TSTP Solution File: SYN214-10 by Zipperpin---2.1.9999
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : Zipperpin---2.1.9999
% Problem : SYN214-10 : TPTP v8.1.2. Released v7.5.0.
% Transfm : NO INFORMATION
% Format : NO INFORMATION
% Command : python3 /export/starexec/sandbox2/solver/bin/portfolio.lams.parallel.py %s %d /export/starexec/sandbox2/tmp/tmp.crJaPY0ZcI true
% Computer : n007.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 : Fri Sep 1 04:02:13 EDT 2023
% Result : Unsatisfiable 5.25s 1.35s
% Output : Refutation 5.25s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.07/0.13 % Problem : SYN214-10 : TPTP v8.1.2. Released v7.5.0.
% 0.14/0.14 % Command : python3 /export/starexec/sandbox2/solver/bin/portfolio.lams.parallel.py %s %d /export/starexec/sandbox2/tmp/tmp.crJaPY0ZcI true
% 0.15/0.35 % Computer : n007.cluster.edu
% 0.15/0.35 % Model : x86_64 x86_64
% 0.15/0.35 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.15/0.35 % Memory : 8042.1875MB
% 0.15/0.35 % OS : Linux 3.10.0-693.el7.x86_64
% 0.15/0.35 % CPULimit : 300
% 0.15/0.35 % WCLimit : 300
% 0.15/0.35 % DateTime : Sat Aug 26 19:27:42 EDT 2023
% 0.15/0.35 % CPUTime :
% 0.15/0.35 % Running portfolio for 300 s
% 0.15/0.35 % File : /export/starexec/sandbox2/benchmark/theBenchmark.p
% 0.15/0.35 % Number of cores: 8
% 0.15/0.35 % Python version: Python 3.6.8
% 0.15/0.36 % Running in FO mode
% 0.49/0.63 % Total configuration time : 435
% 0.49/0.63 % Estimated wc time : 1092
% 0.49/0.63 % Estimated cpu time (7 cpus) : 156.0
% 0.49/0.70 % /export/starexec/sandbox2/solver/bin/fo/fo6_bce.sh running for 75s
% 0.49/0.71 % /export/starexec/sandbox2/solver/bin/fo/fo3_bce.sh running for 75s
% 0.56/0.73 % /export/starexec/sandbox2/solver/bin/fo/fo1_av.sh running for 75s
% 0.56/0.75 % /export/starexec/sandbox2/solver/bin/fo/fo13.sh running for 50s
% 0.56/0.75 % /export/starexec/sandbox2/solver/bin/fo/fo7.sh running for 63s
% 0.56/0.75 % /export/starexec/sandbox2/solver/bin/fo/fo5.sh running for 50s
% 0.56/0.75 % /export/starexec/sandbox2/solver/bin/fo/fo4.sh running for 50s
% 0.57/0.79 % /export/starexec/sandbox2/solver/bin/fo/fo1_lcnf.sh running for 50s
% 5.25/1.35 % Solved by fo/fo1_av.sh.
% 5.25/1.35 % done 1680 iterations in 0.602s
% 5.25/1.35 % SZS status Theorem for '/export/starexec/sandbox2/benchmark/theBenchmark.p'
% 5.25/1.35 % SZS output start Refutation
% 5.25/1.35 thf(q3_type, type, q3: $i > $i > $i).
% 5.25/1.35 thf(q1_type, type, q1: $i > $i > $i > $i).
% 5.25/1.35 thf(l4_type, type, l4: $i > $i).
% 5.25/1.35 thf(p1_type, type, p1: $i > $i > $i > $i).
% 5.25/1.35 thf(p3_type, type, p3: $i > $i > $i > $i).
% 5.25/1.35 thf(n2_type, type, n2: $i > $i).
% 5.25/1.35 thf(d_type, type, d: $i).
% 5.25/1.35 thf(e_type, type, e: $i).
% 5.25/1.35 thf(true_type, type, true: $i).
% 5.25/1.35 thf(m0_type, type, m0: $i > $i > $i > $i).
% 5.25/1.35 thf(c_type, type, c: $i).
% 5.25/1.35 thf(n0_type, type, n0: $i > $i > $i).
% 5.25/1.35 thf(s5_type, type, s5: $i > $i).
% 5.25/1.35 thf(r4_type, type, r4: $i > $i).
% 5.25/1.35 thf(l1_type, type, l1: $i > $i > $i).
% 5.25/1.35 thf(n3_type, type, n3: $i > $i).
% 5.25/1.35 thf(ifeq_type, type, ifeq: $i > $i > $i > $i > $i).
% 5.25/1.35 thf(q2_type, type, q2: $i > $i > $i > $i).
% 5.25/1.35 thf(r0_type, type, r0: $i > $i).
% 5.25/1.35 thf(b_type, type, b: $i).
% 5.25/1.35 thf(p0_type, type, p0: $i > $i > $i).
% 5.25/1.35 thf(p2_type, type, p2: $i > $i > $i > $i).
% 5.25/1.35 thf(prove_this, conjecture, (( s5 @ c ) = ( true ))).
% 5.25/1.35 thf(zf_stmt_0, negated_conjecture, (( s5 @ c ) != ( true )),
% 5.25/1.35 inference('cnf.neg', [status(esa)], [prove_this])).
% 5.25/1.35 thf(zip_derived_cl362, plain, (((s5 @ c) != (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [zf_stmt_0])).
% 5.25/1.35 thf(rule_329, axiom,
% 5.25/1.35 (( ifeq @
% 5.25/1.35 ( r4 @ I ) @ true @ ( ifeq @ ( l4 @ H ) @ true @ ( s5 @ H ) @ true ) @
% 5.25/1.35 true ) =
% 5.25/1.35 ( true ))).
% 5.25/1.35 thf(zip_derived_cl360, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i]:
% 5.25/1.35 ((ifeq @ (r4 @ X0) @ true @
% 5.25/1.35 (ifeq @ (l4 @ X1) @ true @ (s5 @ X1) @ true) @ true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_329])).
% 5.25/1.35 thf(rule_244, axiom,
% 5.25/1.35 (( ifeq @ ( n2 @ H ) @ true @ ( p3 @ H @ H @ H ) @ true ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl277, plain,
% 5.25/1.35 (![X0 : $i]:
% 5.25/1.35 ((ifeq @ (n2 @ X0) @ true @ (p3 @ X0 @ X0 @ X0) @ true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_244])).
% 5.25/1.35 thf(axiom_14, axiom, (( p0 @ b @ X ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl14, plain, (![X0 : $i]: ((p0 @ b @ X0) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [axiom_14])).
% 5.25/1.35 thf(rule_085, axiom,
% 5.25/1.35 (( ifeq @ ( p0 @ C @ B ) @ true @ ( p1 @ B @ B @ B ) @ true ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl121, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i]:
% 5.25/1.35 ((ifeq @ (p0 @ X0 @ X1) @ true @ (p1 @ X1 @ X1 @ X1) @ true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_085])).
% 5.25/1.35 thf(zip_derived_cl1160, plain,
% 5.25/1.35 (![X0 : $i]: ((ifeq @ true @ true @ (p1 @ X0 @ X0 @ X0) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl14, zip_derived_cl121])).
% 5.25/1.35 thf(ifeq_axiom, axiom, (( ifeq @ A @ A @ B @ C ) = ( B ))).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl1217, plain, (![X0 : $i]: ((true) = (p1 @ X0 @ X0 @ X0))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl1160, zip_derived_cl0])).
% 5.25/1.35 thf(rule_137, axiom,
% 5.25/1.35 (( ifeq @ ( p1 @ B @ C @ A ) @ true @ ( n2 @ A ) @ true ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl172, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]:
% 5.25/1.35 ((ifeq @ (p1 @ X0 @ X1 @ X2) @ true @ (n2 @ X2) @ true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_137])).
% 5.25/1.35 thf(zip_derived_cl1255, plain,
% 5.25/1.35 (![X0 : $i]: ((ifeq @ true @ true @ (n2 @ X0) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)],
% 5.25/1.35 [zip_derived_cl1217, zip_derived_cl172])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl1288, plain, (![X0 : $i]: ((true) = (n2 @ X0))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl1255, zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl1296, plain, (![X0 : $i]: ((p3 @ X0 @ X0 @ X0) = (true))),
% 5.25/1.35 inference('demod', [status(thm)],
% 5.25/1.35 [zip_derived_cl277, zip_derived_cl1288, zip_derived_cl0])).
% 5.25/1.35 thf(rule_277, axiom,
% 5.25/1.35 (( ifeq @ ( p3 @ A @ B @ J ) @ true @ ( l4 @ J ) @ true ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl309, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]:
% 5.25/1.35 ((ifeq @ (p3 @ X0 @ X1 @ X2) @ true @ (l4 @ X2) @ true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_277])).
% 5.25/1.35 thf(zip_derived_cl1318, plain,
% 5.25/1.35 (![X0 : $i]: ((ifeq @ true @ true @ (l4 @ X0) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)],
% 5.25/1.35 [zip_derived_cl1296, zip_derived_cl309])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl1319, plain, (![X0 : $i]: ((true) = (l4 @ X0))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl1318, zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl1616, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i]:
% 5.25/1.35 ((ifeq @ (r4 @ X0) @ true @ (s5 @ X1) @ true) = (true))),
% 5.25/1.35 inference('demod', [status(thm)],
% 5.25/1.35 [zip_derived_cl360, zip_derived_cl1319, zip_derived_cl0])).
% 5.25/1.35 thf(axiom_13, axiom, (( r0 @ e ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl13, plain, (((r0 @ e) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [axiom_13])).
% 5.25/1.35 thf(axiom_27, axiom, (( m0 @ e @ b @ c ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl27, plain, (((m0 @ e @ b @ c) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [axiom_27])).
% 5.25/1.35 thf(rule_003, axiom,
% 5.25/1.35 (( ifeq @
% 5.25/1.35 ( p0 @ E @ C ) @ true @
% 5.25/1.35 ( ifeq @
% 5.25/1.35 ( r0 @ F ) @ true @
% 5.25/1.35 ( ifeq @ ( m0 @ D @ C @ E ) @ true @ ( l1 @ C @ D ) @ true ) @ true ) @
% 5.25/1.35 true ) =
% 5.25/1.35 ( true ))).
% 5.25/1.35 thf(zip_derived_cl41, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i, X3 : $i]:
% 5.25/1.35 ((ifeq @ (p0 @ X0 @ X1) @ true @
% 5.25/1.35 (ifeq @ (r0 @ X2) @ true @
% 5.25/1.35 (ifeq @ (m0 @ X3 @ X1 @ X0) @ true @ (l1 @ X1 @ X3) @ true) @ true) @
% 5.25/1.35 true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_003])).
% 5.25/1.35 thf(zip_derived_cl398, plain,
% 5.25/1.35 (![X0 : $i]:
% 5.25/1.35 ((ifeq @ (p0 @ c @ b) @ true @
% 5.25/1.35 (ifeq @ (r0 @ X0) @ true @
% 5.25/1.35 (ifeq @ true @ true @ (l1 @ b @ e) @ true) @ true) @
% 5.25/1.35 true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl27, zip_derived_cl41])).
% 5.25/1.35 thf(axiom_18, axiom, (( p0 @ c @ b ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl18, plain, (((p0 @ c @ b) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [axiom_18])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl410, plain,
% 5.25/1.35 (![X0 : $i]: ((ifeq @ (r0 @ X0) @ true @ (l1 @ b @ e) @ true) = (true))),
% 5.25/1.35 inference('demod', [status(thm)],
% 5.25/1.35 [zip_derived_cl398, zip_derived_cl18, zip_derived_cl0,
% 5.25/1.35 zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl924, plain,
% 5.25/1.35 (((ifeq @ true @ true @ (l1 @ b @ e) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl13, zip_derived_cl410])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl930, plain, (((true) = (l1 @ b @ e))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl924, zip_derived_cl0])).
% 5.25/1.35 thf(rule_186, axiom,
% 5.25/1.35 (( ifeq @ ( l1 @ H @ G ) @ true @ ( q2 @ G @ G @ H ) @ true ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl221, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i]:
% 5.25/1.35 ((ifeq @ (l1 @ X0 @ X1) @ true @ (q2 @ X1 @ X1 @ X0) @ true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_186])).
% 5.25/1.35 thf(zip_derived_cl1419, plain,
% 5.25/1.35 (((ifeq @ true @ true @ (q2 @ e @ e @ b) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl930, zip_derived_cl221])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl2103, plain, (((true) = (q2 @ e @ e @ b))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl1419, zip_derived_cl0])).
% 5.25/1.35 thf(rule_255, axiom,
% 5.25/1.35 (( ifeq @
% 5.25/1.35 ( q2 @ I @ G @ H ) @ true @
% 5.25/1.35 ( ifeq @ ( n0 @ I @ G ) @ true @ ( q3 @ G @ H ) @ true ) @ true ) =
% 5.25/1.35 ( true ))).
% 5.25/1.35 thf(zip_derived_cl288, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]:
% 5.25/1.35 ((ifeq @ (q2 @ X0 @ X1 @ X2) @ true @
% 5.25/1.35 (ifeq @ (n0 @ X0 @ X1) @ true @ (q3 @ X1 @ X2) @ true) @ true)
% 5.25/1.35 = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_255])).
% 5.25/1.35 thf(zip_derived_cl4043, plain,
% 5.25/1.35 (((ifeq @ true @ true @
% 5.25/1.35 (ifeq @ (n0 @ e @ e) @ true @ (q3 @ e @ b) @ true) @ true) = (
% 5.25/1.35 true))),
% 5.25/1.35 inference('s_sup+', [status(thm)],
% 5.25/1.35 [zip_derived_cl2103, zip_derived_cl288])).
% 5.25/1.35 thf(axiom_30, axiom, (( n0 @ e @ e ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl30, plain, (((n0 @ e @ e) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [axiom_30])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl4055, plain, (((q3 @ e @ b) = (true))),
% 5.25/1.35 inference('demod', [status(thm)],
% 5.25/1.35 [zip_derived_cl4043, zip_derived_cl30, zip_derived_cl0,
% 5.25/1.35 zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl14, plain, (![X0 : $i]: ((p0 @ b @ X0) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [axiom_14])).
% 5.25/1.35 thf(rule_298, axiom,
% 5.25/1.35 (( ifeq @
% 5.25/1.35 ( q3 @ H @ I ) @ true @
% 5.25/1.35 ( ifeq @
% 5.25/1.35 ( n3 @ G ) @ true @
% 5.25/1.35 ( ifeq @ ( p0 @ J @ G ) @ true @ ( r4 @ G ) @ true ) @ true ) @
% 5.25/1.35 true ) =
% 5.25/1.35 ( true ))).
% 5.25/1.35 thf(zip_derived_cl329, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i, X3 : $i]:
% 5.25/1.35 ((ifeq @ (q3 @ X0 @ X1) @ true @
% 5.25/1.35 (ifeq @ (n3 @ X2) @ true @
% 5.25/1.35 (ifeq @ (p0 @ X3 @ X2) @ true @ (r4 @ X2) @ true) @ true) @
% 5.25/1.35 true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_298])).
% 5.25/1.35 thf(rule_154, axiom,
% 5.25/1.35 (( ifeq @ ( q1 @ A @ A @ A ) @ true @ ( p2 @ A @ A @ A ) @ true ) =
% 5.25/1.35 ( true ))).
% 5.25/1.35 thf(zip_derived_cl189, plain,
% 5.25/1.35 (![X0 : $i]:
% 5.25/1.35 ((ifeq @ (q1 @ X0 @ X0 @ X0) @ true @ (p2 @ X0 @ X0 @ X0) @ true)
% 5.25/1.35 = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_154])).
% 5.25/1.35 thf(axiom_19, axiom, (( m0 @ X @ d @ Y ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl19, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i]: ((m0 @ X0 @ d @ X1) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [axiom_19])).
% 5.25/1.35 thf(rule_110, axiom,
% 5.25/1.35 (( ifeq @ ( m0 @ C @ D @ B ) @ true @ ( q1 @ B @ B @ B ) @ true ) =
% 5.25/1.35 ( true ))).
% 5.25/1.35 thf(zip_derived_cl146, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]:
% 5.25/1.35 ((ifeq @ (m0 @ X0 @ X1 @ X2) @ true @ (q1 @ X2 @ X2 @ X2) @ true)
% 5.25/1.35 = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_110])).
% 5.25/1.35 thf(zip_derived_cl1652, plain,
% 5.25/1.35 (![X0 : $i]: ((ifeq @ true @ true @ (q1 @ X0 @ X0 @ X0) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl19, zip_derived_cl146])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl1700, plain, (![X0 : $i]: ((true) = (q1 @ X0 @ X0 @ X0))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl1652, zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl1898, plain, (![X0 : $i]: ((p2 @ X0 @ X0 @ X0) = (true))),
% 5.25/1.35 inference('demod', [status(thm)],
% 5.25/1.35 [zip_derived_cl189, zip_derived_cl1700, zip_derived_cl0])).
% 5.25/1.35 thf(rule_240, axiom,
% 5.25/1.35 (( ifeq @ ( p2 @ E @ F @ D ) @ true @ ( n3 @ D ) @ true ) = ( true ))).
% 5.25/1.35 thf(zip_derived_cl273, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]:
% 5.25/1.35 ((ifeq @ (p2 @ X0 @ X1 @ X2) @ true @ (n3 @ X2) @ true) = (true))),
% 5.25/1.35 inference('cnf', [status(esa)], [rule_240])).
% 5.25/1.35 thf(zip_derived_cl1904, plain,
% 5.25/1.35 (![X0 : $i]: ((ifeq @ true @ true @ (n3 @ X0) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)],
% 5.25/1.35 [zip_derived_cl1898, zip_derived_cl273])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl1933, plain, (![X0 : $i]: ((true) = (n3 @ X0))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl1904, zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl4628, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i, X3 : $i]:
% 5.25/1.35 ((ifeq @ (q3 @ X0 @ X1) @ true @
% 5.25/1.35 (ifeq @ (p0 @ X3 @ X2) @ true @ (r4 @ X2) @ true) @ true) = (
% 5.25/1.35 true))),
% 5.25/1.35 inference('demod', [status(thm)],
% 5.25/1.35 [zip_derived_cl329, zip_derived_cl1933, zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl4629, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]:
% 5.25/1.35 ((ifeq @ (q3 @ X2 @ X1) @ true @
% 5.25/1.35 (ifeq @ true @ true @ (r4 @ X0) @ true) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl14, zip_derived_cl4628])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl4635, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]:
% 5.25/1.35 ((ifeq @ (q3 @ X2 @ X1) @ true @ (r4 @ X0) @ true) = (true))),
% 5.25/1.35 inference('demod', [status(thm)], [zip_derived_cl4629, zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl4714, plain,
% 5.25/1.35 (![X0 : $i]: ((ifeq @ true @ true @ (r4 @ X0) @ true) = (true))),
% 5.25/1.35 inference('s_sup+', [status(thm)],
% 5.25/1.35 [zip_derived_cl4055, zip_derived_cl4635])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl4759, plain, (![X0 : $i]: ((true) = (r4 @ X0))),
% 5.25/1.35 inference('s_sup+', [status(thm)], [zip_derived_cl4714, zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl0, plain,
% 5.25/1.35 (![X0 : $i, X1 : $i, X2 : $i]: ((ifeq @ X1 @ X1 @ X0 @ X2) = (X0))),
% 5.25/1.35 inference('cnf', [status(esa)], [ifeq_axiom])).
% 5.25/1.35 thf(zip_derived_cl4760, plain, (![X1 : $i]: ((s5 @ X1) = (true))),
% 5.25/1.35 inference('demod', [status(thm)],
% 5.25/1.35 [zip_derived_cl1616, zip_derived_cl4759, zip_derived_cl0])).
% 5.25/1.35 thf(zip_derived_cl4799, plain, (((true) != (true))),
% 5.25/1.35 inference('demod', [status(thm)], [zip_derived_cl362, zip_derived_cl4760])).
% 5.25/1.35 thf(zip_derived_cl4800, plain, ($false),
% 5.25/1.35 inference('simplify', [status(thm)], [zip_derived_cl4799])).
% 5.25/1.35
% 5.25/1.35 % SZS output end Refutation
% 5.25/1.35
% 5.25/1.35
% 5.25/1.35 % Terminating...
% 5.74/1.45 % Runner terminated.
% 5.74/1.47 % Zipperpin 1.5 exiting
%------------------------------------------------------------------------------