TSTP Solution File: KRS070+1 by CSE---1.6
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- Process Solution
%------------------------------------------------------------------------------
% File : CSE---1.6
% Problem : KRS070+1 : TPTP v8.1.2. Released v3.1.0.
% Transfm : none
% Format : tptp:raw
% Command : java -jar /export/starexec/sandbox2/solver/bin/mcs_scs.jar %s %d
% Computer : n027.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 300s
% DateTime : Thu Aug 31 05:39:08 EDT 2023
% Result : Unsatisfiable 0.55s 1.18s
% Output : CNFRefutation 0.55s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.12 % Problem : KRS070+1 : TPTP v8.1.2. Released v3.1.0.
% 0.00/0.13 % Command : java -jar /export/starexec/sandbox2/solver/bin/mcs_scs.jar %s %d
% 0.13/0.34 % Computer : n027.cluster.edu
% 0.13/0.34 % Model : x86_64 x86_64
% 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34 % Memory : 8042.1875MB
% 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34 % CPULimit : 300
% 0.13/0.34 % WCLimit : 300
% 0.13/0.34 % DateTime : Mon Aug 28 01:54:51 EDT 2023
% 0.13/0.34 % CPUTime :
% 0.19/0.54 start to proof:theBenchmark
% 0.55/1.16 %-------------------------------------------
% 0.55/1.16 % File :CSE---1.6
% 0.55/1.16 % Problem :theBenchmark
% 0.55/1.16 % Transform :cnf
% 0.55/1.16 % Format :tptp:raw
% 0.55/1.16 % Command :java -jar mcs_scs.jar %d %s
% 0.55/1.16
% 0.55/1.16 % Result :Theorem 0.000000s
% 0.55/1.16 % Output :CNFRefutation 0.000000s
% 0.55/1.16 %-------------------------------------------
% 0.55/1.17 %------------------------------------------------------------------------------
% 0.55/1.17 % File : KRS070+1 : TPTP v8.1.2. Released v3.1.0.
% 0.55/1.17 % Domain : Knowledge Representation (Semantic Web)
% 0.55/1.17 % Problem : DL Test: fact4.1
% 0.55/1.17 % Version : Especial.
% 0.55/1.17 % English :
% 0.55/1.17
% 0.55/1.17 % Refs : [Bec03] Bechhofer (2003), Email to G. Sutcliffe
% 0.55/1.17 % : [TR+04] Tsarkov et al. (2004), Using Vampire to Reason with OW
% 0.55/1.17 % Source : [Bec03]
% 0.55/1.17 % Names : inconsistent_description-logic-Manifest004 [Bec03]
% 0.55/1.17
% 0.55/1.17 % Status : Unsatisfiable
% 0.55/1.17 % Rating : 0.00 v3.1.0
% 0.55/1.17 % Syntax : Number of formulae : 44 ( 1 unt; 0 def)
% 0.55/1.17 % Number of atoms : 125 ( 32 equ)
% 0.55/1.17 % Maximal formula atoms : 8 ( 2 avg)
% 0.55/1.17 % Number of connectives : 84 ( 3 ~; 0 |; 39 &)
% 0.55/1.17 % ( 2 <=>; 40 =>; 0 <=; 0 <~>)
% 0.55/1.17 % Maximal formula depth : 9 ( 5 avg)
% 0.55/1.17 % Maximal term depth : 1 ( 1 avg)
% 0.55/1.17 % Number of predicates : 18 ( 17 usr; 0 prp; 1-2 aty)
% 0.55/1.17 % Number of functors : 1 ( 1 usr; 1 con; 0-0 aty)
% 0.55/1.17 % Number of variables : 111 ( 108 !; 3 ?)
% 0.55/1.17 % SPC : FOF_UNS_RFO_SEQ
% 0.55/1.17
% 0.55/1.17 % Comments : Sean Bechhofer says there are some errors in the encoding of
% 0.55/1.17 % datatypes, so this problem may not be perfect. At least it's
% 0.55/1.17 % still representative of the type of reasoning required for OWL.
% 0.55/1.17 %------------------------------------------------------------------------------
% 0.55/1.17 fof(cUnsatisfiable_substitution_1,axiom,
% 0.55/1.17 ! [A,B] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & cUnsatisfiable(A) )
% 0.55/1.17 => cUnsatisfiable(B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(cc1_substitution_1,axiom,
% 0.55/1.17 ! [A,B] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & cc1(A) )
% 0.55/1.17 => cc1(B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(cc2_substitution_1,axiom,
% 0.55/1.17 ! [A,B] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & cc2(A) )
% 0.55/1.17 => cc2(B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(cowlNothing_substitution_1,axiom,
% 0.55/1.17 ! [A,B] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & cowlNothing(A) )
% 0.55/1.17 => cowlNothing(B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(cowlThing_substitution_1,axiom,
% 0.55/1.17 ! [A,B] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & cowlThing(A) )
% 0.55/1.17 => cowlThing(B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx(A,C) )
% 0.55/1.17 => rrx(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx(C,A) )
% 0.55/1.17 => rrx(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx1_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx1(A,C) )
% 0.55/1.17 => rrx1(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx1_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx1(C,A) )
% 0.55/1.17 => rrx1(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx1a_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx1a(A,C) )
% 0.55/1.17 => rrx1a(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx1a_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx1a(C,A) )
% 0.55/1.17 => rrx1a(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx2_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx2(A,C) )
% 0.55/1.17 => rrx2(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx2_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx2(C,A) )
% 0.55/1.17 => rrx2(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx2a_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx2a(A,C) )
% 0.55/1.17 => rrx2a(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx2a_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx2a(C,A) )
% 0.55/1.17 => rrx2a(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx3_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx3(A,C) )
% 0.55/1.17 => rrx3(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx3_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx3(C,A) )
% 0.55/1.17 => rrx3(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx3a_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx3a(A,C) )
% 0.55/1.17 => rrx3a(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx3a_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx3a(C,A) )
% 0.55/1.17 => rrx3a(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx4_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx4(A,C) )
% 0.55/1.17 => rrx4(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx4_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx4(C,A) )
% 0.55/1.17 => rrx4(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx4a_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx4a(A,C) )
% 0.55/1.17 => rrx4a(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrx4a_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrx4a(C,A) )
% 0.55/1.17 => rrx4a(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrxa_substitution_1,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrxa(A,C) )
% 0.55/1.17 => rrxa(B,C) ) ).
% 0.55/1.17
% 0.55/1.17 fof(rrxa_substitution_2,axiom,
% 0.55/1.17 ! [A,B,C] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & rrxa(C,A) )
% 0.55/1.17 => rrxa(C,B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(xsd_integer_substitution_1,axiom,
% 0.55/1.17 ! [A,B] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & xsd_integer(A) )
% 0.55/1.17 => xsd_integer(B) ) ).
% 0.55/1.17
% 0.55/1.17 fof(xsd_string_substitution_1,axiom,
% 0.55/1.17 ! [A,B] :
% 0.55/1.17 ( ( A = B
% 0.55/1.17 & xsd_string(A) )
% 0.55/1.17 => xsd_string(B) ) ).
% 0.55/1.17
% 0.55/1.17 %----Thing and Nothing
% 0.55/1.17 fof(axiom_0,axiom,
% 0.55/1.17 ! [X] :
% 0.55/1.17 ( cowlThing(X)
% 0.55/1.17 & ~ cowlNothing(X) ) ).
% 0.55/1.17
% 0.55/1.17 %----String and Integer disjoint
% 0.55/1.17 fof(axiom_1,axiom,
% 0.55/1.17 ! [X] :
% 0.55/1.17 ( xsd_string(X)
% 0.55/1.17 <=> ~ xsd_integer(X) ) ).
% 0.55/1.17
% 0.55/1.17 %----Equality cUnsatisfiable
% 0.55/1.17 fof(axiom_2,axiom,
% 0.55/1.17 ! [X] :
% 0.55/1.17 ( cUnsatisfiable(X)
% 0.55/1.17 <=> ( ? [Y] :
% 0.55/1.17 ( rrx4(X,Y)
% 0.55/1.17 & cc2(Y) )
% 0.55/1.17 & ~ ? [Y] :
% 0.55/1.17 ( rrx3(X,Y)
% 0.55/1.17 & cc2(Y)
% 0.55/1.17 & cc1(Y) )
% 0.55/1.17 & ? [Y] :
% 0.55/1.17 ( rrx3(X,Y)
% 0.55/1.17 & cc1(Y) ) ) ) ).
% 0.55/1.17
% 0.55/1.17 %----Functional: rrx
% 0.55/1.17 fof(axiom_3,axiom,
% 0.55/1.17 ! [X,Y,Z] :
% 0.55/1.17 ( ( rrx(X,Y)
% 0.55/1.17 & rrx(X,Z) )
% 0.55/1.17 => Y = Z ) ).
% 0.55/1.17
% 0.55/1.17 %----Functional: rrx3
% 0.55/1.17 fof(axiom_4,axiom,
% 0.55/1.18 ! [X,Y,Z] :
% 0.55/1.18 ( ( rrx3(X,Y)
% 0.55/1.18 & rrx3(X,Z) )
% 0.55/1.18 => Y = Z ) ).
% 0.55/1.18
% 0.55/1.18 %----Functional: rrx3a
% 0.55/1.18 fof(axiom_5,axiom,
% 0.55/1.18 ! [X,Y,Z] :
% 0.55/1.18 ( ( rrx3a(X,Y)
% 0.55/1.18 & rrx3a(X,Z) )
% 0.55/1.18 => Y = Z ) ).
% 0.55/1.18
% 0.55/1.18 %----Functional: rrx4
% 0.55/1.18 fof(axiom_6,axiom,
% 0.55/1.18 ! [X,Y,Z] :
% 0.55/1.18 ( ( rrx4(X,Y)
% 0.55/1.18 & rrx4(X,Z) )
% 0.55/1.18 => Y = Z ) ).
% 0.55/1.18
% 0.55/1.18 %----Functional: rrx4a
% 0.55/1.18 fof(axiom_7,axiom,
% 0.55/1.18 ! [X,Y,Z] :
% 0.55/1.18 ( ( rrx4a(X,Y)
% 0.55/1.18 & rrx4a(X,Z) )
% 0.55/1.18 => Y = Z ) ).
% 0.55/1.18
% 0.55/1.18 %----i2003_11_14_17_18_32242
% 0.55/1.18 fof(axiom_8,axiom,
% 0.55/1.18 cUnsatisfiable(i2003_11_14_17_18_32242) ).
% 0.55/1.18
% 0.55/1.18 fof(axiom_9,axiom,
% 0.55/1.18 ! [X,Y] :
% 0.55/1.18 ( rrx3(X,Y)
% 0.55/1.18 => rrx(X,Y) ) ).
% 0.55/1.18
% 0.55/1.18 fof(axiom_10,axiom,
% 0.55/1.18 ! [X,Y] :
% 0.55/1.18 ( rrx3a(X,Y)
% 0.55/1.18 => rrxa(X,Y) ) ).
% 0.55/1.18
% 0.55/1.18 fof(axiom_11,axiom,
% 0.55/1.18 ! [X,Y] :
% 0.55/1.18 ( rrx4a(X,Y)
% 0.55/1.18 => rrxa(X,Y) ) ).
% 0.55/1.18
% 0.55/1.18 fof(axiom_12,axiom,
% 0.55/1.18 ! [X,Y] :
% 0.55/1.18 ( rrx4(X,Y)
% 0.55/1.18 => rrx2(X,Y) ) ).
% 0.55/1.18
% 0.55/1.18 fof(axiom_13,axiom,
% 0.55/1.18 ! [X,Y] :
% 0.55/1.18 ( rrx3a(X,Y)
% 0.55/1.18 => rrx1a(X,Y) ) ).
% 0.55/1.18
% 0.55/1.18 fof(axiom_14,axiom,
% 0.55/1.18 ! [X,Y] :
% 0.55/1.18 ( rrx4a(X,Y)
% 0.55/1.18 => rrx2a(X,Y) ) ).
% 0.55/1.18
% 0.55/1.18 fof(axiom_15,axiom,
% 0.55/1.18 ! [X,Y] :
% 0.55/1.18 ( rrx3(X,Y)
% 0.55/1.18 => rrx1(X,Y) ) ).
% 0.55/1.18
% 0.55/1.18 fof(axiom_16,axiom,
% 0.55/1.18 ! [X,Y] :
% 0.55/1.18 ( rrx4(X,Y)
% 0.55/1.18 => rrx(X,Y) ) ).
% 0.55/1.18
% 0.55/1.18 %------------------------------------------------------------------------------
% 0.55/1.18 %-------------------------------------------
% 0.55/1.18 % Proof found
% 0.55/1.18 % SZS status Theorem for theBenchmark
% 0.55/1.18 % SZS output start Proof
% 0.55/1.18 %ClaNum:57(EqnAxiom:32)
% 0.55/1.18 %VarNum:107(SingletonVarNum:49)
% 0.55/1.18 %MaxLitNum:6
% 0.55/1.18 %MaxfuncDepth:1
% 0.55/1.18 %SharedTerms:2
% 0.55/1.18 [33]P1(a1)
% 0.55/1.18 [34]~P2(x341)
% 0.55/1.18 [35]P16(x351)+P5(x351)
% 0.55/1.18 [36]~P16(x361)+~P5(x361)
% 0.55/1.18 [37]~P1(x371)+P3(f2(x371))
% 0.55/1.18 [38]~P1(x381)+P4(f3(x381))
% 0.55/1.18 [39]~P1(x391)+P6(x391,f2(x391))
% 0.55/1.18 [40]~P1(x401)+P12(x401,f3(x401))
% 0.55/1.18 [41]~P6(x411,x412)+P7(x411,x412)
% 0.55/1.18 [42]~P12(x421,x422)+P7(x421,x422)
% 0.55/1.18 [43]~P6(x431,x432)+P8(x431,x432)
% 0.55/1.18 [44]~P13(x441,x442)+P9(x441,x442)
% 0.55/1.18 [45]~P12(x451,x452)+P10(x451,x452)
% 0.55/1.18 [46]~P14(x461,x462)+P11(x461,x462)
% 0.55/1.18 [47]~P13(x471,x472)+P15(x471,x472)
% 0.55/1.18 [48]~P14(x481,x482)+P15(x481,x482)
% 0.55/1.18 [50]~P7(x503,x501)+E(x501,x502)+~P7(x503,x502)
% 0.55/1.18 [51]~P6(x513,x511)+E(x511,x512)+~P6(x513,x512)
% 0.55/1.18 [52]~P13(x523,x521)+E(x521,x522)+~P13(x523,x522)
% 0.55/1.18 [53]~P12(x533,x531)+E(x531,x532)+~P12(x533,x532)
% 0.55/1.18 [54]~P14(x543,x541)+E(x541,x542)+~P14(x543,x542)
% 0.55/1.18 [49]~P4(x492)+~P6(x491,x492)+~P1(x491)+~P3(x492)
% 0.55/1.18 [55]~P6(x551,x552)+~P12(x551,x553)+P1(x551)+~P3(x552)+~P4(x553)+P3(f4(x551))
% 0.55/1.18 [56]~P6(x561,x562)+~P12(x561,x563)+P1(x561)+~P3(x562)+~P4(x563)+P4(f4(x561))
% 0.55/1.18 [57]~P6(x571,x572)+~P12(x571,x573)+P1(x571)+~P3(x572)+~P4(x573)+P6(x571,f4(x571))
% 0.55/1.18 %EqnAxiom
% 0.55/1.18 [1]E(x11,x11)
% 0.55/1.18 [2]E(x22,x21)+~E(x21,x22)
% 0.55/1.18 [3]E(x31,x33)+~E(x31,x32)+~E(x32,x33)
% 0.55/1.18 [4]~E(x41,x42)+E(f2(x41),f2(x42))
% 0.55/1.18 [5]~E(x51,x52)+E(f3(x51),f3(x52))
% 0.55/1.18 [6]~E(x61,x62)+E(f4(x61),f4(x62))
% 0.55/1.18 [7]~P1(x71)+P1(x72)+~E(x71,x72)
% 0.55/1.18 [8]~P2(x81)+P2(x82)+~E(x81,x82)
% 0.55/1.18 [9]~P5(x91)+P5(x92)+~E(x91,x92)
% 0.55/1.18 [10]~P16(x101)+P16(x102)+~E(x101,x102)
% 0.55/1.18 [11]~P4(x111)+P4(x112)+~E(x111,x112)
% 0.55/1.18 [12]~P3(x121)+P3(x122)+~E(x121,x122)
% 0.55/1.18 [13]P12(x132,x133)+~E(x131,x132)+~P12(x131,x133)
% 0.55/1.18 [14]P12(x143,x142)+~E(x141,x142)+~P12(x143,x141)
% 0.55/1.18 [15]P13(x152,x153)+~E(x151,x152)+~P13(x151,x153)
% 0.55/1.18 [16]P13(x163,x162)+~E(x161,x162)+~P13(x163,x161)
% 0.55/1.18 [17]P6(x172,x173)+~E(x171,x172)+~P6(x171,x173)
% 0.55/1.18 [18]P6(x183,x182)+~E(x181,x182)+~P6(x183,x181)
% 0.55/1.18 [19]P14(x192,x193)+~E(x191,x192)+~P14(x191,x193)
% 0.55/1.18 [20]P14(x203,x202)+~E(x201,x202)+~P14(x203,x201)
% 0.55/1.18 [21]P10(x212,x213)+~E(x211,x212)+~P10(x211,x213)
% 0.55/1.18 [22]P10(x223,x222)+~E(x221,x222)+~P10(x223,x221)
% 0.55/1.18 [23]P7(x232,x233)+~E(x231,x232)+~P7(x231,x233)
% 0.55/1.18 [24]P7(x243,x242)+~E(x241,x242)+~P7(x243,x241)
% 0.55/1.18 [25]P15(x252,x253)+~E(x251,x252)+~P15(x251,x253)
% 0.55/1.18 [26]P15(x263,x262)+~E(x261,x262)+~P15(x263,x261)
% 0.55/1.18 [27]P11(x272,x273)+~E(x271,x272)+~P11(x271,x273)
% 0.55/1.18 [28]P11(x283,x282)+~E(x281,x282)+~P11(x283,x281)
% 0.55/1.18 [29]P8(x292,x293)+~E(x291,x292)+~P8(x291,x293)
% 0.55/1.18 [30]P8(x303,x302)+~E(x301,x302)+~P8(x303,x301)
% 0.55/1.18 [31]P9(x312,x313)+~E(x311,x312)+~P9(x311,x313)
% 0.55/1.18 [32]P9(x323,x322)+~E(x321,x322)+~P9(x323,x321)
% 0.55/1.18
% 0.55/1.18 %-------------------------------------------
% 0.55/1.18 cnf(58,plain,
% 0.55/1.18 (P12(a1,f3(a1))),
% 0.55/1.18 inference(scs_inference,[],[33,40])).
% 0.55/1.18 cnf(59,plain,
% 0.55/1.18 (P6(a1,f2(a1))),
% 0.55/1.18 inference(scs_inference,[],[33,40,39])).
% 0.55/1.18 cnf(67,plain,
% 0.55/1.18 (~E(f3(a1),f2(a1))),
% 0.55/1.18 inference(scs_inference,[],[33,40,39,38,37,12,49,11])).
% 0.55/1.18 cnf(76,plain,
% 0.55/1.18 (~P7(x761,f2(a1))+~P7(x761,f3(a1))),
% 0.55/1.18 inference(scs_inference,[],[33,40,39,38,37,12,49,11,54,53,52,51,50])).
% 0.55/1.18 cnf(88,plain,
% 0.55/1.18 ($false),
% 0.55/1.18 inference(scs_inference,[],[67,58,59,2,45,43,42,41,76]),
% 0.55/1.18 ['proof']).
% 0.55/1.18 % SZS output end Proof
% 0.55/1.18 % Total time :0.000000s
%------------------------------------------------------------------------------