TSTP Solution File: NUM442+6 by Vampire---4.8
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : Vampire---4.8
% Problem : NUM442+6 : 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 : n014.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 08:12:04 EDT 2024
% Result : Theorem 0.88s 0.82s
% Output : Refutation 0.88s
% Verified :
% SZS Type : Refutation
% Derivation depth : 16
% Number of leaves : 36
% Syntax : Number of formulae : 172 ( 6 unt; 0 def)
% Number of atoms : 1115 ( 107 equ)
% Maximal formula atoms : 56 ( 6 avg)
% Number of connectives : 1470 ( 527 ~; 516 |; 344 &)
% ( 31 <=>; 52 =>; 0 <=; 0 <~>)
% Maximal formula depth : 21 ( 6 avg)
% Maximal term depth : 3 ( 1 avg)
% Number of predicates : 34 ( 32 usr; 24 prp; 0-3 aty)
% Number of functors : 17 ( 17 usr; 8 con; 0-3 aty)
% Number of variables : 242 ( 184 !; 58 ?)
% Comments :
%------------------------------------------------------------------------------
fof(f2253,plain,
$false,
inference(avatar_sat_refutation,[],[f303,f309,f313,f327,f349,f353,f357,f368,f377,f392,f412,f434,f445,f449,f453,f457,f463,f1979,f2003,f2155,f2239]) ).
fof(f2239,plain,
( spl21_3
| ~ spl21_4
| ~ spl21_5
| ~ spl21_25 ),
inference(avatar_contradiction_clause,[],[f2238]) ).
fof(f2238,plain,
( $false
| spl21_3
| ~ spl21_4
| ~ spl21_5
| ~ spl21_25 ),
inference(subsumption_resolution,[],[f2232,f2221]) ).
fof(f2221,plain,
( aInteger0(sK5)
| ~ spl21_4
| ~ spl21_25 ),
inference(resolution,[],[f308,f411]) ).
fof(f411,plain,
( ! [X0] :
( ~ aElementOf0(X0,sF19)
| aInteger0(X0) )
| ~ spl21_25 ),
inference(avatar_component_clause,[],[f410]) ).
fof(f410,plain,
( spl21_25
<=> ! [X0] :
( ~ aElementOf0(X0,sF19)
| aInteger0(X0) ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_25])]) ).
fof(f308,plain,
( aElementOf0(sK5,sF19)
| ~ spl21_4 ),
inference(avatar_component_clause,[],[f306]) ).
fof(f306,plain,
( spl21_4
<=> aElementOf0(sK5,sF19) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_4])]) ).
fof(f2232,plain,
( ~ aInteger0(sK5)
| spl21_3
| ~ spl21_5 ),
inference(resolution,[],[f312,f302]) ).
fof(f302,plain,
( ~ aElementOf0(sK5,cS1395)
| spl21_3 ),
inference(avatar_component_clause,[],[f300]) ).
fof(f300,plain,
( spl21_3
<=> aElementOf0(sK5,cS1395) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_3])]) ).
fof(f312,plain,
( ! [X1] :
( aElementOf0(X1,cS1395)
| ~ aInteger0(X1) )
| ~ spl21_5 ),
inference(avatar_component_clause,[],[f311]) ).
fof(f311,plain,
( spl21_5
<=> ! [X1] :
( aElementOf0(X1,cS1395)
| ~ aInteger0(X1) ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_5])]) ).
fof(f2155,plain,
( ~ spl21_16
| ~ spl21_18
| ~ spl21_31
| ~ spl21_32
| ~ spl21_77 ),
inference(avatar_contradiction_clause,[],[f2154]) ).
fof(f2154,plain,
( $false
| ~ spl21_16
| ~ spl21_18
| ~ spl21_31
| ~ spl21_32
| ~ spl21_77 ),
inference(subsumption_resolution,[],[f2153,f482]) ).
fof(f482,plain,
( ~ aElementOf0(sK6,sF19)
| ~ spl21_16
| ~ spl21_31 ),
inference(resolution,[],[f367,f452]) ).
fof(f452,plain,
( ! [X0] :
( ~ aElementOf0(X0,sF20)
| ~ aElementOf0(X0,sF19) )
| ~ spl21_31 ),
inference(avatar_component_clause,[],[f451]) ).
fof(f451,plain,
( spl21_31
<=> ! [X0] :
( ~ aElementOf0(X0,sF19)
| ~ aElementOf0(X0,sF20) ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_31])]) ).
fof(f367,plain,
( aElementOf0(sK6,sF20)
| ~ spl21_16 ),
inference(avatar_component_clause,[],[f365]) ).
fof(f365,plain,
( spl21_16
<=> aElementOf0(sK6,sF20) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_16])]) ).
fof(f2153,plain,
( aElementOf0(sK6,sF19)
| ~ spl21_16
| ~ spl21_18
| ~ spl21_32
| ~ spl21_77 ),
inference(subsumption_resolution,[],[f2150,f483]) ).
fof(f483,plain,
( aInteger0(sK6)
| ~ spl21_16
| ~ spl21_32 ),
inference(resolution,[],[f367,f456]) ).
fof(f456,plain,
( ! [X0] :
( ~ aElementOf0(X0,sF20)
| aInteger0(X0) )
| ~ spl21_32 ),
inference(avatar_component_clause,[],[f455]) ).
fof(f455,plain,
( spl21_32
<=> ! [X0] :
( aInteger0(X0)
| ~ aElementOf0(X0,sF20) ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_32])]) ).
fof(f2150,plain,
( ~ aInteger0(sK6)
| aElementOf0(sK6,sF19)
| ~ spl21_16
| ~ spl21_18
| ~ spl21_32
| ~ spl21_77 ),
inference(resolution,[],[f2122,f376]) ).
fof(f376,plain,
( ! [X0] :
( ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
| ~ aInteger0(X0)
| aElementOf0(X0,sF19) )
| ~ spl21_18 ),
inference(avatar_component_clause,[],[f375]) ).
fof(f375,plain,
( spl21_18
<=> ! [X0] :
( aElementOf0(X0,sF19)
| ~ aInteger0(X0)
| ~ sdteqdtlpzmzozddtrp0(X0,xa,xq) ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_18])]) ).
fof(f2122,plain,
( sdteqdtlpzmzozddtrp0(sK6,xa,xq)
| ~ spl21_16
| ~ spl21_32
| ~ spl21_77 ),
inference(subsumption_resolution,[],[f2121,f157]) ).
fof(f157,plain,
aInteger0(xa),
inference(cnf_transformation,[],[f41]) ).
fof(f41,axiom,
( sz00 != xq
& aInteger0(xq)
& aInteger0(xa) ),
file('/export/starexec/sandbox2/tmp/tmp.QM5pj4J0Zi/Vampire---4.8_24135',m__1962) ).
fof(f2121,plain,
( sdteqdtlpzmzozddtrp0(sK6,xa,xq)
| ~ aInteger0(xa)
| ~ spl21_16
| ~ spl21_32
| ~ spl21_77 ),
inference(subsumption_resolution,[],[f2120,f483]) ).
fof(f2120,plain,
( sdteqdtlpzmzozddtrp0(sK6,xa,xq)
| ~ aInteger0(sK6)
| ~ aInteger0(xa)
| ~ spl21_77 ),
inference(subsumption_resolution,[],[f2119,f158]) ).
fof(f158,plain,
aInteger0(xq),
inference(cnf_transformation,[],[f41]) ).
fof(f2119,plain,
( sdteqdtlpzmzozddtrp0(sK6,xa,xq)
| ~ aInteger0(xq)
| ~ aInteger0(sK6)
| ~ aInteger0(xa)
| ~ spl21_77 ),
inference(subsumption_resolution,[],[f2114,f159]) ).
fof(f159,plain,
sz00 != xq,
inference(cnf_transformation,[],[f41]) ).
fof(f2114,plain,
( sdteqdtlpzmzozddtrp0(sK6,xa,xq)
| sz00 = xq
| ~ aInteger0(xq)
| ~ aInteger0(sK6)
| ~ aInteger0(xa)
| ~ spl21_77 ),
inference(resolution,[],[f1978,f231]) ).
fof(f231,plain,
! [X2,X0,X1] :
( ~ sdteqdtlpzmzozddtrp0(X0,X1,X2)
| sdteqdtlpzmzozddtrp0(X1,X0,X2)
| sz00 = X2
| ~ aInteger0(X2)
| ~ aInteger0(X1)
| ~ aInteger0(X0) ),
inference(cnf_transformation,[],[f67]) ).
fof(f67,plain,
! [X0,X1,X2] :
( sdteqdtlpzmzozddtrp0(X1,X0,X2)
| ~ sdteqdtlpzmzozddtrp0(X0,X1,X2)
| sz00 = X2
| ~ aInteger0(X2)
| ~ aInteger0(X1)
| ~ aInteger0(X0) ),
inference(flattening,[],[f66]) ).
fof(f66,plain,
! [X0,X1,X2] :
( sdteqdtlpzmzozddtrp0(X1,X0,X2)
| ~ sdteqdtlpzmzozddtrp0(X0,X1,X2)
| sz00 = X2
| ~ aInteger0(X2)
| ~ aInteger0(X1)
| ~ aInteger0(X0) ),
inference(ennf_transformation,[],[f21]) ).
fof(f21,axiom,
! [X0,X1,X2] :
( ( sz00 != X2
& aInteger0(X2)
& aInteger0(X1)
& aInteger0(X0) )
=> ( sdteqdtlpzmzozddtrp0(X0,X1,X2)
=> sdteqdtlpzmzozddtrp0(X1,X0,X2) ) ),
file('/export/starexec/sandbox2/tmp/tmp.QM5pj4J0Zi/Vampire---4.8_24135',mEquModSym) ).
fof(f1978,plain,
( sdteqdtlpzmzozddtrp0(xa,sK6,xq)
| ~ spl21_77 ),
inference(avatar_component_clause,[],[f1976]) ).
fof(f1976,plain,
( spl21_77
<=> sdteqdtlpzmzozddtrp0(xa,sK6,xq) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_77])]) ).
fof(f2003,plain,
( ~ spl21_12
| ~ spl21_13
| ~ spl21_14
| ~ spl21_30
| spl21_76 ),
inference(avatar_contradiction_clause,[],[f2002]) ).
fof(f2002,plain,
( $false
| ~ spl21_12
| ~ spl21_13
| ~ spl21_14
| ~ spl21_30
| spl21_76 ),
inference(subsumption_resolution,[],[f2001,f158]) ).
fof(f2001,plain,
( ~ aInteger0(xq)
| ~ spl21_12
| ~ spl21_13
| ~ spl21_14
| ~ spl21_30
| spl21_76 ),
inference(subsumption_resolution,[],[f2000,f159]) ).
fof(f2000,plain,
( sz00 = xq
| ~ aInteger0(xq)
| ~ spl21_12
| ~ spl21_13
| ~ spl21_14
| ~ spl21_30
| spl21_76 ),
inference(resolution,[],[f1999,f761]) ).
fof(f761,plain,
( ! [X0] :
( aInteger0(sK7(X0))
| sz00 = X0
| ~ aInteger0(X0) )
| ~ spl21_13
| ~ spl21_14 ),
inference(subsumption_resolution,[],[f760,f356]) ).
fof(f356,plain,
( ! [X1] :
( sP1(X1,sK6)
| ~ aInteger0(X1)
| sz00 = X1 )
| ~ spl21_14 ),
inference(avatar_component_clause,[],[f355]) ).
fof(f355,plain,
( spl21_14
<=> ! [X1] :
( sP1(X1,sK6)
| ~ aInteger0(X1)
| sz00 = X1 ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_14])]) ).
fof(f760,plain,
( ! [X0] :
( ~ aInteger0(X0)
| sz00 = X0
| aInteger0(sK7(X0))
| ~ sP1(X0,sK6) )
| ~ spl21_13 ),
inference(resolution,[],[f352,f182]) ).
fof(f182,plain,
! [X2,X0,X1] :
( ~ aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X1,X0))
| aInteger0(X2)
| ~ sP1(X0,X1) ),
inference(cnf_transformation,[],[f115]) ).
fof(f115,plain,
! [X0,X1] :
( ! [X2] :
( ( aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X1,X0))
| ( ~ sdteqdtlpzmzozddtrp0(X2,X1,X0)
& ~ aDivisorOf0(X0,sdtpldt0(X2,smndt0(X1)))
& ! [X3] :
( sdtpldt0(X2,smndt0(X1)) != sdtasdt0(X0,X3)
| ~ aInteger0(X3) ) )
| ~ aInteger0(X2) )
& ( ( sdteqdtlpzmzozddtrp0(X2,X1,X0)
& aDivisorOf0(X0,sdtpldt0(X2,smndt0(X1)))
& sdtpldt0(X2,smndt0(X1)) = sdtasdt0(X0,sK9(X0,X1,X2))
& aInteger0(sK9(X0,X1,X2))
& aInteger0(X2) )
| ~ aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X1,X0)) ) )
| ~ sP1(X0,X1) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK9])],[f113,f114]) ).
fof(f114,plain,
! [X0,X1,X2] :
( ? [X4] :
( sdtpldt0(X2,smndt0(X1)) = sdtasdt0(X0,X4)
& aInteger0(X4) )
=> ( sdtpldt0(X2,smndt0(X1)) = sdtasdt0(X0,sK9(X0,X1,X2))
& aInteger0(sK9(X0,X1,X2)) ) ),
introduced(choice_axiom,[]) ).
fof(f113,plain,
! [X0,X1] :
( ! [X2] :
( ( aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X1,X0))
| ( ~ sdteqdtlpzmzozddtrp0(X2,X1,X0)
& ~ aDivisorOf0(X0,sdtpldt0(X2,smndt0(X1)))
& ! [X3] :
( sdtpldt0(X2,smndt0(X1)) != sdtasdt0(X0,X3)
| ~ aInteger0(X3) ) )
| ~ aInteger0(X2) )
& ( ( sdteqdtlpzmzozddtrp0(X2,X1,X0)
& aDivisorOf0(X0,sdtpldt0(X2,smndt0(X1)))
& ? [X4] :
( sdtpldt0(X2,smndt0(X1)) = sdtasdt0(X0,X4)
& aInteger0(X4) )
& aInteger0(X2) )
| ~ aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X1,X0)) ) )
| ~ sP1(X0,X1) ),
inference(rectify,[],[f112]) ).
fof(f112,plain,
! [X5,X4] :
( ! [X6] :
( ( aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5))
| ( ~ sdteqdtlpzmzozddtrp0(X6,X4,X5)
& ~ aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ! [X7] :
( sdtpldt0(X6,smndt0(X4)) != sdtasdt0(X5,X7)
| ~ aInteger0(X7) ) )
| ~ aInteger0(X6) )
& ( ( sdteqdtlpzmzozddtrp0(X6,X4,X5)
& aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ? [X8] :
( sdtpldt0(X6,smndt0(X4)) = sdtasdt0(X5,X8)
& aInteger0(X8) )
& aInteger0(X6) )
| ~ aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5)) ) )
| ~ sP1(X5,X4) ),
inference(nnf_transformation,[],[f95]) ).
fof(f95,plain,
! [X5,X4] :
( ! [X6] :
( ( aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5))
| ( ~ sdteqdtlpzmzozddtrp0(X6,X4,X5)
& ~ aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ! [X7] :
( sdtpldt0(X6,smndt0(X4)) != sdtasdt0(X5,X7)
| ~ aInteger0(X7) ) )
| ~ aInteger0(X6) )
& ( ( sdteqdtlpzmzozddtrp0(X6,X4,X5)
& aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ? [X8] :
( sdtpldt0(X6,smndt0(X4)) = sdtasdt0(X5,X8)
& aInteger0(X8) )
& aInteger0(X6) )
| ~ aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5)) ) )
| ~ sP1(X5,X4) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP1])]) ).
fof(f352,plain,
( ! [X1] :
( aElementOf0(sK7(X1),szAzrzSzezqlpdtcmdtrp0(sK6,X1))
| ~ aInteger0(X1)
| sz00 = X1 )
| ~ spl21_13 ),
inference(avatar_component_clause,[],[f351]) ).
fof(f351,plain,
( spl21_13
<=> ! [X1] :
( aElementOf0(sK7(X1),szAzrzSzezqlpdtcmdtrp0(sK6,X1))
| ~ aInteger0(X1)
| sz00 = X1 ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_13])]) ).
fof(f1999,plain,
( ~ aInteger0(sK7(xq))
| ~ spl21_12
| ~ spl21_30
| spl21_76 ),
inference(subsumption_resolution,[],[f1998,f158]) ).
fof(f1998,plain,
( ~ aInteger0(sK7(xq))
| ~ aInteger0(xq)
| ~ spl21_12
| ~ spl21_30
| spl21_76 ),
inference(subsumption_resolution,[],[f1997,f159]) ).
fof(f1997,plain,
( sz00 = xq
| ~ aInteger0(sK7(xq))
| ~ aInteger0(xq)
| ~ spl21_12
| ~ spl21_30
| spl21_76 ),
inference(resolution,[],[f1974,f612]) ).
fof(f612,plain,
( ! [X0] :
( aElementOf0(sK7(X0),sF19)
| sz00 = X0
| ~ aInteger0(sK7(X0))
| ~ aInteger0(X0) )
| ~ spl21_12
| ~ spl21_30 ),
inference(resolution,[],[f348,f448]) ).
fof(f448,plain,
( ! [X0] :
( aElementOf0(X0,sF20)
| ~ aInteger0(X0)
| aElementOf0(X0,sF19) )
| ~ spl21_30 ),
inference(avatar_component_clause,[],[f447]) ).
fof(f447,plain,
( spl21_30
<=> ! [X0] :
( aElementOf0(X0,sF20)
| ~ aInteger0(X0)
| aElementOf0(X0,sF19) ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_30])]) ).
fof(f348,plain,
( ! [X1] :
( ~ aElementOf0(sK7(X1),sF20)
| ~ aInteger0(X1)
| sz00 = X1 )
| ~ spl21_12 ),
inference(avatar_component_clause,[],[f347]) ).
fof(f347,plain,
( spl21_12
<=> ! [X1] :
( ~ aElementOf0(sK7(X1),sF20)
| ~ aInteger0(X1)
| sz00 = X1 ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_12])]) ).
fof(f1974,plain,
( ~ aElementOf0(sK7(xq),sF19)
| spl21_76 ),
inference(avatar_component_clause,[],[f1972]) ).
fof(f1972,plain,
( spl21_76
<=> aElementOf0(sK7(xq),sF19) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_76])]) ).
fof(f1979,plain,
( ~ spl21_76
| spl21_77
| ~ spl21_13
| ~ spl21_14
| ~ spl21_16
| ~ spl21_21
| ~ spl21_25
| ~ spl21_32 ),
inference(avatar_split_clause,[],[f1970,f455,f410,f390,f365,f355,f351,f1976,f1972]) ).
fof(f390,plain,
( spl21_21
<=> ! [X0] :
( ~ aElementOf0(X0,sF19)
| sdteqdtlpzmzozddtrp0(X0,xa,xq) ) ),
introduced(avatar_definition,[new_symbols(naming,[spl21_21])]) ).
fof(f1970,plain,
( sdteqdtlpzmzozddtrp0(xa,sK6,xq)
| ~ aElementOf0(sK7(xq),sF19)
| ~ spl21_13
| ~ spl21_14
| ~ spl21_16
| ~ spl21_21
| ~ spl21_25
| ~ spl21_32 ),
inference(subsumption_resolution,[],[f1969,f157]) ).
fof(f1969,plain,
( sdteqdtlpzmzozddtrp0(xa,sK6,xq)
| ~ aInteger0(xa)
| ~ aElementOf0(sK7(xq),sF19)
| ~ spl21_13
| ~ spl21_14
| ~ spl21_16
| ~ spl21_21
| ~ spl21_25
| ~ spl21_32 ),
inference(subsumption_resolution,[],[f1968,f158]) ).
fof(f1968,plain,
( sdteqdtlpzmzozddtrp0(xa,sK6,xq)
| ~ aInteger0(xq)
| ~ aInteger0(xa)
| ~ aElementOf0(sK7(xq),sF19)
| ~ spl21_13
| ~ spl21_14
| ~ spl21_16
| ~ spl21_21
| ~ spl21_25
| ~ spl21_32 ),
inference(subsumption_resolution,[],[f1962,f159]) ).
fof(f1962,plain,
( sdteqdtlpzmzozddtrp0(xa,sK6,xq)
| sz00 = xq
| ~ aInteger0(xq)
| ~ aInteger0(xa)
| ~ aElementOf0(sK7(xq),sF19)
| ~ spl21_13
| ~ spl21_14
| ~ spl21_16
| ~ spl21_21
| ~ spl21_25
| ~ spl21_32 ),
inference(resolution,[],[f1959,f1232]) ).
fof(f1232,plain,
( ! [X0] :
( sdteqdtlpzmzozddtrp0(xa,X0,xq)
| ~ aElementOf0(X0,sF19) )
| ~ spl21_21
| ~ spl21_25 ),
inference(subsumption_resolution,[],[f1231,f411]) ).
fof(f1231,plain,
( ! [X0] :
( sdteqdtlpzmzozddtrp0(xa,X0,xq)
| ~ aInteger0(X0)
| ~ aElementOf0(X0,sF19) )
| ~ spl21_21 ),
inference(subsumption_resolution,[],[f1230,f157]) ).
fof(f1230,plain,
( ! [X0] :
( sdteqdtlpzmzozddtrp0(xa,X0,xq)
| ~ aInteger0(xa)
| ~ aInteger0(X0)
| ~ aElementOf0(X0,sF19) )
| ~ spl21_21 ),
inference(subsumption_resolution,[],[f1229,f158]) ).
fof(f1229,plain,
( ! [X0] :
( sdteqdtlpzmzozddtrp0(xa,X0,xq)
| ~ aInteger0(xq)
| ~ aInteger0(xa)
| ~ aInteger0(X0)
| ~ aElementOf0(X0,sF19) )
| ~ spl21_21 ),
inference(subsumption_resolution,[],[f1224,f159]) ).
fof(f1224,plain,
( ! [X0] :
( sdteqdtlpzmzozddtrp0(xa,X0,xq)
| sz00 = xq
| ~ aInteger0(xq)
| ~ aInteger0(xa)
| ~ aInteger0(X0)
| ~ aElementOf0(X0,sF19) )
| ~ spl21_21 ),
inference(resolution,[],[f231,f391]) ).
fof(f391,plain,
( ! [X0] :
( sdteqdtlpzmzozddtrp0(X0,xa,xq)
| ~ aElementOf0(X0,sF19) )
| ~ spl21_21 ),
inference(avatar_component_clause,[],[f390]) ).
fof(f1959,plain,
( ! [X0,X1] :
( ~ sdteqdtlpzmzozddtrp0(X0,sK7(X1),X1)
| sdteqdtlpzmzozddtrp0(X0,sK6,X1)
| sz00 = X1
| ~ aInteger0(X1)
| ~ aInteger0(X0) )
| ~ spl21_13
| ~ spl21_14
| ~ spl21_16
| ~ spl21_32 ),
inference(subsumption_resolution,[],[f1958,f761]) ).
fof(f1958,plain,
( ! [X0,X1] :
( sdteqdtlpzmzozddtrp0(X0,sK6,X1)
| ~ sdteqdtlpzmzozddtrp0(X0,sK7(X1),X1)
| sz00 = X1
| ~ aInteger0(X1)
| ~ aInteger0(sK7(X1))
| ~ aInteger0(X0) )
| ~ spl21_13
| ~ spl21_14
| ~ spl21_16
| ~ spl21_32 ),
inference(subsumption_resolution,[],[f1937,f483]) ).
fof(f1937,plain,
( ! [X0,X1] :
( sdteqdtlpzmzozddtrp0(X0,sK6,X1)
| ~ sdteqdtlpzmzozddtrp0(X0,sK7(X1),X1)
| ~ aInteger0(sK6)
| sz00 = X1
| ~ aInteger0(X1)
| ~ aInteger0(sK7(X1))
| ~ aInteger0(X0) )
| ~ spl21_13
| ~ spl21_14 ),
inference(duplicate_literal_removal,[],[f1936]) ).
fof(f1936,plain,
( ! [X0,X1] :
( sdteqdtlpzmzozddtrp0(X0,sK6,X1)
| ~ sdteqdtlpzmzozddtrp0(X0,sK7(X1),X1)
| ~ aInteger0(sK6)
| sz00 = X1
| ~ aInteger0(X1)
| ~ aInteger0(sK7(X1))
| ~ aInteger0(X0)
| ~ aInteger0(X1)
| sz00 = X1 )
| ~ spl21_13
| ~ spl21_14 ),
inference(resolution,[],[f230,f793]) ).
fof(f793,plain,
( ! [X0] :
( sdteqdtlpzmzozddtrp0(sK7(X0),sK6,X0)
| ~ aInteger0(X0)
| sz00 = X0 )
| ~ spl21_13
| ~ spl21_14 ),
inference(subsumption_resolution,[],[f789,f356]) ).
fof(f789,plain,
( ! [X0] :
( sdteqdtlpzmzozddtrp0(sK7(X0),sK6,X0)
| ~ sP1(X0,sK6)
| ~ aInteger0(X0)
| sz00 = X0 )
| ~ spl21_13 ),
inference(resolution,[],[f186,f352]) ).
fof(f186,plain,
! [X2,X0,X1] :
( ~ aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X1,X0))
| sdteqdtlpzmzozddtrp0(X2,X1,X0)
| ~ sP1(X0,X1) ),
inference(cnf_transformation,[],[f115]) ).
fof(f230,plain,
! [X2,X3,X0,X1] :
( ~ sdteqdtlpzmzozddtrp0(X1,X3,X2)
| sdteqdtlpzmzozddtrp0(X0,X3,X2)
| ~ sdteqdtlpzmzozddtrp0(X0,X1,X2)
| ~ aInteger0(X3)
| sz00 = X2
| ~ aInteger0(X2)
| ~ aInteger0(X1)
| ~ aInteger0(X0) ),
inference(cnf_transformation,[],[f65]) ).
fof(f65,plain,
! [X0,X1,X2,X3] :
( sdteqdtlpzmzozddtrp0(X0,X3,X2)
| ~ sdteqdtlpzmzozddtrp0(X1,X3,X2)
| ~ sdteqdtlpzmzozddtrp0(X0,X1,X2)
| ~ aInteger0(X3)
| sz00 = X2
| ~ aInteger0(X2)
| ~ aInteger0(X1)
| ~ aInteger0(X0) ),
inference(flattening,[],[f64]) ).
fof(f64,plain,
! [X0,X1,X2,X3] :
( sdteqdtlpzmzozddtrp0(X0,X3,X2)
| ~ sdteqdtlpzmzozddtrp0(X1,X3,X2)
| ~ sdteqdtlpzmzozddtrp0(X0,X1,X2)
| ~ aInteger0(X3)
| sz00 = X2
| ~ aInteger0(X2)
| ~ aInteger0(X1)
| ~ aInteger0(X0) ),
inference(ennf_transformation,[],[f22]) ).
fof(f22,axiom,
! [X0,X1,X2,X3] :
( ( aInteger0(X3)
& sz00 != X2
& aInteger0(X2)
& aInteger0(X1)
& aInteger0(X0) )
=> ( ( sdteqdtlpzmzozddtrp0(X1,X3,X2)
& sdteqdtlpzmzozddtrp0(X0,X1,X2) )
=> sdteqdtlpzmzozddtrp0(X0,X3,X2) ) ),
file('/export/starexec/sandbox2/tmp/tmp.QM5pj4J0Zi/Vampire---4.8_24135',mEquModTrn) ).
fof(f463,plain,
( spl21_1
| spl21_17 ),
inference(avatar_split_clause,[],[f198,f371,f291]) ).
fof(f291,plain,
( spl21_1
<=> sP4 ),
introduced(avatar_definition,[new_symbols(naming,[spl21_1])]) ).
fof(f371,plain,
( spl21_17
<=> sP2 ),
introduced(avatar_definition,[new_symbols(naming,[spl21_17])]) ).
fof(f198,plain,
( sP2
| sP4 ),
inference(cnf_transformation,[],[f122]) ).
fof(f122,plain,
( ( ~ isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
& ~ isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& sP3
& ! [X0] :
( ( aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ aInteger0(X0) )
& ( ( ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X0) )
| ~ aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& sP2 )
| sP4 ),
inference(rectify,[],[f121]) ).
fof(f121,plain,
( ( ~ isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
& ~ isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& sP3
& ! [X3] :
( ( aElementOf0(X3,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| aElementOf0(X3,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ aInteger0(X3) )
& ( ( ~ aElementOf0(X3,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X3) )
| ~ aElementOf0(X3,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& sP2 )
| sP4 ),
inference(flattening,[],[f120]) ).
fof(f120,plain,
( ( ~ isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
& ~ isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& sP3
& ! [X3] :
( ( aElementOf0(X3,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| aElementOf0(X3,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ aInteger0(X3) )
& ( ( ~ aElementOf0(X3,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X3) )
| ~ aElementOf0(X3,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& sP2 )
| sP4 ),
inference(nnf_transformation,[],[f99]) ).
fof(f99,plain,
( ( ~ isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
& ~ isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& sP3
& ! [X3] :
( aElementOf0(X3,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
<=> ( ~ aElementOf0(X3,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X3) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& sP2 )
| sP4 ),
inference(definition_folding,[],[f50,f98,f97,f96,f95,f94]) ).
fof(f94,plain,
( ! [X10] :
( ( aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X10,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ! [X11] :
( sdtpldt0(X10,smndt0(xa)) != sdtasdt0(xq,X11)
| ~ aInteger0(X11) ) )
| ~ aInteger0(X10) )
& ( ( sdteqdtlpzmzozddtrp0(X10,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ? [X12] :
( sdtpldt0(X10,smndt0(xa)) = sdtasdt0(xq,X12)
& aInteger0(X12) )
& aInteger0(X10) )
| ~ aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
| ~ sP0 ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP0])]) ).
fof(f96,plain,
( ! [X0] :
( ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ! [X1] :
( sdtasdt0(xq,X1) != sdtpldt0(X0,smndt0(xa))
| ~ aInteger0(X1) ) )
| ~ aInteger0(X0) )
& ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X2] :
( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,X2)
& aInteger0(X2) )
& aInteger0(X0) )
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
| ~ sP2 ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP2])]) ).
fof(f97,plain,
( ? [X4] :
( ! [X5] :
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X4,X5),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X9] :
( ~ aElementOf0(X9,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(X9,szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
& sP1(X5,X4)
& aSet0(szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
| sz00 = X5
| ~ aInteger0(X5) )
& aElementOf0(X4,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
| ~ sP3 ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP3])]) ).
fof(f98,plain,
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
& ? [X14] :
( ~ aElementOf0(X14,cS1395)
& aElementOf0(X14,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ! [X13] :
( aElementOf0(X13,cS1395)
<=> aInteger0(X13) )
& aSet0(cS1395)
& sP0
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
| ~ sP4 ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP4])]) ).
fof(f50,plain,
( ( ~ isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
& ~ isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X4] :
( ! [X5] :
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X4,X5),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X9] :
( ~ aElementOf0(X9,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(X9,szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
& ! [X6] :
( ( aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5))
| ( ~ sdteqdtlpzmzozddtrp0(X6,X4,X5)
& ~ aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ! [X7] :
( sdtpldt0(X6,smndt0(X4)) != sdtasdt0(X5,X7)
| ~ aInteger0(X7) ) )
| ~ aInteger0(X6) )
& ( ( sdteqdtlpzmzozddtrp0(X6,X4,X5)
& aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ? [X8] :
( sdtpldt0(X6,smndt0(X4)) = sdtasdt0(X5,X8)
& aInteger0(X8) )
& aInteger0(X6) )
| ~ aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5)) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
| sz00 = X5
| ~ aInteger0(X5) )
& aElementOf0(X4,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
& ! [X3] :
( aElementOf0(X3,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
<=> ( ~ aElementOf0(X3,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X3) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ! [X0] :
( ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ! [X1] :
( sdtasdt0(xq,X1) != sdtpldt0(X0,smndt0(xa))
| ~ aInteger0(X1) ) )
| ~ aInteger0(X0) )
& ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X2] :
( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,X2)
& aInteger0(X2) )
& aInteger0(X0) )
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) ) )
| ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
& ? [X14] :
( ~ aElementOf0(X14,cS1395)
& aElementOf0(X14,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ! [X13] :
( aElementOf0(X13,cS1395)
<=> aInteger0(X13) )
& aSet0(cS1395)
& ! [X10] :
( ( aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X10,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ! [X11] :
( sdtpldt0(X10,smndt0(xa)) != sdtasdt0(xq,X11)
| ~ aInteger0(X11) ) )
| ~ aInteger0(X10) )
& ( ( sdteqdtlpzmzozddtrp0(X10,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ? [X12] :
( sdtpldt0(X10,smndt0(xa)) = sdtasdt0(xq,X12)
& aInteger0(X12) )
& aInteger0(X10) )
| ~ aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) ),
inference(flattening,[],[f49]) ).
fof(f49,plain,
( ( ~ isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
& ~ isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X4] :
( ! [X5] :
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X4,X5),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X9] :
( ~ aElementOf0(X9,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(X9,szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
& ! [X6] :
( ( aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5))
| ( ~ sdteqdtlpzmzozddtrp0(X6,X4,X5)
& ~ aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ! [X7] :
( sdtpldt0(X6,smndt0(X4)) != sdtasdt0(X5,X7)
| ~ aInteger0(X7) ) )
| ~ aInteger0(X6) )
& ( ( sdteqdtlpzmzozddtrp0(X6,X4,X5)
& aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ? [X8] :
( sdtpldt0(X6,smndt0(X4)) = sdtasdt0(X5,X8)
& aInteger0(X8) )
& aInteger0(X6) )
| ~ aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5)) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
| sz00 = X5
| ~ aInteger0(X5) )
& aElementOf0(X4,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
& ! [X3] :
( aElementOf0(X3,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
<=> ( ~ aElementOf0(X3,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X3) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ! [X0] :
( ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ! [X1] :
( sdtasdt0(xq,X1) != sdtpldt0(X0,smndt0(xa))
| ~ aInteger0(X1) ) )
| ~ aInteger0(X0) )
& ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X2] :
( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,X2)
& aInteger0(X2) )
& aInteger0(X0) )
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) ) )
| ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
& ? [X14] :
( ~ aElementOf0(X14,cS1395)
& aElementOf0(X14,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ! [X13] :
( aElementOf0(X13,cS1395)
<=> aInteger0(X13) )
& aSet0(cS1395)
& ! [X10] :
( ( aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X10,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ! [X11] :
( sdtpldt0(X10,smndt0(xa)) != sdtasdt0(xq,X11)
| ~ aInteger0(X11) ) )
| ~ aInteger0(X10) )
& ( ( sdteqdtlpzmzozddtrp0(X10,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ? [X12] :
( sdtpldt0(X10,smndt0(xa)) = sdtasdt0(xq,X12)
& aInteger0(X12) )
& aInteger0(X10) )
| ~ aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) ),
inference(ennf_transformation,[],[f44]) ).
fof(f44,plain,
~ ( ( ! [X0] :
( ( ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
| aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
| ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) ) )
& aInteger0(X0) )
=> aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X2] :
( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,X2)
& aInteger0(X2) )
& aInteger0(X0) ) ) )
=> ( isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ( ! [X3] :
( aElementOf0(X3,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
<=> ( ~ aElementOf0(X3,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X3) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
=> ( isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| ! [X4] :
( aElementOf0(X4,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
=> ? [X5] :
( ( ( ! [X6] :
( ( ( ( sdteqdtlpzmzozddtrp0(X6,X4,X5)
| aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
| ? [X7] :
( sdtpldt0(X6,smndt0(X4)) = sdtasdt0(X5,X7)
& aInteger0(X7) ) )
& aInteger0(X6) )
=> aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
& ( aElementOf0(X6,szAzrzSzezqlpdtcmdtrp0(X4,X5))
=> ( sdteqdtlpzmzozddtrp0(X6,X4,X5)
& aDivisorOf0(X5,sdtpldt0(X6,smndt0(X4)))
& ? [X8] :
( sdtpldt0(X6,smndt0(X4)) = sdtasdt0(X5,X8)
& aInteger0(X8) )
& aInteger0(X6) ) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
=> ( aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X4,X5),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| ! [X9] :
( aElementOf0(X9,szAzrzSzezqlpdtcmdtrp0(X4,X5))
=> aElementOf0(X9,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) ) ) )
& sz00 != X5
& aInteger0(X5) ) ) ) ) ) )
& ( ( ! [X10] :
( ( ( ( sdteqdtlpzmzozddtrp0(X10,xa,xq)
| aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
| ? [X11] :
( sdtpldt0(X10,smndt0(xa)) = sdtasdt0(xq,X11)
& aInteger0(X11) ) )
& aInteger0(X10) )
=> aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ( aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> ( sdteqdtlpzmzozddtrp0(X10,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ? [X12] :
( sdtpldt0(X10,smndt0(xa)) = sdtasdt0(xq,X12)
& aInteger0(X12) )
& aInteger0(X10) ) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
=> ( ( ! [X13] :
( aElementOf0(X13,cS1395)
<=> aInteger0(X13) )
& aSet0(cS1395) )
=> ( aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
| ! [X14] :
( aElementOf0(X14,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> aElementOf0(X14,cS1395) ) ) ) ) ),
inference(rectify,[],[f43]) ).
fof(f43,negated_conjecture,
~ ( ( ! [X0] :
( ( ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
| aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
| ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) ) )
& aInteger0(X0) )
=> aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) )
& aInteger0(X0) ) ) )
=> ( isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ( ! [X0] :
( aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
<=> ( ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X0) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
=> ( isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| ! [X0] :
( aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
=> ? [X1] :
( ( ( ! [X2] :
( ( ( ( sdteqdtlpzmzozddtrp0(X2,X0,X1)
| aDivisorOf0(X1,sdtpldt0(X2,smndt0(X0)))
| ? [X3] :
( sdtasdt0(X1,X3) = sdtpldt0(X2,smndt0(X0))
& aInteger0(X3) ) )
& aInteger0(X2) )
=> aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X0,X1)) )
& ( aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X0,X1))
=> ( sdteqdtlpzmzozddtrp0(X2,X0,X1)
& aDivisorOf0(X1,sdtpldt0(X2,smndt0(X0)))
& ? [X3] :
( sdtasdt0(X1,X3) = sdtpldt0(X2,smndt0(X0))
& aInteger0(X3) )
& aInteger0(X2) ) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(X0,X1)) )
=> ( aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X0,X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| ! [X2] :
( aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X0,X1))
=> aElementOf0(X2,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) ) ) )
& sz00 != X1
& aInteger0(X1) ) ) ) ) ) )
& ( ( ! [X0] :
( ( ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
| aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
| ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) ) )
& aInteger0(X0) )
=> aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) )
& aInteger0(X0) ) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
=> ( ( ! [X0] :
( aElementOf0(X0,cS1395)
<=> aInteger0(X0) )
& aSet0(cS1395) )
=> ( aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
| ! [X0] :
( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> aElementOf0(X0,cS1395) ) ) ) ) ),
inference(negated_conjecture,[],[f42]) ).
fof(f42,conjecture,
( ( ! [X0] :
( ( ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
| aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
| ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) ) )
& aInteger0(X0) )
=> aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) )
& aInteger0(X0) ) ) )
=> ( isClosed0(szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ( ! [X0] :
( aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
<=> ( ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& aInteger0(X0) ) )
& aSet0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
=> ( isOpen0(stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| ! [X0] :
( aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
=> ? [X1] :
( ( ( ! [X2] :
( ( ( ( sdteqdtlpzmzozddtrp0(X2,X0,X1)
| aDivisorOf0(X1,sdtpldt0(X2,smndt0(X0)))
| ? [X3] :
( sdtasdt0(X1,X3) = sdtpldt0(X2,smndt0(X0))
& aInteger0(X3) ) )
& aInteger0(X2) )
=> aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X0,X1)) )
& ( aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X0,X1))
=> ( sdteqdtlpzmzozddtrp0(X2,X0,X1)
& aDivisorOf0(X1,sdtpldt0(X2,smndt0(X0)))
& ? [X3] :
( sdtasdt0(X1,X3) = sdtpldt0(X2,smndt0(X0))
& aInteger0(X3) )
& aInteger0(X2) ) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(X0,X1)) )
=> ( aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X0,X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| ! [X2] :
( aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X0,X1))
=> aElementOf0(X2,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) ) ) )
& sz00 != X1
& aInteger0(X1) ) ) ) ) ) )
& ( ( ! [X0] :
( ( ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
| aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
| ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) ) )
& aInteger0(X0) )
=> aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X1] :
( sdtasdt0(xq,X1) = sdtpldt0(X0,smndt0(xa))
& aInteger0(X1) )
& aInteger0(X0) ) ) )
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
=> ( ( ! [X0] :
( aElementOf0(X0,cS1395)
<=> aInteger0(X0) )
& aSet0(cS1395) )
=> ( aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
| ! [X0] :
( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
=> aElementOf0(X0,cS1395) ) ) ) ) ),
file('/export/starexec/sandbox2/tmp/tmp.QM5pj4J0Zi/Vampire---4.8_24135',m__) ).
fof(f457,plain,
( spl21_1
| spl21_32 ),
inference(avatar_split_clause,[],[f287,f455,f291]) ).
fof(f287,plain,
! [X0] :
( aInteger0(X0)
| ~ aElementOf0(X0,sF20)
| sP4 ),
inference(definition_folding,[],[f200,f283,f281]) ).
fof(f281,plain,
szAzrzSzezqlpdtcmdtrp0(xa,xq) = sF19,
introduced(function_definition,[new_symbols(definition,[sF19])]) ).
fof(f283,plain,
stldt0(sF19) = sF20,
introduced(function_definition,[new_symbols(definition,[sF20])]) ).
fof(f200,plain,
! [X0] :
( aInteger0(X0)
| ~ aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| sP4 ),
inference(cnf_transformation,[],[f122]) ).
fof(f453,plain,
( spl21_1
| spl21_31 ),
inference(avatar_split_clause,[],[f286,f451,f291]) ).
fof(f286,plain,
! [X0] :
( ~ aElementOf0(X0,sF19)
| ~ aElementOf0(X0,sF20)
| sP4 ),
inference(definition_folding,[],[f201,f283,f281,f281]) ).
fof(f201,plain,
! [X0] :
( ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| sP4 ),
inference(cnf_transformation,[],[f122]) ).
fof(f449,plain,
( spl21_1
| spl21_30 ),
inference(avatar_split_clause,[],[f285,f447,f291]) ).
fof(f285,plain,
! [X0] :
( aElementOf0(X0,sF20)
| aElementOf0(X0,sF19)
| ~ aInteger0(X0)
| sP4 ),
inference(definition_folding,[],[f202,f281,f283,f281]) ).
fof(f202,plain,
! [X0] :
( aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ aInteger0(X0)
| sP4 ),
inference(cnf_transformation,[],[f122]) ).
fof(f445,plain,
( spl21_1
| spl21_10 ),
inference(avatar_split_clause,[],[f203,f337,f291]) ).
fof(f337,plain,
( spl21_10
<=> sP3 ),
introduced(avatar_definition,[new_symbols(naming,[spl21_10])]) ).
fof(f203,plain,
( sP3
| sP4 ),
inference(cnf_transformation,[],[f122]) ).
fof(f434,plain,
( ~ spl21_8
| spl21_25 ),
inference(avatar_split_clause,[],[f433,f410,f324]) ).
fof(f324,plain,
( spl21_8
<=> sP0 ),
introduced(avatar_definition,[new_symbols(naming,[spl21_8])]) ).
fof(f433,plain,
! [X0] :
( ~ aElementOf0(X0,sF19)
| aInteger0(X0)
| ~ sP0 ),
inference(forward_demodulation,[],[f190,f281]) ).
fof(f190,plain,
! [X0] :
( aInteger0(X0)
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ sP0 ),
inference(cnf_transformation,[],[f119]) ).
fof(f119,plain,
( ! [X0] :
( ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ! [X1] :
( sdtasdt0(xq,X1) != sdtpldt0(X0,smndt0(xa))
| ~ aInteger0(X1) ) )
| ~ aInteger0(X0) )
& ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,sK10(X0))
& aInteger0(sK10(X0))
& aInteger0(X0) )
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
| ~ sP0 ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK10])],[f117,f118]) ).
fof(f118,plain,
! [X0] :
( ? [X2] :
( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,X2)
& aInteger0(X2) )
=> ( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,sK10(X0))
& aInteger0(sK10(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f117,plain,
( ! [X0] :
( ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ! [X1] :
( sdtasdt0(xq,X1) != sdtpldt0(X0,smndt0(xa))
| ~ aInteger0(X1) ) )
| ~ aInteger0(X0) )
& ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X2] :
( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,X2)
& aInteger0(X2) )
& aInteger0(X0) )
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
| ~ sP0 ),
inference(rectify,[],[f116]) ).
fof(f116,plain,
( ! [X10] :
( ( aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X10,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ! [X11] :
( sdtpldt0(X10,smndt0(xa)) != sdtasdt0(xq,X11)
| ~ aInteger0(X11) ) )
| ~ aInteger0(X10) )
& ( ( sdteqdtlpzmzozddtrp0(X10,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X10,smndt0(xa)))
& ? [X12] :
( sdtpldt0(X10,smndt0(xa)) = sdtasdt0(xq,X12)
& aInteger0(X12) )
& aInteger0(X10) )
| ~ aElementOf0(X10,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
| ~ sP0 ),
inference(nnf_transformation,[],[f94]) ).
fof(f412,plain,
( ~ spl21_17
| spl21_25 ),
inference(avatar_split_clause,[],[f408,f410,f371]) ).
fof(f408,plain,
! [X0] :
( ~ aElementOf0(X0,sF19)
| aInteger0(X0)
| ~ sP2 ),
inference(forward_demodulation,[],[f174,f281]) ).
fof(f174,plain,
! [X0] :
( aInteger0(X0)
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ sP2 ),
inference(cnf_transformation,[],[f111]) ).
fof(f111,plain,
( ! [X0] :
( ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ! [X1] :
( sdtasdt0(xq,X1) != sdtpldt0(X0,smndt0(xa))
| ~ aInteger0(X1) ) )
| ~ aInteger0(X0) )
& ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,sK8(X0))
& aInteger0(sK8(X0))
& aInteger0(X0) )
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
| ~ sP2 ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK8])],[f109,f110]) ).
fof(f110,plain,
! [X0] :
( ? [X2] :
( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,X2)
& aInteger0(X2) )
=> ( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,sK8(X0))
& aInteger0(sK8(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f109,plain,
( ! [X0] :
( ( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ( ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
& ~ aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ! [X1] :
( sdtasdt0(xq,X1) != sdtpldt0(X0,smndt0(xa))
| ~ aInteger0(X1) ) )
| ~ aInteger0(X0) )
& ( ( sdteqdtlpzmzozddtrp0(X0,xa,xq)
& aDivisorOf0(xq,sdtpldt0(X0,smndt0(xa)))
& ? [X2] :
( sdtpldt0(X0,smndt0(xa)) = sdtasdt0(xq,X2)
& aInteger0(X2) )
& aInteger0(X0) )
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) )
| ~ sP2 ),
inference(nnf_transformation,[],[f96]) ).
fof(f392,plain,
( ~ spl21_17
| spl21_21 ),
inference(avatar_split_clause,[],[f388,f390,f371]) ).
fof(f388,plain,
! [X0] :
( ~ aElementOf0(X0,sF19)
| sdteqdtlpzmzozddtrp0(X0,xa,xq)
| ~ sP2 ),
inference(forward_demodulation,[],[f178,f281]) ).
fof(f178,plain,
! [X0] :
( sdteqdtlpzmzozddtrp0(X0,xa,xq)
| ~ aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ sP2 ),
inference(cnf_transformation,[],[f111]) ).
fof(f377,plain,
( ~ spl21_17
| spl21_18 ),
inference(avatar_split_clause,[],[f369,f375,f371]) ).
fof(f369,plain,
! [X0] :
( aElementOf0(X0,sF19)
| ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
| ~ aInteger0(X0)
| ~ sP2 ),
inference(forward_demodulation,[],[f181,f281]) ).
fof(f181,plain,
! [X0] :
( aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ sdteqdtlpzmzozddtrp0(X0,xa,xq)
| ~ aInteger0(X0)
| ~ sP2 ),
inference(cnf_transformation,[],[f111]) ).
fof(f368,plain,
( ~ spl21_10
| spl21_16 ),
inference(avatar_split_clause,[],[f363,f365,f337]) ).
fof(f363,plain,
( aElementOf0(sK6,sF20)
| ~ sP3 ),
inference(forward_demodulation,[],[f362,f283]) ).
fof(f362,plain,
( aElementOf0(sK6,stldt0(sF19))
| ~ sP3 ),
inference(forward_demodulation,[],[f168,f281]) ).
fof(f168,plain,
( aElementOf0(sK6,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| ~ sP3 ),
inference(cnf_transformation,[],[f108]) ).
fof(f108,plain,
( ( ! [X1] :
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(sK6,X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ~ aElementOf0(sK7(X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(sK7(X1),szAzrzSzezqlpdtcmdtrp0(sK6,X1))
& sP1(X1,sK6)
& aSet0(szAzrzSzezqlpdtcmdtrp0(sK6,X1)) )
| sz00 = X1
| ~ aInteger0(X1) )
& aElementOf0(sK6,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
| ~ sP3 ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK6,sK7])],[f105,f107,f106]) ).
fof(f106,plain,
( ? [X0] :
( ! [X1] :
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X0,X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X2] :
( ~ aElementOf0(X2,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X0,X1)) )
& sP1(X1,X0)
& aSet0(szAzrzSzezqlpdtcmdtrp0(X0,X1)) )
| sz00 = X1
| ~ aInteger0(X1) )
& aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
=> ( ! [X1] :
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(sK6,X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X2] :
( ~ aElementOf0(X2,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(sK6,X1)) )
& sP1(X1,sK6)
& aSet0(szAzrzSzezqlpdtcmdtrp0(sK6,X1)) )
| sz00 = X1
| ~ aInteger0(X1) )
& aElementOf0(sK6,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) ) ),
introduced(choice_axiom,[]) ).
fof(f107,plain,
! [X1] :
( ? [X2] :
( ~ aElementOf0(X2,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(sK6,X1)) )
=> ( ~ aElementOf0(sK7(X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(sK7(X1),szAzrzSzezqlpdtcmdtrp0(sK6,X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f105,plain,
( ? [X0] :
( ! [X1] :
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X0,X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X2] :
( ~ aElementOf0(X2,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(X2,szAzrzSzezqlpdtcmdtrp0(X0,X1)) )
& sP1(X1,X0)
& aSet0(szAzrzSzezqlpdtcmdtrp0(X0,X1)) )
| sz00 = X1
| ~ aInteger0(X1) )
& aElementOf0(X0,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
| ~ sP3 ),
inference(rectify,[],[f104]) ).
fof(f104,plain,
( ? [X4] :
( ! [X5] :
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(X4,X5),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& ? [X9] :
( ~ aElementOf0(X9,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
& aElementOf0(X9,szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
& sP1(X5,X4)
& aSet0(szAzrzSzezqlpdtcmdtrp0(X4,X5)) )
| sz00 = X5
| ~ aInteger0(X5) )
& aElementOf0(X4,stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq))) )
| ~ sP3 ),
inference(nnf_transformation,[],[f97]) ).
fof(f357,plain,
( ~ spl21_10
| spl21_14 ),
inference(avatar_split_clause,[],[f170,f355,f337]) ).
fof(f170,plain,
! [X1] :
( sP1(X1,sK6)
| sz00 = X1
| ~ aInteger0(X1)
| ~ sP3 ),
inference(cnf_transformation,[],[f108]) ).
fof(f353,plain,
( ~ spl21_10
| spl21_13 ),
inference(avatar_split_clause,[],[f171,f351,f337]) ).
fof(f171,plain,
! [X1] :
( aElementOf0(sK7(X1),szAzrzSzezqlpdtcmdtrp0(sK6,X1))
| sz00 = X1
| ~ aInteger0(X1)
| ~ sP3 ),
inference(cnf_transformation,[],[f108]) ).
fof(f349,plain,
( ~ spl21_10
| spl21_12 ),
inference(avatar_split_clause,[],[f345,f347,f337]) ).
fof(f345,plain,
! [X1] :
( ~ aElementOf0(sK7(X1),sF20)
| sz00 = X1
| ~ aInteger0(X1)
| ~ sP3 ),
inference(forward_demodulation,[],[f344,f283]) ).
fof(f344,plain,
! [X1] :
( ~ aElementOf0(sK7(X1),stldt0(sF19))
| sz00 = X1
| ~ aInteger0(X1)
| ~ sP3 ),
inference(forward_demodulation,[],[f172,f281]) ).
fof(f172,plain,
! [X1] :
( ~ aElementOf0(sK7(X1),stldt0(szAzrzSzezqlpdtcmdtrp0(xa,xq)))
| sz00 = X1
| ~ aInteger0(X1)
| ~ sP3 ),
inference(cnf_transformation,[],[f108]) ).
fof(f327,plain,
( ~ spl21_1
| spl21_8 ),
inference(avatar_split_clause,[],[f161,f324,f291]) ).
fof(f161,plain,
( sP0
| ~ sP4 ),
inference(cnf_transformation,[],[f103]) ).
fof(f103,plain,
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
& ~ aElementOf0(sK5,cS1395)
& aElementOf0(sK5,szAzrzSzezqlpdtcmdtrp0(xa,xq))
& ! [X1] :
( ( aElementOf0(X1,cS1395)
| ~ aInteger0(X1) )
& ( aInteger0(X1)
| ~ aElementOf0(X1,cS1395) ) )
& aSet0(cS1395)
& sP0
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
| ~ sP4 ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK5])],[f101,f102]) ).
fof(f102,plain,
( ? [X0] :
( ~ aElementOf0(X0,cS1395)
& aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
=> ( ~ aElementOf0(sK5,cS1395)
& aElementOf0(sK5,szAzrzSzezqlpdtcmdtrp0(xa,xq)) ) ),
introduced(choice_axiom,[]) ).
fof(f101,plain,
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
& ? [X0] :
( ~ aElementOf0(X0,cS1395)
& aElementOf0(X0,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ! [X1] :
( ( aElementOf0(X1,cS1395)
| ~ aInteger0(X1) )
& ( aInteger0(X1)
| ~ aElementOf0(X1,cS1395) ) )
& aSet0(cS1395)
& sP0
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
| ~ sP4 ),
inference(rectify,[],[f100]) ).
fof(f100,plain,
( ( ~ aSubsetOf0(szAzrzSzezqlpdtcmdtrp0(xa,xq),cS1395)
& ? [X14] :
( ~ aElementOf0(X14,cS1395)
& aElementOf0(X14,szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
& ! [X13] :
( ( aElementOf0(X13,cS1395)
| ~ aInteger0(X13) )
& ( aInteger0(X13)
| ~ aElementOf0(X13,cS1395) ) )
& aSet0(cS1395)
& sP0
& aSet0(szAzrzSzezqlpdtcmdtrp0(xa,xq)) )
| ~ sP4 ),
inference(nnf_transformation,[],[f98]) ).
fof(f313,plain,
( ~ spl21_1
| spl21_5 ),
inference(avatar_split_clause,[],[f164,f311,f291]) ).
fof(f164,plain,
! [X1] :
( aElementOf0(X1,cS1395)
| ~ aInteger0(X1)
| ~ sP4 ),
inference(cnf_transformation,[],[f103]) ).
fof(f309,plain,
( ~ spl21_1
| spl21_4 ),
inference(avatar_split_clause,[],[f304,f306,f291]) ).
fof(f304,plain,
( aElementOf0(sK5,sF19)
| ~ sP4 ),
inference(forward_demodulation,[],[f165,f281]) ).
fof(f165,plain,
( aElementOf0(sK5,szAzrzSzezqlpdtcmdtrp0(xa,xq))
| ~ sP4 ),
inference(cnf_transformation,[],[f103]) ).
fof(f303,plain,
( ~ spl21_1
| ~ spl21_3 ),
inference(avatar_split_clause,[],[f166,f300,f291]) ).
fof(f166,plain,
( ~ aElementOf0(sK5,cS1395)
| ~ sP4 ),
inference(cnf_transformation,[],[f103]) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.12 % Problem : NUM442+6 : TPTP v8.1.2. Released v4.0.0.
% 0.11/0.14 % 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
% 0.13/0.35 % Computer : n014.cluster.edu
% 0.13/0.35 % Model : x86_64 x86_64
% 0.13/0.35 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.35 % Memory : 8042.1875MB
% 0.13/0.35 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.35 % CPULimit : 300
% 0.13/0.35 % WCLimit : 300
% 0.13/0.35 % DateTime : Fri May 3 15:12:23 EDT 2024
% 0.13/0.35 % CPUTime :
% 0.13/0.35 This is a FOF_THM_RFO_SEQ problem
% 0.13/0.35 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.QM5pj4J0Zi/Vampire---4.8_24135
% 0.59/0.74 % (24250)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)
% 0.59/0.74 % (24244)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)
% 0.59/0.74 % (24246)lrs+1011_1:1_sil=8000:sp=occurrence:nwc=10.0:i=78:ss=axioms:sgt=8_0 on Vampire---4 for (2996ds/78Mi)
% 0.59/0.74 % (24245)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)
% 0.59/0.74 % (24248)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)
% 0.59/0.74 % (24249)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)
% 0.59/0.75 % (24247)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)
% 0.59/0.75 % (24251)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)
% 0.59/0.76 % (24247)Instruction limit reached!
% 0.59/0.76 % (24247)------------------------------
% 0.59/0.76 % (24247)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.76 % (24247)Termination reason: Unknown
% 0.59/0.76 % (24247)Termination phase: Saturation
% 0.59/0.76
% 0.59/0.76 % (24247)Memory used [KB]: 1748
% 0.59/0.76 % (24247)Time elapsed: 0.018 s
% 0.59/0.76 % (24247)Instructions burned: 35 (million)
% 0.59/0.76 % (24247)------------------------------
% 0.59/0.76 % (24247)------------------------------
% 0.59/0.76 % (24248)Instruction limit reached!
% 0.59/0.76 % (24248)------------------------------
% 0.59/0.76 % (24248)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.76 % (24248)Termination reason: Unknown
% 0.59/0.76 % (24248)Termination phase: Saturation
% 0.59/0.76
% 0.59/0.76 % (24248)Memory used [KB]: 1599
% 0.59/0.76 % (24248)Time elapsed: 0.020 s
% 0.59/0.76 % (24248)Instructions burned: 34 (million)
% 0.59/0.76 % (24248)------------------------------
% 0.59/0.76 % (24248)------------------------------
% 0.59/0.76 % (24252)lrs+21_1:16_sil=2000:sp=occurrence:urr=on:flr=on:i=55:sd=1:nm=0:ins=3:ss=included:rawr=on:br=off_0 on Vampire---4 for (2996ds/55Mi)
% 0.59/0.77 % (24244)Instruction limit reached!
% 0.59/0.77 % (24244)------------------------------
% 0.59/0.77 % (24244)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.77 % (24244)Termination reason: Unknown
% 0.59/0.77 % (24244)Termination phase: Saturation
% 0.59/0.77
% 0.59/0.77 % (24244)Memory used [KB]: 1603
% 0.59/0.77 % (24244)Time elapsed: 0.023 s
% 0.59/0.77 % (24244)Instructions burned: 35 (million)
% 0.59/0.77 % (24244)------------------------------
% 0.59/0.77 % (24244)------------------------------
% 0.59/0.77 % (24250)Instruction limit reached!
% 0.59/0.77 % (24250)------------------------------
% 0.59/0.77 % (24250)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.77 % (24250)Termination reason: Unknown
% 0.59/0.77 % (24250)Termination phase: Saturation
% 0.59/0.77
% 0.59/0.77 % (24250)Memory used [KB]: 2203
% 0.59/0.77 % (24250)Time elapsed: 0.024 s
% 0.59/0.77 % (24250)Instructions burned: 86 (million)
% 0.59/0.77 % (24250)------------------------------
% 0.59/0.77 % (24250)------------------------------
% 0.59/0.77 % (24255)lrs-1011_1:1_sil=4000:plsq=on:plsqr=32,1:sp=frequency:plsql=on:nwc=10.0:i=52:aac=none:afr=on:ss=axioms:er=filter:sgt=16:rawr=on:etr=on:lma=on_0 on Vampire---4 for (2996ds/52Mi)
% 0.59/0.77 % (24249)Instruction limit reached!
% 0.59/0.77 % (24249)------------------------------
% 0.59/0.77 % (24249)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.77 % (24249)Termination reason: Unknown
% 0.59/0.77 % (24249)Termination phase: Saturation
% 0.59/0.77
% 0.59/0.77 % (24249)Memory used [KB]: 1589
% 0.59/0.77 % (24249)Time elapsed: 0.026 s
% 0.59/0.77 % (24249)Instructions burned: 47 (million)
% 0.59/0.77 % (24249)------------------------------
% 0.59/0.77 % (24249)------------------------------
% 0.59/0.77 % (24253)dis+3_25:4_sil=16000:sos=all:erd=off:i=50:s2at=4.0:bd=off:nm=60:sup=off:cond=on:av=off:ins=2:nwc=10.0:etr=on:to=lpo:s2agt=20:fd=off:bsr=unit_only:slsq=on:slsqr=28,19:awrs=converge:awrsf=500:tgt=ground:bs=unit_only_0 on Vampire---4 for (2996ds/50Mi)
% 0.59/0.77 % (24254)lrs+1010_1:2_sil=4000:tgt=ground:nwc=10.0:st=2.0:i=208:sd=1:bd=off:ss=axioms_0 on Vampire---4 for (2996ds/208Mi)
% 0.59/0.77 % (24256)lrs-1010_1:1_to=lpo:sil=2000:sp=reverse_arity:sos=on:urr=ec_only:i=518:sd=2:bd=off:ss=axioms:sgt=16_0 on Vampire---4 for (2996ds/518Mi)
% 0.59/0.77 % (24245)Instruction limit reached!
% 0.59/0.77 % (24245)------------------------------
% 0.59/0.77 % (24245)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.77 % (24245)Termination reason: Unknown
% 0.59/0.77 % (24245)Termination phase: Saturation
% 0.59/0.77
% 0.59/0.77 % (24245)Memory used [KB]: 1835
% 0.59/0.77 % (24245)Time elapsed: 0.032 s
% 0.59/0.77 % (24245)Instructions burned: 51 (million)
% 0.59/0.77 % (24245)------------------------------
% 0.59/0.77 % (24245)------------------------------
% 0.59/0.78 % (24257)lrs+1011_87677:1048576_sil=8000:sos=on:spb=non_intro:nwc=10.0:kmz=on:i=42:ep=RS:nm=0:ins=1:uhcvi=on:rawr=on:fde=unused:afp=2000:afq=1.444:plsq=on:nicw=on_0 on Vampire---4 for (2995ds/42Mi)
% 0.59/0.78 % (24251)Instruction limit reached!
% 0.59/0.78 % (24251)------------------------------
% 0.59/0.78 % (24251)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.78 % (24251)Termination reason: Unknown
% 0.59/0.78 % (24251)Termination phase: Saturation
% 0.59/0.78
% 0.59/0.78 % (24251)Memory used [KB]: 1807
% 0.59/0.78 % (24251)Time elapsed: 0.036 s
% 0.59/0.78 % (24251)Instructions burned: 56 (million)
% 0.59/0.78 % (24251)------------------------------
% 0.59/0.78 % (24251)------------------------------
% 0.59/0.79 % (24258)dis+1011_1258907:1048576_bsr=unit_only:to=lpo:drc=off:sil=2000:tgt=full:fde=none:sp=frequency:spb=goal:rnwc=on:nwc=6.70083:sac=on:newcnf=on:st=2:i=243:bs=unit_only:sd=3:afp=300:awrs=decay:awrsf=218:nm=16:ins=3:afq=3.76821:afr=on:ss=axioms:sgt=5:rawr=on:add=off:bsd=on_0 on Vampire---4 for (2995ds/243Mi)
% 0.59/0.79 % (24252)Instruction limit reached!
% 0.59/0.79 % (24252)------------------------------
% 0.59/0.79 % (24252)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.79 % (24252)Termination reason: Unknown
% 0.59/0.79 % (24252)Termination phase: Saturation
% 0.59/0.79
% 0.59/0.79 % (24252)Memory used [KB]: 1633
% 0.59/0.79 % (24252)Time elapsed: 0.023 s
% 0.59/0.79 % (24252)Instructions burned: 55 (million)
% 0.59/0.79 % (24252)------------------------------
% 0.59/0.79 % (24252)------------------------------
% 0.59/0.79 % (24255)Instruction limit reached!
% 0.59/0.79 % (24255)------------------------------
% 0.59/0.79 % (24255)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.79 % (24255)Termination reason: Unknown
% 0.59/0.79 % (24255)Termination phase: Saturation
% 0.59/0.79
% 0.59/0.79 % (24255)Memory used [KB]: 1938
% 0.59/0.79 % (24255)Time elapsed: 0.021 s
% 0.59/0.79 % (24255)Instructions burned: 54 (million)
% 0.59/0.79 % (24255)------------------------------
% 0.59/0.79 % (24255)------------------------------
% 0.59/0.79 % (24259)lrs+1011_2:9_sil=2000:lsd=10:newcnf=on:i=117:sd=2:awrs=decay:ss=included:amm=off:ep=R_0 on Vampire---4 for (2995ds/117Mi)
% 0.59/0.79 % (24246)Instruction limit reached!
% 0.59/0.79 % (24246)------------------------------
% 0.59/0.79 % (24246)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.79 % (24246)Termination reason: Unknown
% 0.59/0.79 % (24246)Termination phase: Saturation
% 0.59/0.79
% 0.59/0.79 % (24246)Memory used [KB]: 2157
% 0.59/0.79 % (24246)Time elapsed: 0.049 s
% 0.59/0.79 % (24246)Instructions burned: 78 (million)
% 0.59/0.79 % (24246)------------------------------
% 0.59/0.79 % (24246)------------------------------
% 0.59/0.79 % (24260)dis+1011_11:1_sil=2000:avsq=on:i=143:avsqr=1,16:ep=RS:rawr=on:aac=none:lsd=100:mep=off:fde=none:newcnf=on:bsr=unit_only_0 on Vampire---4 for (2995ds/143Mi)
% 0.59/0.80 % (24253)Instruction limit reached!
% 0.59/0.80 % (24253)------------------------------
% 0.59/0.80 % (24253)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.59/0.80 % (24253)Termination reason: Unknown
% 0.59/0.80 % (24253)Termination phase: Saturation
% 0.59/0.80
% 0.59/0.80 % (24253)Memory used [KB]: 1665
% 0.59/0.80 % (24253)Time elapsed: 0.028 s
% 0.59/0.80 % (24253)Instructions burned: 50 (million)
% 0.59/0.80 % (24253)------------------------------
% 0.59/0.80 % (24253)------------------------------
% 0.88/0.80 % (24261)lrs+1011_1:2_to=lpo:sil=8000:plsqc=1:plsq=on:plsqr=326,59:sp=weighted_frequency:plsql=on:nwc=10.0:newcnf=on:i=93:awrs=converge:awrsf=200:bd=off:ins=1:rawr=on:alpa=false:avsq=on:avsqr=1,16_0 on Vampire---4 for (2995ds/93Mi)
% 0.88/0.80 % (24257)Instruction limit reached!
% 0.88/0.80 % (24257)------------------------------
% 0.88/0.80 % (24257)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.88/0.80 % (24257)Termination reason: Unknown
% 0.88/0.80 % (24257)Termination phase: Saturation
% 0.88/0.80
% 0.88/0.80 % (24257)Memory used [KB]: 1499
% 0.88/0.80 % (24257)Time elapsed: 0.020 s
% 0.88/0.80 % (24257)Instructions burned: 42 (million)
% 0.88/0.80 % (24257)------------------------------
% 0.88/0.80 % (24257)------------------------------
% 0.88/0.80 % (24262)lrs+1666_1:1_sil=4000:sp=occurrence:sos=on:urr=on:newcnf=on:i=62:amm=off:ep=R:erd=off:nm=0:plsq=on:plsqr=14,1_0 on Vampire---4 for (2995ds/62Mi)
% 0.88/0.80 % (24263)lrs+21_2461:262144_anc=none:drc=off:sil=2000:sp=occurrence:nwc=6.0:updr=off:st=3.0:i=32:sd=2:afp=4000:erml=3:nm=14:afq=2.0:uhcvi=on:ss=included:er=filter:abs=on:nicw=on:ile=on:sims=off:s2a=on:s2agt=50:s2at=-1.0:plsq=on:plsql=on:plsqc=2:plsqr=1,32:newcnf=on:bd=off:to=lpo_0 on Vampire---4 for (2995ds/32Mi)
% 0.88/0.82 % (24263)Instruction limit reached!
% 0.88/0.82 % (24263)------------------------------
% 0.88/0.82 % (24263)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.88/0.82 % (24263)Termination reason: Unknown
% 0.88/0.82 % (24263)Termination phase: Saturation
% 0.88/0.82
% 0.88/0.82 % (24263)Memory used [KB]: 1431
% 0.88/0.82 % (24263)Time elapsed: 0.017 s
% 0.88/0.82 % (24263)Instructions burned: 32 (million)
% 0.88/0.82 % (24263)------------------------------
% 0.88/0.82 % (24263)------------------------------
% 0.88/0.82 % (24254)First to succeed.
% 0.88/0.82 % (24264)dis+1011_1:1_sil=16000:nwc=7.0:s2agt=64:s2a=on:i=1919:ss=axioms:sgt=8:lsd=50:sd=7_0 on Vampire---4 for (2995ds/1919Mi)
% 0.88/0.82 % (24254)Solution written to "/export/starexec/sandbox2/tmp/vampire-proof-24243"
% 0.88/0.82 % (24254)Refutation found. Thanks to Tanya!
% 0.88/0.82 % SZS status Theorem for Vampire---4
% 0.88/0.82 % SZS output start Proof for Vampire---4
% See solution above
% 0.88/0.83 % (24254)------------------------------
% 0.88/0.83 % (24254)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.88/0.83 % (24254)Termination reason: Refutation
% 0.88/0.83
% 0.88/0.83 % (24254)Memory used [KB]: 1804
% 0.88/0.83 % (24254)Time elapsed: 0.056 s
% 0.88/0.83 % (24254)Instructions burned: 94 (million)
% 0.88/0.83 % (24243)Success in time 0.448 s
% 0.88/0.83 % Vampire---4.8 exiting
%------------------------------------------------------------------------------