TPTP Problem File: SWX116_1.p
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%------------------------------------------------------------------------------
% File : SWX000_1 : TPTP v9.1.0. Released v9.1.0.
% Domain : Software Verification
% Problem : Anthem problem formula_5_completed_definition_of_prime_1
% Version : Especial.
% English :
% Refs : [FL+20] Fandinno et al. (2020), Verifying Tight Logic Programs
% : [FH+23] Fandinno et al. (2023), External Behavior of a Logic P
% : [Han25] Hansen (2025), Email to Geoff Sutcliffe
% Source : [Han25]
% Names :
% Status : Theorem
% Rating : 1.00 v9.1.0
% Syntax : Number of formulae : 39 ( 4 unt; 18 typ; 0 def)
% Number of atoms : 117 ( 70 equ)
% Maximal formula atoms : 23 ( 5 avg)
% Number of connectives : 100 ( 4 ~; 4 |; 77 &)
% ( 13 <=>; 2 =>; 0 <=; 0 <~>)
% Maximal formula depth : 20 ( 7 avg)
% Maximal term depth : 3 ( 1 avg)
% Number arithmetic : 70 ( 16 atm; 6 fun; 8 num; 40 var)
% Number of types : 4 ( 2 usr; 1 ari)
% Number of type conns : 16 ( 12 >; 4 *; 0 +; 0 <<)
% Number of predicates : 13 ( 10 usr; 0 prp; 1-2 aty)
% Number of functors : 10 ( 6 usr; 6 con; 0-2 aty)
% Number of variables : 95 ( 31 !; 64 ?; 95 :)
% SPC : TF0_THM_EQU_ARI
% Comments :From https://github.com/ZachJHansen/anthem-benchmarks/tree/tptp
%------------------------------------------------------------------------------
include('Axioms/SWV014_0.ax').
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tff(predicate_0,type,
composite: general > $o ).
tff(predicate_1,type,
sqrtb: general > $o ).
tff(predicate_2,type,
composite_p: general > $o ).
tff(predicate_3,type,
prime: general > $o ).
tff(type_function_constant_0,type,
a_i: $int ).
tff(type_function_constant_1,type,
b_i: $int ).
tff(formula_0_unnamed_formula,axiom,
$greater(a_i,1) ).
tff(formula_1_completed_definition_of_composite_1,axiom,
! [V1_g: general] :
( composite(V1_g)
<=> ? [I_g: general,J_g: general] :
( ? [I1_i: $int,J1_i: $int] :
( ( V1_g = f__integer__($product(I1_i,J1_i)) )
& ( f__integer__(I1_i) = I_g )
& ( f__integer__(J1_i) = J_g ) )
& ? [Z_g: general,Z1_g: general] :
( ( Z_g = I_g )
& ? [I_i: $int,J_i: $int,K_i: $int] :
( ( I_i = 2 )
& ( J_i = b_i )
& ( Z1_g = f__integer__(K_i) )
& $lesseq(I_i,K_i)
& $lesseq(K_i,J_i) )
& ( Z_g = Z1_g ) )
& ? [Z_g: general,Z1_g: general] :
( ( Z_g = J_g )
& ? [I_i: $int,J_i: $int,K_i: $int] :
( ( I_i = 2 )
& ( J_i = b_i )
& ( Z1_g = f__integer__(K_i) )
& $lesseq(I_i,K_i)
& $lesseq(K_i,J_i) )
& ( Z_g = Z1_g ) ) ) ) ).
tff(formula_2_completed_definition_of_sqrtb_1,axiom,
! [V1_g: general] :
( sqrtb(V1_g)
<=> ? [M_g: general] :
( ( V1_g = M_g )
& ? [Z_g: general,Z1_g: general] :
( ( Z_g = M_g )
& ? [I_i: $int,J_i: $int,K_i: $int] :
( ( I_i = 1 )
& ( J_i = b_i )
& ( Z1_g = f__integer__(K_i) )
& $lesseq(I_i,K_i)
& $lesseq(K_i,J_i) )
& ( Z_g = Z1_g ) )
& ? [Z_g: general,Z1_g: general] :
( ? [I_i: $int,J_i: $int] :
( ( Z_g = f__integer__($product(I_i,J_i)) )
& ( f__integer__(I_i) = M_g )
& ( f__integer__(J_i) = M_g ) )
& ( Z1_g = f__integer__(b_i) )
& p__less_equal__(Z_g,Z1_g) )
& ? [Z_g: general,Z1_g: general] :
( ? [I_i: $int,J_i: $int] :
( ( Z_g = f__integer__($product(I_i,J_i)) )
& ? [I1_i: $int,J_i: $int] :
( ( I_i = $sum(I1_i,J_i) )
& ( f__integer__(I1_i) = M_g )
& ( J_i = 1 ) )
& ? [I_i: $int,J1_i: $int] :
( ( J_i = $sum(I_i,J1_i) )
& ( f__integer__(I_i) = M_g )
& ( J1_i = 1 ) ) )
& ( Z1_g = f__integer__(b_i) )
& p__greater__(Z_g,Z1_g) ) ) ) ).
tff(formula_3_completed_definition_of_composite_1,axiom,
! [V1_g: general] :
( composite_p(V1_g)
<=> ? [I_g: general,J_g: general,M_g: general] :
( ? [I1_i: $int,J1_i: $int] :
( ( V1_g = f__integer__($product(I1_i,J1_i)) )
& ( f__integer__(I1_i) = I_g )
& ( f__integer__(J1_i) = J_g ) )
& ? [Z_g: general] :
( ( Z_g = M_g )
& sqrtb(Z_g) )
& ? [Z_g: general,Z1_g: general] :
( ( Z_g = I_g )
& ? [I_i: $int,J_i: $int,K_i: $int] :
( ( I_i = 2 )
& ( f__integer__(J_i) = M_g )
& ( Z1_g = f__integer__(K_i) )
& $lesseq(I_i,K_i)
& $lesseq(K_i,J_i) )
& ( Z_g = Z1_g ) )
& ? [Z_g: general,Z1_g: general] :
( ( Z_g = J_g )
& ? [I_i: $int,J_i: $int,K_i: $int] :
( ( I_i = 2 )
& ( J_i = b_i )
& ( Z1_g = f__integer__(K_i) )
& $lesseq(I_i,K_i)
& $lesseq(K_i,J_i) )
& ( Z_g = Z1_g ) ) ) ) ).
tff(formula_4_completed_definition_of_prime_1,axiom,
! [V1_g: general] :
( prime(V1_g)
<=> ? [I_g: general] :
( ( V1_g = I_g )
& ? [Z_g: general,Z1_g: general] :
( ( Z_g = I_g )
& ? [I_i: $int,J_i: $int,K_i: $int] :
( ( I_i = a_i )
& ( J_i = b_i )
& ( Z1_g = f__integer__(K_i) )
& $lesseq(I_i,K_i)
& $lesseq(K_i,J_i) )
& ( Z_g = Z1_g ) )
& ? [Z_g: general] :
( ( Z_g = I_g )
& ~ composite(Z_g) ) ) ) ).
tff(formula_5_completed_definition_of_prime_1,conjecture,
! [V1_g: general] :
( prime(V1_g)
<=> ? [I_g: general] :
( ( V1_g = I_g )
& ? [Z_g: general,Z1_g: general] :
( ( Z_g = I_g )
& ? [I_i: $int,J_i: $int,K_i: $int] :
( ( I_i = a_i )
& ( J_i = b_i )
& ( Z1_g = f__integer__(K_i) )
& $lesseq(I_i,K_i)
& $lesseq(K_i,J_i) )
& ( Z_g = Z1_g ) )
& ? [Z_g: general] :
( ( Z_g = I_g )
& ~ composite_p(Z_g) ) ) ) ).
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