TSTP Solution File: FLD068-1 by SATCoP---0.1
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- Process Solution
%------------------------------------------------------------------------------
% File : SATCoP---0.1
% Problem : FLD068-1 : TPTP v8.1.0. Bugfixed v2.1.0.
% Transfm : none
% Format : tptp:raw
% Command : satcop --statistics %s
% Computer : n024.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 : 600s
% DateTime : Sat Jul 16 02:26:41 EDT 2022
% Result : Unsatisfiable 86.25s 11.28s
% Output : Proof 86.25s
% Verified :
% SZS Type : ERROR: Analysing output (MakeTreeStats fails)
% Comments :
%------------------------------------------------------------------------------
cnf(g0,plain,
less_or_equal(additive_identity,add(b,additive_inverse(a))),
inference(ground_cnf,[],[file('/export/starexec/sandbox2/benchmark/theBenchmark.p',less_or_equal_3)]) ).
cnf(g1,plain,
~ less_or_equal(a,b),
inference(ground_cnf,[],[file('/export/starexec/sandbox2/benchmark/theBenchmark.p',not_less_or_equal_4)]) ).
cnf(g2,plain,
( ~ defined(a)
| ~ less_or_equal(additive_identity,add(b,additive_inverse(a)))
| less_or_equal(add(additive_identity,a),add(add(b,additive_inverse(a)),a)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',compatibility_of_order_relation_and_addition)]) ).
cnf(g3,plain,
( ~ defined(a)
| ~ defined(b)
| less_or_equal(a,b)
| less_or_equal(b,a) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',totality_of_order_relation)]) ).
cnf(g4,plain,
( ~ defined(additive_inverse(a))
| ~ less_or_equal(b,a)
| less_or_equal(add(b,additive_inverse(a)),add(a,additive_inverse(a))) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',compatibility_of_order_relation_and_addition)]) ).
cnf(g5,plain,
defined(a),
inference(ground_cnf,[],[file('/export/starexec/sandbox2/benchmark/theBenchmark.p',a_is_defined)]) ).
cnf(g6,plain,
( ~ less_or_equal(add(add(b,additive_inverse(a)),a),add(additive_identity,a))
| ~ less_or_equal(add(additive_identity,a),add(add(b,additive_inverse(a)),a))
| equalish(add(add(b,additive_inverse(a)),a),add(additive_identity,a)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',antisymmetry_of_order_relation)]) ).
cnf(g7,plain,
defined(b),
inference(ground_cnf,[],[file('/export/starexec/sandbox2/benchmark/theBenchmark.p',b_is_defined)]) ).
cnf(g8,plain,
( ~ defined(a)
| equalish(add(additive_identity,a),a) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',existence_of_identity_addition)]) ).
cnf(g9,plain,
( ~ defined(b)
| ~ defined(b)
| less_or_equal(b,b)
| less_or_equal(b,b) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',totality_of_order_relation)]) ).
cnf(g10,plain,
( ~ equalish(add(a,additive_inverse(a)),additive_identity)
| equalish(additive_identity,add(a,additive_inverse(a))) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',symmetry_of_equality)]) ).
cnf(g11,plain,
( ~ defined(a)
| equalish(add(a,additive_inverse(a)),additive_identity) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',existence_of_inverse_addition)]) ).
cnf(g12,plain,
( ~ defined(a)
| defined(additive_inverse(a)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',well_definedness_of_additive_inverse)]) ).
cnf(g13,plain,
defined(additive_identity),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',well_definedness_of_additive_identity)]) ).
cnf(g14,plain,
( ~ less_or_equal(add(b,additive_inverse(a)),add(a,additive_inverse(a)))
| ~ less_or_equal(add(a,additive_inverse(a)),additive_identity)
| less_or_equal(add(b,additive_inverse(a)),additive_identity) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',transitivity_of_order_relation)]) ).
cnf(g15,plain,
( ~ defined(a)
| ~ less_or_equal(add(b,additive_inverse(a)),additive_identity)
| less_or_equal(add(add(b,additive_inverse(a)),a),add(additive_identity,a)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',compatibility_of_order_relation_and_addition)]) ).
cnf(g16,plain,
( ~ defined(b)
| equalish(add(additive_identity,b),b) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',existence_of_identity_addition)]) ).
cnf(g17,plain,
( ~ defined(b)
| ~ defined(additive_inverse(a))
| equalish(add(b,additive_inverse(a)),add(additive_inverse(a),b)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',commutativity_addition)]) ).
cnf(g18,plain,
( ~ defined(additive_inverse(a))
| ~ defined(b)
| defined(add(additive_inverse(a),b)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',well_definedness_of_addition)]) ).
cnf(g19,plain,
( ~ equalish(add(additive_identity,b),b)
| equalish(b,add(additive_identity,b)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',symmetry_of_equality)]) ).
cnf(g20,plain,
( ~ equalish(b,add(additive_identity,b))
| ~ less_or_equal(b,b)
| less_or_equal(add(additive_identity,b),b) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',compatibility_of_equality_and_order_relation)]) ).
cnf(g21,plain,
( ~ equalish(add(add(b,additive_inverse(a)),a),add(additive_identity,a))
| ~ equalish(add(additive_identity,a),a)
| equalish(add(add(b,additive_inverse(a)),a),a) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',transitivity_of_equality)]) ).
cnf(g22,plain,
( ~ equalish(add(additive_identity,b),a)
| ~ less_or_equal(add(additive_identity,b),b)
| less_or_equal(a,b) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',compatibility_of_equality_and_order_relation)]) ).
cnf(g23,plain,
( ~ equalish(add(add(b,additive_inverse(a)),a),a)
| equalish(a,add(add(b,additive_inverse(a)),a)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',symmetry_of_equality)]) ).
cnf(g24,plain,
( ~ equalish(add(b,additive_inverse(a)),add(additive_inverse(a),b))
| ~ defined(a)
| equalish(add(add(b,additive_inverse(a)),a),add(add(additive_inverse(a),b),a)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',compatibility_of_equality_and_addition)]) ).
cnf(g25,plain,
( ~ equalish(a,add(add(b,additive_inverse(a)),a))
| ~ equalish(add(add(b,additive_inverse(a)),a),add(add(additive_inverse(a),b),a))
| equalish(a,add(add(additive_inverse(a),b),a)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',transitivity_of_equality)]) ).
cnf(g26,plain,
( ~ defined(additive_identity)
| ~ defined(additive_identity)
| less_or_equal(additive_identity,additive_identity)
| less_or_equal(additive_identity,additive_identity) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',totality_of_order_relation)]) ).
cnf(g27,plain,
( ~ equalish(add(additive_identity,b),add(add(a,additive_inverse(a)),b))
| ~ equalish(add(add(a,additive_inverse(a)),b),a)
| equalish(add(additive_identity,b),a) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',transitivity_of_equality)]) ).
cnf(g28,plain,
( ~ equalish(additive_identity,add(a,additive_inverse(a)))
| ~ defined(b)
| equalish(add(additive_identity,b),add(add(a,additive_inverse(a)),b)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',compatibility_of_equality_and_addition)]) ).
cnf(g29,plain,
( ~ equalish(a,add(add(a,additive_inverse(a)),b))
| equalish(add(add(a,additive_inverse(a)),b),a) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',symmetry_of_equality)]) ).
cnf(g30,plain,
( ~ equalish(additive_identity,add(a,additive_inverse(a)))
| ~ less_or_equal(additive_identity,additive_identity)
| less_or_equal(add(a,additive_inverse(a)),additive_identity) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',compatibility_of_equality_and_order_relation)]) ).
cnf(g31,plain,
( ~ defined(a)
| ~ defined(additive_inverse(a))
| ~ defined(b)
| equalish(add(a,add(additive_inverse(a),b)),add(add(a,additive_inverse(a)),b)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',associativity_addition)]) ).
cnf(g32,plain,
( ~ equalish(a,add(add(additive_inverse(a),b),a))
| ~ equalish(add(add(additive_inverse(a),b),a),add(add(a,additive_inverse(a)),b))
| equalish(a,add(add(a,additive_inverse(a)),b)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',transitivity_of_equality)]) ).
cnf(g33,plain,
( ~ equalish(add(add(additive_inverse(a),b),a),add(a,add(additive_inverse(a),b)))
| ~ equalish(add(a,add(additive_inverse(a),b)),add(add(a,additive_inverse(a)),b))
| equalish(add(add(additive_inverse(a),b),a),add(add(a,additive_inverse(a)),b)) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',transitivity_of_equality)]) ).
cnf(g34,plain,
( ~ defined(add(additive_inverse(a),b))
| ~ defined(a)
| equalish(add(add(additive_inverse(a),b),a),add(a,add(additive_inverse(a),b))) ),
inference(ground_cnf,[],[file('Axioms/FLD001-0.ax',commutativity_addition)]) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.12 % Problem : FLD068-1 : TPTP v8.1.0. Bugfixed v2.1.0.
% 0.11/0.12 % Command : satcop --statistics %s
% 0.12/0.33 % Computer : n024.cluster.edu
% 0.12/0.33 % Model : x86_64 x86_64
% 0.12/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.33 % Memory : 8042.1875MB
% 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33 % CPULimit : 300
% 0.12/0.33 % WCLimit : 600
% 0.12/0.33 % DateTime : Mon Jun 6 18:45:05 EDT 2022
% 0.12/0.34 % CPUTime :
% 86.25/11.28 % symbols: 13
% 86.25/11.28 % clauses: 31
% 86.25/11.28 % start clauses: 2
% 86.25/11.28 % iterative deepening steps: 4198
% 86.25/11.28 % maximum path limit: 8
% 86.25/11.28 % literal attempts: 3743427
% 86.25/11.28 % depth failures: 2447583
% 86.25/11.28 % regularity failures: 221160
% 86.25/11.28 % tautology failures: 667226
% 86.25/11.28 % reductions: 328318
% 86.25/11.28 % extensions: 3414403
% 86.25/11.28 % SAT variables: 342354
% 86.25/11.28 % SAT clauses: 543301
% 86.25/11.28 % WalkSAT solutions: 541543
% 86.25/11.28 % CDCL solutions: 1751
% 86.25/11.28 % SZS status Unsatisfiable for theBenchmark
% 86.25/11.28 % SZS output start ListOfCNF for theBenchmark
% See solution above
%------------------------------------------------------------------------------