TSTP Solution File: NUM552+3 by iProver---3.8
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- Process Solution
%------------------------------------------------------------------------------
% File : iProver---3.8
% Problem : NUM552+3 : TPTP v8.1.2. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : run_iprover %s %d THM
% Computer : n017.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 11:31:24 EDT 2023
% Result : Theorem 3.68s 1.17s
% Output : CNFRefutation 3.68s
% Verified :
% SZS Type : Refutation
% Derivation depth : 11
% Number of leaves : 7
% Syntax : Number of formulae : 29 ( 9 unt; 0 def)
% Number of atoms : 311 ( 44 equ)
% Maximal formula atoms : 43 ( 10 avg)
% Number of connectives : 384 ( 102 ~; 80 |; 167 &)
% ( 0 <=>; 35 =>; 0 <=; 0 <~>)
% Maximal formula depth : 18 ( 6 avg)
% Maximal term depth : 2 ( 1 avg)
% Number of predicates : 5 ( 3 usr; 1 prp; 0-2 aty)
% Number of functors : 12 ( 12 usr; 7 con; 0-2 aty)
% Number of variables : 78 ( 0 sgn; 56 !; 18 ?)
% Comments :
%------------------------------------------------------------------------------
fof(f63,axiom,
( ~ ( ! [X0] :
( ( ( sbrdtbr0(X0) = xk
& ( aSubsetOf0(X0,xS)
| ( ! [X1] :
( aElementOf0(X1,X0)
=> aElementOf0(X1,xS) )
& aSet0(X0) ) ) )
=> aElementOf0(X0,slbdtsldtrb0(xS,xk)) )
& ( aElementOf0(X0,slbdtsldtrb0(xS,xk))
=> ( sbrdtbr0(X0) = xk
& aSubsetOf0(X0,xS)
& ! [X1] :
( aElementOf0(X1,X0)
=> aElementOf0(X1,xS) )
& aSet0(X0) ) ) )
=> ( slcrc0 = slbdtsldtrb0(xS,xk)
| ~ ? [X0] : aElementOf0(X0,slbdtsldtrb0(xS,xk)) ) )
& aSubsetOf0(slbdtsldtrb0(xS,xk),slbdtsldtrb0(xT,xk))
& ! [X0] :
( aElementOf0(X0,slbdtsldtrb0(xS,xk))
=> aElementOf0(X0,slbdtsldtrb0(xT,xk)) )
& ! [X0] :
( ( ( sbrdtbr0(X0) = xk
& ( aSubsetOf0(X0,xT)
| ( ! [X1] :
( aElementOf0(X1,X0)
=> aElementOf0(X1,xT) )
& aSet0(X0) ) ) )
=> aElementOf0(X0,slbdtsldtrb0(xT,xk)) )
& ( aElementOf0(X0,slbdtsldtrb0(xT,xk))
=> ( sbrdtbr0(X0) = xk
& aSubsetOf0(X0,xT)
& ! [X1] :
( aElementOf0(X1,X0)
=> aElementOf0(X1,xT) )
& aSet0(X0) ) ) )
& aSet0(slbdtsldtrb0(xT,xk))
& ! [X0] :
( ( ( sbrdtbr0(X0) = xk
& ( aSubsetOf0(X0,xS)
| ( ! [X1] :
( aElementOf0(X1,X0)
=> aElementOf0(X1,xS) )
& aSet0(X0) ) ) )
=> aElementOf0(X0,slbdtsldtrb0(xS,xk)) )
& ( aElementOf0(X0,slbdtsldtrb0(xS,xk))
=> ( sbrdtbr0(X0) = xk
& aSubsetOf0(X0,xS)
& ! [X1] :
( aElementOf0(X1,X0)
=> aElementOf0(X1,xS) )
& aSet0(X0) ) ) )
& aSet0(slbdtsldtrb0(xS,xk)) ),
file('/export/starexec/sandbox2/benchmark/theBenchmark.p',m__2227) ).
fof(f65,axiom,
( aElementOf0(xQ,slbdtsldtrb0(xS,xk))
& xk = sbrdtbr0(xQ)
& aSubsetOf0(xQ,xS)
& ! [X0] :
( aElementOf0(X0,xQ)
=> aElementOf0(X0,xS) )
& aSet0(xQ) ),
file('/export/starexec/sandbox2/benchmark/theBenchmark.p',m__2270) ).
fof(f68,conjecture,
( aElementOf0(xx,xQ)
=> aElementOf0(xx,xT) ),
file('/export/starexec/sandbox2/benchmark/theBenchmark.p',m__) ).
fof(f69,negated_conjecture,
~ ( aElementOf0(xx,xQ)
=> aElementOf0(xx,xT) ),
inference(negated_conjecture,[],[f68]) ).
fof(f76,plain,
( ~ ( ! [X0] :
( ( ( sbrdtbr0(X0) = xk
& ( aSubsetOf0(X0,xS)
| ( ! [X1] :
( aElementOf0(X1,X0)
=> aElementOf0(X1,xS) )
& aSet0(X0) ) ) )
=> aElementOf0(X0,slbdtsldtrb0(xS,xk)) )
& ( aElementOf0(X0,slbdtsldtrb0(xS,xk))
=> ( sbrdtbr0(X0) = xk
& aSubsetOf0(X0,xS)
& ! [X2] :
( aElementOf0(X2,X0)
=> aElementOf0(X2,xS) )
& aSet0(X0) ) ) )
=> ( slcrc0 = slbdtsldtrb0(xS,xk)
| ~ ? [X3] : aElementOf0(X3,slbdtsldtrb0(xS,xk)) ) )
& aSubsetOf0(slbdtsldtrb0(xS,xk),slbdtsldtrb0(xT,xk))
& ! [X4] :
( aElementOf0(X4,slbdtsldtrb0(xS,xk))
=> aElementOf0(X4,slbdtsldtrb0(xT,xk)) )
& ! [X5] :
( ( ( xk = sbrdtbr0(X5)
& ( aSubsetOf0(X5,xT)
| ( ! [X6] :
( aElementOf0(X6,X5)
=> aElementOf0(X6,xT) )
& aSet0(X5) ) ) )
=> aElementOf0(X5,slbdtsldtrb0(xT,xk)) )
& ( aElementOf0(X5,slbdtsldtrb0(xT,xk))
=> ( xk = sbrdtbr0(X5)
& aSubsetOf0(X5,xT)
& ! [X7] :
( aElementOf0(X7,X5)
=> aElementOf0(X7,xT) )
& aSet0(X5) ) ) )
& aSet0(slbdtsldtrb0(xT,xk))
& ! [X8] :
( ( ( xk = sbrdtbr0(X8)
& ( aSubsetOf0(X8,xS)
| ( ! [X9] :
( aElementOf0(X9,X8)
=> aElementOf0(X9,xS) )
& aSet0(X8) ) ) )
=> aElementOf0(X8,slbdtsldtrb0(xS,xk)) )
& ( aElementOf0(X8,slbdtsldtrb0(xS,xk))
=> ( xk = sbrdtbr0(X8)
& aSubsetOf0(X8,xS)
& ! [X10] :
( aElementOf0(X10,X8)
=> aElementOf0(X10,xS) )
& aSet0(X8) ) ) )
& aSet0(slbdtsldtrb0(xS,xk)) ),
inference(rectify,[],[f63]) ).
fof(f159,plain,
( slcrc0 != slbdtsldtrb0(xS,xk)
& ? [X3] : aElementOf0(X3,slbdtsldtrb0(xS,xk))
& ! [X0] :
( ( aElementOf0(X0,slbdtsldtrb0(xS,xk))
| sbrdtbr0(X0) != xk
| ( ~ aSubsetOf0(X0,xS)
& ( ? [X1] :
( ~ aElementOf0(X1,xS)
& aElementOf0(X1,X0) )
| ~ aSet0(X0) ) ) )
& ( ( sbrdtbr0(X0) = xk
& aSubsetOf0(X0,xS)
& ! [X2] :
( aElementOf0(X2,xS)
| ~ aElementOf0(X2,X0) )
& aSet0(X0) )
| ~ aElementOf0(X0,slbdtsldtrb0(xS,xk)) ) )
& aSubsetOf0(slbdtsldtrb0(xS,xk),slbdtsldtrb0(xT,xk))
& ! [X4] :
( aElementOf0(X4,slbdtsldtrb0(xT,xk))
| ~ aElementOf0(X4,slbdtsldtrb0(xS,xk)) )
& ! [X5] :
( ( aElementOf0(X5,slbdtsldtrb0(xT,xk))
| xk != sbrdtbr0(X5)
| ( ~ aSubsetOf0(X5,xT)
& ( ? [X6] :
( ~ aElementOf0(X6,xT)
& aElementOf0(X6,X5) )
| ~ aSet0(X5) ) ) )
& ( ( xk = sbrdtbr0(X5)
& aSubsetOf0(X5,xT)
& ! [X7] :
( aElementOf0(X7,xT)
| ~ aElementOf0(X7,X5) )
& aSet0(X5) )
| ~ aElementOf0(X5,slbdtsldtrb0(xT,xk)) ) )
& aSet0(slbdtsldtrb0(xT,xk))
& ! [X8] :
( ( aElementOf0(X8,slbdtsldtrb0(xS,xk))
| xk != sbrdtbr0(X8)
| ( ~ aSubsetOf0(X8,xS)
& ( ? [X9] :
( ~ aElementOf0(X9,xS)
& aElementOf0(X9,X8) )
| ~ aSet0(X8) ) ) )
& ( ( xk = sbrdtbr0(X8)
& aSubsetOf0(X8,xS)
& ! [X10] :
( aElementOf0(X10,xS)
| ~ aElementOf0(X10,X8) )
& aSet0(X8) )
| ~ aElementOf0(X8,slbdtsldtrb0(xS,xk)) ) )
& aSet0(slbdtsldtrb0(xS,xk)) ),
inference(ennf_transformation,[],[f76]) ).
fof(f160,plain,
( slcrc0 != slbdtsldtrb0(xS,xk)
& ? [X3] : aElementOf0(X3,slbdtsldtrb0(xS,xk))
& ! [X0] :
( ( aElementOf0(X0,slbdtsldtrb0(xS,xk))
| sbrdtbr0(X0) != xk
| ( ~ aSubsetOf0(X0,xS)
& ( ? [X1] :
( ~ aElementOf0(X1,xS)
& aElementOf0(X1,X0) )
| ~ aSet0(X0) ) ) )
& ( ( sbrdtbr0(X0) = xk
& aSubsetOf0(X0,xS)
& ! [X2] :
( aElementOf0(X2,xS)
| ~ aElementOf0(X2,X0) )
& aSet0(X0) )
| ~ aElementOf0(X0,slbdtsldtrb0(xS,xk)) ) )
& aSubsetOf0(slbdtsldtrb0(xS,xk),slbdtsldtrb0(xT,xk))
& ! [X4] :
( aElementOf0(X4,slbdtsldtrb0(xT,xk))
| ~ aElementOf0(X4,slbdtsldtrb0(xS,xk)) )
& ! [X5] :
( ( aElementOf0(X5,slbdtsldtrb0(xT,xk))
| xk != sbrdtbr0(X5)
| ( ~ aSubsetOf0(X5,xT)
& ( ? [X6] :
( ~ aElementOf0(X6,xT)
& aElementOf0(X6,X5) )
| ~ aSet0(X5) ) ) )
& ( ( xk = sbrdtbr0(X5)
& aSubsetOf0(X5,xT)
& ! [X7] :
( aElementOf0(X7,xT)
| ~ aElementOf0(X7,X5) )
& aSet0(X5) )
| ~ aElementOf0(X5,slbdtsldtrb0(xT,xk)) ) )
& aSet0(slbdtsldtrb0(xT,xk))
& ! [X8] :
( ( aElementOf0(X8,slbdtsldtrb0(xS,xk))
| xk != sbrdtbr0(X8)
| ( ~ aSubsetOf0(X8,xS)
& ( ? [X9] :
( ~ aElementOf0(X9,xS)
& aElementOf0(X9,X8) )
| ~ aSet0(X8) ) ) )
& ( ( xk = sbrdtbr0(X8)
& aSubsetOf0(X8,xS)
& ! [X10] :
( aElementOf0(X10,xS)
| ~ aElementOf0(X10,X8) )
& aSet0(X8) )
| ~ aElementOf0(X8,slbdtsldtrb0(xS,xk)) ) )
& aSet0(slbdtsldtrb0(xS,xk)) ),
inference(flattening,[],[f159]) ).
fof(f161,plain,
( aElementOf0(xQ,slbdtsldtrb0(xS,xk))
& xk = sbrdtbr0(xQ)
& aSubsetOf0(xQ,xS)
& ! [X0] :
( aElementOf0(X0,xS)
| ~ aElementOf0(X0,xQ) )
& aSet0(xQ) ),
inference(ennf_transformation,[],[f65]) ).
fof(f162,plain,
( ~ aElementOf0(xx,xT)
& aElementOf0(xx,xQ) ),
inference(ennf_transformation,[],[f69]) ).
fof(f223,plain,
( slcrc0 != slbdtsldtrb0(xS,xk)
& ? [X0] : aElementOf0(X0,slbdtsldtrb0(xS,xk))
& ! [X1] :
( ( aElementOf0(X1,slbdtsldtrb0(xS,xk))
| sbrdtbr0(X1) != xk
| ( ~ aSubsetOf0(X1,xS)
& ( ? [X2] :
( ~ aElementOf0(X2,xS)
& aElementOf0(X2,X1) )
| ~ aSet0(X1) ) ) )
& ( ( sbrdtbr0(X1) = xk
& aSubsetOf0(X1,xS)
& ! [X3] :
( aElementOf0(X3,xS)
| ~ aElementOf0(X3,X1) )
& aSet0(X1) )
| ~ aElementOf0(X1,slbdtsldtrb0(xS,xk)) ) )
& aSubsetOf0(slbdtsldtrb0(xS,xk),slbdtsldtrb0(xT,xk))
& ! [X4] :
( aElementOf0(X4,slbdtsldtrb0(xT,xk))
| ~ aElementOf0(X4,slbdtsldtrb0(xS,xk)) )
& ! [X5] :
( ( aElementOf0(X5,slbdtsldtrb0(xT,xk))
| xk != sbrdtbr0(X5)
| ( ~ aSubsetOf0(X5,xT)
& ( ? [X6] :
( ~ aElementOf0(X6,xT)
& aElementOf0(X6,X5) )
| ~ aSet0(X5) ) ) )
& ( ( xk = sbrdtbr0(X5)
& aSubsetOf0(X5,xT)
& ! [X7] :
( aElementOf0(X7,xT)
| ~ aElementOf0(X7,X5) )
& aSet0(X5) )
| ~ aElementOf0(X5,slbdtsldtrb0(xT,xk)) ) )
& aSet0(slbdtsldtrb0(xT,xk))
& ! [X8] :
( ( aElementOf0(X8,slbdtsldtrb0(xS,xk))
| xk != sbrdtbr0(X8)
| ( ~ aSubsetOf0(X8,xS)
& ( ? [X9] :
( ~ aElementOf0(X9,xS)
& aElementOf0(X9,X8) )
| ~ aSet0(X8) ) ) )
& ( ( xk = sbrdtbr0(X8)
& aSubsetOf0(X8,xS)
& ! [X10] :
( aElementOf0(X10,xS)
| ~ aElementOf0(X10,X8) )
& aSet0(X8) )
| ~ aElementOf0(X8,slbdtsldtrb0(xS,xk)) ) )
& aSet0(slbdtsldtrb0(xS,xk)) ),
inference(rectify,[],[f160]) ).
fof(f224,plain,
( ? [X0] : aElementOf0(X0,slbdtsldtrb0(xS,xk))
=> aElementOf0(sK15,slbdtsldtrb0(xS,xk)) ),
introduced(choice_axiom,[]) ).
fof(f225,plain,
! [X1] :
( ? [X2] :
( ~ aElementOf0(X2,xS)
& aElementOf0(X2,X1) )
=> ( ~ aElementOf0(sK16(X1),xS)
& aElementOf0(sK16(X1),X1) ) ),
introduced(choice_axiom,[]) ).
fof(f226,plain,
! [X5] :
( ? [X6] :
( ~ aElementOf0(X6,xT)
& aElementOf0(X6,X5) )
=> ( ~ aElementOf0(sK17(X5),xT)
& aElementOf0(sK17(X5),X5) ) ),
introduced(choice_axiom,[]) ).
fof(f227,plain,
! [X8] :
( ? [X9] :
( ~ aElementOf0(X9,xS)
& aElementOf0(X9,X8) )
=> ( ~ aElementOf0(sK18(X8),xS)
& aElementOf0(sK18(X8),X8) ) ),
introduced(choice_axiom,[]) ).
fof(f228,plain,
( slcrc0 != slbdtsldtrb0(xS,xk)
& aElementOf0(sK15,slbdtsldtrb0(xS,xk))
& ! [X1] :
( ( aElementOf0(X1,slbdtsldtrb0(xS,xk))
| sbrdtbr0(X1) != xk
| ( ~ aSubsetOf0(X1,xS)
& ( ( ~ aElementOf0(sK16(X1),xS)
& aElementOf0(sK16(X1),X1) )
| ~ aSet0(X1) ) ) )
& ( ( sbrdtbr0(X1) = xk
& aSubsetOf0(X1,xS)
& ! [X3] :
( aElementOf0(X3,xS)
| ~ aElementOf0(X3,X1) )
& aSet0(X1) )
| ~ aElementOf0(X1,slbdtsldtrb0(xS,xk)) ) )
& aSubsetOf0(slbdtsldtrb0(xS,xk),slbdtsldtrb0(xT,xk))
& ! [X4] :
( aElementOf0(X4,slbdtsldtrb0(xT,xk))
| ~ aElementOf0(X4,slbdtsldtrb0(xS,xk)) )
& ! [X5] :
( ( aElementOf0(X5,slbdtsldtrb0(xT,xk))
| xk != sbrdtbr0(X5)
| ( ~ aSubsetOf0(X5,xT)
& ( ( ~ aElementOf0(sK17(X5),xT)
& aElementOf0(sK17(X5),X5) )
| ~ aSet0(X5) ) ) )
& ( ( xk = sbrdtbr0(X5)
& aSubsetOf0(X5,xT)
& ! [X7] :
( aElementOf0(X7,xT)
| ~ aElementOf0(X7,X5) )
& aSet0(X5) )
| ~ aElementOf0(X5,slbdtsldtrb0(xT,xk)) ) )
& aSet0(slbdtsldtrb0(xT,xk))
& ! [X8] :
( ( aElementOf0(X8,slbdtsldtrb0(xS,xk))
| xk != sbrdtbr0(X8)
| ( ~ aSubsetOf0(X8,xS)
& ( ( ~ aElementOf0(sK18(X8),xS)
& aElementOf0(sK18(X8),X8) )
| ~ aSet0(X8) ) ) )
& ( ( xk = sbrdtbr0(X8)
& aSubsetOf0(X8,xS)
& ! [X10] :
( aElementOf0(X10,xS)
| ~ aElementOf0(X10,X8) )
& aSet0(X8) )
| ~ aElementOf0(X8,slbdtsldtrb0(xS,xk)) ) )
& aSet0(slbdtsldtrb0(xS,xk)) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK15,sK16,sK17,sK18])],[f223,f227,f226,f225,f224]) ).
fof(f352,plain,
! [X7,X5] :
( aElementOf0(X7,xT)
| ~ aElementOf0(X7,X5)
| ~ aElementOf0(X5,slbdtsldtrb0(xT,xk)) ),
inference(cnf_transformation,[],[f228]) ).
fof(f358,plain,
! [X4] :
( aElementOf0(X4,slbdtsldtrb0(xT,xk))
| ~ aElementOf0(X4,slbdtsldtrb0(xS,xk)) ),
inference(cnf_transformation,[],[f228]) ).
fof(f374,plain,
aElementOf0(xQ,slbdtsldtrb0(xS,xk)),
inference(cnf_transformation,[],[f161]) ).
fof(f380,plain,
aElementOf0(xx,xQ),
inference(cnf_transformation,[],[f162]) ).
fof(f381,plain,
~ aElementOf0(xx,xT),
inference(cnf_transformation,[],[f162]) ).
cnf(c_172,plain,
( ~ aElementOf0(X0,slbdtsldtrb0(xS,xk))
| aElementOf0(X0,slbdtsldtrb0(xT,xk)) ),
inference(cnf_transformation,[],[f358]) ).
cnf(c_178,plain,
( ~ aElementOf0(X0,slbdtsldtrb0(xT,xk))
| ~ aElementOf0(X1,X0)
| aElementOf0(X1,xT) ),
inference(cnf_transformation,[],[f352]) ).
cnf(c_190,plain,
aElementOf0(xQ,slbdtsldtrb0(xS,xk)),
inference(cnf_transformation,[],[f374]) ).
cnf(c_200,negated_conjecture,
~ aElementOf0(xx,xT),
inference(cnf_transformation,[],[f381]) ).
cnf(c_201,negated_conjecture,
aElementOf0(xx,xQ),
inference(cnf_transformation,[],[f380]) ).
cnf(c_12170,plain,
aElementOf0(xQ,slbdtsldtrb0(xT,xk)),
inference(superposition,[status(thm)],[c_190,c_172]) ).
cnf(c_12987,plain,
( ~ aElementOf0(X0,xQ)
| aElementOf0(X0,xT) ),
inference(superposition,[status(thm)],[c_12170,c_178]) ).
cnf(c_13402,plain,
aElementOf0(xx,xT),
inference(superposition,[status(thm)],[c_201,c_12987]) ).
cnf(c_13403,plain,
$false,
inference(forward_subsumption_resolution,[status(thm)],[c_13402,c_200]) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.07/0.12 % Problem : NUM552+3 : TPTP v8.1.2. Released v4.0.0.
% 0.07/0.13 % Command : run_iprover %s %d THM
% 0.13/0.35 % Computer : n017.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 Aug 25 08:27:55 EDT 2023
% 0.13/0.35 % CPUTime :
% 0.19/0.47 Running first-order theorem proving
% 0.19/0.47 Running: /export/starexec/sandbox2/solver/bin/run_problem --schedule fof_schedule --no_cores 8 /export/starexec/sandbox2/benchmark/theBenchmark.p 300
% 3.68/1.17 % SZS status Started for theBenchmark.p
% 3.68/1.17 % SZS status Theorem for theBenchmark.p
% 3.68/1.17
% 3.68/1.17 %---------------- iProver v3.8 (pre SMT-COMP 2023/CASC 2023) ----------------%
% 3.68/1.17
% 3.68/1.17 ------ iProver source info
% 3.68/1.17
% 3.68/1.17 git: date: 2023-05-31 18:12:56 +0000
% 3.68/1.17 git: sha1: 8abddc1f627fd3ce0bcb8b4cbf113b3cc443d7b6
% 3.68/1.17 git: non_committed_changes: false
% 3.68/1.17 git: last_make_outside_of_git: false
% 3.68/1.17
% 3.68/1.17 ------ Parsing...
% 3.68/1.17 ------ Clausification by vclausify_rel & Parsing by iProver...
% 3.68/1.17
% 3.68/1.17 ------ Preprocessing... sup_sim: 0 sf_s rm: 1 0s sf_e pe_s pe:1:0s pe:2:0s pe_e sup_sim: 0 sf_s rm: 1 0s sf_e pe_s pe_e
% 3.68/1.17
% 3.68/1.17 ------ Preprocessing... gs_s sp: 0 0s gs_e snvd_s sp: 0 0s snvd_e
% 3.68/1.17
% 3.68/1.17 ------ Preprocessing... sf_s rm: 1 0s sf_e sf_s rm: 0 0s sf_e
% 3.68/1.17 ------ Proving...
% 3.68/1.17 ------ Problem Properties
% 3.68/1.17
% 3.68/1.17
% 3.68/1.17 clauses 144
% 3.68/1.17 conjectures 2
% 3.68/1.17 EPR 42
% 3.68/1.17 Horn 111
% 3.68/1.17 unary 28
% 3.68/1.17 binary 24
% 3.68/1.17 lits 448
% 3.68/1.17 lits eq 68
% 3.68/1.17 fd_pure 0
% 3.68/1.17 fd_pseudo 0
% 3.68/1.17 fd_cond 9
% 3.68/1.17 fd_pseudo_cond 18
% 3.68/1.17 AC symbols 0
% 3.68/1.17
% 3.68/1.17 ------ Schedule dynamic 5 is on
% 3.68/1.17
% 3.68/1.17 ------ Input Options "--resolution_flag false --inst_lit_sel_side none" Time Limit: 10.
% 3.68/1.17
% 3.68/1.17
% 3.68/1.17 ------
% 3.68/1.17 Current options:
% 3.68/1.17 ------
% 3.68/1.17
% 3.68/1.17
% 3.68/1.17
% 3.68/1.17
% 3.68/1.17 ------ Proving...
% 3.68/1.17
% 3.68/1.17
% 3.68/1.17 % SZS status Theorem for theBenchmark.p
% 3.68/1.17
% 3.68/1.17 % SZS output start CNFRefutation for theBenchmark.p
% See solution above
% 3.68/1.17
% 3.68/1.17
%------------------------------------------------------------------------------