double_divide(X0,identity)),
inference(definition_unfolding,[],[f4,f3]) ).
fof(f3,axiom,
! [X0] : inverse(X0) = double_divide(X0,identity),
file('/export/starexec/sandbox/benchmark/theBenchmark.p',inverse) ).
fof(f4,axiom,
! [X0] : identity = double_divide(X0,inverse(X0)),
file('/export/starexec/sandbox/benchmark/theBenchmark.p',identity) ).
fof(f18,plain,
( ~ spl0_2
| spl0_1 ),
inference(avatar_split_clause,[],[f13,f9,f15]) ).
fof(f9,plain,
( spl0_1
<=> identity = double_divide(double_divide(a1,double_divide(a1,identity)),identity) ),
introduced(avatar_definition,[new_symbols(naming,[spl0_1])]) ).
fof(f13,plain,
( identity != double_divide(identity,identity)
| spl0_1 ),
inference(forward_demodulation,[],[f11,f7]) ).
fof(f11,plain,
( identity != double_divide(double_divide(a1,double_divide(a1,identity)),identity)
| spl0_1 ),
inference(avatar_component_clause,[],[f9]) ).
fof(f12,plain,
~ spl0_1,
inference(avatar_split_clause,[],[f6,f9]) ).
fof(f6,plain,
identity != double_divide(double_divide(a1,double_divide(a1,identity)),identity),
inference(definition_unfolding,[],[f5,f2,f3]) ).
fof(f2,axiom,
! [X0,X1] : multiply(X0,X1) = double_divide(double_divide(X1,X0),identity),
file('/export/starexec/sandbox/benchmark/theBenchmark.p',multiply) ).
fof(f5,axiom,
identity != multiply(inverse(a1),a1),
file('/export/starexec/sandbox/benchmark/theBenchmark.p',prove_these_axioms_1) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.04/0.13 % Problem : GRP569-1 : TPTP v8.1.2. Released v2.6.0.
% 0.14/0.15 % Command : vampire --mode casc_sat -m 16384 --cores 7 -t %d %s
% 0.15/0.36 % Computer : n003.cluster.edu
% 0.15/0.36 % Model : x86_64 x86_64
% 0.15/0.36 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.15/0.36 % Memory : 8042.1875MB
% 0.15/0.36 % OS : Linux 3.10.0-693.el7.x86_64
% 0.15/0.36 % CPULimit : 300
% 0.15/0.36 % WCLimit : 300
% 0.15/0.36 % DateTime : Tue Apr 30 04:31:33 EDT 2024
% 0.15/0.36 % CPUTime :
% 0.15/0.37 % (13283)Running in auto input_syntax mode. Trying TPTP
% 0.15/0.38 % (13284)fmb+10_1_bce=on:fmbas=function:fmbsr=1.2:fde=unused:nm=0_846 on theBenchmark for (846ds/0Mi)
% 0.15/0.38 % (13286)WARNING: value z3 for option sas not known
% 0.15/0.38 % (13285)fmb+10_1_bce=on:fmbdsb=on:fmbes=contour:fmbswr=3:fde=none:nm=0_793 on theBenchmark for (793ds/0Mi)
% 0.15/0.38 % (13287)fmb+10_1_bce=on:fmbsr=1.5:nm=32_533 on theBenchmark for (533ds/0Mi)
% 0.15/0.38 % (13286)dis+2_11_add=large:afr=on:amm=off:bd=off:bce=on:fsd=off:fde=none:gs=on:gsaa=full_model:gsem=off:irw=on:msp=off:nm=4:nwc=1.3:sas=z3:sims=off:sac=on:sp=reverse_arity_569 on theBenchmark for (569ds/0Mi)
% 0.15/0.38 % (13288)ott+10_10:1_add=off:afr=on:amm=off:anc=all:bd=off:bs=on:fsr=off:irw=on:lma=on:msp=off:nm=4:nwc=4.0:sac=on:sp=reverse_frequency_531 on theBenchmark for (531ds/0Mi)
% 0.15/0.38 % (13289)ott-10_8_av=off:bd=preordered:bs=on:fsd=off:fsr=off:fde=unused:irw=on:lcm=predicate:lma=on:nm=4:nwc=1.7:sp=frequency_522 on theBenchmark for (522ds/0Mi)
% 0.15/0.38 TRYING [1]
% 0.15/0.38 % (13290)ott+1_64_av=off:bd=off:bce=on:fsd=off:fde=unused:gsp=on:irw=on:lcm=predicate:lma=on:nm=2:nwc=1.1:sims=off:urr=on_497 on theBenchmark for (497ds/0Mi)
% 0.15/0.38 TRYING [1]
% 0.15/0.38 TRYING [2]
% 0.15/0.39 TRYING [2]
% 0.15/0.39 TRYING [3]
% 0.15/0.39 TRYING [3]
% 0.15/0.39 % (13288)First to succeed.
% 0.15/0.39 TRYING [4]
% 0.15/0.39 % (13290)Also succeeded, but the first one will report.
% 0.15/0.39 % (13288)Refutation found. Thanks to Tanya!
% 0.15/0.39 % SZS status Unsatisfiable for theBenchmark
% 0.15/0.39 % SZS output start Proof for theBenchmark
% See solution above
% 0.15/0.39 % (13288)------------------------------
% 0.15/0.39 % (13288)Version: Vampire 4.8 (commit 8e9376e55 on 2024-01-18 13:49:33 +0100)
% 0.15/0.39 % (13288)Termination reason: Refutation
% 0.15/0.39
% 0.15/0.39 % (13288)Memory used [KB]: 852
% 0.15/0.39 % (13288)Time elapsed: 0.008 s
% 0.15/0.39 % (13288)Instructions burned: 10 (million)
% 0.15/0.39 % (13288)------------------------------
% 0.15/0.39 % (13288)------------------------------
% 0.15/0.39 % (13283)Success in time 0.024 s
%------------------------------------------------------------------------------