TSTP Solution File: GRP414-1 by Gandalf---c-2.6
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- Process Solution
%------------------------------------------------------------------------------
% File : Gandalf---c-2.6
% Problem : GRP414-1 : TPTP v3.4.2. Released v2.6.0.
% Transfm : add_equality:r
% Format : otter:hypothesis:set(auto),clear(print_given)
% Command : gandalf-wrapper -time %d %s
% Computer : art05.cs.miami.edu
% Model : i686 unknown
% CPU : Intel(R) Pentium(R) 4 CPU 2.80GHz @ 2793MHz
% Memory : 1000MB
% OS : Linux 2.4.22-21mdk-i686-up-4GB
% CPULimit : 600s
% Result : Unsatisfiable 0.0s
% Output : Assurance 0.0s
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----NO SOLUTION OUTPUT BY SYSTEM
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
%
% Gandalf c-2.6 r1 starting to prove: /home/graph/tptp/TSTP/PreparedTPTP/otter:hypothesis:set(auto),clear(print_given)---add_equality:r/GRP/GRP414-1+eq_r.in
% Using automatic strategy selection.
% Time limit in seconds: 600
%
% prove-all-passes started
%
% detected problem class: ueq
%
% strategies selected:
% (binary-posweight-kb-big-order 60 #f 10 1)
% (binary-posweight-lex-big-order 30 #f 10 1)
% (binary 30 #t)
% (binary-posweight-kb-big-order 180 #f)
% (binary-posweight-lex-big-order 120 #f)
% (binary-posweight-firstpref-order 60 #f)
% (binary-posweight-kb-small-order 60 #f)
% (binary-posweight-lex-small-order 60 #f)
%
%
% ********* EMPTY CLAUSE DERIVED *********
%
%
% timer checkpoints: c(3,40,0,6,0,0,6,50,0,9,0,0)
%
%
% START OF PROOF
% 7 [] equal(X,X).
% 8 [] equal(multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(multiply(X,inverse(Y))),Z))),Y))),Z).
% 9 [] -equal(multiply(multiply(a3,b3),c3),multiply(a3,multiply(b3,c3))).
% 10 [para:8.1.1,8.1.1.2.1.1.2.1] equal(multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(Z)),Y))),inverse(multiply(multiply(multiply(inverse(U),U),inverse(multiply(inverse(multiply(inverse(multiply(X,inverse(Y))),inverse(U))),Z))),U))).
% 11 [para:10.1.1,8.1.1] equal(inverse(multiply(multiply(multiply(inverse(X),X),inverse(multiply(inverse(multiply(inverse(multiply(Y,inverse(Z))),inverse(X))),multiply(inverse(multiply(Y,inverse(Z))),U)))),X)),U).
% 12 [para:10.1.2,8.1.1.2] equal(multiply(inverse(multiply(X,inverse(Y))),multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(Z)),Y)))),Z).
% 14 [para:8.1.1,12.1.1.2.2.1.1] equal(multiply(inverse(multiply(X,inverse(Y))),multiply(X,inverse(multiply(Z,Y)))),multiply(multiply(multiply(inverse(U),U),inverse(multiply(inverse(multiply(multiply(inverse(Y),Y),inverse(U))),Z))),U)).
% 16 [para:10.1.2,12.1.1.2.2] equal(multiply(inverse(multiply(X,inverse(Y))),multiply(X,multiply(Z,inverse(multiply(multiply(multiply(inverse(U),U),inverse(V)),U))))),multiply(inverse(multiply(inverse(multiply(Z,inverse(U))),inverse(Y))),V)).
% 24 [para:11.1.1,11.1.1.1.1.2.1.1.1.1,demod:11] equal(inverse(multiply(multiply(multiply(inverse(X),X),inverse(multiply(inverse(multiply(Y,inverse(X))),multiply(Y,Z)))),X)),Z).
% 28 [para:24.1.1,10.1.2.1.1.2.1.1.1.1] equal(multiply(multiply(multiply(inverse(inverse(X)),inverse(X)),inverse(multiply(inverse(multiply(Y,inverse(inverse(X)))),multiply(Y,Z)))),inverse(multiply(multiply(multiply(inverse(X),X),inverse(U)),X))),inverse(multiply(multiply(multiply(inverse(V),V),inverse(multiply(inverse(multiply(Z,inverse(V))),U))),V))).
% 29 [para:24.1.1,12.1.1.1] equal(multiply(X,multiply(multiply(multiply(inverse(inverse(Y)),inverse(Y)),inverse(multiply(inverse(multiply(Z,inverse(inverse(Y)))),multiply(Z,X)))),inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(U)),Y)))),U).
% 30 [para:24.1.1,12.1.1.2.2] equal(multiply(inverse(multiply(X,inverse(Y))),multiply(X,Z)),multiply(inverse(multiply(U,inverse(Y))),multiply(U,Z))).
% 31 [para:24.1.1,12.1.1.2.2.1.1.2] equal(multiply(inverse(multiply(X,inverse(Y))),multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),Z),Y)))),multiply(multiply(multiply(inverse(U),U),inverse(multiply(inverse(multiply(V,inverse(U))),multiply(V,Z)))),U)).
% 39 [para:11.1.1,30.1.1.1.1.2,demod:11] equal(multiply(inverse(multiply(X,Y)),multiply(X,Z)),multiply(inverse(multiply(U,Y)),multiply(U,Z))).
% 46 [para:39.1.1,8.1.1.2.1.1.1] equal(multiply(X,inverse(multiply(multiply(multiply(inverse(multiply(Y,Z)),multiply(Y,Z)),inverse(multiply(inverse(multiply(X,inverse(multiply(U,Z)))),V))),multiply(U,Z)))),V).
% 47 [para:8.1.1,39.1.1.2] equal(multiply(inverse(multiply(X,Y)),Z),multiply(inverse(multiply(U,Y)),multiply(U,inverse(multiply(multiply(multiply(inverse(V),V),inverse(multiply(inverse(multiply(X,inverse(V))),Z))),V))))).
% 52 [para:12.1.1,39.1.1.1.1] equal(multiply(inverse(X),multiply(inverse(multiply(Y,inverse(Z))),U)),multiply(inverse(multiply(V,multiply(Y,inverse(multiply(multiply(multiply(inverse(Z),Z),inverse(X)),Z))))),multiply(V,U))).
% 67 [para:39.1.1,39.1.1.1.1] equal(multiply(inverse(multiply(inverse(multiply(X,Y)),multiply(X,Z))),multiply(inverse(multiply(U,Y)),V)),multiply(inverse(multiply(W,multiply(U,Z))),multiply(W,V))).
% 68 [para:39.1.1,39.1.1.2] equal(multiply(inverse(multiply(inverse(multiply(X,Y)),Z)),multiply(inverse(multiply(U,Y)),multiply(U,V))),multiply(inverse(multiply(W,Z)),multiply(W,multiply(X,V)))).
% 72 [para:8.1.1,67.1.1.2,demod:47] equal(multiply(inverse(multiply(inverse(multiply(X,Y)),multiply(X,Z))),U),multiply(inverse(multiply(inverse(multiply(V,Y)),multiply(V,Z))),U)).
% 158 [para:12.1.1,68.1.1.1.1,demod:52] equal(multiply(inverse(X),multiply(inverse(multiply(Y,inverse(Z))),multiply(Y,U))),multiply(inverse(X),multiply(inverse(multiply(V,inverse(Z))),multiply(V,U)))).
% 311 [para:14.1.2,8.1.1.2.1] equal(multiply(multiply(inverse(X),X),inverse(multiply(inverse(multiply(Y,inverse(X))),multiply(Y,inverse(multiply(Z,X)))))),Z).
% 315 [para:10.1.1,14.1.1.2,demod:8] equal(X,multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(multiply(multiply(inverse(Z),Z),inverse(Y))),multiply(multiply(inverse(Z),Z),inverse(X))))),Y)).
% 319 [para:14.1.2,24.1.1.1] equal(inverse(multiply(inverse(multiply(X,inverse(Y))),multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),Z),Y))))),Z).
% 673 [para:30.1.1,315.1.2.1.2.1] equal(X,multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(multiply(Z,inverse(Y))),multiply(Z,inverse(X))))),Y)).
% 1165 [para:315.1.2,46.1.1.2.1.1.1.1.1,demod:315] equal(multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(multiply(X,inverse(multiply(Z,U)))),V))),multiply(Z,U)))),V).
% 1171 [para:8.1.1,1165.1.1.2.1.1.2.1.1.1.2.1,demod:8] equal(multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(multiply(X,inverse(Z))),U))),Z))),U).
% 1210 [para:319.1.1,1171.1.1.2.1.1.2] equal(multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),Z),U))),multiply(X,inverse(multiply(multiply(multiply(inverse(U),U),Z),U)))).
% 1228 [para:1210.1.2,12.1.1.2] equal(multiply(inverse(multiply(X,inverse(Y))),multiply(X,inverse(multiply(multiply(multiply(inverse(Z),Z),inverse(U)),Y)))),U).
% 1279 [para:1210.1.1,311.1.1.2.1.2,demod:319] equal(multiply(multiply(inverse(X),X),Y),multiply(multiply(inverse(Z),Z),Y)).
% 1365 [para:1279.1.1,311.1.1] equal(multiply(multiply(inverse(X),X),inverse(multiply(inverse(multiply(Y,inverse(Z))),multiply(Y,inverse(multiply(U,Z)))))),U).
% 1367 [para:1279.1.1,311.1.1.2.1.2.2.1,demod:1365] equal(multiply(inverse(X),X),multiply(inverse(Y),Y)).
% 1487 [para:1367.1.1,14.1.2.1.2.1,demod:1228] equal(X,multiply(multiply(multiply(inverse(X),X),inverse(multiply(inverse(Y),Y))),X)).
% 1715 [para:1279.1.1,1487.1.2.1] equal(X,multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(Z),Z))),X)).
% 1720 [?] ?
% 1721 [para:1715.1.2,39.1.1.1.1,demod:1715] equal(multiply(inverse(X),Y),multiply(inverse(multiply(Z,X)),multiply(Z,Y))).
% 1724 [para:1715.1.2,14.1.1.1.1,demod:1715] equal(multiply(inverse(inverse(X)),inverse(multiply(Y,X))),multiply(multiply(multiply(inverse(Z),Z),inverse(multiply(inverse(multiply(multiply(inverse(X),X),inverse(Z))),Y))),Z)).
% 1728 [para:1715.1.2,319.1.1.1.2.2.1,demod:1720] equal(inverse(multiply(inverse(inverse(X)),inverse(X))),inverse(multiply(inverse(Y),Y))).
% 1732 [para:1715.1.2,673.1.2.1.2.1.1.1,demod:1715] equal(X,multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(inverse(Y)),inverse(X)))),Y)).
% 1734 [para:1715.1.2,16.1.1.2.2,demod:1715,1720] equal(multiply(inverse(inverse(X)),inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(Z)),Y))),multiply(inverse(multiply(inverse(inverse(Y)),inverse(X))),Z)).
% 1738 [para:1715.1.2,1171.1.1,demod:1715] equal(inverse(multiply(multiply(multiply(inverse(X),X),inverse(multiply(inverse(inverse(Y)),Z))),Y)),Z).
% 1743 [para:8.1.1,1721.1.2.1.1] equal(multiply(inverse(inverse(multiply(multiply(multiply(inverse(X),X),inverse(multiply(inverse(multiply(Y,inverse(X))),Z))),X))),U),multiply(inverse(Z),multiply(Y,U))).
% 1746 [para:10.1.1,1721.1.2.1.1,demod:1720,1743] equal(multiply(inverse(inverse(multiply(multiply(multiply(inverse(X),X),inverse(Y)),X))),Z),multiply(inverse(Y),multiply(inverse(inverse(X)),Z))).
% 1748 [para:1721.1.2,12.1.1,demod:1734] equal(multiply(inverse(multiply(inverse(inverse(X)),inverse(X))),Y),Y).
% 1750 [para:12.1.1,1721.1.2.1.1] equal(multiply(inverse(multiply(X,inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(Z)),Y)))),U),multiply(inverse(Z),multiply(inverse(multiply(X,inverse(Y))),U))).
% 1754 [para:67.1.1,1721.1.2.2,demod:1721] equal(multiply(inverse(X),multiply(inverse(multiply(Y,Z)),U)),multiply(inverse(multiply(inverse(multiply(inverse(Z),V)),X)),multiply(inverse(multiply(Y,V)),U))).
% 1755 [para:72.1.1,1721.1.2.1.1,demod:1754,1721] equal(multiply(inverse(X),Y),multiply(inverse(X),multiply(inverse(multiply(inverse(Z),Z)),Y))).
% 1759 [para:1721.1.2,14.1.2.1.2.1.1.1.1,demod:1724,1720] equal(multiply(inverse(inverse(multiply(X,Y))),inverse(multiply(Z,multiply(X,Y)))),multiply(inverse(inverse(Y)),inverse(multiply(Z,Y)))).
% 1774 [para:1171.1.1,1721.1.2.1.1] equal(multiply(inverse(inverse(multiply(multiply(multiply(inverse(X),X),inverse(multiply(inverse(multiply(Y,inverse(Z))),U))),Z))),V),multiply(inverse(U),multiply(Y,V))).
% 1775 [para:1171.1.1,1721.1.2.2] equal(multiply(inverse(X),inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(multiply(Z,inverse(U))),V))),U))),multiply(inverse(multiply(Z,X)),V)).
% 1779 [para:1367.1.1,1721.1.2.1.1] equal(multiply(inverse(X),Y),multiply(inverse(multiply(inverse(Z),Z)),multiply(inverse(X),Y))).
% 1780 [para:1367.1.1,1721.1.2.2] equal(multiply(inverse(X),Y),multiply(inverse(multiply(inverse(Y),X)),multiply(inverse(Z),Z))).
% 1782 [para:10.1.1,1748.1.1.1.1,demod:1774,1746] equal(multiply(inverse(X),multiply(inverse(multiply(inverse(X),multiply(inverse(inverse(Y)),inverse(Y)))),Z)),Z).
% 1783 [para:10.1.2,1748.1.1.1.1.1.1,demod:1748,1720,1775,1750] equal(multiply(inverse(multiply(inverse(X),X)),Y),Y).
% 1785 [para:1748.1.1,1165.1.1.2.1.1.2.1,demod:1759] equal(multiply(inverse(inverse(X)),inverse(multiply(multiply(multiply(inverse(Y),Y),inverse(Z)),X))),Z).
% 1791 [para:10.1.2,1728.1.1.1.1.1,demod:1748,1720,1775,1750] equal(inverse(multiply(inverse(X),X)),inverse(multiply(inverse(Y),Y))).
% 1839 [para:1791.1.1,14.1.1.1.1.2,demod:1724,1780,1720] equal(multiply(inverse(inverse(multiply(inverse(X),X))),inverse(multiply(Y,multiply(inverse(Z),Z)))),multiply(inverse(inverse(Z)),inverse(multiply(Y,Z)))).
% 1842 [para:1791.1.1,14.1.2.1.2.1.1.1.1.1,demod:1724,1780,1839,1720] equal(multiply(inverse(inverse(X)),inverse(multiply(Y,X))),multiply(inverse(inverse(Z)),inverse(multiply(Y,Z)))).
% 1846 [para:1791.1.1,319.1.1.1.2.2.1.1.1.1,demod:1839,1720,1780] equal(inverse(multiply(inverse(inverse(X)),inverse(multiply(multiply(multiply(inverse(Y),Y),Z),X)))),Z).
% 1895 [para:1367.1.1,1755.1.2.2] equal(multiply(inverse(X),multiply(inverse(Y),Y)),multiply(inverse(X),multiply(inverse(Z),Z))).
% 1903 [para:1780.1.2,67.1.1.2.1.1,demod:1783,1721] equal(multiply(inverse(X),multiply(inverse(multiply(inverse(Y),Z)),U)),multiply(inverse(multiply(inverse(multiply(inverse(Z),Y)),X)),U)).
% 1907 [para:1780.1.2,14.1.1.2.2.1,demod:1724,1780,1720] equal(multiply(inverse(inverse(multiply(inverse(X),X))),inverse(multiply(inverse(Y),Z))),multiply(inverse(inverse(X)),inverse(multiply(inverse(multiply(inverse(Z),Y)),X)))).
% 1993 [para:1279.1.1,1732.1.2.1] equal(X,multiply(multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(inverse(Z)),inverse(X)))),Z)).
% 2032 [para:1738.1.1,67.1.1.2.1,demod:1721] equal(multiply(inverse(multiply(inverse(X),Y)),multiply(Z,U)),multiply(inverse(multiply(multiply(multiply(inverse(V),V),inverse(multiply(inverse(inverse(X)),Z))),Y)),U)).
% 2055 [para:1791.1.1,1738.1.1.1.1.2.1.1.1] equal(inverse(multiply(multiply(multiply(inverse(X),X),inverse(multiply(inverse(inverse(multiply(inverse(Y),Y))),Z))),multiply(inverse(U),U))),Z).
% 2071 [para:1785.1.1,30.1.1.1.1,demod:1720] equal(multiply(inverse(X),multiply(inverse(inverse(Y)),Z)),multiply(inverse(inverse(multiply(multiply(multiply(inverse(U),U),inverse(X)),Y))),Z)).
% 2153 [para:1846.1.1,30.1.1.1,demod:1720] equal(multiply(X,multiply(inverse(inverse(Y)),Z)),multiply(inverse(inverse(multiply(multiply(multiply(inverse(U),U),X),Y))),Z)).
% 2207 [para:1993.1.2,319.1.1.1.2,demod:2153,2032] equal(inverse(multiply(inverse(multiply(X,multiply(inverse(inverse(Y)),inverse(Y)))),multiply(inverse(Z),Z))),X).
% 2550 [para:10.1.1,2207.1.1.1.1.1.2,demod:1738,1748,1903,2071] equal(inverse(multiply(inverse(multiply(X,multiply(inverse(Y),Y))),multiply(inverse(Z),Z))),X).
% 2566 [para:1715.1.2,2207.1.1.1.1.1,demod:1748] equal(inverse(multiply(inverse(X),X)),multiply(multiply(inverse(Y),Y),inverse(multiply(inverse(Z),Z)))).
% 2612 [para:2566.1.2,8.1.1.2.1.1.2.1.1.1,demod:2055,1780] equal(multiply(multiply(inverse(X),X),Y),Y).
% 2624 [para:2566.1.1,12.1.1.1,demod:1779,2612] equal(multiply(inverse(inverse(X)),inverse(multiply(inverse(Y),X))),Y).
% 2625 [para:2566.1.1,11.1.1.1.1.1.1,demod:1720,1780,2612] equal(inverse(multiply(inverse(X),inverse(multiply(inverse(Y),Y)))),X).
% 2686 [para:2612.1.1,16.1.1.2.2,demod:1720,2612] equal(multiply(inverse(inverse(X)),inverse(multiply(inverse(Y),Z))),multiply(inverse(multiply(inverse(inverse(Z)),inverse(X))),Y)).
% 2688 [para:2612.1.1,2550.1.1.1.1.1,demod:1780] equal(inverse(multiply(inverse(X),X)),multiply(inverse(Y),Y)).
% 2723 [para:2688.1.1,16.1.1.1.1.2,demod:2625,1783,1721,2612] equal(multiply(X,inverse(multiply(inverse(Y),Z))),multiply(multiply(X,inverse(Z)),Y)).
% 2746 [para:2688.1.1,28.1.1.1.2,demod:2723,2686,2612] equal(inverse(multiply(inverse(X),Y)),inverse(multiply(inverse(multiply(multiply(inverse(inverse(Z)),inverse(Y)),X)),Z))).
% 2747 [para:2688.1.2,28.1.1.1.2.1,demod:2746,2723,2686,2624,1907,2612] equal(multiply(inverse(X),Y),inverse(multiply(inverse(Y),X))).
% 2749 [para:2688.1.1,28.1.1.1.2.1.1.1.2.1,demod:1721,2612,2747] equal(multiply(inverse(X),Y),inverse(multiply(multiply(inverse(Y),multiply(X,inverse(Z))),Z))).
% 2751 [para:2688.1.2,28.1.1.2.1.1.1,demod:2749,2612,2747,1720] equal(multiply(multiply(inverse(X),inverse(inverse(Y))),multiply(inverse(Y),Z)),multiply(inverse(X),Z)).
% 2754 [?] ?
% 2755 [para:2688.1.1,28.1.2.1.1.2.1.1,demod:2751,2612,2747,1720] equal(multiply(inverse(inverse(inverse(X))),Y),multiply(inverse(X),Y)).
% 2756 [para:2688.1.2,28.1.2.1.1.2.1.1.1,demod:2612,2747,2755,1720] equal(multiply(multiply(inverse(X),Y),multiply(inverse(Y),Z)),multiply(inverse(X),Z)).
% 2760 [para:2688.1.2,29.1.1.2.1.1,demod:2756,2612,2755,1720,2747] equal(multiply(X,multiply(inverse(X),Y)),Y).
% 2767 [para:2688.1.2,1782.1.1.2.1.1.2,demod:2612,2747] equal(multiply(inverse(X),multiply(X,Y)),Y).
% 2775 [para:12.1.1,2760.1.1.2,demod:2747,2612] equal(multiply(multiply(X,inverse(Y)),Z),multiply(X,multiply(inverse(Y),Z))).
% 2778 [para:2760.1.1,39.1.1.1.1,demod:2747,1721] equal(multiply(inverse(X),multiply(Y,Z)),multiply(multiply(inverse(X),Y),Z)).
% 2779 [para:2760.1.1,39.1.1.2,demod:1721] equal(multiply(inverse(multiply(X,Y)),Z),multiply(inverse(Y),multiply(inverse(X),Z))).
% 2788 [para:158.1.1,2760.1.1.2,demod:2760,2778,2747,2779,1720] equal(multiply(X,Y),multiply(inverse(inverse(X)),Y)).
% 2801 [para:1171.1.1,2760.1.1.2,demod:2754,2778,2788,2747] equal(multiply(X,Y),multiply(inverse(Z),multiply(multiply(Z,X),Y))).
% 2802 [para:1367.1.1,2760.1.1.2] equal(multiply(X,multiply(inverse(Y),Y)),X).
% 2805 [para:2760.1.1,1895.1.1,demod:2779] equal(inverse(X),multiply(inverse(multiply(Y,X)),Y)).
% 2808 [para:2760.1.1,31.1.1.2.2.1.1,demod:2805,2754,2767,2778,2747,2788,1720] equal(multiply(X,inverse(multiply(Y,X))),inverse(Y)).
% 2812 [para:1842.1.1,2760.1.1.2,demod:2808,2788] equal(multiply(inverse(X),inverse(Y)),inverse(multiply(Y,X))).
% 2815 [para:2760.1.1,2550.1.1.1,demod:2802] equal(inverse(inverse(X)),X).
% 2816 [para:2815.1.1,10.1.1.2.1.1.1.1,demod:2801,2747,2754,2778,2815,2808,2812,2775] equal(multiply(X,multiply(Y,Z)),multiply(multiply(X,Y),Z)).
% 2838 [para:2816.1.2,9.1.1,cut:7] contradiction
% END OF PROOF
%
% Proof found by the following strategy:
%
% using binary resolution
% using first neg lit preferred strategy
% not using sos strategy
% using dynamic demodulation
% using ordered paramodulation
% using kb ordering for equality
% preferring bigger arities for lex ordering
% using clause demodulation
% clause length limited to 1
% clause depth limited to 11
% seconds given: 60
%
%
% ***GANDALF_FOUND_A_REFUTATION***
%
% Global statistics over all passes:
%
% given clauses: 111
% derived clauses: 41696
% kept clauses: 2828
% kept size sum: 98489
% kept mid-nuclei: 0
% kept new demods: 776
% forw unit-subs: 35316
% forw double-subs: 0
% forw overdouble-subs: 0
% backward subs: 40
% fast unit cutoff: 1
% full unit cutoff: 0
% dbl unit cutoff: 0
% real runtime : 1.40
% process. runtime: 1.39
% specific non-discr-tree subsumption statistics:
% tried: 0
% length fails: 0
% strength fails: 0
% predlist fails: 0
% aux str. fails: 0
% by-lit fails: 0
% full subs tried: 0
% full subs fail: 0
%
% ; program args: ("/home/graph/tptp/Systems/Gandalf---c-2.6/gandalf" "-time" "600" "/home/graph/tptp/TSTP/PreparedTPTP/otter:hypothesis:set(auto),clear(print_given)---add_equality:r/GRP/GRP414-1+eq_r.in")
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