TPTP Problem File: NLP248-1.p
View Solutions
- Solve Problem
%--------------------------------------------------------------------------
% File : NLP248-1 : TPTP v8.2.0. Released v2.4.0.
% Domain : Natural Language Processing
% Problem : Vincent believes that every man smokes, problem 29
% Version : [Bos00b] axioms.
% English : Eliminating inconsistent interpretations in the statement
% "Vincent believes that every man smokes. Jules is a man.
% Vincent believes that jules smokes."
% Refs : [Bos00a] Bos (2000), DORIS: Discourse Oriented Representation a
% [Bos00b] Bos (2000), Applied Theorem Proving - Natural Language
% Source : [TPTP]
% Names :
% Status : Satisfiable
% Rating : 0.00 v7.4.0, 0.09 v7.3.0, 0.00 v6.1.0, 0.11 v6.0.0, 0.00 v5.2.0, 0.10 v5.0.0, 0.11 v4.1.0, 0.14 v4.0.1, 0.20 v4.0.0, 0.00 v3.5.0, 0.33 v3.4.0, 0.25 v3.3.0, 0.00 v2.6.0, 0.14 v2.5.0, 0.00 v2.4.0
% Syntax : Number of clauses : 110 ( 35 unt; 0 nHn; 107 RR)
% Number of literals : 230 ( 3 equ; 124 neg)
% Maximal clause size : 9 ( 2 avg)
% Maximal term depth : 2 ( 1 avg)
% Number of predicates : 37 ( 36 usr; 0 prp; 1-4 aty)
% Number of functors : 14 ( 14 usr; 13 con; 0-1 aty)
% Number of variables : 196 ( 8 sgn)
% SPC : CNF_SAT_RFO_EQU_NUE
% Comments : Created from NLP248+1.p using FLOTTER
%--------------------------------------------------------------------------
cnf(clause1,axiom,
( ~ smoke(U,V)
| event(U,V) ) ).
cnf(clause2,axiom,
( ~ event(U,V)
| eventuality(U,V) ) ).
cnf(clause3,axiom,
( ~ eventuality(U,V)
| thing(U,V) ) ).
cnf(clause4,axiom,
( ~ thing(U,V)
| singleton(U,V) ) ).
cnf(clause5,axiom,
( ~ eventuality(U,V)
| specific(U,V) ) ).
cnf(clause6,axiom,
( ~ eventuality(U,V)
| nonexistent(U,V) ) ).
cnf(clause7,axiom,
( ~ eventuality(U,V)
| unisex(U,V) ) ).
cnf(clause8,axiom,
( ~ proposition(U,V)
| relation(U,V) ) ).
cnf(clause9,axiom,
( ~ relation(U,V)
| abstraction(U,V) ) ).
cnf(clause10,axiom,
( ~ abstraction(U,V)
| thing(U,V) ) ).
cnf(clause11,axiom,
( ~ abstraction(U,V)
| nonhuman(U,V) ) ).
cnf(clause12,axiom,
( ~ abstraction(U,V)
| general(U,V) ) ).
cnf(clause13,axiom,
( ~ abstraction(U,V)
| unisex(U,V) ) ).
cnf(clause14,axiom,
( ~ state(U,V)
| eventuality(U,V) ) ).
cnf(clause15,axiom,
( ~ state(U,V)
| event(U,V) ) ).
cnf(clause16,axiom,
( ~ man(U,V)
| human_person(U,V) ) ).
cnf(clause17,axiom,
( ~ human_person(U,V)
| organism(U,V) ) ).
cnf(clause18,axiom,
( ~ organism(U,V)
| entity(U,V) ) ).
cnf(clause19,axiom,
( ~ entity(U,V)
| thing(U,V) ) ).
cnf(clause20,axiom,
( ~ entity(U,V)
| specific(U,V) ) ).
cnf(clause21,axiom,
( ~ entity(U,V)
| existent(U,V) ) ).
cnf(clause22,axiom,
( ~ organism(U,V)
| impartial(U,V) ) ).
cnf(clause23,axiom,
( ~ organism(U,V)
| living(U,V) ) ).
cnf(clause24,axiom,
( ~ human_person(U,V)
| human(U,V) ) ).
cnf(clause25,axiom,
( ~ human_person(U,V)
| animate(U,V) ) ).
cnf(clause26,axiom,
( ~ man(U,V)
| male(U,V) ) ).
cnf(clause27,axiom,
( ~ forename(U,V)
| relname(U,V) ) ).
cnf(clause28,axiom,
( ~ relname(U,V)
| relation(U,V) ) ).
cnf(clause29,axiom,
( ~ vincent_forename(U,V)
| forename(U,V) ) ).
cnf(clause30,axiom,
( ~ jules_forename(U,V)
| forename(U,V) ) ).
cnf(clause31,axiom,
( ~ male(U,V)
| ~ unisex(U,V) ) ).
cnf(clause32,axiom,
( ~ general(U,V)
| ~ specific(U,V) ) ).
cnf(clause33,axiom,
( ~ human(U,V)
| ~ nonhuman(U,V) ) ).
cnf(clause34,axiom,
( ~ nonexistent(U,V)
| ~ existent(U,V) ) ).
cnf(clause35,axiom,
( ~ be(U,V,W,X)
| W = X ) ).
cnf(clause36,axiom,
( ~ accessible_world(U,V)
| ~ smoke(U,W)
| smoke(V,W) ) ).
cnf(clause37,axiom,
( ~ accessible_world(U,V)
| ~ event(U,W)
| event(V,W) ) ).
cnf(clause38,axiom,
( ~ accessible_world(U,V)
| ~ eventuality(U,W)
| eventuality(V,W) ) ).
cnf(clause39,axiom,
( ~ accessible_world(U,V)
| ~ thing(U,W)
| thing(V,W) ) ).
cnf(clause40,axiom,
( ~ accessible_world(U,V)
| ~ singleton(U,W)
| singleton(V,W) ) ).
cnf(clause41,axiom,
( ~ accessible_world(U,V)
| ~ specific(U,W)
| specific(V,W) ) ).
cnf(clause42,axiom,
( ~ accessible_world(U,V)
| ~ nonexistent(U,W)
| nonexistent(V,W) ) ).
cnf(clause43,axiom,
( ~ accessible_world(U,V)
| ~ unisex(U,W)
| unisex(V,W) ) ).
cnf(clause44,axiom,
( ~ accessible_world(U,V)
| ~ present(U,W)
| present(V,W) ) ).
cnf(clause45,axiom,
( ~ accessible_world(U,V)
| ~ think_believe_consider(U,W)
| think_believe_consider(V,W) ) ).
cnf(clause46,axiom,
( ~ accessible_world(U,V)
| ~ proposition(U,W)
| proposition(V,W) ) ).
cnf(clause47,axiom,
( ~ accessible_world(U,V)
| ~ relation(U,W)
| relation(V,W) ) ).
cnf(clause48,axiom,
( ~ accessible_world(U,V)
| ~ abstraction(U,W)
| abstraction(V,W) ) ).
cnf(clause49,axiom,
( ~ accessible_world(U,V)
| ~ nonhuman(U,W)
| nonhuman(V,W) ) ).
cnf(clause50,axiom,
( ~ accessible_world(U,V)
| ~ general(U,W)
| general(V,W) ) ).
cnf(clause51,axiom,
( ~ accessible_world(U,V)
| ~ state(U,W)
| state(V,W) ) ).
cnf(clause52,axiom,
( ~ accessible_world(U,V)
| ~ man(U,W)
| man(V,W) ) ).
cnf(clause53,axiom,
( ~ accessible_world(U,V)
| ~ human_person(U,W)
| human_person(V,W) ) ).
cnf(clause54,axiom,
( ~ accessible_world(U,V)
| ~ organism(U,W)
| organism(V,W) ) ).
cnf(clause55,axiom,
( ~ accessible_world(U,V)
| ~ entity(U,W)
| entity(V,W) ) ).
cnf(clause56,axiom,
( ~ accessible_world(U,V)
| ~ existent(U,W)
| existent(V,W) ) ).
cnf(clause57,axiom,
( ~ accessible_world(U,V)
| ~ impartial(U,W)
| impartial(V,W) ) ).
cnf(clause58,axiom,
( ~ accessible_world(U,V)
| ~ living(U,W)
| living(V,W) ) ).
cnf(clause59,axiom,
( ~ accessible_world(U,V)
| ~ human(U,W)
| human(V,W) ) ).
cnf(clause60,axiom,
( ~ accessible_world(U,V)
| ~ animate(U,W)
| animate(V,W) ) ).
cnf(clause61,axiom,
( ~ accessible_world(U,V)
| ~ male(U,W)
| male(V,W) ) ).
cnf(clause62,axiom,
( ~ accessible_world(U,V)
| ~ forename(U,W)
| forename(V,W) ) ).
cnf(clause63,axiom,
( ~ accessible_world(U,V)
| ~ relname(U,W)
| relname(V,W) ) ).
cnf(clause64,axiom,
( ~ accessible_world(U,V)
| ~ vincent_forename(U,W)
| vincent_forename(V,W) ) ).
cnf(clause65,axiom,
( ~ accessible_world(U,V)
| ~ jules_forename(U,W)
| jules_forename(V,W) ) ).
cnf(clause66,axiom,
( ~ accessible_world(U,V)
| ~ agent(U,W,X)
| agent(V,W,X) ) ).
cnf(clause67,axiom,
( ~ accessible_world(U,V)
| ~ theme(U,W,X)
| theme(V,W,X) ) ).
cnf(clause68,axiom,
( ~ accessible_world(U,V)
| ~ of(U,W,X)
| of(V,W,X) ) ).
cnf(clause69,axiom,
( ~ accessible_world(U,V)
| ~ be(U,W,X,Y)
| be(V,W,X,Y) ) ).
cnf(clause70,axiom,
( ~ forename(U,V)
| ~ of(U,W,X)
| ~ forename(U,W)
| ~ of(U,V,X)
| ~ entity(U,X)
| W = V ) ).
cnf(clause71,axiom,
( ~ proposition(U,V)
| ~ proposition(U,W)
| ~ theme(U,X,V)
| ~ think_believe_consider(U,X)
| ~ think_believe_consider(U,Y)
| ~ theme(U,Y,W)
| ~ agent(U,Y,Z)
| ~ agent(U,X,Z)
| V = W ) ).
cnf(clause72,negated_conjecture,
actual_world(skc13) ).
cnf(clause73,negated_conjecture,
event(skc14,skc26) ).
cnf(clause74,negated_conjecture,
jules_forename(skc13,skc24) ).
cnf(clause75,negated_conjecture,
forename(skc13,skc24) ).
cnf(clause76,negated_conjecture,
jules_forename(skc13,skc25) ).
cnf(clause77,negated_conjecture,
forename(skc13,skc25) ).
cnf(clause78,negated_conjecture,
present(skc14,skc26) ).
cnf(clause79,negated_conjecture,
smoke(skc14,skc26) ).
cnf(clause80,negated_conjecture,
man(skc13,skc23) ).
cnf(clause81,negated_conjecture,
forename(skc13,skc20) ).
cnf(clause82,negated_conjecture,
vincent_forename(skc13,skc20) ).
cnf(clause83,negated_conjecture,
man(skc13,skc19) ).
cnf(clause84,negated_conjecture,
forename(skc13,skc18) ).
cnf(clause85,negated_conjecture,
vincent_forename(skc13,skc18) ).
cnf(clause86,negated_conjecture,
event(skc13,skc17) ).
cnf(clause87,negated_conjecture,
present(skc13,skc17) ).
cnf(clause88,negated_conjecture,
think_believe_consider(skc13,skc17) ).
cnf(clause89,negated_conjecture,
think_believe_consider(skc13,skc15) ).
cnf(clause90,negated_conjecture,
present(skc13,skc15) ).
cnf(clause91,negated_conjecture,
event(skc13,skc15) ).
cnf(clause92,negated_conjecture,
accessible_world(skc13,skc16) ).
cnf(clause93,negated_conjecture,
proposition(skc13,skc16) ).
cnf(clause94,negated_conjecture,
proposition(skc13,skc14) ).
cnf(clause95,negated_conjecture,
accessible_world(skc13,skc14) ).
cnf(clause96,negated_conjecture,
state(skc13,skc22) ).
cnf(clause97,negated_conjecture,
of(skc13,skc25,skc23) ).
cnf(clause98,negated_conjecture,
of(skc13,skc24,skc23) ).
cnf(clause99,negated_conjecture,
agent(skc14,skc26,skc23) ).
cnf(clause100,negated_conjecture,
of(skc13,skc20,skc19) ).
cnf(clause101,negated_conjecture,
of(skc13,skc18,skc19) ).
cnf(clause102,negated_conjecture,
agent(skc13,skc17,skc19) ).
cnf(clause103,negated_conjecture,
agent(skc13,skc15,skc19) ).
cnf(clause104,negated_conjecture,
theme(skc13,skc17,skc16) ).
cnf(clause105,negated_conjecture,
theme(skc13,skc15,skc14) ).
cnf(clause106,negated_conjecture,
be(skc13,skc22,skc23,skc23) ).
cnf(clause107,negated_conjecture,
( ~ man(skc16,U)
| smoke(skc16,skf1(V)) ) ).
cnf(clause108,negated_conjecture,
( ~ man(skc16,U)
| present(skc16,skf1(V)) ) ).
cnf(clause109,negated_conjecture,
( ~ man(skc16,U)
| event(skc16,skf1(V)) ) ).
cnf(clause110,negated_conjecture,
( ~ man(skc16,U)
| agent(skc16,skf1(U),U) ) ).
%--------------------------------------------------------------------------