%------------------------------------------------------------------------------
% File     : SuperZenon---0.0.1
% Problem  : SWV199+1 : TPTP v8.1.0. Bugfixed v3.3.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : run_super_zenon -p0 -itptp -om -max-time %d %s

% Computer : n025.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  : 600s
% DateTime : Wed Jul 20 21:50:20 EDT 2022

% Result   : Theorem 40.75s 40.99s
% Output   : Proof 41.01s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.07/0.12  % Problem  : SWV199+1 : TPTP v8.1.0. Bugfixed v3.3.0.
% 0.07/0.12  % Command  : run_super_zenon -p0 -itptp -om -max-time %d %s
% 0.13/0.34  % Computer : n025.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  : 600
% 0.13/0.34  % DateTime : Wed Jun 15 16:25:10 EDT 2022
% 0.13/0.34  % CPUTime  : 
% 40.75/40.99  % SZS status Theorem
% 40.75/40.99  (* PROOF-FOUND *)
% 40.75/40.99  (* BEGIN-PROOF *)
% 40.75/40.99  % SZS output start Proof
% 40.75/40.99  1. (gt (succ T_0) (n0)) (-. (gt (succ T_0) (n0)))   ### Axiom
% 40.75/40.99  2. (-. (leq (n0) T_0)) (gt (succ T_0) (n0))   ### Definition-Pseudo(leq) 1
% 40.75/40.99  3. ((succ (succ (succ (n0)))) = (n3)) ((n3) != (succ (succ (succ (n0)))))   ### Sym(=)
% 40.75/40.99  4. ((succ (n3)) != (succ (succ (succ (succ (n0)))))) ((succ (succ (succ (n0)))) = (n3))   ### NotEqual 3
% 40.75/40.99  5. ((n4) != (n4))   ### NotEqual
% 40.75/40.99  6. ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (succ (succ (n0))))) != (n4))   ### Axiom
% 40.75/40.99  7. ((n3) != (n3))   ### NotEqual
% 40.75/40.99  8. (-. (gt (succ (succ (succ (succ (n0))))) (n3))) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4))   ### Trans 6 7
% 40.75/40.99  9. ((succ (succ (n0))) = (n2)) ((succ (succ (n0))) != (n2))   ### Axiom
% 40.75/40.99  10. ((succ (succ (succ (n0)))) != (succ (n2))) ((succ (succ (n0))) = (n2))   ### NotEqual 9
% 40.75/40.99  11. (-. (gt (succ (succ (succ (succ (n0))))) (succ (n2)))) ((succ (succ (succ (n0)))) = (n3)) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3))   ### TransEq2 8 8 10
% 40.75/40.99  12. (-. (gt (n4) (succ (n2)))) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (n0)))) = (n3))   ### TransEq2 5 11 11
% 40.75/40.99  13. (-. (gt (succ (n3)) (succ (n2)))) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3))   ### TransEq 4 12 12
% 40.75/40.99  14. (T_0 != T_0)   ### Refl(=)
% 40.75/40.99  15. (-. (gt (succ (n3)) T_0)) (gt (succ (n2)) T_0) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2))   ### Trans 13 14
% 40.75/40.99  16. (-. (leq T_0 (n3))) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (n2)) T_0)   ### Definition-Pseudo(leq) 15
% 40.75/40.99  17. ((n0) != T_0) (T_0 = (n0))   ### Sym(=)
% 40.75/40.99  18. ((n1) != T_0) (T_0 = (n1))   ### Sym(=)
% 40.75/40.99  19. ((n2) != T_0) (T_0 = (n2))   ### Sym(=)
% 40.75/40.99  20. (T_0 != (n3)) (T_0 = (n3))   ### Axiom
% 40.75/40.99  21. (((leq (n0) T_0) /\ (leq T_0 (n3))) => ((T_0 = (n0)) \/ ((T_0 = (n1)) \/ ((T_0 = (n2)) \/ (T_0 = (n3)))))) (T_0 != (n3)) ((n2) != T_0) ((n1) != T_0) ((n0) != T_0) (gt (succ (n2)) T_0) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (gt (succ T_0) (n0))   ### DisjTree 2 16 17 18 19 20
% 40.75/40.99  22. (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_0) (n0)) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (n2)) T_0) ((n0) != T_0) ((n1) != T_0) ((n2) != T_0) (T_0 != (n3))   ### All 21
% 40.75/40.99  23. ((succ (succ (succ (n0)))) = (n3)) ((succ (succ (succ (n0)))) != (n3))   ### Axiom
% 40.75/40.99  24. (-. (gt (succ (succ (succ (n0)))) (n3))) ((n2) != T_0) ((n1) != T_0) ((n0) != T_0) (gt (succ (n2)) T_0) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ T_0) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((succ (succ (n0))) = (n2))   ### Trans 10 22
% 40.75/40.99  25. ((succ (succ (succ (n0)))) != (succ (succ (succ (n0)))))   ### Refl(=)
% 40.75/40.99  26. (-. (gt (succ (succ (succ (n0)))) (succ (succ (succ (n0)))))) ((succ (succ (n0))) = (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_0) (n0)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (succ (n2)) T_0) ((n0) != T_0) ((n1) != T_0) ((n2) != T_0) ((succ (succ (succ (n0)))) = (n3))   ### TransEq2 23 24 25
% 40.75/40.99  27. ((succ (succ (succ (n0)))) != (succ (succ (succ (n0)))))   ### Refl(=)
% 40.75/40.99  28. (-. (gt T_0 (succ (succ (succ (n0)))))) ((n2) != T_0) ((n1) != T_0) ((n0) != T_0) (gt (succ (n2)) T_0) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (gt (succ T_0) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3)))))))   ### TransEq2 22 26 27
% 40.75/40.99  29. (-. (gt T_0 (n3))) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_0) (n0)) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (n2)) T_0) ((n0) != T_0) ((n1) != T_0) ((n2) != T_0)   ### TransEq 28 28 7
% 40.75/40.99  30. (-. (gt T_0 (succ (n2)))) ((n2) != T_0) ((n1) != T_0) ((n0) != T_0) (gt (succ (n2)) T_0) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (gt (succ T_0) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3)))))))   ### TransEq2 29 29 10
% 40.75/40.99  31. (T_0 != T_0)   ### Refl(=)
% 40.75/40.99  32. (-. (gt T_0 T_0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_0) (n0)) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (n2)) T_0) ((n0) != T_0) ((n1) != T_0) ((n2) != T_0)   ### Trans 30 31
% 40.75/40.99  33. (All X, (-. (gt X X))) ((n2) != T_0) ((n1) != T_0) ((n0) != T_0) (gt (succ (n2)) T_0) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (gt (succ T_0) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3)))))))   ### All 32
% 40.75/40.99  34. (gt (succ (pv5)) (n0)) (-. (gt (succ (pv5)) (n0)))   ### Axiom
% 40.75/40.99  35. (-. (leq (n0) (pv5))) (gt (succ (pv5)) (n0))   ### Definition-Pseudo(leq) 34
% 40.75/40.99  36. ((succ (succ (n0))) = (n2)) ((n2) != (succ (succ (n0))))   ### Sym(=)
% 40.75/40.99  37. ((succ (n2)) != (succ (succ (succ (n0))))) ((succ (succ (n0))) = (n2))   ### NotEqual 36
% 40.75/40.99  38. ((succ (n0)) = (n1)) ((n1) != (succ (n0)))   ### Sym(=)
% 40.75/40.99  39. (-. (gt (n3) (succ (n0)))) (gt (n3) (n1)) ((succ (n0)) = (n1))   ### Trans 7 38
% 40.75/40.99  40. (-. (gt (succ (n2)) (succ (n0)))) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2))   ### TransEq 37 39 39
% 40.75/40.99  41. ((pv5) != (pv5))   ### NotEqual
% 40.75/40.99  42. (-. (gt (succ (n2)) (pv5))) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3))   ### Trans 40 41
% 40.75/40.99  43. (-. (leq (pv5) (n2))) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5))   ### Definition-Pseudo(leq) 42
% 40.75/40.99  44. (gt (succ T_1) (n0)) (-. (gt (succ T_1) (n0)))   ### Axiom
% 40.75/40.99  45. (-. (leq (n0) T_1)) (gt (succ T_1) (n0))   ### Definition-Pseudo(leq) 44
% 40.75/40.99  46. ((succ (succ (succ (n0)))) = (n3)) ((n3) != (succ (succ (succ (n0)))))   ### Sym(=)
% 40.75/40.99  47. (-. (gt (n4) (succ (succ (succ (n0)))))) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3))   ### Trans 5 46
% 40.75/40.99  48. (-. (gt (succ (n3)) (succ (succ (succ (n0)))))) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3))   ### TransEq 4 47 47
% 40.75/40.99  49. ((n2) != (n2))   ### NotEqual
% 40.75/40.99  50. ((succ (succ (n0))) = (n2)) ((succ (succ (n0))) != (n2))   ### Axiom
% 40.75/40.99  51. ((n1) != (n1))   ### NotEqual
% 40.75/40.99  52. (-. (gt (succ (succ (n0))) (n1))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2))   ### Trans 50 51
% 40.75/40.99  53. ((n0) != (pv5)) ((pv5) = (n0))   ### Sym(=)
% 40.75/40.99  54. ((pv5) != (n1)) ((pv5) = (n1))   ### Axiom
% 40.75/40.99  55. ((pv5) != (n2)) ((pv5) = (n2))   ### Axiom
% 40.75/40.99  56. (((leq (n0) (pv5)) /\ (leq (pv5) (n2))) => (((pv5) = (n0)) \/ (((pv5) = (n1)) \/ ((pv5) = (n2))))) ((pv5) != (n2)) ((pv5) != (n1)) ((n0) != (pv5)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0))   ### DisjTree 35 43 53 54 55
% 40.75/40.99  57. (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((n0) != (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### All 56
% 40.75/40.99  58. ((succ (n0)) != (succ (pv5))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2))))))   ### NotEqual 57
% 40.75/41.00  59. (-. (gt (succ (succ (n0))) (succ (pv5)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1))   ### TransEq2 52 52 58
% 40.75/41.00  60. (-. (gt (n2) (succ (pv5)))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2))))))   ### TransEq2 49 59 59
% 40.75/41.00  61. (-. (gt (n3) (succ (pv5)))) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1))   ### Trans 7 60
% 40.75/41.00  62. (-. (gt (succ (n3)) (succ (pv5)))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4))   ### TransEq 48 61 61
% 40.75/41.00  63. (T_1 != T_1)   ### Refl(=)
% 40.75/41.00  64. (-. (gt (succ (n3)) T_1)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1))   ### Trans 62 63
% 40.75/41.00  65. (-. (leq T_1 (n3))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1)   ### Definition-Pseudo(leq) 64
% 40.75/41.00  66. (T_1 = (n0)) (T_1 != (n0))   ### Axiom
% 40.75/41.00  67. ((n0) != T_1) (T_1 = (n0))   ### Sym(=)
% 40.75/41.00  68. (T_1 != (n1)) (T_1 = (n1))   ### Axiom
% 40.75/41.00  69. (T_1 != (n2)) (T_1 = (n2))   ### Axiom
% 40.75/41.00  70. (T_1 != (n3)) (T_1 = (n3))   ### Axiom
% 40.75/41.00  71. (((leq (n0) T_1) /\ (leq T_1 (n3))) => ((T_1 = (n0)) \/ ((T_1 = (n1)) \/ ((T_1 = (n2)) \/ (T_1 = (n3)))))) (T_1 != (n3)) (T_1 != (n2)) (T_1 != (n1)) ((n0) != T_1) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0))   ### DisjTree 45 65 67 68 69 70
% 40.75/41.00  72. (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) ((n0) != T_1) (T_1 != (n1)) (T_1 != (n2)) (T_1 != (n3))   ### All 71
% 40.75/41.00  73. ((succ (n0)) != (succ T_1)) (T_1 != (n3)) (T_1 != (n2)) (T_1 != (n1)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3)))))))   ### NotEqual 72
% 40.75/41.00  74. (-. (gt (succ T_1) (pv5))) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n1)) (T_1 != (n2)) (T_1 != (n3))   ### P-NotP 73 41
% 40.75/41.00  75. (-. (leq (pv5) T_1)) (T_1 != (n3)) (T_1 != (n2)) (T_1 != (n1)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3)))))))   ### Definition-Pseudo(leq) 74
% 40.75/41.00  76. ((pv5) != T_1) ((pv5) = T_1)   ### Axiom
% 40.75/41.00  77. (-. (gt T_1 (pv5))) (gt T_1 (pv5))   ### Axiom
% 40.75/41.00  78. (((leq (pv5) T_1) /\ ((pv5) != T_1)) => (gt T_1 (pv5))) (-. (gt T_1 (pv5))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n1)) (T_1 != (n2)) (T_1 != (n3))   ### DisjTree 75 76 77
% 40.75/41.00  79. (All Y, (((leq (pv5) Y) /\ ((pv5) != Y)) => (gt Y (pv5)))) (T_1 != (n3)) (T_1 != (n2)) (T_1 != (n1)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (-. (gt T_1 (pv5)))   ### All 78
% 40.75/41.00  80. ((n0) != (n0))   ### NotEqual
% 40.75/41.00  81. (-. (gt T_1 (n0))) ((pv5) = (n0)) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n1)) (T_1 != (n2)) (T_1 != (n3)) (All Y, (((leq (pv5) Y) /\ ((pv5) != Y)) => (gt Y (pv5))))   ### TransEq 79 79 80
% 40.75/41.00  82. (T_1 != T_1)   ### Refl(=)
% 40.75/41.00  83. (-. (gt T_1 T_1)) (All Y, (((leq (pv5) Y) /\ ((pv5) != Y)) => (gt Y (pv5)))) (T_1 != (n3)) (T_1 != (n2)) (T_1 != (n1)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) ((pv5) = (n0)) (T_1 = (n0))   ### TransEq2 66 81 82
% 41.01/41.20  84. (T_1 != (n1)) (T_1 = (n1))   ### Axiom
% 41.01/41.20  85. (T_1 != (n2)) (T_1 = (n2))   ### Axiom
% 41.01/41.20  86. (T_1 != (n3)) (T_1 = (n3))   ### Axiom
% 41.01/41.20  87. (((leq (n0) T_1) /\ (leq T_1 (n3))) => ((T_1 = (n0)) \/ ((T_1 = (n1)) \/ ((T_1 = (n2)) \/ (T_1 = (n3)))))) ((pv5) = (n0)) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n1)) (T_1 != (n2)) (T_1 != (n3)) (All Y, (((leq (pv5) Y) /\ ((pv5) != Y)) => (gt Y (pv5)))) (-. (gt T_1 T_1)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0))   ### DisjTree 45 65 83 84 85 86
% 41.01/41.20  88. (gt (succ T_1) (n0)) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (-. (gt T_1 T_1)) (All Y, (((leq (pv5) Y) /\ ((pv5) != Y)) => (gt Y (pv5)))) (T_1 != (n3)) (T_1 != (n2)) (T_1 != (n1)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) ((pv5) = (n0))   ### All 87
% 41.01/41.20  89. ((pv5) != (n1)) ((pv5) = (n1))   ### Axiom
% 41.01/41.20  90. ((pv5) != (n2)) ((pv5) = (n2))   ### Axiom
% 41.01/41.20  91. (((leq (n0) (pv5)) /\ (leq (pv5) (n2))) => (((pv5) = (n0)) \/ (((pv5) = (n1)) \/ ((pv5) = (n2))))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n1)) (T_1 != (n2)) (T_1 != (n3)) (All Y, (((leq (pv5) Y) /\ ((pv5) != Y)) => (gt Y (pv5)))) (-. (gt T_1 T_1)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n1)) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0))   ### DisjTree 35 43 88 89 90
% 41.01/41.20  92. (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) ((pv5) != (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (-. (gt T_1 T_1)) (All Y, (((leq (pv5) Y) /\ ((pv5) != Y)) => (gt Y (pv5)))) (T_1 != (n3)) (T_1 != (n2)) (T_1 != (n1)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1)   ### All 91
% 41.01/41.20  93. (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n1)) (T_1 != (n2)) (T_1 != (n3)) (-. (gt T_1 T_1)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n1)) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0))   ### All 92
% 41.01/41.20  94. (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) ((pv5) != (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (T_1 != (n1)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### All 93
% 41.01/41.20  95. ((succ (n0)) = (n1)) ((succ (n0)) != (n1))   ### Axiom
% 41.01/41.20  96. (-. (gt (succ (n0)) (n1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 58 94
% 41.01/41.20  97. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.20  98. (-. (gt (succ (n0)) (succ (n0)))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((succ (n0)) = (n1))   ### TransEq2 95 96 97
% 41.01/41.20  99. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.20  100. (-. (gt T_1 (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n1)) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 94 98 99
% 41.01/41.20  101. ((succ (n0)) = (n1)) ((succ (n0)) != (n1))   ### Axiom
% 41.01/41.20  102. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.20  103. ((pv5) != (n2)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (succ (n0)) (n1)))   ### Trans 102 96
% 41.01/41.20  104. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.20  105. (-. (gt (succ (n0)) (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n2)) ((succ (n0)) = (n1))   ### TransEq2 101 103 104
% 41.01/41.21  106. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.21  107. (-. (gt (pv5) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt T_1 (succ (n0))))   ### TransEq2 100 105 106
% 41.01/41.21  108. ((succ (n0)) = (n1)) ((succ (n0)) != (n1))   ### Axiom
% 41.01/41.21  109. (-. (gt (n1) (n1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n2))   ### TransEq2 51 103 108
% 41.01/41.21  110. (-. (gt T_1 (n1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X))) (-. (gt (pv5) (succ (n0))))   ### TransEq 107 107 109
% 41.01/41.21  111. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.21  112. (-. (gt (pv5) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n2)) ((n0) != (pv5)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2))))))   ### TransEq2 57 105 111
% 41.01/41.21  113. ((succ (n0)) != (succ (pv5))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (-. (gt (pv5) (succ (n0))))   ### NotEqual 112
% 41.01/41.21  114. (-. (gt T_1 (succ (pv5)))) (-. (gt (pv5) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### TransEq2 110 110 113
% 41.01/41.21  115. ((pv5) != (n1)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X))) (-. (gt (pv5) (succ (n0)))) (-. (gt T_1 (succ (pv5))))   ### TransEq2 114 59 59
% 41.01/41.21  116. (T_1 != T_1)   ### Refl(=)
% 41.01/41.21  117. (-. (gt T_1 T_1)) (-. (gt (pv5) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n1))   ### Trans 115 116
% 41.01/41.21  118. ((pv5) != (n1)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X))) (-. (gt (pv5) (succ (n0))))   ### All 117
% 41.01/41.21  119. (-. (gt T_1 (n1))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) ((pv5) != (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### TransEq 100 100 51
% 41.01/41.21  120. ((succ (n0)) = (n1)) ((succ (n0)) != (n1))   ### Axiom
% 41.01/41.21  121. (-. (gt (succ (n0)) (succ (pv5)))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((succ (n0)) = (n1))   ### TransEq2 120 96 58
% 41.01/41.21  122. (-. (gt T_1 (succ (pv5)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n1)) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 119 119 121
% 41.01/41.23  123. (T_1 != T_1)   ### Refl(=)
% 41.01/41.23  124. (-. (gt T_1 T_1)) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) ((pv5) != (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### Trans 122 123
% 41.01/41.23  125. (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n1)) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### All 124
% 41.01/41.23  126. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.23  127. (-. (gt (pv5) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### TransEq2 125 105 126
% 41.01/41.23  128. (-. (gt (pv5) (pv5))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n2)) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### Trans 127 41
% 41.01/41.23  129. (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (T_1 != (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### All 128
% 41.01/41.23  130. (-. (gt (succ (n0)) (n2))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 58 129
% 41.01/41.23  131. (-. (gt (n1) (n2))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### TransEq2 51 130 130
% 41.01/41.23  132. (-. (gt (n1) (n1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 131 51
% 41.01/41.23  133. (-. (gt (pv5) (n1))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n1))   ### TransEq 118 118 132
% 41.01/41.23  134. ((succ (n0)) = (n1)) ((succ (n0)) != (n1))   ### Axiom
% 41.01/41.23  135. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.23  136. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.23  137. (-. (gt (succ (n0)) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n1))   ### Trans 136 118
% 41.01/41.23  138. (-. (gt (succ (n0)) (n1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X))) (-. (gt (succ (n0)) (succ (n0))))   ### Trans 135 137
% 41.01/41.23  139. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.23  140. (-. (gt (succ (n0)) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((succ (n0)) = (n1))   ### TransEq2 134 138 139
% 41.01/41.23  141. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.23  142. (-. (gt (pv5) (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 133 140 141
% 41.01/41.23  143. ((succ (succ (n0))) != (succ (succ (n0))))   ### Refl(=)
% 41.01/41.23  144. ((succ (n0)) = (n1)) ((n1) != (succ (n0)))   ### Sym(=)
% 41.01/41.23  145. (-. (gt (n2) (succ (n0)))) (gt (n2) (n1)) ((succ (n0)) = (n1))   ### Trans 49 144
% 41.01/41.23  146. (-. (gt (succ (succ (n0))) (succ (n0)))) ((succ (succ (n0))) = (n2)) ((succ (n0)) = (n1)) (gt (n2) (n1))   ### TransEq 143 145 145
% 41.01/41.23  147. (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (pv5) (succ (n0))))   ### TransEq2 142 146 146
% 41.01/41.23  148. (-. (gt (pv5) (pv5))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### Trans 147 41
% 41.01/41.23  149. (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### All 148
% 41.01/41.23  150. ((succ (succ (succ (n0)))) != (succ (succ (succ (n0)))))   ### Refl(=)
% 41.01/41.23  151. (-. (gt (succ (succ (n0))) (n3))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2))))))   ### Trans 59 149
% 41.01/41.23  152. (-. (gt (n2) (n3))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1)) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### TransEq2 49 151 151
% 41.01/41.23  153. (-. (gt (n3) (n3))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2))))))   ### Trans 7 152
% 41.01/41.23  154. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.23  155. (-. (gt (succ (n0)) (n2))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (pv5) (succ (n0))))   ### Trans 154 142
% 41.01/41.23  156. (-. (gt (n1) (n2))) (-. (gt (pv5) (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 51 155 155
% 41.01/41.23  157. (-. (gt (succ (n0)) (n3))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (pv5) (succ (n0)))) (-. (gt (n1) (n2))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 58 156
% 41.01/41.23  158. (-. (gt (n1) (n3))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (-. (gt (n1) (n2))) (-. (gt (pv5) (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X)))   ### TransEq2 51 157 157
% 41.01/41.23  159. (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (pv5) (succ (n0)))) (-. (gt (n1) (n2))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 158 49
% 41.01/41.23  160. (-. (gt (n1) (n1))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (-. (gt (pv5) (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X)))   ### Trans 159 51
% 41.01/41.23  161. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.23  162. (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) ((pv5) != (n2)) ((pv5) != (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (T_1 != (n3)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt T_1 (succ (n0))))   ### TransEq2 100 146 146
% 41.01/41.23  163. ((succ (succ (succ (n0)))) != (succ (succ (succ (n0)))))   ### Refl(=)
% 41.01/41.23  164. (-. (gt (succ (succ (succ (n0)))) (succ (n0)))) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1))   ### TransEq 163 39 39
% 41.01/41.23  165. (-. (gt T_1 (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) ((pv5) != (n1)) ((pv5) != (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 162 164 164
% 41.01/41.23  166. (-. (gt (succ (n0)) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 58 165
% 41.01/41.23  167. ((succ (succ (n0))) != (succ (succ (n0))))   ### Refl(=)
% 41.01/41.23  168. (-. (gt (succ (n0)) (succ (succ (n0))))) (-. (gt (pv5) (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (T_1 != (n3)) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 155 155 167
% 41.01/41.23  169. (-. (gt (succ (n0)) (n3))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (pv5) (succ (n0)))) (-. (gt (succ (n0)) (succ (succ (n0))))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 58 168
% 41.01/41.23  170. (-. (gt (n1) (n3))) (-. (gt (succ (n0)) (succ (succ (n0))))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (pv5) (succ (n0)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### TransEq2 160 160 169
% 41.01/41.23  171. ((succ (succ (succ (n0)))) != (succ (succ (succ (n0)))))   ### Refl(=)
% 41.01/41.23  172. (-. (gt (n1) (succ (succ (succ (n0)))))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (-. (gt (pv5) (succ (n0)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (-. (gt (succ (n0)) (succ (succ (n0)))))   ### TransEq2 170 170 171
% 41.01/41.23  173. (-. (gt (succ (n0)) (succ (succ (succ (n0)))))) (-. (gt (succ (n0)) (succ (succ (n0))))) (-. (gt (pv5) (succ (n0)))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X)))   ### TransEq 161 166 172
% 41.01/41.23  174. ((succ (succ (succ (n0)))) != (succ (succ (succ (n0)))))   ### Refl(=)
% 41.01/41.23  175. (-. (gt (n2) (succ (succ (succ (n0)))))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2))))))   ### TransEq2 152 152 174
% 41.01/41.23  176. (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) (-. (gt (pv5) (succ (n0)))) (-. (gt (succ (n0)) (succ (succ (succ (n0))))))   ### TransEq 173 173 175
% 41.01/41.24  177. (-. (gt (n1) (succ (succ (succ (n0)))))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (pv5) (succ (n0)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### TransEq2 160 160 176
% 41.01/41.24  178. (-. (gt (n3) (succ (succ (succ (n0)))))) (-. (gt (pv5) (succ (n0)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) ((succ (succ (n0))) = (n2)) (gt (n2) (n1)) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### Trans 153 177
% 41.01/41.24  179. ((succ (succ (succ (n0)))) = (n3)) ((n3) != (succ (succ (succ (n0)))))   ### Sym(=)
% 41.01/41.24  180. (-. (gt (succ (succ (succ (n0)))) (succ (succ (succ (n0)))))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (-. (gt (pv5) (succ (n0))))   ### TransEq 150 178 179
% 41.01/41.24  181. ((succ (succ (succ (n0)))) != (succ (succ (succ (n0)))))   ### Refl(=)
% 41.01/41.24  182. (-. (gt T_1 (succ (succ (succ (n0)))))) (-. (gt (pv5) (succ (n0)))) ((pv5) != (n1)) ((pv5) != (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 149 180 181
% 41.01/41.24  183. (-. (gt T_1 (n3))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n2)) ((pv5) != (n1)) (-. (gt (pv5) (succ (n0))))   ### TransEq 182 182 153
% 41.01/41.24  184. ((succ (succ (succ (n0)))) != (succ (succ (succ (n0)))))   ### Refl(=)
% 41.01/41.24  185. (-. (gt (succ (succ (succ (n0)))) (succ (pv5)))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2))   ### TransEq 184 61 61
% 41.01/41.24  186. (-. (gt T_1 (succ (pv5)))) (-. (gt (pv5) (succ (n0)))) ((pv5) != (n1)) ((pv5) != (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 183 183 185
% 41.01/41.24  187. (T_1 != T_1)   ### Refl(=)
% 41.01/41.24  188. (-. (gt T_1 T_1)) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n2)) ((pv5) != (n1)) (-. (gt (pv5) (succ (n0))))   ### Trans 186 187
% 41.01/41.24  189. (-. (gt (pv5) (succ (n0)))) ((pv5) != (n1)) ((pv5) != (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### All 188
% 41.01/41.24  190. (-. (gt T_1 (succ (pv5)))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2)) (-. (gt (n1) (n2)))   ### TransEq2 131 185 185
% 41.01/41.24  191. (-. (gt (succ (n0)) (succ (pv5)))) (-. (gt (n1) (n2))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 58 190
% 41.01/41.24  192. (-. (gt (succ (n0)) (n3))) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (-. (gt (n1) (n2)))   ### Trans 191 131
% 41.01/41.24  193. (-. (gt (n1) (n3))) (-. (gt (n1) (n2))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### TransEq2 51 192 192
% 41.01/41.24  194. (-. (gt (n2) (n2))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (gt (n2) (n1)) ((succ (succ (n0))) = (n2)) ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2))))))   ### Trans 152 49
% 41.01/41.24  195. ((pv5) != (n2)) ((pv5) != (n1)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (gt (n2) (n1)) (gt (succ T_1) (n0)) (All X, (-. (gt X X))) (-. (gt (n1) (n2)))   ### Trans 193 194
% 41.01/41.24  196. (-. (gt (n1) (n1))) (All X, (-. (gt X X))) (gt (succ T_1) (n0)) (gt (n2) (n1)) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) ((pv5) != (n1)) ((pv5) != (n2))   ### Trans 195 51
% 41.01/41.24  197. (-. (gt (pv5) (n1))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n2)) ((pv5) != (n1))   ### TransEq 189 160 196
% 41.01/41.24  198. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.24  199. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.24  200. (-. (gt (succ (n0)) (n1))) ((pv5) != (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### Trans 199 197
% 41.01/41.24  201. ((succ (n0)) = (n1)) ((succ (n0)) != (n1))   ### Axiom
% 41.01/41.24  202. (-. (gt (n1) (n1))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n2))   ### TransEq2 51 200 201
% 41.01/41.24  203. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.24  204. (-. (gt (n1) (succ (n0)))) ((pv5) != (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 51 202 203
% 41.01/41.24  205. ((succ (n0)) = (n1)) ((n1) != (succ (n0)))   ### Sym(=)
% 41.01/41.24  206. (-. (gt (succ (n0)) (succ (n0)))) (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != (n2))   ### TransEq 198 204 205
% 41.01/41.24  207. ((succ (n0)) != (succ (n0)))   ### Refl(=)
% 41.01/41.24  208. (-. (gt (pv5) (succ (n0)))) ((pv5) != (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### TransEq2 197 206 207
% 41.01/41.24  209. (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (gt (pv5) (succ (n0))))   ### TransEq2 208 146 146
% 41.01/41.24  210. (-. (gt (pv5) (pv5))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) ((pv5) != T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) T_1) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) ((succ (succ (n0))) = (n2)) (gt (n3) (n1)) ((succ (n0)) = (n1)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (pv5)) (n0)) (All X, (-. (gt X X)))   ### Trans 209 41
% 41.01/41.24  211. (All X, (-. (gt X X))) (gt (succ (pv5)) (n0)) ((succ (succ (succ (n0)))) = (n3)) ((succ (n0)) = (n1)) (gt (n3) (n1)) ((succ (succ (n0))) = (n2)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (succ (pv5)) T_1) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((pv5) != T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### All 210
% 41.01/41.25  212. (-. (((n2) = T_0) /\ ((pv5) = T_1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (gt (succ (pv5)) T_1) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_0) (n0)) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (n2)) T_0) ((n0) != T_0) ((n1) != T_0) (All X, (-. (gt X X)))   ### NotAnd 33 211
% 41.01/41.25  213. (-. (((n1) = T_0) /\ ((pv5) = T_1))) (All X, (-. (gt X X))) ((n0) != T_0) (gt (succ (n2)) T_0) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (gt (succ T_0) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (gt (succ (pv5)) T_1) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (((n2) = T_0) /\ ((pv5) = T_1)))   ### NotAnd 212 211
% 41.01/41.25  214. (-. (((n0) = T_0) /\ ((pv5) = T_1))) (-. (((n2) = T_0) /\ ((pv5) = T_1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (gt (succ (pv5)) T_1) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_0) (n0)) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (gt (succ (n2)) T_0) (All X, (-. (gt X X))) (-. (((n1) = T_0) /\ ((pv5) = T_1)))   ### NotAnd 213 211
% 41.01/41.25  215. (leq T_1 (pv5)) (-. (((n1) = T_0) /\ ((pv5) = T_1))) (All X, (-. (gt X X))) (gt (succ (n2)) T_0) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (gt (succ T_0) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) (gt (succ T_1) (n0)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (((n2) = T_0) /\ ((pv5) = T_1))) (-. (((n0) = T_0) /\ ((pv5) = T_1)))   ### Definition-Pseudo(leq) 214
% 41.01/41.25  216. (leq T_0 (n2)) (-. (((n0) = T_0) /\ ((pv5) = T_1))) (-. (((n2) = T_0) /\ ((pv5) = T_1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ T_1) (n0)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ T_0) (n0)) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (All X, (-. (gt X X))) (-. (((n1) = T_0) /\ ((pv5) = T_1))) (leq T_1 (pv5))   ### Definition-Pseudo(leq) 215
% 41.01/41.25  217. (leq (n0) T_1) (leq T_1 (pv5)) (-. (((n1) = T_0) /\ ((pv5) = T_1))) (All X, (-. (gt X X))) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (gt (succ T_0) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (-. (((n2) = T_0) /\ ((pv5) = T_1))) (-. (((n0) = T_0) /\ ((pv5) = T_1))) (leq T_0 (n2))   ### Definition-Pseudo(leq) 216
% 41.01/41.25  218. (leq (n0) T_0) (leq T_0 (n2)) (-. (((n0) = T_0) /\ ((pv5) = T_1))) (-. (((n2) = T_0) /\ ((pv5) = T_1))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (All X, (-. (gt X X))) (-. (((n1) = T_0) /\ ((pv5) = T_1))) (leq T_1 (pv5)) (leq (n0) T_1)   ### Definition-Pseudo(leq) 217
% 41.01/41.25  219. (-. (((leq (n0) T_0) /\ ((leq (n0) T_1) /\ ((leq T_0 (n2)) /\ (leq T_1 (pv5))))) => (((-. (((n0) = T_0) /\ ((pv5) = T_1))) /\ ((-. (((n1) = T_0) /\ ((pv5) = T_1))) /\ (-. (((n2) = T_0) /\ ((pv5) = T_1))))) => ((a_select3 (z_defuse) T_0 T_1) = (use))))) (All X, (-. (gt X X))) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### ConjTree 218
% 41.01/41.25  220. (-. (All F, (((leq (n0) T_0) /\ ((leq (n0) F) /\ ((leq T_0 (n2)) /\ (leq F (pv5))))) => (((-. (((n0) = T_0) /\ ((pv5) = F))) /\ ((-. (((n1) = T_0) /\ ((pv5) = F))) /\ (-. (((n2) = T_0) /\ ((pv5) = F))))) => ((a_select3 (z_defuse) T_0 F) = (use)))))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (succ (n0)) (pv5)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (All X, (-. (gt X X)))   ### NotAllEx 219
% 41.01/41.25  221. (-. (All E, (All F, (((leq (n0) E) /\ ((leq (n0) F) /\ ((leq E (n2)) /\ (leq F (pv5))))) => (((-. (((n0) = E) /\ ((pv5) = F))) /\ ((-. (((n1) = E) /\ ((pv5) = F))) /\ (-. (((n2) = E) /\ ((pv5) = F))))) => ((a_select3 (z_defuse) E F) = (use))))))) (All X, (-. (gt X X))) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) (gt (succ (pv5)) (n0)) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (succ (n0)) (pv5)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X))))   ### NotAllEx 220
% 41.01/41.25  222. (leq (pv5) (n0)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (gt (succ (pv5)) (n0)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (All X, (-. (gt X X))) (-. (All E, (All F, (((leq (n0) E) /\ ((leq (n0) F) /\ ((leq E (n2)) /\ (leq F (pv5))))) => (((-. (((n0) = E) /\ ((pv5) = F))) /\ ((-. (((n1) = E) /\ ((pv5) = F))) /\ (-. (((n2) = E) /\ ((pv5) = F))))) => ((a_select3 (z_defuse) E F) = (use)))))))   ### Definition-Pseudo(leq) 221
% 41.01/41.25  223. (leq (n0) (pv5)) (-. (All E, (All F, (((leq (n0) E) /\ ((leq (n0) F) /\ ((leq E (n2)) /\ (leq F (pv5))))) => (((-. (((n0) = E) /\ ((pv5) = F))) /\ ((-. (((n1) = E) /\ ((pv5) = F))) /\ (-. (((n2) = E) /\ ((pv5) = F))))) => ((a_select3 (z_defuse) E F) = (use))))))) (All X, (-. (gt X X))) ((succ (succ (succ (n0)))) = (n3)) (gt (n4) (n3)) ((succ (succ (succ (succ (n0))))) = (n4)) ((succ (succ (n0))) = (n2)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((succ (n0)) = (n1)) (gt (n3) (n1)) (gt (n2) (n1)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n3) (n2)) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (leq (pv5) (n0))   ### Definition-Pseudo(leq) 222
% 41.01/41.25  224. (-. ((((a_select2 (rho_defuse) (n0)) = (use)) /\ (((a_select2 (rho_defuse) (n1)) = (use)) /\ (((a_select2 (rho_defuse) (n2)) = (use)) /\ (((a_select2 (sigma_defuse) (n0)) = (use)) /\ (((a_select2 (sigma_defuse) (n1)) = (use)) /\ (((a_select2 (sigma_defuse) (n2)) = (use)) /\ (((a_select2 (sigma_defuse) (n3)) = (use)) /\ (((a_select2 (sigma_defuse) (n4)) = (use)) /\ (((a_select2 (sigma_defuse) (n5)) = (use)) /\ (((a_select3 (u_defuse) (n0) (n0)) = (use)) /\ (((a_select3 (u_defuse) (n1) (n0)) = (use)) /\ (((a_select3 (u_defuse) (n2) (n0)) = (use)) /\ (((a_select2 (xinit_defuse) (n3)) = (use)) /\ (((a_select2 (xinit_defuse) (n4)) = (use)) /\ (((a_select2 (xinit_defuse) (n5)) = (use)) /\ (((a_select2 (xinit_mean_defuse) (n0)) = (use)) /\ (((a_select2 (xinit_mean_defuse) (n1)) = (use)) /\ (((a_select2 (xinit_mean_defuse) (n2)) = (use)) /\ (((a_select2 (xinit_mean_defuse) (n3)) = (use)) /\ (((a_select2 (xinit_mean_defuse) (n4)) = (use)) /\ (((a_select2 (xinit_mean_defuse) (n5)) = (use)) /\ (((a_select2 (xinit_noise_defuse) (n0)) = (use)) /\ (((a_select2 (xinit_noise_defuse) (n1)) = (use)) /\ (((a_select2 (xinit_noise_defuse) (n2)) = (use)) /\ (((a_select2 (xinit_noise_defuse) (n3)) = (use)) /\ (((a_select2 (xinit_noise_defuse) (n4)) = (use)) /\ (((a_select2 (xinit_noise_defuse) (n5)) = (use)) /\ ((leq (n0) (pv5)) /\ ((leq (pv5) (n0)) /\ ((leq (pv5) (n998)) /\ ((All A, (All B, (((leq (n0) A) /\ ((leq (n0) B) /\ ((leq A (n2)) /\ (leq B (pred (pv5)))))) => ((a_select3 (u_defuse) A B) = (use))))) /\ (All C, (All D, (((leq (n0) C) /\ ((leq (n0) D) /\ ((leq C (n2)) /\ (leq D (pred (pv5)))))) => ((a_select3 (z_defuse) C D) = (use)))))))))))))))))))))))))))))))))))) => (All E, (All F, (((leq (n0) E) /\ ((leq (n0) F) /\ ((leq E (n2)) /\ (leq F (pv5))))) => (((-. (((n0) = E) /\ ((pv5) = F))) /\ ((-. (((n1) = E) /\ ((pv5) = F))) /\ (-. (((n2) = E) /\ ((pv5) = F))))) => ((a_select3 (z_defuse) E F) = (use)))))))) (All X, (All Y, (((leq X Y) /\ (X != Y)) => (gt Y X)))) (gt (n3) (n2)) (All X, (((leq (n0) X) /\ (leq X (n2))) => ((X = (n0)) \/ ((X = (n1)) \/ (X = (n2)))))) (gt (n2) (n1)) (gt (n3) (n1)) ((succ (n0)) = (n1)) (All X, (((leq (n0) X) /\ (leq X (n3))) => ((X = (n0)) \/ ((X = (n1)) \/ ((X = (n2)) \/ (X = (n3))))))) ((succ (succ (n0))) = (n2)) ((succ (succ (succ (succ (n0))))) = (n4)) (gt (n4) (n3)) ((succ (succ (succ (n0)))) = (n3)) (All X, (-. (gt X X)))   ### ConjTree 223
% 41.01/41.25  % SZS output end Proof
% 41.01/41.25  (* END-PROOF *)
%------------------------------------------------------------------------------