TSTP Solution File: SYN443-1 by Gandalf---c-2.6
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- Process Solution
%------------------------------------------------------------------------------
% File : Gandalf---c-2.6
% Problem : SYN443-1 : TPTP v3.4.2. Released v2.1.0.
% Transfm : add_equality:r
% Format : otter:hypothesis:set(auto),clear(print_given)
% Command : gandalf-wrapper -time %d %s
% Computer : art08.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 : Timeout 607.7s
% Output : None
% 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/SYN/SYN443-1+noeq.in
% Using automatic strategy selection.
% Time limit in seconds: 600
%
% prove-all-passes started
%
% detected problem class: nne
% detected subclass: big
%
% strategies selected:
% (hyper 30 #f 1 19)
% (binary-unit 30 #f 1 19)
% (binary-double 18 #f 1 19)
% (binary 90 #t 1 19)
% (binary-order 30 #f 1 19)
% (binary-posweight-order 54 #f)
% (binary-order-sos 30 #t)
% (binary-unit-uniteq 30 #f)
% (binary-weightorder 30 #f)
% (binary-weightorder-sos 30 #f)
% (binary-order 30 #f)
% (hyper-order 30 #f)
% (binary 168 #t)
%
%
% SOS clause
% -c1_1(X) | -c2_1(X) | -c3_1(X) | -ndr1_0(0) | -c0_1(Y) | -c1_1(Y) | -c3_1(Y) | -c0_1(Z) | -c1_1(Z) | -c2_1(Z).
% was split for some strategies as:
% -c0_1(Z) | -c1_1(Z) | -c2_1(Z).
% -c0_1(Y) | -c1_1(Y) | -c3_1(Y).
% -c1_1(X) | -c2_1(X) | -c3_1(X).
% -ndr1_0(0).
%
% Starting a split proof attempt with 4 components.
%
% Split component 1 started.
%
% START OF PROOFPART
% Making new sos for split:
% Original clause to be split:
% -c1_1(X) | -c2_1(X) | -c3_1(X) | -ndr1_0(0) | -c0_1(Y) | -c1_1(Y) | -c3_1(Y) | -c0_1(Z) | -c1_1(Z) | -c2_1(Z).
% Split part used next: -c0_1(Z) | -c1_1(Z) | -c2_1(Z).
% END OF PROOFPART
% ********* EMPTY CLAUSE DERIVED *********
%
%
% timer checkpoints: c(184,40,1,372,0,2,86858,4,1143,105749,5,1507,105749,1,1507,105749,50,1508,105749,40,1508,105937,0,1508,106145,50,1508,106333,0,1508,106541,50,1509,106729,0,1511,106937,50,1511,107125,0,1511,107333,50,1512,107521,0,1513,107729,50,1514,107917,0,1514,108125,50,1514,108313,0,1516,108521,50,1516,108709,0,1517,108917,50,1517,109105,0,1519,109313,50,1519,109501,0,1519,109709,50,1520,109897,0,1521,110105,50,1522,110293,0,1522,110501,50,1522,110689,0,1524,110897,50,1524,111085,0,1524,111293,50,1525,111481,0,1527,111689,50,1527,111877,0,1527,112085,50,1528,112273,0,1529,112481,50,1530,112669,0,1530,112877,50,1530,113065,0,1532,113273,50,1533,113461,0,1533,113669,50,1533,113857,0,1535,114065,50,1535,114065,40,1535,114253,0,1536,128266,3,1987,129841,4,2212,130514,1,2437,130514,50,2437,130514,40,2437,130702,0,2437,195097,3,5684,195162,4,5814,195813,5,6938,195814,1,6938,195814,50,6940,195814,40,6940,196002,0,6940,231437,3,7691,231941,4,8066,232823,5,8441,232824,1,8441,232824,50,8442,232824,40,8442,233012,0,8442,270413,3,9794,271309,4,10468,272011,5,11143,272012,1,11143,272012,50,11144,272012,40,11144,272200,0,11144,305633,3,11896,306173,4,12270,307188,5,12645,307189,1,12645,307189,50,12646,307189,40,12646,307377,0,12646,307585,50,12646,307585,40,12646,307773,0,12646,318890,3,13402,319115,50,13562,319115,40,13562,319303,0,13562,356582,3,14635,356621,4,14688,357412,5,15063,357413,1,15063,357413,50,15064,357413,40,15064,357601,0,15064,394573,3,15875,394985,4,16190,396021,5,16565,396022,1,16565,396022,50,16566,396022,40,16566,396210,0,16566,466625,4,17938,481350,5,18067,481350,1,18067,481350,50,18067,481350,40,18067,481538,0,18067,590941,3,22857,591730,4,24368,593141,5,26468,593142,1,26468,593142,50,26470,593142,40,26470,593142,40,26470,593326,0,26470,622210,4,26976,633615,5,27071,633615,1,27071,633615,50,27071,633615,40,27071,633799,0,27071,633997,50,27071,634181,0,27071,634379,50,27071,634563,0,27085,634761,50,27085,634945,0,27086,635143,50,27086,635327,0,27099,635525,50,27100,635709,0,27100,635907,50,27100,636091,0,27113,636289,50,27113,636473,0,27114,636671,50,27114,636855,0,27127,637053,50,27127,637237,0,27127,637435,50,27128,637619,0,27141,637817,50,27141,638001,0,27141,638199,50,27142,638383,0,27155,638581,50,27155,638765,0,27155,638963,50,27155,639147,0,27169,639345,50,27169,639529,0,27170,639727,50,27170,639911,0,27183,640109,50,27183,640293,0,27184,640491,50,27184,640675,0,27197,640873,50,27197,641057,0,27197,641255,50,27198,641439,0,27213,641637,50,27213,641637,40,27213,641821,0,27213,651220,3,27414,653675,4,27514,654096,5,27614,654097,5,27614,654097,1,27614,654097,50,27614,654097,40,27614,654281,0,27628,695722,3,28739,696363,4,29279,697132,5,29829,697133,1,29829,697133,50,29829,697133,40,29829,697317,0,29829,714618,3,30130,715053,4,30280,715687,5,30430,715688,1,30430,715688,50,30430,715688,40,30430,715872,0,30430,738345,3,31031,738892,4,31331,739545,5,31631,739546,1,31631,739546,50,31631,739546,40,31631,739730,0,31631,758137,3,31932,758548,4,32082,759095,5,32232,759096,1,32232,759096,50,32232,759096,40,32232,759280,0,32232,759478,50,32232,759478,40,32232,759662,0,32232)
%
%
% START OF PROOF
% 759479 [] -ndr1_0(0) | -c1_1(Y) | -c1_1(X) | -c3_1(X) | -c2_1(Z) | -c0_1(Z) | -c0_1(Y) | -c0_1(X) | c1_1(Z) | c2_1(Y).
% 759480 [] -ndr1_0(0) | -c3_1(X) | -c2_1(X) | -c2_1(Y) | -c2_1(Z) | -c0_1(Y) | -c0_1(Z) | c1_1(Y) | c3_1(Z) | c0_1(X).
% 759481 [] -ndr1_0(0) | -c1_1(X) | -c3_1(Y) | -c2_1(X) | -c2_1(Z) | -c0_1(Y) | c1_1(Z) | c3_1(Z) | c2_1(Y) | c0_1(X).
% 759487 [] -ndr1_0(0) | hskp29(0) | -c3_1(X) | -c2_1(X) | -c0_1(Y) | -c0_1(X) | c1_1(Y) | c3_1(Y).
% 759488 [] -ndr1_0(0) | hskp29(0) | -c1_1(X) | -c3_1(Y) | -c3_1(X) | -c2_1(X) | c1_1(Y) | c2_1(Y).
% 759496 [] -ndr1_0(0) | hskp22(0) | -c1_1(X) | -c0_1(Y) | c3_1(Y) | c3_1(X) | c2_1(Y) | c2_1(X).
% 759502 [?] ?
% 759504 [?] ?
% 759505 [?] ?
% 759516 [?] ?
% 759517 [?] ?
% 759519 [?] ?
% 759520 [?] ?
% 759526 [?] ?
% 759528 [] -hskp0(0) | c2_1(a1).
% 759529 [] -hskp0(0) | c1_1(a1).
% 759530 [] -hskp1(0) | c3_1(a2).
% 759531 [] -hskp1(0) | c0_1(a2).
% 759532 [] -hskp2(0) | c2_1(a3).
% 759533 [] -hskp2(0) | c0_1(a3).
% 759539 [] -hskp6(0) | c0_1(a8).
% 759540 [] -hskp7(0) | c1_1(a9).
% 759544 [] -hskp11(0) | c1_1(a19).
% 759545 [] -hskp11(0) | c0_1(a19).
% 759551 [] -hskp18(0) | c3_1(a34).
% 759552 [] -hskp20(0) | c3_1(a38).
% 759553 [] -hskp20(0) | c1_1(a38).
% 759556 [] -hskp22(0) | c2_1(a43).
% 759563 [] -hskp27(0) | c3_1(a10).
% 759564 [] -hskp27(0) | c2_1(a10).
% 759565 [] -hskp27(0) | c1_1(a10).
% 759566 [] -hskp28(0) | c3_1(a15).
% 759567 [] -hskp28(0) | c1_1(a15).
% 759568 [] -hskp28(0) | c0_1(a15).
% 759569 [] -hskp29(0) | c2_1(a25).
% 759570 [] -hskp29(0) | c1_1(a25).
% 759571 [] -hskp29(0) | c0_1(a25).
% 759572 [] -hskp30(0) | c3_1(a33).
% 759573 [] -hskp30(0) | c2_1(a33).
% 759574 [] -hskp30(0) | c0_1(a33).
% 759578 [] hskp7(0) | hskp27(0) | hskp30(0).
% 759579 [] hskp2(0) | hskp18(0) | hskp30(0).
% 759595 [] -hskp11(0) | ndr1_0(0).
% 759606 [] -hskp22(0) | ndr1_0(0).
% 759615 [] hskp22(0) | hskp11(0).
% 759616 [] -c1_1(X) | -c2_1(X) | -c0_1(X).
% 759618 [] -c2_1(a2) | -hskp1(0).
% 759619 [] -c1_1(a3) | -hskp2(0).
% 759624 [] -c3_1(a8) | -hskp6(0).
% 759625 [] -c2_1(a8) | -hskp6(0).
% 759626 [] -c2_1(a9) | -hskp7(0).
% 759627 [] -c0_1(a9) | -hskp7(0).
% 759634 [] -c3_1(a19) | -hskp11(0).
% 759640 [] -c2_1(a26) | -hskp14(0).
% 759641 [] -c1_1(a26) | -hskp14(0).
% 759642 [] -c0_1(a26) | -hskp14(0).
% 759648 [] -c2_1(a34) | -hskp18(0).
% 759649 [] -c1_1(a34) | -hskp18(0).
% 759653 [] -c0_1(a38) | -hskp20(0).
% 759655 [] -c3_1(a43) | -hskp22(0).
% 759656 [] -c1_1(a43) | -hskp22(0).
% 759815 [binary:759556,759615] c2_1(a43) | hskp11(0).
% 759817 [binary:759606,759615,binarycut:759595] ndr1_0(0).
% 759820 [binary:759481,759817] -c1_1(X) | -c3_1(Y) | -c2_1(X) | -c2_1(Z) | -c0_1(Y) | c1_1(Z) | c3_1(Z) | c2_1(Y) | c0_1(X).
% 759826 [binary:759487,759817] hskp29(0) | -c3_1(X) | -c2_1(X) | -c0_1(Y) | -c0_1(X) | c1_1(Y) | c3_1(Y).
% 759827 [binary:759488,759817] hskp29(0) | -c1_1(X) | -c3_1(X) | -c3_1(Y) | -c2_1(X) | c1_1(Y) | c2_1(Y).
% 759850 [binary:759540,759578] c1_1(a9) | hskp27(0) | hskp30(0).
% 759852 [binary:759532,759579] c2_1(a3) | hskp18(0) | hskp30(0).
% 759853 [binary:759533,759579] c0_1(a3) | hskp18(0) | hskp30(0).
% 759884 [input:759502,cut:759817] hskp1(0) | -c2_1(X) | -c0_1(X) | c1_1(Y) | c1_1(X) | c2_1(Y) | c0_1(Y).
% 759885 [binary:759530,759884] c3_1(a2) | -c2_1(X) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(Y) | c0_1(Y).
% 759886 [binary:759531,759884] c0_1(a2) | -c2_1(X) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(Y) | c0_1(Y).
% 759905 [input:759504,cut:759817] hskp2(0) | -c0_1(X) | c1_1(Y) | c3_1(X) | c2_1(X) | c2_1(Y) | c0_1(Y).
% 759906 [binary:759532,759905] c2_1(a3) | -c0_1(X) | c1_1(Y) | c3_1(X) | c2_1(X) | c2_1(Y) | c0_1(Y).
% 759909 [binary:759533,759905] c0_1(a3) | -c0_1(X) | c1_1(Y) | c3_1(X) | c2_1(X) | c2_1(Y) | c0_1(Y).
% 759928 [input:759496,factor:cut:759817] hskp22(0) | -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 759929 [binary:759556,759928] c2_1(a43) | -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 759952 [input:759505,factor:cut:759817] hskp0(0) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 759953 [binary:759528,759952] c2_1(a1) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 759955 [binary:759529,759952] c1_1(a1) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 759965 [binary:759616,759955] -c2_1(a1) | -c0_1(a1) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 759977 [binary:759953,759965,factor] -c0_1(a1) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 760014 [input:759516,cut:759817] hskp20(0) | hskp29(0) | -c0_1(X) | c1_1(X) | c2_1(X).
% 760015 [binary:759552,760014] c3_1(a38) | hskp29(0) | -c0_1(X) | c1_1(X) | c2_1(X).
% 760016 [binary:759553,760014] c1_1(a38) | hskp29(0) | -c0_1(X) | c1_1(X) | c2_1(X).
% 760028 [input:759517,cut:759817] hskp14(0) | hskp29(0) | -c2_1(X) | c3_1(X) | c0_1(X).
% 760034 [input:759519,cut:759817] hskp6(0) | hskp11(0) | -c3_1(X) | c2_1(X) | c0_1(X).
% 760035 [binary:759539,760034] c0_1(a8) | hskp11(0) | -c3_1(X) | c2_1(X) | c0_1(X).
% 760038 [input:759520,cut:759817] hskp27(0) | hskp28(0) | -c1_1(X) | c2_1(X) | c0_1(X).
% 760039 [binary:759563,760038] c3_1(a10) | hskp28(0) | -c1_1(X) | c2_1(X) | c0_1(X).
% 760040 [binary:759564,760038] c2_1(a10) | hskp28(0) | -c1_1(X) | c2_1(X) | c0_1(X).
% 760042 [binary:759565,760038] c1_1(a10) | hskp28(0) | -c1_1(X) | c2_1(X) | c0_1(X).
% 760051 [binary:759616,760042] -c2_1(a10) | -c0_1(a10) | hskp28(0) | -c1_1(X) | c2_1(X) | c0_1(X).
% 760065 [binary:760040,760051,factor] -c0_1(a10) | hskp28(0) | -c1_1(X) | c2_1(X) | c0_1(X).
% 760083 [input:759526,cut:759817] hskp18(0) | hskp30(0) | c1_1(X) | c3_1(X) | c2_1(X).
% 760084 [binary:759551,760083] c3_1(a34) | hskp30(0) | c1_1(X) | c3_1(X) | c2_1(X).
% 760093 [input:759479,factor:cut:759817] -c1_1(X) | -c3_1(X) | -c2_1(Y) | -c0_1(Y) | -c0_1(X) | c1_1(Y) | c2_1(X).
% 760103 [input:759480,factor:factor:factor:cut:759817] -c3_1(X) | -c2_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c0_1(X).
% 760113 [binary:760039,760103] -c2_1(a10) | c0_1(a10) | hskp28(0) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 760174 [binary:759569,759826] c2_1(a25) | -c3_1(X) | -c2_1(X) | -c0_1(X) | -c0_1(Y) | c1_1(Y) | c3_1(Y).
% 760175 [binary:759570,759826] c1_1(a25) | -c3_1(X) | -c2_1(X) | -c0_1(X) | -c0_1(Y) | c1_1(Y) | c3_1(Y).
% 760177 [binary:759571,759826] c0_1(a25) | -c3_1(X) | -c2_1(X) | -c0_1(X) | -c0_1(Y) | c1_1(Y) | c3_1(Y).
% 760187 [binary:759955,759820] -c2_1(a1) | c0_1(a1) | -c3_1(X) | -c2_1(Y) | -c0_1(X) | c1_1(Z) | c1_1(Y) | c3_1(Z) | c3_1(Y) | c2_1(Z) | c2_1(X) | c0_1(Z).
% 760209 [binary:759569,759827] c2_1(a25) | -c1_1(X) | -c3_1(X) | -c3_1(Y) | -c2_1(X) | c1_1(Y) | c2_1(Y).
% 760211 [binary:759570,759827] c1_1(a25) | -c1_1(X) | -c3_1(X) | -c3_1(Y) | -c2_1(X) | c1_1(Y) | c2_1(Y).
% 760213 [binary:759571,759827] c0_1(a25) | -c1_1(X) | -c3_1(X) | -c3_1(Y) | -c2_1(X) | c1_1(Y) | c2_1(Y).
% 760369 [binary:759616,760175] -c2_1(a25) | -c0_1(a25) | -c3_1(X) | -c2_1(X) | -c0_1(X) | -c0_1(Y) | c1_1(Y) | c3_1(Y).
% 760380 [binary:759616,760211] -c2_1(a25) | -c0_1(a25) | -c1_1(X) | -c3_1(Y) | -c3_1(X) | -c2_1(X) | c1_1(Y) | c2_1(Y).
% 760432 [binary:760174,760369,factor:factor:factor:factor:factor:factor] -c0_1(a25) | -c3_1(X) | -c2_1(X) | -c0_1(X) | -c0_1(Y) | c1_1(Y) | c3_1(Y).
% 760438 [binary:760177,760432,factor:factor:factor] -c3_1(X) | -c2_1(X) | -c0_1(Y) | -c0_1(X) | c1_1(Y) | c3_1(Y).
% 760480 [binary:760209,760380,factor:factor:factor] -c0_1(a25) | -c1_1(X) | -c3_1(Y) | -c3_1(X) | -c2_1(X) | c1_1(Y) | c2_1(Y).
% 760484 [binary:760213,760480,factor:factor] -c1_1(X) | -c3_1(Y) | -c3_1(X) | -c2_1(X) | c1_1(Y) | c2_1(Y).
% 760499 [binary:760016,760484,factor] -c3_1(a38) | -c2_1(a38) | hskp29(0) | -c3_1(X) | -c0_1(X) | c1_1(X) | c2_1(X).
% 760500 [binary:760042,760484] -c3_1(a10) | -c2_1(a10) | hskp28(0) | -c1_1(X) | -c3_1(Y) | c1_1(Y) | c2_1(X) | c2_1(Y) | c0_1(X).
% 760518 [binary:760015,760499,factor] -c2_1(a38) | hskp29(0) | -c3_1(X) | -c0_1(X) | c1_1(X) | c2_1(X).
% 760611 [binary:760040,760113,factor:factor] c0_1(a10) | hskp28(0) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 760688 [binary:760065,760611,factor] hskp28(0) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 760692 [binary:759566,760688] c3_1(a15) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 760694 [binary:759567,760688] c1_1(a15) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 760696 [binary:759568,760688] c0_1(a15) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 760704 [binary:760438,760692,factor:factor:factor] -c2_1(a15) | -c0_1(a15) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 760708 [binary:760093,760694,factor:factor:factor] -c3_1(a15) | -c0_1(a15) | c2_1(a15) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 760842 [binary:760039,760500,factor] -c2_1(a10) | hskp28(0) | -c1_1(X) | -c3_1(Y) | c1_1(Y) | c2_1(X) | c2_1(Y) | c0_1(X).
% 760845 [binary:760040,760842,factor] hskp28(0) | -c1_1(X) | -c3_1(Y) | c1_1(Y) | c2_1(Y) | c2_1(X) | c0_1(X).
% 760847 [binary:759566,760845] c3_1(a15) | -c1_1(X) | -c3_1(Y) | c1_1(Y) | c2_1(Y) | c2_1(X) | c0_1(X).
% 760848 [binary:759567,760845] c1_1(a15) | -c1_1(X) | -c3_1(Y) | c1_1(Y) | c2_1(Y) | c2_1(X) | c0_1(X).
% 760850 [binary:759568,760845] c0_1(a15) | -c1_1(X) | -c3_1(Y) | c1_1(Y) | c2_1(Y) | c2_1(X) | c0_1(X).
% 760862 [binary:760093,760848] -c3_1(a15) | -c0_1(a15) | c2_1(a15) | -c1_1(X) | -c3_1(Y) | -c2_1(Z) | -c0_1(Z) | c1_1(Z) | c1_1(Y) | c2_1(X) | c2_1(Y) | c0_1(X).
% 760867 [binary:760484,760848,factor:factor] -c3_1(a15) | -c2_1(a15) | -c1_1(X) | -c3_1(Y) | c1_1(Y) | c2_1(X) | c2_1(Y) | c0_1(X).
% 760878 [binary:760847,760867,factor:factor] -c2_1(a15) | -c1_1(X) | -c3_1(Y) | c1_1(Y) | c2_1(Y) | c2_1(X) | c0_1(X).
% 761063 [binary:759953,760187,factor:factor:factor] c0_1(a1) | -c3_1(X) | -c2_1(Y) | -c0_1(X) | c1_1(Y) | c1_1(Z) | c3_1(Y) | c3_1(Z) | c2_1(Z) | c2_1(X) | c0_1(Z).
% 761517 [binary:760692,760708,factor:factor:factor:factor:factor] -c0_1(a15) | c2_1(a15) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 761525 [binary:760696,761517,factor:factor:factor] c2_1(a15) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 761531 [binary:760704,761525,factor:factor:factor:factor] -c0_1(a15) | -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 761538 [binary:760696,761531,factor:factor] -c1_1(X) | -c2_1(Y) | -c0_1(Y) | c1_1(Y) | c3_1(Y) | c2_1(X) | c0_1(X).
% 761541 [binary:759850,761538] c2_1(a9) | c0_1(a9) | hskp27(0) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761632 [binary:759626,761541,binarycut:759627] -hskp7(0) | hskp27(0) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761638 [binary:759578,761632] hskp27(0) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761640 [binary:759563,761638] c3_1(a10) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761642 [binary:759564,761638] c2_1(a10) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761652 [binary:760103,761640,factor:factor] -c2_1(a10) | c0_1(a10) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761655 [binary:760438,761640,factor:factor:factor] -c2_1(a10) | -c0_1(a10) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761666 [binary:761642,761652,factor] c0_1(a10) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761677 [binary:761642,761655,factor:factor] -c0_1(a10) | hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761680 [binary:761666,761677,factor] hskp30(0) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761682 [binary:759572,761680] c3_1(a33) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761684 [binary:759573,761680] c2_1(a33) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761685 [binary:759574,761680] c0_1(a33) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761695 [binary:760438,761682,factor:factor:factor] -c2_1(a33) | -c0_1(a33) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761702 [binary:761684,761695,factor:factor] -c0_1(a33) | -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761705 [binary:761685,761702,factor] -c2_1(X) | -c0_1(X) | c1_1(X) | c3_1(X).
% 761715 [binary:759815,761705] -c0_1(a43) | c1_1(a43) | c3_1(a43) | hskp11(0).
% 761719 [binary:759929,761705] -c0_1(a43) | c1_1(a43) | c3_1(a43) | -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 762743 [binary:759977,761063,factor:factor] -c3_1(X) | -c2_1(Y) | -c0_1(X) | c1_1(Z) | c1_1(Y) | c3_1(Y) | c3_1(Z) | c2_1(Z) | c2_1(X) | c0_1(Z).
% 762758 [binary:760084,762743,factor:factor:factor] -c0_1(a34) | c2_1(a34) | hskp30(0) | -c2_1(X) | c1_1(X) | c1_1(Y) | c3_1(Y) | c3_1(X) | c2_1(Y) | c0_1(Y).
% 763257 [binary:760847,760862,factor:factor:factor:factor:factor] -c0_1(a15) | c2_1(a15) | -c1_1(X) | -c3_1(Y) | -c2_1(Z) | -c0_1(Z) | c1_1(Z) | c1_1(Y) | c2_1(X) | c2_1(Y) | c0_1(X).
% 763842 [binary:760850,763257,factor:factor:factor:factor:factor] c2_1(a15) | -c1_1(X) | -c3_1(Y) | -c2_1(Z) | -c0_1(Z) | c1_1(Z) | c1_1(Y) | c2_1(Y) | c2_1(X) | c0_1(X).
% 763846 [binary:760878,763842,factor:factor] -c1_1(X) | -c3_1(Y) | -c2_1(Z) | -c0_1(Z) | c1_1(Z) | c1_1(Y) | c2_1(Y) | c2_1(X) | c0_1(X).
% 763856 [binary:760016,763846,factor:factor:factor] c2_1(a38) | c0_1(a38) | hskp29(0) | -c3_1(X) | -c2_1(Y) | -c0_1(X) | -c0_1(Y) | c1_1(Y) | c1_1(X) | c2_1(X).
% 763916 [binary:760518,763856,factor] c0_1(a38) | hskp29(0) | -c3_1(X) | -c2_1(Y) | -c0_1(Y) | -c0_1(X) | c1_1(Y) | c1_1(X) | c2_1(X).
% 763941 [binary:759653,763916] -hskp20(0) | hskp29(0) | -c3_1(X) | -c2_1(Y) | -c0_1(X) | -c0_1(Y) | c1_1(X) | c1_1(Y) | c2_1(X).
% 763950 [binary:760014,763941,factor:factor] hskp29(0) | -c3_1(X) | -c2_1(Y) | -c0_1(Y) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(X).
% 763952 [binary:759569,763950] c2_1(a25) | -c3_1(X) | -c2_1(Y) | -c0_1(Y) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(X).
% 763954 [binary:759570,763950] c1_1(a25) | -c3_1(X) | -c2_1(Y) | -c0_1(Y) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(X).
% 763957 [binary:759571,763950] c0_1(a25) | -c3_1(X) | -c2_1(Y) | -c0_1(Y) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(X).
% 763965 [binary:759616,763954] -c2_1(a25) | -c0_1(a25) | -c3_1(X) | -c2_1(Y) | -c0_1(Y) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(X).
% 763978 [binary:763952,763965,factor:factor:factor:factor:factor] -c0_1(a25) | -c3_1(X) | -c2_1(Y) | -c0_1(Y) | -c0_1(X) | c1_1(Y) | c1_1(X) | c2_1(X).
% 763983 [binary:763957,763978,factor:factor] -c3_1(X) | -c2_1(Y) | -c0_1(X) | -c0_1(Y) | c1_1(Y) | c1_1(X) | c2_1(X).
% 763997 [binary:759885,763983,factor:factor:factor:factor:factor] -c0_1(a2) | c1_1(a2) | c2_1(a2) | -c2_1(X) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(Y) | c0_1(Y).
% 764073 [binary:759886,763997,factor:factor:factor:factor:factor:factor:factor:factor] c1_1(a2) | c2_1(a2) | -c2_1(X) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(Y) | c0_1(Y).
% 764077 [binary:760093,764073,factor:factor:factor] -c3_1(a2) | -c0_1(a2) | c2_1(a2) | -c2_1(X) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(Y) | c0_1(Y).
% 764102 [binary:759885,764077,factor:factor:factor:factor:factor:factor] -c0_1(a2) | c2_1(a2) | -c2_1(X) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(Y) | c0_1(Y).
% 764113 [binary:759886,764102,factor:factor:factor:factor:factor] c2_1(a2) | -c2_1(X) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(Y) | c0_1(Y).
% 764116 [binary:759618,764113] -hskp1(0) | -c2_1(X) | -c0_1(X) | c1_1(Y) | c1_1(X) | c2_1(Y) | c0_1(Y).
% 764141 [binary:759884,764116,factor:factor] -c2_1(X) | -c0_1(X) | c1_1(X) | c1_1(Y) | c2_1(Y) | c0_1(Y).
% 764145 [binary:759852,764141] -c0_1(a3) | c1_1(a3) | hskp18(0) | hskp30(0) | c1_1(X) | c2_1(X) | c0_1(X).
% 764157 [binary:759906,764141,factor:factor:factor] -c0_1(a3) | c1_1(a3) | -c0_1(X) | c1_1(Y) | c3_1(X) | c2_1(Y) | c2_1(X) | c0_1(Y).
% 764252 [binary:759853,764145] c1_1(a3) | hskp18(0) | hskp30(0) | c1_1(X) | c2_1(X) | c0_1(X).
% 764254 [binary:759619,764252] -hskp2(0) | hskp18(0) | hskp30(0) | c1_1(X) | c2_1(X) | c0_1(X).
% 764259 [binary:759579,764254] hskp18(0) | hskp30(0) | c1_1(X) | c2_1(X) | c0_1(X).
% 764261 [binary:759551,764259] c3_1(a34) | hskp30(0) | c1_1(X) | c2_1(X) | c0_1(X).
% 764324 [binary:759909,764157,factor:factor:factor:factor] c1_1(a3) | -c0_1(X) | c1_1(Y) | c3_1(X) | c2_1(Y) | c2_1(X) | c0_1(Y).
% 764326 [binary:759619,764324] -hskp2(0) | -c0_1(X) | c1_1(Y) | c3_1(X) | c2_1(Y) | c2_1(X) | c0_1(Y).
% 764333 [binary:759905,764326,factor:factor] -c0_1(X) | c1_1(Y) | c3_1(X) | c2_1(X) | c2_1(Y) | c0_1(Y).
% 764337 [binary:760035,764333,factor:factor] c3_1(a8) | c2_1(a8) | hskp11(0) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764370 [binary:759624,764337,binarycut:759625] -hskp6(0) | hskp11(0) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764378 [binary:760034,764370,factor] hskp11(0) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764380 [binary:759544,764378] c1_1(a19) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764382 [binary:759545,764378] c0_1(a19) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764386 [binary:759616,764380] -c2_1(a19) | -c0_1(a19) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764391 [binary:764333,764382,factor:factor] c3_1(a19) | c2_1(a19) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764395 [binary:759634,764391] -hskp11(0) | c2_1(a19) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764404 [binary:764378,764395,factor:factor] c2_1(a19) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764409 [binary:764386,764404,factor] -c0_1(a19) | -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764414 [binary:764382,764409,factor] -c3_1(X) | c1_1(X) | c2_1(X) | c0_1(X).
% 764435 [binary:764261,764414,factor] c1_1(a34) | c2_1(a34) | c0_1(a34) | hskp30(0).
% 764441 [binary:759649,764435,binarycut:759648] -hskp18(0) | c0_1(a34) | hskp30(0).
% 764445 [binary:760083,764441] c0_1(a34) | hskp30(0) | c1_1(X) | c3_1(X) | c2_1(X).
% 764462 [binary:762758,764445,factor:factor] c2_1(a34) | hskp30(0) | -c2_1(X) | c1_1(X) | c1_1(Y) | c3_1(Y) | c3_1(X) | c2_1(Y) | c0_1(Y).
% 764778 [binary:759648,764462] -hskp18(0) | hskp30(0) | -c2_1(X) | c1_1(X) | c1_1(Y) | c3_1(Y) | c3_1(X) | c2_1(Y) | c0_1(Y).
% 764804 [binary:760083,764778,factor] hskp30(0) | -c2_1(X) | c1_1(Y) | c1_1(X) | c3_1(Y) | c3_1(X) | c2_1(Y) | c0_1(Y).
% 764822 [binary:759573,764804] c2_1(a33) | -c2_1(X) | c1_1(X) | c1_1(Y) | c3_1(X) | c3_1(Y) | c2_1(Y) | c0_1(Y).
% 764824 [binary:759574,764804] c0_1(a33) | -c2_1(X) | c1_1(X) | c1_1(Y) | c3_1(X) | c3_1(Y) | c2_1(Y) | c0_1(Y).
% 764852 [binary:764141,764822,factor:factor:factor:factor] -c0_1(a33) | c1_1(a33) | -c2_1(X) | c1_1(X) | c1_1(Y) | c3_1(X) | c3_1(Y) | c2_1(Y) | c0_1(Y).
% 764909 [binary:764824,764852,factor:factor:factor:factor:factor:factor] c1_1(a33) | -c2_1(X) | c1_1(X) | c1_1(Y) | c3_1(X) | c3_1(Y) | c2_1(Y) | c0_1(Y).
% 764911 [binary:759616,764909] -c2_1(a33) | -c0_1(a33) | -c2_1(X) | c1_1(Y) | c1_1(X) | c3_1(Y) | c3_1(X) | c2_1(Y) | c0_1(Y).
% 764936 [binary:764822,764911,factor:factor] -c0_1(a33) | -c2_1(X) | c1_1(Y) | c1_1(X) | c3_1(X) | c3_1(Y) | c2_1(Y) | c0_1(Y).
% 764977 [binary:764824,764936,factor:factor:factor] -c2_1(X) | c1_1(X) | c1_1(Y) | c3_1(X) | c3_1(Y) | c2_1(Y) | c0_1(Y).
% 764979 [binary:759815,764977] c1_1(a43) | c3_1(a43) | hskp11(0) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 764984 [binary:759656,764979,binarycut:759615] c3_1(a43) | hskp11(0) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 764987 [binary:759655,764984,binarycut:759615] hskp11(0) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 764989 [binary:759544,764987] c1_1(a19) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 764991 [binary:759545,764987] c0_1(a19) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 764997 [binary:759616,764989] -c2_1(a19) | -c0_1(a19) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 765002 [binary:764333,764991,factor:factor:factor] c3_1(a19) | c2_1(a19) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 765006 [binary:759634,765002] -hskp11(0) | c2_1(a19) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 765010 [binary:764987,765006,factor:factor] c2_1(a19) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 765015 [binary:764997,765010,factor] -c0_1(a19) | c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 765018 [binary:764991,765015,factor] c1_1(X) | c3_1(X) | c2_1(X) | c0_1(X).
% 765023 [binary:759641,765018,binarycut:759640,binarycut:759642] -hskp14(0) | c3_1(a26).
% 765040 [binary:760028,765023] c3_1(a26) | hskp29(0) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765089 [binary:764414,765040] c1_1(a26) | c2_1(a26) | c0_1(a26) | hskp29(0) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765187 [binary:759641,765089,binarycut:759640,binarycut:759642] -hskp14(0) | hskp29(0) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765194 [binary:760028,765187,factor] hskp29(0) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765196 [binary:759569,765194] c2_1(a25) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765197 [binary:759570,765194] c1_1(a25) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765198 [binary:759571,765194] c0_1(a25) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765205 [binary:759616,765197] -c2_1(a25) | -c0_1(a25) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765210 [binary:765196,765205,factor] -c0_1(a25) | -c2_1(X) | c3_1(X) | c0_1(X).
% 765213 [binary:765198,765210,factor] -c2_1(X) | c3_1(X) | c0_1(X).
% 765215 [binary:759815,765213] c3_1(a43) | c0_1(a43) | hskp11(0).
% 765216 [binary:759929,765213] c3_1(a43) | c0_1(a43) | -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 765249 [binary:759655,765215,binarycut:759615] c0_1(a43) | hskp11(0).
% 765251 [binary:761715,765249] c1_1(a43) | c3_1(a43) | hskp11(0).
% 765261 [binary:759616,765251,binarycut:759815,binarycut:765249] c3_1(a43) | hskp11(0).
% 765264 [binary:759655,765261,binarycut:759615] hskp11(0).
% 765265 [binary:759544,765264] c1_1(a19).
% 765266 [binary:759545,765264] c0_1(a19).
% 765267 [binary:759616,765265,cut:765266] -c2_1(a19).
% 765337 [binary:759655,765216] -hskp22(0) | c0_1(a43) | -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 765343 [binary:759928,765337,factor] c0_1(a43) | -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 765346 [binary:761719,765343,factor:factor] c1_1(a43) | c3_1(a43) | -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 765356 [binary:759656,765346,binarycut:759655] -hskp22(0) | -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 765359 [binary:759928,765356,factor] -c1_1(X) | -c0_1(X) | c3_1(X) | c2_1(X).
% 765379 [binary:765265,765359,cut:765266,cut:765267] c3_1(a19).
% 765380 [binary:759634,765379,cut:765264] contradiction
% END OF PROOF
%
% Proof found by the following strategy:
%
% using binary resolution
% using weight-order 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
% seconds given: 6
%
%
% Split component 2 started.
%
% START OF PROOFPART
% Making new sos for split:
% Original clause to be split:
% -c1_1(X) | -c2_1(X) | -c3_1(X) | -ndr1_0(0) | -c0_1(Y) | -c1_1(Y) | -c3_1(Y) | -c0_1(Z) | -c1_1(Z) | -c2_1(Z).
% Split part used next: -c0_1(Y) | -c1_1(Y) | -c3_1(Y).
% END OF PROOFPART
% using hyperresolution
% not using sos strategy
% using positive unit paramodulation strategy
% using dynamic demodulation
% using ordered paramodulation
% using kb ordering for equality
% preferring bigger arities for lex ordering
% clause length limited to 19
% clause depth limited to 1
% seconds given: 6
%
%
% proof attempt stopped: time limit
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 1
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 2
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 3
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 4
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 5
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 6
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 7
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 8
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 9
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 10
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 11
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 12
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 13
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 14
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 15
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 16
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 17
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 18
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 19
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 20
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using unit 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 19
% clause depth limited to 21
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% not using sos strategy
% using double 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 19
% clause depth limited to 1
% seconds given: 4
%
%
% proof attempt stopped: time limit
%
% using binary resolution
% 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 19
% clause depth limited to 1
% seconds given: 22
%
%
% proof attempt stopped: time limit
%
% old unit clauses discarded
%
% using binary resolution
% using term-depth-order 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 19
% clause depth limited to 1
% seconds given: 6
%
%
% proof attempt stopped: time limit
%
% 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
% seconds given: 12
%
%
% proof attempt stopped: time limit
%
% using binary resolution
% using term-depth-order strategy
% using sos strategy
% using dynamic demodulation
% using ordered paramodulation
% using kb ordering for equality
% preferring bigger arities for lex ordering
% using clause demodulation
% seconds given: 6
%
%
% proof attempt stopped: time limit
%
% using binary resolution
% not using sos strategy
% using unit paramodulation strategy
% using unit strategy
% using dynamic demodulation
% using ordered paramodulation
% using kb ordering for equality
% preferring bigger arities for lex ordering
% using clause demodulation
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% using weight-order 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
% seconds given: 6
%
%
% proof attempt stopped: sos exhausted
%
% using binary resolution
% using weight-order 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
% seconds given: 6
%
%
% proof attempt stopped: time limit
%
% old unit clauses discarded
%
% using binary resolution
% using term-depth-order 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
% seconds given: 6
%
%
% proof attempt stopped: time limit
%
% using hyperresolution
% using term-depth-order strategy
% not using sos strategy
% using positive unit paramodulation strategy
% using dynamic demodulation
% using ordered paramodulation
% using kb ordering for equality
% preferring bigger arities for lex ordering
% seconds given: 6
%
%
% proof attempt stopped: time limit
%
% using binary resolution
% using sos strategy
% using dynamic demodulation
% using ordered paramodulation
% using kb ordering for equality
% preferring bigger arities for lex ordering
% using clause demodulation
% seconds given: 290
%
% Wow, gandalf-wrapper got a signal XCPU
% Xcpu signal caught by Gandalf: stopping
%
%------------------------------------------------------------------------------