TSTP Solution File: NUM390+1 by Duper---1.0

View Problem - Process Solution 
%------------------------------------------------------------------------------
% File     : Duper---1.0
% Problem  : NUM390+1 : TPTP v8.1.2. Released v3.2.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : duper %s

% Computer : n023.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 10:55:27 EDT 2023

% Result   : Theorem 26.25s 26.50s
% Output   : Proof 26.35s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.12  % Problem    : NUM390+1 : TPTP v8.1.2. Released v3.2.0.
% 0.11/0.13  % Command    : duper %s
% 0.13/0.34  % Computer : n023.cluster.edu
% 0.13/0.34  % Model    : x86_64 x86_64
% 0.13/0.34  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34  % Memory   : 8042.1875MB
% 0.13/0.34  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34  % CPULimit   : 300
% 0.13/0.34  % WCLimit    : 300
% 0.13/0.34  % DateTime   : Fri Aug 25 12:06:42 EDT 2023
% 0.13/0.34  % CPUTime    : 
% 26.25/26.50  SZS status Theorem for theBenchmark.p
% 26.25/26.50  SZS output start Proof for theBenchmark.p
% 26.25/26.50  Clause #0 (by assumption #[]): Eq (∀ (A B : Iota), in A B → Not (in B A)) True
% 26.25/26.50  Clause #3 (by assumption #[]): Eq (∀ (A : Iota), ordinal A → And (epsilon_transitive A) (epsilon_connected A)) True
% 26.25/26.50  Clause #7 (by assumption #[]): Eq (∀ (A : Iota), Iff (epsilon_transitive A) (∀ (B : Iota), in B A → subset B A)) True
% 26.25/26.50  Clause #8 (by assumption #[]): Eq (∀ (A B : Iota), Iff (proper_subset A B) (And (subset A B) (Ne A B))) True
% 26.25/26.50  Clause #27 (by assumption #[]): Eq (∀ (A B C : Iota), And (subset A B) (subset B C) → subset A C) True
% 26.25/26.50  Clause #28 (by assumption #[]): Eq (∀ (A : Iota), epsilon_transitive A → ∀ (B : Iota), ordinal B → proper_subset A B → in A B) True
% 26.25/26.50  Clause #29 (by assumption #[]): Eq
% 26.25/26.50    (Not
% 26.25/26.50      (∀ (A : Iota),
% 26.25/26.50        epsilon_transitive A → ∀ (B : Iota), ordinal B → ∀ (C : Iota), ordinal C → And (subset A B) (in B C) → in A C))
% 26.25/26.50    True
% 26.25/26.50  Clause #48 (by clausification #[0]): ∀ (a : Iota), Eq (∀ (B : Iota), in a B → Not (in B a)) True
% 26.25/26.50  Clause #49 (by clausification #[48]): ∀ (a a_1 : Iota), Eq (in a a_1 → Not (in a_1 a)) True
% 26.25/26.50  Clause #50 (by clausification #[49]): ∀ (a a_1 : Iota), Or (Eq (in a a_1) False) (Eq (Not (in a_1 a)) True)
% 26.25/26.50  Clause #51 (by clausification #[50]): ∀ (a a_1 : Iota), Or (Eq (in a a_1) False) (Eq (in a_1 a) False)
% 26.25/26.50  Clause #82 (by clausification #[3]): ∀ (a : Iota), Eq (ordinal a → And (epsilon_transitive a) (epsilon_connected a)) True
% 26.25/26.50  Clause #83 (by clausification #[82]): ∀ (a : Iota), Or (Eq (ordinal a) False) (Eq (And (epsilon_transitive a) (epsilon_connected a)) True)
% 26.25/26.50  Clause #85 (by clausification #[83]): ∀ (a : Iota), Or (Eq (ordinal a) False) (Eq (epsilon_transitive a) True)
% 26.25/26.50  Clause #86 (by clausification #[27]): ∀ (a : Iota), Eq (∀ (B C : Iota), And (subset a B) (subset B C) → subset a C) True
% 26.25/26.50  Clause #87 (by clausification #[86]): ∀ (a a_1 : Iota), Eq (∀ (C : Iota), And (subset a a_1) (subset a_1 C) → subset a C) True
% 26.25/26.50  Clause #88 (by clausification #[87]): ∀ (a a_1 a_2 : Iota), Eq (And (subset a a_1) (subset a_1 a_2) → subset a a_2) True
% 26.25/26.50  Clause #89 (by clausification #[88]): ∀ (a a_1 a_2 : Iota), Or (Eq (And (subset a a_1) (subset a_1 a_2)) False) (Eq (subset a a_2) True)
% 26.25/26.50  Clause #90 (by clausification #[89]): ∀ (a a_1 a_2 : Iota), Or (Eq (subset a a_1) True) (Or (Eq (subset a a_2) False) (Eq (subset a_2 a_1) False))
% 26.25/26.50  Clause #109 (by clausification #[28]): ∀ (a : Iota), Eq (epsilon_transitive a → ∀ (B : Iota), ordinal B → proper_subset a B → in a B) True
% 26.25/26.50  Clause #110 (by clausification #[109]): ∀ (a : Iota), Or (Eq (epsilon_transitive a) False) (Eq (∀ (B : Iota), ordinal B → proper_subset a B → in a B) True)
% 26.25/26.50  Clause #111 (by clausification #[110]): ∀ (a a_1 : Iota), Or (Eq (epsilon_transitive a) False) (Eq (ordinal a_1 → proper_subset a a_1 → in a a_1) True)
% 26.25/26.50  Clause #112 (by clausification #[111]): ∀ (a a_1 : Iota),
% 26.25/26.50    Or (Eq (epsilon_transitive a) False) (Or (Eq (ordinal a_1) False) (Eq (proper_subset a a_1 → in a a_1) True))
% 26.25/26.50  Clause #113 (by clausification #[112]): ∀ (a a_1 : Iota),
% 26.25/26.50    Or (Eq (epsilon_transitive a) False)
% 26.25/26.50      (Or (Eq (ordinal a_1) False) (Or (Eq (proper_subset a a_1) False) (Eq (in a a_1) True)))
% 26.25/26.50  Clause #117 (by clausification #[7]): ∀ (a : Iota), Eq (Iff (epsilon_transitive a) (∀ (B : Iota), in B a → subset B a)) True
% 26.25/26.50  Clause #119 (by clausification #[117]): ∀ (a : Iota), Or (Eq (epsilon_transitive a) False) (Eq (∀ (B : Iota), in B a → subset B a) True)
% 26.25/26.50  Clause #131 (by clausification #[119]): ∀ (a a_1 : Iota), Or (Eq (epsilon_transitive a) False) (Eq (in a_1 a → subset a_1 a) True)
% 26.25/26.50  Clause #132 (by clausification #[131]): ∀ (a a_1 : Iota), Or (Eq (epsilon_transitive a) False) (Or (Eq (in a_1 a) False) (Eq (subset a_1 a) True))
% 26.25/26.50  Clause #135 (by clausification #[8]): ∀ (a : Iota), Eq (∀ (B : Iota), Iff (proper_subset a B) (And (subset a B) (Ne a B))) True
% 26.25/26.50  Clause #136 (by clausification #[135]): ∀ (a a_1 : Iota), Eq (Iff (proper_subset a a_1) (And (subset a a_1) (Ne a a_1))) True
% 26.25/26.50  Clause #137 (by clausification #[136]): ∀ (a a_1 : Iota), Or (Eq (proper_subset a a_1) True) (Eq (And (subset a a_1) (Ne a a_1)) False)
% 26.35/26.52  Clause #139 (by clausification #[137]): ∀ (a a_1 : Iota), Or (Eq (proper_subset a a_1) True) (Or (Eq (subset a a_1) False) (Eq (Ne a a_1) False))
% 26.35/26.52  Clause #140 (by clausification #[139]): ∀ (a a_1 : Iota), Or (Eq (proper_subset a a_1) True) (Or (Eq (subset a a_1) False) (Eq a a_1))
% 26.35/26.52  Clause #224 (by clausification #[29]): Eq
% 26.35/26.52    (∀ (A : Iota),
% 26.35/26.52      epsilon_transitive A → ∀ (B : Iota), ordinal B → ∀ (C : Iota), ordinal C → And (subset A B) (in B C) → in A C)
% 26.35/26.52    False
% 26.35/26.52  Clause #225 (by clausification #[224]): ∀ (a : Iota),
% 26.35/26.52    Eq
% 26.35/26.52      (Not
% 26.35/26.52        (epsilon_transitive (skS.0 13 a) →
% 26.35/26.52          ∀ (B : Iota), ordinal B → ∀ (C : Iota), ordinal C → And (subset (skS.0 13 a) B) (in B C) → in (skS.0 13 a) C))
% 26.35/26.52      True
% 26.35/26.52  Clause #226 (by clausification #[225]): ∀ (a : Iota),
% 26.35/26.52    Eq
% 26.35/26.52      (epsilon_transitive (skS.0 13 a) →
% 26.35/26.52        ∀ (B : Iota), ordinal B → ∀ (C : Iota), ordinal C → And (subset (skS.0 13 a) B) (in B C) → in (skS.0 13 a) C)
% 26.35/26.52      False
% 26.35/26.52  Clause #227 (by clausification #[226]): ∀ (a : Iota), Eq (epsilon_transitive (skS.0 13 a)) True
% 26.35/26.52  Clause #228 (by clausification #[226]): ∀ (a : Iota),
% 26.35/26.52    Eq (∀ (B : Iota), ordinal B → ∀ (C : Iota), ordinal C → And (subset (skS.0 13 a) B) (in B C) → in (skS.0 13 a) C)
% 26.35/26.52      False
% 26.35/26.52  Clause #230 (by superposition #[227, 113]): ∀ (a a_1 : Iota),
% 26.35/26.52    Or (Eq True False)
% 26.35/26.52      (Or (Eq (ordinal a) False) (Or (Eq (proper_subset (skS.0 13 a_1) a) False) (Eq (in (skS.0 13 a_1) a) True)))
% 26.35/26.52  Clause #264 (by clausification #[228]): ∀ (a a_1 : Iota),
% 26.35/26.52    Eq
% 26.35/26.52      (Not
% 26.35/26.52        (ordinal (skS.0 14 a a_1) →
% 26.35/26.52          ∀ (C : Iota),
% 26.35/26.52            ordinal C → And (subset (skS.0 13 a) (skS.0 14 a a_1)) (in (skS.0 14 a a_1) C) → in (skS.0 13 a) C))
% 26.35/26.52      True
% 26.35/26.52  Clause #265 (by clausification #[264]): ∀ (a a_1 : Iota),
% 26.35/26.52    Eq
% 26.35/26.52      (ordinal (skS.0 14 a a_1) →
% 26.35/26.52        ∀ (C : Iota), ordinal C → And (subset (skS.0 13 a) (skS.0 14 a a_1)) (in (skS.0 14 a a_1) C) → in (skS.0 13 a) C)
% 26.35/26.52      False
% 26.35/26.52  Clause #266 (by clausification #[265]): ∀ (a a_1 : Iota), Eq (ordinal (skS.0 14 a a_1)) True
% 26.35/26.52  Clause #267 (by clausification #[265]): ∀ (a a_1 : Iota),
% 26.35/26.52    Eq (∀ (C : Iota), ordinal C → And (subset (skS.0 13 a) (skS.0 14 a a_1)) (in (skS.0 14 a a_1) C) → in (skS.0 13 a) C)
% 26.35/26.52      False
% 26.35/26.52  Clause #279 (by clausification #[267]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.52    Eq
% 26.35/26.52      (Not
% 26.35/26.52        (ordinal (skS.0 15 a a_1 a_2) →
% 26.35/26.52          And (subset (skS.0 13 a) (skS.0 14 a a_1)) (in (skS.0 14 a a_1) (skS.0 15 a a_1 a_2)) →
% 26.35/26.52            in (skS.0 13 a) (skS.0 15 a a_1 a_2)))
% 26.35/26.52      True
% 26.35/26.52  Clause #280 (by clausification #[279]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.52    Eq
% 26.35/26.52      (ordinal (skS.0 15 a a_1 a_2) →
% 26.35/26.52        And (subset (skS.0 13 a) (skS.0 14 a a_1)) (in (skS.0 14 a a_1) (skS.0 15 a a_1 a_2)) →
% 26.35/26.52          in (skS.0 13 a) (skS.0 15 a a_1 a_2))
% 26.35/26.52      False
% 26.35/26.52  Clause #281 (by clausification #[280]): ∀ (a a_1 a_2 : Iota), Eq (ordinal (skS.0 15 a a_1 a_2)) True
% 26.35/26.52  Clause #282 (by clausification #[280]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.52    Eq
% 26.35/26.52      (And (subset (skS.0 13 a) (skS.0 14 a a_1)) (in (skS.0 14 a a_1) (skS.0 15 a a_1 a_2)) →
% 26.35/26.52        in (skS.0 13 a) (skS.0 15 a a_1 a_2))
% 26.35/26.52      False
% 26.35/26.52  Clause #284 (by superposition #[281, 85]): ∀ (a a_1 a_2 : Iota), Or (Eq True False) (Eq (epsilon_transitive (skS.0 15 a a_1 a_2)) True)
% 26.35/26.52  Clause #286 (by clausification #[284]): ∀ (a a_1 a_2 : Iota), Eq (epsilon_transitive (skS.0 15 a a_1 a_2)) True
% 26.35/26.52  Clause #289 (by superposition #[286, 132]): ∀ (a a_1 a_2 a_3 : Iota),
% 26.35/26.52    Or (Eq True False) (Or (Eq (in a (skS.0 15 a_1 a_2 a_3)) False) (Eq (subset a (skS.0 15 a_1 a_2 a_3)) True))
% 26.35/26.52  Clause #434 (by clausification #[282]): ∀ (a a_1 a_2 : Iota), Eq (And (subset (skS.0 13 a) (skS.0 14 a a_1)) (in (skS.0 14 a a_1) (skS.0 15 a a_1 a_2))) True
% 26.35/26.52  Clause #435 (by clausification #[282]): ∀ (a a_1 a_2 : Iota), Eq (in (skS.0 13 a) (skS.0 15 a a_1 a_2)) False
% 26.35/26.52  Clause #436 (by clausification #[434]): ∀ (a a_1 a_2 : Iota), Eq (in (skS.0 14 a a_1) (skS.0 15 a a_1 a_2)) True
% 26.35/26.52  Clause #437 (by clausification #[434]): ∀ (a a_1 : Iota), Eq (subset (skS.0 13 a) (skS.0 14 a a_1)) True
% 26.35/26.55  Clause #446 (by superposition #[437, 90]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.55    Or (Eq (subset (skS.0 13 a) a_1) True) (Or (Eq True False) (Eq (subset (skS.0 14 a a_2) a_1) False))
% 26.35/26.55  Clause #447 (by superposition #[437, 140]): ∀ (a a_1 : Iota),
% 26.35/26.55    Or (Eq (proper_subset (skS.0 13 a) (skS.0 14 a a_1)) True) (Or (Eq True False) (Eq (skS.0 13 a) (skS.0 14 a a_1)))
% 26.35/26.55  Clause #450 (by clausification #[230]): ∀ (a a_1 : Iota),
% 26.35/26.55    Or (Eq (ordinal a) False) (Or (Eq (proper_subset (skS.0 13 a_1) a) False) (Eq (in (skS.0 13 a_1) a) True))
% 26.35/26.55  Clause #452 (by superposition #[450, 266]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.55    Or (Eq (proper_subset (skS.0 13 a) (skS.0 14 a_1 a_2)) False)
% 26.35/26.55      (Or (Eq (in (skS.0 13 a) (skS.0 14 a_1 a_2)) True) (Eq False True))
% 26.35/26.55  Clause #453 (by superposition #[450, 281]): ∀ (a a_1 a_2 a_3 : Iota),
% 26.35/26.55    Or (Eq (proper_subset (skS.0 13 a) (skS.0 15 a_1 a_2 a_3)) False)
% 26.35/26.55      (Or (Eq (in (skS.0 13 a) (skS.0 15 a_1 a_2 a_3)) True) (Eq False True))
% 26.35/26.55  Clause #477 (by clausification #[446]): ∀ (a a_1 a_2 : Iota), Or (Eq (subset (skS.0 13 a) a_1) True) (Eq (subset (skS.0 14 a a_2) a_1) False)
% 26.35/26.55  Clause #597 (by clausification #[289]): ∀ (a a_1 a_2 a_3 : Iota), Or (Eq (in a (skS.0 15 a_1 a_2 a_3)) False) (Eq (subset a (skS.0 15 a_1 a_2 a_3)) True)
% 26.35/26.55  Clause #598 (by superposition #[597, 436]): ∀ (a a_1 a_2 : Iota), Or (Eq (subset (skS.0 14 a a_1) (skS.0 15 a a_1 a_2)) True) (Eq False True)
% 26.35/26.55  Clause #619 (by clausification #[598]): ∀ (a a_1 a_2 : Iota), Eq (subset (skS.0 14 a a_1) (skS.0 15 a a_1 a_2)) True
% 26.35/26.55  Clause #620 (by superposition #[619, 477]): ∀ (a a_1 a_2 : Iota), Or (Eq (subset (skS.0 13 a) (skS.0 15 a a_1 a_2)) True) (Eq True False)
% 26.35/26.55  Clause #626 (by clausification #[620]): ∀ (a a_1 a_2 : Iota), Eq (subset (skS.0 13 a) (skS.0 15 a a_1 a_2)) True
% 26.35/26.55  Clause #628 (by superposition #[626, 140]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.55    Or (Eq (proper_subset (skS.0 13 a) (skS.0 15 a a_1 a_2)) True)
% 26.35/26.55      (Or (Eq True False) (Eq (skS.0 13 a) (skS.0 15 a a_1 a_2)))
% 26.35/26.55  Clause #828 (by clausification #[447]): ∀ (a a_1 : Iota), Or (Eq (proper_subset (skS.0 13 a) (skS.0 14 a a_1)) True) (Eq (skS.0 13 a) (skS.0 14 a a_1))
% 26.35/26.55  Clause #839 (by clausification #[452]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.55    Or (Eq (proper_subset (skS.0 13 a) (skS.0 14 a_1 a_2)) False) (Eq (in (skS.0 13 a) (skS.0 14 a_1 a_2)) True)
% 26.35/26.55  Clause #840 (by superposition #[839, 828]): ∀ (a a_1 : Iota),
% 26.35/26.55    Or (Eq (in (skS.0 13 a) (skS.0 14 a a_1)) True) (Or (Eq False True) (Eq (skS.0 13 a) (skS.0 14 a a_1)))
% 26.35/26.55  Clause #852 (by clausification #[453]): ∀ (a a_1 a_2 a_3 : Iota),
% 26.35/26.55    Or (Eq (proper_subset (skS.0 13 a) (skS.0 15 a_1 a_2 a_3)) False) (Eq (in (skS.0 13 a) (skS.0 15 a_1 a_2 a_3)) True)
% 26.35/26.55  Clause #1244 (by clausification #[840]): ∀ (a a_1 : Iota), Or (Eq (in (skS.0 13 a) (skS.0 14 a a_1)) True) (Eq (skS.0 13 a) (skS.0 14 a a_1))
% 26.35/26.55  Clause #1245 (by superposition #[1244, 51]): ∀ (a a_1 : Iota),
% 26.35/26.55    Or (Eq (skS.0 13 a) (skS.0 14 a a_1)) (Or (Eq True False) (Eq (in (skS.0 14 a a_1) (skS.0 13 a)) False))
% 26.35/26.55  Clause #1264 (by clausification #[1245]): ∀ (a a_1 : Iota), Or (Eq (skS.0 13 a) (skS.0 14 a a_1)) (Eq (in (skS.0 14 a a_1) (skS.0 13 a)) False)
% 26.35/26.55  Clause #1634 (by clausification #[628]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.55    Or (Eq (proper_subset (skS.0 13 a) (skS.0 15 a a_1 a_2)) True) (Eq (skS.0 13 a) (skS.0 15 a a_1 a_2))
% 26.35/26.55  Clause #1635 (by superposition #[1634, 852]): ∀ (a a_1 a_2 : Iota),
% 26.35/26.55    Or (Eq (skS.0 13 a) (skS.0 15 a a_1 a_2)) (Or (Eq True False) (Eq (in (skS.0 13 a) (skS.0 15 a a_1 a_2)) True))
% 26.35/26.55  Clause #2333 (by clausification #[1635]): ∀ (a a_1 a_2 : Iota), Or (Eq (skS.0 13 a) (skS.0 15 a a_1 a_2)) (Eq (in (skS.0 13 a) (skS.0 15 a a_1 a_2)) True)
% 26.35/26.55  Clause #2334 (by superposition #[2333, 435]): ∀ (a a_1 a_2 : Iota), Or (Eq (skS.0 13 a) (skS.0 15 a a_1 a_2)) (Eq True False)
% 26.35/26.55  Clause #2343 (by clausification #[2334]): ∀ (a a_1 a_2 : Iota), Eq (skS.0 13 a) (skS.0 15 a a_1 a_2)
% 26.35/26.55  Clause #2346 (by backward demodulation #[2343, 436]): ∀ (a a_1 : Iota), Eq (in (skS.0 14 a a_1) (skS.0 13 a)) True
% 26.35/26.55  Clause #2349 (by backward demodulation #[2343, 435]): ∀ (a : Iota), Eq (in (skS.0 13 a) (skS.0 13 a)) False
% 26.35/26.56  Clause #2460 (by superposition #[2346, 1264]): ∀ (a a_1 : Iota), Or (Eq (skS.0 13 a) (skS.0 14 a a_1)) (Eq True False)
% 26.35/26.56  Clause #2470 (by clausification #[2460]): ∀ (a a_1 : Iota), Eq (skS.0 13 a) (skS.0 14 a a_1)
% 26.35/26.56  Clause #2497 (by backward demodulation #[2470, 2346]): ∀ (a : Iota), Eq (in (skS.0 13 a) (skS.0 13 a)) True
% 26.35/26.56  Clause #2505 (by superposition #[2497, 2349]): Eq True False
% 26.35/26.56  Clause #2511 (by clausification #[2505]): False
% 26.35/26.56  SZS output end Proof for theBenchmark.p
%------------------------------------------------------------------------------