TSTP Solution File: NUM479+1 by Zipperpin---2.1.9999
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%------------------------------------------------------------------------------
% File : Zipperpin---2.1.9999
% Problem : NUM479+1 : TPTP v8.1.2. Released v4.0.0.
% Transfm : NO INFORMATION
% Format : NO INFORMATION
% Command : python3 /export/starexec/sandbox/solver/bin/portfolio.lams.parallel.py %s %d /export/starexec/sandbox/tmp/tmp.YaXS25Sa6u true
% Computer : n007.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 : Thu Aug 31 12:41:45 EDT 2023
% Result : Theorem 20.70s 3.56s
% Output : Refutation 20.70s
% Verified :
% SZS Type : Refutation
% Derivation depth : 20
% Number of leaves : 18
% Syntax : Number of formulae : 84 ( 28 unt; 8 typ; 0 def)
% Number of atoms : 224 ( 43 equ; 0 cnn)
% Maximal formula atoms : 8 ( 2 avg)
% Number of connectives : 765 ( 136 ~; 124 |; 14 &; 481 @)
% ( 2 <=>; 8 =>; 0 <=; 0 <~>)
% Maximal formula depth : 12 ( 6 avg)
% Number of types : 2 ( 0 usr)
% Number of type conns : 7 ( 7 >; 0 *; 0 +; 0 <<)
% Number of symbols : 10 ( 8 usr; 5 con; 0-2 aty)
% Number of variables : 64 ( 0 ^; 63 !; 1 ?; 64 :)
% Comments :
%------------------------------------------------------------------------------
thf(aNaturalNumber0_type,type,
aNaturalNumber0: $i > $o ).
thf(sdtsldt0_type,type,
sdtsldt0: $i > $i > $i ).
thf(sdtasdt0_type,type,
sdtasdt0: $i > $i > $i ).
thf(sz00_type,type,
sz00: $i ).
thf(xm_type,type,
xm: $i ).
thf(doDivides0_type,type,
doDivides0: $i > $i > $o ).
thf(xl_type,type,
xl: $i ).
thf(xn_type,type,
xn: $i ).
thf(mSortsB_02,axiom,
! [W0: $i,W1: $i] :
( ( ( aNaturalNumber0 @ W0 )
& ( aNaturalNumber0 @ W1 ) )
=> ( aNaturalNumber0 @ ( sdtasdt0 @ W0 @ W1 ) ) ) ).
thf(zip_derived_cl5,plain,
! [X0: $i,X1: $i] :
( ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( aNaturalNumber0 @ ( sdtasdt0 @ X0 @ X1 ) ) ),
inference(cnf,[status(esa)],[mSortsB_02]) ).
thf(zip_derived_cl5_001,plain,
! [X0: $i,X1: $i] :
( ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( aNaturalNumber0 @ ( sdtasdt0 @ X0 @ X1 ) ) ),
inference(cnf,[status(esa)],[mSortsB_02]) ).
thf(mMulComm,axiom,
! [W0: $i,W1: $i] :
( ( ( aNaturalNumber0 @ W0 )
& ( aNaturalNumber0 @ W1 ) )
=> ( ( sdtasdt0 @ W0 @ W1 )
= ( sdtasdt0 @ W1 @ W0 ) ) ) ).
thf(zip_derived_cl10,plain,
! [X0: $i,X1: $i] :
( ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( ( sdtasdt0 @ X0 @ X1 )
= ( sdtasdt0 @ X1 @ X0 ) ) ),
inference(cnf,[status(esa)],[mMulComm]) ).
thf(m__1524_04,axiom,
( ( doDivides0 @ xl @ xm )
& ( xl != sz00 ) ) ).
thf(zip_derived_cl61,plain,
doDivides0 @ xl @ xm,
inference(cnf,[status(esa)],[m__1524_04]) ).
thf(mDivTrans,axiom,
! [W0: $i,W1: $i,W2: $i] :
( ( ( aNaturalNumber0 @ W0 )
& ( aNaturalNumber0 @ W1 )
& ( aNaturalNumber0 @ W2 ) )
=> ( ( ( doDivides0 @ W0 @ W1 )
& ( doDivides0 @ W1 @ W2 ) )
=> ( doDivides0 @ W0 @ W2 ) ) ) ).
thf(zip_derived_cl55,plain,
! [X0: $i,X1: $i,X2: $i] :
( ~ ( doDivides0 @ X0 @ X1 )
| ~ ( aNaturalNumber0 @ X1 )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X2 )
| ( doDivides0 @ X0 @ X2 )
| ~ ( doDivides0 @ X1 @ X2 ) ),
inference(cnf,[status(esa)],[mDivTrans]) ).
thf(zip_derived_cl677,plain,
! [X0: $i] :
( ~ ( doDivides0 @ xm @ X0 )
| ( doDivides0 @ xl @ X0 )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ xl )
| ~ ( aNaturalNumber0 @ xm ) ),
inference('sup-',[status(thm)],[zip_derived_cl61,zip_derived_cl55]) ).
thf(m__1524,axiom,
( ( aNaturalNumber0 @ xm )
& ( aNaturalNumber0 @ xl ) ) ).
thf(zip_derived_cl60,plain,
aNaturalNumber0 @ xl,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl59,plain,
aNaturalNumber0 @ xm,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl682,plain,
! [X0: $i] :
( ~ ( doDivides0 @ xm @ X0 )
| ( doDivides0 @ xl @ X0 )
| ~ ( aNaturalNumber0 @ X0 ) ),
inference(demod,[status(thm)],[zip_derived_cl677,zip_derived_cl60,zip_derived_cl59]) ).
thf(mDefDiv,axiom,
! [W0: $i,W1: $i] :
( ( ( aNaturalNumber0 @ W0 )
& ( aNaturalNumber0 @ W1 ) )
=> ( ( doDivides0 @ W0 @ W1 )
<=> ? [W2: $i] :
( ( W1
= ( sdtasdt0 @ W0 @ W2 ) )
& ( aNaturalNumber0 @ W2 ) ) ) ) ).
thf(zip_derived_cl51,plain,
! [X0: $i,X1: $i,X2: $i] :
( ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( doDivides0 @ X0 @ X1 )
| ~ ( aNaturalNumber0 @ X2 )
| ( X1
!= ( sdtasdt0 @ X0 @ X2 ) ) ),
inference(cnf,[status(esa)],[mDefDiv]) ).
thf(zip_derived_cl597,plain,
! [X0: $i,X1: $i] :
( ~ ( aNaturalNumber0 @ X0 )
| ( doDivides0 @ X1 @ ( sdtasdt0 @ X1 @ X0 ) )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ X1 @ X0 ) )
| ~ ( aNaturalNumber0 @ X1 ) ),
inference(eq_res,[status(thm)],[zip_derived_cl51]) ).
thf(zip_derived_cl5_002,plain,
! [X0: $i,X1: $i] :
( ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( aNaturalNumber0 @ ( sdtasdt0 @ X0 @ X1 ) ) ),
inference(cnf,[status(esa)],[mSortsB_02]) ).
thf(zip_derived_cl2116,plain,
! [X0: $i,X1: $i] :
( ~ ( aNaturalNumber0 @ X1 )
| ( doDivides0 @ X1 @ ( sdtasdt0 @ X1 @ X0 ) )
| ~ ( aNaturalNumber0 @ X0 ) ),
inference(clc,[status(thm)],[zip_derived_cl597,zip_derived_cl5]) ).
thf(zip_derived_cl2122,plain,
! [X0: $i] :
( ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ X0 ) )
| ( doDivides0 @ xl @ ( sdtasdt0 @ xm @ X0 ) )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ xm ) ),
inference('sup+',[status(thm)],[zip_derived_cl682,zip_derived_cl2116]) ).
thf(zip_derived_cl59_003,plain,
aNaturalNumber0 @ xm,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl2134,plain,
! [X0: $i] :
( ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ X0 ) )
| ( doDivides0 @ xl @ ( sdtasdt0 @ xm @ X0 ) )
| ~ ( aNaturalNumber0 @ X0 ) ),
inference(demod,[status(thm)],[zip_derived_cl2122,zip_derived_cl59]) ).
thf(zip_derived_cl4106,plain,
! [X0: $i] :
( ( doDivides0 @ xl @ ( sdtasdt0 @ X0 @ xm ) )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ xm )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ X0 ) ) ),
inference('sup+',[status(thm)],[zip_derived_cl10,zip_derived_cl2134]) ).
thf(zip_derived_cl59_004,plain,
aNaturalNumber0 @ xm,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl4114,plain,
! [X0: $i] :
( ( doDivides0 @ xl @ ( sdtasdt0 @ X0 @ xm ) )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ X0 ) ) ),
inference(demod,[status(thm)],[zip_derived_cl4106,zip_derived_cl59]) ).
thf(zip_derived_cl4115,plain,
! [X0: $i] :
( ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ X0 ) )
| ~ ( aNaturalNumber0 @ X0 )
| ( doDivides0 @ xl @ ( sdtasdt0 @ X0 @ xm ) ) ),
inference(simplify,[status(thm)],[zip_derived_cl4114]) ).
thf(mDefQuot,axiom,
! [W0: $i,W1: $i] :
( ( ( aNaturalNumber0 @ W0 )
& ( aNaturalNumber0 @ W1 ) )
=> ( ( ( W0 != sz00 )
& ( doDivides0 @ W0 @ W1 ) )
=> ! [W2: $i] :
( ( W2
= ( sdtsldt0 @ W1 @ W0 ) )
<=> ( ( aNaturalNumber0 @ W2 )
& ( W1
= ( sdtasdt0 @ W0 @ W2 ) ) ) ) ) ) ).
thf(zip_derived_cl52,plain,
! [X0: $i,X1: $i,X2: $i] :
( ( X0 = sz00 )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( X2
!= ( sdtsldt0 @ X1 @ X0 ) )
| ( aNaturalNumber0 @ X2 )
| ~ ( doDivides0 @ X0 @ X1 ) ),
inference(cnf,[status(esa)],[mDefQuot]) ).
thf(zip_derived_cl921,plain,
! [X0: $i,X1: $i] :
( ~ ( doDivides0 @ X1 @ X0 )
| ( aNaturalNumber0 @ ( sdtsldt0 @ X0 @ X1 ) )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( X1 = sz00 ) ),
inference(eq_res,[status(thm)],[zip_derived_cl52]) ).
thf(zip_derived_cl53,plain,
! [X0: $i,X1: $i,X2: $i] :
( ( X0 = sz00 )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( X2
!= ( sdtsldt0 @ X1 @ X0 ) )
| ( X1
= ( sdtasdt0 @ X0 @ X2 ) )
| ~ ( doDivides0 @ X0 @ X1 ) ),
inference(cnf,[status(esa)],[mDefQuot]) ).
thf(zip_derived_cl1108,plain,
! [X0: $i,X1: $i] :
( ~ ( doDivides0 @ X1 @ X0 )
| ( X0
= ( sdtasdt0 @ X1 @ ( sdtsldt0 @ X0 @ X1 ) ) )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( X1 = sz00 ) ),
inference(eq_res,[status(thm)],[zip_derived_cl53]) ).
thf(zip_derived_cl10_005,plain,
! [X0: $i,X1: $i] :
( ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( ( sdtasdt0 @ X0 @ X1 )
= ( sdtasdt0 @ X1 @ X0 ) ) ),
inference(cnf,[status(esa)],[mMulComm]) ).
thf(mMulAsso,axiom,
! [W0: $i,W1: $i,W2: $i] :
( ( ( aNaturalNumber0 @ W0 )
& ( aNaturalNumber0 @ W1 )
& ( aNaturalNumber0 @ W2 ) )
=> ( ( sdtasdt0 @ ( sdtasdt0 @ W0 @ W1 ) @ W2 )
= ( sdtasdt0 @ W0 @ ( sdtasdt0 @ W1 @ W2 ) ) ) ) ).
thf(zip_derived_cl11,plain,
! [X0: $i,X1: $i,X2: $i] :
( ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ~ ( aNaturalNumber0 @ X2 )
| ( ( sdtasdt0 @ ( sdtasdt0 @ X1 @ X0 ) @ X2 )
= ( sdtasdt0 @ X1 @ ( sdtasdt0 @ X0 @ X2 ) ) ) ),
inference(cnf,[status(esa)],[mMulAsso]) ).
thf(zip_derived_cl783,plain,
! [X0: $i,X1: $i,X2: $i] :
( ( ( sdtasdt0 @ ( sdtasdt0 @ X1 @ X0 ) @ X2 )
= ( sdtasdt0 @ X0 @ ( sdtasdt0 @ X1 @ X2 ) ) )
| ~ ( aNaturalNumber0 @ X1 )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X2 )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 ) ),
inference('sup+',[status(thm)],[zip_derived_cl10,zip_derived_cl11]) ).
thf(zip_derived_cl792,plain,
! [X0: $i,X1: $i,X2: $i] :
( ~ ( aNaturalNumber0 @ X2 )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( ( sdtasdt0 @ ( sdtasdt0 @ X1 @ X0 ) @ X2 )
= ( sdtasdt0 @ X0 @ ( sdtasdt0 @ X1 @ X2 ) ) ) ),
inference(simplify,[status(thm)],[zip_derived_cl783]) ).
thf(zip_derived_cl1108_006,plain,
! [X0: $i,X1: $i] :
( ~ ( doDivides0 @ X1 @ X0 )
| ( X0
= ( sdtasdt0 @ X1 @ ( sdtsldt0 @ X0 @ X1 ) ) )
| ~ ( aNaturalNumber0 @ X0 )
| ~ ( aNaturalNumber0 @ X1 )
| ( X1 = sz00 ) ),
inference(eq_res,[status(thm)],[zip_derived_cl53]) ).
thf(m__,conjecture,
( ( sdtasdt0 @ ( sdtasdt0 @ xl @ xn ) @ ( sdtsldt0 @ xm @ xl ) )
= ( sdtasdt0 @ xl @ ( sdtsldt0 @ ( sdtasdt0 @ xn @ xm ) @ xl ) ) ) ).
thf(zf_stmt_0,negated_conjecture,
( ( sdtasdt0 @ ( sdtasdt0 @ xl @ xn ) @ ( sdtsldt0 @ xm @ xl ) )
!= ( sdtasdt0 @ xl @ ( sdtsldt0 @ ( sdtasdt0 @ xn @ xm ) @ xl ) ) ),
inference('cnf.neg',[status(esa)],[m__]) ).
thf(zip_derived_cl64,plain,
( ( sdtasdt0 @ ( sdtasdt0 @ xl @ xn ) @ ( sdtsldt0 @ xm @ xl ) )
!= ( sdtasdt0 @ xl @ ( sdtsldt0 @ ( sdtasdt0 @ xn @ xm ) @ xl ) ) ),
inference(cnf,[status(esa)],[zf_stmt_0]) ).
thf(zip_derived_cl28525,plain,
( ( ( sdtasdt0 @ ( sdtasdt0 @ xl @ xn ) @ ( sdtsldt0 @ xm @ xl ) )
!= ( sdtasdt0 @ xn @ xm ) )
| ( xl = sz00 )
| ~ ( aNaturalNumber0 @ xl )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) ) ),
inference('sup-',[status(thm)],[zip_derived_cl1108,zip_derived_cl64]) ).
thf(zip_derived_cl60_007,plain,
aNaturalNumber0 @ xl,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl28683,plain,
( ( ( sdtasdt0 @ ( sdtasdt0 @ xl @ xn ) @ ( sdtsldt0 @ xm @ xl ) )
!= ( sdtasdt0 @ xn @ xm ) )
| ( xl = sz00 )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) ) ),
inference(demod,[status(thm)],[zip_derived_cl28525,zip_derived_cl60]) ).
thf(zip_derived_cl62,plain,
xl != sz00,
inference(cnf,[status(esa)],[m__1524_04]) ).
thf(zip_derived_cl28684,plain,
( ( ( sdtasdt0 @ ( sdtasdt0 @ xl @ xn ) @ ( sdtsldt0 @ xm @ xl ) )
!= ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) ) ),
inference('simplify_reflect-',[status(thm)],[zip_derived_cl28683,zip_derived_cl62]) ).
thf(zip_derived_cl28689,plain,
( ( ( sdtasdt0 @ xn @ ( sdtasdt0 @ xl @ ( sdtsldt0 @ xm @ xl ) ) )
!= ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ xl )
| ~ ( aNaturalNumber0 @ xn )
| ~ ( aNaturalNumber0 @ ( sdtsldt0 @ xm @ xl ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) ) ),
inference('sup-',[status(thm)],[zip_derived_cl792,zip_derived_cl28684]) ).
thf(zip_derived_cl60_008,plain,
aNaturalNumber0 @ xl,
inference(cnf,[status(esa)],[m__1524]) ).
thf(m__1553,axiom,
aNaturalNumber0 @ xn ).
thf(zip_derived_cl63,plain,
aNaturalNumber0 @ xn,
inference(cnf,[status(esa)],[m__1553]) ).
thf(zip_derived_cl28691,plain,
( ( ( sdtasdt0 @ xn @ ( sdtasdt0 @ xl @ ( sdtsldt0 @ xm @ xl ) ) )
!= ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ ( sdtsldt0 @ xm @ xl ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) ) ),
inference(demod,[status(thm)],[zip_derived_cl28689,zip_derived_cl60,zip_derived_cl63]) ).
thf(zip_derived_cl28696,plain,
( ( ( sdtasdt0 @ xn @ xm )
!= ( sdtasdt0 @ xn @ xm ) )
| ( xl = sz00 )
| ~ ( aNaturalNumber0 @ xl )
| ~ ( aNaturalNumber0 @ xm )
| ~ ( doDivides0 @ xl @ xm )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ ( sdtsldt0 @ xm @ xl ) ) ),
inference('sup-',[status(thm)],[zip_derived_cl1108,zip_derived_cl28691]) ).
thf(zip_derived_cl60_009,plain,
aNaturalNumber0 @ xl,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl59_010,plain,
aNaturalNumber0 @ xm,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl61_011,plain,
doDivides0 @ xl @ xm,
inference(cnf,[status(esa)],[m__1524_04]) ).
thf(zip_derived_cl28697,plain,
( ( ( sdtasdt0 @ xn @ xm )
!= ( sdtasdt0 @ xn @ xm ) )
| ( xl = sz00 )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ ( sdtsldt0 @ xm @ xl ) ) ),
inference(demod,[status(thm)],[zip_derived_cl28696,zip_derived_cl60,zip_derived_cl59,zip_derived_cl61]) ).
thf(zip_derived_cl28698,plain,
( ~ ( aNaturalNumber0 @ ( sdtsldt0 @ xm @ xl ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ( xl = sz00 ) ),
inference(simplify,[status(thm)],[zip_derived_cl28697]) ).
thf(zip_derived_cl62_012,plain,
xl != sz00,
inference(cnf,[status(esa)],[m__1524_04]) ).
thf(zip_derived_cl28699,plain,
( ~ ( aNaturalNumber0 @ ( sdtsldt0 @ xm @ xl ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) ) ),
inference('simplify_reflect-',[status(thm)],[zip_derived_cl28698,zip_derived_cl62]) ).
thf(zip_derived_cl28705,plain,
( ( xl = sz00 )
| ~ ( aNaturalNumber0 @ xl )
| ~ ( aNaturalNumber0 @ xm )
| ~ ( doDivides0 @ xl @ xm )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) ) ),
inference('sup-',[status(thm)],[zip_derived_cl921,zip_derived_cl28699]) ).
thf(zip_derived_cl60_013,plain,
aNaturalNumber0 @ xl,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl59_014,plain,
aNaturalNumber0 @ xm,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl61_015,plain,
doDivides0 @ xl @ xm,
inference(cnf,[status(esa)],[m__1524_04]) ).
thf(zip_derived_cl28706,plain,
( ( xl = sz00 )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) ) ),
inference(demod,[status(thm)],[zip_derived_cl28705,zip_derived_cl60,zip_derived_cl59,zip_derived_cl61]) ).
thf(zip_derived_cl62_016,plain,
xl != sz00,
inference(cnf,[status(esa)],[m__1524_04]) ).
thf(zip_derived_cl28707,plain,
( ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) )
| ~ ( doDivides0 @ xl @ ( sdtasdt0 @ xn @ xm ) ) ),
inference('simplify_reflect-',[status(thm)],[zip_derived_cl28706,zip_derived_cl62]) ).
thf(zip_derived_cl28787,plain,
( ~ ( aNaturalNumber0 @ xn )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ xn ) )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) ) ),
inference('sup-',[status(thm)],[zip_derived_cl4115,zip_derived_cl28707]) ).
thf(zip_derived_cl63_017,plain,
aNaturalNumber0 @ xn,
inference(cnf,[status(esa)],[m__1553]) ).
thf(zip_derived_cl28803,plain,
( ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ xn ) )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xn @ xm ) ) ),
inference(demod,[status(thm)],[zip_derived_cl28787,zip_derived_cl63]) ).
thf(zip_derived_cl29088,plain,
( ~ ( aNaturalNumber0 @ xm )
| ~ ( aNaturalNumber0 @ xn )
| ~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ xn ) ) ),
inference('sup-',[status(thm)],[zip_derived_cl5,zip_derived_cl28803]) ).
thf(zip_derived_cl59_018,plain,
aNaturalNumber0 @ xm,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl63_019,plain,
aNaturalNumber0 @ xn,
inference(cnf,[status(esa)],[m__1553]) ).
thf(zip_derived_cl29091,plain,
~ ( aNaturalNumber0 @ ( sdtasdt0 @ xm @ xn ) ),
inference(demod,[status(thm)],[zip_derived_cl29088,zip_derived_cl59,zip_derived_cl63]) ).
thf(zip_derived_cl29102,plain,
( ~ ( aNaturalNumber0 @ xn )
| ~ ( aNaturalNumber0 @ xm ) ),
inference('sup-',[status(thm)],[zip_derived_cl5,zip_derived_cl29091]) ).
thf(zip_derived_cl63_020,plain,
aNaturalNumber0 @ xn,
inference(cnf,[status(esa)],[m__1553]) ).
thf(zip_derived_cl59_021,plain,
aNaturalNumber0 @ xm,
inference(cnf,[status(esa)],[m__1524]) ).
thf(zip_derived_cl29103,plain,
$false,
inference(demod,[status(thm)],[zip_derived_cl29102,zip_derived_cl63,zip_derived_cl59]) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.08/0.12 % Problem : NUM479+1 : TPTP v8.1.2. Released v4.0.0.
% 0.08/0.13 % Command : python3 /export/starexec/sandbox/solver/bin/portfolio.lams.parallel.py %s %d /export/starexec/sandbox/tmp/tmp.YaXS25Sa6u true
% 0.13/0.34 % Computer : n007.cluster.edu
% 0.13/0.34 % Model : x86_64 x86_64
% 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34 % Memory : 8042.1875MB
% 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.35 % CPULimit : 300
% 0.13/0.35 % WCLimit : 300
% 0.13/0.35 % DateTime : Fri Aug 25 12:12:55 EDT 2023
% 0.13/0.35 % CPUTime :
% 0.13/0.35 % Running portfolio for 300 s
% 0.13/0.35 % File : /export/starexec/sandbox/benchmark/theBenchmark.p
% 0.13/0.35 % Number of cores: 8
% 0.13/0.35 % Python version: Python 3.6.8
% 0.13/0.35 % Running in FO mode
% 0.20/0.66 % Total configuration time : 435
% 0.20/0.66 % Estimated wc time : 1092
% 0.20/0.66 % Estimated cpu time (7 cpus) : 156.0
% 0.20/0.73 % /export/starexec/sandbox/solver/bin/fo/fo6_bce.sh running for 75s
% 0.20/0.73 % /export/starexec/sandbox/solver/bin/fo/fo3_bce.sh running for 75s
% 1.19/0.74 % /export/starexec/sandbox/solver/bin/fo/fo1_av.sh running for 75s
% 1.19/0.75 % /export/starexec/sandbox/solver/bin/fo/fo7.sh running for 63s
% 1.19/0.75 % /export/starexec/sandbox/solver/bin/fo/fo13.sh running for 50s
% 1.19/0.76 % /export/starexec/sandbox/solver/bin/fo/fo4.sh running for 50s
% 1.19/0.76 % /export/starexec/sandbox/solver/bin/fo/fo5.sh running for 50s
% 20.70/3.56 % Solved by fo/fo3_bce.sh.
% 20.70/3.56 % BCE start: 65
% 20.70/3.56 % BCE eliminated: 2
% 20.70/3.56 % PE start: 63
% 20.70/3.56 logic: eq
% 20.70/3.56 % PE eliminated: 0
% 20.70/3.56 % done 2032 iterations in 2.801s
% 20.70/3.56 % SZS status Theorem for '/export/starexec/sandbox/benchmark/theBenchmark.p'
% 20.70/3.56 % SZS output start Refutation
% See solution above
% 20.70/3.56
% 20.70/3.56
% 20.70/3.56 % Terminating...
% 21.22/3.66 % Runner terminated.
% 21.22/3.67 % Zipperpin 1.5 exiting
%------------------------------------------------------------------------------