TSTP Solution File: NLP042-10 by CiME---2.01
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : CiME---2.01
% Problem : NLP042-10 : TPTP v7.3.0. Released v7.3.0.
% Transfm : none
% Format : tptp:raw
% Command : tptp2X_and_run_cime %s
% Computer : n191.star.cs.uiowa.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2609 0 2.40GHz
% Memory : 32218.5MB
% OS : Linux 3.10.0-862.11.6.el7.x86_64
% CPULimit : 300s
% DateTime : Wed Feb 27 13:36:00 EST 2019
% Result : Satisfiable 1.69s
% Output : Assurance 0s
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.04 % Problem : NLP042-10 : TPTP v7.3.0. Released v7.3.0.
% 0.00/0.04 % Command : tptp2X_and_run_cime %s
% 0.03/0.27 % Computer : n191.star.cs.uiowa.edu
% 0.03/0.27 % Model : x86_64 x86_64
% 0.03/0.27 % CPU : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
% 0.03/0.27 % Memory : 32218.5MB
% 0.03/0.27 % OS : Linux 3.10.0-862.11.6.el7.x86_64
% 0.03/0.27 % CPULimit : 300
% 0.03/0.27 % DateTime : Fri Feb 22 05:13:11 CST 2019
% 0.03/0.27 % CPUTime :
% 1.17/1.46 Processing problem /tmp/CiME_582_n191.star.cs.uiowa.edu
% 1.17/1.46 #verbose 1;
% 1.17/1.46 let F = signature " b,a,skc8,skc6,skc7,skc9,skc5,true : constant; tuple : 3; tuple2 : 2; patient : 3; agent : 3; past : 2; nonreflexive : 2; actual_world : 1; of : 3; female : 2; animate : 2; human : 2; living : 2; organism : 2; human_person : 2; woman : 2; mia_forename : 2; general : 2; nonhuman : 2; abstraction : 2; relation : 2; relname : 2; forename : 2; impartial : 2; nonliving : 2; existent : 2; entity : 2; object : 2; substance_matter : 2; food : 2; beverage : 2; shake_beverage : 2; unisex : 2; nonexistent : 2; specific : 2; singleton : 2; thing : 2; eventuality : 2; event : 2; act : 2; order : 2; ifeq : 4; ifeq2 : 4; ifeq3 : 4; ifeq4 : 4;";
% 1.17/1.46 let X = vars "A B C U V W X";
% 1.17/1.46 let Axioms = equations F X "
% 1.17/1.46 ifeq4(A,A,B,C) = B;
% 1.17/1.46 ifeq3(A,A,B,C) = B;
% 1.17/1.46 ifeq2(A,A,B,C) = B;
% 1.17/1.46 ifeq(A,A,B,C) = B;
% 1.17/1.46 ifeq3(order(U,V),true,act(U,V),true) = true;
% 1.17/1.46 ifeq3(act(U,V),true,event(U,V),true) = true;
% 1.17/1.46 ifeq3(event(U,V),true,eventuality(U,V),true) = true;
% 1.17/1.46 ifeq3(eventuality(U,V),true,thing(U,V),true) = true;
% 1.17/1.46 ifeq3(thing(U,V),true,singleton(U,V),true) = true;
% 1.17/1.46 ifeq3(eventuality(U,V),true,specific(U,V),true) = true;
% 1.17/1.46 ifeq3(eventuality(U,V),true,nonexistent(U,V),true) = true;
% 1.17/1.46 ifeq3(eventuality(U,V),true,unisex(U,V),true) = true;
% 1.17/1.46 ifeq3(order(U,V),true,event(U,V),true) = true;
% 1.17/1.46 ifeq3(shake_beverage(U,V),true,beverage(U,V),true) = true;
% 1.17/1.46 ifeq3(beverage(U,V),true,food(U,V),true) = true;
% 1.17/1.46 ifeq3(food(U,V),true,substance_matter(U,V),true) = true;
% 1.17/1.46 ifeq3(substance_matter(U,V),true,object(U,V),true) = true;
% 1.17/1.46 ifeq3(object(U,V),true,entity(U,V),true) = true;
% 1.17/1.46 ifeq3(entity(U,V),true,thing(U,V),true) = true;
% 1.17/1.46 ifeq3(entity(U,V),true,specific(U,V),true) = true;
% 1.17/1.46 ifeq3(entity(U,V),true,existent(U,V),true) = true;
% 1.17/1.46 ifeq3(object(U,V),true,nonliving(U,V),true) = true;
% 1.17/1.46 ifeq3(object(U,V),true,impartial(U,V),true) = true;
% 1.17/1.46 ifeq3(object(U,V),true,unisex(U,V),true) = true;
% 1.17/1.46 ifeq3(forename(U,V),true,relname(U,V),true) = true;
% 1.17/1.46 ifeq3(relname(U,V),true,relation(U,V),true) = true;
% 1.17/1.46 ifeq3(relation(U,V),true,abstraction(U,V),true) = true;
% 1.17/1.46 ifeq3(abstraction(U,V),true,thing(U,V),true) = true;
% 1.17/1.46 ifeq3(abstraction(U,V),true,nonhuman(U,V),true) = true;
% 1.17/1.46 ifeq3(abstraction(U,V),true,general(U,V),true) = true;
% 1.17/1.46 ifeq3(abstraction(U,V),true,unisex(U,V),true) = true;
% 1.17/1.46 ifeq3(mia_forename(U,V),true,forename(U,V),true) = true;
% 1.17/1.46 ifeq3(woman(U,V),true,human_person(U,V),true) = true;
% 1.17/1.46 ifeq3(human_person(U,V),true,organism(U,V),true) = true;
% 1.17/1.46 ifeq3(organism(U,V),true,entity(U,V),true) = true;
% 1.17/1.46 ifeq3(organism(U,V),true,impartial(U,V),true) = true;
% 1.17/1.46 ifeq3(organism(U,V),true,living(U,V),true) = true;
% 1.17/1.46 ifeq3(human_person(U,V),true,human(U,V),true) = true;
% 1.17/1.46 ifeq3(human_person(U,V),true,animate(U,V),true) = true;
% 1.17/1.46 ifeq3(woman(U,V),true,female(U,V),true) = true;
% 1.17/1.46 ifeq4(of(U,W,X),true,ifeq4(of(U,V,X),true,ifeq4(forename(U,W),true,ifeq4(forename(U,V),true,ifeq4(entity(U,X),true,W,V),V),V),V),V) = V;
% 1.17/1.46 actual_world(skc5) = true;
% 1.17/1.46 woman(skc5,skc9) = true;
% 1.17/1.46 shake_beverage(skc5,skc7) = true;
% 1.17/1.46 order(skc5,skc6) = true;
% 1.17/1.46 nonreflexive(skc5,skc6) = true;
% 1.17/1.46 past(skc5,skc6) = true;
% 1.17/1.46 event(skc5,skc6) = true;
% 1.17/1.46 forename(skc5,skc8) = true;
% 1.17/1.46 mia_forename(skc5,skc8) = true;
% 1.17/1.46 of(skc5,skc8,skc9) = true;
% 1.17/1.46 agent(skc5,skc6,skc9) = true;
% 1.17/1.46 patient(skc5,skc6,skc7) = true;
% 1.17/1.46 ifeq2(tuple2(unisex(U,V),female(U,V)),tuple2(true,true),a,b) = b;
% 1.17/1.46 ifeq2(tuple2(specific(U,V),general(U,V)),tuple2(true,true),a,b) = b;
% 1.17/1.46 ifeq2(tuple2(nonliving(U,V),living(U,V)),tuple2(true,true),a,b) = b;
% 1.17/1.46 ifeq2(tuple2(nonhuman(U,V),human(U,V)),tuple2(true,true),a,b) = b;
% 1.17/1.46 ifeq2(tuple2(nonexistent(U,V),existent(U,V)),tuple2(true,true),a,b) = b;
% 1.17/1.46 ifeq2(tuple2(nonliving(U,V),animate(U,V)),tuple2(true,true),a,b) = b;
% 1.17/1.46 ifeq(tuple(patient(U,V,W),nonreflexive(U,V),agent(U,V,W)),tuple(true,true,true),a,b) = b;
% 1.17/1.46 ";
% 1.17/1.46
% 1.17/1.46 let s1 = status F "
% 1.17/1.46 tuple lr_lex;
% 1.17/1.46 b lr_lex;
% 1.17/1.46 a lr_lex;
% 1.17/1.46 tuple2 lr_lex;
% 1.17/1.46 patient lr_lex;
% 1.17/1.46 agent lr_lex;
% 1.17/1.46 skc8 lr_lex;
% 1.17/1.46 past lr_lex;
% 1.17/1.46 nonreflexive lr_lex;
% 1.17/1.46 skc6 lr_lex;
% 1.17/1.46 skc7 lr_lex;
% 1.17/1.46 skc9 lr_lex;
% 1.17/1.46 actual_world lr_lex;
% 1.17/1.46 skc5 lr_lex;
% 1.17/1.46 of lr_lex;
% 1.17/1.46 female lr_lex;
% 1.17/1.46 animate lr_lex;
% 1.17/1.46 human lr_lex;
% 1.17/1.46 living lr_lex;
% 1.17/1.46 organism lr_lex;
% 1.17/1.46 human_person lr_lex;
% 1.17/1.46 woman lr_lex;
% 1.17/1.46 mia_forename lr_lex;
% 1.17/1.46 general lr_lex;
% 1.17/1.46 nonhuman lr_lex;
% 1.17/1.46 abstraction lr_lex;
% 1.17/1.46 relation lr_lex;
% 1.17/1.46 relname lr_lex;
% 1.17/1.46 forename lr_lex;
% 1.17/1.46 impartial lr_lex;
% 1.17/1.46 nonliving lr_lex;
% 1.17/1.46 existent lr_lex;
% 1.17/1.46 entity lr_lex;
% 1.17/1.46 object lr_lex;
% 1.17/1.46 substance_matter lr_lex;
% 1.17/1.46 food lr_lex;
% 1.17/1.46 beverage lr_lex;
% 1.17/1.46 shake_beverage lr_lex;
% 1.17/1.46 unisex lr_lex;
% 1.17/1.46 nonexistent lr_lex;
% 1.17/1.46 specific lr_lex;
% 1.17/1.46 singleton lr_lex;
% 1.17/1.46 thing lr_lex;
% 1.17/1.46 eventuality lr_lex;
% 1.17/1.46 event lr_lex;
% 1.17/1.46 act lr_lex;
% 1.17/1.46 true lr_lex;
% 1.17/1.46 order lr_lex;
% 1.17/1.46 ifeq lr_lex;
% 1.17/1.46 ifeq2 lr_lex;
% 1.17/1.46 ifeq3 lr_lex;
% 1.17/1.46 ifeq4 lr_lex;
% 1.17/1.46 ";
% 1.17/1.46
% 1.17/1.46 let p1 = precedence F "
% 1.17/1.46 singleton > ifeq4 > ifeq3 > ifeq2 > ifeq > of > agent > patient > tuple > order > act > event > eventuality > thing > specific > nonexistent > unisex > shake_beverage > beverage > food > substance_matter > object > entity > existent > nonliving > impartial > forename > relname > relation > abstraction > nonhuman > general > mia_forename > woman > human_person > organism > living > human > animate > female > nonreflexive > past > tuple2 > actual_world > true > skc5 > skc9 > skc7 > skc6 > skc8 > a > b";
% 1.17/1.46
% 1.17/1.46 let s2 = status F "
% 1.17/1.46 tuple mul;
% 1.17/1.46 b mul;
% 1.17/1.46 a mul;
% 1.17/1.46 tuple2 mul;
% 1.17/1.46 patient mul;
% 1.17/1.46 agent mul;
% 1.17/1.46 skc8 mul;
% 1.17/1.46 past mul;
% 1.17/1.46 nonreflexive mul;
% 1.17/1.46 skc6 mul;
% 1.17/1.46 skc7 mul;
% 1.17/1.46 skc9 mul;
% 1.17/1.46 actual_world mul;
% 1.17/1.46 skc5 mul;
% 1.17/1.46 of mul;
% 1.17/1.46 female mul;
% 1.17/1.46 animate mul;
% 1.17/1.46 human mul;
% 1.17/1.46 living mul;
% 1.17/1.46 organism mul;
% 1.17/1.46 human_person mul;
% 1.17/1.46 woman mul;
% 1.17/1.46 mia_forename mul;
% 1.17/1.46 general mul;
% 1.17/1.46 nonhuman mul;
% 1.17/1.46 abstraction mul;
% 1.17/1.46 relation mul;
% 1.17/1.46 relname mul;
% 1.17/1.46 forename mul;
% 1.17/1.46 impartial mul;
% 1.17/1.46 nonliving mul;
% 1.17/1.46 existent mul;
% 1.17/1.46 entity mul;
% 1.17/1.46 object mul;
% 1.17/1.46 substance_matter mul;
% 1.17/1.46 food mul;
% 1.17/1.46 beverage mul;
% 1.17/1.46 shake_beverage mul;
% 1.17/1.46 unisex mul;
% 1.17/1.46 nonexistent mul;
% 1.17/1.46 specific mul;
% 1.17/1.46 singleton mul;
% 1.17/1.46 thing mul;
% 1.17/1.46 eventuality mul;
% 1.17/1.46 event mul;
% 1.17/1.46 act mul;
% 1.17/1.46 true mul;
% 1.17/1.46 order mul;
% 1.17/1.46 ifeq mul;
% 1.17/1.46 ifeq2 mul;
% 1.17/1.46 ifeq3 mul;
% 1.17/1.46 ifeq4 mul;
% 1.17/1.46 ";
% 1.17/1.46
% 1.17/1.46 let p2 = precedence F "
% 1.17/1.46 singleton > ifeq4 > ifeq3 > ifeq2 > ifeq > of > agent > patient > tuple > order > act > event > eventuality > thing > specific > nonexistent > unisex > shake_beverage > beverage > food > substance_matter > object > entity > existent > nonliving > impartial > forename > relname > relation > abstraction > nonhuman > general > mia_forename > woman > human_person > organism > living > human > animate > female > nonreflexive > past > tuple2 > actual_world > true = skc5 = skc9 = skc7 = skc6 = skc8 = a = b";
% 1.17/1.46
% 1.17/1.46 let o_auto = AUTO Axioms;
% 1.17/1.46
% 1.17/1.46 let o = LEX o_auto (LEX (ACRPO s1 p1) (ACRPO s2 p2));
% 1.17/1.46
% 1.17/1.46 let Conjectures = equations F X " a = b;"
% 1.17/1.46 ;
% 1.17/1.46 (*
% 1.17/1.46 let Red_Axioms = normalize_equations Defining_rules Axioms;
% 1.17/1.46
% 1.17/1.46 let Red_Conjectures = normalize_equations Defining_rules Conjectures;
% 1.17/1.46 *)
% 1.17/1.46 #time on;
% 1.17/1.46
% 1.17/1.46 let res = prove_conj_by_ordered_completion o Axioms Conjectures;
% 1.17/1.46
% 1.17/1.46 #time off;
% 1.17/1.46
% 1.17/1.46
% 1.17/1.46 let status = if res then "unsatisfiable" else "satisfiable";
% 1.17/1.46 #quit;
% 1.17/1.46 Verbose level is now 1
% 1.17/1.46
% 1.17/1.46 F : signature = <signature>
% 1.17/1.46 X : variable_set = <variable set>
% 1.17/1.46
% 1.17/1.46 Axioms : (F,X) equations = { ifeq4(A,A,B,C) = B,
% 1.17/1.46 ifeq3(A,A,B,C) = B,
% 1.17/1.46 ifeq2(A,A,B,C) = B,
% 1.17/1.46 ifeq(A,A,B,C) = B,
% 1.17/1.46 ifeq3(order(U,V),true,act(U,V),true) = true,
% 1.17/1.46 ifeq3(act(U,V),true,event(U,V),true) = true,
% 1.17/1.46 ifeq3(event(U,V),true,eventuality(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(eventuality(U,V),true,thing(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(thing(U,V),true,singleton(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(eventuality(U,V),true,specific(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(eventuality(U,V),true,nonexistent(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(eventuality(U,V),true,unisex(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(order(U,V),true,event(U,V),true) = true,
% 1.17/1.46 ifeq3(shake_beverage(U,V),true,beverage(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(beverage(U,V),true,food(U,V),true) = true,
% 1.17/1.46 ifeq3(food(U,V),true,substance_matter(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(substance_matter(U,V),true,object(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(object(U,V),true,entity(U,V),true) = true,
% 1.17/1.46 ifeq3(entity(U,V),true,thing(U,V),true) = true,
% 1.17/1.46 ifeq3(entity(U,V),true,specific(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(entity(U,V),true,existent(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(object(U,V),true,nonliving(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(object(U,V),true,impartial(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(object(U,V),true,unisex(U,V),true) = true,
% 1.17/1.46 ifeq3(forename(U,V),true,relname(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(relname(U,V),true,relation(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(relation(U,V),true,abstraction(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(abstraction(U,V),true,thing(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(abstraction(U,V),true,nonhuman(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(abstraction(U,V),true,general(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(abstraction(U,V),true,unisex(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(mia_forename(U,V),true,forename(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(woman(U,V),true,human_person(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(human_person(U,V),true,organism(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(organism(U,V),true,entity(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(organism(U,V),true,impartial(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(organism(U,V),true,living(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(human_person(U,V),true,human(U,V),true) =
% 1.17/1.46 true,
% 1.17/1.46 ifeq3(human_person(U,V),true,animate(U,V),true)
% 1.17/1.46 = true,
% 1.17/1.46 ifeq3(woman(U,V),true,female(U,V),true) = true,
% 1.17/1.46 ifeq4(of(U,W,X),true,ifeq4(of(U,V,X),true,
% 1.17/1.46 ifeq4(forename(U,W),true,
% 1.17/1.46 ifeq4(forename(U,V),true,
% 1.17/1.46 ifeq4(entity(U,X),true,W,V),V),V),V),V)
% 1.17/1.46 = V,
% 1.17/1.46 actual_world(skc5) = true,
% 1.17/1.46 woman(skc5,skc9) = true,
% 1.17/1.46 shake_beverage(skc5,skc7) = true,
% 1.17/1.46 order(skc5,skc6) = true,
% 1.17/1.46 nonreflexive(skc5,skc6) = true,
% 1.17/1.46 past(skc5,skc6) = true,
% 1.17/1.46 event(skc5,skc6) = true,
% 1.17/1.46 forename(skc5,skc8) = true,
% 1.17/1.46 mia_forename(skc5,skc8) = true,
% 1.17/1.46 of(skc5,skc8,skc9) = true,
% 1.17/1.46 agent(skc5,skc6,skc9) = true,
% 1.17/1.46 patient(skc5,skc6,skc7) = true,
% 1.17/1.46 ifeq2(tuple2(unisex(U,V),female(U,V)),tuple2(true,true),a,b)
% 1.17/1.46 = b,
% 1.17/1.46 ifeq2(tuple2(specific(U,V),general(U,V)),
% 1.17/1.46 tuple2(true,true),a,b) = b,
% 1.17/1.46 ifeq2(tuple2(nonliving(U,V),living(U,V)),
% 1.19/1.53 tuple2(true,true),a,b) = b,
% 1.19/1.53 ifeq2(tuple2(nonhuman(U,V),human(U,V)),tuple2(true,true),a,b)
% 1.19/1.53 = b,
% 1.19/1.53 ifeq2(tuple2(nonexistent(U,V),existent(U,V)),
% 1.19/1.53 tuple2(true,true),a,b) = b,
% 1.19/1.53 ifeq2(tuple2(nonliving(U,V),animate(U,V)),
% 1.19/1.53 tuple2(true,true),a,b) = b,
% 1.19/1.53 ifeq(tuple(patient(U,V,W),nonreflexive(U,V),
% 1.19/1.53 agent(U,V,W)),tuple(true,true,true),a,b) =
% 1.19/1.53 b } (60 equation(s))
% 1.19/1.53 s1 : F status = <status>
% 1.19/1.53 p1 : F precedence = <precedence>
% 1.19/1.53 s2 : F status = <status>
% 1.19/1.53 p2 : F precedence = <precedence>
% 1.19/1.53 o_auto : F term_ordering = <term ordering>
% 1.19/1.53 o : F term_ordering = <term ordering>
% 1.19/1.53 Conjectures : (F,X) equations = { a = b } (1 equation(s))
% 1.19/1.53 time is now on
% 1.19/1.53
% 1.19/1.53 Initializing completion ...
% 1.19/1.53 New rule produced : [1] actual_world(skc5) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 59
% 1.19/1.53 Current number of rules: 1
% 1.19/1.53 New rule produced : [2] past(skc5,skc6) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 58
% 1.19/1.53 Current number of rules: 2
% 1.19/1.53 New rule produced : [3] nonreflexive(skc5,skc6) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 57
% 1.19/1.53 Current number of rules: 3
% 1.19/1.53 New rule produced : [4] woman(skc5,skc9) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 56
% 1.19/1.53 Current number of rules: 4
% 1.19/1.53 New rule produced : [5] mia_forename(skc5,skc8) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 55
% 1.19/1.53 Current number of rules: 5
% 1.19/1.53 New rule produced : [6] forename(skc5,skc8) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 54
% 1.19/1.53 Current number of rules: 6
% 1.19/1.53 New rule produced : [7] shake_beverage(skc5,skc7) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 53
% 1.19/1.53 Current number of rules: 7
% 1.19/1.53 New rule produced : [8] event(skc5,skc6) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 52
% 1.19/1.53 Current number of rules: 8
% 1.19/1.53 New rule produced : [9] order(skc5,skc6) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 51
% 1.19/1.53 Current number of rules: 9
% 1.19/1.53 New rule produced : [10] patient(skc5,skc6,skc7) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 50
% 1.19/1.53 Current number of rules: 10
% 1.19/1.53 New rule produced : [11] of(skc5,skc8,skc9) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 49
% 1.19/1.53 Current number of rules: 11
% 1.19/1.53 New rule produced : [12] agent(skc5,skc6,skc9) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 48
% 1.19/1.53 Current number of rules: 12
% 1.19/1.53 New rule produced : [13] ifeq(A,A,B,C) -> B
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 47
% 1.19/1.53 Current number of rules: 13
% 1.19/1.53 New rule produced : [14] ifeq2(A,A,B,C) -> B
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 46
% 1.19/1.53 Current number of rules: 14
% 1.19/1.53 New rule produced : [15] ifeq3(A,A,B,C) -> B
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 45
% 1.19/1.53 Current number of rules: 15
% 1.19/1.53 New rule produced : [16] ifeq4(A,A,B,C) -> B
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 44
% 1.19/1.53 Current number of rules: 16
% 1.19/1.53 New rule produced :
% 1.19/1.53 [17] ifeq3(mia_forename(U,V),true,forename(U,V),true) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 43
% 1.19/1.53 Current number of rules: 17
% 1.19/1.53 New rule produced :
% 1.19/1.53 [18] ifeq3(shake_beverage(U,V),true,beverage(U,V),true) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 42
% 1.19/1.53 Current number of rules: 18
% 1.19/1.53 New rule produced : [19] ifeq3(thing(U,V),true,singleton(U,V),true) -> true
% 1.19/1.53 Current number of equations to process: 0
% 1.19/1.53 Current number of ordered equations: 41
% 1.19/1.53 Current number of rules: 19
% 1.19/1.54 New rule produced : [20] ifeq3(object(U,V),true,unisex(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 40
% 1.19/1.54 Current number of rules: 20
% 1.19/1.54 New rule produced : [21] ifeq3(object(U,V),true,entity(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 39
% 1.19/1.54 Current number of rules: 21
% 1.19/1.54 New rule produced : [22] ifeq3(object(U,V),true,nonliving(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 38
% 1.19/1.54 Current number of rules: 22
% 1.19/1.54 New rule produced : [23] ifeq3(object(U,V),true,impartial(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 37
% 1.19/1.54 Current number of rules: 23
% 1.19/1.54 New rule produced : [24] ifeq3(event(U,V),true,eventuality(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 36
% 1.19/1.54 Current number of rules: 24
% 1.19/1.54 New rule produced :
% 1.19/1.54 [25] ifeq3(human_person(U,V),true,organism(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 35
% 1.19/1.54 Current number of rules: 25
% 1.19/1.54 New rule produced : [26] ifeq3(abstraction(U,V),true,thing(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 34
% 1.19/1.54 Current number of rules: 26
% 1.19/1.54 New rule produced :
% 1.19/1.54 [27] ifeq3(human_person(U,V),true,human(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 33
% 1.19/1.54 Current number of rules: 27
% 1.19/1.54 New rule produced :
% 1.19/1.54 [28] ifeq3(human_person(U,V),true,animate(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 32
% 1.19/1.54 Current number of rules: 28
% 1.19/1.54 New rule produced :
% 1.19/1.54 [29] ifeq3(abstraction(U,V),true,unisex(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 31
% 1.19/1.54 Current number of rules: 29
% 1.19/1.54 New rule produced :
% 1.19/1.54 [30] ifeq3(abstraction(U,V),true,nonhuman(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 30
% 1.19/1.54 Current number of rules: 30
% 1.19/1.54 New rule produced :
% 1.19/1.54 [31] ifeq3(abstraction(U,V),true,general(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 29
% 1.19/1.54 Current number of rules: 31
% 1.19/1.54 New rule produced :
% 1.19/1.54 [32] ifeq3(food(U,V),true,substance_matter(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 28
% 1.19/1.54 Current number of rules: 32
% 1.19/1.54 New rule produced : [33] ifeq3(relname(U,V),true,relation(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 27
% 1.19/1.54 Current number of rules: 33
% 1.19/1.54 New rule produced :
% 1.19/1.54 [34] ifeq3(woman(U,V),true,human_person(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 26
% 1.19/1.54 Current number of rules: 34
% 1.19/1.54 New rule produced : [35] ifeq3(woman(U,V),true,female(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 25
% 1.19/1.54 Current number of rules: 35
% 1.19/1.54 New rule produced : [36] ifeq3(forename(U,V),true,relname(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 24
% 1.19/1.54 Current number of rules: 36
% 1.19/1.54 New rule produced : [37] ifeq3(entity(U,V),true,thing(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 23
% 1.19/1.54 Current number of rules: 37
% 1.19/1.54 New rule produced : [38] ifeq3(entity(U,V),true,specific(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 22
% 1.19/1.54 Current number of rules: 38
% 1.19/1.54 New rule produced : [39] ifeq3(entity(U,V),true,existent(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 21
% 1.19/1.54 Current number of rules: 39
% 1.19/1.54 New rule produced : [40] ifeq3(eventuality(U,V),true,thing(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 20
% 1.19/1.54 Current number of rules: 40
% 1.19/1.54 New rule produced :
% 1.19/1.54 [41] ifeq3(eventuality(U,V),true,specific(U,V),true) -> true
% 1.19/1.54 Current number of equations to process: 0
% 1.19/1.54 Current number of ordered equations: 19
% 1.19/1.55 Current number of rules: 41
% 1.19/1.55 New rule produced :
% 1.19/1.55 [42] ifeq3(eventuality(U,V),true,nonexistent(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 18
% 1.19/1.55 Current number of rules: 42
% 1.19/1.55 New rule produced :
% 1.19/1.55 [43] ifeq3(eventuality(U,V),true,unisex(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 17
% 1.19/1.55 Current number of rules: 43
% 1.19/1.55 New rule produced : [44] ifeq3(organism(U,V),true,entity(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 16
% 1.19/1.55 Current number of rules: 44
% 1.19/1.55 New rule produced :
% 1.19/1.55 [45] ifeq3(organism(U,V),true,impartial(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 15
% 1.19/1.55 Current number of rules: 45
% 1.19/1.55 New rule produced : [46] ifeq3(organism(U,V),true,living(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 14
% 1.19/1.55 Current number of rules: 46
% 1.19/1.55 New rule produced :
% 1.19/1.55 [47] ifeq3(substance_matter(U,V),true,object(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 13
% 1.19/1.55 Current number of rules: 47
% 1.19/1.55 New rule produced : [48] ifeq3(act(U,V),true,event(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 12
% 1.19/1.55 Current number of rules: 48
% 1.19/1.55 New rule produced :
% 1.19/1.55 [49] ifeq3(relation(U,V),true,abstraction(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 11
% 1.19/1.55 Current number of rules: 49
% 1.19/1.55 New rule produced : [50] ifeq3(beverage(U,V),true,food(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 10
% 1.19/1.55 Current number of rules: 50
% 1.19/1.55 New rule produced : [51] ifeq3(order(U,V),true,act(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 9
% 1.19/1.55 Current number of rules: 51
% 1.19/1.55 New rule produced : [52] ifeq3(order(U,V),true,event(U,V),true) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 8
% 1.19/1.55 Current number of rules: 52
% 1.19/1.55 New rule produced :
% 1.19/1.55 [53] ifeq2(tuple2(specific(U,V),general(U,V)),tuple2(true,true),a,b) -> b
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 7
% 1.19/1.55 Current number of rules: 53
% 1.19/1.55 New rule produced :
% 1.19/1.55 [54] ifeq2(tuple2(unisex(U,V),female(U,V)),tuple2(true,true),a,b) -> b
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 6
% 1.19/1.55 Current number of rules: 54
% 1.19/1.55 New rule produced :
% 1.19/1.55 [55] ifeq2(tuple2(nonexistent(U,V),existent(U,V)),tuple2(true,true),a,b) -> b
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 5
% 1.19/1.55 Current number of rules: 55
% 1.19/1.55 New rule produced :
% 1.19/1.55 [56] ifeq2(tuple2(nonliving(U,V),living(U,V)),tuple2(true,true),a,b) -> b
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 4
% 1.19/1.55 Current number of rules: 56
% 1.19/1.55 New rule produced :
% 1.19/1.55 [57] ifeq2(tuple2(nonliving(U,V),animate(U,V)),tuple2(true,true),a,b) -> b
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 3
% 1.19/1.55 Current number of rules: 57
% 1.19/1.55 New rule produced :
% 1.19/1.55 [58] ifeq2(tuple2(nonhuman(U,V),human(U,V)),tuple2(true,true),a,b) -> b
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 2
% 1.19/1.55 Current number of rules: 58
% 1.19/1.55 New rule produced :
% 1.19/1.55 [59]
% 1.19/1.55 ifeq(tuple(patient(U,V,W),nonreflexive(U,V),agent(U,V,W)),tuple(true,true,true),a,b)
% 1.19/1.55 -> b
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 1
% 1.19/1.55 Current number of rules: 59
% 1.19/1.55 New rule produced :
% 1.19/1.55 [60]
% 1.19/1.55 ifeq4(of(U,W,X),true,ifeq4(of(U,V,X),true,ifeq4(forename(U,W),true,ifeq4(
% 1.19/1.55 forename(U,V),true,
% 1.19/1.55 ifeq4(
% 1.19/1.55 entity(U,X),true,W,V),V),V),V),V)
% 1.19/1.55 -> V
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.55 Current number of ordered equations: 0
% 1.19/1.55 Current number of rules: 60
% 1.19/1.55 New rule produced : [61] beverage(skc5,skc7) -> true
% 1.19/1.55 Current number of equations to process: 0
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 61
% 1.19/1.62 New rule produced : [62] eventuality(skc5,skc6) -> true
% 1.19/1.62 Current number of equations to process: 0
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 62
% 1.19/1.62 New rule produced : [63] human_person(skc5,skc9) -> true
% 1.19/1.62 Current number of equations to process: 0
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 63
% 1.19/1.62 New rule produced : [64] female(skc5,skc9) -> true
% 1.19/1.62 Current number of equations to process: 0
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 64
% 1.19/1.62 New rule produced : [65] relname(skc5,skc8) -> true
% 1.19/1.62 Current number of equations to process: 0
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 65
% 1.19/1.62 New rule produced : [66] ifeq3(act(skc5,skc6),true,true,true) -> true
% 1.19/1.62 Current number of equations to process: 0
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 66
% 1.19/1.62 New rule produced : [67] act(skc5,skc6) -> true
% 1.19/1.62 Rule [66] ifeq3(act(skc5,skc6),true,true,true) -> true collapsed.
% 1.19/1.62 Current number of equations to process: 0
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 66
% 1.19/1.62 New rule produced :
% 1.19/1.62 [68]
% 1.19/1.62 ifeq(tuple(patient(skc5,skc6,A),true,agent(skc5,skc6,A)),tuple(true,true,true),a,b)
% 1.19/1.62 -> b
% 1.19/1.62 Current number of equations to process: 0
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 67
% 1.19/1.62 New rule produced : [69] food(skc5,skc7) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 68
% 1.19/1.62 New rule produced : [70] thing(skc5,skc6) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 69
% 1.19/1.62 New rule produced : [71] specific(skc5,skc6) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 70
% 1.19/1.62 New rule produced : [72] nonexistent(skc5,skc6) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 71
% 1.19/1.62 New rule produced : [73] unisex(skc5,skc6) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 72
% 1.19/1.62 New rule produced : [74] organism(skc5,skc9) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 73
% 1.19/1.62 New rule produced : [75] human(skc5,skc9) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 74
% 1.19/1.62 New rule produced : [76] animate(skc5,skc9) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 75
% 1.19/1.62 New rule produced :
% 1.19/1.62 [77] ifeq2(tuple2(unisex(skc5,skc9),true),tuple2(true,true),a,b) -> b
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 76
% 1.19/1.62 New rule produced : [78] relation(skc5,skc8) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 77
% 1.19/1.62 New rule produced :
% 1.19/1.62 [79]
% 1.19/1.62 ifeq(tuple(true,true,agent(skc5,skc6,skc7)),tuple(true,true,true),a,b) -> b
% 1.19/1.62 Current number of equations to process: 3
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 78
% 1.19/1.62 New rule produced :
% 1.19/1.62 [80]
% 1.19/1.62 ifeq(tuple(patient(skc5,skc6,skc9),true,true),tuple(true,true,true),a,b) -> b
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 79
% 1.19/1.62 New rule produced : [81] substance_matter(skc5,skc7) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 80
% 1.19/1.62 New rule produced : [82] singleton(skc5,skc6) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 81
% 1.19/1.62 New rule produced : [83] ifeq3(abstraction(skc5,skc6),true,true,true) -> true
% 1.19/1.62 Current number of equations to process: 3
% 1.19/1.62 Current number of ordered equations: 0
% 1.19/1.62 Current number of rules: 82
% 1.19/1.62 New rule produced : [84] ifeq3(entity(skc5,skc6),true,true,true) -> true
% 1.19/1.62 Current number of equations to process: 2
% 1.19/1.62 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 83
% 1.41/1.71 New rule produced :
% 1.41/1.71 [85] ifeq2(tuple2(true,general(skc5,skc6)),tuple2(true,true),a,b) -> b
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 84
% 1.41/1.71 New rule produced :
% 1.41/1.71 [86] ifeq2(tuple2(true,existent(skc5,skc6)),tuple2(true,true),a,b) -> b
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 85
% 1.41/1.71 New rule produced : [87] ifeq3(object(skc5,skc6),true,true,true) -> true
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 86
% 1.41/1.71 New rule produced :
% 1.41/1.71 [88] ifeq2(tuple2(true,female(skc5,skc6)),tuple2(true,true),a,b) -> b
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 87
% 1.41/1.71 New rule produced : [89] entity(skc5,skc9) -> true
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 88
% 1.41/1.71 New rule produced : [90] impartial(skc5,skc9) -> true
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 89
% 1.41/1.71 New rule produced : [91] living(skc5,skc9) -> true
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 90
% 1.41/1.71 New rule produced :
% 1.41/1.71 [92] ifeq2(tuple2(nonhuman(skc5,skc9),true),tuple2(true,true),a,b) -> b
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 91
% 1.41/1.71 New rule produced :
% 1.41/1.71 [93] ifeq2(tuple2(nonliving(skc5,skc9),true),tuple2(true,true),a,b) -> b
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 92
% 1.41/1.71 New rule produced : [94] abstraction(skc5,skc8) -> true
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 93
% 1.41/1.71 New rule produced : [95] object(skc5,skc7) -> true
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 94
% 1.41/1.71 New rule produced : [96] thing(skc5,skc9) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 95
% 1.41/1.71 New rule produced : [97] specific(skc5,skc9) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 96
% 1.41/1.71 New rule produced : [98] existent(skc5,skc9) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 97
% 1.41/1.71 New rule produced : [99] ifeq3(object(skc5,skc9),true,true,true) -> true
% 1.41/1.71 Current number of equations to process: 2
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 98
% 1.41/1.71 New rule produced : [100] thing(skc5,skc8) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 99
% 1.41/1.71 New rule produced : [101] unisex(skc5,skc8) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 100
% 1.41/1.71 New rule produced : [102] nonhuman(skc5,skc8) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 101
% 1.41/1.71 New rule produced : [103] general(skc5,skc8) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 102
% 1.41/1.71 New rule produced : [104] unisex(skc5,skc7) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 103
% 1.41/1.71 New rule produced : [105] entity(skc5,skc7) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 104
% 1.41/1.71 New rule produced : [106] nonliving(skc5,skc7) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 105
% 1.41/1.71 New rule produced : [107] impartial(skc5,skc7) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.41/1.71 Current number of ordered equations: 0
% 1.41/1.71 Current number of rules: 106
% 1.41/1.71 New rule produced : [108] singleton(skc5,skc9) -> true
% 1.41/1.71 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 107
% 1.53/1.84 New rule produced :
% 1.53/1.84 [109] ifeq3(abstraction(skc5,skc9),true,true,true) -> true
% 1.53/1.84 Current number of equations to process: 4
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 108
% 1.53/1.84 New rule produced :
% 1.53/1.84 [110] ifeq3(eventuality(skc5,skc9),true,true,true) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 109
% 1.53/1.84 New rule produced :
% 1.53/1.84 [111] ifeq2(tuple2(true,general(skc5,skc9)),tuple2(true,true),a,b) -> b
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 110
% 1.53/1.84 New rule produced :
% 1.53/1.84 [112] ifeq2(tuple2(nonexistent(skc5,skc9),true),tuple2(true,true),a,b) -> b
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 111
% 1.53/1.84 New rule produced : [113] singleton(skc5,skc8) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 112
% 1.53/1.84 New rule produced : [114] ifeq3(entity(skc5,skc8),true,true,true) -> true
% 1.53/1.84 Current number of equations to process: 4
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 113
% 1.53/1.84 New rule produced :
% 1.53/1.84 [115] ifeq3(eventuality(skc5,skc8),true,true,true) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 114
% 1.53/1.84 New rule produced : [116] ifeq3(object(skc5,skc8),true,true,true) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 115
% 1.53/1.84 New rule produced :
% 1.53/1.84 [117] ifeq2(tuple2(true,female(skc5,skc8)),tuple2(true,true),a,b) -> b
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 116
% 1.53/1.84 New rule produced :
% 1.53/1.84 [118] ifeq2(tuple2(true,human(skc5,skc8)),tuple2(true,true),a,b) -> b
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 117
% 1.53/1.84 New rule produced :
% 1.53/1.84 [119] ifeq2(tuple2(specific(skc5,skc8),true),tuple2(true,true),a,b) -> b
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 118
% 1.53/1.84 New rule produced :
% 1.53/1.84 [120] ifeq3(abstraction(skc5,skc7),true,true,true) -> true
% 1.53/1.84 Current number of equations to process: 4
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 119
% 1.53/1.84 New rule produced :
% 1.53/1.84 [121] ifeq3(eventuality(skc5,skc7),true,true,true) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 120
% 1.53/1.84 New rule produced :
% 1.53/1.84 [122] ifeq2(tuple2(true,female(skc5,skc7)),tuple2(true,true),a,b) -> b
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 121
% 1.53/1.84 New rule produced : [123] thing(skc5,skc7) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 122
% 1.53/1.84 New rule produced : [124] specific(skc5,skc7) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 123
% 1.53/1.84 New rule produced : [125] existent(skc5,skc7) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 124
% 1.53/1.84 New rule produced : [126] ifeq3(organism(skc5,skc7),true,true,true) -> true
% 1.53/1.84 Current number of equations to process: 3
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 125
% 1.53/1.84 New rule produced :
% 1.53/1.84 [127] ifeq2(tuple2(true,living(skc5,skc7)),tuple2(true,true),a,b) -> b
% 1.53/1.84 Current number of equations to process: 5
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 126
% 1.53/1.84 New rule produced :
% 1.53/1.84 [128] ifeq2(tuple2(true,animate(skc5,skc7)),tuple2(true,true),a,b) -> b
% 1.53/1.84 Current number of equations to process: 4
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 127
% 1.53/1.84 New rule produced : [129] singleton(skc5,skc7) -> true
% 1.53/1.84 Current number of equations to process: 4
% 1.53/1.84 Current number of ordered equations: 0
% 1.53/1.84 Current number of rules: 128
% 1.53/1.84 New rule produced :
% 1.53/1.84 [130] ifeq2(tuple2(true,general(skc5,skc7)),tuple2(true,true),a,b) -> b
% 1.69/1.98 Current number of equations to process: 4
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 129
% 1.69/1.98 New rule produced :
% 1.69/1.98 [131] ifeq2(tuple2(nonexistent(skc5,skc7),true),tuple2(true,true),a,b) -> b
% 1.69/1.98 Current number of equations to process: 4
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 130
% 1.69/1.98 New rule produced :
% 1.69/1.98 [132]
% 1.69/1.98 ifeq4(of(skc5,A,B),true,ifeq4(of(skc5,skc8,B),true,ifeq4(forename(skc5,A),true,
% 1.69/1.98 ifeq4(entity(skc5,B),true,A,skc8),skc8),skc8),skc8)
% 1.69/1.98 -> skc8
% 1.69/1.98 Current number of equations to process: 2
% 1.69/1.98 Current number of ordered equations: 1
% 1.69/1.98 Current number of rules: 131
% 1.69/1.98 New rule produced :
% 1.69/1.98 [133]
% 1.69/1.98 ifeq4(of(skc5,skc8,A),true,ifeq4(of(skc5,B,A),true,ifeq4(forename(skc5,B),true,
% 1.69/1.98 ifeq4(entity(skc5,A),true,skc8,B),B),B),B)
% 1.69/1.98 -> B
% 1.69/1.98 Current number of equations to process: 2
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 132
% 1.69/1.98 New rule produced :
% 1.69/1.98 [134]
% 1.69/1.98 ifeq4(of(skc5,A,skc9),true,ifeq4(forename(skc5,A),true,A,skc8),skc8) -> skc8
% 1.69/1.98 Current number of equations to process: 3
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 133
% 1.69/1.98 New rule produced :
% 1.69/1.98 [135]
% 1.69/1.98 ifeq4(of(skc5,skc8,A),true,ifeq4(of(skc5,skc8,A),true,ifeq4(entity(skc5,A),true,skc8,skc8),skc8),skc8)
% 1.69/1.98 -> skc8
% 1.69/1.98 Current number of equations to process: 2
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 134
% 1.69/1.98 New rule produced :
% 1.69/1.98 [136]
% 1.69/1.98 ifeq4(of(skc5,A,skc9),true,ifeq4(of(skc5,B,skc9),true,ifeq4(forename(skc5,A),true,
% 1.69/1.98 ifeq4(forename(skc5,B),true,A,B),B),B),B)
% 1.69/1.98 -> B
% 1.69/1.98 Current number of equations to process: 1
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 135
% 1.69/1.98 New rule produced :
% 1.69/1.98 [137]
% 1.69/1.98 ifeq4(of(skc5,A,skc7),true,ifeq4(of(skc5,B,skc7),true,ifeq4(forename(skc5,A),true,
% 1.69/1.98 ifeq4(forename(skc5,B),true,A,B),B),B),B)
% 1.69/1.98 -> B
% 1.69/1.98 Current number of equations to process: 0
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 136
% 1.69/1.98 New rule produced :
% 1.69/1.98 [138]
% 1.69/1.98 ifeq4(of(skc5,A,skc7),true,ifeq4(of(skc5,skc8,skc7),true,ifeq4(forename(skc5,A),true,A,skc8),skc8),skc8)
% 1.69/1.98 -> skc8
% 1.69/1.98 Current number of equations to process: 0
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 137
% 1.69/1.98 New rule produced :
% 1.69/1.98 [139] ifeq4(of(skc5,A,skc9),true,ifeq4(forename(skc5,A),true,skc8,A),A) -> A
% 1.69/1.98 Current number of equations to process: 0
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 138
% 1.69/1.98 New rule produced :
% 1.69/1.98 [140]
% 1.69/1.98 ifeq4(of(skc5,skc8,skc7),true,ifeq4(of(skc5,A,skc7),true,ifeq4(forename(skc5,A),true,skc8,A),A),A)
% 1.69/1.98 -> A
% 1.69/1.98 Current number of equations to process: 0
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 139
% 1.69/1.98 New rule produced :
% 1.69/1.98 [141]
% 1.69/1.98 ifeq4(of(skc5,skc8,skc7),true,ifeq4(of(skc5,skc8,skc7),true,skc8,skc8),skc8)
% 1.69/1.98 -> skc8
% 1.69/1.98 Current number of equations to process: 0
% 1.69/1.98 Current number of ordered equations: 0
% 1.69/1.98 Current number of rules: 140
% 1.69/1.98 Warning: some conjectures remain
% 1.69/1.98
% 1.69/1.98 Execution time: 0.460000 sec
% 1.69/1.98 res : bool = false
% 1.69/1.98 time is now off
% 1.69/1.98
% 1.69/1.98 status : string = "satisfiable"
% 1.69/1.98 % SZS status Satisfiable
% 1.69/1.98 CiME interrupted
%------------------------------------------------------------------------------