TSTP Solution File: CSR113+24 by SInE---0.4
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- Process Solution
%------------------------------------------------------------------------------
% File : SInE---0.4
% Problem : CSR113+24 : TPTP v5.0.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : Source/sine.py -e eprover -t %d %s
% 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 : Sat Dec 25 07:12:46 EST 2010
% Result : Theorem 242.16s
% Output : CNFRefutation 242.16s
% Verified :
% SZS Type : Refutation
% Derivation depth : 13
% Number of leaves : 6
% Syntax : Number of formulae : 38 ( 14 unt; 0 def)
% Number of atoms : 483 ( 0 equ)
% Maximal formula atoms : 368 ( 12 avg)
% Number of connectives : 509 ( 64 ~; 52 |; 390 &)
% ( 2 <=>; 1 =>; 0 <=; 0 <~>)
% Maximal formula depth : 368 ( 14 avg)
% Maximal term depth : 4 ( 1 avg)
% Number of predicates : 23 ( 22 usr; 3 prp; 0-13 aty)
% Number of functors : 80 ( 80 usr; 78 con; 0-3 aty)
% Number of variables : 66 ( 13 sgn 31 !; 11 ?)
% Comments :
%------------------------------------------------------------------------------
fof(8,axiom,
! [X1,X2] : member(X1,cons(X1,X2)),
file('/tmp/tmphAMzcV/sel_CSR113+24.p_5',member_first) ).
fof(16,axiom,
! [X1,X2,X3] :
( ( attr(X3,X1)
& member(X2,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
& sub(X1,X2) )
=> ? [X4] :
( mcont(X4,X3)
& obj(X4,X3)
& scar(X4,X3)
& subs(X4,stehen_1_b) ) ),
file('/tmp/tmphAMzcV/sel_CSR113+24.p_5',attr_name__abk__374rzung_stehen_1_b_f__374r) ).
fof(123,axiom,
( tupl_p13(c1032,c767,c772,c770,c783,c791,c803,c813,c822,c832,c836,c844,c877)
& sub(c767,the_1_1)
& pred(c770,colossus_1_1)
& attr(c772,c773)
& sub(c772,mensch_1_1)
& sub(c773,familiename_1_1)
& val(c773,new_0)
& sub(c783,gedicht__1_1)
& attr(c791,c792)
& attr(c791,c793)
& sub(c791,mensch_1_1)
& sub(c792,eigenname_1_1)
& val(c792,emma_0)
& sub(c793,familiename_1_1)
& val(c793,lazarus_0)
& attr(c803,c808)
& sub(c808,jahr__1_1)
& val(c808,c804)
& sub(c813,beitrag_1_1)
& subs(c822,kunstsammlung_1_1)
& sub(c832,ziel_1_1)
& sub(c836,geld_1_1)
& sub(c844,bau_1_1)
& attch(c847,c844)
& sub(c847,podest_1_1)
& attch(c851,c847)
& sub(c851,freiheitsstatue_1_1)
& attr(c877,c878)
& sub(c877,stadt__1_1)
& sub(c878,name_1_1)
& val(c878,new_york_0)
& assoc(freiheitsstatue_1_1,freiheit_1_1)
& sub(freiheitsstatue_1_1,statue_1_1)
& assoc(kunstsammlung_1_1,kunst_1_1)
& subs(kunstsammlung_1_1,sammlung_1_1)
& sort(c1032,ent)
& card(c1032,card_c)
& etype(c1032,etype_c)
& fact(c1032,real)
& gener(c1032,gener_c)
& quant(c1032,quant_c)
& refer(c1032,refer_c)
& varia(c1032,varia_c)
& sort(c767,o)
& card(c767,int1)
& etype(c767,int0)
& fact(c767,real)
& gener(c767,gener_c)
& quant(c767,one)
& refer(c767,refer_c)
& varia(c767,varia_c)
& sort(c772,d)
& card(c772,int1)
& etype(c772,int0)
& fact(c772,real)
& gener(c772,sp)
& quant(c772,one)
& refer(c772,det)
& varia(c772,con)
& sort(c770,o)
& card(c770,cons(x_constant,cons(int1,nil)))
& etype(c770,int1)
& fact(c770,real)
& gener(c770,gener_c)
& quant(c770,mult)
& refer(c770,indet)
& varia(c770,varia_c)
& sort(c783,o)
& card(c783,int1)
& etype(c783,int0)
& fact(c783,real)
& gener(c783,sp)
& quant(c783,one)
& refer(c783,indet)
& varia(c783,varia_c)
& sort(c791,d)
& card(c791,int1)
& etype(c791,int0)
& fact(c791,real)
& gener(c791,sp)
& quant(c791,one)
& refer(c791,det)
& varia(c791,con)
& sort(c803,t)
& card(c803,int1)
& etype(c803,int0)
& fact(c803,real)
& gener(c803,sp)
& quant(c803,one)
& refer(c803,det)
& varia(c803,con)
& sort(c813,io)
& card(c813,int1)
& etype(c813,int0)
& fact(c813,real)
& gener(c813,gener_c)
& quant(c813,one)
& refer(c813,refer_c)
& varia(c813,varia_c)
& sort(c822,ad)
& card(c822,int1)
& etype(c822,int0)
& fact(c822,real)
& gener(c822,sp)
& quant(c822,one)
& refer(c822,indet)
& varia(c822,varia_c)
& sort(c832,io)
& card(c832,int1)
& etype(c832,int0)
& fact(c832,real)
& gener(c832,sp)
& quant(c832,one)
& refer(c832,det)
& varia(c832,con)
& sort(c836,d)
& card(c836,int1)
& etype(c836,int0)
& fact(c836,real)
& gener(c836,gener_c)
& quant(c836,one)
& refer(c836,refer_c)
& varia(c836,varia_c)
& sort(c844,d)
& card(c844,int1)
& etype(c844,int0)
& fact(c844,real)
& gener(c844,sp)
& quant(c844,one)
& refer(c844,det)
& varia(c844,con)
& sort(c877,d)
& sort(c877,io)
& card(c877,int1)
& etype(c877,int0)
& fact(c877,real)
& gener(c877,sp)
& quant(c877,one)
& refer(c877,det)
& varia(c877,con)
& sort(the_1_1,o)
& card(the_1_1,int1)
& etype(the_1_1,int0)
& fact(the_1_1,real)
& gener(the_1_1,ge)
& quant(the_1_1,one)
& refer(the_1_1,refer_c)
& varia(the_1_1,varia_c)
& sort(colossus_1_1,o)
& card(colossus_1_1,int1)
& etype(colossus_1_1,int0)
& fact(colossus_1_1,real)
& gener(colossus_1_1,ge)
& quant(colossus_1_1,one)
& refer(colossus_1_1,refer_c)
& varia(colossus_1_1,varia_c)
& sort(c773,na)
& card(c773,int1)
& etype(c773,int0)
& fact(c773,real)
& gener(c773,sp)
& quant(c773,one)
& refer(c773,indet)
& varia(c773,varia_c)
& sort(mensch_1_1,d)
& card(mensch_1_1,int1)
& etype(mensch_1_1,int0)
& fact(mensch_1_1,real)
& gener(mensch_1_1,ge)
& quant(mensch_1_1,one)
& refer(mensch_1_1,refer_c)
& varia(mensch_1_1,varia_c)
& sort(familiename_1_1,na)
& card(familiename_1_1,int1)
& etype(familiename_1_1,int0)
& fact(familiename_1_1,real)
& gener(familiename_1_1,ge)
& quant(familiename_1_1,one)
& refer(familiename_1_1,refer_c)
& varia(familiename_1_1,varia_c)
& sort(new_0,fe)
& sort(gedicht__1_1,o)
& card(gedicht__1_1,int1)
& etype(gedicht__1_1,int0)
& fact(gedicht__1_1,real)
& gener(gedicht__1_1,ge)
& quant(gedicht__1_1,one)
& refer(gedicht__1_1,refer_c)
& varia(gedicht__1_1,varia_c)
& sort(c792,na)
& card(c792,int1)
& etype(c792,int0)
& fact(c792,real)
& gener(c792,sp)
& quant(c792,one)
& refer(c792,indet)
& varia(c792,varia_c)
& sort(c793,na)
& card(c793,int1)
& etype(c793,int0)
& fact(c793,real)
& gener(c793,sp)
& quant(c793,one)
& refer(c793,indet)
& varia(c793,varia_c)
& sort(eigenname_1_1,na)
& card(eigenname_1_1,int1)
& etype(eigenname_1_1,int0)
& fact(eigenname_1_1,real)
& gener(eigenname_1_1,ge)
& quant(eigenname_1_1,one)
& refer(eigenname_1_1,refer_c)
& varia(eigenname_1_1,varia_c)
& sort(emma_0,fe)
& sort(lazarus_0,fe)
& sort(c808,me)
& sort(c808,oa)
& sort(c808,ta)
& card(c808,card_c)
& etype(c808,etype_c)
& fact(c808,real)
& gener(c808,sp)
& quant(c808,quant_c)
& refer(c808,refer_c)
& varia(c808,varia_c)
& sort(jahr__1_1,me)
& sort(jahr__1_1,oa)
& sort(jahr__1_1,ta)
& card(jahr__1_1,card_c)
& etype(jahr__1_1,etype_c)
& fact(jahr__1_1,real)
& gener(jahr__1_1,ge)
& quant(jahr__1_1,quant_c)
& refer(jahr__1_1,refer_c)
& varia(jahr__1_1,varia_c)
& sort(c804,nu)
& card(c804,int1883)
& sort(beitrag_1_1,io)
& card(beitrag_1_1,int1)
& etype(beitrag_1_1,int0)
& fact(beitrag_1_1,real)
& gener(beitrag_1_1,ge)
& quant(beitrag_1_1,one)
& refer(beitrag_1_1,refer_c)
& varia(beitrag_1_1,varia_c)
& sort(kunstsammlung_1_1,ad)
& card(kunstsammlung_1_1,int1)
& etype(kunstsammlung_1_1,int0)
& fact(kunstsammlung_1_1,real)
& gener(kunstsammlung_1_1,ge)
& quant(kunstsammlung_1_1,one)
& refer(kunstsammlung_1_1,refer_c)
& varia(kunstsammlung_1_1,varia_c)
& sort(ziel_1_1,io)
& card(ziel_1_1,int1)
& etype(ziel_1_1,int0)
& fact(ziel_1_1,real)
& gener(ziel_1_1,ge)
& quant(ziel_1_1,one)
& refer(ziel_1_1,refer_c)
& varia(ziel_1_1,varia_c)
& sort(geld_1_1,d)
& card(geld_1_1,int1)
& etype(geld_1_1,int0)
& fact(geld_1_1,real)
& gener(geld_1_1,ge)
& quant(geld_1_1,one)
& refer(geld_1_1,refer_c)
& varia(geld_1_1,varia_c)
& sort(bau_1_1,d)
& card(bau_1_1,int1)
& etype(bau_1_1,int0)
& fact(bau_1_1,real)
& gener(bau_1_1,ge)
& quant(bau_1_1,one)
& refer(bau_1_1,refer_c)
& varia(bau_1_1,varia_c)
& sort(c847,d)
& card(c847,int1)
& etype(c847,int0)
& fact(c847,real)
& gener(c847,sp)
& quant(c847,one)
& refer(c847,det)
& varia(c847,con)
& sort(podest_1_1,d)
& card(podest_1_1,int1)
& etype(podest_1_1,int0)
& fact(podest_1_1,real)
& gener(podest_1_1,ge)
& quant(podest_1_1,one)
& refer(podest_1_1,refer_c)
& varia(podest_1_1,varia_c)
& sort(c851,d)
& card(c851,int1)
& etype(c851,int0)
& fact(c851,real)
& gener(c851,sp)
& quant(c851,one)
& refer(c851,det)
& varia(c851,con)
& sort(freiheitsstatue_1_1,d)
& card(freiheitsstatue_1_1,int1)
& etype(freiheitsstatue_1_1,int0)
& fact(freiheitsstatue_1_1,real)
& gener(freiheitsstatue_1_1,ge)
& quant(freiheitsstatue_1_1,one)
& refer(freiheitsstatue_1_1,refer_c)
& varia(freiheitsstatue_1_1,varia_c)
& sort(c878,na)
& card(c878,int1)
& etype(c878,int0)
& fact(c878,real)
& gener(c878,sp)
& quant(c878,one)
& refer(c878,indet)
& varia(c878,varia_c)
& sort(stadt__1_1,d)
& sort(stadt__1_1,io)
& card(stadt__1_1,int1)
& etype(stadt__1_1,int0)
& fact(stadt__1_1,real)
& gener(stadt__1_1,ge)
& quant(stadt__1_1,one)
& refer(stadt__1_1,refer_c)
& varia(stadt__1_1,varia_c)
& sort(name_1_1,na)
& card(name_1_1,int1)
& etype(name_1_1,int0)
& fact(name_1_1,real)
& gener(name_1_1,ge)
& quant(name_1_1,one)
& refer(name_1_1,refer_c)
& varia(name_1_1,varia_c)
& sort(new_york_0,fe)
& sort(freiheit_1_1,as)
& sort(freiheit_1_1,io)
& card(freiheit_1_1,int1)
& etype(freiheit_1_1,int0)
& fact(freiheit_1_1,real)
& gener(freiheit_1_1,ge)
& quant(freiheit_1_1,one)
& refer(freiheit_1_1,refer_c)
& varia(freiheit_1_1,varia_c)
& sort(statue_1_1,d)
& card(statue_1_1,int1)
& etype(statue_1_1,int0)
& fact(statue_1_1,real)
& gener(statue_1_1,ge)
& quant(statue_1_1,one)
& refer(statue_1_1,refer_c)
& varia(statue_1_1,varia_c)
& sort(kunst_1_1,io)
& card(kunst_1_1,int1)
& etype(kunst_1_1,int0)
& fact(kunst_1_1,real)
& gener(kunst_1_1,ge)
& quant(kunst_1_1,one)
& refer(kunst_1_1,refer_c)
& varia(kunst_1_1,varia_c)
& sort(sammlung_1_1,ad)
& card(sammlung_1_1,int1)
& etype(sammlung_1_1,int0)
& fact(sammlung_1_1,real)
& gener(sammlung_1_1,ge)
& quant(sammlung_1_1,one)
& refer(sammlung_1_1,refer_c)
& varia(sammlung_1_1,varia_c) ),
file('/tmp/tmphAMzcV/sel_CSR113+24.p_5',ave07_era5_synth_qa07_003_mira_wp_254_a19713) ).
fof(124,conjecture,
? [X1,X2,X3,X4] :
( attr(X2,X1)
& scar(X3,X4)
& sub(X1,name_1_1)
& val(X1,new_york_0) ),
file('/tmp/tmphAMzcV/sel_CSR113+24.p_5',synth_qa07_003_mira_wp_254_a19713) ).
fof(125,negated_conjecture,
~ ? [X1,X2,X3,X4] :
( attr(X2,X1)
& scar(X3,X4)
& sub(X1,name_1_1)
& val(X1,new_york_0) ),
inference(assume_negation,[status(cth)],[124]) ).
fof(167,plain,
! [X3,X4] : member(X3,cons(X3,X4)),
inference(variable_rename,[status(thm)],[8]) ).
cnf(168,plain,
member(X1,cons(X1,X2)),
inference(split_conjunct,[status(thm)],[167]) ).
fof(191,plain,
! [X1,X2,X3] :
( ~ attr(X3,X1)
| ~ member(X2,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X1,X2)
| ? [X4] :
( mcont(X4,X3)
& obj(X4,X3)
& scar(X4,X3)
& subs(X4,stehen_1_b) ) ),
inference(fof_nnf,[status(thm)],[16]) ).
fof(192,plain,
! [X5,X6,X7] :
( ~ attr(X7,X5)
| ~ member(X6,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X5,X6)
| ? [X8] :
( mcont(X8,X7)
& obj(X8,X7)
& scar(X8,X7)
& subs(X8,stehen_1_b) ) ),
inference(variable_rename,[status(thm)],[191]) ).
fof(193,plain,
! [X5,X6,X7] :
( ~ attr(X7,X5)
| ~ member(X6,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X5,X6)
| ( mcont(esk11_3(X5,X6,X7),X7)
& obj(esk11_3(X5,X6,X7),X7)
& scar(esk11_3(X5,X6,X7),X7)
& subs(esk11_3(X5,X6,X7),stehen_1_b) ) ),
inference(skolemize,[status(esa)],[192]) ).
fof(194,plain,
! [X5,X6,X7] :
( ( mcont(esk11_3(X5,X6,X7),X7)
| ~ attr(X7,X5)
| ~ member(X6,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X5,X6) )
& ( obj(esk11_3(X5,X6,X7),X7)
| ~ attr(X7,X5)
| ~ member(X6,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X5,X6) )
& ( scar(esk11_3(X5,X6,X7),X7)
| ~ attr(X7,X5)
| ~ member(X6,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X5,X6) )
& ( subs(esk11_3(X5,X6,X7),stehen_1_b)
| ~ attr(X7,X5)
| ~ member(X6,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X5,X6) ) ),
inference(distribute,[status(thm)],[193]) ).
cnf(196,plain,
( scar(esk11_3(X1,X2,X3),X3)
| ~ sub(X1,X2)
| ~ member(X2,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ attr(X3,X1) ),
inference(split_conjunct,[status(thm)],[194]) ).
cnf(876,plain,
val(c878,new_york_0),
inference(split_conjunct,[status(thm)],[123]) ).
cnf(877,plain,
sub(c878,name_1_1),
inference(split_conjunct,[status(thm)],[123]) ).
cnf(879,plain,
attr(c877,c878),
inference(split_conjunct,[status(thm)],[123]) ).
cnf(895,plain,
sub(c792,eigenname_1_1),
inference(split_conjunct,[status(thm)],[123]) ).
cnf(898,plain,
attr(c791,c792),
inference(split_conjunct,[status(thm)],[123]) ).
fof(907,negated_conjecture,
! [X1,X2,X3,X4] :
( ~ attr(X2,X1)
| ~ scar(X3,X4)
| ~ sub(X1,name_1_1)
| ~ val(X1,new_york_0) ),
inference(fof_nnf,[status(thm)],[125]) ).
fof(908,negated_conjecture,
! [X5,X6,X7,X8] :
( ~ attr(X6,X5)
| ~ scar(X7,X8)
| ~ sub(X5,name_1_1)
| ~ val(X5,new_york_0) ),
inference(variable_rename,[status(thm)],[907]) ).
cnf(909,negated_conjecture,
( ~ val(X1,new_york_0)
| ~ sub(X1,name_1_1)
| ~ scar(X2,X3)
| ~ attr(X4,X1) ),
inference(split_conjunct,[status(thm)],[908]) ).
fof(1055,plain,
( ~ epred1_0
<=> ! [X4,X1] :
( ~ attr(X4,X1)
| ~ sub(X1,name_1_1)
| ~ val(X1,new_york_0) ) ),
introduced(definition),
[split] ).
cnf(1056,plain,
( epred1_0
| ~ attr(X4,X1)
| ~ sub(X1,name_1_1)
| ~ val(X1,new_york_0) ),
inference(split_equiv,[status(thm)],[1055]) ).
fof(1057,plain,
( ~ epred2_0
<=> ! [X3,X2] : ~ scar(X2,X3) ),
introduced(definition),
[split] ).
cnf(1058,plain,
( epred2_0
| ~ scar(X2,X3) ),
inference(split_equiv,[status(thm)],[1057]) ).
cnf(1059,negated_conjecture,
( ~ epred2_0
| ~ epred1_0 ),
inference(apply_def,[status(esa)],[inference(apply_def,[status(esa)],[909,1055,theory(equality)]),1057,theory(equality)]),
[split] ).
cnf(1411,negated_conjecture,
( epred2_0
| ~ member(X2,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X1,X2)
| ~ attr(X3,X1) ),
inference(spm,[status(thm)],[1058,196,theory(equality)]) ).
cnf(1412,plain,
( epred1_0
| ~ sub(c878,name_1_1)
| ~ attr(X1,c878) ),
inference(spm,[status(thm)],[1056,876,theory(equality)]) ).
cnf(1416,plain,
( epred1_0
| $false
| ~ attr(X1,c878) ),
inference(rw,[status(thm)],[1412,877,theory(equality)]) ).
cnf(1417,plain,
( epred1_0
| ~ attr(X1,c878) ),
inference(cn,[status(thm)],[1416,theory(equality)]) ).
cnf(1418,plain,
epred1_0,
inference(spm,[status(thm)],[1417,879,theory(equality)]) ).
cnf(1421,negated_conjecture,
( ~ epred2_0
| $false ),
inference(rw,[status(thm)],[1059,1418,theory(equality)]) ).
cnf(1422,negated_conjecture,
~ epred2_0,
inference(cn,[status(thm)],[1421,theory(equality)]) ).
cnf(1529,negated_conjecture,
( ~ member(X2,cons(eigenname_1_1,cons(familiename_1_1,cons(name_1_1,nil))))
| ~ sub(X1,X2)
| ~ attr(X3,X1) ),
inference(sr,[status(thm)],[1411,1422,theory(equality)]) ).
cnf(1530,negated_conjecture,
( ~ sub(X1,eigenname_1_1)
| ~ attr(X2,X1) ),
inference(spm,[status(thm)],[1529,168,theory(equality)]) ).
cnf(1533,plain,
~ sub(c792,eigenname_1_1),
inference(spm,[status(thm)],[1530,898,theory(equality)]) ).
cnf(1539,plain,
$false,
inference(rw,[status(thm)],[1533,895,theory(equality)]) ).
cnf(1540,plain,
$false,
inference(cn,[status(thm)],[1539,theory(equality)]) ).
cnf(1541,plain,
$false,
1540,
[proof] ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% % SZS status Started for /home/graph/tptp/TPTP/Problems/CSR/CSR113+24.p
% --creating new selector for [CSR004+0.ax]
% eprover: CPU time limit exceeded, terminating
% eprover: CPU time limit exceeded, terminating
% -running prover on /tmp/tmphAMzcV/sel_CSR113+24.p_1 with time limit 29
% -prover status ResourceOut
% -running prover on /tmp/tmphAMzcV/sel_CSR113+24.p_2 with time limit 80
% -prover status ResourceOut
% --creating new selector for [CSR004+0.ax]
% eprover: CPU time limit exceeded, terminating
% -running prover on /tmp/tmphAMzcV/sel_CSR113+24.p_3 with time limit 75
% -prover status ResourceOut
% --creating new selector for [CSR004+0.ax]
% eprover: CPU time limit exceeded, terminating
% -running prover on /tmp/tmphAMzcV/sel_CSR113+24.p_4 with time limit 55
% -prover status ResourceOut
% --creating new selector for [CSR004+0.ax]
% -running prover on /tmp/tmphAMzcV/sel_CSR113+24.p_5 with time limit 54
% -prover status Theorem
% Problem CSR113+24.p solved in phase 4.
% % SZS status Theorem for /home/graph/tptp/TPTP/Problems/CSR/CSR113+24.p
% % SZS status Ended for /home/graph/tptp/TPTP/Problems/CSR/CSR113+24.p
% Solved 1 out of 1.
% # Problem is unsatisfiable (or provable), constructing proof object
% # SZS status Theorem
% # SZS output start CNFRefutation.
% See solution above
% # SZS output end CNFRefutation
%
%------------------------------------------------------------------------------