TSTP Solution File: NUM557+3 by Z3---4.8.9.0
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%------------------------------------------------------------------------------
% File : Z3---4.8.9.0
% Problem : NUM557+3 : TPTP v8.1.0. Released v4.0.0.
% Transfm : none
% Format : tptp
% Command : z3_tptp -proof -model -t:%d -file:%s
% Computer : n028.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 : Sun Sep 18 13:10:29 EDT 2022
% Result : Theorem 0.19s 0.39s
% Output : Proof 0.19s
% Verified :
% SZS Type : Refutation
% Derivation depth : 11
% Number of leaves : 15
% Syntax : Number of formulae : 36 ( 4 unt; 7 typ; 0 def)
% Number of atoms : 115 ( 17 equ)
% Maximal formula atoms : 8 ( 3 avg)
% Number of connectives : 116 ( 31 ~; 40 |; 19 &)
% ( 18 <=>; 8 =>; 0 <=; 0 <~>)
% Maximal formula depth : 8 ( 5 avg)
% Maximal term depth : 2 ( 1 avg)
% Number of FOOLs : 1 ( 1 fml; 0 var)
% Number of types : 2 ( 0 usr)
% Number of type conns : 7 ( 4 >; 3 *; 0 +; 0 <<)
% Number of predicates : 6 ( 3 usr; 2 prp; 0-2 aty)
% Number of functors : 5 ( 5 usr; 3 con; 0-2 aty)
% Number of variables : 26 ( 25 !; 0 ?; 26 :)
% Comments :
%------------------------------------------------------------------------------
tff(xk_type,type,
xk: $i ).
tff(sbrdtbr0_type,type,
sbrdtbr0: $i > $i ).
tff(xP_type,type,
xP: $i ).
tff(aElementOf0_type,type,
aElementOf0: ( $i * $i ) > $o ).
tff(xS_type,type,
xS: $i ).
tff(aSubsetOf0_type,type,
aSubsetOf0: ( $i * $i ) > $o ).
tff(slbdtsldtrb0_type,type,
slbdtsldtrb0: ( $i * $i ) > $i ).
tff(1,plain,
( ~ $true
<=> $false ),
inference(rewrite,[status(thm)],]) ).
tff(2,plain,
( ( $true
& $true )
<=> $true ),
inference(rewrite,[status(thm)],]) ).
tff(3,axiom,
( ! [W0: $i] :
( aElementOf0(W0,xP)
=> aElementOf0(W0,xS) )
& aSubsetOf0(xP,xS)
& ( sbrdtbr0(xP) = xk ) ),
file('/export/starexec/sandbox2/benchmark/theBenchmark.p',m__2431) ).
tff(4,plain,
sbrdtbr0(xP) = xk,
inference(and_elim,[status(thm)],[3]) ).
tff(5,plain,
( ( sbrdtbr0(xP) = xk )
<=> $true ),
inference(iff_true,[status(thm)],[4]) ).
tff(6,plain,
( ( $true
| $true )
<=> $true ),
inference(rewrite,[status(thm)],]) ).
tff(7,plain,
^ [W0: $i] :
rewrite(
( ( aElementOf0(W0,xP)
=> aElementOf0(W0,xS) )
<=> ( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )),
inference(bind,[status(th)],]) ).
tff(8,plain,
( ! [W0: $i] :
( aElementOf0(W0,xP)
=> aElementOf0(W0,xS) )
<=> ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) ),
inference(quant_intro,[status(thm)],[7]) ).
tff(9,plain,
( ! [W0: $i] :
( aElementOf0(W0,xP)
=> aElementOf0(W0,xS) )
& aSubsetOf0(xP,xS) ),
inference(and_elim,[status(thm)],[3]) ).
tff(10,plain,
! [W0: $i] :
( aElementOf0(W0,xP)
=> aElementOf0(W0,xS) ),
inference(and_elim,[status(thm)],[9]) ).
tff(11,plain,
! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ),
inference(modus_ponens,[status(thm)],[10,8]) ).
tff(12,plain,
( ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) )
<=> $true ),
inference(iff_true,[status(thm)],[11]) ).
tff(13,plain,
aSubsetOf0(xP,xS),
inference(and_elim,[status(thm)],[9]) ).
tff(14,plain,
( aSubsetOf0(xP,xS)
<=> $true ),
inference(iff_true,[status(thm)],[13]) ).
tff(15,plain,
( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
<=> ( $true
| $true ) ),
inference(monotonicity,[status(thm)],[14,12]) ).
tff(16,plain,
( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
<=> $true ),
inference(transitivity,[status(thm)],[15,6]) ).
tff(17,plain,
( ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) )
<=> ( $true
& $true ) ),
inference(monotonicity,[status(thm)],[16,5]) ).
tff(18,plain,
( ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) )
<=> $true ),
inference(transitivity,[status(thm)],[17,2]) ).
tff(19,plain,
( ~ ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) )
<=> ~ $true ),
inference(monotonicity,[status(thm)],[18]) ).
tff(20,plain,
( ~ ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) )
<=> $false ),
inference(transitivity,[status(thm)],[19,1]) ).
tff(21,plain,
( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
<=> ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) ) ),
inference(rewrite,[status(thm)],]) ).
tff(22,plain,
( ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) )
<=> ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) ) ),
inference(monotonicity,[status(thm)],[21]) ).
tff(23,plain,
( ~ ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) )
<=> ~ ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) ) ),
inference(monotonicity,[status(thm)],[22]) ).
tff(24,plain,
( ~ ( ( ! [W0: $i] :
( aElementOf0(W0,xP)
=> aElementOf0(W0,xS) )
| aSubsetOf0(xP,xS) )
& ( sbrdtbr0(xP) = xk ) )
<=> ~ ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) ) ),
inference(rewrite,[status(thm)],]) ).
tff(25,axiom,
~ ( ( ( ! [W0: $i] :
( aElementOf0(W0,xP)
=> aElementOf0(W0,xS) )
| aSubsetOf0(xP,xS) )
& ( sbrdtbr0(xP) = xk ) )
| aElementOf0(xP,slbdtsldtrb0(xS,xk)) ),
file('/export/starexec/sandbox2/benchmark/theBenchmark.p',m__) ).
tff(26,plain,
~ ( ( ! [W0: $i] :
( aElementOf0(W0,xP)
=> aElementOf0(W0,xS) )
| aSubsetOf0(xP,xS) )
& ( sbrdtbr0(xP) = xk ) ),
inference(or_elim,[status(thm)],[25]) ).
tff(27,plain,
~ ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) ),
inference(modus_ponens,[status(thm)],[26,24]) ).
tff(28,plain,
~ ( ( aSubsetOf0(xP,xS)
| ! [W0: $i] :
( ~ aElementOf0(W0,xP)
| aElementOf0(W0,xS) ) )
& ( sbrdtbr0(xP) = xk ) ),
inference(modus_ponens,[status(thm)],[27,23]) ).
tff(29,plain,
$false,
inference(modus_ponens,[status(thm)],[28,20]) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.06/0.11 % Problem : NUM557+3 : TPTP v8.1.0. Released v4.0.0.
% 0.06/0.12 % Command : z3_tptp -proof -model -t:%d -file:%s
% 0.12/0.33 % Computer : n028.cluster.edu
% 0.12/0.33 % Model : x86_64 x86_64
% 0.12/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.33 % Memory : 8042.1875MB
% 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33 % CPULimit : 300
% 0.12/0.33 % WCLimit : 300
% 0.12/0.33 % DateTime : Fri Sep 2 11:53:37 EDT 2022
% 0.12/0.33 % CPUTime :
% 0.12/0.34 Z3tptp [4.8.9.0] (c) 2006-20**. Microsoft Corp.
% 0.12/0.34 Usage: tptp [options] [-file:]file
% 0.12/0.34 -h, -? prints this message.
% 0.12/0.34 -smt2 print SMT-LIB2 benchmark.
% 0.12/0.34 -m, -model generate model.
% 0.12/0.34 -p, -proof generate proof.
% 0.12/0.34 -c, -core generate unsat core of named formulas.
% 0.12/0.34 -st, -statistics display statistics.
% 0.12/0.34 -t:timeout set timeout (in second).
% 0.12/0.34 -smt2status display status in smt2 format instead of SZS.
% 0.12/0.34 -check_status check the status produced by Z3 against annotation in benchmark.
% 0.12/0.34 -<param>:<value> configuration parameter and value.
% 0.12/0.34 -o:<output-file> file to place output in.
% 0.19/0.39 % SZS status Theorem
% 0.19/0.39 % SZS output start Proof
% See solution above
%------------------------------------------------------------------------------