TSTP Solution File: RNG115+4 by Vampire---4.8
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- Process Solution
%------------------------------------------------------------------------------
% File : Vampire---4.8
% Problem : RNG115+4 : TPTP v8.1.2. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : vampire --input_syntax tptp --proof tptp --output_axiom_names on --mode portfolio --schedule file --schedule_file /export/starexec/sandbox2/solver/bin/quickGreedyProduceRating_steal_pow3.txt --cores 8 -m 12000 -t %d %s
% Computer : n008.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 : Sun May 5 08:54:21 EDT 2024
% Result : Theorem 0.56s 0.77s
% Output : Refutation 0.56s
% Verified :
% SZS Type : Refutation
% Derivation depth : 11
% Number of leaves : 10
% Syntax : Number of formulae : 41 ( 4 unt; 0 def)
% Number of atoms : 284 ( 76 equ)
% Maximal formula atoms : 28 ( 6 avg)
% Number of connectives : 339 ( 96 ~; 84 |; 135 &)
% ( 12 <=>; 12 =>; 0 <=; 0 <~>)
% Maximal formula depth : 13 ( 6 avg)
% Maximal term depth : 3 ( 1 avg)
% Number of predicates : 10 ( 8 usr; 3 prp; 0-2 aty)
% Number of functors : 16 ( 16 usr; 7 con; 0-2 aty)
% Number of variables : 126 ( 76 !; 50 ?)
% Comments :
%------------------------------------------------------------------------------
fof(f733,plain,
$false,
inference(avatar_sat_refutation,[],[f676,f723,f732]) ).
fof(f732,plain,
spl41_29,
inference(avatar_contradiction_clause,[],[f731]) ).
fof(f731,plain,
( $false
| spl41_29 ),
inference(subsumption_resolution,[],[f730,f245]) ).
fof(f245,plain,
aElementOf0(xu,xI),
inference(cnf_transformation,[],[f140]) ).
fof(f140,plain,
( ! [X0] :
( ~ iLess0(sbrdtbr0(X0),sbrdtbr0(xu))
| sz00 = X0
| ( ~ aElementOf0(X0,xI)
& ! [X1,X2] :
( sdtpldt0(X1,X2) != X0
| ~ aElementOf0(X2,slsdtgt0(xb))
| ~ aElementOf0(X1,slsdtgt0(xa)) ) ) )
& sz00 != xu
& aElementOf0(xu,xI)
& xu = sdtpldt0(sK21,sK22)
& aElementOf0(sK22,slsdtgt0(xb))
& aElementOf0(sK21,slsdtgt0(xa)) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK21,sK22])],[f67,f139]) ).
fof(f139,plain,
( ? [X3,X4] :
( xu = sdtpldt0(X3,X4)
& aElementOf0(X4,slsdtgt0(xb))
& aElementOf0(X3,slsdtgt0(xa)) )
=> ( xu = sdtpldt0(sK21,sK22)
& aElementOf0(sK22,slsdtgt0(xb))
& aElementOf0(sK21,slsdtgt0(xa)) ) ),
introduced(choice_axiom,[]) ).
fof(f67,plain,
( ! [X0] :
( ~ iLess0(sbrdtbr0(X0),sbrdtbr0(xu))
| sz00 = X0
| ( ~ aElementOf0(X0,xI)
& ! [X1,X2] :
( sdtpldt0(X1,X2) != X0
| ~ aElementOf0(X2,slsdtgt0(xb))
| ~ aElementOf0(X1,slsdtgt0(xa)) ) ) )
& sz00 != xu
& aElementOf0(xu,xI)
& ? [X3,X4] :
( xu = sdtpldt0(X3,X4)
& aElementOf0(X4,slsdtgt0(xb))
& aElementOf0(X3,slsdtgt0(xa)) ) ),
inference(flattening,[],[f66]) ).
fof(f66,plain,
( ! [X0] :
( ~ iLess0(sbrdtbr0(X0),sbrdtbr0(xu))
| sz00 = X0
| ( ~ aElementOf0(X0,xI)
& ! [X1,X2] :
( sdtpldt0(X1,X2) != X0
| ~ aElementOf0(X2,slsdtgt0(xb))
| ~ aElementOf0(X1,slsdtgt0(xa)) ) ) )
& sz00 != xu
& aElementOf0(xu,xI)
& ? [X3,X4] :
( xu = sdtpldt0(X3,X4)
& aElementOf0(X4,slsdtgt0(xb))
& aElementOf0(X3,slsdtgt0(xa)) ) ),
inference(ennf_transformation,[],[f53]) ).
fof(f53,plain,
( ! [X0] :
( ( sz00 != X0
& ( aElementOf0(X0,xI)
| ? [X1,X2] :
( sdtpldt0(X1,X2) = X0
& aElementOf0(X2,slsdtgt0(xb))
& aElementOf0(X1,slsdtgt0(xa)) ) ) )
=> ~ iLess0(sbrdtbr0(X0),sbrdtbr0(xu)) )
& sz00 != xu
& aElementOf0(xu,xI)
& ? [X3,X4] :
( xu = sdtpldt0(X3,X4)
& aElementOf0(X4,slsdtgt0(xb))
& aElementOf0(X3,slsdtgt0(xa)) ) ),
inference(rectify,[],[f45]) ).
fof(f45,axiom,
( ! [X0] :
( ( sz00 != X0
& ( aElementOf0(X0,xI)
| ? [X1,X2] :
( sdtpldt0(X1,X2) = X0
& aElementOf0(X2,slsdtgt0(xb))
& aElementOf0(X1,slsdtgt0(xa)) ) ) )
=> ~ iLess0(sbrdtbr0(X0),sbrdtbr0(xu)) )
& sz00 != xu
& aElementOf0(xu,xI)
& ? [X0,X1] :
( sdtpldt0(X0,X1) = xu
& aElementOf0(X1,slsdtgt0(xb))
& aElementOf0(X0,slsdtgt0(xa)) ) ),
file('/export/starexec/sandbox2/tmp/tmp.DAi5VeWwPe/Vampire---4.8_16009',m__2273) ).
fof(f730,plain,
( ~ aElementOf0(xu,xI)
| spl41_29 ),
inference(resolution,[],[f675,f215]) ).
fof(f215,plain,
! [X0] :
( aElementOf0(sK9(X0),slsdtgt0(xb))
| ~ aElementOf0(X0,xI) ),
inference(cnf_transformation,[],[f126]) ).
fof(f126,plain,
( xI = sdtpldt1(slsdtgt0(xa),slsdtgt0(xb))
& ! [X0] :
( ( aElementOf0(X0,xI)
| ! [X1,X2] :
( sdtpldt0(X1,X2) != X0
| ~ aElementOf0(X2,slsdtgt0(xb))
| ~ aElementOf0(X1,slsdtgt0(xa)) ) )
& ( ( sdtpldt0(sK8(X0),sK9(X0)) = X0
& aElementOf0(sK9(X0),slsdtgt0(xb))
& aElementOf0(sK8(X0),slsdtgt0(xa)) )
| ~ aElementOf0(X0,xI) ) )
& ! [X5] :
( ( aElementOf0(X5,slsdtgt0(xb))
| ! [X6] :
( sdtasdt0(xb,X6) != X5
| ~ aElement0(X6) ) )
& ( ( sdtasdt0(xb,sK10(X5)) = X5
& aElement0(sK10(X5)) )
| ~ aElementOf0(X5,slsdtgt0(xb)) ) )
& ! [X8] :
( ( aElementOf0(X8,slsdtgt0(xa))
| ! [X9] :
( sdtasdt0(xa,X9) != X8
| ~ aElement0(X9) ) )
& ( ( sdtasdt0(xa,sK11(X8)) = X8
& aElement0(sK11(X8)) )
| ~ aElementOf0(X8,slsdtgt0(xa)) ) )
& aIdeal0(xI)
& ! [X11] :
( ( ! [X12] :
( aElementOf0(sdtasdt0(X12,X11),xI)
| ~ aElement0(X12) )
& ! [X13] :
( aElementOf0(sdtpldt0(X11,X13),xI)
| ~ aElementOf0(X13,xI) ) )
| ~ aElementOf0(X11,xI) )
& aSet0(xI) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK8,sK9,sK10,sK11])],[f122,f125,f124,f123]) ).
fof(f123,plain,
! [X0] :
( ? [X3,X4] :
( sdtpldt0(X3,X4) = X0
& aElementOf0(X4,slsdtgt0(xb))
& aElementOf0(X3,slsdtgt0(xa)) )
=> ( sdtpldt0(sK8(X0),sK9(X0)) = X0
& aElementOf0(sK9(X0),slsdtgt0(xb))
& aElementOf0(sK8(X0),slsdtgt0(xa)) ) ),
introduced(choice_axiom,[]) ).
fof(f124,plain,
! [X5] :
( ? [X7] :
( sdtasdt0(xb,X7) = X5
& aElement0(X7) )
=> ( sdtasdt0(xb,sK10(X5)) = X5
& aElement0(sK10(X5)) ) ),
introduced(choice_axiom,[]) ).
fof(f125,plain,
! [X8] :
( ? [X10] :
( sdtasdt0(xa,X10) = X8
& aElement0(X10) )
=> ( sdtasdt0(xa,sK11(X8)) = X8
& aElement0(sK11(X8)) ) ),
introduced(choice_axiom,[]) ).
fof(f122,plain,
( xI = sdtpldt1(slsdtgt0(xa),slsdtgt0(xb))
& ! [X0] :
( ( aElementOf0(X0,xI)
| ! [X1,X2] :
( sdtpldt0(X1,X2) != X0
| ~ aElementOf0(X2,slsdtgt0(xb))
| ~ aElementOf0(X1,slsdtgt0(xa)) ) )
& ( ? [X3,X4] :
( sdtpldt0(X3,X4) = X0
& aElementOf0(X4,slsdtgt0(xb))
& aElementOf0(X3,slsdtgt0(xa)) )
| ~ aElementOf0(X0,xI) ) )
& ! [X5] :
( ( aElementOf0(X5,slsdtgt0(xb))
| ! [X6] :
( sdtasdt0(xb,X6) != X5
| ~ aElement0(X6) ) )
& ( ? [X7] :
( sdtasdt0(xb,X7) = X5
& aElement0(X7) )
| ~ aElementOf0(X5,slsdtgt0(xb)) ) )
& ! [X8] :
( ( aElementOf0(X8,slsdtgt0(xa))
| ! [X9] :
( sdtasdt0(xa,X9) != X8
| ~ aElement0(X9) ) )
& ( ? [X10] :
( sdtasdt0(xa,X10) = X8
& aElement0(X10) )
| ~ aElementOf0(X8,slsdtgt0(xa)) ) )
& aIdeal0(xI)
& ! [X11] :
( ( ! [X12] :
( aElementOf0(sdtasdt0(X12,X11),xI)
| ~ aElement0(X12) )
& ! [X13] :
( aElementOf0(sdtpldt0(X11,X13),xI)
| ~ aElementOf0(X13,xI) ) )
| ~ aElementOf0(X11,xI) )
& aSet0(xI) ),
inference(rectify,[],[f121]) ).
fof(f121,plain,
( xI = sdtpldt1(slsdtgt0(xa),slsdtgt0(xb))
& ! [X0] :
( ( aElementOf0(X0,xI)
| ! [X1,X2] :
( sdtpldt0(X1,X2) != X0
| ~ aElementOf0(X2,slsdtgt0(xb))
| ~ aElementOf0(X1,slsdtgt0(xa)) ) )
& ( ? [X1,X2] :
( sdtpldt0(X1,X2) = X0
& aElementOf0(X2,slsdtgt0(xb))
& aElementOf0(X1,slsdtgt0(xa)) )
| ~ aElementOf0(X0,xI) ) )
& ! [X3] :
( ( aElementOf0(X3,slsdtgt0(xb))
| ! [X4] :
( sdtasdt0(xb,X4) != X3
| ~ aElement0(X4) ) )
& ( ? [X4] :
( sdtasdt0(xb,X4) = X3
& aElement0(X4) )
| ~ aElementOf0(X3,slsdtgt0(xb)) ) )
& ! [X5] :
( ( aElementOf0(X5,slsdtgt0(xa))
| ! [X6] :
( sdtasdt0(xa,X6) != X5
| ~ aElement0(X6) ) )
& ( ? [X6] :
( sdtasdt0(xa,X6) = X5
& aElement0(X6) )
| ~ aElementOf0(X5,slsdtgt0(xa)) ) )
& aIdeal0(xI)
& ! [X7] :
( ( ! [X8] :
( aElementOf0(sdtasdt0(X8,X7),xI)
| ~ aElement0(X8) )
& ! [X9] :
( aElementOf0(sdtpldt0(X7,X9),xI)
| ~ aElementOf0(X9,xI) ) )
| ~ aElementOf0(X7,xI) )
& aSet0(xI) ),
inference(nnf_transformation,[],[f65]) ).
fof(f65,plain,
( xI = sdtpldt1(slsdtgt0(xa),slsdtgt0(xb))
& ! [X0] :
( aElementOf0(X0,xI)
<=> ? [X1,X2] :
( sdtpldt0(X1,X2) = X0
& aElementOf0(X2,slsdtgt0(xb))
& aElementOf0(X1,slsdtgt0(xa)) ) )
& ! [X3] :
( aElementOf0(X3,slsdtgt0(xb))
<=> ? [X4] :
( sdtasdt0(xb,X4) = X3
& aElement0(X4) ) )
& ! [X5] :
( aElementOf0(X5,slsdtgt0(xa))
<=> ? [X6] :
( sdtasdt0(xa,X6) = X5
& aElement0(X6) ) )
& aIdeal0(xI)
& ! [X7] :
( ( ! [X8] :
( aElementOf0(sdtasdt0(X8,X7),xI)
| ~ aElement0(X8) )
& ! [X9] :
( aElementOf0(sdtpldt0(X7,X9),xI)
| ~ aElementOf0(X9,xI) ) )
| ~ aElementOf0(X7,xI) )
& aSet0(xI) ),
inference(ennf_transformation,[],[f50]) ).
fof(f50,plain,
( xI = sdtpldt1(slsdtgt0(xa),slsdtgt0(xb))
& ! [X0] :
( aElementOf0(X0,xI)
<=> ? [X1,X2] :
( sdtpldt0(X1,X2) = X0
& aElementOf0(X2,slsdtgt0(xb))
& aElementOf0(X1,slsdtgt0(xa)) ) )
& ! [X3] :
( aElementOf0(X3,slsdtgt0(xb))
<=> ? [X4] :
( sdtasdt0(xb,X4) = X3
& aElement0(X4) ) )
& ! [X5] :
( aElementOf0(X5,slsdtgt0(xa))
<=> ? [X6] :
( sdtasdt0(xa,X6) = X5
& aElement0(X6) ) )
& aIdeal0(xI)
& ! [X7] :
( aElementOf0(X7,xI)
=> ( ! [X8] :
( aElement0(X8)
=> aElementOf0(sdtasdt0(X8,X7),xI) )
& ! [X9] :
( aElementOf0(X9,xI)
=> aElementOf0(sdtpldt0(X7,X9),xI) ) ) )
& aSet0(xI) ),
inference(rectify,[],[f42]) ).
fof(f42,axiom,
( xI = sdtpldt1(slsdtgt0(xa),slsdtgt0(xb))
& ! [X0] :
( aElementOf0(X0,xI)
<=> ? [X1,X2] :
( sdtpldt0(X1,X2) = X0
& aElementOf0(X2,slsdtgt0(xb))
& aElementOf0(X1,slsdtgt0(xa)) ) )
& ! [X0] :
( aElementOf0(X0,slsdtgt0(xb))
<=> ? [X1] :
( sdtasdt0(xb,X1) = X0
& aElement0(X1) ) )
& ! [X0] :
( aElementOf0(X0,slsdtgt0(xa))
<=> ? [X1] :
( sdtasdt0(xa,X1) = X0
& aElement0(X1) ) )
& aIdeal0(xI)
& ! [X0] :
( aElementOf0(X0,xI)
=> ( ! [X1] :
( aElement0(X1)
=> aElementOf0(sdtasdt0(X1,X0),xI) )
& ! [X1] :
( aElementOf0(X1,xI)
=> aElementOf0(sdtpldt0(X0,X1),xI) ) ) )
& aSet0(xI) ),
file('/export/starexec/sandbox2/tmp/tmp.DAi5VeWwPe/Vampire---4.8_16009',m__2174) ).
fof(f675,plain,
( ~ aElementOf0(sK9(xu),slsdtgt0(xb))
| spl41_29 ),
inference(avatar_component_clause,[],[f673]) ).
fof(f673,plain,
( spl41_29
<=> aElementOf0(sK9(xu),slsdtgt0(xb)) ),
introduced(avatar_definition,[new_symbols(naming,[spl41_29])]) ).
fof(f723,plain,
spl41_28,
inference(avatar_contradiction_clause,[],[f722]) ).
fof(f722,plain,
( $false
| spl41_28 ),
inference(subsumption_resolution,[],[f721,f245]) ).
fof(f721,plain,
( ~ aElementOf0(xu,xI)
| spl41_28 ),
inference(resolution,[],[f671,f214]) ).
fof(f214,plain,
! [X0] :
( aElementOf0(sK8(X0),slsdtgt0(xa))
| ~ aElementOf0(X0,xI) ),
inference(cnf_transformation,[],[f126]) ).
fof(f671,plain,
( ~ aElementOf0(sK8(xu),slsdtgt0(xa))
| spl41_28 ),
inference(avatar_component_clause,[],[f669]) ).
fof(f669,plain,
( spl41_28
<=> aElementOf0(sK8(xu),slsdtgt0(xa)) ),
introduced(avatar_definition,[new_symbols(naming,[spl41_28])]) ).
fof(f676,plain,
( ~ spl41_28
| ~ spl41_29 ),
inference(avatar_split_clause,[],[f667,f673,f669]) ).
fof(f667,plain,
( ~ aElementOf0(sK9(xu),slsdtgt0(xb))
| ~ aElementOf0(sK8(xu),slsdtgt0(xa)) ),
inference(subsumption_resolution,[],[f661,f245]) ).
fof(f661,plain,
( ~ aElementOf0(sK9(xu),slsdtgt0(xb))
| ~ aElementOf0(sK8(xu),slsdtgt0(xa))
| ~ aElementOf0(xu,xI) ),
inference(resolution,[],[f366,f349]) ).
fof(f349,plain,
! [X0] :
( sQ40_eqProxy(sdtpldt0(sK8(X0),sK9(X0)),X0)
| ~ aElementOf0(X0,xI) ),
inference(equality_proxy_replacement,[],[f216,f341]) ).
fof(f341,plain,
! [X0,X1] :
( sQ40_eqProxy(X0,X1)
<=> X0 = X1 ),
introduced(equality_proxy_definition,[new_symbols(naming,[sQ40_eqProxy])]) ).
fof(f216,plain,
! [X0] :
( sdtpldt0(sK8(X0),sK9(X0)) = X0
| ~ aElementOf0(X0,xI) ),
inference(cnf_transformation,[],[f126]) ).
fof(f366,plain,
! [X0,X1] :
( ~ sQ40_eqProxy(sdtpldt0(X0,X1),xu)
| ~ aElementOf0(X1,slsdtgt0(xb))
| ~ aElementOf0(X0,slsdtgt0(xa)) ),
inference(equality_proxy_replacement,[],[f258,f341]) ).
fof(f258,plain,
! [X0,X1] :
( sdtpldt0(X0,X1) != xu
| ~ aElementOf0(X1,slsdtgt0(xb))
| ~ aElementOf0(X0,slsdtgt0(xa)) ),
inference(cnf_transformation,[],[f69]) ).
fof(f69,plain,
! [X0,X1] :
( sdtpldt0(X0,X1) != xu
| ( ~ aElementOf0(X1,slsdtgt0(xb))
& ! [X2] :
( sdtasdt0(xb,X2) != X1
| ~ aElement0(X2) ) )
| ( ~ aElementOf0(X0,slsdtgt0(xa))
& ! [X3] :
( sdtasdt0(xa,X3) != X0
| ~ aElement0(X3) ) ) ),
inference(ennf_transformation,[],[f55]) ).
fof(f55,plain,
~ ? [X0,X1] :
( sdtpldt0(X0,X1) = xu
& ( aElementOf0(X1,slsdtgt0(xb))
| ? [X2] :
( sdtasdt0(xb,X2) = X1
& aElement0(X2) ) )
& ( aElementOf0(X0,slsdtgt0(xa))
| ? [X3] :
( sdtasdt0(xa,X3) = X0
& aElement0(X3) ) ) ),
inference(rectify,[],[f48]) ).
fof(f48,negated_conjecture,
~ ? [X0,X1] :
( sdtpldt0(X0,X1) = xu
& ( aElementOf0(X1,slsdtgt0(xb))
| ? [X2] :
( sdtasdt0(xb,X2) = X1
& aElement0(X2) ) )
& ( aElementOf0(X0,slsdtgt0(xa))
| ? [X2] :
( sdtasdt0(xa,X2) = X0
& aElement0(X2) ) ) ),
inference(negated_conjecture,[],[f47]) ).
fof(f47,conjecture,
? [X0,X1] :
( sdtpldt0(X0,X1) = xu
& ( aElementOf0(X1,slsdtgt0(xb))
| ? [X2] :
( sdtasdt0(xb,X2) = X1
& aElement0(X2) ) )
& ( aElementOf0(X0,slsdtgt0(xa))
| ? [X2] :
( sdtasdt0(xa,X2) = X0
& aElement0(X2) ) ) ),
file('/export/starexec/sandbox2/tmp/tmp.DAi5VeWwPe/Vampire---4.8_16009',m__) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.12/0.12 % Problem : RNG115+4 : TPTP v8.1.2. Released v4.0.0.
% 0.12/0.14 % Command : vampire --input_syntax tptp --proof tptp --output_axiom_names on --mode portfolio --schedule file --schedule_file /export/starexec/sandbox2/solver/bin/quickGreedyProduceRating_steal_pow3.txt --cores 8 -m 12000 -t %d %s
% 0.15/0.36 % Computer : n008.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 : Fri May 3 18:14:38 EDT 2024
% 0.15/0.36 % CPUTime :
% 0.15/0.36 This is a FOF_THM_RFO_SEQ problem
% 0.15/0.36 Running vampire --input_syntax tptp --proof tptp --output_axiom_names on --mode portfolio --schedule file --schedule_file /export/starexec/sandbox2/solver/bin/quickGreedyProduceRating_steal_pow3.txt --cores 8 -m 12000 -t 300 /export/starexec/sandbox2/tmp/tmp.DAi5VeWwPe/Vampire---4.8_16009
% 0.56/0.76 % (16391)lrs-21_1:1_to=lpo:sil=2000:sp=frequency:sos=on:lma=on:i=56:sd=2:ss=axioms:ep=R_0 on Vampire---4 for (2996ds/56Mi)
% 0.56/0.76 % (16383)dis-1011_2:1_sil=2000:lsd=20:nwc=5.0:flr=on:mep=off:st=3.0:i=34:sd=1:ep=RS:ss=axioms_0 on Vampire---4 for (2996ds/34Mi)
% 0.56/0.76 % (16385)lrs+1011_1:1_sil=8000:sp=occurrence:nwc=10.0:i=78:ss=axioms:sgt=8_0 on Vampire---4 for (2996ds/78Mi)
% 0.56/0.76 % (16384)lrs+1011_461:32768_sil=16000:irw=on:sp=frequency:lsd=20:fd=preordered:nwc=10.0:s2agt=32:alpa=false:cond=fast:s2a=on:i=51:s2at=3.0:awrs=decay:awrsf=691:bd=off:nm=20:fsr=off:amm=sco:uhcvi=on:rawr=on_0 on Vampire---4 for (2996ds/51Mi)
% 0.56/0.76 % (16386)ott+1011_1:1_sil=2000:urr=on:i=33:sd=1:kws=inv_frequency:ss=axioms:sup=off_0 on Vampire---4 for (2996ds/33Mi)
% 0.56/0.76 % (16389)lrs+1002_1:16_to=lpo:sil=32000:sp=unary_frequency:sos=on:i=45:bd=off:ss=axioms_0 on Vampire---4 for (2996ds/45Mi)
% 0.56/0.76 % (16387)lrs+2_1:1_sil=16000:fde=none:sos=all:nwc=5.0:i=34:ep=RS:s2pl=on:lma=on:afp=100000_0 on Vampire---4 for (2996ds/34Mi)
% 0.56/0.76 % (16390)lrs+21_1:5_sil=2000:sos=on:urr=on:newcnf=on:slsq=on:i=83:slsql=off:bd=off:nm=2:ss=axioms:st=1.5:sp=const_min:gsp=on:rawr=on_0 on Vampire---4 for (2996ds/83Mi)
% 0.56/0.77 % (16391)First to succeed.
% 0.56/0.77 % (16391)Solution written to "/export/starexec/sandbox2/tmp/vampire-proof-16292"
% 0.56/0.77 % (16391)Refutation found. Thanks to Tanya!
% 0.56/0.77 % SZS status Theorem for Vampire---4
% 0.56/0.77 % SZS output start Proof for Vampire---4
% See solution above
% 0.56/0.77 % (16391)------------------------------
% 0.56/0.77 % (16391)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.56/0.77 % (16391)Termination reason: Refutation
% 0.56/0.77
% 0.56/0.77 % (16391)Memory used [KB]: 1361
% 0.56/0.77 % (16391)Time elapsed: 0.007 s
% 0.56/0.77 % (16391)Instructions burned: 17 (million)
% 0.56/0.77 % (16292)Success in time 0.394 s
% 0.56/0.77 % Vampire---4.8 exiting
%------------------------------------------------------------------------------