TSTP Solution File: LCL642+1.015 by iProver---3.8
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : iProver---3.8
% Problem : LCL642+1.015 : TPTP v8.1.2. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : run_iprover %s %d THM
% Computer : n010.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 07:45:21 EDT 2023
% Result : Theorem 6.80s 1.67s
% Output : CNFRefutation 6.80s
% Verified :
% SZS Type : Refutation
% Derivation depth : 19
% Number of leaves : 97
% Syntax : Number of formulae : 272 ( 6 unt; 0 def)
% Number of atoms : 8125 ( 0 equ)
% Maximal formula atoms : 753 ( 29 avg)
% Number of connectives : 11539 (3686 ~;5938 |;1867 &)
% ( 0 <=>; 48 =>; 0 <=; 0 <~>)
% Maximal formula depth : 45 ( 8 avg)
% Maximal term depth : 3 ( 1 avg)
% Number of predicates : 55 ( 54 usr; 2 prp; 0-2 aty)
% Number of functors : 48 ( 48 usr; 23 con; 0-1 aty)
% Number of variables : 2545 ( 0 sgn;1914 !; 535 ?)
% Comments :
%------------------------------------------------------------------------------
fof(f1,conjecture,
~ ? [X0] :
~ ( ~ ( ! [X1] :
( ~ ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) ) ) )
| ! [X1] :
( ( ( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1) )
& ( ~ ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) ) ) )
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ( ( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1) )
& ( ~ ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) ) ) )
| ~ r1(X0,X1) )
| ( ( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) ) ) ) ) )
| ~ ! [X1] :
( ~ ! [X0] :
( ~ p1(X0)
| ! [X1] :
( p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( p1(X1)
| ~ r1(X0,X1) )
| ~ ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ ! [X1] :
( ~ ! [X0] :
( ~ p3(X0)
| ! [X1] :
( p3(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p3(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( p3(X1)
| ~ r1(X0,X1) ) ),
file('/export/starexec/sandbox2/benchmark/theBenchmark.p',main) ).
fof(f2,negated_conjecture,
~ ~ ? [X0] :
~ ( ~ ( ! [X1] :
( ~ ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ! [X0] :
( ! [X1] :
( $false
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ! [X1] :
( ! [X0] :
( $false
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0)
| ~ r1(X1,X0) )
| p1(X1)
| p2(X1)
| p3(X1)
| p4(X1)
| ~ r1(X0,X1) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ ( ( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) ) ) )
| ! [X1] :
( ( ( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1) )
& ( ~ ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) ) ) )
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| ( ( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1) )
& ( ~ ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| ! [X0] :
( ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) ) ) )
| ~ r1(X0,X1) )
| ( ( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0) )
& ( ~ ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( ! [X0] :
( ~ ! [X1] :
( ~ p2(X1)
| ! [X0] :
( p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) )
| p2(X0)
| ~ r1(X1,X0) )
| ~ r1(X0,X1) ) ) ) ) )
| ~ ! [X1] :
( ~ ! [X0] :
( ~ p1(X0)
| ! [X1] :
( p1(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p1(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( p1(X1)
| ~ r1(X0,X1) )
| ~ ! [X1] :
( ~ ! [X0] :
( ~ p2(X0)
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p2(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( p2(X1)
| ~ r1(X0,X1) )
| ~ ! [X1] :
( ~ ! [X0] :
( ~ p3(X0)
| ! [X1] :
( p3(X1)
| ~ r1(X0,X1) )
| ~ r1(X1,X0) )
| p3(X1)
| ~ r1(X0,X1) )
| ! [X1] :
( p3(X1)
| ~ r1(X0,X1) ) ),
inference(negated_conjecture,[],[f1]) ).
fof(f3,plain,
~ ~ ? [X0] :
~ ( ~ ( ! [X1] :
( ~ ! [X2] :
( ~ ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
| p2(X2)
| ~ r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ~ ! [X5] :
( ~ ! [X6] :
( ~ ( ! [X7] :
( $false
| ~ r1(X6,X7) )
| p1(X6) )
| ! [X8] :
( ! [X9] :
( $false
| ~ r1(X8,X9) )
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
| ! [X10] :
( $false
| ~ r1(X5,X10) )
| p1(X5)
| ~ r1(X0,X5) )
| ! [X11] :
( $false
| ~ r1(X0,X11) )
| p1(X0) )
& ( ~ ! [X12] :
( ~ ! [X13] :
( ~ ( ! [X14] :
( $false
| ~ r1(X13,X14) )
| p1(X13)
| p2(X13) )
| ! [X15] :
( ! [X16] :
( $false
| ~ r1(X15,X16) )
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
| ! [X17] :
( $false
| ~ r1(X12,X17) )
| p1(X12)
| p2(X12)
| ~ r1(X0,X12) )
| ! [X18] :
( $false
| ~ r1(X0,X18) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X19] :
( ~ ! [X20] :
( ~ ( ! [X21] :
( $false
| ~ r1(X20,X21) )
| p1(X20)
| p2(X20)
| p3(X20) )
| ! [X22] :
( ! [X23] :
( $false
| ~ r1(X22,X23) )
| p1(X22)
| p2(X22)
| p3(X22)
| ~ r1(X20,X22) )
| ~ r1(X19,X20) )
| ! [X24] :
( $false
| ~ r1(X19,X24) )
| p1(X19)
| p2(X19)
| p3(X19)
| ~ r1(X0,X19) )
| ! [X25] :
( $false
| ~ r1(X0,X25) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X26] :
( ~ ! [X27] :
( ~ ( ! [X28] :
( $false
| ~ r1(X27,X28) )
| p1(X27)
| p2(X27)
| p3(X27)
| p4(X27) )
| ! [X29] :
( ! [X30] :
( $false
| ~ r1(X29,X30) )
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(X27,X29) )
| ~ r1(X26,X27) )
| ! [X31] :
( $false
| ~ r1(X26,X31) )
| p1(X26)
| p2(X26)
| p3(X26)
| p4(X26)
| ~ r1(X0,X26) )
| ! [X32] :
( $false
| ~ r1(X0,X32) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X33] :
( ~ ! [X34] :
( ~ ( ! [X35] :
( ! [X36] :
( $false
| ~ r1(X35,X36) )
| p1(X35)
| p2(X35)
| p3(X35)
| p4(X35)
| ~ r1(X34,X35) )
| p1(X34) )
| ! [X37] :
( ! [X38] :
( ! [X39] :
( $false
| ~ r1(X38,X39) )
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(X37,X38) )
| p1(X37)
| ~ r1(X34,X37) )
| ~ r1(X33,X34) )
| ! [X40] :
( ! [X41] :
( $false
| ~ r1(X40,X41) )
| p1(X40)
| p2(X40)
| p3(X40)
| p4(X40)
| ~ r1(X33,X40) )
| p1(X33)
| ~ r1(X0,X33) )
| ! [X42] :
( ! [X43] :
( $false
| ~ r1(X42,X43) )
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(X0,X42) )
| p1(X0) )
& ( ~ ! [X44] :
( ~ ! [X45] :
( ~ ( ! [X46] :
( ! [X47] :
( $false
| ~ r1(X46,X47) )
| p1(X46)
| p2(X46)
| p3(X46)
| p4(X46)
| ~ r1(X45,X46) )
| p1(X45)
| p2(X45) )
| ! [X48] :
( ! [X49] :
( ! [X50] :
( $false
| ~ r1(X49,X50) )
| p1(X49)
| p2(X49)
| p3(X49)
| p4(X49)
| ~ r1(X48,X49) )
| p1(X48)
| p2(X48)
| ~ r1(X45,X48) )
| ~ r1(X44,X45) )
| ! [X51] :
( ! [X52] :
( $false
| ~ r1(X51,X52) )
| p1(X51)
| p2(X51)
| p3(X51)
| p4(X51)
| ~ r1(X44,X51) )
| p1(X44)
| p2(X44)
| ~ r1(X0,X44) )
| ! [X53] :
( ! [X54] :
( $false
| ~ r1(X53,X54) )
| p1(X53)
| p2(X53)
| p3(X53)
| p4(X53)
| ~ r1(X0,X53) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X55] :
( ~ ! [X56] :
( ~ ( ! [X57] :
( ! [X58] :
( $false
| ~ r1(X57,X58) )
| p1(X57)
| p2(X57)
| p3(X57)
| p4(X57)
| ~ r1(X56,X57) )
| p1(X56)
| p2(X56)
| p3(X56) )
| ! [X59] :
( ! [X60] :
( ! [X61] :
( $false
| ~ r1(X60,X61) )
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| ~ r1(X56,X59) )
| ~ r1(X55,X56) )
| ! [X62] :
( ! [X63] :
( $false
| ~ r1(X62,X63) )
| p1(X62)
| p2(X62)
| p3(X62)
| p4(X62)
| ~ r1(X55,X62) )
| p1(X55)
| p2(X55)
| p3(X55)
| ~ r1(X0,X55) )
| ! [X64] :
( ! [X65] :
( $false
| ~ r1(X64,X65) )
| p1(X64)
| p2(X64)
| p3(X64)
| p4(X64)
| ~ r1(X0,X64) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X66] :
( ~ ! [X67] :
( ~ ( ! [X68] :
( ! [X69] :
( $false
| ~ r1(X68,X69) )
| p1(X68)
| p2(X68)
| p3(X68)
| p4(X68)
| ~ r1(X67,X68) )
| p1(X67)
| p2(X67)
| p3(X67)
| p4(X67) )
| ! [X70] :
( ! [X71] :
( ! [X72] :
( $false
| ~ r1(X71,X72) )
| p1(X71)
| p2(X71)
| p3(X71)
| p4(X71)
| ~ r1(X70,X71) )
| p1(X70)
| p2(X70)
| p3(X70)
| p4(X70)
| ~ r1(X67,X70) )
| ~ r1(X66,X67) )
| ! [X73] :
( ! [X74] :
( $false
| ~ r1(X73,X74) )
| p1(X73)
| p2(X73)
| p3(X73)
| p4(X73)
| ~ r1(X66,X73) )
| p1(X66)
| p2(X66)
| p3(X66)
| p4(X66)
| ~ r1(X0,X66) )
| ! [X75] :
( ! [X76] :
( $false
| ~ r1(X75,X76) )
| p1(X75)
| p2(X75)
| p3(X75)
| p4(X75)
| ~ r1(X0,X75) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X77] :
( ~ ! [X78] :
( ~ ( ! [X79] :
( ! [X80] :
( ! [X81] :
( $false
| ~ r1(X80,X81) )
| p1(X80)
| p2(X80)
| p3(X80)
| p4(X80)
| ~ r1(X79,X80) )
| p1(X79)
| p2(X79)
| p3(X79)
| p4(X79)
| ~ r1(X78,X79) )
| p1(X78) )
| ! [X82] :
( ! [X83] :
( ! [X84] :
( ! [X85] :
( $false
| ~ r1(X84,X85) )
| p1(X84)
| p2(X84)
| p3(X84)
| p4(X84)
| ~ r1(X83,X84) )
| p1(X83)
| p2(X83)
| p3(X83)
| p4(X83)
| ~ r1(X82,X83) )
| p1(X82)
| ~ r1(X78,X82) )
| ~ r1(X77,X78) )
| ! [X86] :
( ! [X87] :
( ! [X88] :
( $false
| ~ r1(X87,X88) )
| p1(X87)
| p2(X87)
| p3(X87)
| p4(X87)
| ~ r1(X86,X87) )
| p1(X86)
| p2(X86)
| p3(X86)
| p4(X86)
| ~ r1(X77,X86) )
| p1(X77)
| ~ r1(X0,X77) )
| ! [X89] :
( ! [X90] :
( ! [X91] :
( $false
| ~ r1(X90,X91) )
| p1(X90)
| p2(X90)
| p3(X90)
| p4(X90)
| ~ r1(X89,X90) )
| p1(X89)
| p2(X89)
| p3(X89)
| p4(X89)
| ~ r1(X0,X89) )
| p1(X0) )
& ( ~ ! [X92] :
( ~ ! [X93] :
( ~ ( ! [X94] :
( ! [X95] :
( ! [X96] :
( $false
| ~ r1(X95,X96) )
| p1(X95)
| p2(X95)
| p3(X95)
| p4(X95)
| ~ r1(X94,X95) )
| p1(X94)
| p2(X94)
| p3(X94)
| p4(X94)
| ~ r1(X93,X94) )
| p1(X93)
| p2(X93) )
| ! [X97] :
( ! [X98] :
( ! [X99] :
( ! [X100] :
( $false
| ~ r1(X99,X100) )
| p1(X99)
| p2(X99)
| p3(X99)
| p4(X99)
| ~ r1(X98,X99) )
| p1(X98)
| p2(X98)
| p3(X98)
| p4(X98)
| ~ r1(X97,X98) )
| p1(X97)
| p2(X97)
| ~ r1(X93,X97) )
| ~ r1(X92,X93) )
| ! [X101] :
( ! [X102] :
( ! [X103] :
( $false
| ~ r1(X102,X103) )
| p1(X102)
| p2(X102)
| p3(X102)
| p4(X102)
| ~ r1(X101,X102) )
| p1(X101)
| p2(X101)
| p3(X101)
| p4(X101)
| ~ r1(X92,X101) )
| p1(X92)
| p2(X92)
| ~ r1(X0,X92) )
| ! [X104] :
( ! [X105] :
( ! [X106] :
( $false
| ~ r1(X105,X106) )
| p1(X105)
| p2(X105)
| p3(X105)
| p4(X105)
| ~ r1(X104,X105) )
| p1(X104)
| p2(X104)
| p3(X104)
| p4(X104)
| ~ r1(X0,X104) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X107] :
( ~ ! [X108] :
( ~ ( ! [X109] :
( ! [X110] :
( ! [X111] :
( $false
| ~ r1(X110,X111) )
| p1(X110)
| p2(X110)
| p3(X110)
| p4(X110)
| ~ r1(X109,X110) )
| p1(X109)
| p2(X109)
| p3(X109)
| p4(X109)
| ~ r1(X108,X109) )
| p1(X108)
| p2(X108)
| p3(X108) )
| ! [X112] :
( ! [X113] :
( ! [X114] :
( ! [X115] :
( $false
| ~ r1(X114,X115) )
| p1(X114)
| p2(X114)
| p3(X114)
| p4(X114)
| ~ r1(X113,X114) )
| p1(X113)
| p2(X113)
| p3(X113)
| p4(X113)
| ~ r1(X112,X113) )
| p1(X112)
| p2(X112)
| p3(X112)
| ~ r1(X108,X112) )
| ~ r1(X107,X108) )
| ! [X116] :
( ! [X117] :
( ! [X118] :
( $false
| ~ r1(X117,X118) )
| p1(X117)
| p2(X117)
| p3(X117)
| p4(X117)
| ~ r1(X116,X117) )
| p1(X116)
| p2(X116)
| p3(X116)
| p4(X116)
| ~ r1(X107,X116) )
| p1(X107)
| p2(X107)
| p3(X107)
| ~ r1(X0,X107) )
| ! [X119] :
( ! [X120] :
( ! [X121] :
( $false
| ~ r1(X120,X121) )
| p1(X120)
| p2(X120)
| p3(X120)
| p4(X120)
| ~ r1(X119,X120) )
| p1(X119)
| p2(X119)
| p3(X119)
| p4(X119)
| ~ r1(X0,X119) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X122] :
( ~ ! [X123] :
( ~ ( ! [X124] :
( ! [X125] :
( ! [X126] :
( $false
| ~ r1(X125,X126) )
| p1(X125)
| p2(X125)
| p3(X125)
| p4(X125)
| ~ r1(X124,X125) )
| p1(X124)
| p2(X124)
| p3(X124)
| p4(X124)
| ~ r1(X123,X124) )
| p1(X123)
| p2(X123)
| p3(X123)
| p4(X123) )
| ! [X127] :
( ! [X128] :
( ! [X129] :
( ! [X130] :
( $false
| ~ r1(X129,X130) )
| p1(X129)
| p2(X129)
| p3(X129)
| p4(X129)
| ~ r1(X128,X129) )
| p1(X128)
| p2(X128)
| p3(X128)
| p4(X128)
| ~ r1(X127,X128) )
| p1(X127)
| p2(X127)
| p3(X127)
| p4(X127)
| ~ r1(X123,X127) )
| ~ r1(X122,X123) )
| ! [X131] :
( ! [X132] :
( ! [X133] :
( $false
| ~ r1(X132,X133) )
| p1(X132)
| p2(X132)
| p3(X132)
| p4(X132)
| ~ r1(X131,X132) )
| p1(X131)
| p2(X131)
| p3(X131)
| p4(X131)
| ~ r1(X122,X131) )
| p1(X122)
| p2(X122)
| p3(X122)
| p4(X122)
| ~ r1(X0,X122) )
| ! [X134] :
( ! [X135] :
( ! [X136] :
( $false
| ~ r1(X135,X136) )
| p1(X135)
| p2(X135)
| p3(X135)
| p4(X135)
| ~ r1(X134,X135) )
| p1(X134)
| p2(X134)
| p3(X134)
| p4(X134)
| ~ r1(X0,X134) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X137] :
( ~ ! [X138] :
( ~ ( ! [X139] :
( ! [X140] :
( ! [X141] :
( ! [X142] :
( $false
| ~ r1(X141,X142) )
| p1(X141)
| p2(X141)
| p3(X141)
| p4(X141)
| ~ r1(X140,X141) )
| p1(X140)
| p2(X140)
| p3(X140)
| p4(X140)
| ~ r1(X139,X140) )
| p1(X139)
| p2(X139)
| p3(X139)
| p4(X139)
| ~ r1(X138,X139) )
| p1(X138) )
| ! [X143] :
( ! [X144] :
( ! [X145] :
( ! [X146] :
( ! [X147] :
( $false
| ~ r1(X146,X147) )
| p1(X146)
| p2(X146)
| p3(X146)
| p4(X146)
| ~ r1(X145,X146) )
| p1(X145)
| p2(X145)
| p3(X145)
| p4(X145)
| ~ r1(X144,X145) )
| p1(X144)
| p2(X144)
| p3(X144)
| p4(X144)
| ~ r1(X143,X144) )
| p1(X143)
| ~ r1(X138,X143) )
| ~ r1(X137,X138) )
| ! [X148] :
( ! [X149] :
( ! [X150] :
( ! [X151] :
( $false
| ~ r1(X150,X151) )
| p1(X150)
| p2(X150)
| p3(X150)
| p4(X150)
| ~ r1(X149,X150) )
| p1(X149)
| p2(X149)
| p3(X149)
| p4(X149)
| ~ r1(X148,X149) )
| p1(X148)
| p2(X148)
| p3(X148)
| p4(X148)
| ~ r1(X137,X148) )
| p1(X137)
| ~ r1(X0,X137) )
| ! [X152] :
( ! [X153] :
( ! [X154] :
( ! [X155] :
( $false
| ~ r1(X154,X155) )
| p1(X154)
| p2(X154)
| p3(X154)
| p4(X154)
| ~ r1(X153,X154) )
| p1(X153)
| p2(X153)
| p3(X153)
| p4(X153)
| ~ r1(X152,X153) )
| p1(X152)
| p2(X152)
| p3(X152)
| p4(X152)
| ~ r1(X0,X152) )
| p1(X0) )
& ( ~ ! [X156] :
( ~ ! [X157] :
( ~ ( ! [X158] :
( ! [X159] :
( ! [X160] :
( ! [X161] :
( $false
| ~ r1(X160,X161) )
| p1(X160)
| p2(X160)
| p3(X160)
| p4(X160)
| ~ r1(X159,X160) )
| p1(X159)
| p2(X159)
| p3(X159)
| p4(X159)
| ~ r1(X158,X159) )
| p1(X158)
| p2(X158)
| p3(X158)
| p4(X158)
| ~ r1(X157,X158) )
| p1(X157)
| p2(X157) )
| ! [X162] :
( ! [X163] :
( ! [X164] :
( ! [X165] :
( ! [X166] :
( $false
| ~ r1(X165,X166) )
| p1(X165)
| p2(X165)
| p3(X165)
| p4(X165)
| ~ r1(X164,X165) )
| p1(X164)
| p2(X164)
| p3(X164)
| p4(X164)
| ~ r1(X163,X164) )
| p1(X163)
| p2(X163)
| p3(X163)
| p4(X163)
| ~ r1(X162,X163) )
| p1(X162)
| p2(X162)
| ~ r1(X157,X162) )
| ~ r1(X156,X157) )
| ! [X167] :
( ! [X168] :
( ! [X169] :
( ! [X170] :
( $false
| ~ r1(X169,X170) )
| p1(X169)
| p2(X169)
| p3(X169)
| p4(X169)
| ~ r1(X168,X169) )
| p1(X168)
| p2(X168)
| p3(X168)
| p4(X168)
| ~ r1(X167,X168) )
| p1(X167)
| p2(X167)
| p3(X167)
| p4(X167)
| ~ r1(X156,X167) )
| p1(X156)
| p2(X156)
| ~ r1(X0,X156) )
| ! [X171] :
( ! [X172] :
( ! [X173] :
( ! [X174] :
( $false
| ~ r1(X173,X174) )
| p1(X173)
| p2(X173)
| p3(X173)
| p4(X173)
| ~ r1(X172,X173) )
| p1(X172)
| p2(X172)
| p3(X172)
| p4(X172)
| ~ r1(X171,X172) )
| p1(X171)
| p2(X171)
| p3(X171)
| p4(X171)
| ~ r1(X0,X171) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X175] :
( ~ ! [X176] :
( ~ ( ( ~ ! [X177] :
( ~ p2(X177)
| ! [X178] :
( p2(X178)
| ~ r1(X177,X178) )
| ~ r1(X176,X177) )
| p2(X176) )
& ( ~ ! [X179] :
( ~ ! [X180] :
( ~ p2(X180)
| ! [X181] :
( p2(X181)
| ~ r1(X180,X181) )
| ~ r1(X179,X180) )
| p2(X179)
| ~ r1(X176,X179) )
| ! [X182] :
( ! [X183] :
( ~ ! [X184] :
( ~ p2(X184)
| ! [X185] :
( p2(X185)
| ~ r1(X184,X185) )
| ~ r1(X183,X184) )
| p2(X183)
| ~ r1(X182,X183) )
| ~ r1(X176,X182) ) ) )
| ! [X186] :
( ( ( ~ ! [X187] :
( ~ p2(X187)
| ! [X188] :
( p2(X188)
| ~ r1(X187,X188) )
| ~ r1(X186,X187) )
| p2(X186) )
& ( ~ ! [X189] :
( ~ ! [X190] :
( ~ p2(X190)
| ! [X191] :
( p2(X191)
| ~ r1(X190,X191) )
| ~ r1(X189,X190) )
| p2(X189)
| ~ r1(X186,X189) )
| ! [X192] :
( ! [X193] :
( ~ ! [X194] :
( ~ p2(X194)
| ! [X195] :
( p2(X195)
| ~ r1(X194,X195) )
| ~ r1(X193,X194) )
| p2(X193)
| ~ r1(X192,X193) )
| ~ r1(X186,X192) ) ) )
| ~ r1(X176,X186) )
| ~ r1(X175,X176) )
| ( ( ~ ! [X196] :
( ~ p2(X196)
| ! [X197] :
( p2(X197)
| ~ r1(X196,X197) )
| ~ r1(X175,X196) )
| p2(X175) )
& ( ~ ! [X198] :
( ~ ! [X199] :
( ~ p2(X199)
| ! [X200] :
( p2(X200)
| ~ r1(X199,X200) )
| ~ r1(X198,X199) )
| p2(X198)
| ~ r1(X175,X198) )
| ! [X201] :
( ! [X202] :
( ~ ! [X203] :
( ~ p2(X203)
| ! [X204] :
( p2(X204)
| ~ r1(X203,X204) )
| ~ r1(X202,X203) )
| p2(X202)
| ~ r1(X201,X202) )
| ~ r1(X175,X201) ) ) )
| ~ r1(X0,X175) )
| ( ( ~ ! [X205] :
( ~ p2(X205)
| ! [X206] :
( p2(X206)
| ~ r1(X205,X206) )
| ~ r1(X0,X205) )
| p2(X0) )
& ( ~ ! [X207] :
( ~ ! [X208] :
( ~ p2(X208)
| ! [X209] :
( p2(X209)
| ~ r1(X208,X209) )
| ~ r1(X207,X208) )
| p2(X207)
| ~ r1(X0,X207) )
| ! [X210] :
( ! [X211] :
( ~ ! [X212] :
( ~ p2(X212)
| ! [X213] :
( p2(X213)
| ~ r1(X212,X213) )
| ~ r1(X211,X212) )
| p2(X211)
| ~ r1(X210,X211) )
| ~ r1(X0,X210) ) ) ) ) )
| ~ ! [X214] :
( ~ ! [X215] :
( ~ p1(X215)
| ! [X216] :
( p1(X216)
| ~ r1(X215,X216) )
| ~ r1(X214,X215) )
| p1(X214)
| ~ r1(X0,X214) )
| ! [X217] :
( p1(X217)
| ~ r1(X0,X217) )
| ~ ! [X218] :
( ~ ! [X219] :
( ~ p2(X219)
| ! [X220] :
( p2(X220)
| ~ r1(X219,X220) )
| ~ r1(X218,X219) )
| p2(X218)
| ~ r1(X0,X218) )
| ! [X221] :
( p2(X221)
| ~ r1(X0,X221) )
| ~ ! [X222] :
( ~ ! [X223] :
( ~ p3(X223)
| ! [X224] :
( p3(X224)
| ~ r1(X223,X224) )
| ~ r1(X222,X223) )
| p3(X222)
| ~ r1(X0,X222) )
| ! [X225] :
( p3(X225)
| ~ r1(X0,X225) ) ),
inference(rectify,[],[f2]) ).
fof(f4,plain,
~ ~ ? [X0] :
~ ( ~ ( ! [X1] :
( ~ ! [X2] :
( ~ ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
| p2(X2)
| ~ r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ~ ! [X5] :
( ~ ! [X6] :
( ~ ( ! [X7] : ~ r1(X6,X7)
| p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
| ! [X10] : ~ r1(X5,X10)
| p1(X5)
| ~ r1(X0,X5) )
| ! [X11] : ~ r1(X0,X11)
| p1(X0) )
& ( ~ ! [X12] :
( ~ ! [X13] :
( ~ ( ! [X14] : ~ r1(X13,X14)
| p1(X13)
| p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
| ! [X17] : ~ r1(X12,X17)
| p1(X12)
| p2(X12)
| ~ r1(X0,X12) )
| ! [X18] : ~ r1(X0,X18)
| p1(X0)
| p2(X0) )
& ( ~ ! [X19] :
( ~ ! [X20] :
( ~ ( ! [X21] : ~ r1(X20,X21)
| p1(X20)
| p2(X20)
| p3(X20) )
| ! [X22] :
( ! [X23] : ~ r1(X22,X23)
| p1(X22)
| p2(X22)
| p3(X22)
| ~ r1(X20,X22) )
| ~ r1(X19,X20) )
| ! [X24] : ~ r1(X19,X24)
| p1(X19)
| p2(X19)
| p3(X19)
| ~ r1(X0,X19) )
| ! [X25] : ~ r1(X0,X25)
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X26] :
( ~ ! [X27] :
( ~ ( ! [X28] : ~ r1(X27,X28)
| p1(X27)
| p2(X27)
| p3(X27)
| p4(X27) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(X27,X29) )
| ~ r1(X26,X27) )
| ! [X31] : ~ r1(X26,X31)
| p1(X26)
| p2(X26)
| p3(X26)
| p4(X26)
| ~ r1(X0,X26) )
| ! [X32] : ~ r1(X0,X32)
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X33] :
( ~ ! [X34] :
( ~ ( ! [X35] :
( ! [X36] : ~ r1(X35,X36)
| p1(X35)
| p2(X35)
| p3(X35)
| p4(X35)
| ~ r1(X34,X35) )
| p1(X34) )
| ! [X37] :
( ! [X38] :
( ! [X39] : ~ r1(X38,X39)
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(X37,X38) )
| p1(X37)
| ~ r1(X34,X37) )
| ~ r1(X33,X34) )
| ! [X40] :
( ! [X41] : ~ r1(X40,X41)
| p1(X40)
| p2(X40)
| p3(X40)
| p4(X40)
| ~ r1(X33,X40) )
| p1(X33)
| ~ r1(X0,X33) )
| ! [X42] :
( ! [X43] : ~ r1(X42,X43)
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(X0,X42) )
| p1(X0) )
& ( ~ ! [X44] :
( ~ ! [X45] :
( ~ ( ! [X46] :
( ! [X47] : ~ r1(X46,X47)
| p1(X46)
| p2(X46)
| p3(X46)
| p4(X46)
| ~ r1(X45,X46) )
| p1(X45)
| p2(X45) )
| ! [X48] :
( ! [X49] :
( ! [X50] : ~ r1(X49,X50)
| p1(X49)
| p2(X49)
| p3(X49)
| p4(X49)
| ~ r1(X48,X49) )
| p1(X48)
| p2(X48)
| ~ r1(X45,X48) )
| ~ r1(X44,X45) )
| ! [X51] :
( ! [X52] : ~ r1(X51,X52)
| p1(X51)
| p2(X51)
| p3(X51)
| p4(X51)
| ~ r1(X44,X51) )
| p1(X44)
| p2(X44)
| ~ r1(X0,X44) )
| ! [X53] :
( ! [X54] : ~ r1(X53,X54)
| p1(X53)
| p2(X53)
| p3(X53)
| p4(X53)
| ~ r1(X0,X53) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X55] :
( ~ ! [X56] :
( ~ ( ! [X57] :
( ! [X58] : ~ r1(X57,X58)
| p1(X57)
| p2(X57)
| p3(X57)
| p4(X57)
| ~ r1(X56,X57) )
| p1(X56)
| p2(X56)
| p3(X56) )
| ! [X59] :
( ! [X60] :
( ! [X61] : ~ r1(X60,X61)
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| ~ r1(X56,X59) )
| ~ r1(X55,X56) )
| ! [X62] :
( ! [X63] : ~ r1(X62,X63)
| p1(X62)
| p2(X62)
| p3(X62)
| p4(X62)
| ~ r1(X55,X62) )
| p1(X55)
| p2(X55)
| p3(X55)
| ~ r1(X0,X55) )
| ! [X64] :
( ! [X65] : ~ r1(X64,X65)
| p1(X64)
| p2(X64)
| p3(X64)
| p4(X64)
| ~ r1(X0,X64) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X66] :
( ~ ! [X67] :
( ~ ( ! [X68] :
( ! [X69] : ~ r1(X68,X69)
| p1(X68)
| p2(X68)
| p3(X68)
| p4(X68)
| ~ r1(X67,X68) )
| p1(X67)
| p2(X67)
| p3(X67)
| p4(X67) )
| ! [X70] :
( ! [X71] :
( ! [X72] : ~ r1(X71,X72)
| p1(X71)
| p2(X71)
| p3(X71)
| p4(X71)
| ~ r1(X70,X71) )
| p1(X70)
| p2(X70)
| p3(X70)
| p4(X70)
| ~ r1(X67,X70) )
| ~ r1(X66,X67) )
| ! [X73] :
( ! [X74] : ~ r1(X73,X74)
| p1(X73)
| p2(X73)
| p3(X73)
| p4(X73)
| ~ r1(X66,X73) )
| p1(X66)
| p2(X66)
| p3(X66)
| p4(X66)
| ~ r1(X0,X66) )
| ! [X75] :
( ! [X76] : ~ r1(X75,X76)
| p1(X75)
| p2(X75)
| p3(X75)
| p4(X75)
| ~ r1(X0,X75) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X77] :
( ~ ! [X78] :
( ~ ( ! [X79] :
( ! [X80] :
( ! [X81] : ~ r1(X80,X81)
| p1(X80)
| p2(X80)
| p3(X80)
| p4(X80)
| ~ r1(X79,X80) )
| p1(X79)
| p2(X79)
| p3(X79)
| p4(X79)
| ~ r1(X78,X79) )
| p1(X78) )
| ! [X82] :
( ! [X83] :
( ! [X84] :
( ! [X85] : ~ r1(X84,X85)
| p1(X84)
| p2(X84)
| p3(X84)
| p4(X84)
| ~ r1(X83,X84) )
| p1(X83)
| p2(X83)
| p3(X83)
| p4(X83)
| ~ r1(X82,X83) )
| p1(X82)
| ~ r1(X78,X82) )
| ~ r1(X77,X78) )
| ! [X86] :
( ! [X87] :
( ! [X88] : ~ r1(X87,X88)
| p1(X87)
| p2(X87)
| p3(X87)
| p4(X87)
| ~ r1(X86,X87) )
| p1(X86)
| p2(X86)
| p3(X86)
| p4(X86)
| ~ r1(X77,X86) )
| p1(X77)
| ~ r1(X0,X77) )
| ! [X89] :
( ! [X90] :
( ! [X91] : ~ r1(X90,X91)
| p1(X90)
| p2(X90)
| p3(X90)
| p4(X90)
| ~ r1(X89,X90) )
| p1(X89)
| p2(X89)
| p3(X89)
| p4(X89)
| ~ r1(X0,X89) )
| p1(X0) )
& ( ~ ! [X92] :
( ~ ! [X93] :
( ~ ( ! [X94] :
( ! [X95] :
( ! [X96] : ~ r1(X95,X96)
| p1(X95)
| p2(X95)
| p3(X95)
| p4(X95)
| ~ r1(X94,X95) )
| p1(X94)
| p2(X94)
| p3(X94)
| p4(X94)
| ~ r1(X93,X94) )
| p1(X93)
| p2(X93) )
| ! [X97] :
( ! [X98] :
( ! [X99] :
( ! [X100] : ~ r1(X99,X100)
| p1(X99)
| p2(X99)
| p3(X99)
| p4(X99)
| ~ r1(X98,X99) )
| p1(X98)
| p2(X98)
| p3(X98)
| p4(X98)
| ~ r1(X97,X98) )
| p1(X97)
| p2(X97)
| ~ r1(X93,X97) )
| ~ r1(X92,X93) )
| ! [X101] :
( ! [X102] :
( ! [X103] : ~ r1(X102,X103)
| p1(X102)
| p2(X102)
| p3(X102)
| p4(X102)
| ~ r1(X101,X102) )
| p1(X101)
| p2(X101)
| p3(X101)
| p4(X101)
| ~ r1(X92,X101) )
| p1(X92)
| p2(X92)
| ~ r1(X0,X92) )
| ! [X104] :
( ! [X105] :
( ! [X106] : ~ r1(X105,X106)
| p1(X105)
| p2(X105)
| p3(X105)
| p4(X105)
| ~ r1(X104,X105) )
| p1(X104)
| p2(X104)
| p3(X104)
| p4(X104)
| ~ r1(X0,X104) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X107] :
( ~ ! [X108] :
( ~ ( ! [X109] :
( ! [X110] :
( ! [X111] : ~ r1(X110,X111)
| p1(X110)
| p2(X110)
| p3(X110)
| p4(X110)
| ~ r1(X109,X110) )
| p1(X109)
| p2(X109)
| p3(X109)
| p4(X109)
| ~ r1(X108,X109) )
| p1(X108)
| p2(X108)
| p3(X108) )
| ! [X112] :
( ! [X113] :
( ! [X114] :
( ! [X115] : ~ r1(X114,X115)
| p1(X114)
| p2(X114)
| p3(X114)
| p4(X114)
| ~ r1(X113,X114) )
| p1(X113)
| p2(X113)
| p3(X113)
| p4(X113)
| ~ r1(X112,X113) )
| p1(X112)
| p2(X112)
| p3(X112)
| ~ r1(X108,X112) )
| ~ r1(X107,X108) )
| ! [X116] :
( ! [X117] :
( ! [X118] : ~ r1(X117,X118)
| p1(X117)
| p2(X117)
| p3(X117)
| p4(X117)
| ~ r1(X116,X117) )
| p1(X116)
| p2(X116)
| p3(X116)
| p4(X116)
| ~ r1(X107,X116) )
| p1(X107)
| p2(X107)
| p3(X107)
| ~ r1(X0,X107) )
| ! [X119] :
( ! [X120] :
( ! [X121] : ~ r1(X120,X121)
| p1(X120)
| p2(X120)
| p3(X120)
| p4(X120)
| ~ r1(X119,X120) )
| p1(X119)
| p2(X119)
| p3(X119)
| p4(X119)
| ~ r1(X0,X119) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X122] :
( ~ ! [X123] :
( ~ ( ! [X124] :
( ! [X125] :
( ! [X126] : ~ r1(X125,X126)
| p1(X125)
| p2(X125)
| p3(X125)
| p4(X125)
| ~ r1(X124,X125) )
| p1(X124)
| p2(X124)
| p3(X124)
| p4(X124)
| ~ r1(X123,X124) )
| p1(X123)
| p2(X123)
| p3(X123)
| p4(X123) )
| ! [X127] :
( ! [X128] :
( ! [X129] :
( ! [X130] : ~ r1(X129,X130)
| p1(X129)
| p2(X129)
| p3(X129)
| p4(X129)
| ~ r1(X128,X129) )
| p1(X128)
| p2(X128)
| p3(X128)
| p4(X128)
| ~ r1(X127,X128) )
| p1(X127)
| p2(X127)
| p3(X127)
| p4(X127)
| ~ r1(X123,X127) )
| ~ r1(X122,X123) )
| ! [X131] :
( ! [X132] :
( ! [X133] : ~ r1(X132,X133)
| p1(X132)
| p2(X132)
| p3(X132)
| p4(X132)
| ~ r1(X131,X132) )
| p1(X131)
| p2(X131)
| p3(X131)
| p4(X131)
| ~ r1(X122,X131) )
| p1(X122)
| p2(X122)
| p3(X122)
| p4(X122)
| ~ r1(X0,X122) )
| ! [X134] :
( ! [X135] :
( ! [X136] : ~ r1(X135,X136)
| p1(X135)
| p2(X135)
| p3(X135)
| p4(X135)
| ~ r1(X134,X135) )
| p1(X134)
| p2(X134)
| p3(X134)
| p4(X134)
| ~ r1(X0,X134) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X137] :
( ~ ! [X138] :
( ~ ( ! [X139] :
( ! [X140] :
( ! [X141] :
( ! [X142] : ~ r1(X141,X142)
| p1(X141)
| p2(X141)
| p3(X141)
| p4(X141)
| ~ r1(X140,X141) )
| p1(X140)
| p2(X140)
| p3(X140)
| p4(X140)
| ~ r1(X139,X140) )
| p1(X139)
| p2(X139)
| p3(X139)
| p4(X139)
| ~ r1(X138,X139) )
| p1(X138) )
| ! [X143] :
( ! [X144] :
( ! [X145] :
( ! [X146] :
( ! [X147] : ~ r1(X146,X147)
| p1(X146)
| p2(X146)
| p3(X146)
| p4(X146)
| ~ r1(X145,X146) )
| p1(X145)
| p2(X145)
| p3(X145)
| p4(X145)
| ~ r1(X144,X145) )
| p1(X144)
| p2(X144)
| p3(X144)
| p4(X144)
| ~ r1(X143,X144) )
| p1(X143)
| ~ r1(X138,X143) )
| ~ r1(X137,X138) )
| ! [X148] :
( ! [X149] :
( ! [X150] :
( ! [X151] : ~ r1(X150,X151)
| p1(X150)
| p2(X150)
| p3(X150)
| p4(X150)
| ~ r1(X149,X150) )
| p1(X149)
| p2(X149)
| p3(X149)
| p4(X149)
| ~ r1(X148,X149) )
| p1(X148)
| p2(X148)
| p3(X148)
| p4(X148)
| ~ r1(X137,X148) )
| p1(X137)
| ~ r1(X0,X137) )
| ! [X152] :
( ! [X153] :
( ! [X154] :
( ! [X155] : ~ r1(X154,X155)
| p1(X154)
| p2(X154)
| p3(X154)
| p4(X154)
| ~ r1(X153,X154) )
| p1(X153)
| p2(X153)
| p3(X153)
| p4(X153)
| ~ r1(X152,X153) )
| p1(X152)
| p2(X152)
| p3(X152)
| p4(X152)
| ~ r1(X0,X152) )
| p1(X0) )
& ( ~ ! [X156] :
( ~ ! [X157] :
( ~ ( ! [X158] :
( ! [X159] :
( ! [X160] :
( ! [X161] : ~ r1(X160,X161)
| p1(X160)
| p2(X160)
| p3(X160)
| p4(X160)
| ~ r1(X159,X160) )
| p1(X159)
| p2(X159)
| p3(X159)
| p4(X159)
| ~ r1(X158,X159) )
| p1(X158)
| p2(X158)
| p3(X158)
| p4(X158)
| ~ r1(X157,X158) )
| p1(X157)
| p2(X157) )
| ! [X162] :
( ! [X163] :
( ! [X164] :
( ! [X165] :
( ! [X166] : ~ r1(X165,X166)
| p1(X165)
| p2(X165)
| p3(X165)
| p4(X165)
| ~ r1(X164,X165) )
| p1(X164)
| p2(X164)
| p3(X164)
| p4(X164)
| ~ r1(X163,X164) )
| p1(X163)
| p2(X163)
| p3(X163)
| p4(X163)
| ~ r1(X162,X163) )
| p1(X162)
| p2(X162)
| ~ r1(X157,X162) )
| ~ r1(X156,X157) )
| ! [X167] :
( ! [X168] :
( ! [X169] :
( ! [X170] : ~ r1(X169,X170)
| p1(X169)
| p2(X169)
| p3(X169)
| p4(X169)
| ~ r1(X168,X169) )
| p1(X168)
| p2(X168)
| p3(X168)
| p4(X168)
| ~ r1(X167,X168) )
| p1(X167)
| p2(X167)
| p3(X167)
| p4(X167)
| ~ r1(X156,X167) )
| p1(X156)
| p2(X156)
| ~ r1(X0,X156) )
| ! [X171] :
( ! [X172] :
( ! [X173] :
( ! [X174] : ~ r1(X173,X174)
| p1(X173)
| p2(X173)
| p3(X173)
| p4(X173)
| ~ r1(X172,X173) )
| p1(X172)
| p2(X172)
| p3(X172)
| p4(X172)
| ~ r1(X171,X172) )
| p1(X171)
| p2(X171)
| p3(X171)
| p4(X171)
| ~ r1(X0,X171) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X175] :
( ~ ! [X176] :
( ~ ( ( ~ ! [X177] :
( ~ p2(X177)
| ! [X178] :
( p2(X178)
| ~ r1(X177,X178) )
| ~ r1(X176,X177) )
| p2(X176) )
& ( ~ ! [X179] :
( ~ ! [X180] :
( ~ p2(X180)
| ! [X181] :
( p2(X181)
| ~ r1(X180,X181) )
| ~ r1(X179,X180) )
| p2(X179)
| ~ r1(X176,X179) )
| ! [X182] :
( ! [X183] :
( ~ ! [X184] :
( ~ p2(X184)
| ! [X185] :
( p2(X185)
| ~ r1(X184,X185) )
| ~ r1(X183,X184) )
| p2(X183)
| ~ r1(X182,X183) )
| ~ r1(X176,X182) ) ) )
| ! [X186] :
( ( ( ~ ! [X187] :
( ~ p2(X187)
| ! [X188] :
( p2(X188)
| ~ r1(X187,X188) )
| ~ r1(X186,X187) )
| p2(X186) )
& ( ~ ! [X189] :
( ~ ! [X190] :
( ~ p2(X190)
| ! [X191] :
( p2(X191)
| ~ r1(X190,X191) )
| ~ r1(X189,X190) )
| p2(X189)
| ~ r1(X186,X189) )
| ! [X192] :
( ! [X193] :
( ~ ! [X194] :
( ~ p2(X194)
| ! [X195] :
( p2(X195)
| ~ r1(X194,X195) )
| ~ r1(X193,X194) )
| p2(X193)
| ~ r1(X192,X193) )
| ~ r1(X186,X192) ) ) )
| ~ r1(X176,X186) )
| ~ r1(X175,X176) )
| ( ( ~ ! [X196] :
( ~ p2(X196)
| ! [X197] :
( p2(X197)
| ~ r1(X196,X197) )
| ~ r1(X175,X196) )
| p2(X175) )
& ( ~ ! [X198] :
( ~ ! [X199] :
( ~ p2(X199)
| ! [X200] :
( p2(X200)
| ~ r1(X199,X200) )
| ~ r1(X198,X199) )
| p2(X198)
| ~ r1(X175,X198) )
| ! [X201] :
( ! [X202] :
( ~ ! [X203] :
( ~ p2(X203)
| ! [X204] :
( p2(X204)
| ~ r1(X203,X204) )
| ~ r1(X202,X203) )
| p2(X202)
| ~ r1(X201,X202) )
| ~ r1(X175,X201) ) ) )
| ~ r1(X0,X175) )
| ( ( ~ ! [X205] :
( ~ p2(X205)
| ! [X206] :
( p2(X206)
| ~ r1(X205,X206) )
| ~ r1(X0,X205) )
| p2(X0) )
& ( ~ ! [X207] :
( ~ ! [X208] :
( ~ p2(X208)
| ! [X209] :
( p2(X209)
| ~ r1(X208,X209) )
| ~ r1(X207,X208) )
| p2(X207)
| ~ r1(X0,X207) )
| ! [X210] :
( ! [X211] :
( ~ ! [X212] :
( ~ p2(X212)
| ! [X213] :
( p2(X213)
| ~ r1(X212,X213) )
| ~ r1(X211,X212) )
| p2(X211)
| ~ r1(X210,X211) )
| ~ r1(X0,X210) ) ) ) ) )
| ~ ! [X214] :
( ~ ! [X215] :
( ~ p1(X215)
| ! [X216] :
( p1(X216)
| ~ r1(X215,X216) )
| ~ r1(X214,X215) )
| p1(X214)
| ~ r1(X0,X214) )
| ! [X217] :
( p1(X217)
| ~ r1(X0,X217) )
| ~ ! [X218] :
( ~ ! [X219] :
( ~ p2(X219)
| ! [X220] :
( p2(X220)
| ~ r1(X219,X220) )
| ~ r1(X218,X219) )
| p2(X218)
| ~ r1(X0,X218) )
| ! [X221] :
( p2(X221)
| ~ r1(X0,X221) )
| ~ ! [X222] :
( ~ ! [X223] :
( ~ p3(X223)
| ! [X224] :
( p3(X224)
| ~ r1(X223,X224) )
| ~ r1(X222,X223) )
| p3(X222)
| ~ r1(X0,X222) )
| ! [X225] :
( p3(X225)
| ~ r1(X0,X225) ) ),
inference(true_and_false_elimination,[],[f3]) ).
fof(f5,plain,
? [X0] :
~ ( ~ ( ! [X1] :
( ~ ! [X2] :
( ~ ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
| p2(X2)
| ~ r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ~ ! [X5] :
( ~ ! [X6] :
( ~ ( ! [X7] : ~ r1(X6,X7)
| p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
| ! [X10] : ~ r1(X5,X10)
| p1(X5)
| ~ r1(X0,X5) )
| ! [X11] : ~ r1(X0,X11)
| p1(X0) )
& ( ~ ! [X12] :
( ~ ! [X13] :
( ~ ( ! [X14] : ~ r1(X13,X14)
| p1(X13)
| p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
| ! [X17] : ~ r1(X12,X17)
| p1(X12)
| p2(X12)
| ~ r1(X0,X12) )
| ! [X18] : ~ r1(X0,X18)
| p1(X0)
| p2(X0) )
& ( ~ ! [X19] :
( ~ ! [X20] :
( ~ ( ! [X21] : ~ r1(X20,X21)
| p1(X20)
| p2(X20)
| p3(X20) )
| ! [X22] :
( ! [X23] : ~ r1(X22,X23)
| p1(X22)
| p2(X22)
| p3(X22)
| ~ r1(X20,X22) )
| ~ r1(X19,X20) )
| ! [X24] : ~ r1(X19,X24)
| p1(X19)
| p2(X19)
| p3(X19)
| ~ r1(X0,X19) )
| ! [X25] : ~ r1(X0,X25)
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X26] :
( ~ ! [X27] :
( ~ ( ! [X28] : ~ r1(X27,X28)
| p1(X27)
| p2(X27)
| p3(X27)
| p4(X27) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(X27,X29) )
| ~ r1(X26,X27) )
| ! [X31] : ~ r1(X26,X31)
| p1(X26)
| p2(X26)
| p3(X26)
| p4(X26)
| ~ r1(X0,X26) )
| ! [X32] : ~ r1(X0,X32)
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X33] :
( ~ ! [X34] :
( ~ ( ! [X35] :
( ! [X36] : ~ r1(X35,X36)
| p1(X35)
| p2(X35)
| p3(X35)
| p4(X35)
| ~ r1(X34,X35) )
| p1(X34) )
| ! [X37] :
( ! [X38] :
( ! [X39] : ~ r1(X38,X39)
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(X37,X38) )
| p1(X37)
| ~ r1(X34,X37) )
| ~ r1(X33,X34) )
| ! [X40] :
( ! [X41] : ~ r1(X40,X41)
| p1(X40)
| p2(X40)
| p3(X40)
| p4(X40)
| ~ r1(X33,X40) )
| p1(X33)
| ~ r1(X0,X33) )
| ! [X42] :
( ! [X43] : ~ r1(X42,X43)
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(X0,X42) )
| p1(X0) )
& ( ~ ! [X44] :
( ~ ! [X45] :
( ~ ( ! [X46] :
( ! [X47] : ~ r1(X46,X47)
| p1(X46)
| p2(X46)
| p3(X46)
| p4(X46)
| ~ r1(X45,X46) )
| p1(X45)
| p2(X45) )
| ! [X48] :
( ! [X49] :
( ! [X50] : ~ r1(X49,X50)
| p1(X49)
| p2(X49)
| p3(X49)
| p4(X49)
| ~ r1(X48,X49) )
| p1(X48)
| p2(X48)
| ~ r1(X45,X48) )
| ~ r1(X44,X45) )
| ! [X51] :
( ! [X52] : ~ r1(X51,X52)
| p1(X51)
| p2(X51)
| p3(X51)
| p4(X51)
| ~ r1(X44,X51) )
| p1(X44)
| p2(X44)
| ~ r1(X0,X44) )
| ! [X53] :
( ! [X54] : ~ r1(X53,X54)
| p1(X53)
| p2(X53)
| p3(X53)
| p4(X53)
| ~ r1(X0,X53) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X55] :
( ~ ! [X56] :
( ~ ( ! [X57] :
( ! [X58] : ~ r1(X57,X58)
| p1(X57)
| p2(X57)
| p3(X57)
| p4(X57)
| ~ r1(X56,X57) )
| p1(X56)
| p2(X56)
| p3(X56) )
| ! [X59] :
( ! [X60] :
( ! [X61] : ~ r1(X60,X61)
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| ~ r1(X56,X59) )
| ~ r1(X55,X56) )
| ! [X62] :
( ! [X63] : ~ r1(X62,X63)
| p1(X62)
| p2(X62)
| p3(X62)
| p4(X62)
| ~ r1(X55,X62) )
| p1(X55)
| p2(X55)
| p3(X55)
| ~ r1(X0,X55) )
| ! [X64] :
( ! [X65] : ~ r1(X64,X65)
| p1(X64)
| p2(X64)
| p3(X64)
| p4(X64)
| ~ r1(X0,X64) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X66] :
( ~ ! [X67] :
( ~ ( ! [X68] :
( ! [X69] : ~ r1(X68,X69)
| p1(X68)
| p2(X68)
| p3(X68)
| p4(X68)
| ~ r1(X67,X68) )
| p1(X67)
| p2(X67)
| p3(X67)
| p4(X67) )
| ! [X70] :
( ! [X71] :
( ! [X72] : ~ r1(X71,X72)
| p1(X71)
| p2(X71)
| p3(X71)
| p4(X71)
| ~ r1(X70,X71) )
| p1(X70)
| p2(X70)
| p3(X70)
| p4(X70)
| ~ r1(X67,X70) )
| ~ r1(X66,X67) )
| ! [X73] :
( ! [X74] : ~ r1(X73,X74)
| p1(X73)
| p2(X73)
| p3(X73)
| p4(X73)
| ~ r1(X66,X73) )
| p1(X66)
| p2(X66)
| p3(X66)
| p4(X66)
| ~ r1(X0,X66) )
| ! [X75] :
( ! [X76] : ~ r1(X75,X76)
| p1(X75)
| p2(X75)
| p3(X75)
| p4(X75)
| ~ r1(X0,X75) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X77] :
( ~ ! [X78] :
( ~ ( ! [X79] :
( ! [X80] :
( ! [X81] : ~ r1(X80,X81)
| p1(X80)
| p2(X80)
| p3(X80)
| p4(X80)
| ~ r1(X79,X80) )
| p1(X79)
| p2(X79)
| p3(X79)
| p4(X79)
| ~ r1(X78,X79) )
| p1(X78) )
| ! [X82] :
( ! [X83] :
( ! [X84] :
( ! [X85] : ~ r1(X84,X85)
| p1(X84)
| p2(X84)
| p3(X84)
| p4(X84)
| ~ r1(X83,X84) )
| p1(X83)
| p2(X83)
| p3(X83)
| p4(X83)
| ~ r1(X82,X83) )
| p1(X82)
| ~ r1(X78,X82) )
| ~ r1(X77,X78) )
| ! [X86] :
( ! [X87] :
( ! [X88] : ~ r1(X87,X88)
| p1(X87)
| p2(X87)
| p3(X87)
| p4(X87)
| ~ r1(X86,X87) )
| p1(X86)
| p2(X86)
| p3(X86)
| p4(X86)
| ~ r1(X77,X86) )
| p1(X77)
| ~ r1(X0,X77) )
| ! [X89] :
( ! [X90] :
( ! [X91] : ~ r1(X90,X91)
| p1(X90)
| p2(X90)
| p3(X90)
| p4(X90)
| ~ r1(X89,X90) )
| p1(X89)
| p2(X89)
| p3(X89)
| p4(X89)
| ~ r1(X0,X89) )
| p1(X0) )
& ( ~ ! [X92] :
( ~ ! [X93] :
( ~ ( ! [X94] :
( ! [X95] :
( ! [X96] : ~ r1(X95,X96)
| p1(X95)
| p2(X95)
| p3(X95)
| p4(X95)
| ~ r1(X94,X95) )
| p1(X94)
| p2(X94)
| p3(X94)
| p4(X94)
| ~ r1(X93,X94) )
| p1(X93)
| p2(X93) )
| ! [X97] :
( ! [X98] :
( ! [X99] :
( ! [X100] : ~ r1(X99,X100)
| p1(X99)
| p2(X99)
| p3(X99)
| p4(X99)
| ~ r1(X98,X99) )
| p1(X98)
| p2(X98)
| p3(X98)
| p4(X98)
| ~ r1(X97,X98) )
| p1(X97)
| p2(X97)
| ~ r1(X93,X97) )
| ~ r1(X92,X93) )
| ! [X101] :
( ! [X102] :
( ! [X103] : ~ r1(X102,X103)
| p1(X102)
| p2(X102)
| p3(X102)
| p4(X102)
| ~ r1(X101,X102) )
| p1(X101)
| p2(X101)
| p3(X101)
| p4(X101)
| ~ r1(X92,X101) )
| p1(X92)
| p2(X92)
| ~ r1(X0,X92) )
| ! [X104] :
( ! [X105] :
( ! [X106] : ~ r1(X105,X106)
| p1(X105)
| p2(X105)
| p3(X105)
| p4(X105)
| ~ r1(X104,X105) )
| p1(X104)
| p2(X104)
| p3(X104)
| p4(X104)
| ~ r1(X0,X104) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X107] :
( ~ ! [X108] :
( ~ ( ! [X109] :
( ! [X110] :
( ! [X111] : ~ r1(X110,X111)
| p1(X110)
| p2(X110)
| p3(X110)
| p4(X110)
| ~ r1(X109,X110) )
| p1(X109)
| p2(X109)
| p3(X109)
| p4(X109)
| ~ r1(X108,X109) )
| p1(X108)
| p2(X108)
| p3(X108) )
| ! [X112] :
( ! [X113] :
( ! [X114] :
( ! [X115] : ~ r1(X114,X115)
| p1(X114)
| p2(X114)
| p3(X114)
| p4(X114)
| ~ r1(X113,X114) )
| p1(X113)
| p2(X113)
| p3(X113)
| p4(X113)
| ~ r1(X112,X113) )
| p1(X112)
| p2(X112)
| p3(X112)
| ~ r1(X108,X112) )
| ~ r1(X107,X108) )
| ! [X116] :
( ! [X117] :
( ! [X118] : ~ r1(X117,X118)
| p1(X117)
| p2(X117)
| p3(X117)
| p4(X117)
| ~ r1(X116,X117) )
| p1(X116)
| p2(X116)
| p3(X116)
| p4(X116)
| ~ r1(X107,X116) )
| p1(X107)
| p2(X107)
| p3(X107)
| ~ r1(X0,X107) )
| ! [X119] :
( ! [X120] :
( ! [X121] : ~ r1(X120,X121)
| p1(X120)
| p2(X120)
| p3(X120)
| p4(X120)
| ~ r1(X119,X120) )
| p1(X119)
| p2(X119)
| p3(X119)
| p4(X119)
| ~ r1(X0,X119) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ~ ! [X122] :
( ~ ! [X123] :
( ~ ( ! [X124] :
( ! [X125] :
( ! [X126] : ~ r1(X125,X126)
| p1(X125)
| p2(X125)
| p3(X125)
| p4(X125)
| ~ r1(X124,X125) )
| p1(X124)
| p2(X124)
| p3(X124)
| p4(X124)
| ~ r1(X123,X124) )
| p1(X123)
| p2(X123)
| p3(X123)
| p4(X123) )
| ! [X127] :
( ! [X128] :
( ! [X129] :
( ! [X130] : ~ r1(X129,X130)
| p1(X129)
| p2(X129)
| p3(X129)
| p4(X129)
| ~ r1(X128,X129) )
| p1(X128)
| p2(X128)
| p3(X128)
| p4(X128)
| ~ r1(X127,X128) )
| p1(X127)
| p2(X127)
| p3(X127)
| p4(X127)
| ~ r1(X123,X127) )
| ~ r1(X122,X123) )
| ! [X131] :
( ! [X132] :
( ! [X133] : ~ r1(X132,X133)
| p1(X132)
| p2(X132)
| p3(X132)
| p4(X132)
| ~ r1(X131,X132) )
| p1(X131)
| p2(X131)
| p3(X131)
| p4(X131)
| ~ r1(X122,X131) )
| p1(X122)
| p2(X122)
| p3(X122)
| p4(X122)
| ~ r1(X0,X122) )
| ! [X134] :
( ! [X135] :
( ! [X136] : ~ r1(X135,X136)
| p1(X135)
| p2(X135)
| p3(X135)
| p4(X135)
| ~ r1(X134,X135) )
| p1(X134)
| p2(X134)
| p3(X134)
| p4(X134)
| ~ r1(X0,X134) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ~ ! [X137] :
( ~ ! [X138] :
( ~ ( ! [X139] :
( ! [X140] :
( ! [X141] :
( ! [X142] : ~ r1(X141,X142)
| p1(X141)
| p2(X141)
| p3(X141)
| p4(X141)
| ~ r1(X140,X141) )
| p1(X140)
| p2(X140)
| p3(X140)
| p4(X140)
| ~ r1(X139,X140) )
| p1(X139)
| p2(X139)
| p3(X139)
| p4(X139)
| ~ r1(X138,X139) )
| p1(X138) )
| ! [X143] :
( ! [X144] :
( ! [X145] :
( ! [X146] :
( ! [X147] : ~ r1(X146,X147)
| p1(X146)
| p2(X146)
| p3(X146)
| p4(X146)
| ~ r1(X145,X146) )
| p1(X145)
| p2(X145)
| p3(X145)
| p4(X145)
| ~ r1(X144,X145) )
| p1(X144)
| p2(X144)
| p3(X144)
| p4(X144)
| ~ r1(X143,X144) )
| p1(X143)
| ~ r1(X138,X143) )
| ~ r1(X137,X138) )
| ! [X148] :
( ! [X149] :
( ! [X150] :
( ! [X151] : ~ r1(X150,X151)
| p1(X150)
| p2(X150)
| p3(X150)
| p4(X150)
| ~ r1(X149,X150) )
| p1(X149)
| p2(X149)
| p3(X149)
| p4(X149)
| ~ r1(X148,X149) )
| p1(X148)
| p2(X148)
| p3(X148)
| p4(X148)
| ~ r1(X137,X148) )
| p1(X137)
| ~ r1(X0,X137) )
| ! [X152] :
( ! [X153] :
( ! [X154] :
( ! [X155] : ~ r1(X154,X155)
| p1(X154)
| p2(X154)
| p3(X154)
| p4(X154)
| ~ r1(X153,X154) )
| p1(X153)
| p2(X153)
| p3(X153)
| p4(X153)
| ~ r1(X152,X153) )
| p1(X152)
| p2(X152)
| p3(X152)
| p4(X152)
| ~ r1(X0,X152) )
| p1(X0) )
& ( ~ ! [X156] :
( ~ ! [X157] :
( ~ ( ! [X158] :
( ! [X159] :
( ! [X160] :
( ! [X161] : ~ r1(X160,X161)
| p1(X160)
| p2(X160)
| p3(X160)
| p4(X160)
| ~ r1(X159,X160) )
| p1(X159)
| p2(X159)
| p3(X159)
| p4(X159)
| ~ r1(X158,X159) )
| p1(X158)
| p2(X158)
| p3(X158)
| p4(X158)
| ~ r1(X157,X158) )
| p1(X157)
| p2(X157) )
| ! [X162] :
( ! [X163] :
( ! [X164] :
( ! [X165] :
( ! [X166] : ~ r1(X165,X166)
| p1(X165)
| p2(X165)
| p3(X165)
| p4(X165)
| ~ r1(X164,X165) )
| p1(X164)
| p2(X164)
| p3(X164)
| p4(X164)
| ~ r1(X163,X164) )
| p1(X163)
| p2(X163)
| p3(X163)
| p4(X163)
| ~ r1(X162,X163) )
| p1(X162)
| p2(X162)
| ~ r1(X157,X162) )
| ~ r1(X156,X157) )
| ! [X167] :
( ! [X168] :
( ! [X169] :
( ! [X170] : ~ r1(X169,X170)
| p1(X169)
| p2(X169)
| p3(X169)
| p4(X169)
| ~ r1(X168,X169) )
| p1(X168)
| p2(X168)
| p3(X168)
| p4(X168)
| ~ r1(X167,X168) )
| p1(X167)
| p2(X167)
| p3(X167)
| p4(X167)
| ~ r1(X156,X167) )
| p1(X156)
| p2(X156)
| ~ r1(X0,X156) )
| ! [X171] :
( ! [X172] :
( ! [X173] :
( ! [X174] : ~ r1(X173,X174)
| p1(X173)
| p2(X173)
| p3(X173)
| p4(X173)
| ~ r1(X172,X173) )
| p1(X172)
| p2(X172)
| p3(X172)
| p4(X172)
| ~ r1(X171,X172) )
| p1(X171)
| p2(X171)
| p3(X171)
| p4(X171)
| ~ r1(X0,X171) )
| p1(X0)
| p2(X0) )
& ( ~ ! [X175] :
( ~ ! [X176] :
( ~ ( ( ~ ! [X177] :
( ~ p2(X177)
| ! [X178] :
( p2(X178)
| ~ r1(X177,X178) )
| ~ r1(X176,X177) )
| p2(X176) )
& ( ~ ! [X179] :
( ~ ! [X180] :
( ~ p2(X180)
| ! [X181] :
( p2(X181)
| ~ r1(X180,X181) )
| ~ r1(X179,X180) )
| p2(X179)
| ~ r1(X176,X179) )
| ! [X182] :
( ! [X183] :
( ~ ! [X184] :
( ~ p2(X184)
| ! [X185] :
( p2(X185)
| ~ r1(X184,X185) )
| ~ r1(X183,X184) )
| p2(X183)
| ~ r1(X182,X183) )
| ~ r1(X176,X182) ) ) )
| ! [X186] :
( ( ( ~ ! [X187] :
( ~ p2(X187)
| ! [X188] :
( p2(X188)
| ~ r1(X187,X188) )
| ~ r1(X186,X187) )
| p2(X186) )
& ( ~ ! [X189] :
( ~ ! [X190] :
( ~ p2(X190)
| ! [X191] :
( p2(X191)
| ~ r1(X190,X191) )
| ~ r1(X189,X190) )
| p2(X189)
| ~ r1(X186,X189) )
| ! [X192] :
( ! [X193] :
( ~ ! [X194] :
( ~ p2(X194)
| ! [X195] :
( p2(X195)
| ~ r1(X194,X195) )
| ~ r1(X193,X194) )
| p2(X193)
| ~ r1(X192,X193) )
| ~ r1(X186,X192) ) ) )
| ~ r1(X176,X186) )
| ~ r1(X175,X176) )
| ( ( ~ ! [X196] :
( ~ p2(X196)
| ! [X197] :
( p2(X197)
| ~ r1(X196,X197) )
| ~ r1(X175,X196) )
| p2(X175) )
& ( ~ ! [X198] :
( ~ ! [X199] :
( ~ p2(X199)
| ! [X200] :
( p2(X200)
| ~ r1(X199,X200) )
| ~ r1(X198,X199) )
| p2(X198)
| ~ r1(X175,X198) )
| ! [X201] :
( ! [X202] :
( ~ ! [X203] :
( ~ p2(X203)
| ! [X204] :
( p2(X204)
| ~ r1(X203,X204) )
| ~ r1(X202,X203) )
| p2(X202)
| ~ r1(X201,X202) )
| ~ r1(X175,X201) ) ) )
| ~ r1(X0,X175) )
| ( ( ~ ! [X205] :
( ~ p2(X205)
| ! [X206] :
( p2(X206)
| ~ r1(X205,X206) )
| ~ r1(X0,X205) )
| p2(X0) )
& ( ~ ! [X207] :
( ~ ! [X208] :
( ~ p2(X208)
| ! [X209] :
( p2(X209)
| ~ r1(X208,X209) )
| ~ r1(X207,X208) )
| p2(X207)
| ~ r1(X0,X207) )
| ! [X210] :
( ! [X211] :
( ~ ! [X212] :
( ~ p2(X212)
| ! [X213] :
( p2(X213)
| ~ r1(X212,X213) )
| ~ r1(X211,X212) )
| p2(X211)
| ~ r1(X210,X211) )
| ~ r1(X0,X210) ) ) ) ) )
| ~ ! [X214] :
( ~ ! [X215] :
( ~ p1(X215)
| ! [X216] :
( p1(X216)
| ~ r1(X215,X216) )
| ~ r1(X214,X215) )
| p1(X214)
| ~ r1(X0,X214) )
| ! [X217] :
( p1(X217)
| ~ r1(X0,X217) )
| ~ ! [X218] :
( ~ ! [X219] :
( ~ p2(X219)
| ! [X220] :
( p2(X220)
| ~ r1(X219,X220) )
| ~ r1(X218,X219) )
| p2(X218)
| ~ r1(X0,X218) )
| ! [X221] :
( p2(X221)
| ~ r1(X0,X221) )
| ~ ! [X222] :
( ~ ! [X223] :
( ~ p3(X223)
| ! [X224] :
( p3(X224)
| ~ r1(X223,X224) )
| ~ r1(X222,X223) )
| p3(X222)
| ~ r1(X0,X222) )
| ! [X225] :
( p3(X225)
| ~ r1(X0,X225) ) ),
inference(flattening,[],[f4]) ).
fof(f6,plain,
? [X0] :
( ! [X1] :
( ? [X2] :
( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
& ~ p2(X2)
& r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ? [X5] :
( ! [X6] :
( ( ? [X7] : r1(X6,X7)
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
& ? [X10] : r1(X5,X10)
& ~ p1(X5)
& r1(X0,X5) )
| ! [X11] : ~ r1(X0,X11)
| p1(X0) )
& ( ? [X12] :
( ! [X13] :
( ( ? [X14] : r1(X13,X14)
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
& ? [X17] : r1(X12,X17)
& ~ p1(X12)
& ~ p2(X12)
& r1(X0,X12) )
| ! [X18] : ~ r1(X0,X18)
| p1(X0)
| p2(X0) )
& ( ? [X19] :
( ! [X20] :
( ( ? [X21] : r1(X20,X21)
& ~ p1(X20)
& ~ p2(X20)
& ~ p3(X20) )
| ! [X22] :
( ! [X23] : ~ r1(X22,X23)
| p1(X22)
| p2(X22)
| p3(X22)
| ~ r1(X20,X22) )
| ~ r1(X19,X20) )
& ? [X24] : r1(X19,X24)
& ~ p1(X19)
& ~ p2(X19)
& ~ p3(X19)
& r1(X0,X19) )
| ! [X25] : ~ r1(X0,X25)
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X26] :
( ! [X27] :
( ( ? [X28] : r1(X27,X28)
& ~ p1(X27)
& ~ p2(X27)
& ~ p3(X27)
& ~ p4(X27) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(X27,X29) )
| ~ r1(X26,X27) )
& ? [X31] : r1(X26,X31)
& ~ p1(X26)
& ~ p2(X26)
& ~ p3(X26)
& ~ p4(X26)
& r1(X0,X26) )
| ! [X32] : ~ r1(X0,X32)
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X33] :
( ! [X34] :
( ( ? [X35] :
( ? [X36] : r1(X35,X36)
& ~ p1(X35)
& ~ p2(X35)
& ~ p3(X35)
& ~ p4(X35)
& r1(X34,X35) )
& ~ p1(X34) )
| ! [X37] :
( ! [X38] :
( ! [X39] : ~ r1(X38,X39)
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(X37,X38) )
| p1(X37)
| ~ r1(X34,X37) )
| ~ r1(X33,X34) )
& ? [X40] :
( ? [X41] : r1(X40,X41)
& ~ p1(X40)
& ~ p2(X40)
& ~ p3(X40)
& ~ p4(X40)
& r1(X33,X40) )
& ~ p1(X33)
& r1(X0,X33) )
| ! [X42] :
( ! [X43] : ~ r1(X42,X43)
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(X0,X42) )
| p1(X0) )
& ( ? [X44] :
( ! [X45] :
( ( ? [X46] :
( ? [X47] : r1(X46,X47)
& ~ p1(X46)
& ~ p2(X46)
& ~ p3(X46)
& ~ p4(X46)
& r1(X45,X46) )
& ~ p1(X45)
& ~ p2(X45) )
| ! [X48] :
( ! [X49] :
( ! [X50] : ~ r1(X49,X50)
| p1(X49)
| p2(X49)
| p3(X49)
| p4(X49)
| ~ r1(X48,X49) )
| p1(X48)
| p2(X48)
| ~ r1(X45,X48) )
| ~ r1(X44,X45) )
& ? [X51] :
( ? [X52] : r1(X51,X52)
& ~ p1(X51)
& ~ p2(X51)
& ~ p3(X51)
& ~ p4(X51)
& r1(X44,X51) )
& ~ p1(X44)
& ~ p2(X44)
& r1(X0,X44) )
| ! [X53] :
( ! [X54] : ~ r1(X53,X54)
| p1(X53)
| p2(X53)
| p3(X53)
| p4(X53)
| ~ r1(X0,X53) )
| p1(X0)
| p2(X0) )
& ( ? [X55] :
( ! [X56] :
( ( ? [X57] :
( ? [X58] : r1(X57,X58)
& ~ p1(X57)
& ~ p2(X57)
& ~ p3(X57)
& ~ p4(X57)
& r1(X56,X57) )
& ~ p1(X56)
& ~ p2(X56)
& ~ p3(X56) )
| ! [X59] :
( ! [X60] :
( ! [X61] : ~ r1(X60,X61)
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| ~ r1(X56,X59) )
| ~ r1(X55,X56) )
& ? [X62] :
( ? [X63] : r1(X62,X63)
& ~ p1(X62)
& ~ p2(X62)
& ~ p3(X62)
& ~ p4(X62)
& r1(X55,X62) )
& ~ p1(X55)
& ~ p2(X55)
& ~ p3(X55)
& r1(X0,X55) )
| ! [X64] :
( ! [X65] : ~ r1(X64,X65)
| p1(X64)
| p2(X64)
| p3(X64)
| p4(X64)
| ~ r1(X0,X64) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X66] :
( ! [X67] :
( ( ? [X68] :
( ? [X69] : r1(X68,X69)
& ~ p1(X68)
& ~ p2(X68)
& ~ p3(X68)
& ~ p4(X68)
& r1(X67,X68) )
& ~ p1(X67)
& ~ p2(X67)
& ~ p3(X67)
& ~ p4(X67) )
| ! [X70] :
( ! [X71] :
( ! [X72] : ~ r1(X71,X72)
| p1(X71)
| p2(X71)
| p3(X71)
| p4(X71)
| ~ r1(X70,X71) )
| p1(X70)
| p2(X70)
| p3(X70)
| p4(X70)
| ~ r1(X67,X70) )
| ~ r1(X66,X67) )
& ? [X73] :
( ? [X74] : r1(X73,X74)
& ~ p1(X73)
& ~ p2(X73)
& ~ p3(X73)
& ~ p4(X73)
& r1(X66,X73) )
& ~ p1(X66)
& ~ p2(X66)
& ~ p3(X66)
& ~ p4(X66)
& r1(X0,X66) )
| ! [X75] :
( ! [X76] : ~ r1(X75,X76)
| p1(X75)
| p2(X75)
| p3(X75)
| p4(X75)
| ~ r1(X0,X75) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X77] :
( ! [X78] :
( ( ? [X79] :
( ? [X80] :
( ? [X81] : r1(X80,X81)
& ~ p1(X80)
& ~ p2(X80)
& ~ p3(X80)
& ~ p4(X80)
& r1(X79,X80) )
& ~ p1(X79)
& ~ p2(X79)
& ~ p3(X79)
& ~ p4(X79)
& r1(X78,X79) )
& ~ p1(X78) )
| ! [X82] :
( ! [X83] :
( ! [X84] :
( ! [X85] : ~ r1(X84,X85)
| p1(X84)
| p2(X84)
| p3(X84)
| p4(X84)
| ~ r1(X83,X84) )
| p1(X83)
| p2(X83)
| p3(X83)
| p4(X83)
| ~ r1(X82,X83) )
| p1(X82)
| ~ r1(X78,X82) )
| ~ r1(X77,X78) )
& ? [X86] :
( ? [X87] :
( ? [X88] : r1(X87,X88)
& ~ p1(X87)
& ~ p2(X87)
& ~ p3(X87)
& ~ p4(X87)
& r1(X86,X87) )
& ~ p1(X86)
& ~ p2(X86)
& ~ p3(X86)
& ~ p4(X86)
& r1(X77,X86) )
& ~ p1(X77)
& r1(X0,X77) )
| ! [X89] :
( ! [X90] :
( ! [X91] : ~ r1(X90,X91)
| p1(X90)
| p2(X90)
| p3(X90)
| p4(X90)
| ~ r1(X89,X90) )
| p1(X89)
| p2(X89)
| p3(X89)
| p4(X89)
| ~ r1(X0,X89) )
| p1(X0) )
& ( ? [X92] :
( ! [X93] :
( ( ? [X94] :
( ? [X95] :
( ? [X96] : r1(X95,X96)
& ~ p1(X95)
& ~ p2(X95)
& ~ p3(X95)
& ~ p4(X95)
& r1(X94,X95) )
& ~ p1(X94)
& ~ p2(X94)
& ~ p3(X94)
& ~ p4(X94)
& r1(X93,X94) )
& ~ p1(X93)
& ~ p2(X93) )
| ! [X97] :
( ! [X98] :
( ! [X99] :
( ! [X100] : ~ r1(X99,X100)
| p1(X99)
| p2(X99)
| p3(X99)
| p4(X99)
| ~ r1(X98,X99) )
| p1(X98)
| p2(X98)
| p3(X98)
| p4(X98)
| ~ r1(X97,X98) )
| p1(X97)
| p2(X97)
| ~ r1(X93,X97) )
| ~ r1(X92,X93) )
& ? [X101] :
( ? [X102] :
( ? [X103] : r1(X102,X103)
& ~ p1(X102)
& ~ p2(X102)
& ~ p3(X102)
& ~ p4(X102)
& r1(X101,X102) )
& ~ p1(X101)
& ~ p2(X101)
& ~ p3(X101)
& ~ p4(X101)
& r1(X92,X101) )
& ~ p1(X92)
& ~ p2(X92)
& r1(X0,X92) )
| ! [X104] :
( ! [X105] :
( ! [X106] : ~ r1(X105,X106)
| p1(X105)
| p2(X105)
| p3(X105)
| p4(X105)
| ~ r1(X104,X105) )
| p1(X104)
| p2(X104)
| p3(X104)
| p4(X104)
| ~ r1(X0,X104) )
| p1(X0)
| p2(X0) )
& ( ? [X107] :
( ! [X108] :
( ( ? [X109] :
( ? [X110] :
( ? [X111] : r1(X110,X111)
& ~ p1(X110)
& ~ p2(X110)
& ~ p3(X110)
& ~ p4(X110)
& r1(X109,X110) )
& ~ p1(X109)
& ~ p2(X109)
& ~ p3(X109)
& ~ p4(X109)
& r1(X108,X109) )
& ~ p1(X108)
& ~ p2(X108)
& ~ p3(X108) )
| ! [X112] :
( ! [X113] :
( ! [X114] :
( ! [X115] : ~ r1(X114,X115)
| p1(X114)
| p2(X114)
| p3(X114)
| p4(X114)
| ~ r1(X113,X114) )
| p1(X113)
| p2(X113)
| p3(X113)
| p4(X113)
| ~ r1(X112,X113) )
| p1(X112)
| p2(X112)
| p3(X112)
| ~ r1(X108,X112) )
| ~ r1(X107,X108) )
& ? [X116] :
( ? [X117] :
( ? [X118] : r1(X117,X118)
& ~ p1(X117)
& ~ p2(X117)
& ~ p3(X117)
& ~ p4(X117)
& r1(X116,X117) )
& ~ p1(X116)
& ~ p2(X116)
& ~ p3(X116)
& ~ p4(X116)
& r1(X107,X116) )
& ~ p1(X107)
& ~ p2(X107)
& ~ p3(X107)
& r1(X0,X107) )
| ! [X119] :
( ! [X120] :
( ! [X121] : ~ r1(X120,X121)
| p1(X120)
| p2(X120)
| p3(X120)
| p4(X120)
| ~ r1(X119,X120) )
| p1(X119)
| p2(X119)
| p3(X119)
| p4(X119)
| ~ r1(X0,X119) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X122] :
( ! [X123] :
( ( ? [X124] :
( ? [X125] :
( ? [X126] : r1(X125,X126)
& ~ p1(X125)
& ~ p2(X125)
& ~ p3(X125)
& ~ p4(X125)
& r1(X124,X125) )
& ~ p1(X124)
& ~ p2(X124)
& ~ p3(X124)
& ~ p4(X124)
& r1(X123,X124) )
& ~ p1(X123)
& ~ p2(X123)
& ~ p3(X123)
& ~ p4(X123) )
| ! [X127] :
( ! [X128] :
( ! [X129] :
( ! [X130] : ~ r1(X129,X130)
| p1(X129)
| p2(X129)
| p3(X129)
| p4(X129)
| ~ r1(X128,X129) )
| p1(X128)
| p2(X128)
| p3(X128)
| p4(X128)
| ~ r1(X127,X128) )
| p1(X127)
| p2(X127)
| p3(X127)
| p4(X127)
| ~ r1(X123,X127) )
| ~ r1(X122,X123) )
& ? [X131] :
( ? [X132] :
( ? [X133] : r1(X132,X133)
& ~ p1(X132)
& ~ p2(X132)
& ~ p3(X132)
& ~ p4(X132)
& r1(X131,X132) )
& ~ p1(X131)
& ~ p2(X131)
& ~ p3(X131)
& ~ p4(X131)
& r1(X122,X131) )
& ~ p1(X122)
& ~ p2(X122)
& ~ p3(X122)
& ~ p4(X122)
& r1(X0,X122) )
| ! [X134] :
( ! [X135] :
( ! [X136] : ~ r1(X135,X136)
| p1(X135)
| p2(X135)
| p3(X135)
| p4(X135)
| ~ r1(X134,X135) )
| p1(X134)
| p2(X134)
| p3(X134)
| p4(X134)
| ~ r1(X0,X134) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X137] :
( ! [X138] :
( ( ? [X139] :
( ? [X140] :
( ? [X141] :
( ? [X142] : r1(X141,X142)
& ~ p1(X141)
& ~ p2(X141)
& ~ p3(X141)
& ~ p4(X141)
& r1(X140,X141) )
& ~ p1(X140)
& ~ p2(X140)
& ~ p3(X140)
& ~ p4(X140)
& r1(X139,X140) )
& ~ p1(X139)
& ~ p2(X139)
& ~ p3(X139)
& ~ p4(X139)
& r1(X138,X139) )
& ~ p1(X138) )
| ! [X143] :
( ! [X144] :
( ! [X145] :
( ! [X146] :
( ! [X147] : ~ r1(X146,X147)
| p1(X146)
| p2(X146)
| p3(X146)
| p4(X146)
| ~ r1(X145,X146) )
| p1(X145)
| p2(X145)
| p3(X145)
| p4(X145)
| ~ r1(X144,X145) )
| p1(X144)
| p2(X144)
| p3(X144)
| p4(X144)
| ~ r1(X143,X144) )
| p1(X143)
| ~ r1(X138,X143) )
| ~ r1(X137,X138) )
& ? [X148] :
( ? [X149] :
( ? [X150] :
( ? [X151] : r1(X150,X151)
& ~ p1(X150)
& ~ p2(X150)
& ~ p3(X150)
& ~ p4(X150)
& r1(X149,X150) )
& ~ p1(X149)
& ~ p2(X149)
& ~ p3(X149)
& ~ p4(X149)
& r1(X148,X149) )
& ~ p1(X148)
& ~ p2(X148)
& ~ p3(X148)
& ~ p4(X148)
& r1(X137,X148) )
& ~ p1(X137)
& r1(X0,X137) )
| ! [X152] :
( ! [X153] :
( ! [X154] :
( ! [X155] : ~ r1(X154,X155)
| p1(X154)
| p2(X154)
| p3(X154)
| p4(X154)
| ~ r1(X153,X154) )
| p1(X153)
| p2(X153)
| p3(X153)
| p4(X153)
| ~ r1(X152,X153) )
| p1(X152)
| p2(X152)
| p3(X152)
| p4(X152)
| ~ r1(X0,X152) )
| p1(X0) )
& ( ? [X156] :
( ! [X157] :
( ( ? [X158] :
( ? [X159] :
( ? [X160] :
( ? [X161] : r1(X160,X161)
& ~ p1(X160)
& ~ p2(X160)
& ~ p3(X160)
& ~ p4(X160)
& r1(X159,X160) )
& ~ p1(X159)
& ~ p2(X159)
& ~ p3(X159)
& ~ p4(X159)
& r1(X158,X159) )
& ~ p1(X158)
& ~ p2(X158)
& ~ p3(X158)
& ~ p4(X158)
& r1(X157,X158) )
& ~ p1(X157)
& ~ p2(X157) )
| ! [X162] :
( ! [X163] :
( ! [X164] :
( ! [X165] :
( ! [X166] : ~ r1(X165,X166)
| p1(X165)
| p2(X165)
| p3(X165)
| p4(X165)
| ~ r1(X164,X165) )
| p1(X164)
| p2(X164)
| p3(X164)
| p4(X164)
| ~ r1(X163,X164) )
| p1(X163)
| p2(X163)
| p3(X163)
| p4(X163)
| ~ r1(X162,X163) )
| p1(X162)
| p2(X162)
| ~ r1(X157,X162) )
| ~ r1(X156,X157) )
& ? [X167] :
( ? [X168] :
( ? [X169] :
( ? [X170] : r1(X169,X170)
& ~ p1(X169)
& ~ p2(X169)
& ~ p3(X169)
& ~ p4(X169)
& r1(X168,X169) )
& ~ p1(X168)
& ~ p2(X168)
& ~ p3(X168)
& ~ p4(X168)
& r1(X167,X168) )
& ~ p1(X167)
& ~ p2(X167)
& ~ p3(X167)
& ~ p4(X167)
& r1(X156,X167) )
& ~ p1(X156)
& ~ p2(X156)
& r1(X0,X156) )
| ! [X171] :
( ! [X172] :
( ! [X173] :
( ! [X174] : ~ r1(X173,X174)
| p1(X173)
| p2(X173)
| p3(X173)
| p4(X173)
| ~ r1(X172,X173) )
| p1(X172)
| p2(X172)
| p3(X172)
| p4(X172)
| ~ r1(X171,X172) )
| p1(X171)
| p2(X171)
| p3(X171)
| p4(X171)
| ~ r1(X0,X171) )
| p1(X0)
| p2(X0) )
& ( ? [X175] :
( ! [X176] :
( ( ! [X177] :
( ~ p2(X177)
| ! [X178] :
( p2(X178)
| ~ r1(X177,X178) )
| ~ r1(X176,X177) )
& ~ p2(X176) )
| ( ! [X179] :
( ? [X180] :
( p2(X180)
& ? [X181] :
( ~ p2(X181)
& r1(X180,X181) )
& r1(X179,X180) )
| p2(X179)
| ~ r1(X176,X179) )
& ? [X182] :
( ? [X183] :
( ! [X184] :
( ~ p2(X184)
| ! [X185] :
( p2(X185)
| ~ r1(X184,X185) )
| ~ r1(X183,X184) )
& ~ p2(X183)
& r1(X182,X183) )
& r1(X176,X182) ) )
| ! [X186] :
( ( ( ? [X187] :
( p2(X187)
& ? [X188] :
( ~ p2(X188)
& r1(X187,X188) )
& r1(X186,X187) )
| p2(X186) )
& ( ? [X189] :
( ! [X190] :
( ~ p2(X190)
| ! [X191] :
( p2(X191)
| ~ r1(X190,X191) )
| ~ r1(X189,X190) )
& ~ p2(X189)
& r1(X186,X189) )
| ! [X192] :
( ! [X193] :
( ? [X194] :
( p2(X194)
& ? [X195] :
( ~ p2(X195)
& r1(X194,X195) )
& r1(X193,X194) )
| p2(X193)
| ~ r1(X192,X193) )
| ~ r1(X186,X192) ) ) )
| ~ r1(X176,X186) )
| ~ r1(X175,X176) )
& ( ( ! [X196] :
( ~ p2(X196)
| ! [X197] :
( p2(X197)
| ~ r1(X196,X197) )
| ~ r1(X175,X196) )
& ~ p2(X175) )
| ( ! [X198] :
( ? [X199] :
( p2(X199)
& ? [X200] :
( ~ p2(X200)
& r1(X199,X200) )
& r1(X198,X199) )
| p2(X198)
| ~ r1(X175,X198) )
& ? [X201] :
( ? [X202] :
( ! [X203] :
( ~ p2(X203)
| ! [X204] :
( p2(X204)
| ~ r1(X203,X204) )
| ~ r1(X202,X203) )
& ~ p2(X202)
& r1(X201,X202) )
& r1(X175,X201) ) ) )
& r1(X0,X175) )
| ( ( ? [X205] :
( p2(X205)
& ? [X206] :
( ~ p2(X206)
& r1(X205,X206) )
& r1(X0,X205) )
| p2(X0) )
& ( ? [X207] :
( ! [X208] :
( ~ p2(X208)
| ! [X209] :
( p2(X209)
| ~ r1(X208,X209) )
| ~ r1(X207,X208) )
& ~ p2(X207)
& r1(X0,X207) )
| ! [X210] :
( ! [X211] :
( ? [X212] :
( p2(X212)
& ? [X213] :
( ~ p2(X213)
& r1(X212,X213) )
& r1(X211,X212) )
| p2(X211)
| ~ r1(X210,X211) )
| ~ r1(X0,X210) ) ) ) )
& ! [X214] :
( ? [X215] :
( p1(X215)
& ? [X216] :
( ~ p1(X216)
& r1(X215,X216) )
& r1(X214,X215) )
| p1(X214)
| ~ r1(X0,X214) )
& ? [X217] :
( ~ p1(X217)
& r1(X0,X217) )
& ! [X218] :
( ? [X219] :
( p2(X219)
& ? [X220] :
( ~ p2(X220)
& r1(X219,X220) )
& r1(X218,X219) )
| p2(X218)
| ~ r1(X0,X218) )
& ? [X221] :
( ~ p2(X221)
& r1(X0,X221) )
& ! [X222] :
( ? [X223] :
( p3(X223)
& ? [X224] :
( ~ p3(X224)
& r1(X223,X224) )
& r1(X222,X223) )
| p3(X222)
| ~ r1(X0,X222) )
& ? [X225] :
( ~ p3(X225)
& r1(X0,X225) ) ),
inference(ennf_transformation,[],[f5]) ).
fof(f7,plain,
? [X0] :
( ! [X1] :
( ? [X2] :
( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
& ~ p2(X2)
& r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ? [X5] :
( ! [X6] :
( ( ? [X7] : r1(X6,X7)
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
& ? [X10] : r1(X5,X10)
& ~ p1(X5)
& r1(X0,X5) )
| ! [X11] : ~ r1(X0,X11)
| p1(X0) )
& ( ? [X12] :
( ! [X13] :
( ( ? [X14] : r1(X13,X14)
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
& ? [X17] : r1(X12,X17)
& ~ p1(X12)
& ~ p2(X12)
& r1(X0,X12) )
| ! [X18] : ~ r1(X0,X18)
| p1(X0)
| p2(X0) )
& ( ? [X19] :
( ! [X20] :
( ( ? [X21] : r1(X20,X21)
& ~ p1(X20)
& ~ p2(X20)
& ~ p3(X20) )
| ! [X22] :
( ! [X23] : ~ r1(X22,X23)
| p1(X22)
| p2(X22)
| p3(X22)
| ~ r1(X20,X22) )
| ~ r1(X19,X20) )
& ? [X24] : r1(X19,X24)
& ~ p1(X19)
& ~ p2(X19)
& ~ p3(X19)
& r1(X0,X19) )
| ! [X25] : ~ r1(X0,X25)
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X26] :
( ! [X27] :
( ( ? [X28] : r1(X27,X28)
& ~ p1(X27)
& ~ p2(X27)
& ~ p3(X27)
& ~ p4(X27) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(X27,X29) )
| ~ r1(X26,X27) )
& ? [X31] : r1(X26,X31)
& ~ p1(X26)
& ~ p2(X26)
& ~ p3(X26)
& ~ p4(X26)
& r1(X0,X26) )
| ! [X32] : ~ r1(X0,X32)
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X33] :
( ! [X34] :
( ( ? [X35] :
( ? [X36] : r1(X35,X36)
& ~ p1(X35)
& ~ p2(X35)
& ~ p3(X35)
& ~ p4(X35)
& r1(X34,X35) )
& ~ p1(X34) )
| ! [X37] :
( ! [X38] :
( ! [X39] : ~ r1(X38,X39)
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(X37,X38) )
| p1(X37)
| ~ r1(X34,X37) )
| ~ r1(X33,X34) )
& ? [X40] :
( ? [X41] : r1(X40,X41)
& ~ p1(X40)
& ~ p2(X40)
& ~ p3(X40)
& ~ p4(X40)
& r1(X33,X40) )
& ~ p1(X33)
& r1(X0,X33) )
| ! [X42] :
( ! [X43] : ~ r1(X42,X43)
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(X0,X42) )
| p1(X0) )
& ( ? [X44] :
( ! [X45] :
( ( ? [X46] :
( ? [X47] : r1(X46,X47)
& ~ p1(X46)
& ~ p2(X46)
& ~ p3(X46)
& ~ p4(X46)
& r1(X45,X46) )
& ~ p1(X45)
& ~ p2(X45) )
| ! [X48] :
( ! [X49] :
( ! [X50] : ~ r1(X49,X50)
| p1(X49)
| p2(X49)
| p3(X49)
| p4(X49)
| ~ r1(X48,X49) )
| p1(X48)
| p2(X48)
| ~ r1(X45,X48) )
| ~ r1(X44,X45) )
& ? [X51] :
( ? [X52] : r1(X51,X52)
& ~ p1(X51)
& ~ p2(X51)
& ~ p3(X51)
& ~ p4(X51)
& r1(X44,X51) )
& ~ p1(X44)
& ~ p2(X44)
& r1(X0,X44) )
| ! [X53] :
( ! [X54] : ~ r1(X53,X54)
| p1(X53)
| p2(X53)
| p3(X53)
| p4(X53)
| ~ r1(X0,X53) )
| p1(X0)
| p2(X0) )
& ( ? [X55] :
( ! [X56] :
( ( ? [X57] :
( ? [X58] : r1(X57,X58)
& ~ p1(X57)
& ~ p2(X57)
& ~ p3(X57)
& ~ p4(X57)
& r1(X56,X57) )
& ~ p1(X56)
& ~ p2(X56)
& ~ p3(X56) )
| ! [X59] :
( ! [X60] :
( ! [X61] : ~ r1(X60,X61)
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| ~ r1(X56,X59) )
| ~ r1(X55,X56) )
& ? [X62] :
( ? [X63] : r1(X62,X63)
& ~ p1(X62)
& ~ p2(X62)
& ~ p3(X62)
& ~ p4(X62)
& r1(X55,X62) )
& ~ p1(X55)
& ~ p2(X55)
& ~ p3(X55)
& r1(X0,X55) )
| ! [X64] :
( ! [X65] : ~ r1(X64,X65)
| p1(X64)
| p2(X64)
| p3(X64)
| p4(X64)
| ~ r1(X0,X64) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X66] :
( ! [X67] :
( ( ? [X68] :
( ? [X69] : r1(X68,X69)
& ~ p1(X68)
& ~ p2(X68)
& ~ p3(X68)
& ~ p4(X68)
& r1(X67,X68) )
& ~ p1(X67)
& ~ p2(X67)
& ~ p3(X67)
& ~ p4(X67) )
| ! [X70] :
( ! [X71] :
( ! [X72] : ~ r1(X71,X72)
| p1(X71)
| p2(X71)
| p3(X71)
| p4(X71)
| ~ r1(X70,X71) )
| p1(X70)
| p2(X70)
| p3(X70)
| p4(X70)
| ~ r1(X67,X70) )
| ~ r1(X66,X67) )
& ? [X73] :
( ? [X74] : r1(X73,X74)
& ~ p1(X73)
& ~ p2(X73)
& ~ p3(X73)
& ~ p4(X73)
& r1(X66,X73) )
& ~ p1(X66)
& ~ p2(X66)
& ~ p3(X66)
& ~ p4(X66)
& r1(X0,X66) )
| ! [X75] :
( ! [X76] : ~ r1(X75,X76)
| p1(X75)
| p2(X75)
| p3(X75)
| p4(X75)
| ~ r1(X0,X75) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X77] :
( ! [X78] :
( ( ? [X79] :
( ? [X80] :
( ? [X81] : r1(X80,X81)
& ~ p1(X80)
& ~ p2(X80)
& ~ p3(X80)
& ~ p4(X80)
& r1(X79,X80) )
& ~ p1(X79)
& ~ p2(X79)
& ~ p3(X79)
& ~ p4(X79)
& r1(X78,X79) )
& ~ p1(X78) )
| ! [X82] :
( ! [X83] :
( ! [X84] :
( ! [X85] : ~ r1(X84,X85)
| p1(X84)
| p2(X84)
| p3(X84)
| p4(X84)
| ~ r1(X83,X84) )
| p1(X83)
| p2(X83)
| p3(X83)
| p4(X83)
| ~ r1(X82,X83) )
| p1(X82)
| ~ r1(X78,X82) )
| ~ r1(X77,X78) )
& ? [X86] :
( ? [X87] :
( ? [X88] : r1(X87,X88)
& ~ p1(X87)
& ~ p2(X87)
& ~ p3(X87)
& ~ p4(X87)
& r1(X86,X87) )
& ~ p1(X86)
& ~ p2(X86)
& ~ p3(X86)
& ~ p4(X86)
& r1(X77,X86) )
& ~ p1(X77)
& r1(X0,X77) )
| ! [X89] :
( ! [X90] :
( ! [X91] : ~ r1(X90,X91)
| p1(X90)
| p2(X90)
| p3(X90)
| p4(X90)
| ~ r1(X89,X90) )
| p1(X89)
| p2(X89)
| p3(X89)
| p4(X89)
| ~ r1(X0,X89) )
| p1(X0) )
& ( ? [X92] :
( ! [X93] :
( ( ? [X94] :
( ? [X95] :
( ? [X96] : r1(X95,X96)
& ~ p1(X95)
& ~ p2(X95)
& ~ p3(X95)
& ~ p4(X95)
& r1(X94,X95) )
& ~ p1(X94)
& ~ p2(X94)
& ~ p3(X94)
& ~ p4(X94)
& r1(X93,X94) )
& ~ p1(X93)
& ~ p2(X93) )
| ! [X97] :
( ! [X98] :
( ! [X99] :
( ! [X100] : ~ r1(X99,X100)
| p1(X99)
| p2(X99)
| p3(X99)
| p4(X99)
| ~ r1(X98,X99) )
| p1(X98)
| p2(X98)
| p3(X98)
| p4(X98)
| ~ r1(X97,X98) )
| p1(X97)
| p2(X97)
| ~ r1(X93,X97) )
| ~ r1(X92,X93) )
& ? [X101] :
( ? [X102] :
( ? [X103] : r1(X102,X103)
& ~ p1(X102)
& ~ p2(X102)
& ~ p3(X102)
& ~ p4(X102)
& r1(X101,X102) )
& ~ p1(X101)
& ~ p2(X101)
& ~ p3(X101)
& ~ p4(X101)
& r1(X92,X101) )
& ~ p1(X92)
& ~ p2(X92)
& r1(X0,X92) )
| ! [X104] :
( ! [X105] :
( ! [X106] : ~ r1(X105,X106)
| p1(X105)
| p2(X105)
| p3(X105)
| p4(X105)
| ~ r1(X104,X105) )
| p1(X104)
| p2(X104)
| p3(X104)
| p4(X104)
| ~ r1(X0,X104) )
| p1(X0)
| p2(X0) )
& ( ? [X107] :
( ! [X108] :
( ( ? [X109] :
( ? [X110] :
( ? [X111] : r1(X110,X111)
& ~ p1(X110)
& ~ p2(X110)
& ~ p3(X110)
& ~ p4(X110)
& r1(X109,X110) )
& ~ p1(X109)
& ~ p2(X109)
& ~ p3(X109)
& ~ p4(X109)
& r1(X108,X109) )
& ~ p1(X108)
& ~ p2(X108)
& ~ p3(X108) )
| ! [X112] :
( ! [X113] :
( ! [X114] :
( ! [X115] : ~ r1(X114,X115)
| p1(X114)
| p2(X114)
| p3(X114)
| p4(X114)
| ~ r1(X113,X114) )
| p1(X113)
| p2(X113)
| p3(X113)
| p4(X113)
| ~ r1(X112,X113) )
| p1(X112)
| p2(X112)
| p3(X112)
| ~ r1(X108,X112) )
| ~ r1(X107,X108) )
& ? [X116] :
( ? [X117] :
( ? [X118] : r1(X117,X118)
& ~ p1(X117)
& ~ p2(X117)
& ~ p3(X117)
& ~ p4(X117)
& r1(X116,X117) )
& ~ p1(X116)
& ~ p2(X116)
& ~ p3(X116)
& ~ p4(X116)
& r1(X107,X116) )
& ~ p1(X107)
& ~ p2(X107)
& ~ p3(X107)
& r1(X0,X107) )
| ! [X119] :
( ! [X120] :
( ! [X121] : ~ r1(X120,X121)
| p1(X120)
| p2(X120)
| p3(X120)
| p4(X120)
| ~ r1(X119,X120) )
| p1(X119)
| p2(X119)
| p3(X119)
| p4(X119)
| ~ r1(X0,X119) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X122] :
( ! [X123] :
( ( ? [X124] :
( ? [X125] :
( ? [X126] : r1(X125,X126)
& ~ p1(X125)
& ~ p2(X125)
& ~ p3(X125)
& ~ p4(X125)
& r1(X124,X125) )
& ~ p1(X124)
& ~ p2(X124)
& ~ p3(X124)
& ~ p4(X124)
& r1(X123,X124) )
& ~ p1(X123)
& ~ p2(X123)
& ~ p3(X123)
& ~ p4(X123) )
| ! [X127] :
( ! [X128] :
( ! [X129] :
( ! [X130] : ~ r1(X129,X130)
| p1(X129)
| p2(X129)
| p3(X129)
| p4(X129)
| ~ r1(X128,X129) )
| p1(X128)
| p2(X128)
| p3(X128)
| p4(X128)
| ~ r1(X127,X128) )
| p1(X127)
| p2(X127)
| p3(X127)
| p4(X127)
| ~ r1(X123,X127) )
| ~ r1(X122,X123) )
& ? [X131] :
( ? [X132] :
( ? [X133] : r1(X132,X133)
& ~ p1(X132)
& ~ p2(X132)
& ~ p3(X132)
& ~ p4(X132)
& r1(X131,X132) )
& ~ p1(X131)
& ~ p2(X131)
& ~ p3(X131)
& ~ p4(X131)
& r1(X122,X131) )
& ~ p1(X122)
& ~ p2(X122)
& ~ p3(X122)
& ~ p4(X122)
& r1(X0,X122) )
| ! [X134] :
( ! [X135] :
( ! [X136] : ~ r1(X135,X136)
| p1(X135)
| p2(X135)
| p3(X135)
| p4(X135)
| ~ r1(X134,X135) )
| p1(X134)
| p2(X134)
| p3(X134)
| p4(X134)
| ~ r1(X0,X134) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X137] :
( ! [X138] :
( ( ? [X139] :
( ? [X140] :
( ? [X141] :
( ? [X142] : r1(X141,X142)
& ~ p1(X141)
& ~ p2(X141)
& ~ p3(X141)
& ~ p4(X141)
& r1(X140,X141) )
& ~ p1(X140)
& ~ p2(X140)
& ~ p3(X140)
& ~ p4(X140)
& r1(X139,X140) )
& ~ p1(X139)
& ~ p2(X139)
& ~ p3(X139)
& ~ p4(X139)
& r1(X138,X139) )
& ~ p1(X138) )
| ! [X143] :
( ! [X144] :
( ! [X145] :
( ! [X146] :
( ! [X147] : ~ r1(X146,X147)
| p1(X146)
| p2(X146)
| p3(X146)
| p4(X146)
| ~ r1(X145,X146) )
| p1(X145)
| p2(X145)
| p3(X145)
| p4(X145)
| ~ r1(X144,X145) )
| p1(X144)
| p2(X144)
| p3(X144)
| p4(X144)
| ~ r1(X143,X144) )
| p1(X143)
| ~ r1(X138,X143) )
| ~ r1(X137,X138) )
& ? [X148] :
( ? [X149] :
( ? [X150] :
( ? [X151] : r1(X150,X151)
& ~ p1(X150)
& ~ p2(X150)
& ~ p3(X150)
& ~ p4(X150)
& r1(X149,X150) )
& ~ p1(X149)
& ~ p2(X149)
& ~ p3(X149)
& ~ p4(X149)
& r1(X148,X149) )
& ~ p1(X148)
& ~ p2(X148)
& ~ p3(X148)
& ~ p4(X148)
& r1(X137,X148) )
& ~ p1(X137)
& r1(X0,X137) )
| ! [X152] :
( ! [X153] :
( ! [X154] :
( ! [X155] : ~ r1(X154,X155)
| p1(X154)
| p2(X154)
| p3(X154)
| p4(X154)
| ~ r1(X153,X154) )
| p1(X153)
| p2(X153)
| p3(X153)
| p4(X153)
| ~ r1(X152,X153) )
| p1(X152)
| p2(X152)
| p3(X152)
| p4(X152)
| ~ r1(X0,X152) )
| p1(X0) )
& ( ? [X156] :
( ! [X157] :
( ( ? [X158] :
( ? [X159] :
( ? [X160] :
( ? [X161] : r1(X160,X161)
& ~ p1(X160)
& ~ p2(X160)
& ~ p3(X160)
& ~ p4(X160)
& r1(X159,X160) )
& ~ p1(X159)
& ~ p2(X159)
& ~ p3(X159)
& ~ p4(X159)
& r1(X158,X159) )
& ~ p1(X158)
& ~ p2(X158)
& ~ p3(X158)
& ~ p4(X158)
& r1(X157,X158) )
& ~ p1(X157)
& ~ p2(X157) )
| ! [X162] :
( ! [X163] :
( ! [X164] :
( ! [X165] :
( ! [X166] : ~ r1(X165,X166)
| p1(X165)
| p2(X165)
| p3(X165)
| p4(X165)
| ~ r1(X164,X165) )
| p1(X164)
| p2(X164)
| p3(X164)
| p4(X164)
| ~ r1(X163,X164) )
| p1(X163)
| p2(X163)
| p3(X163)
| p4(X163)
| ~ r1(X162,X163) )
| p1(X162)
| p2(X162)
| ~ r1(X157,X162) )
| ~ r1(X156,X157) )
& ? [X167] :
( ? [X168] :
( ? [X169] :
( ? [X170] : r1(X169,X170)
& ~ p1(X169)
& ~ p2(X169)
& ~ p3(X169)
& ~ p4(X169)
& r1(X168,X169) )
& ~ p1(X168)
& ~ p2(X168)
& ~ p3(X168)
& ~ p4(X168)
& r1(X167,X168) )
& ~ p1(X167)
& ~ p2(X167)
& ~ p3(X167)
& ~ p4(X167)
& r1(X156,X167) )
& ~ p1(X156)
& ~ p2(X156)
& r1(X0,X156) )
| ! [X171] :
( ! [X172] :
( ! [X173] :
( ! [X174] : ~ r1(X173,X174)
| p1(X173)
| p2(X173)
| p3(X173)
| p4(X173)
| ~ r1(X172,X173) )
| p1(X172)
| p2(X172)
| p3(X172)
| p4(X172)
| ~ r1(X171,X172) )
| p1(X171)
| p2(X171)
| p3(X171)
| p4(X171)
| ~ r1(X0,X171) )
| p1(X0)
| p2(X0) )
& ( ? [X175] :
( ! [X176] :
( ( ! [X177] :
( ~ p2(X177)
| ! [X178] :
( p2(X178)
| ~ r1(X177,X178) )
| ~ r1(X176,X177) )
& ~ p2(X176) )
| ( ! [X179] :
( ? [X180] :
( p2(X180)
& ? [X181] :
( ~ p2(X181)
& r1(X180,X181) )
& r1(X179,X180) )
| p2(X179)
| ~ r1(X176,X179) )
& ? [X182] :
( ? [X183] :
( ! [X184] :
( ~ p2(X184)
| ! [X185] :
( p2(X185)
| ~ r1(X184,X185) )
| ~ r1(X183,X184) )
& ~ p2(X183)
& r1(X182,X183) )
& r1(X176,X182) ) )
| ! [X186] :
( ( ( ? [X187] :
( p2(X187)
& ? [X188] :
( ~ p2(X188)
& r1(X187,X188) )
& r1(X186,X187) )
| p2(X186) )
& ( ? [X189] :
( ! [X190] :
( ~ p2(X190)
| ! [X191] :
( p2(X191)
| ~ r1(X190,X191) )
| ~ r1(X189,X190) )
& ~ p2(X189)
& r1(X186,X189) )
| ! [X192] :
( ! [X193] :
( ? [X194] :
( p2(X194)
& ? [X195] :
( ~ p2(X195)
& r1(X194,X195) )
& r1(X193,X194) )
| p2(X193)
| ~ r1(X192,X193) )
| ~ r1(X186,X192) ) ) )
| ~ r1(X176,X186) )
| ~ r1(X175,X176) )
& ( ( ! [X196] :
( ~ p2(X196)
| ! [X197] :
( p2(X197)
| ~ r1(X196,X197) )
| ~ r1(X175,X196) )
& ~ p2(X175) )
| ( ! [X198] :
( ? [X199] :
( p2(X199)
& ? [X200] :
( ~ p2(X200)
& r1(X199,X200) )
& r1(X198,X199) )
| p2(X198)
| ~ r1(X175,X198) )
& ? [X201] :
( ? [X202] :
( ! [X203] :
( ~ p2(X203)
| ! [X204] :
( p2(X204)
| ~ r1(X203,X204) )
| ~ r1(X202,X203) )
& ~ p2(X202)
& r1(X201,X202) )
& r1(X175,X201) ) ) )
& r1(X0,X175) )
| ( ( ? [X205] :
( p2(X205)
& ? [X206] :
( ~ p2(X206)
& r1(X205,X206) )
& r1(X0,X205) )
| p2(X0) )
& ( ? [X207] :
( ! [X208] :
( ~ p2(X208)
| ! [X209] :
( p2(X209)
| ~ r1(X208,X209) )
| ~ r1(X207,X208) )
& ~ p2(X207)
& r1(X0,X207) )
| ! [X210] :
( ! [X211] :
( ? [X212] :
( p2(X212)
& ? [X213] :
( ~ p2(X213)
& r1(X212,X213) )
& r1(X211,X212) )
| p2(X211)
| ~ r1(X210,X211) )
| ~ r1(X0,X210) ) ) ) )
& ! [X214] :
( ? [X215] :
( p1(X215)
& ? [X216] :
( ~ p1(X216)
& r1(X215,X216) )
& r1(X214,X215) )
| p1(X214)
| ~ r1(X0,X214) )
& ? [X217] :
( ~ p1(X217)
& r1(X0,X217) )
& ! [X218] :
( ? [X219] :
( p2(X219)
& ? [X220] :
( ~ p2(X220)
& r1(X219,X220) )
& r1(X218,X219) )
| p2(X218)
| ~ r1(X0,X218) )
& ? [X221] :
( ~ p2(X221)
& r1(X0,X221) )
& ! [X222] :
( ? [X223] :
( p3(X223)
& ? [X224] :
( ~ p3(X224)
& r1(X223,X224) )
& r1(X222,X223) )
| p3(X222)
| ~ r1(X0,X222) )
& ? [X225] :
( ~ p3(X225)
& r1(X0,X225) ) ),
inference(flattening,[],[f6]) ).
fof(f8,plain,
! [X0] :
( ! [X210] :
( ! [X211] :
( ? [X212] :
( p2(X212)
& ? [X213] :
( ~ p2(X213)
& r1(X212,X213) )
& r1(X211,X212) )
| p2(X211)
| ~ r1(X210,X211) )
| ~ r1(X0,X210) )
| ~ sP0(X0) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP0])]) ).
fof(f9,plain,
! [X175] :
( ( ! [X198] :
( ? [X199] :
( p2(X199)
& ? [X200] :
( ~ p2(X200)
& r1(X199,X200) )
& r1(X198,X199) )
| p2(X198)
| ~ r1(X175,X198) )
& ? [X201] :
( ? [X202] :
( ! [X203] :
( ~ p2(X203)
| ! [X204] :
( p2(X204)
| ~ r1(X203,X204) )
| ~ r1(X202,X203) )
& ~ p2(X202)
& r1(X201,X202) )
& r1(X175,X201) ) )
| ~ sP1(X175) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP1])]) ).
fof(f10,plain,
! [X186] :
( ! [X192] :
( ! [X193] :
( ? [X194] :
( p2(X194)
& ? [X195] :
( ~ p2(X195)
& r1(X194,X195) )
& r1(X193,X194) )
| p2(X193)
| ~ r1(X192,X193) )
| ~ r1(X186,X192) )
| ~ sP2(X186) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP2])]) ).
fof(f11,plain,
! [X176] :
( ( ! [X179] :
( ? [X180] :
( p2(X180)
& ? [X181] :
( ~ p2(X181)
& r1(X180,X181) )
& r1(X179,X180) )
| p2(X179)
| ~ r1(X176,X179) )
& ? [X182] :
( ? [X183] :
( ! [X184] :
( ~ p2(X184)
| ! [X185] :
( p2(X185)
| ~ r1(X184,X185) )
| ~ r1(X183,X184) )
& ~ p2(X183)
& r1(X182,X183) )
& r1(X176,X182) ) )
| ~ sP3(X176) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP3])]) ).
fof(f12,plain,
! [X176] :
( ! [X186] :
( ( ( ? [X187] :
( p2(X187)
& ? [X188] :
( ~ p2(X188)
& r1(X187,X188) )
& r1(X186,X187) )
| p2(X186) )
& ( ? [X189] :
( ! [X190] :
( ~ p2(X190)
| ! [X191] :
( p2(X191)
| ~ r1(X190,X191) )
| ~ r1(X189,X190) )
& ~ p2(X189)
& r1(X186,X189) )
| sP2(X186) ) )
| ~ r1(X176,X186) )
| ~ sP4(X176) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP4])]) ).
fof(f13,plain,
! [X0] :
( ( ( ? [X205] :
( p2(X205)
& ? [X206] :
( ~ p2(X206)
& r1(X205,X206) )
& r1(X0,X205) )
| p2(X0) )
& ( ? [X207] :
( ! [X208] :
( ~ p2(X208)
| ! [X209] :
( p2(X209)
| ~ r1(X208,X209) )
| ~ r1(X207,X208) )
& ~ p2(X207)
& r1(X0,X207) )
| sP0(X0) ) )
| ~ sP5(X0) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP5])]) ).
fof(f14,plain,
! [X168] :
( ? [X169] :
( ? [X170] : r1(X169,X170)
& ~ p1(X169)
& ~ p2(X169)
& ~ p3(X169)
& ~ p4(X169)
& r1(X168,X169) )
| ~ sP6(X168) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP6])]) ).
fof(f15,plain,
! [X167] :
( ? [X168] :
( sP6(X168)
& ~ p1(X168)
& ~ p2(X168)
& ~ p3(X168)
& ~ p4(X168)
& r1(X167,X168) )
| ~ sP7(X167) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP7])]) ).
fof(f16,plain,
! [X159] :
( ? [X160] :
( ? [X161] : r1(X160,X161)
& ~ p1(X160)
& ~ p2(X160)
& ~ p3(X160)
& ~ p4(X160)
& r1(X159,X160) )
| ~ sP8(X159) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP8])]) ).
fof(f17,plain,
! [X158] :
( ? [X159] :
( sP8(X159)
& ~ p1(X159)
& ~ p2(X159)
& ~ p3(X159)
& ~ p4(X159)
& r1(X158,X159) )
| ~ sP9(X158) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP9])]) ).
fof(f18,plain,
! [X156] :
( ! [X157] :
( ( ? [X158] :
( sP9(X158)
& ~ p1(X158)
& ~ p2(X158)
& ~ p3(X158)
& ~ p4(X158)
& r1(X157,X158) )
& ~ p1(X157)
& ~ p2(X157) )
| ! [X162] :
( ! [X163] :
( ! [X164] :
( ! [X165] :
( ! [X166] : ~ r1(X165,X166)
| p1(X165)
| p2(X165)
| p3(X165)
| p4(X165)
| ~ r1(X164,X165) )
| p1(X164)
| p2(X164)
| p3(X164)
| p4(X164)
| ~ r1(X163,X164) )
| p1(X163)
| p2(X163)
| p3(X163)
| p4(X163)
| ~ r1(X162,X163) )
| p1(X162)
| p2(X162)
| ~ r1(X157,X162) )
| ~ r1(X156,X157) )
| ~ sP10(X156) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP10])]) ).
fof(f19,plain,
! [X156] :
( ? [X167] :
( sP7(X167)
& ~ p1(X167)
& ~ p2(X167)
& ~ p3(X167)
& ~ p4(X167)
& r1(X156,X167) )
| ~ sP11(X156) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP11])]) ).
fof(f20,plain,
! [X149] :
( ? [X150] :
( ? [X151] : r1(X150,X151)
& ~ p1(X150)
& ~ p2(X150)
& ~ p3(X150)
& ~ p4(X150)
& r1(X149,X150) )
| ~ sP12(X149) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP12])]) ).
fof(f21,plain,
! [X148] :
( ? [X149] :
( sP12(X149)
& ~ p1(X149)
& ~ p2(X149)
& ~ p3(X149)
& ~ p4(X149)
& r1(X148,X149) )
| ~ sP13(X148) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP13])]) ).
fof(f22,plain,
! [X140] :
( ? [X141] :
( ? [X142] : r1(X141,X142)
& ~ p1(X141)
& ~ p2(X141)
& ~ p3(X141)
& ~ p4(X141)
& r1(X140,X141) )
| ~ sP14(X140) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP14])]) ).
fof(f23,plain,
! [X139] :
( ? [X140] :
( sP14(X140)
& ~ p1(X140)
& ~ p2(X140)
& ~ p3(X140)
& ~ p4(X140)
& r1(X139,X140) )
| ~ sP15(X139) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP15])]) ).
fof(f24,plain,
! [X137] :
( ! [X138] :
( ( ? [X139] :
( sP15(X139)
& ~ p1(X139)
& ~ p2(X139)
& ~ p3(X139)
& ~ p4(X139)
& r1(X138,X139) )
& ~ p1(X138) )
| ! [X143] :
( ! [X144] :
( ! [X145] :
( ! [X146] :
( ! [X147] : ~ r1(X146,X147)
| p1(X146)
| p2(X146)
| p3(X146)
| p4(X146)
| ~ r1(X145,X146) )
| p1(X145)
| p2(X145)
| p3(X145)
| p4(X145)
| ~ r1(X144,X145) )
| p1(X144)
| p2(X144)
| p3(X144)
| p4(X144)
| ~ r1(X143,X144) )
| p1(X143)
| ~ r1(X138,X143) )
| ~ r1(X137,X138) )
| ~ sP16(X137) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP16])]) ).
fof(f25,plain,
! [X137] :
( ? [X148] :
( sP13(X148)
& ~ p1(X148)
& ~ p2(X148)
& ~ p3(X148)
& ~ p4(X148)
& r1(X137,X148) )
| ~ sP17(X137) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP17])]) ).
fof(f26,plain,
! [X131] :
( ? [X132] :
( ? [X133] : r1(X132,X133)
& ~ p1(X132)
& ~ p2(X132)
& ~ p3(X132)
& ~ p4(X132)
& r1(X131,X132) )
| ~ sP18(X131) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP18])]) ).
fof(f27,plain,
! [X124] :
( ? [X125] :
( ? [X126] : r1(X125,X126)
& ~ p1(X125)
& ~ p2(X125)
& ~ p3(X125)
& ~ p4(X125)
& r1(X124,X125) )
| ~ sP19(X124) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP19])]) ).
fof(f28,plain,
! [X123] :
( ? [X124] :
( sP19(X124)
& ~ p1(X124)
& ~ p2(X124)
& ~ p3(X124)
& ~ p4(X124)
& r1(X123,X124) )
| ~ sP20(X123) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP20])]) ).
fof(f29,plain,
! [X122] :
( ? [X131] :
( sP18(X131)
& ~ p1(X131)
& ~ p2(X131)
& ~ p3(X131)
& ~ p4(X131)
& r1(X122,X131) )
| ~ sP21(X122) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP21])]) ).
fof(f30,plain,
! [X122] :
( ! [X123] :
( ( sP20(X123)
& ~ p1(X123)
& ~ p2(X123)
& ~ p3(X123)
& ~ p4(X123) )
| ! [X127] :
( ! [X128] :
( ! [X129] :
( ! [X130] : ~ r1(X129,X130)
| p1(X129)
| p2(X129)
| p3(X129)
| p4(X129)
| ~ r1(X128,X129) )
| p1(X128)
| p2(X128)
| p3(X128)
| p4(X128)
| ~ r1(X127,X128) )
| p1(X127)
| p2(X127)
| p3(X127)
| p4(X127)
| ~ r1(X123,X127) )
| ~ r1(X122,X123) )
| ~ sP22(X122) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP22])]) ).
fof(f31,plain,
! [X116] :
( ? [X117] :
( ? [X118] : r1(X117,X118)
& ~ p1(X117)
& ~ p2(X117)
& ~ p3(X117)
& ~ p4(X117)
& r1(X116,X117) )
| ~ sP23(X116) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP23])]) ).
fof(f32,plain,
! [X109] :
( ? [X110] :
( ? [X111] : r1(X110,X111)
& ~ p1(X110)
& ~ p2(X110)
& ~ p3(X110)
& ~ p4(X110)
& r1(X109,X110) )
| ~ sP24(X109) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP24])]) ).
fof(f33,plain,
! [X108] :
( ? [X109] :
( sP24(X109)
& ~ p1(X109)
& ~ p2(X109)
& ~ p3(X109)
& ~ p4(X109)
& r1(X108,X109) )
| ~ sP25(X108) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP25])]) ).
fof(f34,plain,
! [X107] :
( ? [X116] :
( sP23(X116)
& ~ p1(X116)
& ~ p2(X116)
& ~ p3(X116)
& ~ p4(X116)
& r1(X107,X116) )
| ~ sP26(X107) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP26])]) ).
fof(f35,plain,
! [X107] :
( ! [X108] :
( ( sP25(X108)
& ~ p1(X108)
& ~ p2(X108)
& ~ p3(X108) )
| ! [X112] :
( ! [X113] :
( ! [X114] :
( ! [X115] : ~ r1(X114,X115)
| p1(X114)
| p2(X114)
| p3(X114)
| p4(X114)
| ~ r1(X113,X114) )
| p1(X113)
| p2(X113)
| p3(X113)
| p4(X113)
| ~ r1(X112,X113) )
| p1(X112)
| p2(X112)
| p3(X112)
| ~ r1(X108,X112) )
| ~ r1(X107,X108) )
| ~ sP27(X107) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP27])]) ).
fof(f36,plain,
! [X101] :
( ? [X102] :
( ? [X103] : r1(X102,X103)
& ~ p1(X102)
& ~ p2(X102)
& ~ p3(X102)
& ~ p4(X102)
& r1(X101,X102) )
| ~ sP28(X101) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP28])]) ).
fof(f37,plain,
! [X94] :
( ? [X95] :
( ? [X96] : r1(X95,X96)
& ~ p1(X95)
& ~ p2(X95)
& ~ p3(X95)
& ~ p4(X95)
& r1(X94,X95) )
| ~ sP29(X94) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP29])]) ).
fof(f38,plain,
! [X92] :
( ! [X93] :
( ( ? [X94] :
( sP29(X94)
& ~ p1(X94)
& ~ p2(X94)
& ~ p3(X94)
& ~ p4(X94)
& r1(X93,X94) )
& ~ p1(X93)
& ~ p2(X93) )
| ! [X97] :
( ! [X98] :
( ! [X99] :
( ! [X100] : ~ r1(X99,X100)
| p1(X99)
| p2(X99)
| p3(X99)
| p4(X99)
| ~ r1(X98,X99) )
| p1(X98)
| p2(X98)
| p3(X98)
| p4(X98)
| ~ r1(X97,X98) )
| p1(X97)
| p2(X97)
| ~ r1(X93,X97) )
| ~ r1(X92,X93) )
| ~ sP30(X92) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP30])]) ).
fof(f39,plain,
! [X92] :
( ? [X101] :
( sP28(X101)
& ~ p1(X101)
& ~ p2(X101)
& ~ p3(X101)
& ~ p4(X101)
& r1(X92,X101) )
| ~ sP31(X92) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP31])]) ).
fof(f40,plain,
! [X86] :
( ? [X87] :
( ? [X88] : r1(X87,X88)
& ~ p1(X87)
& ~ p2(X87)
& ~ p3(X87)
& ~ p4(X87)
& r1(X86,X87) )
| ~ sP32(X86) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP32])]) ).
fof(f41,plain,
! [X79] :
( ? [X80] :
( ? [X81] : r1(X80,X81)
& ~ p1(X80)
& ~ p2(X80)
& ~ p3(X80)
& ~ p4(X80)
& r1(X79,X80) )
| ~ sP33(X79) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP33])]) ).
fof(f42,plain,
! [X77] :
( ! [X78] :
( ( ? [X79] :
( sP33(X79)
& ~ p1(X79)
& ~ p2(X79)
& ~ p3(X79)
& ~ p4(X79)
& r1(X78,X79) )
& ~ p1(X78) )
| ! [X82] :
( ! [X83] :
( ! [X84] :
( ! [X85] : ~ r1(X84,X85)
| p1(X84)
| p2(X84)
| p3(X84)
| p4(X84)
| ~ r1(X83,X84) )
| p1(X83)
| p2(X83)
| p3(X83)
| p4(X83)
| ~ r1(X82,X83) )
| p1(X82)
| ~ r1(X78,X82) )
| ~ r1(X77,X78) )
| ~ sP34(X77) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP34])]) ).
fof(f43,plain,
! [X77] :
( ? [X86] :
( sP32(X86)
& ~ p1(X86)
& ~ p2(X86)
& ~ p3(X86)
& ~ p4(X86)
& r1(X77,X86) )
| ~ sP35(X77) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP35])]) ).
fof(f44,plain,
! [X67] :
( ? [X68] :
( ? [X69] : r1(X68,X69)
& ~ p1(X68)
& ~ p2(X68)
& ~ p3(X68)
& ~ p4(X68)
& r1(X67,X68) )
| ~ sP36(X67) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP36])]) ).
fof(f45,plain,
! [X66] :
( ? [X73] :
( ? [X74] : r1(X73,X74)
& ~ p1(X73)
& ~ p2(X73)
& ~ p3(X73)
& ~ p4(X73)
& r1(X66,X73) )
| ~ sP37(X66) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP37])]) ).
fof(f46,plain,
! [X66] :
( ! [X67] :
( ( sP36(X67)
& ~ p1(X67)
& ~ p2(X67)
& ~ p3(X67)
& ~ p4(X67) )
| ! [X70] :
( ! [X71] :
( ! [X72] : ~ r1(X71,X72)
| p1(X71)
| p2(X71)
| p3(X71)
| p4(X71)
| ~ r1(X70,X71) )
| p1(X70)
| p2(X70)
| p3(X70)
| p4(X70)
| ~ r1(X67,X70) )
| ~ r1(X66,X67) )
| ~ sP38(X66) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP38])]) ).
fof(f47,plain,
! [X56] :
( ? [X57] :
( ? [X58] : r1(X57,X58)
& ~ p1(X57)
& ~ p2(X57)
& ~ p3(X57)
& ~ p4(X57)
& r1(X56,X57) )
| ~ sP39(X56) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP39])]) ).
fof(f48,plain,
! [X55] :
( ? [X62] :
( ? [X63] : r1(X62,X63)
& ~ p1(X62)
& ~ p2(X62)
& ~ p3(X62)
& ~ p4(X62)
& r1(X55,X62) )
| ~ sP40(X55) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP40])]) ).
fof(f49,plain,
! [X55] :
( ! [X56] :
( ( sP39(X56)
& ~ p1(X56)
& ~ p2(X56)
& ~ p3(X56) )
| ! [X59] :
( ! [X60] :
( ! [X61] : ~ r1(X60,X61)
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| ~ r1(X56,X59) )
| ~ r1(X55,X56) )
| ~ sP41(X55) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP41])]) ).
fof(f50,plain,
! [X44] :
( ! [X45] :
( ( ? [X46] :
( ? [X47] : r1(X46,X47)
& ~ p1(X46)
& ~ p2(X46)
& ~ p3(X46)
& ~ p4(X46)
& r1(X45,X46) )
& ~ p1(X45)
& ~ p2(X45) )
| ! [X48] :
( ! [X49] :
( ! [X50] : ~ r1(X49,X50)
| p1(X49)
| p2(X49)
| p3(X49)
| p4(X49)
| ~ r1(X48,X49) )
| p1(X48)
| p2(X48)
| ~ r1(X45,X48) )
| ~ r1(X44,X45) )
| ~ sP42(X44) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP42])]) ).
fof(f51,plain,
! [X44] :
( ? [X51] :
( ? [X52] : r1(X51,X52)
& ~ p1(X51)
& ~ p2(X51)
& ~ p3(X51)
& ~ p4(X51)
& r1(X44,X51) )
| ~ sP43(X44) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP43])]) ).
fof(f52,plain,
! [X33] :
( ! [X34] :
( ( ? [X35] :
( ? [X36] : r1(X35,X36)
& ~ p1(X35)
& ~ p2(X35)
& ~ p3(X35)
& ~ p4(X35)
& r1(X34,X35) )
& ~ p1(X34) )
| ! [X37] :
( ! [X38] :
( ! [X39] : ~ r1(X38,X39)
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(X37,X38) )
| p1(X37)
| ~ r1(X34,X37) )
| ~ r1(X33,X34) )
| ~ sP44(X33) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP44])]) ).
fof(f53,plain,
! [X33] :
( ? [X40] :
( ? [X41] : r1(X40,X41)
& ~ p1(X40)
& ~ p2(X40)
& ~ p3(X40)
& ~ p4(X40)
& r1(X33,X40) )
| ~ sP45(X33) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP45])]) ).
fof(f54,plain,
! [X26] :
( ! [X27] :
( ( ? [X28] : r1(X27,X28)
& ~ p1(X27)
& ~ p2(X27)
& ~ p3(X27)
& ~ p4(X27) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(X27,X29) )
| ~ r1(X26,X27) )
| ~ sP46(X26) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP46])]) ).
fof(f55,plain,
! [X19] :
( ! [X20] :
( ( ? [X21] : r1(X20,X21)
& ~ p1(X20)
& ~ p2(X20)
& ~ p3(X20) )
| ! [X22] :
( ! [X23] : ~ r1(X22,X23)
| p1(X22)
| p2(X22)
| p3(X22)
| ~ r1(X20,X22) )
| ~ r1(X19,X20) )
| ~ sP47(X19) ),
introduced(predicate_definition_introduction,[new_symbols(naming,[sP47])]) ).
fof(f56,plain,
? [X0] :
( ! [X1] :
( ? [X2] :
( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
& ~ p2(X2)
& r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ? [X5] :
( ! [X6] :
( ( ? [X7] : r1(X6,X7)
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
& ? [X10] : r1(X5,X10)
& ~ p1(X5)
& r1(X0,X5) )
| ! [X11] : ~ r1(X0,X11)
| p1(X0) )
& ( ? [X12] :
( ! [X13] :
( ( ? [X14] : r1(X13,X14)
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
& ? [X17] : r1(X12,X17)
& ~ p1(X12)
& ~ p2(X12)
& r1(X0,X12) )
| ! [X18] : ~ r1(X0,X18)
| p1(X0)
| p2(X0) )
& ( ? [X19] :
( sP47(X19)
& ? [X24] : r1(X19,X24)
& ~ p1(X19)
& ~ p2(X19)
& ~ p3(X19)
& r1(X0,X19) )
| ! [X25] : ~ r1(X0,X25)
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X26] :
( sP46(X26)
& ? [X31] : r1(X26,X31)
& ~ p1(X26)
& ~ p2(X26)
& ~ p3(X26)
& ~ p4(X26)
& r1(X0,X26) )
| ! [X32] : ~ r1(X0,X32)
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X33] :
( sP44(X33)
& sP45(X33)
& ~ p1(X33)
& r1(X0,X33) )
| ! [X42] :
( ! [X43] : ~ r1(X42,X43)
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(X0,X42) )
| p1(X0) )
& ( ? [X44] :
( sP42(X44)
& sP43(X44)
& ~ p1(X44)
& ~ p2(X44)
& r1(X0,X44) )
| ! [X53] :
( ! [X54] : ~ r1(X53,X54)
| p1(X53)
| p2(X53)
| p3(X53)
| p4(X53)
| ~ r1(X0,X53) )
| p1(X0)
| p2(X0) )
& ( ? [X55] :
( sP41(X55)
& sP40(X55)
& ~ p1(X55)
& ~ p2(X55)
& ~ p3(X55)
& r1(X0,X55) )
| ! [X64] :
( ! [X65] : ~ r1(X64,X65)
| p1(X64)
| p2(X64)
| p3(X64)
| p4(X64)
| ~ r1(X0,X64) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X66] :
( sP38(X66)
& sP37(X66)
& ~ p1(X66)
& ~ p2(X66)
& ~ p3(X66)
& ~ p4(X66)
& r1(X0,X66) )
| ! [X75] :
( ! [X76] : ~ r1(X75,X76)
| p1(X75)
| p2(X75)
| p3(X75)
| p4(X75)
| ~ r1(X0,X75) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X77] :
( sP34(X77)
& sP35(X77)
& ~ p1(X77)
& r1(X0,X77) )
| ! [X89] :
( ! [X90] :
( ! [X91] : ~ r1(X90,X91)
| p1(X90)
| p2(X90)
| p3(X90)
| p4(X90)
| ~ r1(X89,X90) )
| p1(X89)
| p2(X89)
| p3(X89)
| p4(X89)
| ~ r1(X0,X89) )
| p1(X0) )
& ( ? [X92] :
( sP30(X92)
& sP31(X92)
& ~ p1(X92)
& ~ p2(X92)
& r1(X0,X92) )
| ! [X104] :
( ! [X105] :
( ! [X106] : ~ r1(X105,X106)
| p1(X105)
| p2(X105)
| p3(X105)
| p4(X105)
| ~ r1(X104,X105) )
| p1(X104)
| p2(X104)
| p3(X104)
| p4(X104)
| ~ r1(X0,X104) )
| p1(X0)
| p2(X0) )
& ( ? [X107] :
( sP27(X107)
& sP26(X107)
& ~ p1(X107)
& ~ p2(X107)
& ~ p3(X107)
& r1(X0,X107) )
| ! [X119] :
( ! [X120] :
( ! [X121] : ~ r1(X120,X121)
| p1(X120)
| p2(X120)
| p3(X120)
| p4(X120)
| ~ r1(X119,X120) )
| p1(X119)
| p2(X119)
| p3(X119)
| p4(X119)
| ~ r1(X0,X119) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X122] :
( sP22(X122)
& sP21(X122)
& ~ p1(X122)
& ~ p2(X122)
& ~ p3(X122)
& ~ p4(X122)
& r1(X0,X122) )
| ! [X134] :
( ! [X135] :
( ! [X136] : ~ r1(X135,X136)
| p1(X135)
| p2(X135)
| p3(X135)
| p4(X135)
| ~ r1(X134,X135) )
| p1(X134)
| p2(X134)
| p3(X134)
| p4(X134)
| ~ r1(X0,X134) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X137] :
( sP16(X137)
& sP17(X137)
& ~ p1(X137)
& r1(X0,X137) )
| ! [X152] :
( ! [X153] :
( ! [X154] :
( ! [X155] : ~ r1(X154,X155)
| p1(X154)
| p2(X154)
| p3(X154)
| p4(X154)
| ~ r1(X153,X154) )
| p1(X153)
| p2(X153)
| p3(X153)
| p4(X153)
| ~ r1(X152,X153) )
| p1(X152)
| p2(X152)
| p3(X152)
| p4(X152)
| ~ r1(X0,X152) )
| p1(X0) )
& ( ? [X156] :
( sP10(X156)
& sP11(X156)
& ~ p1(X156)
& ~ p2(X156)
& r1(X0,X156) )
| ! [X171] :
( ! [X172] :
( ! [X173] :
( ! [X174] : ~ r1(X173,X174)
| p1(X173)
| p2(X173)
| p3(X173)
| p4(X173)
| ~ r1(X172,X173) )
| p1(X172)
| p2(X172)
| p3(X172)
| p4(X172)
| ~ r1(X171,X172) )
| p1(X171)
| p2(X171)
| p3(X171)
| p4(X171)
| ~ r1(X0,X171) )
| p1(X0)
| p2(X0) )
& ( ? [X175] :
( ! [X176] :
( ( ! [X177] :
( ~ p2(X177)
| ! [X178] :
( p2(X178)
| ~ r1(X177,X178) )
| ~ r1(X176,X177) )
& ~ p2(X176) )
| sP3(X176)
| sP4(X176)
| ~ r1(X175,X176) )
& ( ( ! [X196] :
( ~ p2(X196)
| ! [X197] :
( p2(X197)
| ~ r1(X196,X197) )
| ~ r1(X175,X196) )
& ~ p2(X175) )
| sP1(X175) )
& r1(X0,X175) )
| sP5(X0) )
& ! [X214] :
( ? [X215] :
( p1(X215)
& ? [X216] :
( ~ p1(X216)
& r1(X215,X216) )
& r1(X214,X215) )
| p1(X214)
| ~ r1(X0,X214) )
& ? [X217] :
( ~ p1(X217)
& r1(X0,X217) )
& ! [X218] :
( ? [X219] :
( p2(X219)
& ? [X220] :
( ~ p2(X220)
& r1(X219,X220) )
& r1(X218,X219) )
| p2(X218)
| ~ r1(X0,X218) )
& ? [X221] :
( ~ p2(X221)
& r1(X0,X221) )
& ! [X222] :
( ? [X223] :
( p3(X223)
& ? [X224] :
( ~ p3(X224)
& r1(X223,X224) )
& r1(X222,X223) )
| p3(X222)
| ~ r1(X0,X222) )
& ? [X225] :
( ~ p3(X225)
& r1(X0,X225) ) ),
inference(definition_folding,[],[f7,f55,f54,f53,f52,f51,f50,f49,f48,f47,f46,f45,f44,f43,f42,f41,f40,f39,f38,f37,f36,f35,f34,f33,f32,f31,f30,f29,f28,f27,f26,f25,f24,f23,f22,f21,f20,f19,f18,f17,f16,f15,f14,f13,f12,f11,f10,f9,f8]) ).
fof(f237,plain,
! [X0] :
( ( ( ? [X205] :
( p2(X205)
& ? [X206] :
( ~ p2(X206)
& r1(X205,X206) )
& r1(X0,X205) )
| p2(X0) )
& ( ? [X207] :
( ! [X208] :
( ~ p2(X208)
| ! [X209] :
( p2(X209)
| ~ r1(X208,X209) )
| ~ r1(X207,X208) )
& ~ p2(X207)
& r1(X0,X207) )
| sP0(X0) ) )
| ~ sP5(X0) ),
inference(nnf_transformation,[],[f13]) ).
fof(f238,plain,
! [X0] :
( ( ( ? [X1] :
( p2(X1)
& ? [X2] :
( ~ p2(X2)
& r1(X1,X2) )
& r1(X0,X1) )
| p2(X0) )
& ( ? [X3] :
( ! [X4] :
( ~ p2(X4)
| ! [X5] :
( p2(X5)
| ~ r1(X4,X5) )
| ~ r1(X3,X4) )
& ~ p2(X3)
& r1(X0,X3) )
| sP0(X0) ) )
| ~ sP5(X0) ),
inference(rectify,[],[f237]) ).
fof(f239,plain,
! [X0] :
( ? [X1] :
( p2(X1)
& ? [X2] :
( ~ p2(X2)
& r1(X1,X2) )
& r1(X0,X1) )
=> ( p2(sK106(X0))
& ? [X2] :
( ~ p2(X2)
& r1(sK106(X0),X2) )
& r1(X0,sK106(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f240,plain,
! [X0] :
( ? [X2] :
( ~ p2(X2)
& r1(sK106(X0),X2) )
=> ( ~ p2(sK107(X0))
& r1(sK106(X0),sK107(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f241,plain,
! [X0] :
( ? [X3] :
( ! [X4] :
( ~ p2(X4)
| ! [X5] :
( p2(X5)
| ~ r1(X4,X5) )
| ~ r1(X3,X4) )
& ~ p2(X3)
& r1(X0,X3) )
=> ( ! [X4] :
( ~ p2(X4)
| ! [X5] :
( p2(X5)
| ~ r1(X4,X5) )
| ~ r1(sK108(X0),X4) )
& ~ p2(sK108(X0))
& r1(X0,sK108(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f242,plain,
! [X0] :
( ( ( ( p2(sK106(X0))
& ~ p2(sK107(X0))
& r1(sK106(X0),sK107(X0))
& r1(X0,sK106(X0)) )
| p2(X0) )
& ( ( ! [X4] :
( ~ p2(X4)
| ! [X5] :
( p2(X5)
| ~ r1(X4,X5) )
| ~ r1(sK108(X0),X4) )
& ~ p2(sK108(X0))
& r1(X0,sK108(X0)) )
| sP0(X0) ) )
| ~ sP5(X0) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK106,sK107,sK108])],[f238,f241,f240,f239]) ).
fof(f243,plain,
! [X176] :
( ! [X186] :
( ( ( ? [X187] :
( p2(X187)
& ? [X188] :
( ~ p2(X188)
& r1(X187,X188) )
& r1(X186,X187) )
| p2(X186) )
& ( ? [X189] :
( ! [X190] :
( ~ p2(X190)
| ! [X191] :
( p2(X191)
| ~ r1(X190,X191) )
| ~ r1(X189,X190) )
& ~ p2(X189)
& r1(X186,X189) )
| sP2(X186) ) )
| ~ r1(X176,X186) )
| ~ sP4(X176) ),
inference(nnf_transformation,[],[f12]) ).
fof(f244,plain,
! [X0] :
( ! [X1] :
( ( ( ? [X2] :
( p2(X2)
& ? [X3] :
( ~ p2(X3)
& r1(X2,X3) )
& r1(X1,X2) )
| p2(X1) )
& ( ? [X4] :
( ! [X5] :
( ~ p2(X5)
| ! [X6] :
( p2(X6)
| ~ r1(X5,X6) )
| ~ r1(X4,X5) )
& ~ p2(X4)
& r1(X1,X4) )
| sP2(X1) ) )
| ~ r1(X0,X1) )
| ~ sP4(X0) ),
inference(rectify,[],[f243]) ).
fof(f245,plain,
! [X1] :
( ? [X2] :
( p2(X2)
& ? [X3] :
( ~ p2(X3)
& r1(X2,X3) )
& r1(X1,X2) )
=> ( p2(sK109(X1))
& ? [X3] :
( ~ p2(X3)
& r1(sK109(X1),X3) )
& r1(X1,sK109(X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f246,plain,
! [X1] :
( ? [X3] :
( ~ p2(X3)
& r1(sK109(X1),X3) )
=> ( ~ p2(sK110(X1))
& r1(sK109(X1),sK110(X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f247,plain,
! [X1] :
( ? [X4] :
( ! [X5] :
( ~ p2(X5)
| ! [X6] :
( p2(X6)
| ~ r1(X5,X6) )
| ~ r1(X4,X5) )
& ~ p2(X4)
& r1(X1,X4) )
=> ( ! [X5] :
( ~ p2(X5)
| ! [X6] :
( p2(X6)
| ~ r1(X5,X6) )
| ~ r1(sK111(X1),X5) )
& ~ p2(sK111(X1))
& r1(X1,sK111(X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f248,plain,
! [X0] :
( ! [X1] :
( ( ( ( p2(sK109(X1))
& ~ p2(sK110(X1))
& r1(sK109(X1),sK110(X1))
& r1(X1,sK109(X1)) )
| p2(X1) )
& ( ( ! [X5] :
( ~ p2(X5)
| ! [X6] :
( p2(X6)
| ~ r1(X5,X6) )
| ~ r1(sK111(X1),X5) )
& ~ p2(sK111(X1))
& r1(X1,sK111(X1)) )
| sP2(X1) ) )
| ~ r1(X0,X1) )
| ~ sP4(X0) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK109,sK110,sK111])],[f244,f247,f246,f245]) ).
fof(f249,plain,
! [X176] :
( ( ! [X179] :
( ? [X180] :
( p2(X180)
& ? [X181] :
( ~ p2(X181)
& r1(X180,X181) )
& r1(X179,X180) )
| p2(X179)
| ~ r1(X176,X179) )
& ? [X182] :
( ? [X183] :
( ! [X184] :
( ~ p2(X184)
| ! [X185] :
( p2(X185)
| ~ r1(X184,X185) )
| ~ r1(X183,X184) )
& ~ p2(X183)
& r1(X182,X183) )
& r1(X176,X182) ) )
| ~ sP3(X176) ),
inference(nnf_transformation,[],[f11]) ).
fof(f250,plain,
! [X0] :
( ( ! [X1] :
( ? [X2] :
( p2(X2)
& ? [X3] :
( ~ p2(X3)
& r1(X2,X3) )
& r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ? [X4] :
( ? [X5] :
( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(X5,X6) )
& ~ p2(X5)
& r1(X4,X5) )
& r1(X0,X4) ) )
| ~ sP3(X0) ),
inference(rectify,[],[f249]) ).
fof(f251,plain,
! [X1] :
( ? [X2] :
( p2(X2)
& ? [X3] :
( ~ p2(X3)
& r1(X2,X3) )
& r1(X1,X2) )
=> ( p2(sK112(X1))
& ? [X3] :
( ~ p2(X3)
& r1(sK112(X1),X3) )
& r1(X1,sK112(X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f252,plain,
! [X1] :
( ? [X3] :
( ~ p2(X3)
& r1(sK112(X1),X3) )
=> ( ~ p2(sK113(X1))
& r1(sK112(X1),sK113(X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f253,plain,
! [X0] :
( ? [X4] :
( ? [X5] :
( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(X5,X6) )
& ~ p2(X5)
& r1(X4,X5) )
& r1(X0,X4) )
=> ( ? [X5] :
( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(X5,X6) )
& ~ p2(X5)
& r1(sK114(X0),X5) )
& r1(X0,sK114(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f254,plain,
! [X0] :
( ? [X5] :
( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(X5,X6) )
& ~ p2(X5)
& r1(sK114(X0),X5) )
=> ( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(sK115(X0),X6) )
& ~ p2(sK115(X0))
& r1(sK114(X0),sK115(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f255,plain,
! [X0] :
( ( ! [X1] :
( ( p2(sK112(X1))
& ~ p2(sK113(X1))
& r1(sK112(X1),sK113(X1))
& r1(X1,sK112(X1)) )
| p2(X1)
| ~ r1(X0,X1) )
& ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(sK115(X0),X6) )
& ~ p2(sK115(X0))
& r1(sK114(X0),sK115(X0))
& r1(X0,sK114(X0)) )
| ~ sP3(X0) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK112,sK113,sK114,sK115])],[f250,f254,f253,f252,f251]) ).
fof(f261,plain,
! [X175] :
( ( ! [X198] :
( ? [X199] :
( p2(X199)
& ? [X200] :
( ~ p2(X200)
& r1(X199,X200) )
& r1(X198,X199) )
| p2(X198)
| ~ r1(X175,X198) )
& ? [X201] :
( ? [X202] :
( ! [X203] :
( ~ p2(X203)
| ! [X204] :
( p2(X204)
| ~ r1(X203,X204) )
| ~ r1(X202,X203) )
& ~ p2(X202)
& r1(X201,X202) )
& r1(X175,X201) ) )
| ~ sP1(X175) ),
inference(nnf_transformation,[],[f9]) ).
fof(f262,plain,
! [X0] :
( ( ! [X1] :
( ? [X2] :
( p2(X2)
& ? [X3] :
( ~ p2(X3)
& r1(X2,X3) )
& r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ? [X4] :
( ? [X5] :
( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(X5,X6) )
& ~ p2(X5)
& r1(X4,X5) )
& r1(X0,X4) ) )
| ~ sP1(X0) ),
inference(rectify,[],[f261]) ).
fof(f263,plain,
! [X1] :
( ? [X2] :
( p2(X2)
& ? [X3] :
( ~ p2(X3)
& r1(X2,X3) )
& r1(X1,X2) )
=> ( p2(sK118(X1))
& ? [X3] :
( ~ p2(X3)
& r1(sK118(X1),X3) )
& r1(X1,sK118(X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f264,plain,
! [X1] :
( ? [X3] :
( ~ p2(X3)
& r1(sK118(X1),X3) )
=> ( ~ p2(sK119(X1))
& r1(sK118(X1),sK119(X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f265,plain,
! [X0] :
( ? [X4] :
( ? [X5] :
( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(X5,X6) )
& ~ p2(X5)
& r1(X4,X5) )
& r1(X0,X4) )
=> ( ? [X5] :
( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(X5,X6) )
& ~ p2(X5)
& r1(sK120(X0),X5) )
& r1(X0,sK120(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f266,plain,
! [X0] :
( ? [X5] :
( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(X5,X6) )
& ~ p2(X5)
& r1(sK120(X0),X5) )
=> ( ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(sK121(X0),X6) )
& ~ p2(sK121(X0))
& r1(sK120(X0),sK121(X0)) ) ),
introduced(choice_axiom,[]) ).
fof(f267,plain,
! [X0] :
( ( ! [X1] :
( ( p2(sK118(X1))
& ~ p2(sK119(X1))
& r1(sK118(X1),sK119(X1))
& r1(X1,sK118(X1)) )
| p2(X1)
| ~ r1(X0,X1) )
& ! [X6] :
( ~ p2(X6)
| ! [X7] :
( p2(X7)
| ~ r1(X6,X7) )
| ~ r1(sK121(X0),X6) )
& ~ p2(sK121(X0))
& r1(sK120(X0),sK121(X0))
& r1(X0,sK120(X0)) )
| ~ sP1(X0) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK118,sK119,sK120,sK121])],[f262,f266,f265,f264,f263]) ).
fof(f268,plain,
! [X0] :
( ! [X210] :
( ! [X211] :
( ? [X212] :
( p2(X212)
& ? [X213] :
( ~ p2(X213)
& r1(X212,X213) )
& r1(X211,X212) )
| p2(X211)
| ~ r1(X210,X211) )
| ~ r1(X0,X210) )
| ~ sP0(X0) ),
inference(nnf_transformation,[],[f8]) ).
fof(f269,plain,
! [X0] :
( ! [X1] :
( ! [X2] :
( ? [X3] :
( p2(X3)
& ? [X4] :
( ~ p2(X4)
& r1(X3,X4) )
& r1(X2,X3) )
| p2(X2)
| ~ r1(X1,X2) )
| ~ r1(X0,X1) )
| ~ sP0(X0) ),
inference(rectify,[],[f268]) ).
fof(f270,plain,
! [X2] :
( ? [X3] :
( p2(X3)
& ? [X4] :
( ~ p2(X4)
& r1(X3,X4) )
& r1(X2,X3) )
=> ( p2(sK122(X2))
& ? [X4] :
( ~ p2(X4)
& r1(sK122(X2),X4) )
& r1(X2,sK122(X2)) ) ),
introduced(choice_axiom,[]) ).
fof(f271,plain,
! [X2] :
( ? [X4] :
( ~ p2(X4)
& r1(sK122(X2),X4) )
=> ( ~ p2(sK123(X2))
& r1(sK122(X2),sK123(X2)) ) ),
introduced(choice_axiom,[]) ).
fof(f272,plain,
! [X0] :
( ! [X1] :
( ! [X2] :
( ( p2(sK122(X2))
& ~ p2(sK123(X2))
& r1(sK122(X2),sK123(X2))
& r1(X2,sK122(X2)) )
| p2(X2)
| ~ r1(X1,X2) )
| ~ r1(X0,X1) )
| ~ sP0(X0) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK122,sK123])],[f269,f271,f270]) ).
fof(f273,plain,
? [X0] :
( ! [X1] :
( ? [X2] :
( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
& ~ p2(X2)
& r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ? [X5] :
( ! [X6] :
( ( ? [X7] : r1(X6,X7)
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
& ? [X10] : r1(X5,X10)
& ~ p1(X5)
& r1(X0,X5) )
| ! [X11] : ~ r1(X0,X11)
| p1(X0) )
& ( ? [X12] :
( ! [X13] :
( ( ? [X14] : r1(X13,X14)
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
& ? [X17] : r1(X12,X17)
& ~ p1(X12)
& ~ p2(X12)
& r1(X0,X12) )
| ! [X18] : ~ r1(X0,X18)
| p1(X0)
| p2(X0) )
& ( ? [X19] :
( sP47(X19)
& ? [X20] : r1(X19,X20)
& ~ p1(X19)
& ~ p2(X19)
& ~ p3(X19)
& r1(X0,X19) )
| ! [X21] : ~ r1(X0,X21)
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X22] :
( sP46(X22)
& ? [X23] : r1(X22,X23)
& ~ p1(X22)
& ~ p2(X22)
& ~ p3(X22)
& ~ p4(X22)
& r1(X0,X22) )
| ! [X24] : ~ r1(X0,X24)
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X25] :
( sP44(X25)
& sP45(X25)
& ~ p1(X25)
& r1(X0,X25) )
| ! [X26] :
( ! [X27] : ~ r1(X26,X27)
| p1(X26)
| p2(X26)
| p3(X26)
| p4(X26)
| ~ r1(X0,X26) )
| p1(X0) )
& ( ? [X28] :
( sP42(X28)
& sP43(X28)
& ~ p1(X28)
& ~ p2(X28)
& r1(X0,X28) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(X0,X29) )
| p1(X0)
| p2(X0) )
& ( ? [X31] :
( sP41(X31)
& sP40(X31)
& ~ p1(X31)
& ~ p2(X31)
& ~ p3(X31)
& r1(X0,X31) )
| ! [X32] :
( ! [X33] : ~ r1(X32,X33)
| p1(X32)
| p2(X32)
| p3(X32)
| p4(X32)
| ~ r1(X0,X32) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X34] :
( sP38(X34)
& sP37(X34)
& ~ p1(X34)
& ~ p2(X34)
& ~ p3(X34)
& ~ p4(X34)
& r1(X0,X34) )
| ! [X35] :
( ! [X36] : ~ r1(X35,X36)
| p1(X35)
| p2(X35)
| p3(X35)
| p4(X35)
| ~ r1(X0,X35) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X37] :
( sP34(X37)
& sP35(X37)
& ~ p1(X37)
& r1(X0,X37) )
| ! [X38] :
( ! [X39] :
( ! [X40] : ~ r1(X39,X40)
| p1(X39)
| p2(X39)
| p3(X39)
| p4(X39)
| ~ r1(X38,X39) )
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(X0,X38) )
| p1(X0) )
& ( ? [X41] :
( sP30(X41)
& sP31(X41)
& ~ p1(X41)
& ~ p2(X41)
& r1(X0,X41) )
| ! [X42] :
( ! [X43] :
( ! [X44] : ~ r1(X43,X44)
| p1(X43)
| p2(X43)
| p3(X43)
| p4(X43)
| ~ r1(X42,X43) )
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(X0,X42) )
| p1(X0)
| p2(X0) )
& ( ? [X45] :
( sP27(X45)
& sP26(X45)
& ~ p1(X45)
& ~ p2(X45)
& ~ p3(X45)
& r1(X0,X45) )
| ! [X46] :
( ! [X47] :
( ! [X48] : ~ r1(X47,X48)
| p1(X47)
| p2(X47)
| p3(X47)
| p4(X47)
| ~ r1(X46,X47) )
| p1(X46)
| p2(X46)
| p3(X46)
| p4(X46)
| ~ r1(X0,X46) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X49] :
( sP22(X49)
& sP21(X49)
& ~ p1(X49)
& ~ p2(X49)
& ~ p3(X49)
& ~ p4(X49)
& r1(X0,X49) )
| ! [X50] :
( ! [X51] :
( ! [X52] : ~ r1(X51,X52)
| p1(X51)
| p2(X51)
| p3(X51)
| p4(X51)
| ~ r1(X50,X51) )
| p1(X50)
| p2(X50)
| p3(X50)
| p4(X50)
| ~ r1(X0,X50) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X53] :
( sP16(X53)
& sP17(X53)
& ~ p1(X53)
& r1(X0,X53) )
| ! [X54] :
( ! [X55] :
( ! [X56] :
( ! [X57] : ~ r1(X56,X57)
| p1(X56)
| p2(X56)
| p3(X56)
| p4(X56)
| ~ r1(X55,X56) )
| p1(X55)
| p2(X55)
| p3(X55)
| p4(X55)
| ~ r1(X54,X55) )
| p1(X54)
| p2(X54)
| p3(X54)
| p4(X54)
| ~ r1(X0,X54) )
| p1(X0) )
& ( ? [X58] :
( sP10(X58)
& sP11(X58)
& ~ p1(X58)
& ~ p2(X58)
& r1(X0,X58) )
| ! [X59] :
( ! [X60] :
( ! [X61] :
( ! [X62] : ~ r1(X61,X62)
| p1(X61)
| p2(X61)
| p3(X61)
| p4(X61)
| ~ r1(X60,X61) )
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| p4(X59)
| ~ r1(X0,X59) )
| p1(X0)
| p2(X0) )
& ( ? [X63] :
( ! [X64] :
( ( ! [X65] :
( ~ p2(X65)
| ! [X66] :
( p2(X66)
| ~ r1(X65,X66) )
| ~ r1(X64,X65) )
& ~ p2(X64) )
| sP3(X64)
| sP4(X64)
| ~ r1(X63,X64) )
& ( ( ! [X67] :
( ~ p2(X67)
| ! [X68] :
( p2(X68)
| ~ r1(X67,X68) )
| ~ r1(X63,X67) )
& ~ p2(X63) )
| sP1(X63) )
& r1(X0,X63) )
| sP5(X0) )
& ! [X69] :
( ? [X70] :
( p1(X70)
& ? [X71] :
( ~ p1(X71)
& r1(X70,X71) )
& r1(X69,X70) )
| p1(X69)
| ~ r1(X0,X69) )
& ? [X72] :
( ~ p1(X72)
& r1(X0,X72) )
& ! [X73] :
( ? [X74] :
( p2(X74)
& ? [X75] :
( ~ p2(X75)
& r1(X74,X75) )
& r1(X73,X74) )
| p2(X73)
| ~ r1(X0,X73) )
& ? [X76] :
( ~ p2(X76)
& r1(X0,X76) )
& ! [X77] :
( ? [X78] :
( p3(X78)
& ? [X79] :
( ~ p3(X79)
& r1(X78,X79) )
& r1(X77,X78) )
| p3(X77)
| ~ r1(X0,X77) )
& ? [X80] :
( ~ p3(X80)
& r1(X0,X80) ) ),
inference(rectify,[],[f56]) ).
fof(f274,plain,
( ? [X0] :
( ! [X1] :
( ? [X2] :
( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
& ~ p2(X2)
& r1(X1,X2) )
| p2(X1)
| ~ r1(X0,X1) )
& ( ? [X5] :
( ! [X6] :
( ( ? [X7] : r1(X6,X7)
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
& ? [X10] : r1(X5,X10)
& ~ p1(X5)
& r1(X0,X5) )
| ! [X11] : ~ r1(X0,X11)
| p1(X0) )
& ( ? [X12] :
( ! [X13] :
( ( ? [X14] : r1(X13,X14)
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
& ? [X17] : r1(X12,X17)
& ~ p1(X12)
& ~ p2(X12)
& r1(X0,X12) )
| ! [X18] : ~ r1(X0,X18)
| p1(X0)
| p2(X0) )
& ( ? [X19] :
( sP47(X19)
& ? [X20] : r1(X19,X20)
& ~ p1(X19)
& ~ p2(X19)
& ~ p3(X19)
& r1(X0,X19) )
| ! [X21] : ~ r1(X0,X21)
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X22] :
( sP46(X22)
& ? [X23] : r1(X22,X23)
& ~ p1(X22)
& ~ p2(X22)
& ~ p3(X22)
& ~ p4(X22)
& r1(X0,X22) )
| ! [X24] : ~ r1(X0,X24)
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X25] :
( sP44(X25)
& sP45(X25)
& ~ p1(X25)
& r1(X0,X25) )
| ! [X26] :
( ! [X27] : ~ r1(X26,X27)
| p1(X26)
| p2(X26)
| p3(X26)
| p4(X26)
| ~ r1(X0,X26) )
| p1(X0) )
& ( ? [X28] :
( sP42(X28)
& sP43(X28)
& ~ p1(X28)
& ~ p2(X28)
& r1(X0,X28) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(X0,X29) )
| p1(X0)
| p2(X0) )
& ( ? [X31] :
( sP41(X31)
& sP40(X31)
& ~ p1(X31)
& ~ p2(X31)
& ~ p3(X31)
& r1(X0,X31) )
| ! [X32] :
( ! [X33] : ~ r1(X32,X33)
| p1(X32)
| p2(X32)
| p3(X32)
| p4(X32)
| ~ r1(X0,X32) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X34] :
( sP38(X34)
& sP37(X34)
& ~ p1(X34)
& ~ p2(X34)
& ~ p3(X34)
& ~ p4(X34)
& r1(X0,X34) )
| ! [X35] :
( ! [X36] : ~ r1(X35,X36)
| p1(X35)
| p2(X35)
| p3(X35)
| p4(X35)
| ~ r1(X0,X35) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X37] :
( sP34(X37)
& sP35(X37)
& ~ p1(X37)
& r1(X0,X37) )
| ! [X38] :
( ! [X39] :
( ! [X40] : ~ r1(X39,X40)
| p1(X39)
| p2(X39)
| p3(X39)
| p4(X39)
| ~ r1(X38,X39) )
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(X0,X38) )
| p1(X0) )
& ( ? [X41] :
( sP30(X41)
& sP31(X41)
& ~ p1(X41)
& ~ p2(X41)
& r1(X0,X41) )
| ! [X42] :
( ! [X43] :
( ! [X44] : ~ r1(X43,X44)
| p1(X43)
| p2(X43)
| p3(X43)
| p4(X43)
| ~ r1(X42,X43) )
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(X0,X42) )
| p1(X0)
| p2(X0) )
& ( ? [X45] :
( sP27(X45)
& sP26(X45)
& ~ p1(X45)
& ~ p2(X45)
& ~ p3(X45)
& r1(X0,X45) )
| ! [X46] :
( ! [X47] :
( ! [X48] : ~ r1(X47,X48)
| p1(X47)
| p2(X47)
| p3(X47)
| p4(X47)
| ~ r1(X46,X47) )
| p1(X46)
| p2(X46)
| p3(X46)
| p4(X46)
| ~ r1(X0,X46) )
| p1(X0)
| p2(X0)
| p3(X0) )
& ( ? [X49] :
( sP22(X49)
& sP21(X49)
& ~ p1(X49)
& ~ p2(X49)
& ~ p3(X49)
& ~ p4(X49)
& r1(X0,X49) )
| ! [X50] :
( ! [X51] :
( ! [X52] : ~ r1(X51,X52)
| p1(X51)
| p2(X51)
| p3(X51)
| p4(X51)
| ~ r1(X50,X51) )
| p1(X50)
| p2(X50)
| p3(X50)
| p4(X50)
| ~ r1(X0,X50) )
| p1(X0)
| p2(X0)
| p3(X0)
| p4(X0) )
& ( ? [X53] :
( sP16(X53)
& sP17(X53)
& ~ p1(X53)
& r1(X0,X53) )
| ! [X54] :
( ! [X55] :
( ! [X56] :
( ! [X57] : ~ r1(X56,X57)
| p1(X56)
| p2(X56)
| p3(X56)
| p4(X56)
| ~ r1(X55,X56) )
| p1(X55)
| p2(X55)
| p3(X55)
| p4(X55)
| ~ r1(X54,X55) )
| p1(X54)
| p2(X54)
| p3(X54)
| p4(X54)
| ~ r1(X0,X54) )
| p1(X0) )
& ( ? [X58] :
( sP10(X58)
& sP11(X58)
& ~ p1(X58)
& ~ p2(X58)
& r1(X0,X58) )
| ! [X59] :
( ! [X60] :
( ! [X61] :
( ! [X62] : ~ r1(X61,X62)
| p1(X61)
| p2(X61)
| p3(X61)
| p4(X61)
| ~ r1(X60,X61) )
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| p4(X59)
| ~ r1(X0,X59) )
| p1(X0)
| p2(X0) )
& ( ? [X63] :
( ! [X64] :
( ( ! [X65] :
( ~ p2(X65)
| ! [X66] :
( p2(X66)
| ~ r1(X65,X66) )
| ~ r1(X64,X65) )
& ~ p2(X64) )
| sP3(X64)
| sP4(X64)
| ~ r1(X63,X64) )
& ( ( ! [X67] :
( ~ p2(X67)
| ! [X68] :
( p2(X68)
| ~ r1(X67,X68) )
| ~ r1(X63,X67) )
& ~ p2(X63) )
| sP1(X63) )
& r1(X0,X63) )
| sP5(X0) )
& ! [X69] :
( ? [X70] :
( p1(X70)
& ? [X71] :
( ~ p1(X71)
& r1(X70,X71) )
& r1(X69,X70) )
| p1(X69)
| ~ r1(X0,X69) )
& ? [X72] :
( ~ p1(X72)
& r1(X0,X72) )
& ! [X73] :
( ? [X74] :
( p2(X74)
& ? [X75] :
( ~ p2(X75)
& r1(X74,X75) )
& r1(X73,X74) )
| p2(X73)
| ~ r1(X0,X73) )
& ? [X76] :
( ~ p2(X76)
& r1(X0,X76) )
& ! [X77] :
( ? [X78] :
( p3(X78)
& ? [X79] :
( ~ p3(X79)
& r1(X78,X79) )
& r1(X77,X78) )
| p3(X77)
| ~ r1(X0,X77) )
& ? [X80] :
( ~ p3(X80)
& r1(X0,X80) ) )
=> ( ! [X1] :
( ? [X2] :
( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
& ~ p2(X2)
& r1(X1,X2) )
| p2(X1)
| ~ r1(sK124,X1) )
& ( ? [X5] :
( ! [X6] :
( ( ? [X7] : r1(X6,X7)
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
& ? [X10] : r1(X5,X10)
& ~ p1(X5)
& r1(sK124,X5) )
| ! [X11] : ~ r1(sK124,X11)
| p1(sK124) )
& ( ? [X12] :
( ! [X13] :
( ( ? [X14] : r1(X13,X14)
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
& ? [X17] : r1(X12,X17)
& ~ p1(X12)
& ~ p2(X12)
& r1(sK124,X12) )
| ! [X18] : ~ r1(sK124,X18)
| p1(sK124)
| p2(sK124) )
& ( ? [X19] :
( sP47(X19)
& ? [X20] : r1(X19,X20)
& ~ p1(X19)
& ~ p2(X19)
& ~ p3(X19)
& r1(sK124,X19) )
| ! [X21] : ~ r1(sK124,X21)
| p1(sK124)
| p2(sK124)
| p3(sK124) )
& ( ? [X22] :
( sP46(X22)
& ? [X23] : r1(X22,X23)
& ~ p1(X22)
& ~ p2(X22)
& ~ p3(X22)
& ~ p4(X22)
& r1(sK124,X22) )
| ! [X24] : ~ r1(sK124,X24)
| p1(sK124)
| p2(sK124)
| p3(sK124)
| p4(sK124) )
& ( ? [X25] :
( sP44(X25)
& sP45(X25)
& ~ p1(X25)
& r1(sK124,X25) )
| ! [X26] :
( ! [X27] : ~ r1(X26,X27)
| p1(X26)
| p2(X26)
| p3(X26)
| p4(X26)
| ~ r1(sK124,X26) )
| p1(sK124) )
& ( ? [X28] :
( sP42(X28)
& sP43(X28)
& ~ p1(X28)
& ~ p2(X28)
& r1(sK124,X28) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(sK124,X29) )
| p1(sK124)
| p2(sK124) )
& ( ? [X31] :
( sP41(X31)
& sP40(X31)
& ~ p1(X31)
& ~ p2(X31)
& ~ p3(X31)
& r1(sK124,X31) )
| ! [X32] :
( ! [X33] : ~ r1(X32,X33)
| p1(X32)
| p2(X32)
| p3(X32)
| p4(X32)
| ~ r1(sK124,X32) )
| p1(sK124)
| p2(sK124)
| p3(sK124) )
& ( ? [X34] :
( sP38(X34)
& sP37(X34)
& ~ p1(X34)
& ~ p2(X34)
& ~ p3(X34)
& ~ p4(X34)
& r1(sK124,X34) )
| ! [X35] :
( ! [X36] : ~ r1(X35,X36)
| p1(X35)
| p2(X35)
| p3(X35)
| p4(X35)
| ~ r1(sK124,X35) )
| p1(sK124)
| p2(sK124)
| p3(sK124)
| p4(sK124) )
& ( ? [X37] :
( sP34(X37)
& sP35(X37)
& ~ p1(X37)
& r1(sK124,X37) )
| ! [X38] :
( ! [X39] :
( ! [X40] : ~ r1(X39,X40)
| p1(X39)
| p2(X39)
| p3(X39)
| p4(X39)
| ~ r1(X38,X39) )
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(sK124,X38) )
| p1(sK124) )
& ( ? [X41] :
( sP30(X41)
& sP31(X41)
& ~ p1(X41)
& ~ p2(X41)
& r1(sK124,X41) )
| ! [X42] :
( ! [X43] :
( ! [X44] : ~ r1(X43,X44)
| p1(X43)
| p2(X43)
| p3(X43)
| p4(X43)
| ~ r1(X42,X43) )
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(sK124,X42) )
| p1(sK124)
| p2(sK124) )
& ( ? [X45] :
( sP27(X45)
& sP26(X45)
& ~ p1(X45)
& ~ p2(X45)
& ~ p3(X45)
& r1(sK124,X45) )
| ! [X46] :
( ! [X47] :
( ! [X48] : ~ r1(X47,X48)
| p1(X47)
| p2(X47)
| p3(X47)
| p4(X47)
| ~ r1(X46,X47) )
| p1(X46)
| p2(X46)
| p3(X46)
| p4(X46)
| ~ r1(sK124,X46) )
| p1(sK124)
| p2(sK124)
| p3(sK124) )
& ( ? [X49] :
( sP22(X49)
& sP21(X49)
& ~ p1(X49)
& ~ p2(X49)
& ~ p3(X49)
& ~ p4(X49)
& r1(sK124,X49) )
| ! [X50] :
( ! [X51] :
( ! [X52] : ~ r1(X51,X52)
| p1(X51)
| p2(X51)
| p3(X51)
| p4(X51)
| ~ r1(X50,X51) )
| p1(X50)
| p2(X50)
| p3(X50)
| p4(X50)
| ~ r1(sK124,X50) )
| p1(sK124)
| p2(sK124)
| p3(sK124)
| p4(sK124) )
& ( ? [X53] :
( sP16(X53)
& sP17(X53)
& ~ p1(X53)
& r1(sK124,X53) )
| ! [X54] :
( ! [X55] :
( ! [X56] :
( ! [X57] : ~ r1(X56,X57)
| p1(X56)
| p2(X56)
| p3(X56)
| p4(X56)
| ~ r1(X55,X56) )
| p1(X55)
| p2(X55)
| p3(X55)
| p4(X55)
| ~ r1(X54,X55) )
| p1(X54)
| p2(X54)
| p3(X54)
| p4(X54)
| ~ r1(sK124,X54) )
| p1(sK124) )
& ( ? [X58] :
( sP10(X58)
& sP11(X58)
& ~ p1(X58)
& ~ p2(X58)
& r1(sK124,X58) )
| ! [X59] :
( ! [X60] :
( ! [X61] :
( ! [X62] : ~ r1(X61,X62)
| p1(X61)
| p2(X61)
| p3(X61)
| p4(X61)
| ~ r1(X60,X61) )
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| p4(X59)
| ~ r1(sK124,X59) )
| p1(sK124)
| p2(sK124) )
& ( ? [X63] :
( ! [X64] :
( ( ! [X65] :
( ~ p2(X65)
| ! [X66] :
( p2(X66)
| ~ r1(X65,X66) )
| ~ r1(X64,X65) )
& ~ p2(X64) )
| sP3(X64)
| sP4(X64)
| ~ r1(X63,X64) )
& ( ( ! [X67] :
( ~ p2(X67)
| ! [X68] :
( p2(X68)
| ~ r1(X67,X68) )
| ~ r1(X63,X67) )
& ~ p2(X63) )
| sP1(X63) )
& r1(sK124,X63) )
| sP5(sK124) )
& ! [X69] :
( ? [X70] :
( p1(X70)
& ? [X71] :
( ~ p1(X71)
& r1(X70,X71) )
& r1(X69,X70) )
| p1(X69)
| ~ r1(sK124,X69) )
& ? [X72] :
( ~ p1(X72)
& r1(sK124,X72) )
& ! [X73] :
( ? [X74] :
( p2(X74)
& ? [X75] :
( ~ p2(X75)
& r1(X74,X75) )
& r1(X73,X74) )
| p2(X73)
| ~ r1(sK124,X73) )
& ? [X76] :
( ~ p2(X76)
& r1(sK124,X76) )
& ! [X77] :
( ? [X78] :
( p3(X78)
& ? [X79] :
( ~ p3(X79)
& r1(X78,X79) )
& r1(X77,X78) )
| p3(X77)
| ~ r1(sK124,X77) )
& ? [X80] :
( ~ p3(X80)
& r1(sK124,X80) ) ) ),
introduced(choice_axiom,[]) ).
fof(f275,plain,
! [X1] :
( ? [X2] :
( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(X2,X3) )
& ~ p2(X2)
& r1(X1,X2) )
=> ( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(sK125(X1),X3) )
& ~ p2(sK125(X1))
& r1(X1,sK125(X1)) ) ),
introduced(choice_axiom,[]) ).
fof(f276,plain,
( ? [X5] :
( ! [X6] :
( ( ? [X7] : r1(X6,X7)
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(X5,X6) )
& ? [X10] : r1(X5,X10)
& ~ p1(X5)
& r1(sK124,X5) )
=> ( ! [X6] :
( ( ? [X7] : r1(X6,X7)
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(sK126,X6) )
& ? [X10] : r1(sK126,X10)
& ~ p1(sK126)
& r1(sK124,sK126) ) ),
introduced(choice_axiom,[]) ).
fof(f277,plain,
! [X6] :
( ? [X7] : r1(X6,X7)
=> r1(X6,sK127(X6)) ),
introduced(choice_axiom,[]) ).
fof(f278,plain,
( ? [X10] : r1(sK126,X10)
=> r1(sK126,sK128) ),
introduced(choice_axiom,[]) ).
fof(f279,plain,
( ? [X12] :
( ! [X13] :
( ( ? [X14] : r1(X13,X14)
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(X12,X13) )
& ? [X17] : r1(X12,X17)
& ~ p1(X12)
& ~ p2(X12)
& r1(sK124,X12) )
=> ( ! [X13] :
( ( ? [X14] : r1(X13,X14)
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(sK129,X13) )
& ? [X17] : r1(sK129,X17)
& ~ p1(sK129)
& ~ p2(sK129)
& r1(sK124,sK129) ) ),
introduced(choice_axiom,[]) ).
fof(f280,plain,
! [X13] :
( ? [X14] : r1(X13,X14)
=> r1(X13,sK130(X13)) ),
introduced(choice_axiom,[]) ).
fof(f281,plain,
( ? [X17] : r1(sK129,X17)
=> r1(sK129,sK131) ),
introduced(choice_axiom,[]) ).
fof(f282,plain,
( ? [X19] :
( sP47(X19)
& ? [X20] : r1(X19,X20)
& ~ p1(X19)
& ~ p2(X19)
& ~ p3(X19)
& r1(sK124,X19) )
=> ( sP47(sK132)
& ? [X20] : r1(sK132,X20)
& ~ p1(sK132)
& ~ p2(sK132)
& ~ p3(sK132)
& r1(sK124,sK132) ) ),
introduced(choice_axiom,[]) ).
fof(f283,plain,
( ? [X20] : r1(sK132,X20)
=> r1(sK132,sK133) ),
introduced(choice_axiom,[]) ).
fof(f284,plain,
( ? [X22] :
( sP46(X22)
& ? [X23] : r1(X22,X23)
& ~ p1(X22)
& ~ p2(X22)
& ~ p3(X22)
& ~ p4(X22)
& r1(sK124,X22) )
=> ( sP46(sK134)
& ? [X23] : r1(sK134,X23)
& ~ p1(sK134)
& ~ p2(sK134)
& ~ p3(sK134)
& ~ p4(sK134)
& r1(sK124,sK134) ) ),
introduced(choice_axiom,[]) ).
fof(f285,plain,
( ? [X23] : r1(sK134,X23)
=> r1(sK134,sK135) ),
introduced(choice_axiom,[]) ).
fof(f286,plain,
( ? [X25] :
( sP44(X25)
& sP45(X25)
& ~ p1(X25)
& r1(sK124,X25) )
=> ( sP44(sK136)
& sP45(sK136)
& ~ p1(sK136)
& r1(sK124,sK136) ) ),
introduced(choice_axiom,[]) ).
fof(f287,plain,
( ? [X28] :
( sP42(X28)
& sP43(X28)
& ~ p1(X28)
& ~ p2(X28)
& r1(sK124,X28) )
=> ( sP42(sK137)
& sP43(sK137)
& ~ p1(sK137)
& ~ p2(sK137)
& r1(sK124,sK137) ) ),
introduced(choice_axiom,[]) ).
fof(f288,plain,
( ? [X31] :
( sP41(X31)
& sP40(X31)
& ~ p1(X31)
& ~ p2(X31)
& ~ p3(X31)
& r1(sK124,X31) )
=> ( sP41(sK138)
& sP40(sK138)
& ~ p1(sK138)
& ~ p2(sK138)
& ~ p3(sK138)
& r1(sK124,sK138) ) ),
introduced(choice_axiom,[]) ).
fof(f289,plain,
( ? [X34] :
( sP38(X34)
& sP37(X34)
& ~ p1(X34)
& ~ p2(X34)
& ~ p3(X34)
& ~ p4(X34)
& r1(sK124,X34) )
=> ( sP38(sK139)
& sP37(sK139)
& ~ p1(sK139)
& ~ p2(sK139)
& ~ p3(sK139)
& ~ p4(sK139)
& r1(sK124,sK139) ) ),
introduced(choice_axiom,[]) ).
fof(f290,plain,
( ? [X37] :
( sP34(X37)
& sP35(X37)
& ~ p1(X37)
& r1(sK124,X37) )
=> ( sP34(sK140)
& sP35(sK140)
& ~ p1(sK140)
& r1(sK124,sK140) ) ),
introduced(choice_axiom,[]) ).
fof(f291,plain,
( ? [X41] :
( sP30(X41)
& sP31(X41)
& ~ p1(X41)
& ~ p2(X41)
& r1(sK124,X41) )
=> ( sP30(sK141)
& sP31(sK141)
& ~ p1(sK141)
& ~ p2(sK141)
& r1(sK124,sK141) ) ),
introduced(choice_axiom,[]) ).
fof(f292,plain,
( ? [X45] :
( sP27(X45)
& sP26(X45)
& ~ p1(X45)
& ~ p2(X45)
& ~ p3(X45)
& r1(sK124,X45) )
=> ( sP27(sK142)
& sP26(sK142)
& ~ p1(sK142)
& ~ p2(sK142)
& ~ p3(sK142)
& r1(sK124,sK142) ) ),
introduced(choice_axiom,[]) ).
fof(f293,plain,
( ? [X49] :
( sP22(X49)
& sP21(X49)
& ~ p1(X49)
& ~ p2(X49)
& ~ p3(X49)
& ~ p4(X49)
& r1(sK124,X49) )
=> ( sP22(sK143)
& sP21(sK143)
& ~ p1(sK143)
& ~ p2(sK143)
& ~ p3(sK143)
& ~ p4(sK143)
& r1(sK124,sK143) ) ),
introduced(choice_axiom,[]) ).
fof(f294,plain,
( ? [X53] :
( sP16(X53)
& sP17(X53)
& ~ p1(X53)
& r1(sK124,X53) )
=> ( sP16(sK144)
& sP17(sK144)
& ~ p1(sK144)
& r1(sK124,sK144) ) ),
introduced(choice_axiom,[]) ).
fof(f295,plain,
( ? [X58] :
( sP10(X58)
& sP11(X58)
& ~ p1(X58)
& ~ p2(X58)
& r1(sK124,X58) )
=> ( sP10(sK145)
& sP11(sK145)
& ~ p1(sK145)
& ~ p2(sK145)
& r1(sK124,sK145) ) ),
introduced(choice_axiom,[]) ).
fof(f296,plain,
( ? [X63] :
( ! [X64] :
( ( ! [X65] :
( ~ p2(X65)
| ! [X66] :
( p2(X66)
| ~ r1(X65,X66) )
| ~ r1(X64,X65) )
& ~ p2(X64) )
| sP3(X64)
| sP4(X64)
| ~ r1(X63,X64) )
& ( ( ! [X67] :
( ~ p2(X67)
| ! [X68] :
( p2(X68)
| ~ r1(X67,X68) )
| ~ r1(X63,X67) )
& ~ p2(X63) )
| sP1(X63) )
& r1(sK124,X63) )
=> ( ! [X64] :
( ( ! [X65] :
( ~ p2(X65)
| ! [X66] :
( p2(X66)
| ~ r1(X65,X66) )
| ~ r1(X64,X65) )
& ~ p2(X64) )
| sP3(X64)
| sP4(X64)
| ~ r1(sK146,X64) )
& ( ( ! [X67] :
( ~ p2(X67)
| ! [X68] :
( p2(X68)
| ~ r1(X67,X68) )
| ~ r1(sK146,X67) )
& ~ p2(sK146) )
| sP1(sK146) )
& r1(sK124,sK146) ) ),
introduced(choice_axiom,[]) ).
fof(f297,plain,
! [X69] :
( ? [X70] :
( p1(X70)
& ? [X71] :
( ~ p1(X71)
& r1(X70,X71) )
& r1(X69,X70) )
=> ( p1(sK147(X69))
& ? [X71] :
( ~ p1(X71)
& r1(sK147(X69),X71) )
& r1(X69,sK147(X69)) ) ),
introduced(choice_axiom,[]) ).
fof(f298,plain,
! [X69] :
( ? [X71] :
( ~ p1(X71)
& r1(sK147(X69),X71) )
=> ( ~ p1(sK148(X69))
& r1(sK147(X69),sK148(X69)) ) ),
introduced(choice_axiom,[]) ).
fof(f299,plain,
( ? [X72] :
( ~ p1(X72)
& r1(sK124,X72) )
=> ( ~ p1(sK149)
& r1(sK124,sK149) ) ),
introduced(choice_axiom,[]) ).
fof(f300,plain,
! [X73] :
( ? [X74] :
( p2(X74)
& ? [X75] :
( ~ p2(X75)
& r1(X74,X75) )
& r1(X73,X74) )
=> ( p2(sK150(X73))
& ? [X75] :
( ~ p2(X75)
& r1(sK150(X73),X75) )
& r1(X73,sK150(X73)) ) ),
introduced(choice_axiom,[]) ).
fof(f301,plain,
! [X73] :
( ? [X75] :
( ~ p2(X75)
& r1(sK150(X73),X75) )
=> ( ~ p2(sK151(X73))
& r1(sK150(X73),sK151(X73)) ) ),
introduced(choice_axiom,[]) ).
fof(f302,plain,
( ? [X76] :
( ~ p2(X76)
& r1(sK124,X76) )
=> ( ~ p2(sK152)
& r1(sK124,sK152) ) ),
introduced(choice_axiom,[]) ).
fof(f303,plain,
! [X77] :
( ? [X78] :
( p3(X78)
& ? [X79] :
( ~ p3(X79)
& r1(X78,X79) )
& r1(X77,X78) )
=> ( p3(sK153(X77))
& ? [X79] :
( ~ p3(X79)
& r1(sK153(X77),X79) )
& r1(X77,sK153(X77)) ) ),
introduced(choice_axiom,[]) ).
fof(f304,plain,
! [X77] :
( ? [X79] :
( ~ p3(X79)
& r1(sK153(X77),X79) )
=> ( ~ p3(sK154(X77))
& r1(sK153(X77),sK154(X77)) ) ),
introduced(choice_axiom,[]) ).
fof(f305,plain,
( ? [X80] :
( ~ p3(X80)
& r1(sK124,X80) )
=> ( ~ p3(sK155)
& r1(sK124,sK155) ) ),
introduced(choice_axiom,[]) ).
fof(f306,plain,
( ! [X1] :
( ( ! [X3] :
( ~ p2(X3)
| ! [X4] :
( p2(X4)
| ~ r1(X3,X4) )
| ~ r1(sK125(X1),X3) )
& ~ p2(sK125(X1))
& r1(X1,sK125(X1)) )
| p2(X1)
| ~ r1(sK124,X1) )
& ( ( ! [X6] :
( ( r1(X6,sK127(X6))
& ~ p1(X6) )
| ! [X8] :
( ! [X9] : ~ r1(X8,X9)
| p1(X8)
| ~ r1(X6,X8) )
| ~ r1(sK126,X6) )
& r1(sK126,sK128)
& ~ p1(sK126)
& r1(sK124,sK126) )
| ! [X11] : ~ r1(sK124,X11)
| p1(sK124) )
& ( ( ! [X13] :
( ( r1(X13,sK130(X13))
& ~ p1(X13)
& ~ p2(X13) )
| ! [X15] :
( ! [X16] : ~ r1(X15,X16)
| p1(X15)
| p2(X15)
| ~ r1(X13,X15) )
| ~ r1(sK129,X13) )
& r1(sK129,sK131)
& ~ p1(sK129)
& ~ p2(sK129)
& r1(sK124,sK129) )
| ! [X18] : ~ r1(sK124,X18)
| p1(sK124)
| p2(sK124) )
& ( ( sP47(sK132)
& r1(sK132,sK133)
& ~ p1(sK132)
& ~ p2(sK132)
& ~ p3(sK132)
& r1(sK124,sK132) )
| ! [X21] : ~ r1(sK124,X21)
| p1(sK124)
| p2(sK124)
| p3(sK124) )
& ( ( sP46(sK134)
& r1(sK134,sK135)
& ~ p1(sK134)
& ~ p2(sK134)
& ~ p3(sK134)
& ~ p4(sK134)
& r1(sK124,sK134) )
| ! [X24] : ~ r1(sK124,X24)
| p1(sK124)
| p2(sK124)
| p3(sK124)
| p4(sK124) )
& ( ( sP44(sK136)
& sP45(sK136)
& ~ p1(sK136)
& r1(sK124,sK136) )
| ! [X26] :
( ! [X27] : ~ r1(X26,X27)
| p1(X26)
| p2(X26)
| p3(X26)
| p4(X26)
| ~ r1(sK124,X26) )
| p1(sK124) )
& ( ( sP42(sK137)
& sP43(sK137)
& ~ p1(sK137)
& ~ p2(sK137)
& r1(sK124,sK137) )
| ! [X29] :
( ! [X30] : ~ r1(X29,X30)
| p1(X29)
| p2(X29)
| p3(X29)
| p4(X29)
| ~ r1(sK124,X29) )
| p1(sK124)
| p2(sK124) )
& ( ( sP41(sK138)
& sP40(sK138)
& ~ p1(sK138)
& ~ p2(sK138)
& ~ p3(sK138)
& r1(sK124,sK138) )
| ! [X32] :
( ! [X33] : ~ r1(X32,X33)
| p1(X32)
| p2(X32)
| p3(X32)
| p4(X32)
| ~ r1(sK124,X32) )
| p1(sK124)
| p2(sK124)
| p3(sK124) )
& ( ( sP38(sK139)
& sP37(sK139)
& ~ p1(sK139)
& ~ p2(sK139)
& ~ p3(sK139)
& ~ p4(sK139)
& r1(sK124,sK139) )
| ! [X35] :
( ! [X36] : ~ r1(X35,X36)
| p1(X35)
| p2(X35)
| p3(X35)
| p4(X35)
| ~ r1(sK124,X35) )
| p1(sK124)
| p2(sK124)
| p3(sK124)
| p4(sK124) )
& ( ( sP34(sK140)
& sP35(sK140)
& ~ p1(sK140)
& r1(sK124,sK140) )
| ! [X38] :
( ! [X39] :
( ! [X40] : ~ r1(X39,X40)
| p1(X39)
| p2(X39)
| p3(X39)
| p4(X39)
| ~ r1(X38,X39) )
| p1(X38)
| p2(X38)
| p3(X38)
| p4(X38)
| ~ r1(sK124,X38) )
| p1(sK124) )
& ( ( sP30(sK141)
& sP31(sK141)
& ~ p1(sK141)
& ~ p2(sK141)
& r1(sK124,sK141) )
| ! [X42] :
( ! [X43] :
( ! [X44] : ~ r1(X43,X44)
| p1(X43)
| p2(X43)
| p3(X43)
| p4(X43)
| ~ r1(X42,X43) )
| p1(X42)
| p2(X42)
| p3(X42)
| p4(X42)
| ~ r1(sK124,X42) )
| p1(sK124)
| p2(sK124) )
& ( ( sP27(sK142)
& sP26(sK142)
& ~ p1(sK142)
& ~ p2(sK142)
& ~ p3(sK142)
& r1(sK124,sK142) )
| ! [X46] :
( ! [X47] :
( ! [X48] : ~ r1(X47,X48)
| p1(X47)
| p2(X47)
| p3(X47)
| p4(X47)
| ~ r1(X46,X47) )
| p1(X46)
| p2(X46)
| p3(X46)
| p4(X46)
| ~ r1(sK124,X46) )
| p1(sK124)
| p2(sK124)
| p3(sK124) )
& ( ( sP22(sK143)
& sP21(sK143)
& ~ p1(sK143)
& ~ p2(sK143)
& ~ p3(sK143)
& ~ p4(sK143)
& r1(sK124,sK143) )
| ! [X50] :
( ! [X51] :
( ! [X52] : ~ r1(X51,X52)
| p1(X51)
| p2(X51)
| p3(X51)
| p4(X51)
| ~ r1(X50,X51) )
| p1(X50)
| p2(X50)
| p3(X50)
| p4(X50)
| ~ r1(sK124,X50) )
| p1(sK124)
| p2(sK124)
| p3(sK124)
| p4(sK124) )
& ( ( sP16(sK144)
& sP17(sK144)
& ~ p1(sK144)
& r1(sK124,sK144) )
| ! [X54] :
( ! [X55] :
( ! [X56] :
( ! [X57] : ~ r1(X56,X57)
| p1(X56)
| p2(X56)
| p3(X56)
| p4(X56)
| ~ r1(X55,X56) )
| p1(X55)
| p2(X55)
| p3(X55)
| p4(X55)
| ~ r1(X54,X55) )
| p1(X54)
| p2(X54)
| p3(X54)
| p4(X54)
| ~ r1(sK124,X54) )
| p1(sK124) )
& ( ( sP10(sK145)
& sP11(sK145)
& ~ p1(sK145)
& ~ p2(sK145)
& r1(sK124,sK145) )
| ! [X59] :
( ! [X60] :
( ! [X61] :
( ! [X62] : ~ r1(X61,X62)
| p1(X61)
| p2(X61)
| p3(X61)
| p4(X61)
| ~ r1(X60,X61) )
| p1(X60)
| p2(X60)
| p3(X60)
| p4(X60)
| ~ r1(X59,X60) )
| p1(X59)
| p2(X59)
| p3(X59)
| p4(X59)
| ~ r1(sK124,X59) )
| p1(sK124)
| p2(sK124) )
& ( ( ! [X64] :
( ( ! [X65] :
( ~ p2(X65)
| ! [X66] :
( p2(X66)
| ~ r1(X65,X66) )
| ~ r1(X64,X65) )
& ~ p2(X64) )
| sP3(X64)
| sP4(X64)
| ~ r1(sK146,X64) )
& ( ( ! [X67] :
( ~ p2(X67)
| ! [X68] :
( p2(X68)
| ~ r1(X67,X68) )
| ~ r1(sK146,X67) )
& ~ p2(sK146) )
| sP1(sK146) )
& r1(sK124,sK146) )
| sP5(sK124) )
& ! [X69] :
( ( p1(sK147(X69))
& ~ p1(sK148(X69))
& r1(sK147(X69),sK148(X69))
& r1(X69,sK147(X69)) )
| p1(X69)
| ~ r1(sK124,X69) )
& ~ p1(sK149)
& r1(sK124,sK149)
& ! [X73] :
( ( p2(sK150(X73))
& ~ p2(sK151(X73))
& r1(sK150(X73),sK151(X73))
& r1(X73,sK150(X73)) )
| p2(X73)
| ~ r1(sK124,X73) )
& ~ p2(sK152)
& r1(sK124,sK152)
& ! [X77] :
( ( p3(sK153(X77))
& ~ p3(sK154(X77))
& r1(sK153(X77),sK154(X77))
& r1(X77,sK153(X77)) )
| p3(X77)
| ~ r1(sK124,X77) )
& ~ p3(sK155)
& r1(sK124,sK155) ),
inference(skolemisation,[status(esa),new_symbols(skolem,[sK124,sK125,sK126,sK127,sK128,sK129,sK130,sK131,sK132,sK133,sK134,sK135,sK136,sK137,sK138,sK139,sK140,sK141,sK142,sK143,sK144,sK145,sK146,sK147,sK148,sK149,sK150,sK151,sK152,sK153,sK154,sK155])],[f273,f305,f304,f303,f302,f301,f300,f299,f298,f297,f296,f295,f294,f293,f292,f291,f290,f289,f288,f287,f286,f285,f284,f283,f282,f281,f280,f279,f278,f277,f276,f275,f274]) ).
fof(f559,plain,
! [X0] :
( r1(X0,sK108(X0))
| sP0(X0)
| ~ sP5(X0) ),
inference(cnf_transformation,[],[f242]) ).
fof(f560,plain,
! [X0] :
( ~ p2(sK108(X0))
| sP0(X0)
| ~ sP5(X0) ),
inference(cnf_transformation,[],[f242]) ).
fof(f561,plain,
! [X0,X4,X5] :
( ~ p2(X4)
| p2(X5)
| ~ r1(X4,X5)
| ~ r1(sK108(X0),X4)
| sP0(X0)
| ~ sP5(X0) ),
inference(cnf_transformation,[],[f242]) ).
fof(f569,plain,
! [X0,X1] :
( r1(X1,sK109(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP4(X0) ),
inference(cnf_transformation,[],[f248]) ).
fof(f570,plain,
! [X0,X1] :
( r1(sK109(X1),sK110(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP4(X0) ),
inference(cnf_transformation,[],[f248]) ).
fof(f571,plain,
! [X0,X1] :
( ~ p2(sK110(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP4(X0) ),
inference(cnf_transformation,[],[f248]) ).
fof(f572,plain,
! [X0,X1] :
( p2(sK109(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP4(X0) ),
inference(cnf_transformation,[],[f248]) ).
fof(f577,plain,
! [X0,X1] :
( r1(X1,sK112(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP3(X0) ),
inference(cnf_transformation,[],[f255]) ).
fof(f578,plain,
! [X0,X1] :
( r1(sK112(X1),sK113(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP3(X0) ),
inference(cnf_transformation,[],[f255]) ).
fof(f579,plain,
! [X0,X1] :
( ~ p2(sK113(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP3(X0) ),
inference(cnf_transformation,[],[f255]) ).
fof(f580,plain,
! [X0,X1] :
( p2(sK112(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP3(X0) ),
inference(cnf_transformation,[],[f255]) ).
fof(f585,plain,
! [X0] :
( r1(X0,sK120(X0))
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f267]) ).
fof(f586,plain,
! [X0] :
( r1(sK120(X0),sK121(X0))
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f267]) ).
fof(f587,plain,
! [X0] :
( ~ p2(sK121(X0))
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f267]) ).
fof(f588,plain,
! [X0,X6,X7] :
( ~ p2(X6)
| p2(X7)
| ~ r1(X6,X7)
| ~ r1(sK121(X0),X6)
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f267]) ).
fof(f589,plain,
! [X0,X1] :
( r1(X1,sK118(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f267]) ).
fof(f590,plain,
! [X0,X1] :
( r1(sK118(X1),sK119(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f267]) ).
fof(f591,plain,
! [X0,X1] :
( ~ p2(sK119(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f267]) ).
fof(f592,plain,
! [X0,X1] :
( p2(sK118(X1))
| p2(X1)
| ~ r1(X0,X1)
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f267]) ).
fof(f593,plain,
! [X2,X0,X1] :
( r1(X2,sK122(X2))
| p2(X2)
| ~ r1(X1,X2)
| ~ r1(X0,X1)
| ~ sP0(X0) ),
inference(cnf_transformation,[],[f272]) ).
fof(f594,plain,
! [X2,X0,X1] :
( r1(sK122(X2),sK123(X2))
| p2(X2)
| ~ r1(X1,X2)
| ~ r1(X0,X1)
| ~ sP0(X0) ),
inference(cnf_transformation,[],[f272]) ).
fof(f595,plain,
! [X2,X0,X1] :
( ~ p2(sK123(X2))
| p2(X2)
| ~ r1(X1,X2)
| ~ r1(X0,X1)
| ~ sP0(X0) ),
inference(cnf_transformation,[],[f272]) ).
fof(f596,plain,
! [X2,X0,X1] :
( p2(sK122(X2))
| p2(X2)
| ~ r1(X1,X2)
| ~ r1(X0,X1)
| ~ sP0(X0) ),
inference(cnf_transformation,[],[f272]) ).
fof(f603,plain,
r1(sK124,sK152),
inference(cnf_transformation,[],[f306]) ).
fof(f604,plain,
~ p2(sK152),
inference(cnf_transformation,[],[f306]) ).
fof(f605,plain,
! [X73] :
( r1(X73,sK150(X73))
| p2(X73)
| ~ r1(sK124,X73) ),
inference(cnf_transformation,[],[f306]) ).
fof(f606,plain,
! [X73] :
( r1(sK150(X73),sK151(X73))
| p2(X73)
| ~ r1(sK124,X73) ),
inference(cnf_transformation,[],[f306]) ).
fof(f607,plain,
! [X73] :
( ~ p2(sK151(X73))
| p2(X73)
| ~ r1(sK124,X73) ),
inference(cnf_transformation,[],[f306]) ).
fof(f608,plain,
! [X73] :
( p2(sK150(X73))
| p2(X73)
| ~ r1(sK124,X73) ),
inference(cnf_transformation,[],[f306]) ).
fof(f615,plain,
( r1(sK124,sK146)
| sP5(sK124) ),
inference(cnf_transformation,[],[f306]) ).
fof(f616,plain,
( ~ p2(sK146)
| sP1(sK146)
| sP5(sK124) ),
inference(cnf_transformation,[],[f306]) ).
fof(f617,plain,
! [X68,X67] :
( ~ p2(X67)
| p2(X68)
| ~ r1(X67,X68)
| ~ r1(sK146,X67)
| sP1(sK146)
| sP5(sK124) ),
inference(cnf_transformation,[],[f306]) ).
fof(f618,plain,
! [X64] :
( ~ p2(X64)
| sP3(X64)
| sP4(X64)
| ~ r1(sK146,X64)
| sP5(sK124) ),
inference(cnf_transformation,[],[f306]) ).
fof(f619,plain,
! [X65,X66,X64] :
( ~ p2(X65)
| p2(X66)
| ~ r1(X65,X66)
| ~ r1(X64,X65)
| sP3(X64)
| sP4(X64)
| ~ r1(sK146,X64)
| sP5(sK124) ),
inference(cnf_transformation,[],[f306]) ).
fof(f698,plain,
! [X1] :
( r1(X1,sK125(X1))
| p2(X1)
| ~ r1(sK124,X1) ),
inference(cnf_transformation,[],[f306]) ).
fof(f699,plain,
! [X1] :
( ~ p2(sK125(X1))
| p2(X1)
| ~ r1(sK124,X1) ),
inference(cnf_transformation,[],[f306]) ).
fof(f700,plain,
! [X3,X1,X4] :
( ~ p2(X3)
| p2(X4)
| ~ r1(X3,X4)
| ~ r1(sK125(X1),X3)
| p2(X1)
| ~ r1(sK124,X1) ),
inference(cnf_transformation,[],[f306]) ).
cnf(c_305,plain,
( ~ r1(sK108(X0),X1)
| ~ r1(X1,X2)
| ~ p2(X1)
| ~ sP5(X0)
| p2(X2)
| sP0(X0) ),
inference(cnf_transformation,[],[f561]) ).
cnf(c_306,plain,
( ~ p2(sK108(X0))
| ~ sP5(X0)
| sP0(X0) ),
inference(cnf_transformation,[],[f560]) ).
cnf(c_307,plain,
( ~ sP5(X0)
| r1(X0,sK108(X0))
| sP0(X0) ),
inference(cnf_transformation,[],[f559]) ).
cnf(c_308,plain,
( ~ r1(X0,X1)
| ~ sP4(X0)
| p2(sK109(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f572]) ).
cnf(c_309,plain,
( ~ r1(X0,X1)
| ~ p2(sK110(X1))
| ~ sP4(X0)
| p2(X1) ),
inference(cnf_transformation,[],[f571]) ).
cnf(c_310,plain,
( ~ r1(X0,X1)
| ~ sP4(X0)
| r1(sK109(X1),sK110(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f570]) ).
cnf(c_311,plain,
( ~ r1(X0,X1)
| ~ sP4(X0)
| r1(X1,sK109(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f569]) ).
cnf(c_315,plain,
( ~ r1(X0,X1)
| ~ sP3(X0)
| p2(sK112(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f580]) ).
cnf(c_316,plain,
( ~ r1(X0,X1)
| ~ p2(sK113(X1))
| ~ sP3(X0)
| p2(X1) ),
inference(cnf_transformation,[],[f579]) ).
cnf(c_317,plain,
( ~ r1(X0,X1)
| ~ sP3(X0)
| r1(sK112(X1),sK113(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f578]) ).
cnf(c_318,plain,
( ~ r1(X0,X1)
| ~ sP3(X0)
| r1(X1,sK112(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f577]) ).
cnf(c_327,plain,
( ~ r1(X0,X1)
| ~ sP1(X0)
| p2(sK118(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f592]) ).
cnf(c_328,plain,
( ~ r1(X0,X1)
| ~ p2(sK119(X1))
| ~ sP1(X0)
| p2(X1) ),
inference(cnf_transformation,[],[f591]) ).
cnf(c_329,plain,
( ~ r1(X0,X1)
| ~ sP1(X0)
| r1(sK118(X1),sK119(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f590]) ).
cnf(c_330,plain,
( ~ r1(X0,X1)
| ~ sP1(X0)
| r1(X1,sK118(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f589]) ).
cnf(c_331,plain,
( ~ r1(sK121(X0),X1)
| ~ r1(X1,X2)
| ~ p2(X1)
| ~ sP1(X0)
| p2(X2) ),
inference(cnf_transformation,[],[f588]) ).
cnf(c_332,plain,
( ~ p2(sK121(X0))
| ~ sP1(X0) ),
inference(cnf_transformation,[],[f587]) ).
cnf(c_333,plain,
( ~ sP1(X0)
| r1(sK120(X0),sK121(X0)) ),
inference(cnf_transformation,[],[f586]) ).
cnf(c_334,plain,
( ~ sP1(X0)
| r1(X0,sK120(X0)) ),
inference(cnf_transformation,[],[f585]) ).
cnf(c_335,plain,
( ~ r1(X0,X1)
| ~ r1(X2,X0)
| ~ sP0(X2)
| p2(sK122(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f596]) ).
cnf(c_336,plain,
( ~ r1(X0,X1)
| ~ r1(X2,X0)
| ~ p2(sK123(X1))
| ~ sP0(X2)
| p2(X1) ),
inference(cnf_transformation,[],[f595]) ).
cnf(c_337,plain,
( ~ r1(X0,X1)
| ~ r1(X2,X0)
| ~ sP0(X2)
| r1(sK122(X1),sK123(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f594]) ).
cnf(c_338,plain,
( ~ r1(X0,X1)
| ~ r1(X2,X0)
| ~ sP0(X2)
| r1(X1,sK122(X1))
| p2(X1) ),
inference(cnf_transformation,[],[f593]) ).
cnf(c_339,negated_conjecture,
( ~ r1(sK125(X0),X1)
| ~ r1(X1,X2)
| ~ r1(sK124,X0)
| ~ p2(X1)
| p2(X0)
| p2(X2) ),
inference(cnf_transformation,[],[f700]) ).
cnf(c_340,negated_conjecture,
( ~ r1(sK124,X0)
| ~ p2(sK125(X0))
| p2(X0) ),
inference(cnf_transformation,[],[f699]) ).
cnf(c_341,negated_conjecture,
( ~ r1(sK124,X0)
| r1(X0,sK125(X0))
| p2(X0) ),
inference(cnf_transformation,[],[f698]) ).
cnf(c_420,negated_conjecture,
( ~ r1(X0,X1)
| ~ r1(X2,X0)
| ~ r1(sK146,X2)
| ~ p2(X0)
| p2(X1)
| sP4(X2)
| sP3(X2)
| sP5(sK124) ),
inference(cnf_transformation,[],[f619]) ).
cnf(c_421,negated_conjecture,
( ~ r1(sK146,X0)
| ~ p2(X0)
| sP4(X0)
| sP3(X0)
| sP5(sK124) ),
inference(cnf_transformation,[],[f618]) ).
cnf(c_422,negated_conjecture,
( ~ r1(X0,X1)
| ~ r1(sK146,X0)
| ~ p2(X0)
| p2(X1)
| sP5(sK124)
| sP1(sK146) ),
inference(cnf_transformation,[],[f617]) ).
cnf(c_423,negated_conjecture,
( ~ p2(sK146)
| sP5(sK124)
| sP1(sK146) ),
inference(cnf_transformation,[],[f616]) ).
cnf(c_424,negated_conjecture,
( r1(sK124,sK146)
| sP5(sK124) ),
inference(cnf_transformation,[],[f615]) ).
cnf(c_431,negated_conjecture,
( ~ r1(sK124,X0)
| p2(sK150(X0))
| p2(X0) ),
inference(cnf_transformation,[],[f608]) ).
cnf(c_432,negated_conjecture,
( ~ r1(sK124,X0)
| ~ p2(sK151(X0))
| p2(X0) ),
inference(cnf_transformation,[],[f607]) ).
cnf(c_433,negated_conjecture,
( ~ r1(sK124,X0)
| r1(sK150(X0),sK151(X0))
| p2(X0) ),
inference(cnf_transformation,[],[f606]) ).
cnf(c_434,negated_conjecture,
( ~ r1(sK124,X0)
| r1(X0,sK150(X0))
| p2(X0) ),
inference(cnf_transformation,[],[f605]) ).
cnf(c_435,negated_conjecture,
~ p2(sK152),
inference(cnf_transformation,[],[f604]) ).
cnf(c_436,negated_conjecture,
r1(sK124,sK152),
inference(cnf_transformation,[],[f603]) ).
cnf(c_636,plain,
( ~ sP5(sK124)
| r1(sK124,sK108(sK124))
| sP0(sK124) ),
inference(instantiation,[status(thm)],[c_307]) ).
cnf(c_637,plain,
( ~ p2(sK108(sK124))
| ~ sP5(sK124)
| sP0(sK124) ),
inference(instantiation,[status(thm)],[c_306]) ).
cnf(c_8937,negated_conjecture,
( ~ r1(X0,X1)
| ~ r1(sK146,X0)
| ~ p2(X0)
| p2(X1)
| ~ sP0_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP0_iProver_split])],[c_422]) ).
cnf(c_8938,negated_conjecture,
( sP5(sK124)
| sP1(sK146)
| sP0_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_422]) ).
cnf(c_8941,plain,
( ~ r1(sK124,sK146)
| r1(sK146,sK150(sK146))
| p2(sK146) ),
inference(instantiation,[status(thm)],[c_434]) ).
cnf(c_8942,plain,
( ~ r1(sK124,sK146)
| r1(sK150(sK146),sK151(sK146))
| p2(sK146) ),
inference(instantiation,[status(thm)],[c_433]) ).
cnf(c_8943,plain,
( ~ r1(sK124,sK146)
| p2(sK150(sK146))
| p2(sK146) ),
inference(instantiation,[status(thm)],[c_431]) ).
cnf(c_8962,plain,
( ~ r1(sK124,sK152)
| r1(sK152,sK125(sK152))
| p2(sK152) ),
inference(instantiation,[status(thm)],[c_341]) ).
cnf(c_9034,plain,
( ~ r1(sK124,sK108(X0))
| r1(sK150(sK108(X0)),sK151(sK108(X0)))
| p2(sK108(X0)) ),
inference(instantiation,[status(thm)],[c_433]) ).
cnf(c_9035,plain,
( ~ r1(sK124,sK108(sK124))
| r1(sK150(sK108(sK124)),sK151(sK108(sK124)))
| p2(sK108(sK124)) ),
inference(instantiation,[status(thm)],[c_9034]) ).
cnf(c_9044,plain,
( ~ r1(sK124,sK108(X0))
| r1(sK108(X0),sK150(sK108(X0)))
| p2(sK108(X0)) ),
inference(instantiation,[status(thm)],[c_434]) ).
cnf(c_9045,plain,
( ~ r1(sK124,sK108(sK124))
| r1(sK108(sK124),sK150(sK108(sK124)))
| p2(sK108(sK124)) ),
inference(instantiation,[status(thm)],[c_9044]) ).
cnf(c_9106,plain,
( ~ sP1(sK146)
| r1(sK146,sK120(sK146)) ),
inference(instantiation,[status(thm)],[c_334]) ).
cnf(c_9107,plain,
( ~ sP1(sK146)
| r1(sK120(sK146),sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_333]) ).
cnf(c_9108,plain,
( ~ p2(sK121(sK146))
| ~ sP1(sK146) ),
inference(instantiation,[status(thm)],[c_332]) ).
cnf(c_9110,plain,
( ~ r1(sK146,X0)
| ~ sP1(sK146)
| r1(X0,sK118(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_330]) ).
cnf(c_9111,plain,
( ~ r1(sK146,X0)
| ~ sP1(sK146)
| r1(sK118(X0),sK119(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_329]) ).
cnf(c_9112,plain,
( ~ r1(sK146,X0)
| ~ p2(sK119(X0))
| ~ sP1(sK146)
| p2(X0) ),
inference(instantiation,[status(thm)],[c_328]) ).
cnf(c_9113,plain,
( ~ r1(sK146,X0)
| ~ sP1(sK146)
| p2(sK118(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_327]) ).
cnf(c_9126,plain,
( ~ r1(sK120(sK146),X0)
| ~ r1(sK146,sK120(sK146))
| ~ r1(X0,X1)
| ~ p2(X0)
| sP4(sK120(sK146))
| sP3(sK120(sK146))
| p2(X1)
| sP5(sK124) ),
inference(instantiation,[status(thm)],[c_420]) ).
cnf(c_9127,plain,
( ~ r1(sK146,sK120(sK146))
| ~ sP1(sK146)
| p2(sK118(sK120(sK146)))
| p2(sK120(sK146)) ),
inference(instantiation,[status(thm)],[c_9113]) ).
cnf(c_9128,plain,
( ~ r1(sK146,sK120(sK146))
| ~ p2(sK119(sK120(sK146)))
| ~ sP1(sK146)
| p2(sK120(sK146)) ),
inference(instantiation,[status(thm)],[c_9112]) ).
cnf(c_9129,plain,
( ~ r1(sK146,sK120(sK146))
| ~ sP1(sK146)
| r1(sK118(sK120(sK146)),sK119(sK120(sK146)))
| p2(sK120(sK146)) ),
inference(instantiation,[status(thm)],[c_9111]) ).
cnf(c_9130,plain,
( ~ r1(sK146,sK120(sK146))
| ~ sP1(sK146)
| r1(sK120(sK146),sK118(sK120(sK146)))
| p2(sK120(sK146)) ),
inference(instantiation,[status(thm)],[c_9110]) ).
cnf(c_9144,plain,
( ~ r1(sK120(sK146),sK118(sK120(sK146)))
| ~ r1(sK118(sK120(sK146)),X0)
| ~ r1(sK146,sK120(sK146))
| ~ p2(sK118(sK120(sK146)))
| sP4(sK120(sK146))
| sP3(sK120(sK146))
| p2(X0)
| sP5(sK124) ),
inference(instantiation,[status(thm)],[c_9126]) ).
cnf(c_9146,plain,
( ~ r1(sK118(sK120(sK146)),sK119(sK120(sK146)))
| ~ r1(sK120(sK146),sK118(sK120(sK146)))
| ~ r1(sK146,sK120(sK146))
| ~ p2(sK118(sK120(sK146)))
| p2(sK119(sK120(sK146)))
| sP4(sK120(sK146))
| sP3(sK120(sK146))
| sP5(sK124) ),
inference(instantiation,[status(thm)],[c_9144]) ).
cnf(c_9153,plain,
( ~ r1(sK150(sK146),X0)
| ~ r1(sK146,sK150(sK146))
| ~ p2(sK150(sK146))
| ~ sP0_iProver_split
| p2(X0) ),
inference(instantiation,[status(thm)],[c_8937]) ).
cnf(c_9166,plain,
( ~ r1(sK150(sK146),sK151(sK146))
| ~ r1(sK146,sK150(sK146))
| ~ p2(sK150(sK146))
| ~ sP0_iProver_split
| p2(sK151(sK146)) ),
inference(instantiation,[status(thm)],[c_9153]) ).
cnf(c_9279,plain,
( ~ r1(sK124,sK146)
| ~ p2(sK151(sK146))
| p2(sK146) ),
inference(instantiation,[status(thm)],[c_432]) ).
cnf(c_9309,plain,
( ~ r1(sK152,X0)
| ~ r1(sK124,sK152)
| ~ sP0(sK124)
| p2(sK122(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_335]) ).
cnf(c_9339,plain,
( ~ r1(sK152,X0)
| ~ r1(sK124,sK152)
| ~ sP0(sK124)
| r1(sK122(X0),sK123(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_337]) ).
cnf(c_9369,plain,
( ~ r1(sK152,X0)
| ~ r1(sK124,sK152)
| ~ sP0(sK124)
| r1(X0,sK122(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_338]) ).
cnf(c_9406,plain,
( ~ r1(sK152,sK125(sK152))
| ~ r1(sK124,sK152)
| ~ sP0(sK124)
| p2(sK122(sK125(sK152)))
| p2(sK125(sK152)) ),
inference(instantiation,[status(thm)],[c_9309]) ).
cnf(c_9430,plain,
( sP1(sK146)
| sP5(sK124) ),
inference(global_subsumption_just,[status(thm)],[c_8938,c_424,c_423,c_8938,c_8943,c_8942,c_8941,c_9166,c_9279]) ).
cnf(c_9431,negated_conjecture,
( sP5(sK124)
| sP1(sK146) ),
inference(renaming,[status(thm)],[c_9430]) ).
cnf(c_9446,plain,
( ~ r1(sK152,sK125(sK152))
| ~ r1(sK124,sK152)
| ~ sP0(sK124)
| r1(sK122(sK125(sK152)),sK123(sK125(sK152)))
| p2(sK125(sK152)) ),
inference(instantiation,[status(thm)],[c_9339]) ).
cnf(c_9456,plain,
( ~ p2(sK125(sK152))
| p2(sK152) ),
inference(superposition,[status(thm)],[c_436,c_340]) ).
cnf(c_9484,plain,
( ~ r1(sK152,sK125(sK152))
| ~ r1(sK124,sK152)
| ~ sP0(sK124)
| r1(sK125(sK152),sK122(sK125(sK152)))
| p2(sK125(sK152)) ),
inference(instantiation,[status(thm)],[c_9369]) ).
cnf(c_9669,plain,
( ~ p2(sK151(sK108(sK124)))
| ~ sP5(sK124)
| p2(sK108(sK124))
| sP0(sK124) ),
inference(superposition,[status(thm)],[c_307,c_432]) ).
cnf(c_9672,plain,
( ~ sP5(sK124)
| p2(sK150(sK108(sK124)))
| p2(sK108(sK124))
| sP0(sK124) ),
inference(superposition,[status(thm)],[c_307,c_431]) ).
cnf(c_9752,plain,
( ~ p2(sK120(sK146))
| ~ sP1(sK146)
| sP4(sK120(sK146))
| sP3(sK120(sK146))
| sP5(sK124) ),
inference(superposition,[status(thm)],[c_334,c_421]) ).
cnf(c_9758,plain,
( ~ r1(sK125(sK152),sK122(sK125(sK152)))
| ~ r1(sK122(sK125(sK152)),X0)
| ~ p2(sK122(sK125(sK152)))
| ~ r1(sK124,sK152)
| p2(X0)
| p2(sK152) ),
inference(instantiation,[status(thm)],[c_339]) ).
cnf(c_9958,plain,
( ~ r1(sK122(sK125(sK152)),sK123(sK125(sK152)))
| ~ r1(sK125(sK152),sK122(sK125(sK152)))
| ~ p2(sK122(sK125(sK152)))
| ~ r1(sK124,sK152)
| p2(sK123(sK125(sK152)))
| p2(sK152) ),
inference(instantiation,[status(thm)],[c_9758]) ).
cnf(c_10008,plain,
( ~ r1(X0,sK125(sK152))
| ~ p2(sK123(sK125(sK152)))
| ~ r1(X1,X0)
| ~ sP0(X1)
| p2(sK125(sK152)) ),
inference(instantiation,[status(thm)],[c_336]) ).
cnf(c_10046,plain,
( ~ r1(sK152,sK125(sK152))
| ~ p2(sK123(sK125(sK152)))
| ~ r1(X0,sK152)
| ~ sP0(X0)
| p2(sK125(sK152)) ),
inference(instantiation,[status(thm)],[c_10008]) ).
cnf(c_10047,plain,
( ~ r1(sK152,sK125(sK152))
| ~ p2(sK123(sK125(sK152)))
| ~ r1(sK124,sK152)
| ~ sP0(sK124)
| p2(sK125(sK152)) ),
inference(instantiation,[status(thm)],[c_10046]) ).
cnf(c_10142,plain,
( ~ r1(sK108(X0),sK150(sK108(X0)))
| ~ r1(sK150(sK108(X0)),X1)
| ~ p2(sK150(sK108(X0)))
| ~ sP5(X0)
| p2(X1)
| sP0(X0) ),
inference(instantiation,[status(thm)],[c_305]) ).
cnf(c_10224,plain,
( ~ p2(sK120(sK146))
| ~ sP1(sK146)
| sP4(sK120(sK146))
| sP3(sK120(sK146))
| sP5(sK124) ),
inference(resolution,[status(thm)],[c_421,c_334]) ).
cnf(c_10238,plain,
( ~ r1(sK150(sK108(X0)),sK151(sK108(X0)))
| ~ r1(sK108(X0),sK150(sK108(X0)))
| ~ p2(sK150(sK108(X0)))
| ~ sP5(X0)
| p2(sK151(sK108(X0)))
| sP0(X0) ),
inference(instantiation,[status(thm)],[c_10142]) ).
cnf(c_10239,plain,
( ~ r1(sK150(sK108(sK124)),sK151(sK108(sK124)))
| ~ r1(sK108(sK124),sK150(sK108(sK124)))
| ~ p2(sK150(sK108(sK124)))
| ~ sP5(sK124)
| p2(sK151(sK108(sK124)))
| sP0(sK124) ),
inference(instantiation,[status(thm)],[c_10238]) ).
cnf(c_10287,plain,
( ~ r1(sK121(sK146),X0)
| ~ r1(X0,X1)
| ~ p2(X0)
| ~ sP1(sK146)
| p2(X1) ),
inference(instantiation,[status(thm)],[c_331]) ).
cnf(c_10596,plain,
( ~ r1(X0,sK121(sK146))
| ~ sP3(X0)
| p2(sK112(sK121(sK146)))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_315]) ).
cnf(c_10683,plain,
( sP4(sK120(sK146))
| sP3(sK120(sK146))
| sP5(sK124) ),
inference(global_subsumption_just,[status(thm)],[c_10224,c_9106,c_9130,c_9129,c_9128,c_9127,c_9146,c_9431,c_9752]) ).
cnf(c_10798,plain,
( ~ r1(sK120(sK146),sK121(sK146))
| ~ sP3(sK120(sK146))
| p2(sK112(sK121(sK146)))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_10596]) ).
cnf(c_10812,plain,
( ~ r1(sK120(sK146),X0)
| ~ sP3(sK120(sK146))
| r1(X0,sK112(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_318]) ).
cnf(c_10813,plain,
( ~ r1(sK120(sK146),X0)
| ~ sP3(sK120(sK146))
| r1(sK112(X0),sK113(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_317]) ).
cnf(c_10814,plain,
( ~ r1(sK120(sK146),X0)
| ~ p2(sK113(X0))
| ~ sP3(sK120(sK146))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_316]) ).
cnf(c_11011,plain,
( ~ sP5(sK124)
| p2(sK150(sK108(sK124)))
| p2(sK108(sK124))
| sP0(sK124) ),
inference(resolution,[status(thm)],[c_307,c_431]) ).
cnf(c_11033,plain,
( ~ r1(sK120(sK146),sK121(sK146))
| ~ sP3(sK120(sK146))
| r1(sK121(sK146),sK112(sK121(sK146)))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_10812]) ).
cnf(c_11068,plain,
( ~ r1(sK120(sK146),sK121(sK146))
| ~ sP3(sK120(sK146))
| r1(sK112(sK121(sK146)),sK113(sK121(sK146)))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_10813]) ).
cnf(c_11135,plain,
( ~ r1(sK121(sK146),sK112(sK121(sK146)))
| ~ r1(sK112(sK121(sK146)),X0)
| ~ p2(sK112(sK121(sK146)))
| ~ sP1(sK146)
| p2(X0) ),
inference(instantiation,[status(thm)],[c_10287]) ).
cnf(c_11194,plain,
( ~ r1(sK112(sK121(sK146)),sK113(sK121(sK146)))
| ~ r1(sK121(sK146),sK112(sK121(sK146)))
| ~ p2(sK112(sK121(sK146)))
| ~ sP1(sK146)
| p2(sK113(sK121(sK146))) ),
inference(instantiation,[status(thm)],[c_11135]) ).
cnf(c_11453,plain,
( ~ sP5(sK124)
| sP0(sK124) ),
inference(global_subsumption_just,[status(thm)],[c_11011,c_436,c_435,c_636,c_637,c_8962,c_9035,c_9045,c_9406,c_9446,c_9456,c_9484,c_9672,c_9669,c_9958,c_10047,c_10239]) ).
cnf(c_11455,plain,
~ sP5(sK124),
inference(global_subsumption_just,[status(thm)],[c_11453,c_436,c_435,c_8962,c_9406,c_9446,c_9456,c_9484,c_9958,c_10047,c_11453]) ).
cnf(c_11469,plain,
( sP4(sK120(sK146))
| sP3(sK120(sK146)) ),
inference(backward_subsumption_resolution,[status(thm)],[c_10683,c_11455]) ).
cnf(c_12179,plain,
( ~ r1(sK120(sK146),sK121(sK146))
| ~ p2(sK113(sK121(sK146)))
| ~ sP3(sK120(sK146))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_10814]) ).
cnf(c_12184,plain,
( ~ r1(sK120(sK146),X0)
| ~ sP4(sK120(sK146))
| r1(X0,sK109(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_311]) ).
cnf(c_12185,plain,
( ~ r1(sK120(sK146),X0)
| ~ sP4(sK120(sK146))
| r1(sK109(X0),sK110(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_310]) ).
cnf(c_12186,plain,
( ~ r1(sK120(sK146),X0)
| ~ p2(sK110(X0))
| ~ sP4(sK120(sK146))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_309]) ).
cnf(c_12187,plain,
( ~ r1(sK120(sK146),X0)
| ~ sP4(sK120(sK146))
| p2(sK109(X0))
| p2(X0) ),
inference(instantiation,[status(thm)],[c_308]) ).
cnf(c_12306,plain,
( ~ r1(sK120(sK146),sK121(sK146))
| ~ sP4(sK120(sK146))
| r1(sK121(sK146),sK109(sK121(sK146)))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_12184]) ).
cnf(c_12311,plain,
( ~ r1(sK120(sK146),sK121(sK146))
| ~ sP4(sK120(sK146))
| r1(sK109(sK121(sK146)),sK110(sK121(sK146)))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_12185]) ).
cnf(c_12318,plain,
( ~ r1(sK120(sK146),sK121(sK146))
| ~ sP4(sK120(sK146))
| p2(sK109(sK121(sK146)))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_12187]) ).
cnf(c_12367,plain,
( ~ r1(sK121(sK146),sK109(sK121(sK146)))
| ~ r1(sK109(sK121(sK146)),X0)
| ~ p2(sK109(sK121(sK146)))
| ~ sP1(sK146)
| p2(X0) ),
inference(instantiation,[status(thm)],[c_10287]) ).
cnf(c_12639,plain,
( ~ r1(sK109(sK121(sK146)),sK110(sK121(sK146)))
| ~ r1(sK121(sK146),sK109(sK121(sK146)))
| ~ p2(sK109(sK121(sK146)))
| ~ sP1(sK146)
| p2(sK110(sK121(sK146))) ),
inference(instantiation,[status(thm)],[c_12367]) ).
cnf(c_12748,plain,
( ~ r1(sK120(sK146),sK121(sK146))
| ~ p2(sK110(sK121(sK146)))
| ~ sP4(sK120(sK146))
| p2(sK121(sK146)) ),
inference(instantiation,[status(thm)],[c_12186]) ).
cnf(c_12751,plain,
$false,
inference(prop_impl_just,[status(thm)],[c_12748,c_12639,c_12318,c_12311,c_12306,c_12179,c_11469,c_11455,c_11194,c_11068,c_11033,c_10798,c_9431,c_9107,c_9108]) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.13 % Problem : LCL642+1.015 : TPTP v8.1.2. Released v4.0.0.
% 0.00/0.14 % Command : run_iprover %s %d THM
% 0.15/0.36 % Computer : n010.cluster.edu
% 0.15/0.36 % Model : x86_64 x86_64
% 0.15/0.36 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.15/0.36 % Memory : 8042.1875MB
% 0.15/0.36 % OS : Linux 3.10.0-693.el7.x86_64
% 0.15/0.36 % CPULimit : 300
% 0.15/0.36 % WCLimit : 300
% 0.15/0.36 % DateTime : Thu Aug 24 16:43:36 EDT 2023
% 0.15/0.36 % CPUTime :
% 0.22/0.49 Running first-order theorem proving
% 0.22/0.49 Running: /export/starexec/sandbox2/solver/bin/run_problem --schedule fof_schedule --no_cores 8 /export/starexec/sandbox2/benchmark/theBenchmark.p 300
% 6.80/1.67 % SZS status Started for theBenchmark.p
% 6.80/1.67 % SZS status Theorem for theBenchmark.p
% 6.80/1.67
% 6.80/1.67 %---------------- iProver v3.8 (pre SMT-COMP 2023/CASC 2023) ----------------%
% 6.80/1.67
% 6.80/1.67 ------ iProver source info
% 6.80/1.67
% 6.80/1.67 git: date: 2023-05-31 18:12:56 +0000
% 6.80/1.67 git: sha1: 8abddc1f627fd3ce0bcb8b4cbf113b3cc443d7b6
% 6.80/1.67 git: non_committed_changes: false
% 6.80/1.67 git: last_make_outside_of_git: false
% 6.80/1.67
% 6.80/1.67 ------ Parsing...
% 6.80/1.67 ------ Clausification by vclausify_rel & Parsing by iProver...
% 6.80/1.67
% 6.80/1.67 ------ Preprocessing... sf_s rm: 332 0s sf_e pe_s pe_e
% 6.80/1.67
% 6.80/1.67 ------ Preprocessing... gs_s sp: 1 0s gs_e snvd_s sp: 0 0s snvd_e
% 6.80/1.67 ------ Proving...
% 6.80/1.67 ------ Problem Properties
% 6.80/1.67
% 6.80/1.67
% 6.80/1.67 clauses 63
% 6.80/1.67 conjectures 25
% 6.80/1.67 EPR 12
% 6.80/1.67 Horn 27
% 6.80/1.67 unary 6
% 6.80/1.67 binary 7
% 6.80/1.67 lits 223
% 6.80/1.67 lits eq 0
% 6.80/1.67 fd_pure 0
% 6.80/1.67 fd_pseudo 0
% 6.80/1.67 fd_cond 0
% 6.80/1.67 fd_pseudo_cond 0
% 6.80/1.67 AC symbols 0
% 6.80/1.67
% 6.80/1.67 ------ Input Options Time Limit: Unbounded
% 6.80/1.67
% 6.80/1.67
% 6.80/1.67 ------
% 6.80/1.67 Current options:
% 6.80/1.67 ------
% 6.80/1.67
% 6.80/1.67
% 6.80/1.67
% 6.80/1.67
% 6.80/1.67 ------ Proving...
% 6.80/1.67
% 6.80/1.67
% 6.80/1.67 % SZS status Theorem for theBenchmark.p
% 6.80/1.67
% 6.80/1.67 % SZS output start CNFRefutation for theBenchmark.p
% See solution above
% 6.80/1.67
% 6.80/1.67
%------------------------------------------------------------------------------