TSTP Solution File: KRS006-1 by FDP---0.9.16
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- Process Solution
%------------------------------------------------------------------------------
% File : FDP---0.9.16
% Problem : KRS006-1 : TPTP v5.0.0. Released v2.0.0.
% Transfm : add_equality
% Format : protein
% Command : fdp-casc %s %d
% Computer : art09.cs.miami.edu
% Model : i686 i686
% CPU : Intel(R) Pentium(R) 4 CPU 2.80GHz @ 2793MHz
% Memory : 2018MB
% OS : Linux 2.6.26.8-57.fc8
% CPULimit : 300s
% DateTime : Sun Jan 9 15:18:30 EST 2011
% Result : Satisfiable 0.27s
% Output : Assurance 0.27s
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----NO SOLUTION OUTPUT BY SYSTEM
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% FDPLL - A First-Order Davis-Putnam Theorem Prover
% Version 0.9.16 (26/06/2002)
% Proving /tmp/KRS006-1+noeq ...
% Done.
% Input File...............: /tmp/KRS006-1+noeq.tme
% System...................: Linux art09.cs.miami.edu 2.6.26.8-57.fc8 #1 SMP Thu Dec 18 19:19:45 EST 2008 i686 i686 i386 GNU/Linux
% Automatic mode...........: on
% Time limit...............: 300 seconds
% Current restart interval.: 210 seconds
% Restart with =-axioms....: off
% Initial interpretation...: [+(_11685)]
% Clause set type..........: Non-Horn, without equality
% Equality transformation..: off
% Non-constant functions...: yes
% Term depth settings......: 3/2 (Init/Increment)
% unit_extend..............: on
% splitting type...........: exact
% Final tree statistics:
% Tree for clause set......: as initially given
% # Restarts...............: 0
% Term depth limit.........: 5
% # Splits.................: 13
% # Commits................: 0
% # Unit extension steps...: 20
% # Unit back subsumptions.: 0
% # Branches closed........: 0
% # Level cuts.............: 0
% Time.....................: 0.05 seconds.
% Result...................: SATISFIABLE with model:
% +(s(u4r1(exist), u3r2(u4r1(exist))))
% +(s(u4r1(exist), u3r1(u4r1(exist))))
% -(equalish(u3r2(u4r1(exist)), u3r1(u4r1(exist))))
% -(d(u4r1(exist)))
% -(s1most(u4r1(exist)))
% +(s(u4r1(exist), u1r2(u4r1(exist))))
% +(s(u4r1(exist), u1r1(u4r1(exist))))
% -(equalish(u1r2(u4r1(exist)), u1r1(u4r1(exist))))
% +(equalish(u4r1(exist), u4r2(exist)))
% +(equalish(u4r2(exist), u4r1(exist)))
% +(equalish(u4r2(exist), u4r2(exist)))
% +(s2least(u4r1(exist)))
% +(s1most(u4r2(exist)))
% +(equalish(u4r1(exist), u4r1(exist)))
% +(r(exist, u4r2(exist)))
% +(c(u4r1(exist)))
% +(d(u4r2(exist)))
% +(r(exist, u4r1(exist)))
% +(r1most(exist))
% +(e(exist))
% +(_11955)
% -(s2least(X1_11979))
% -(c(X1_12003))
% -(e(X1_12027))
% -(r1most(X1_12051))
% -(equalish(u5r2(X1_12078), u5r1(X1_12078)))
% -(s(X1_12105, u5r1(X1_12108)))
% -(r(exist, u5r1(X1_12135)))
% -(s(u4r2(exist), u1r1(u4r1(exist))))
% -(r(exist, u1r1(u4r1(exist))))
% -(s(u4r2(exist), u3r1(u4r1(exist))))
% -(r(exist, u3r1(u4r1(exist))))
% -(s(X1_12276, u3r1(u4r1(exist))))
% -(s(X1_12305, u1r1(u4r1(exist))))
%
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