%------------------------------------------------------------------------------
% File     : Duper---1.0
% Problem  : SEU149+1 : TPTP v8.1.2. Released v3.3.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : duper %s

% Computer : n017.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 16:40:27 EDT 2023

% Result   : Theorem 3.96s 4.18s
% Output   : Proof 3.96s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.12  % Problem    : SEU149+1 : TPTP v8.1.2. Released v3.3.0.
% 0.00/0.13  % Command    : duper %s
% 0.12/0.35  % Computer : n017.cluster.edu
% 0.12/0.35  % Model    : x86_64 x86_64
% 0.12/0.35  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.35  % Memory   : 8042.1875MB
% 0.12/0.35  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.12/0.35  % CPULimit   : 300
% 0.12/0.35  % WCLimit    : 300
% 0.12/0.35  % DateTime   : Wed Aug 23 19:31:08 EDT 2023
% 0.12/0.35  % CPUTime    : 
% 3.96/4.18  SZS status Theorem for theBenchmark.p
% 3.96/4.18  SZS output start Proof for theBenchmark.p
% 3.96/4.18  Clause #1 (by assumption #[]): Eq (∀ (A B : Iota), Eq (unordered_pair A B) (unordered_pair B A)) True
% 3.96/4.18  Clause #2 (by assumption #[]): Eq (∀ (A B : Iota), Iff (Eq B (singleton A)) (∀ (C : Iota), Iff (in C B) (Eq C A))) True
% 3.96/4.18  Clause #3 (by assumption #[]): Eq (∀ (A B C : Iota), Iff (Eq C (unordered_pair A B)) (∀ (D : Iota), Iff (in D C) (Or (Eq D A) (Eq D B)))) True
% 3.96/4.18  Clause #5 (by assumption #[]): Eq (Not (∀ (A B C : Iota), Eq (singleton A) (unordered_pair B C) → Eq A B)) True
% 3.96/4.18  Clause #10 (by clausification #[5]): Eq (∀ (A B C : Iota), Eq (singleton A) (unordered_pair B C) → Eq A B) False
% 3.96/4.18  Clause #11 (by clausification #[10]): ∀ (a : Iota), Eq (Not (∀ (B C : Iota), Eq (singleton (skS.0 0 a)) (unordered_pair B C) → Eq (skS.0 0 a) B)) True
% 3.96/4.18  Clause #12 (by clausification #[11]): ∀ (a : Iota), Eq (∀ (B C : Iota), Eq (singleton (skS.0 0 a)) (unordered_pair B C) → Eq (skS.0 0 a) B) False
% 3.96/4.18  Clause #13 (by clausification #[12]): ∀ (a a_1 : Iota),
% 3.96/4.18    Eq
% 3.96/4.18      (Not (∀ (C : Iota), Eq (singleton (skS.0 0 a)) (unordered_pair (skS.0 1 a a_1) C) → Eq (skS.0 0 a) (skS.0 1 a a_1)))
% 3.96/4.18      True
% 3.96/4.18  Clause #14 (by clausification #[13]): ∀ (a a_1 : Iota),
% 3.96/4.18    Eq (∀ (C : Iota), Eq (singleton (skS.0 0 a)) (unordered_pair (skS.0 1 a a_1) C) → Eq (skS.0 0 a) (skS.0 1 a a_1))
% 3.96/4.18      False
% 3.96/4.18  Clause #15 (by clausification #[14]): ∀ (a a_1 a_2 : Iota),
% 3.96/4.18    Eq
% 3.96/4.18      (Not
% 3.96/4.18        (Eq (singleton (skS.0 0 a)) (unordered_pair (skS.0 1 a a_1) (skS.0 2 a a_1 a_2)) →
% 3.96/4.18          Eq (skS.0 0 a) (skS.0 1 a a_1)))
% 3.96/4.18      True
% 3.96/4.18  Clause #16 (by clausification #[15]): ∀ (a a_1 a_2 : Iota),
% 3.96/4.18    Eq (Eq (singleton (skS.0 0 a)) (unordered_pair (skS.0 1 a a_1) (skS.0 2 a a_1 a_2)) → Eq (skS.0 0 a) (skS.0 1 a a_1))
% 3.96/4.18      False
% 3.96/4.18  Clause #17 (by clausification #[16]): ∀ (a a_1 a_2 : Iota), Eq (Eq (singleton (skS.0 0 a)) (unordered_pair (skS.0 1 a a_1) (skS.0 2 a a_1 a_2))) True
% 3.96/4.18  Clause #18 (by clausification #[16]): ∀ (a a_1 : Iota), Eq (Eq (skS.0 0 a) (skS.0 1 a a_1)) False
% 3.96/4.18  Clause #19 (by clausification #[17]): ∀ (a a_1 a_2 : Iota), Eq (singleton (skS.0 0 a)) (unordered_pair (skS.0 1 a a_1) (skS.0 2 a a_1 a_2))
% 3.96/4.18  Clause #20 (by clausification #[1]): ∀ (a : Iota), Eq (∀ (B : Iota), Eq (unordered_pair a B) (unordered_pair B a)) True
% 3.96/4.18  Clause #21 (by clausification #[20]): ∀ (a a_1 : Iota), Eq (Eq (unordered_pair a a_1) (unordered_pair a_1 a)) True
% 3.96/4.18  Clause #22 (by clausification #[21]): ∀ (a a_1 : Iota), Eq (unordered_pair a a_1) (unordered_pair a_1 a)
% 3.96/4.18  Clause #23 (by clausification #[18]): ∀ (a a_1 : Iota), Ne (skS.0 0 a) (skS.0 1 a a_1)
% 3.96/4.18  Clause #24 (by clausification #[2]): ∀ (a : Iota), Eq (∀ (B : Iota), Iff (Eq B (singleton a)) (∀ (C : Iota), Iff (in C B) (Eq C a))) True
% 3.96/4.18  Clause #25 (by clausification #[24]): ∀ (a a_1 : Iota), Eq (Iff (Eq a (singleton a_1)) (∀ (C : Iota), Iff (in C a) (Eq C a_1))) True
% 3.96/4.18  Clause #27 (by clausification #[25]): ∀ (a a_1 : Iota), Or (Eq (Eq a (singleton a_1)) False) (Eq (∀ (C : Iota), Iff (in C a) (Eq C a_1)) True)
% 3.96/4.18  Clause #34 (by clausification #[27]): ∀ (a a_1 : Iota), Or (Eq (∀ (C : Iota), Iff (in C a) (Eq C a_1)) True) (Ne a (singleton a_1))
% 3.96/4.18  Clause #35 (by clausification #[34]): ∀ (a a_1 a_2 : Iota), Or (Ne a (singleton a_1)) (Eq (Iff (in a_2 a) (Eq a_2 a_1)) True)
% 3.96/4.18  Clause #37 (by clausification #[35]): ∀ (a a_1 a_2 : Iota), Or (Ne a (singleton a_1)) (Or (Eq (in a_2 a) False) (Eq (Eq a_2 a_1) True))
% 3.96/4.18  Clause #43 (by clausification #[37]): ∀ (a a_1 a_2 : Iota), Or (Ne a (singleton a_1)) (Or (Eq (in a_2 a) False) (Eq a_2 a_1))
% 3.96/4.18  Clause #44 (by destructive equality resolution #[43]): ∀ (a a_1 : Iota), Or (Eq (in a (singleton a_1)) False) (Eq a a_1)
% 3.96/4.18  Clause #47 (by clausification #[3]): ∀ (a : Iota),
% 3.96/4.18    Eq (∀ (B C : Iota), Iff (Eq C (unordered_pair a B)) (∀ (D : Iota), Iff (in D C) (Or (Eq D a) (Eq D B)))) True
% 3.96/4.18  Clause #48 (by clausification #[47]): ∀ (a a_1 : Iota),
% 3.96/4.18    Eq (∀ (C : Iota), Iff (Eq C (unordered_pair a a_1)) (∀ (D : Iota), Iff (in D C) (Or (Eq D a) (Eq D a_1)))) True
% 3.96/4.18  Clause #49 (by clausification #[48]): ∀ (a a_1 a_2 : Iota),
% 3.96/4.19    Eq (Iff (Eq a (unordered_pair a_1 a_2)) (∀ (D : Iota), Iff (in D a) (Or (Eq D a_1) (Eq D a_2)))) True
% 3.96/4.19  Clause #51 (by clausification #[49]): ∀ (a a_1 a_2 : Iota),
% 3.96/4.19    Or (Eq (Eq a (unordered_pair a_1 a_2)) False) (Eq (∀ (D : Iota), Iff (in D a) (Or (Eq D a_1) (Eq D a_2))) True)
% 3.96/4.19  Clause #69 (by clausification #[51]): ∀ (a a_1 a_2 : Iota),
% 3.96/4.19    Or (Eq (∀ (D : Iota), Iff (in D a) (Or (Eq D a_1) (Eq D a_2))) True) (Ne a (unordered_pair a_1 a_2))
% 3.96/4.19  Clause #70 (by clausification #[69]): ∀ (a a_1 a_2 a_3 : Iota), Or (Ne a (unordered_pair a_1 a_2)) (Eq (Iff (in a_3 a) (Or (Eq a_3 a_1) (Eq a_3 a_2))) True)
% 3.96/4.19  Clause #71 (by clausification #[70]): ∀ (a a_1 a_2 a_3 : Iota),
% 3.96/4.19    Or (Ne a (unordered_pair a_1 a_2)) (Or (Eq (in a_3 a) True) (Eq (Or (Eq a_3 a_1) (Eq a_3 a_2)) False))
% 3.96/4.19  Clause #73 (by clausification #[71]): ∀ (a a_1 a_2 a_3 : Iota), Or (Ne a (unordered_pair a_1 a_2)) (Or (Eq (in a_3 a) True) (Eq (Eq a_3 a_2) False))
% 3.96/4.19  Clause #75 (by clausification #[73]): ∀ (a a_1 a_2 a_3 : Iota), Or (Ne a (unordered_pair a_1 a_2)) (Or (Eq (in a_3 a) True) (Ne a_3 a_2))
% 3.96/4.19  Clause #76 (by destructive equality resolution #[75]): ∀ (a a_1 a_2 : Iota), Or (Eq (in a (unordered_pair a_1 a_2)) True) (Ne a a_2)
% 3.96/4.19  Clause #77 (by destructive equality resolution #[76]): ∀ (a a_1 : Iota), Eq (in a (unordered_pair a_1 a)) True
% 3.96/4.19  Clause #80 (by superposition #[77, 22]): ∀ (a a_1 : Iota), Eq (in a (unordered_pair a a_1)) True
% 3.96/4.19  Clause #82 (by superposition #[80, 19]): ∀ (a a_1 : Iota), Eq (in (skS.0 1 a a_1) (singleton (skS.0 0 a))) True
% 3.96/4.19  Clause #108 (by superposition #[82, 44]): ∀ (a a_1 : Iota), Or (Eq True False) (Eq (skS.0 1 a a_1) (skS.0 0 a))
% 3.96/4.19  Clause #111 (by clausification #[108]): ∀ (a a_1 : Iota), Eq (skS.0 1 a a_1) (skS.0 0 a)
% 3.96/4.19  Clause #112 (by forward contextual literal cutting #[111, 23]): False
% 3.96/4.19  SZS output end Proof for theBenchmark.p
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