TPTP Problem File: ITP010

TPTP Problem File: ITP010_2.p

%------------------------------------------------------------------------------
% File     : ITP010_2 : TPTP v9.0.0. Bugfixed v7.5.0.
% Domain   : Interactive Theorem Proving
% Problem  : HOL4 set theory export of thm_2Ecardinal_2ECARD__NOT__LE.p, bushy mode
% Version  : [BG+19] axioms.
% English  :

% Refs     : [BG+19] Brown et al. (2019), GRUNGE: A Grand Unified ATP Chall
%          : [Gau19] Gauthier (2019), Email to Geoff Sutcliffe
% Source   : [BG+19]
% Names    : thm_2Ecardinal_2ECARD__NOT__LE.p [Gau19]
%          : HL404501_2.p [TPAP]

% Status   : Theorem
% Rating   : 0.00 v8.1.0, 0.09 v7.5.0
% Syntax   : Number of formulae    :   74 (  20 unt;  27 typ;   0 def)
%            Number of atoms       :  247 (  15 equ)
%            Maximal formula atoms :   15 (   3 avg)
%            Number of connectives :  140 (  29   ~;  14   |;  14   &)
%                                         (  34 <=>;  49  =>;   0  <=;   0 <~>)
%            Maximal formula depth :   11 (   4 avg)
%            Maximal term depth    :    3 (   1 avg)
%            Number of FOOLs       :   89 (  89 fml;   0 var)
%            Number of types       :    4 (   2 usr)
%            Number of type conns  :   23 (  15   >;   8   *;   0   +;   0  <<)
%            Number of predicates  :    8 (   5 usr;   3 prp; 0-2 aty)
%            Number of functors    :   23 (  23 usr;  10 con; 0-2 aty)
%            Number of variables   :   72 (  72   !;   0   ?;  72   :)
% SPC      : TF0_THM_EQU_NAR

% Comments :
% Bugfixes : v7.5.0 - Bugfixes in axioms and export.
%------------------------------------------------------------------------------
include('Axioms/ITP001/ITP001_2.ax').
%------------------------------------------------------------------------------
tff(stp_o,type,
    tp__o: $tType ).

tff(stp_inj_o,type,
    inj__o: tp__o > $i ).

tff(stp_surj_o,type,
    surj__o: $i > tp__o ).

tff(stp_inj_surj_o,axiom,
    ! [X: tp__o] : ( surj__o(inj__o(X)) = X ) ).

tff(stp_inj_mem_o,axiom,
    ! [X: tp__o] : mem(inj__o(X),bool) ).

tff(stp_iso_mem_o,axiom,
    ! [X: $i] :
      ( mem(X,bool)
     => ( X = inj__o(surj__o(X)) ) ) ).

tff(tp_c_2Ebool_2ET,type,
    c_2Ebool_2ET: $i ).

tff(mem_c_2Ebool_2ET,axiom,
    mem(c_2Ebool_2ET,bool) ).

tff(stp_fo_c_2Ebool_2ET,type,
    fo__c_2Ebool_2ET: tp__o ).

tff(stp_eq_fo_c_2Ebool_2ET,axiom,
    inj__o(fo__c_2Ebool_2ET) = c_2Ebool_2ET ).

tff(ax_true_p,axiom,
    p(c_2Ebool_2ET) ).

tff(tp_c_2Ecardinal_2Ecardleq,type,
    c_2Ecardinal_2Ecardleq: ( del * del ) > $i ).

tff(mem_c_2Ecardinal_2Ecardleq,axiom,
    ! [A_27a: del,A_27b: del] : mem(c_2Ecardinal_2Ecardleq(A_27a,A_27b),arr(arr(A_27a,bool),arr(arr(A_27b,bool),bool))) ).

tff(tp_c_2Ebool_2EF,type,
    c_2Ebool_2EF: $i ).

tff(mem_c_2Ebool_2EF,axiom,
    mem(c_2Ebool_2EF,bool) ).

tff(stp_fo_c_2Ebool_2EF,type,
    fo__c_2Ebool_2EF: tp__o ).

tff(stp_eq_fo_c_2Ebool_2EF,axiom,
    inj__o(fo__c_2Ebool_2EF) = c_2Ebool_2EF ).

tff(ax_false_p,axiom,
    ~ p(c_2Ebool_2EF) ).

tff(tp_c_2Emin_2E_3D_3D_3E,type,
    c_2Emin_2E_3D_3D_3E: $i ).

tff(mem_c_2Emin_2E_3D_3D_3E,axiom,
    mem(c_2Emin_2E_3D_3D_3E,arr(bool,arr(bool,bool))) ).

tff(stp_fo_c_2Emin_2E_3D_3D_3E,type,
    fo__c_2Emin_2E_3D_3D_3E: ( tp__o * tp__o ) > tp__o ).

tff(stp_eq_fo_c_2Emin_2E_3D_3D_3E,axiom,
    ! [X0: tp__o,X1: tp__o] : ( inj__o(fo__c_2Emin_2E_3D_3D_3E(X0,X1)) = ap(ap(c_2Emin_2E_3D_3D_3E,inj__o(X0)),inj__o(X1)) ) ).

tff(ax_imp_p,axiom,
    ! [Q: $i] :
      ( mem(Q,bool)
     => ! [R: $i] :
          ( mem(R,bool)
         => ( p(ap(ap(c_2Emin_2E_3D_3D_3E,Q),R))
          <=> ( p(Q)
             => p(R) ) ) ) ) ).

tff(tp_c_2Ebool_2E_5C_2F,type,
    c_2Ebool_2E_5C_2F: $i ).

tff(mem_c_2Ebool_2E_5C_2F,axiom,
    mem(c_2Ebool_2E_5C_2F,arr(bool,arr(bool,bool))) ).

tff(stp_fo_c_2Ebool_2E_5C_2F,type,
    fo__c_2Ebool_2E_5C_2F: ( tp__o * tp__o ) > tp__o ).

tff(stp_eq_fo_c_2Ebool_2E_5C_2F,axiom,
    ! [X0: tp__o,X1: tp__o] : ( inj__o(fo__c_2Ebool_2E_5C_2F(X0,X1)) = ap(ap(c_2Ebool_2E_5C_2F,inj__o(X0)),inj__o(X1)) ) ).

tff(ax_or_p,axiom,
    ! [Q: $i] :
      ( mem(Q,bool)
     => ! [R: $i] :
          ( mem(R,bool)
         => ( p(ap(ap(c_2Ebool_2E_5C_2F,Q),R))
          <=> ( p(Q)
              | p(R) ) ) ) ) ).

tff(tp_c_2Ebool_2E_2F_5C,type,
    c_2Ebool_2E_2F_5C: $i ).

tff(mem_c_2Ebool_2E_2F_5C,axiom,
    mem(c_2Ebool_2E_2F_5C,arr(bool,arr(bool,bool))) ).

tff(stp_fo_c_2Ebool_2E_2F_5C,type,
    fo__c_2Ebool_2E_2F_5C: ( tp__o * tp__o ) > tp__o ).

tff(stp_eq_fo_c_2Ebool_2E_2F_5C,axiom,
    ! [X0: tp__o,X1: tp__o] : ( inj__o(fo__c_2Ebool_2E_2F_5C(X0,X1)) = ap(ap(c_2Ebool_2E_2F_5C,inj__o(X0)),inj__o(X1)) ) ).

tff(ax_and_p,axiom,
    ! [Q: $i] :
      ( mem(Q,bool)
     => ! [R: $i] :
          ( mem(R,bool)
         => ( p(ap(ap(c_2Ebool_2E_2F_5C,Q),R))
          <=> ( p(Q)
              & p(R) ) ) ) ) ).

tff(tp_c_2Ebool_2E_7E,type,
    c_2Ebool_2E_7E: $i ).

tff(mem_c_2Ebool_2E_7E,axiom,
    mem(c_2Ebool_2E_7E,arr(bool,bool)) ).

tff(stp_fo_c_2Ebool_2E_7E,type,
    fo__c_2Ebool_2E_7E: tp__o > tp__o ).

tff(stp_eq_fo_c_2Ebool_2E_7E,axiom,
    ! [X0: tp__o] : ( inj__o(fo__c_2Ebool_2E_7E(X0)) = ap(c_2Ebool_2E_7E,inj__o(X0)) ) ).

tff(ax_neg_p,axiom,
    ! [Q: $i] :
      ( mem(Q,bool)
     => ( p(ap(c_2Ebool_2E_7E,Q))
      <=> ~ p(Q) ) ) ).

tff(tp_c_2Emin_2E_3D,type,
    c_2Emin_2E_3D: del > $i ).

tff(mem_c_2Emin_2E_3D,axiom,
    ! [A_27a: del] : mem(c_2Emin_2E_3D(A_27a),arr(A_27a,arr(A_27a,bool))) ).

tff(ax_eq_p,axiom,
    ! [A: del,X: $i] :
      ( mem(X,A)
     => ! [Y: $i] :
          ( mem(Y,A)
         => ( p(ap(ap(c_2Emin_2E_3D(A),X),Y))
          <=> ( X = Y ) ) ) ) ).

tff(tp_c_2Ebool_2E_21,type,
    c_2Ebool_2E_21: del > $i ).

tff(mem_c_2Ebool_2E_21,axiom,
    ! [A_27a: del] : mem(c_2Ebool_2E_21(A_27a),arr(arr(A_27a,bool),bool)) ).

tff(ax_all_p,axiom,
    ! [A: del,Q: $i] :
      ( mem(Q,arr(A,bool))
     => ( p(ap(c_2Ebool_2E_21(A),Q))
      <=> ! [X: $i] :
            ( mem(X,A)
           => p(ap(Q,X)) ) ) ) ).

tff(conj_thm_2Ebool_2ETRUTH,axiom,
    $true ).

tff(conj_thm_2Ebool_2EFALSITY,axiom,
    ! [V0t: tp__o] :
      ( $false
     => p(inj__o(V0t)) ) ).

tff(conj_thm_2Ebool_2EFORALL__SIMP,axiom,
    ! [A_27a: del,V0t: tp__o] :
      ( ! [V1x: $i] :
          ( mem(V1x,A_27a)
         => p(inj__o(V0t)) )
    <=> p(inj__o(V0t)) ) ).

tff(conj_thm_2Ebool_2EIMP__CLAUSES,axiom,
    ! [V0t: tp__o] :
      ( ( ( $true
         => p(inj__o(V0t)) )
      <=> p(inj__o(V0t)) )
      & ( ( p(inj__o(V0t))
         => $true )
      <=> $true )
      & ( ( $false
         => p(inj__o(V0t)) )
      <=> $true )
      & ( ( p(inj__o(V0t))
         => p(inj__o(V0t)) )
      <=> $true )
      & ( ( p(inj__o(V0t))
         => $false )
      <=> ~ p(inj__o(V0t)) ) ) ).

tff(conj_thm_2Ebool_2ENOT__CLAUSES,axiom,
    ( ! [V0t: tp__o] :
        ( ~ ~ p(inj__o(V0t))
      <=> p(inj__o(V0t)) )
    & ( ~ $true
    <=> $false )
    & ( ~ $false
    <=> $true ) ) ).

tff(conj_thm_2Ebool_2EREFL__CLAUSE,axiom,
    ! [A_27a: del,V0x: $i] :
      ( mem(V0x,A_27a)
     => ( ( V0x = V0x )
      <=> $true ) ) ).

tff(conj_thm_2Ebool_2EEQ__CLAUSES,axiom,
    ! [V0t: tp__o] :
      ( ( ( $true
        <=> p(inj__o(V0t)) )
      <=> p(inj__o(V0t)) )
      & ( ( p(inj__o(V0t))
        <=> $true )
      <=> p(inj__o(V0t)) )
      & ( ( $false
        <=> p(inj__o(V0t)) )
      <=> ~ p(inj__o(V0t)) )
      & ( ( p(inj__o(V0t))
        <=> $false )
      <=> ~ p(inj__o(V0t)) ) ) ).

tff(conj_thm_2Ecardinal_2ECARD__LE__TOTAL,axiom,
    ! [A_27a: del,A_27b: del,V0s: $i] :
      ( mem(V0s,arr(A_27a,bool))
     => ! [V1t: $i] :
          ( mem(V1t,arr(A_27b,bool))
         => ( p(ap(ap(c_2Ecardinal_2Ecardleq(A_27a,A_27b),V0s),V1t))
            | p(ap(ap(c_2Ecardinal_2Ecardleq(A_27b,A_27a),V1t),V0s)) ) ) ) ).

tff(conj_thm_2Esat_2ENOT__NOT,axiom,
    ! [V0t: tp__o] :
      ( ~ ~ p(inj__o(V0t))
    <=> p(inj__o(V0t)) ) ).

tff(conj_thm_2Esat_2EAND__INV__IMP,axiom,
    ! [V0A: tp__o] :
      ( p(inj__o(V0A))
     => ( ~ p(inj__o(V0A))
       => $false ) ) ).

tff(conj_thm_2Esat_2EOR__DUAL2,axiom,
    ! [V0A: tp__o,V1B: tp__o] :
      ( ( ~ ( p(inj__o(V0A))
            | p(inj__o(V1B)) )
       => $false )
    <=> ( ( p(inj__o(V0A))
         => $false )
       => ( ~ p(inj__o(V1B))
         => $false ) ) ) ).

tff(conj_thm_2Esat_2EOR__DUAL3,axiom,
    ! [V0A: tp__o,V1B: tp__o] :
      ( ( ~ ( ~ p(inj__o(V0A))
            | p(inj__o(V1B)) )
       => $false )
    <=> ( p(inj__o(V0A))
       => ( ~ p(inj__o(V1B))
         => $false ) ) ) ).

tff(conj_thm_2Esat_2EAND__INV2,axiom,
    ! [V0A: tp__o] :
      ( ( ~ p(inj__o(V0A))
       => $false )
     => ( ( p(inj__o(V0A))
         => $false )
       => $false ) ) ).

tff(conj_thm_2Esat_2Edc__eq,axiom,
    ! [V0p: tp__o,V1q: tp__o,V2r: tp__o] :
      ( ( p(inj__o(V0p))
      <=> ( p(inj__o(V1q))
        <=> p(inj__o(V2r)) ) )
    <=> ( ( p(inj__o(V0p))
          | p(inj__o(V1q))
          | p(inj__o(V2r)) )
        & ( p(inj__o(V0p))
          | ~ p(inj__o(V2r))
          | ~ p(inj__o(V1q)) )
        & ( p(inj__o(V1q))
          | ~ p(inj__o(V2r))
          | ~ p(inj__o(V0p)) )
        & ( p(inj__o(V2r))
          | ~ p(inj__o(V1q))
          | ~ p(inj__o(V0p)) ) ) ) ).

tff(conj_thm_2Esat_2Edc__neg,axiom,
    ! [V0p: tp__o,V1q: tp__o] :
      ( ( p(inj__o(V0p))
      <=> ~ p(inj__o(V1q)) )
    <=> ( ( p(inj__o(V0p))
          | p(inj__o(V1q)) )
        & ( ~ p(inj__o(V1q))
          | ~ p(inj__o(V0p)) ) ) ) ).

tff(conj_thm_2Ecardinal_2ECARD__NOT__LE,conjecture,
    ! [A_27a: del,A_27b: del,V0s: $i] :
      ( mem(V0s,arr(A_27a,bool))
     => ! [V1t: $i] :
          ( mem(V1t,arr(A_27b,bool))
         => ( ~ p(ap(ap(c_2Ecardinal_2Ecardleq(A_27a,A_27b),V0s),V1t))
          <=> ~ p(ap(ap(c_2Ecardinal_2Ecardleq(A_27a,A_27b),V0s),V1t)) ) ) ) ).

%------------------------------------------------------------------------------