%------------------------------------------------------------------------------
% File     : Duper---1.0
% Problem  : KLE114+1 : TPTP v8.1.2. Released v4.0.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : duper %s

% Computer : n015.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 05:28:38 EDT 2023

% Result   : Theorem 5.63s 5.83s
% Output   : Proof 5.68s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.13  % Problem    : KLE114+1 : TPTP v8.1.2. Released v4.0.0.
% 0.00/0.14  % Command    : duper %s
% 0.14/0.36  % Computer : n015.cluster.edu
% 0.14/0.36  % Model    : x86_64 x86_64
% 0.14/0.36  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.14/0.36  % Memory   : 8042.1875MB
% 0.14/0.36  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.14/0.36  % CPULimit   : 300
% 0.14/0.36  % WCLimit    : 300
% 0.14/0.36  % DateTime   : Tue Aug 29 12:07:11 EDT 2023
% 0.14/0.36  % CPUTime    : 
% 5.63/5.83  SZS status Theorem for theBenchmark.p
% 5.63/5.83  SZS output start Proof for theBenchmark.p
% 5.63/5.83  Clause #2 (by assumption #[]): Eq (∀ (A : Iota), Eq (addition A zero) A) True
% 5.63/5.83  Clause #5 (by assumption #[]): Eq (∀ (A : Iota), Eq (multiplication A one) A) True
% 5.63/5.83  Clause #9 (by assumption #[]): Eq (∀ (A : Iota), Eq (multiplication A zero) zero) True
% 5.63/5.83  Clause #12 (by assumption #[]): Eq (∀ (X0 : Iota), Eq (multiplication (antidomain X0) X0) zero) True
% 5.63/5.83  Clause #14 (by assumption #[]): Eq (∀ (X0 : Iota), Eq (addition (antidomain (antidomain X0)) (antidomain X0)) one) True
% 5.63/5.83  Clause #15 (by assumption #[]): Eq (∀ (X0 : Iota), Eq (domain X0) (antidomain (antidomain X0))) True
% 5.63/5.83  Clause #20 (by assumption #[]): Eq (∀ (X0 : Iota), Eq (c X0) (antidomain (domain X0))) True
% 5.63/5.83  Clause #22 (by assumption #[]): Eq (∀ (X0 X1 : Iota), Eq (forward_diamond X0 X1) (domain (multiplication X0 (domain X1)))) True
% 5.63/5.83  Clause #24 (by assumption #[]): Eq (∀ (X0 X1 : Iota), Eq (forward_box X0 X1) (c (forward_diamond X0 (c X1)))) True
% 5.63/5.83  Clause #26 (by assumption #[]): Eq (Not (∀ (X0 : Iota), Eq (forward_box X0 one) one)) True
% 5.63/5.83  Clause #29 (by clausification #[9]): ∀ (a : Iota), Eq (Eq (multiplication a zero) zero) True
% 5.63/5.83  Clause #30 (by clausification #[29]): ∀ (a : Iota), Eq (multiplication a zero) zero
% 5.63/5.83  Clause #35 (by clausification #[2]): ∀ (a : Iota), Eq (Eq (addition a zero) a) True
% 5.63/5.83  Clause #36 (by clausification #[35]): ∀ (a : Iota), Eq (addition a zero) a
% 5.63/5.83  Clause #42 (by clausification #[5]): ∀ (a : Iota), Eq (Eq (multiplication a one) a) True
% 5.63/5.83  Clause #43 (by clausification #[42]): ∀ (a : Iota), Eq (multiplication a one) a
% 5.63/5.83  Clause #44 (by clausification #[20]): ∀ (a : Iota), Eq (Eq (c a) (antidomain (domain a))) True
% 5.63/5.83  Clause #45 (by clausification #[44]): ∀ (a : Iota), Eq (c a) (antidomain (domain a))
% 5.63/5.83  Clause #46 (by clausification #[15]): ∀ (a : Iota), Eq (Eq (domain a) (antidomain (antidomain a))) True
% 5.63/5.83  Clause #47 (by clausification #[46]): ∀ (a : Iota), Eq (domain a) (antidomain (antidomain a))
% 5.63/5.83  Clause #48 (by superposition #[47, 47]): ∀ (a : Iota), Eq (domain (antidomain a)) (antidomain (domain a))
% 5.63/5.83  Clause #65 (by forward demodulation #[48, 45]): ∀ (a : Iota), Eq (domain (antidomain a)) (c a)
% 5.63/5.83  Clause #186 (by clausification #[12]): ∀ (a : Iota), Eq (Eq (multiplication (antidomain a) a) zero) True
% 5.63/5.83  Clause #187 (by clausification #[186]): ∀ (a : Iota), Eq (multiplication (antidomain a) a) zero
% 5.63/5.83  Clause #188 (by superposition #[187, 43]): Eq zero (antidomain one)
% 5.63/5.83  Clause #198 (by superposition #[188, 47]): Eq (domain one) (antidomain zero)
% 5.63/5.83  Clause #199 (by superposition #[188, 65]): Eq (domain zero) (c one)
% 5.63/5.83  Clause #205 (by superposition #[198, 45]): Eq (c one) (antidomain (antidomain zero))
% 5.63/5.83  Clause #247 (by clausification #[14]): ∀ (a : Iota), Eq (Eq (addition (antidomain (antidomain a)) (antidomain a)) one) True
% 5.63/5.83  Clause #248 (by clausification #[247]): ∀ (a : Iota), Eq (addition (antidomain (antidomain a)) (antidomain a)) one
% 5.63/5.83  Clause #249 (by forward demodulation #[248, 47]): ∀ (a : Iota), Eq (addition (domain a) (antidomain a)) one
% 5.63/5.83  Clause #261 (by superposition #[249, 188]): Eq (addition (domain one) zero) one
% 5.63/5.83  Clause #272 (by forward demodulation #[261, 198]): Eq (addition (antidomain zero) zero) one
% 5.63/5.83  Clause #273 (by superposition #[272, 36]): Eq one (antidomain zero)
% 5.63/5.83  Clause #281 (by backward demodulation #[273, 198]): Eq (domain one) one
% 5.63/5.83  Clause #282 (by backward demodulation #[273, 205]): Eq (c one) (antidomain one)
% 5.63/5.83  Clause #285 (by superposition #[273, 65]): Eq (domain one) (c zero)
% 5.63/5.83  Clause #304 (by superposition #[285, 281]): Eq (c zero) one
% 5.63/5.83  Clause #315 (by forward demodulation #[282, 188]): Eq (c one) zero
% 5.63/5.83  Clause #316 (by backward demodulation #[315, 199]): Eq (domain zero) zero
% 5.63/5.83  Clause #425 (by clausification #[22]): ∀ (a : Iota), Eq (∀ (X1 : Iota), Eq (forward_diamond a X1) (domain (multiplication a (domain X1)))) True
% 5.63/5.83  Clause #426 (by clausification #[425]): ∀ (a a_1 : Iota), Eq (Eq (forward_diamond a a_1) (domain (multiplication a (domain a_1)))) True
% 5.63/5.83  Clause #427 (by clausification #[426]): ∀ (a a_1 : Iota), Eq (forward_diamond a a_1) (domain (multiplication a (domain a_1)))
% 5.68/5.84  Clause #446 (by superposition #[427, 316]): ∀ (a : Iota), Eq (forward_diamond a zero) (domain (multiplication a zero))
% 5.68/5.84  Clause #477 (by clausification #[24]): ∀ (a : Iota), Eq (∀ (X1 : Iota), Eq (forward_box a X1) (c (forward_diamond a (c X1)))) True
% 5.68/5.84  Clause #478 (by clausification #[477]): ∀ (a a_1 : Iota), Eq (Eq (forward_box a a_1) (c (forward_diamond a (c a_1)))) True
% 5.68/5.84  Clause #479 (by clausification #[478]): ∀ (a a_1 : Iota), Eq (forward_box a a_1) (c (forward_diamond a (c a_1)))
% 5.68/5.84  Clause #489 (by superposition #[479, 315]): ∀ (a : Iota), Eq (forward_box a one) (c (forward_diamond a zero))
% 5.68/5.84  Clause #510 (by clausification #[26]): Eq (∀ (X0 : Iota), Eq (forward_box X0 one) one) False
% 5.68/5.84  Clause #511 (by clausification #[510]): ∀ (a : Iota), Eq (Not (Eq (forward_box (skS.0 0 a) one) one)) True
% 5.68/5.84  Clause #512 (by clausification #[511]): ∀ (a : Iota), Eq (Eq (forward_box (skS.0 0 a) one) one) False
% 5.68/5.84  Clause #513 (by clausification #[512]): ∀ (a : Iota), Ne (forward_box (skS.0 0 a) one) one
% 5.68/5.84  Clause #1172 (by forward demodulation #[446, 30]): ∀ (a : Iota), Eq (forward_diamond a zero) (domain zero)
% 5.68/5.84  Clause #1173 (by forward demodulation #[1172, 316]): ∀ (a : Iota), Eq (forward_diamond a zero) zero
% 5.68/5.84  Clause #1252 (by forward demodulation #[489, 1173]): ∀ (a : Iota), Eq (forward_box a one) (c zero)
% 5.68/5.84  Clause #1253 (by forward demodulation #[1252, 304]): ∀ (a : Iota), Eq (forward_box a one) one
% 5.68/5.84  Clause #1255 (by backward contextual literal cutting #[1253, 513]): False
% 5.68/5.84  SZS output end Proof for theBenchmark.p
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