TSTP Solution File: CSR115+8 by SInE---0.4
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : SInE---0.4
% Problem : CSR115+8 : TPTP v5.0.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : Source/sine.py -e eprover -t %d %s
% Computer : art02.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 07:51:14 EST 2010
% Result : Theorem 1.53s
% Output : CNFRefutation 1.53s
% Verified :
% SZS Type : Refutation
% Derivation depth : 21
% Number of leaves : 10
% Syntax : Number of formulae : 68 ( 19 unt; 0 def)
% Number of atoms : 513 ( 0 equ)
% Maximal formula atoms : 259 ( 7 avg)
% Number of connectives : 618 ( 173 ~; 156 |; 282 &)
% ( 4 <=>; 3 =>; 0 <=; 0 <~>)
% Maximal formula depth : 259 ( 9 avg)
% Maximal term depth : 2 ( 1 avg)
% Number of predicates : 28 ( 27 usr; 5 prp; 0-3 aty)
% Number of functors : 68 ( 68 usr; 67 con; 0-3 aty)
% Number of variables : 138 ( 4 sgn 54 !; 15 ?)
% Comments :
%------------------------------------------------------------------------------
fof(10,axiom,
chea(n374bernehmen_1_1,annahme_1_1),
file('/tmp/tmpmucSf0/sel_CSR115+8.p_1',fact_8354) ).
fof(21,axiom,
! [X1,X2,X3] :
( ( chea(X3,X2)
& subs(X1,X2) )
=> ? [X4] :
( chea(X4,X1)
& subs(X4,X3) ) ),
file('/tmp/tmpmucSf0/sel_CSR115+8.p_1',chea_subs_abs__event) ).
fof(22,axiom,
! [X1,X2,X3] :
( ( agt(X1,X3)
& chea(X2,X1) )
=> agt(X2,X3) ),
file('/tmp/tmpmucSf0/sel_CSR115+8.p_1',chea_agt_abs__event) ).
fof(50,axiom,
! [X1,X2,X3] :
( ( chea(X2,X1)
& obj(X1,X3) )
=> obj(X2,X3) ),
file('/tmp/tmpmucSf0/sel_CSR115+8.p_1',chea_obj_abs__event) ).
fof(67,conjecture,
? [X1,X2,X3,X4,X5,X6] :
( agt(X4,X3)
& attr(X3,X2)
& attr(X5,X6)
& obj(X4,X1)
& prop(X1,britisch__1_1)
& sub(X1,firma_1_1)
& sub(X2,name_1_1)
& subs(X4,n374bernehmen_1_1)
& val(X2,bmw_0) ),
file('/tmp/tmpmucSf0/sel_CSR115+8.p_1',synth_qa07_007_mira_news_1099_a19984) ).
fof(68,axiom,
( assoc(autobauer_1_1,auto__1_1)
& sub(autobauer_1_1,fabrikant_1_1)
& assoc(autokonzern_1_1,auto__1_1)
& sub(autokonzern_1_1,firmengruppe_1_1)
& attr(c1724,c1725)
& poss(c1724,c2008)
& prop(c1724,japanisch__1_1)
& sub(c1724,autokonzern_1_1)
& sub(c1725,name_1_1)
& val(c1725,honda_0)
& agt(c1730,c2006)
& ante(c1730,c2016)
& obj(c1730,c1912)
& subs(c1730,annahme_1_1)
& attr(c18,c19)
& sub(c18,stadt__1_1)
& sub(c19,name_1_1)
& val(c19,tokio_0)
& attr(c1912,c1913)
& prop(c1912,britisch__1_1)
& sub(c1912,firma_1_1)
& sub(c1913,name_1_1)
& val(c1913,rover_0)
& attr(c2006,c2007)
& prop(c2006,bundesdeutsch_1_1)
& sub(c2006,autobauer_1_1)
& sub(c2007,name_1_1)
& val(c2007,bmw_0)
& attch(c2008,c2036)
& sub(c2008,anteil_1_1)
& agt(c2016,c1724)
& modl(c2016,wollen_0)
& obj(c2016,c2008)
& subs(c2016,abziehen_1_2)
& quant_p3(c2036,c2013,hundertstel__1_1)
& sub(c21,feb_1_1)
& tupl(c34,c18,c21)
& sort(autobauer_1_1,d)
& sort(autobauer_1_1,io)
& card(autobauer_1_1,int1)
& etype(autobauer_1_1,int0)
& fact(autobauer_1_1,real)
& gener(autobauer_1_1,ge)
& quant(autobauer_1_1,one)
& refer(autobauer_1_1,refer_c)
& varia(autobauer_1_1,varia_c)
& sort(auto__1_1,d)
& card(auto__1_1,int1)
& etype(auto__1_1,int0)
& fact(auto__1_1,real)
& gener(auto__1_1,ge)
& quant(auto__1_1,one)
& refer(auto__1_1,refer_c)
& varia(auto__1_1,varia_c)
& sort(fabrikant_1_1,d)
& sort(fabrikant_1_1,io)
& card(fabrikant_1_1,int1)
& etype(fabrikant_1_1,int0)
& fact(fabrikant_1_1,real)
& gener(fabrikant_1_1,ge)
& quant(fabrikant_1_1,one)
& refer(fabrikant_1_1,refer_c)
& varia(fabrikant_1_1,varia_c)
& sort(autokonzern_1_1,d)
& sort(autokonzern_1_1,io)
& card(autokonzern_1_1,int1)
& etype(autokonzern_1_1,int0)
& fact(autokonzern_1_1,real)
& gener(autokonzern_1_1,ge)
& quant(autokonzern_1_1,one)
& refer(autokonzern_1_1,refer_c)
& varia(autokonzern_1_1,varia_c)
& sort(firmengruppe_1_1,d)
& sort(firmengruppe_1_1,io)
& card(firmengruppe_1_1,int1)
& etype(firmengruppe_1_1,int0)
& fact(firmengruppe_1_1,real)
& gener(firmengruppe_1_1,ge)
& quant(firmengruppe_1_1,one)
& refer(firmengruppe_1_1,refer_c)
& varia(firmengruppe_1_1,varia_c)
& sort(c1724,d)
& sort(c1724,io)
& card(c1724,int1)
& etype(c1724,int0)
& fact(c1724,real)
& gener(c1724,sp)
& quant(c1724,one)
& refer(c1724,det)
& varia(c1724,con)
& sort(c1725,na)
& card(c1725,int1)
& etype(c1725,int0)
& fact(c1725,real)
& gener(c1725,sp)
& quant(c1725,one)
& refer(c1725,indet)
& varia(c1725,varia_c)
& sort(c2008,co)
& card(c2008,card_c)
& etype(c2008,etype_c)
& fact(c2008,real)
& gener(c2008,sp)
& quant(c2008,quant_c)
& refer(c2008,det)
& varia(c2008,varia_c)
& sort(japanisch__1_1,nq)
& 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(honda_0,fe)
& sort(c1730,ad)
& card(c1730,int1)
& etype(c1730,int0)
& fact(c1730,real)
& gener(c1730,sp)
& quant(c1730,one)
& refer(c1730,det)
& varia(c1730,con)
& sort(c2006,d)
& sort(c2006,io)
& card(c2006,int1)
& etype(c2006,int0)
& fact(c2006,real)
& gener(c2006,sp)
& quant(c2006,one)
& refer(c2006,det)
& varia(c2006,con)
& sort(c2016,da)
& fact(c2016,real)
& gener(c2016,sp)
& sort(c1912,d)
& sort(c1912,io)
& card(c1912,int1)
& etype(c1912,int0)
& fact(c1912,real)
& gener(c1912,sp)
& quant(c1912,one)
& refer(c1912,det)
& varia(c1912,con)
& sort(annahme_1_1,ad)
& card(annahme_1_1,int1)
& etype(annahme_1_1,int0)
& fact(annahme_1_1,real)
& gener(annahme_1_1,ge)
& quant(annahme_1_1,one)
& refer(annahme_1_1,refer_c)
& varia(annahme_1_1,varia_c)
& sort(c18,d)
& sort(c18,io)
& card(c18,int1)
& etype(c18,int0)
& fact(c18,real)
& gener(c18,sp)
& quant(c18,one)
& refer(c18,det)
& varia(c18,con)
& sort(c19,na)
& card(c19,int1)
& etype(c19,int0)
& fact(c19,real)
& gener(c19,sp)
& quant(c19,one)
& refer(c19,indet)
& varia(c19,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(tokio_0,fe)
& sort(c1913,na)
& card(c1913,int1)
& etype(c1913,int0)
& fact(c1913,real)
& gener(c1913,sp)
& quant(c1913,one)
& refer(c1913,indet)
& varia(c1913,varia_c)
& sort(britisch__1_1,nq)
& sort(firma_1_1,d)
& sort(firma_1_1,io)
& card(firma_1_1,int1)
& etype(firma_1_1,int0)
& fact(firma_1_1,real)
& gener(firma_1_1,ge)
& quant(firma_1_1,one)
& refer(firma_1_1,refer_c)
& varia(firma_1_1,varia_c)
& sort(rover_0,fe)
& sort(c2007,na)
& card(c2007,int1)
& etype(c2007,int0)
& fact(c2007,real)
& gener(c2007,sp)
& quant(c2007,one)
& refer(c2007,indet)
& varia(c2007,varia_c)
& sort(bundesdeutsch_1_1,tq)
& sort(bmw_0,fe)
& sort(c2036,co)
& card(c2036,card_c)
& etype(c2036,etype_c)
& fact(c2036,real)
& gener(c2036,gener_c)
& quant(c2036,quant_c)
& refer(c2036,refer_c)
& varia(c2036,con)
& sort(anteil_1_1,co)
& card(anteil_1_1,card_c)
& etype(anteil_1_1,etype_c)
& fact(anteil_1_1,real)
& gener(anteil_1_1,ge)
& quant(anteil_1_1,quant_c)
& refer(anteil_1_1,refer_c)
& varia(anteil_1_1,varia_c)
& sort(wollen_0,md)
& fact(wollen_0,real)
& gener(wollen_0,gener_c)
& sort(abziehen_1_2,da)
& fact(abziehen_1_2,real)
& gener(abziehen_1_2,ge)
& sort(c2013,nu)
& card(c2013,int20)
& sort(hundertstel__1_1,me)
& gener(hundertstel__1_1,ge)
& sort(c21,o)
& card(c21,int1)
& etype(c21,int0)
& fact(c21,real)
& gener(c21,gener_c)
& quant(c21,one)
& refer(c21,refer_c)
& varia(c21,varia_c)
& sort(feb_1_1,o)
& card(feb_1_1,int1)
& etype(feb_1_1,int0)
& fact(feb_1_1,real)
& gener(feb_1_1,ge)
& quant(feb_1_1,one)
& refer(feb_1_1,refer_c)
& varia(feb_1_1,varia_c)
& sort(c34,ent)
& card(c34,card_c)
& etype(c34,etype_c)
& fact(c34,real)
& gener(c34,gener_c)
& quant(c34,quant_c)
& refer(c34,refer_c)
& varia(c34,varia_c) ),
file('/tmp/tmpmucSf0/sel_CSR115+8.p_1',ave07_era5_synth_qa07_007_mira_news_1099_a19984) ).
fof(69,negated_conjecture,
~ ? [X1,X2,X3,X4,X5,X6] :
( agt(X4,X3)
& attr(X3,X2)
& attr(X5,X6)
& obj(X4,X1)
& prop(X1,britisch__1_1)
& sub(X1,firma_1_1)
& sub(X2,name_1_1)
& subs(X4,n374bernehmen_1_1)
& val(X2,bmw_0) ),
inference(assume_negation,[status(cth)],[67]) ).
cnf(90,plain,
chea(n374bernehmen_1_1,annahme_1_1),
inference(split_conjunct,[status(thm)],[10]) ).
fof(107,plain,
! [X1,X2,X3] :
( ~ chea(X3,X2)
| ~ subs(X1,X2)
| ? [X4] :
( chea(X4,X1)
& subs(X4,X3) ) ),
inference(fof_nnf,[status(thm)],[21]) ).
fof(108,plain,
! [X5,X6,X7] :
( ~ chea(X7,X6)
| ~ subs(X5,X6)
| ? [X8] :
( chea(X8,X5)
& subs(X8,X7) ) ),
inference(variable_rename,[status(thm)],[107]) ).
fof(109,plain,
! [X5,X6,X7] :
( ~ chea(X7,X6)
| ~ subs(X5,X6)
| ( chea(esk2_3(X5,X6,X7),X5)
& subs(esk2_3(X5,X6,X7),X7) ) ),
inference(skolemize,[status(esa)],[108]) ).
fof(110,plain,
! [X5,X6,X7] :
( ( chea(esk2_3(X5,X6,X7),X5)
| ~ chea(X7,X6)
| ~ subs(X5,X6) )
& ( subs(esk2_3(X5,X6,X7),X7)
| ~ chea(X7,X6)
| ~ subs(X5,X6) ) ),
inference(distribute,[status(thm)],[109]) ).
cnf(111,plain,
( subs(esk2_3(X1,X2,X3),X3)
| ~ subs(X1,X2)
| ~ chea(X3,X2) ),
inference(split_conjunct,[status(thm)],[110]) ).
cnf(112,plain,
( chea(esk2_3(X1,X2,X3),X1)
| ~ subs(X1,X2)
| ~ chea(X3,X2) ),
inference(split_conjunct,[status(thm)],[110]) ).
fof(113,plain,
! [X1,X2,X3] :
( ~ agt(X1,X3)
| ~ chea(X2,X1)
| agt(X2,X3) ),
inference(fof_nnf,[status(thm)],[22]) ).
fof(114,plain,
! [X4,X5,X6] :
( ~ agt(X4,X6)
| ~ chea(X5,X4)
| agt(X5,X6) ),
inference(variable_rename,[status(thm)],[113]) ).
cnf(115,plain,
( agt(X1,X2)
| ~ chea(X1,X3)
| ~ agt(X3,X2) ),
inference(split_conjunct,[status(thm)],[114]) ).
fof(183,plain,
! [X1,X2,X3] :
( ~ chea(X2,X1)
| ~ obj(X1,X3)
| obj(X2,X3) ),
inference(fof_nnf,[status(thm)],[50]) ).
fof(184,plain,
! [X4,X5,X6] :
( ~ chea(X5,X4)
| ~ obj(X4,X6)
| obj(X5,X6) ),
inference(variable_rename,[status(thm)],[183]) ).
cnf(185,plain,
( obj(X1,X2)
| ~ obj(X3,X2)
| ~ chea(X1,X3) ),
inference(split_conjunct,[status(thm)],[184]) ).
fof(223,negated_conjecture,
! [X1,X2,X3,X4,X5,X6] :
( ~ agt(X4,X3)
| ~ attr(X3,X2)
| ~ attr(X5,X6)
| ~ obj(X4,X1)
| ~ prop(X1,britisch__1_1)
| ~ sub(X1,firma_1_1)
| ~ sub(X2,name_1_1)
| ~ subs(X4,n374bernehmen_1_1)
| ~ val(X2,bmw_0) ),
inference(fof_nnf,[status(thm)],[69]) ).
fof(224,negated_conjecture,
! [X7,X8,X9,X10,X11,X12] :
( ~ agt(X10,X9)
| ~ attr(X9,X8)
| ~ attr(X11,X12)
| ~ obj(X10,X7)
| ~ prop(X7,britisch__1_1)
| ~ sub(X7,firma_1_1)
| ~ sub(X8,name_1_1)
| ~ subs(X10,n374bernehmen_1_1)
| ~ val(X8,bmw_0) ),
inference(variable_rename,[status(thm)],[223]) ).
cnf(225,negated_conjecture,
( ~ val(X1,bmw_0)
| ~ subs(X2,n374bernehmen_1_1)
| ~ sub(X1,name_1_1)
| ~ sub(X3,firma_1_1)
| ~ prop(X3,britisch__1_1)
| ~ obj(X2,X3)
| ~ attr(X4,X5)
| ~ attr(X6,X1)
| ~ agt(X2,X6) ),
inference(split_conjunct,[status(thm)],[224]) ).
cnf(457,plain,
val(c2007,bmw_0),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(458,plain,
sub(c2007,name_1_1),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(461,plain,
attr(c2006,c2007),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(464,plain,
sub(c1912,firma_1_1),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(465,plain,
prop(c1912,britisch__1_1),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(471,plain,
subs(c1730,annahme_1_1),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(472,plain,
obj(c1730,c1912),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(474,plain,
agt(c1730,c2006),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(480,plain,
attr(c1724,c1725),
inference(split_conjunct,[status(thm)],[68]) ).
cnf(673,plain,
( agt(esk2_3(X1,X2,X3),X4)
| ~ agt(X1,X4)
| ~ subs(X1,X2)
| ~ chea(X3,X2) ),
inference(spm,[status(thm)],[115,112,theory(equality)]) ).
cnf(675,plain,
( obj(esk2_3(X1,X2,X3),X4)
| ~ obj(X1,X4)
| ~ subs(X1,X2)
| ~ chea(X3,X2) ),
inference(spm,[status(thm)],[185,112,theory(equality)]) ).
fof(692,plain,
( ~ epred1_0
<=> ! [X3,X1,X6,X2] :
( ~ subs(X2,n374bernehmen_1_1)
| ~ sub(X1,name_1_1)
| ~ sub(X3,firma_1_1)
| ~ attr(X6,X1)
| ~ val(X1,bmw_0)
| ~ prop(X3,britisch__1_1)
| ~ agt(X2,X6)
| ~ obj(X2,X3) ) ),
introduced(definition),
[split] ).
cnf(693,plain,
( epred1_0
| ~ subs(X2,n374bernehmen_1_1)
| ~ sub(X1,name_1_1)
| ~ sub(X3,firma_1_1)
| ~ attr(X6,X1)
| ~ val(X1,bmw_0)
| ~ prop(X3,britisch__1_1)
| ~ agt(X2,X6)
| ~ obj(X2,X3) ),
inference(split_equiv,[status(thm)],[692]) ).
fof(694,plain,
( ~ epred2_0
<=> ! [X5,X4] : ~ attr(X4,X5) ),
introduced(definition),
[split] ).
cnf(695,plain,
( epred2_0
| ~ attr(X4,X5) ),
inference(split_equiv,[status(thm)],[694]) ).
cnf(696,negated_conjecture,
( ~ epred2_0
| ~ epred1_0 ),
inference(apply_def,[status(esa)],[inference(apply_def,[status(esa)],[225,692,theory(equality)]),694,theory(equality)]),
[split] ).
cnf(698,plain,
epred2_0,
inference(spm,[status(thm)],[695,480,theory(equality)]) ).
cnf(705,negated_conjecture,
( $false
| ~ epred1_0 ),
inference(rw,[status(thm)],[696,698,theory(equality)]) ).
cnf(706,negated_conjecture,
~ epred1_0,
inference(cn,[status(thm)],[705,theory(equality)]) ).
cnf(707,negated_conjecture,
( ~ subs(X2,n374bernehmen_1_1)
| ~ sub(X1,name_1_1)
| ~ sub(X3,firma_1_1)
| ~ attr(X6,X1)
| ~ val(X1,bmw_0)
| ~ prop(X3,britisch__1_1)
| ~ agt(X2,X6)
| ~ obj(X2,X3) ),
inference(sr,[status(thm)],[693,706,theory(equality)]) ).
cnf(890,negated_conjecture,
( ~ agt(esk2_3(X1,X2,X3),X5)
| ~ prop(X4,britisch__1_1)
| ~ val(X6,bmw_0)
| ~ attr(X5,X6)
| ~ sub(X6,name_1_1)
| ~ sub(X4,firma_1_1)
| ~ subs(esk2_3(X1,X2,X3),n374bernehmen_1_1)
| ~ obj(X1,X4)
| ~ subs(X1,X2)
| ~ chea(X3,X2) ),
inference(spm,[status(thm)],[707,675,theory(equality)]) ).
cnf(896,negated_conjecture,
( ~ obj(X1,X2)
| ~ prop(X2,britisch__1_1)
| ~ val(X6,bmw_0)
| ~ attr(X5,X6)
| ~ sub(X6,name_1_1)
| ~ sub(X2,firma_1_1)
| ~ subs(esk2_3(X1,X3,X4),n374bernehmen_1_1)
| ~ subs(X1,X3)
| ~ chea(X4,X3)
| ~ agt(X1,X5) ),
inference(spm,[status(thm)],[890,673,theory(equality)]) ).
cnf(897,negated_conjecture,
( ~ obj(X1,X2)
| ~ agt(X1,X3)
| ~ prop(X2,britisch__1_1)
| ~ val(X4,bmw_0)
| ~ attr(X3,X4)
| ~ sub(X4,name_1_1)
| ~ sub(X2,firma_1_1)
| ~ subs(X1,X5)
| ~ chea(n374bernehmen_1_1,X5) ),
inference(spm,[status(thm)],[896,111,theory(equality)]) ).
cnf(898,plain,
( ~ agt(c1730,X1)
| ~ prop(c1912,britisch__1_1)
| ~ val(X2,bmw_0)
| ~ attr(X1,X2)
| ~ sub(X2,name_1_1)
| ~ sub(c1912,firma_1_1)
| ~ subs(c1730,X3)
| ~ chea(n374bernehmen_1_1,X3) ),
inference(spm,[status(thm)],[897,472,theory(equality)]) ).
cnf(903,plain,
( ~ agt(c1730,X1)
| $false
| ~ val(X2,bmw_0)
| ~ attr(X1,X2)
| ~ sub(X2,name_1_1)
| ~ sub(c1912,firma_1_1)
| ~ subs(c1730,X3)
| ~ chea(n374bernehmen_1_1,X3) ),
inference(rw,[status(thm)],[898,465,theory(equality)]) ).
cnf(904,plain,
( ~ agt(c1730,X1)
| $false
| ~ val(X2,bmw_0)
| ~ attr(X1,X2)
| ~ sub(X2,name_1_1)
| $false
| ~ subs(c1730,X3)
| ~ chea(n374bernehmen_1_1,X3) ),
inference(rw,[status(thm)],[903,464,theory(equality)]) ).
cnf(905,plain,
( ~ agt(c1730,X1)
| ~ val(X2,bmw_0)
| ~ attr(X1,X2)
| ~ sub(X2,name_1_1)
| ~ subs(c1730,X3)
| ~ chea(n374bernehmen_1_1,X3) ),
inference(cn,[status(thm)],[904,theory(equality)]) ).
fof(913,plain,
( ~ epred12_0
<=> ! [X2,X1] :
( ~ sub(X2,name_1_1)
| ~ attr(X1,X2)
| ~ val(X2,bmw_0)
| ~ agt(c1730,X1) ) ),
introduced(definition),
[split] ).
cnf(914,plain,
( epred12_0
| ~ sub(X2,name_1_1)
| ~ attr(X1,X2)
| ~ val(X2,bmw_0)
| ~ agt(c1730,X1) ),
inference(split_equiv,[status(thm)],[913]) ).
fof(915,plain,
( ~ epred13_0
<=> ! [X3] :
( ~ chea(n374bernehmen_1_1,X3)
| ~ subs(c1730,X3) ) ),
introduced(definition),
[split] ).
cnf(916,plain,
( epred13_0
| ~ chea(n374bernehmen_1_1,X3)
| ~ subs(c1730,X3) ),
inference(split_equiv,[status(thm)],[915]) ).
cnf(917,plain,
( ~ epred13_0
| ~ epred12_0 ),
inference(apply_def,[status(esa)],[inference(apply_def,[status(esa)],[905,913,theory(equality)]),915,theory(equality)]),
[split] ).
cnf(918,plain,
( epred13_0
| ~ chea(n374bernehmen_1_1,annahme_1_1) ),
inference(spm,[status(thm)],[916,471,theory(equality)]) ).
cnf(921,plain,
( epred13_0
| $false ),
inference(rw,[status(thm)],[918,90,theory(equality)]) ).
cnf(922,plain,
epred13_0,
inference(cn,[status(thm)],[921,theory(equality)]) ).
cnf(926,plain,
( $false
| ~ epred12_0 ),
inference(rw,[status(thm)],[917,922,theory(equality)]) ).
cnf(927,plain,
~ epred12_0,
inference(cn,[status(thm)],[926,theory(equality)]) ).
cnf(928,plain,
( epred12_0
| ~ val(X1,bmw_0)
| ~ attr(c2006,X1)
| ~ sub(X1,name_1_1) ),
inference(spm,[status(thm)],[914,474,theory(equality)]) ).
cnf(929,plain,
( epred12_0
| ~ val(c2007,bmw_0)
| ~ sub(c2007,name_1_1) ),
inference(spm,[status(thm)],[928,461,theory(equality)]) ).
cnf(930,plain,
( epred12_0
| $false
| ~ sub(c2007,name_1_1) ),
inference(rw,[status(thm)],[929,457,theory(equality)]) ).
cnf(931,plain,
( epred12_0
| $false
| $false ),
inference(rw,[status(thm)],[930,458,theory(equality)]) ).
cnf(932,plain,
epred12_0,
inference(cn,[status(thm)],[931,theory(equality)]) ).
cnf(935,plain,
$false,
inference(rw,[status(thm)],[927,932,theory(equality)]) ).
cnf(936,plain,
$false,
inference(cn,[status(thm)],[935,theory(equality)]) ).
cnf(937,plain,
$false,
936,
[proof] ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% % SZS status Started for /home/graph/tptp/TPTP/Problems/CSR/CSR115+8.p
% --creating new selector for [CSR004+0.ax]
% -running prover on /tmp/tmpmucSf0/sel_CSR115+8.p_1 with time limit 29
% -prover status Theorem
% Problem CSR115+8.p solved in phase 0.
% % SZS status Theorem for /home/graph/tptp/TPTP/Problems/CSR/CSR115+8.p
% % SZS status Ended for /home/graph/tptp/TPTP/Problems/CSR/CSR115+8.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
%
%------------------------------------------------------------------------------