TSTP Solution File: CSR116+32 by SInE---0.4
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- Process Solution
%------------------------------------------------------------------------------
% File : SInE---0.4
% Problem : CSR116+32 : 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 08:00:28 EST 2010
% Result : Theorem 1.48s
% Output : CNFRefutation 1.48s
% Verified :
% SZS Type : Refutation
% Derivation depth : 28
% Number of leaves : 6
% Syntax : Number of formulae : 64 ( 24 unt; 0 def)
% Number of atoms : 675 ( 0 equ)
% Maximal formula atoms : 338 ( 10 avg)
% Number of connectives : 858 ( 247 ~; 236 |; 371 &)
% ( 4 <=>; 0 =>; 0 <=; 0 <~>)
% Maximal formula depth : 338 ( 12 avg)
% Maximal term depth : 3 ( 1 avg)
% Number of predicates : 31 ( 30 usr; 5 prp; 0-3 aty)
% Number of functors : 85 ( 85 usr; 84 con; 0-2 aty)
% Number of variables : 113 ( 5 sgn 32 !; 18 ?)
% Comments :
%------------------------------------------------------------------------------
fof(98,conjecture,
? [X1,X2,X3,X4,X5,X6,X7,X8,X9] :
( pmod(X9,erst_1_1,pr__344sident_1_1)
& arg1(X4,X1)
& arg2(X4,X5)
& attr(X1,X2)
& attr(X1,X3)
& attr(X6,X7)
& obj(X8,X1)
& prop(X5,schwarz_1_1)
& rslt(X8,X4)
& sub(X2,familiename_1_1)
& sub(X3,eigenname_1_1)
& sub(X5,X9)
& sub(X7,name_1_1)
& subr(X4,rprs_0)
& subs(X8,w__344hlen_1_2)
& val(X2,mandela_0)
& val(X3,nelson_0)
& val(X7,s__374dafrika_0) ),
file('/tmp/tmprOGGeG/sel_CSR116+32.p_1',synth_qa07_010_mira_wp_674) ).
fof(99,axiom,
( attr(c15,c16)
& sub(c15,einrichtung_1_2)
& sub(c16,name_1_1)
& val(c16,anc_0)
& preds(c20,c22)
& prop(c20,demokratisch__1_1)
& pmod(c22,erst_1_1,wahl_1_1)
& attr(c280,c281)
& attr(c280,c282)
& sub(c281,tag_1_1)
& val(c281,c278)
& sub(c282,monat_1_1)
& val(c282,c279)
& attr(c288,c289)
& attr(c288,c290)
& sub(c288,mensch_1_1)
& sub(c289,eigenname_1_1)
& val(c289,nelson_0)
& sub(c290,familiename_1_1)
& val(c290,mandela_0)
& prop(c294,neo_1_1)
& sub(c294,abgeordneten_haus_1_2)
& prop(c301,schwarz_1_1)
& sub(c301,c303)
& pmod(c303,erst_1_1,pr__344sident_1_1)
& agt(c309,c294)
& obj(c309,c288)
& rslt(c309,c322)
& semrel(c309,c6)
& subs(c309,w__344hlen_1_2)
& temp(c309,c280)
& attch(c318,c301)
& attr(c318,c319)
& sub(c318,land_1_1)
& sub(c319,name_1_1)
& val(c319,s__374dafrika_0)
& arg1(c322,c288)
& arg2(c322,c301)
& subr(c322,rprs_0)
& exp(c6,c15)
& obj(c6,c20)
& subs(c6,gewinnen_1_1)
& temp(c6,c7)
& attr(c7,c8)
& sub(c8,jahr__1_1)
& val(c8,c3)
& assoc(demokratisch__1_1,demokratie__1_1)
& sort(c15,d)
& sort(c15,io)
& card(c15,int1)
& etype(c15,int1)
& fact(c15,real)
& gener(c15,sp)
& quant(c15,one)
& refer(c15,det)
& varia(c15,con)
& sort(c16,na)
& card(c16,int1)
& etype(c16,int0)
& fact(c16,real)
& gener(c16,sp)
& quant(c16,one)
& refer(c16,indet)
& varia(c16,varia_c)
& sort(einrichtung_1_2,d)
& sort(einrichtung_1_2,io)
& card(einrichtung_1_2,card_c)
& etype(einrichtung_1_2,int1)
& fact(einrichtung_1_2,real)
& gener(einrichtung_1_2,ge)
& quant(einrichtung_1_2,quant_c)
& refer(einrichtung_1_2,refer_c)
& varia(einrichtung_1_2,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(anc_0,fe)
& sort(c20,ad)
& card(c20,cons(x_constant,cons(int1,nil)))
& etype(c20,int1)
& fact(c20,real)
& gener(c20,sp)
& quant(c20,mult)
& refer(c20,det)
& varia(c20,con)
& sort(c22,ad)
& card(c22,int1)
& etype(c22,int0)
& fact(c22,real)
& gener(c22,ge)
& quant(c22,one)
& refer(c22,refer_c)
& varia(c22,varia_c)
& sort(demokratisch__1_1,nq)
& sort(erst_1_1,oq)
& card(erst_1_1,int1)
& sort(wahl_1_1,ad)
& card(wahl_1_1,int1)
& etype(wahl_1_1,int0)
& fact(wahl_1_1,real)
& gener(wahl_1_1,ge)
& quant(wahl_1_1,one)
& refer(wahl_1_1,refer_c)
& varia(wahl_1_1,varia_c)
& sort(c280,t)
& card(c280,int1)
& etype(c280,int0)
& fact(c280,real)
& gener(c280,sp)
& quant(c280,one)
& refer(c280,det)
& varia(c280,con)
& sort(c281,me)
& sort(c281,oa)
& sort(c281,ta)
& card(c281,card_c)
& etype(c281,etype_c)
& fact(c281,real)
& gener(c281,sp)
& quant(c281,quant_c)
& refer(c281,det)
& varia(c281,varia_c)
& sort(c282,me)
& sort(c282,oa)
& sort(c282,ta)
& card(c282,card_c)
& etype(c282,etype_c)
& fact(c282,real)
& gener(c282,sp)
& quant(c282,quant_c)
& refer(c282,det)
& varia(c282,varia_c)
& sort(tag_1_1,me)
& sort(tag_1_1,oa)
& sort(tag_1_1,ta)
& card(tag_1_1,card_c)
& etype(tag_1_1,etype_c)
& fact(tag_1_1,real)
& gener(tag_1_1,ge)
& quant(tag_1_1,quant_c)
& refer(tag_1_1,refer_c)
& varia(tag_1_1,varia_c)
& sort(c278,nu)
& card(c278,int9)
& sort(monat_1_1,me)
& sort(monat_1_1,oa)
& sort(monat_1_1,ta)
& card(monat_1_1,card_c)
& etype(monat_1_1,etype_c)
& fact(monat_1_1,real)
& gener(monat_1_1,ge)
& quant(monat_1_1,quant_c)
& refer(monat_1_1,refer_c)
& varia(monat_1_1,varia_c)
& sort(c279,nu)
& card(c279,int5)
& sort(c288,d)
& card(c288,int1)
& etype(c288,int0)
& fact(c288,real)
& gener(c288,sp)
& quant(c288,one)
& refer(c288,det)
& varia(c288,con)
& sort(c289,na)
& card(c289,int1)
& etype(c289,int0)
& fact(c289,real)
& gener(c289,sp)
& quant(c289,one)
& refer(c289,indet)
& varia(c289,varia_c)
& sort(c290,na)
& card(c290,int1)
& etype(c290,int0)
& fact(c290,real)
& gener(c290,sp)
& quant(c290,one)
& refer(c290,indet)
& varia(c290,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(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(nelson_0,fe)
& 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(mandela_0,fe)
& sort(c294,d)
& sort(c294,io)
& card(c294,int1)
& etype(c294,int0)
& fact(c294,real)
& gener(c294,sp)
& quant(c294,one)
& refer(c294,det)
& varia(c294,con)
& sort(neo_1_1,nq)
& sort(abgeordneten_haus_1_2,d)
& sort(abgeordneten_haus_1_2,io)
& card(abgeordneten_haus_1_2,int1)
& etype(abgeordneten_haus_1_2,int0)
& fact(abgeordneten_haus_1_2,real)
& gener(abgeordneten_haus_1_2,ge)
& quant(abgeordneten_haus_1_2,one)
& refer(abgeordneten_haus_1_2,refer_c)
& varia(abgeordneten_haus_1_2,varia_c)
& sort(c301,d)
& card(c301,int1)
& etype(c301,int0)
& fact(c301,real)
& gener(c301,sp)
& quant(c301,one)
& refer(c301,det)
& varia(c301,con)
& sort(schwarz_1_1,tq)
& sort(c303,d)
& card(c303,int1)
& etype(c303,int0)
& fact(c303,real)
& gener(c303,ge)
& quant(c303,one)
& refer(c303,refer_c)
& varia(c303,varia_c)
& sort(pr__344sident_1_1,d)
& card(pr__344sident_1_1,int1)
& etype(pr__344sident_1_1,int0)
& fact(pr__344sident_1_1,real)
& gener(pr__344sident_1_1,ge)
& quant(pr__344sident_1_1,one)
& refer(pr__344sident_1_1,refer_c)
& varia(pr__344sident_1_1,varia_c)
& sort(c309,da)
& fact(c309,real)
& gener(c309,sp)
& sort(c322,st)
& fact(c322,real)
& gener(c322,sp)
& sort(c6,dn)
& fact(c6,real)
& gener(c6,sp)
& sort(w__344hlen_1_2,da)
& fact(w__344hlen_1_2,real)
& gener(w__344hlen_1_2,ge)
& sort(c318,d)
& sort(c318,io)
& card(c318,int1)
& etype(c318,int0)
& fact(c318,real)
& gener(c318,sp)
& quant(c318,one)
& refer(c318,det)
& varia(c318,con)
& sort(c319,na)
& card(c319,int1)
& etype(c319,int0)
& fact(c319,real)
& gener(c319,sp)
& quant(c319,one)
& refer(c319,indet)
& varia(c319,varia_c)
& sort(land_1_1,d)
& sort(land_1_1,io)
& card(land_1_1,int1)
& etype(land_1_1,int0)
& fact(land_1_1,real)
& gener(land_1_1,ge)
& quant(land_1_1,one)
& refer(land_1_1,refer_c)
& varia(land_1_1,varia_c)
& sort(s__374dafrika_0,fe)
& sort(rprs_0,st)
& fact(rprs_0,real)
& gener(rprs_0,gener_c)
& sort(gewinnen_1_1,dn)
& fact(gewinnen_1_1,real)
& gener(gewinnen_1_1,ge)
& sort(c7,t)
& card(c7,int1)
& etype(c7,int0)
& fact(c7,real)
& gener(c7,sp)
& quant(c7,one)
& refer(c7,det)
& varia(c7,con)
& sort(c8,me)
& sort(c8,oa)
& sort(c8,ta)
& card(c8,card_c)
& etype(c8,etype_c)
& fact(c8,real)
& gener(c8,sp)
& quant(c8,quant_c)
& refer(c8,refer_c)
& varia(c8,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(c3,nu)
& card(c3,int1994)
& sort(demokratie__1_1,io)
& card(demokratie__1_1,int1)
& etype(demokratie__1_1,int0)
& fact(demokratie__1_1,real)
& gener(demokratie__1_1,ge)
& quant(demokratie__1_1,one)
& refer(demokratie__1_1,refer_c)
& varia(demokratie__1_1,varia_c) ),
file('/tmp/tmprOGGeG/sel_CSR116+32.p_1',ave07_era5_synth_qa07_010_mira_wp_674) ).
fof(100,negated_conjecture,
~ ? [X1,X2,X3,X4,X5,X6,X7,X8,X9] :
( pmod(X9,erst_1_1,pr__344sident_1_1)
& arg1(X4,X1)
& arg2(X4,X5)
& attr(X1,X2)
& attr(X1,X3)
& attr(X6,X7)
& obj(X8,X1)
& prop(X5,schwarz_1_1)
& rslt(X8,X4)
& sub(X2,familiename_1_1)
& sub(X3,eigenname_1_1)
& sub(X5,X9)
& sub(X7,name_1_1)
& subr(X4,rprs_0)
& subs(X8,w__344hlen_1_2)
& val(X2,mandela_0)
& val(X3,nelson_0)
& val(X7,s__374dafrika_0) ),
inference(assume_negation,[status(cth)],[98]) ).
fof(356,negated_conjecture,
! [X1,X2,X3,X4,X5,X6,X7,X8,X9] :
( ~ pmod(X9,erst_1_1,pr__344sident_1_1)
| ~ arg1(X4,X1)
| ~ arg2(X4,X5)
| ~ attr(X1,X2)
| ~ attr(X1,X3)
| ~ attr(X6,X7)
| ~ obj(X8,X1)
| ~ prop(X5,schwarz_1_1)
| ~ rslt(X8,X4)
| ~ sub(X2,familiename_1_1)
| ~ sub(X3,eigenname_1_1)
| ~ sub(X5,X9)
| ~ sub(X7,name_1_1)
| ~ subr(X4,rprs_0)
| ~ subs(X8,w__344hlen_1_2)
| ~ val(X2,mandela_0)
| ~ val(X3,nelson_0)
| ~ val(X7,s__374dafrika_0) ),
inference(fof_nnf,[status(thm)],[100]) ).
fof(357,negated_conjecture,
! [X10,X11,X12,X13,X14,X15,X16,X17,X18] :
( ~ pmod(X18,erst_1_1,pr__344sident_1_1)
| ~ arg1(X13,X10)
| ~ arg2(X13,X14)
| ~ attr(X10,X11)
| ~ attr(X10,X12)
| ~ attr(X15,X16)
| ~ obj(X17,X10)
| ~ prop(X14,schwarz_1_1)
| ~ rslt(X17,X13)
| ~ sub(X11,familiename_1_1)
| ~ sub(X12,eigenname_1_1)
| ~ sub(X14,X18)
| ~ sub(X16,name_1_1)
| ~ subr(X13,rprs_0)
| ~ subs(X17,w__344hlen_1_2)
| ~ val(X11,mandela_0)
| ~ val(X12,nelson_0)
| ~ val(X16,s__374dafrika_0) ),
inference(variable_rename,[status(thm)],[356]) ).
cnf(358,negated_conjecture,
( ~ val(X1,s__374dafrika_0)
| ~ val(X2,nelson_0)
| ~ val(X3,mandela_0)
| ~ subs(X4,w__344hlen_1_2)
| ~ subr(X5,rprs_0)
| ~ sub(X1,name_1_1)
| ~ sub(X6,X7)
| ~ sub(X2,eigenname_1_1)
| ~ sub(X3,familiename_1_1)
| ~ rslt(X4,X5)
| ~ prop(X6,schwarz_1_1)
| ~ obj(X4,X8)
| ~ attr(X9,X1)
| ~ attr(X8,X2)
| ~ attr(X8,X3)
| ~ arg2(X5,X6)
| ~ arg1(X5,X8)
| ~ pmod(X7,erst_1_1,pr__344sident_1_1) ),
inference(split_conjunct,[status(thm)],[357]) ).
cnf(658,plain,
subr(c322,rprs_0),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(659,plain,
arg2(c322,c301),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(660,plain,
arg1(c322,c288),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(661,plain,
val(c319,s__374dafrika_0),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(662,plain,
sub(c319,name_1_1),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(664,plain,
attr(c318,c319),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(667,plain,
subs(c309,w__344hlen_1_2),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(669,plain,
rslt(c309,c322),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(670,plain,
obj(c309,c288),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(672,plain,
pmod(c303,erst_1_1,pr__344sident_1_1),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(673,plain,
sub(c301,c303),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(674,plain,
prop(c301,schwarz_1_1),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(677,plain,
val(c290,mandela_0),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(678,plain,
sub(c290,familiename_1_1),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(679,plain,
val(c289,nelson_0),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(680,plain,
sub(c289,eigenname_1_1),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(682,plain,
attr(c288,c290),
inference(split_conjunct,[status(thm)],[99]) ).
cnf(683,plain,
attr(c288,c289),
inference(split_conjunct,[status(thm)],[99]) ).
fof(1065,plain,
( ~ epred1_0
<=> ! [X5,X3,X4,X8,X6,X2,X7] :
( ~ subs(X4,w__344hlen_1_2)
| ~ prop(X6,schwarz_1_1)
| ~ attr(X8,X2)
| ~ attr(X8,X3)
| ~ sub(X6,X7)
| ~ sub(X2,eigenname_1_1)
| ~ sub(X3,familiename_1_1)
| ~ val(X2,nelson_0)
| ~ val(X3,mandela_0)
| ~ obj(X4,X8)
| ~ arg1(X5,X8)
| ~ arg2(X5,X6)
| ~ rslt(X4,X5)
| ~ subr(X5,rprs_0)
| ~ pmod(X7,erst_1_1,pr__344sident_1_1) ) ),
introduced(definition),
[split] ).
cnf(1066,plain,
( epred1_0
| ~ subs(X4,w__344hlen_1_2)
| ~ prop(X6,schwarz_1_1)
| ~ attr(X8,X2)
| ~ attr(X8,X3)
| ~ sub(X6,X7)
| ~ sub(X2,eigenname_1_1)
| ~ sub(X3,familiename_1_1)
| ~ val(X2,nelson_0)
| ~ val(X3,mandela_0)
| ~ obj(X4,X8)
| ~ arg1(X5,X8)
| ~ arg2(X5,X6)
| ~ rslt(X4,X5)
| ~ subr(X5,rprs_0)
| ~ pmod(X7,erst_1_1,pr__344sident_1_1) ),
inference(split_equiv,[status(thm)],[1065]) ).
fof(1067,plain,
( ~ epred2_0
<=> ! [X9,X1] :
( ~ attr(X9,X1)
| ~ sub(X1,name_1_1)
| ~ val(X1,s__374dafrika_0) ) ),
introduced(definition),
[split] ).
cnf(1068,plain,
( epred2_0
| ~ attr(X9,X1)
| ~ sub(X1,name_1_1)
| ~ val(X1,s__374dafrika_0) ),
inference(split_equiv,[status(thm)],[1067]) ).
cnf(1069,negated_conjecture,
( ~ epred2_0
| ~ epred1_0 ),
inference(apply_def,[status(esa)],[inference(apply_def,[status(esa)],[358,1065,theory(equality)]),1067,theory(equality)]),
[split] ).
cnf(1072,plain,
( epred2_0
| ~ sub(c319,name_1_1)
| ~ attr(X1,c319) ),
inference(spm,[status(thm)],[1068,661,theory(equality)]) ).
cnf(1074,plain,
( epred2_0
| $false
| ~ attr(X1,c319) ),
inference(rw,[status(thm)],[1072,662,theory(equality)]) ).
cnf(1075,plain,
( epred2_0
| ~ attr(X1,c319) ),
inference(cn,[status(thm)],[1074,theory(equality)]) ).
cnf(1076,plain,
epred2_0,
inference(spm,[status(thm)],[1075,664,theory(equality)]) ).
cnf(1079,negated_conjecture,
( $false
| ~ epred1_0 ),
inference(rw,[status(thm)],[1069,1076,theory(equality)]) ).
cnf(1080,negated_conjecture,
~ epred1_0,
inference(cn,[status(thm)],[1079,theory(equality)]) ).
cnf(1083,negated_conjecture,
( ~ subs(X4,w__344hlen_1_2)
| ~ prop(X6,schwarz_1_1)
| ~ attr(X8,X2)
| ~ attr(X8,X3)
| ~ sub(X6,X7)
| ~ sub(X2,eigenname_1_1)
| ~ sub(X3,familiename_1_1)
| ~ val(X2,nelson_0)
| ~ val(X3,mandela_0)
| ~ obj(X4,X8)
| ~ arg1(X5,X8)
| ~ arg2(X5,X6)
| ~ rslt(X4,X5)
| ~ subr(X5,rprs_0)
| ~ pmod(X7,erst_1_1,pr__344sident_1_1) ),
inference(sr,[status(thm)],[1066,1080,theory(equality)]) ).
cnf(1084,plain,
( ~ subr(X1,rprs_0)
| ~ rslt(X2,X1)
| ~ arg2(X1,X3)
| ~ arg1(X1,X4)
| ~ obj(X2,X4)
| ~ val(X5,nelson_0)
| ~ val(X6,mandela_0)
| ~ sub(X5,eigenname_1_1)
| ~ sub(X6,familiename_1_1)
| ~ sub(X3,c303)
| ~ attr(X4,X5)
| ~ attr(X4,X6)
| ~ prop(X3,schwarz_1_1)
| ~ subs(X2,w__344hlen_1_2) ),
inference(spm,[status(thm)],[1083,672,theory(equality)]) ).
cnf(1085,plain,
( ~ rslt(X1,c322)
| ~ arg2(c322,X2)
| ~ arg1(c322,X3)
| ~ obj(X1,X3)
| ~ val(X4,nelson_0)
| ~ val(X5,mandela_0)
| ~ sub(X4,eigenname_1_1)
| ~ sub(X5,familiename_1_1)
| ~ sub(X2,c303)
| ~ attr(X3,X4)
| ~ attr(X3,X5)
| ~ prop(X2,schwarz_1_1)
| ~ subs(X1,w__344hlen_1_2) ),
inference(spm,[status(thm)],[1084,658,theory(equality)]) ).
fof(1087,plain,
( ~ epred3_0
<=> ! [X5,X4,X3,X1] :
( ~ subs(X1,w__344hlen_1_2)
| ~ attr(X3,X5)
| ~ attr(X3,X4)
| ~ sub(X5,familiename_1_1)
| ~ sub(X4,eigenname_1_1)
| ~ val(X5,mandela_0)
| ~ val(X4,nelson_0)
| ~ obj(X1,X3)
| ~ arg1(c322,X3)
| ~ rslt(X1,c322) ) ),
introduced(definition),
[split] ).
cnf(1088,plain,
( epred3_0
| ~ subs(X1,w__344hlen_1_2)
| ~ attr(X3,X5)
| ~ attr(X3,X4)
| ~ sub(X5,familiename_1_1)
| ~ sub(X4,eigenname_1_1)
| ~ val(X5,mandela_0)
| ~ val(X4,nelson_0)
| ~ obj(X1,X3)
| ~ arg1(c322,X3)
| ~ rslt(X1,c322) ),
inference(split_equiv,[status(thm)],[1087]) ).
fof(1089,plain,
( ~ epred4_0
<=> ! [X2] :
( ~ prop(X2,schwarz_1_1)
| ~ sub(X2,c303)
| ~ arg2(c322,X2) ) ),
introduced(definition),
[split] ).
cnf(1090,plain,
( epred4_0
| ~ prop(X2,schwarz_1_1)
| ~ sub(X2,c303)
| ~ arg2(c322,X2) ),
inference(split_equiv,[status(thm)],[1089]) ).
cnf(1091,plain,
( ~ epred4_0
| ~ epred3_0 ),
inference(apply_def,[status(esa)],[inference(apply_def,[status(esa)],[1085,1087,theory(equality)]),1089,theory(equality)]),
[split] ).
cnf(1092,plain,
( epred4_0
| ~ sub(c301,c303)
| ~ prop(c301,schwarz_1_1) ),
inference(spm,[status(thm)],[1090,659,theory(equality)]) ).
cnf(1093,plain,
( epred4_0
| $false
| ~ prop(c301,schwarz_1_1) ),
inference(rw,[status(thm)],[1092,673,theory(equality)]) ).
cnf(1094,plain,
( epred4_0
| $false
| $false ),
inference(rw,[status(thm)],[1093,674,theory(equality)]) ).
cnf(1095,plain,
epred4_0,
inference(cn,[status(thm)],[1094,theory(equality)]) ).
cnf(1097,plain,
( $false
| ~ epred3_0 ),
inference(rw,[status(thm)],[1091,1095,theory(equality)]) ).
cnf(1098,plain,
~ epred3_0,
inference(cn,[status(thm)],[1097,theory(equality)]) ).
cnf(1099,plain,
( ~ subs(X1,w__344hlen_1_2)
| ~ attr(X3,X5)
| ~ attr(X3,X4)
| ~ sub(X5,familiename_1_1)
| ~ sub(X4,eigenname_1_1)
| ~ val(X5,mandela_0)
| ~ val(X4,nelson_0)
| ~ obj(X1,X3)
| ~ arg1(c322,X3)
| ~ rslt(X1,c322) ),
inference(sr,[status(thm)],[1088,1098,theory(equality)]) ).
cnf(1100,plain,
( ~ rslt(X1,c322)
| ~ arg1(c322,X2)
| ~ obj(X1,X2)
| ~ val(X3,nelson_0)
| ~ sub(c290,familiename_1_1)
| ~ sub(X3,eigenname_1_1)
| ~ attr(X2,c290)
| ~ attr(X2,X3)
| ~ subs(X1,w__344hlen_1_2) ),
inference(spm,[status(thm)],[1099,677,theory(equality)]) ).
cnf(1102,plain,
( ~ rslt(X1,c322)
| ~ arg1(c322,X2)
| ~ obj(X1,X2)
| ~ val(X3,nelson_0)
| $false
| ~ sub(X3,eigenname_1_1)
| ~ attr(X2,c290)
| ~ attr(X2,X3)
| ~ subs(X1,w__344hlen_1_2) ),
inference(rw,[status(thm)],[1100,678,theory(equality)]) ).
cnf(1103,plain,
( ~ rslt(X1,c322)
| ~ arg1(c322,X2)
| ~ obj(X1,X2)
| ~ val(X3,nelson_0)
| ~ sub(X3,eigenname_1_1)
| ~ attr(X2,c290)
| ~ attr(X2,X3)
| ~ subs(X1,w__344hlen_1_2) ),
inference(cn,[status(thm)],[1102,theory(equality)]) ).
cnf(1104,plain,
( ~ rslt(X1,c322)
| ~ arg1(c322,X2)
| ~ obj(X1,X2)
| ~ sub(c289,eigenname_1_1)
| ~ attr(X2,c290)
| ~ attr(X2,c289)
| ~ subs(X1,w__344hlen_1_2) ),
inference(spm,[status(thm)],[1103,679,theory(equality)]) ).
cnf(1106,plain,
( ~ rslt(X1,c322)
| ~ arg1(c322,X2)
| ~ obj(X1,X2)
| $false
| ~ attr(X2,c290)
| ~ attr(X2,c289)
| ~ subs(X1,w__344hlen_1_2) ),
inference(rw,[status(thm)],[1104,680,theory(equality)]) ).
cnf(1107,plain,
( ~ rslt(X1,c322)
| ~ arg1(c322,X2)
| ~ obj(X1,X2)
| ~ attr(X2,c290)
| ~ attr(X2,c289)
| ~ subs(X1,w__344hlen_1_2) ),
inference(cn,[status(thm)],[1106,theory(equality)]) ).
cnf(1108,plain,
( ~ rslt(c309,c322)
| ~ arg1(c322,c288)
| ~ attr(c288,c290)
| ~ attr(c288,c289)
| ~ subs(c309,w__344hlen_1_2) ),
inference(spm,[status(thm)],[1107,670,theory(equality)]) ).
cnf(1111,plain,
( $false
| ~ arg1(c322,c288)
| ~ attr(c288,c290)
| ~ attr(c288,c289)
| ~ subs(c309,w__344hlen_1_2) ),
inference(rw,[status(thm)],[1108,669,theory(equality)]) ).
cnf(1112,plain,
( $false
| $false
| ~ attr(c288,c290)
| ~ attr(c288,c289)
| ~ subs(c309,w__344hlen_1_2) ),
inference(rw,[status(thm)],[1111,660,theory(equality)]) ).
cnf(1113,plain,
( $false
| $false
| $false
| ~ attr(c288,c289)
| ~ subs(c309,w__344hlen_1_2) ),
inference(rw,[status(thm)],[1112,682,theory(equality)]) ).
cnf(1114,plain,
( $false
| $false
| $false
| $false
| ~ subs(c309,w__344hlen_1_2) ),
inference(rw,[status(thm)],[1113,683,theory(equality)]) ).
cnf(1115,plain,
( $false
| $false
| $false
| $false
| $false ),
inference(rw,[status(thm)],[1114,667,theory(equality)]) ).
cnf(1116,plain,
$false,
inference(cn,[status(thm)],[1115,theory(equality)]) ).
cnf(1117,plain,
$false,
1116,
[proof] ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% % SZS status Started for /home/graph/tptp/TPTP/Problems/CSR/CSR116+32.p
% --creating new selector for [CSR004+0.ax]
% -running prover on /tmp/tmprOGGeG/sel_CSR116+32.p_1 with time limit 29
% -prover status Theorem
% Problem CSR116+32.p solved in phase 0.
% % SZS status Theorem for /home/graph/tptp/TPTP/Problems/CSR/CSR116+32.p
% % SZS status Ended for /home/graph/tptp/TPTP/Problems/CSR/CSR116+32.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
%
%------------------------------------------------------------------------------