TSTP Solution File: KRS118+1 by Zenon---0.7.1

%------------------------------------------------------------------------------
% File     : Zenon---0.7.1
% Problem  : KRS118+1 : TPTP v8.1.0. Released v3.1.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : run_zenon %s %d

% 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  : 600s
% DateTime : Sun Jul 17 03:39:30 EDT 2022

% Result   : Unsatisfiable 79.12s 79.35s
% Output   : Proof 79.12s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.11  % Problem  : KRS118+1 : TPTP v8.1.0. Released v3.1.0.
% 0.03/0.11  % Command  : run_zenon %s %d
% 0.10/0.32  % Computer : n023.cluster.edu
% 0.10/0.32  % Model    : x86_64 x86_64
% 0.10/0.32  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.10/0.32  % Memory   : 8042.1875MB
% 0.10/0.32  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.10/0.32  % CPULimit : 300
% 0.10/0.32  % WCLimit  : 600
% 0.10/0.32  % DateTime : Tue Jun  7 07:02:08 EDT 2022
% 0.10/0.32  % CPUTime  : 
% 79.12/79.35  (* PROOF-FOUND *)
% 79.12/79.35  % SZS status Unsatisfiable
% 79.12/79.35  (* BEGIN-PROOF *)
% 79.12/79.35  % SZS output start Proof
% 79.12/79.35  Theorem zenon_thm : False.
% 79.12/79.35  Proof.
% 79.12/79.35  assert (zenon_L1_ : forall (zenon_TY_bi : zenon_U) (zenon_TY_bj : zenon_U), (rf zenon_TY_bj zenon_TY_bi) -> (~(rinvF zenon_TY_bi zenon_TY_bj)) -> False).
% 79.12/79.35  do 2 intro. intros zenon_H20 zenon_H21.
% 79.12/79.35  generalize (axiom_8 zenon_TY_bi). zenon_intro zenon_H24.
% 79.12/79.35  generalize (zenon_H24 zenon_TY_bj). zenon_intro zenon_H25.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H25); [ zenon_intro zenon_H21; zenon_intro zenon_H27 | zenon_intro zenon_H26; zenon_intro zenon_H20 ].
% 79.12/79.35  exact (zenon_H27 zenon_H20).
% 79.12/79.35  exact (zenon_H21 zenon_H26).
% 79.12/79.35  (* end of lemma zenon_L1_ *)
% 79.12/79.35  assert (zenon_L2_ : forall (zenon_TY_bj : zenon_U) (zenon_TY_bq : zenon_U), (rinvF zenon_TY_bq zenon_TY_bj) -> (~(rf zenon_TY_bj zenon_TY_bq)) -> False).
% 79.12/79.35  do 2 intro. intros zenon_H28 zenon_H29.
% 79.12/79.35  generalize (axiom_8 zenon_TY_bq). zenon_intro zenon_H2b.
% 79.12/79.35  generalize (zenon_H2b zenon_TY_bj). zenon_intro zenon_H2c.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H2c); [ zenon_intro zenon_H2e; zenon_intro zenon_H29 | zenon_intro zenon_H28; zenon_intro zenon_H2d ].
% 79.12/79.35  exact (zenon_H2e zenon_H28).
% 79.12/79.35  exact (zenon_H29 zenon_H2d).
% 79.12/79.35  (* end of lemma zenon_L2_ *)
% 79.12/79.35  assert (zenon_L3_ : forall (zenon_TY_bj : zenon_U), (rf zenon_TY_bj (i2003_11_14_17_21_4056)) -> (~(rinvF (i2003_11_14_17_21_4056) zenon_TY_bj)) -> False).
% 79.12/79.35  do 1 intro. intros zenon_H2f zenon_H30.
% 79.12/79.35  generalize (axiom_8 (i2003_11_14_17_21_4056)). zenon_intro zenon_H31.
% 79.12/79.35  generalize (zenon_H31 zenon_TY_bj). zenon_intro zenon_H32.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H32); [ zenon_intro zenon_H30; zenon_intro zenon_H34 | zenon_intro zenon_H33; zenon_intro zenon_H2f ].
% 79.12/79.35  exact (zenon_H34 zenon_H2f).
% 79.12/79.35  exact (zenon_H30 zenon_H33).
% 79.12/79.35  (* end of lemma zenon_L3_ *)
% 79.12/79.35  assert (zenon_L4_ : (~((i2003_11_14_17_21_4056) = (i2003_11_14_17_21_4056))) -> False).
% 79.12/79.35  do 0 intro. intros zenon_H35.
% 79.12/79.35  apply zenon_H35. apply refl_equal.
% 79.12/79.35  (* end of lemma zenon_L4_ *)
% 79.12/79.35  assert (zenon_L5_ : forall (zenon_TY_bq : zenon_U) (zenon_TY_bj : zenon_U), (~(rr zenon_TY_bj zenon_TY_bq)) -> (rf zenon_TY_bj zenon_TY_bq) -> False).
% 79.12/79.35  do 2 intro. intros zenon_H36 zenon_H2d.
% 79.12/79.35  generalize (axiom_12 zenon_TY_bj). zenon_intro zenon_H37.
% 79.12/79.35  generalize (zenon_H37 zenon_TY_bq). zenon_intro zenon_H38.
% 79.12/79.35  apply (zenon_imply_s _ _ zenon_H38); [ zenon_intro zenon_H29 | zenon_intro zenon_H39 ].
% 79.12/79.35  exact (zenon_H29 zenon_H2d).
% 79.12/79.35  exact (zenon_H36 zenon_H39).
% 79.12/79.35  (* end of lemma zenon_L5_ *)
% 79.12/79.35  assert (zenon_L6_ : forall (zenon_TY_bj : zenon_U) (zenon_TY_bq : zenon_U), (zenon_TY_bq = (i2003_11_14_17_21_4056)) -> (~(rr zenon_TY_bj (i2003_11_14_17_21_4056))) -> (rf zenon_TY_bj zenon_TY_bq) -> False).
% 79.12/79.35  do 2 intro. intros zenon_H3a zenon_H3b zenon_H2d.
% 79.12/79.35  elim (classic (rr zenon_TY_bj zenon_TY_bq)); [ zenon_intro zenon_H39 | zenon_intro zenon_H36 ].
% 79.12/79.35  cut ((rr zenon_TY_bj zenon_TY_bq) = (rr zenon_TY_bj (i2003_11_14_17_21_4056))).
% 79.12/79.35  intro zenon_D_pnotp.
% 79.12/79.35  apply zenon_H3b.
% 79.12/79.35  rewrite <- zenon_D_pnotp.
% 79.12/79.35  exact zenon_H39.
% 79.12/79.35  cut ((zenon_TY_bq = (i2003_11_14_17_21_4056))); [idtac | apply NNPP; zenon_intro zenon_H3c].
% 79.12/79.35  cut ((zenon_TY_bj = zenon_TY_bj)); [idtac | apply NNPP; zenon_intro zenon_H3d].
% 79.12/79.35  congruence.
% 79.12/79.35  apply zenon_H3d. apply refl_equal.
% 79.12/79.35  exact (zenon_H3c zenon_H3a).
% 79.12/79.35  apply (zenon_L5_ zenon_TY_bq zenon_TY_bj); trivial.
% 79.12/79.35  (* end of lemma zenon_L6_ *)
% 79.12/79.35  assert (zenon_L7_ : forall (zenon_TY_cq : zenon_U) (zenon_TY_bj : zenon_U) (zenon_TY_cr : zenon_U) (zenon_TY_cs : zenon_U), (forall Z : zenon_U, (((rf zenon_TY_cs zenon_TY_cr)/\(rf zenon_TY_cs Z))->(zenon_TY_cr = Z))) -> (rf zenon_TY_cs zenon_TY_cr) -> (rf zenon_TY_cs zenon_TY_bj) -> (forall B : zenon_U, (forall C : zenon_U, (((zenon_TY_cr = B)/\(ra_Px1 zenon_TY_cr C))->(ra_Px1 B C)))) -> (~(ra_Px1 zenon_TY_bj zenon_TY_cq)) -> (ra_Px1 zenon_TY_cr zenon_TY_cq) -> False).
% 79.12/79.35  do 4 intro. intros zenon_H3e zenon_H3f zenon_H40 zenon_H41 zenon_H42 zenon_H43.
% 79.12/79.35  generalize (zenon_H3e zenon_TY_bj). zenon_intro zenon_H47.
% 79.12/79.35  apply (zenon_imply_s _ _ zenon_H47); [ zenon_intro zenon_H49 | zenon_intro zenon_H48 ].
% 79.12/79.35  apply (zenon_notand_s _ _ zenon_H49); [ zenon_intro zenon_H4b | zenon_intro zenon_H4a ].
% 79.12/79.35  exact (zenon_H4b zenon_H3f).
% 79.12/79.35  exact (zenon_H4a zenon_H40).
% 79.12/79.35  generalize (zenon_H41 zenon_TY_bj). zenon_intro zenon_H4c.
% 79.12/79.35  generalize (zenon_H4c zenon_TY_cq). zenon_intro zenon_H4d.
% 79.12/79.35  apply (zenon_imply_s _ _ zenon_H4d); [ zenon_intro zenon_H4f | zenon_intro zenon_H4e ].
% 79.12/79.35  apply (zenon_notand_s _ _ zenon_H4f); [ zenon_intro zenon_H51 | zenon_intro zenon_H50 ].
% 79.12/79.35  exact (zenon_H51 zenon_H48).
% 79.12/79.35  exact (zenon_H50 zenon_H43).
% 79.12/79.35  exact (zenon_H42 zenon_H4e).
% 79.12/79.35  (* end of lemma zenon_L7_ *)
% 79.12/79.35  assert (zenon_L8_ : forall (zenon_TY_bj : zenon_U) (zenon_TY_bq : zenon_U), (forall C : zenon_U, ((((i2003_11_14_17_21_4056) = zenon_TY_bq)/\(rinvF (i2003_11_14_17_21_4056) C))->(rinvF zenon_TY_bq C))) -> (zenon_TY_bq = (i2003_11_14_17_21_4056)) -> (rf zenon_TY_bj (i2003_11_14_17_21_4056)) -> (~(exists Y : zenon_U, (ra_Px1 zenon_TY_bj Y))) -> (forall Y : zenon_U, ((rinvR (i2003_11_14_17_21_4056) Y)->(ca_Vx3 Y))) -> False).
% 79.12/79.35  do 2 intro. intros zenon_H52 zenon_H3a zenon_H2f zenon_H53 zenon_H54.
% 79.12/79.35  generalize (zenon_H52 zenon_TY_bj). zenon_intro zenon_H55.
% 79.12/79.35  apply (zenon_imply_s _ _ zenon_H55); [ zenon_intro zenon_H56 | zenon_intro zenon_H28 ].
% 79.12/79.35  apply (zenon_notand_s _ _ zenon_H56); [ zenon_intro zenon_H57 | zenon_intro zenon_H30 ].
% 79.12/79.35  apply zenon_H57. apply sym_equal. exact zenon_H3a.
% 79.12/79.35  apply (zenon_L3_ zenon_TY_bj); trivial.
% 79.12/79.35  generalize (axiom_8 zenon_TY_bq). zenon_intro zenon_H2b.
% 79.12/79.35  generalize (zenon_H2b zenon_TY_bj). zenon_intro zenon_H2c.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H2c); [ zenon_intro zenon_H2e; zenon_intro zenon_H29 | zenon_intro zenon_H28; zenon_intro zenon_H2d ].
% 79.12/79.35  exact (zenon_H2e zenon_H28).
% 79.12/79.35  generalize (zenon_H54 zenon_TY_bj). zenon_intro zenon_H58.
% 79.12/79.35  apply (zenon_imply_s _ _ zenon_H58); [ zenon_intro zenon_H5a | zenon_intro zenon_H59 ].
% 79.12/79.35  generalize (axiom_9 (i2003_11_14_17_21_4056)). zenon_intro zenon_H5b.
% 79.12/79.35  generalize (zenon_H5b zenon_TY_bj). zenon_intro zenon_H5c.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H5c); [ zenon_intro zenon_H5a; zenon_intro zenon_H3b | zenon_intro zenon_H5e; zenon_intro zenon_H5d ].
% 79.12/79.35  apply (zenon_L6_ zenon_TY_bj zenon_TY_bq); trivial.
% 79.12/79.35  exact (zenon_H5a zenon_H5e).
% 79.12/79.35  generalize (axiom_6 zenon_TY_bj). zenon_intro zenon_H5f.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H5f); [ zenon_intro zenon_H62; zenon_intro zenon_H61 | zenon_intro zenon_H59; zenon_intro zenon_H60 ].
% 79.12/79.35  exact (zenon_H62 zenon_H59).
% 79.12/79.35  elim zenon_H60. zenon_intro zenon_TY_cs. zenon_intro zenon_H63.
% 79.12/79.35  apply (zenon_and_s _ _ zenon_H63). zenon_intro zenon_H65. zenon_intro zenon_H64.
% 79.12/79.35  generalize (axiom_8 zenon_TY_bj). zenon_intro zenon_H66.
% 79.12/79.35  generalize (zenon_H66 zenon_TY_cs). zenon_intro zenon_H67.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H67); [ zenon_intro zenon_H68; zenon_intro zenon_H4a | zenon_intro zenon_H65; zenon_intro zenon_H40 ].
% 79.12/79.35  exact (zenon_H68 zenon_H65).
% 79.12/79.35  generalize (axiom_5 zenon_TY_cs). zenon_intro zenon_H69.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H69); [ zenon_intro zenon_H6c; zenon_intro zenon_H6b | zenon_intro zenon_H64; zenon_intro zenon_H6a ].
% 79.12/79.35  exact (zenon_H6c zenon_H64).
% 79.12/79.35  apply (zenon_and_s _ _ zenon_H6a). zenon_intro zenon_H6e. zenon_intro zenon_H6d.
% 79.12/79.35  elim zenon_H6e. zenon_intro zenon_TY_cr. zenon_intro zenon_H6f.
% 79.12/79.35  apply (zenon_and_s _ _ zenon_H6f). zenon_intro zenon_H3f. zenon_intro zenon_H70.
% 79.12/79.35  generalize (axiom_4 zenon_TY_cr). zenon_intro zenon_H71.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H71); [ zenon_intro zenon_H74; zenon_intro zenon_H73 | zenon_intro zenon_H70; zenon_intro zenon_H72 ].
% 79.12/79.35  exact (zenon_H74 zenon_H70).
% 79.12/79.35  elim zenon_H72. zenon_intro zenon_TY_cq. zenon_intro zenon_H43.
% 79.12/79.35  generalize (axiom_7 zenon_TY_cs). zenon_intro zenon_H75.
% 79.12/79.35  generalize (ra_Px1_substitution_1 zenon_TY_cr). zenon_intro zenon_H41.
% 79.12/79.35  generalize (zenon_H75 zenon_TY_cr). zenon_intro zenon_H3e.
% 79.12/79.35  apply zenon_H53. exists zenon_TY_cq. apply NNPP. zenon_intro zenon_H42.
% 79.12/79.35  apply (zenon_L7_ zenon_TY_cq zenon_TY_bj zenon_TY_cr zenon_TY_cs); trivial.
% 79.12/79.35  (* end of lemma zenon_L8_ *)
% 79.12/79.35  assert (zenon_L9_ : forall (zenon_TY_bj : zenon_U) (zenon_TY_bi : zenon_U), (exists Y : zenon_U, ((rinvF zenon_TY_bi Y)/\(cd Y))) -> (forall Y : zenon_U, ((rinvR (i2003_11_14_17_21_4056) Y)->(ca_Vx3 Y))) -> (~(exists Y : zenon_U, (ra_Px1 zenon_TY_bj Y))) -> (rf zenon_TY_bj (i2003_11_14_17_21_4056)) -> (rf zenon_TY_bj zenon_TY_bi) -> (forall B : zenon_U, (forall C : zenon_U, ((((i2003_11_14_17_21_4056) = B)/\(rinvF (i2003_11_14_17_21_4056) C))->(rinvF B C)))) -> (forall B : zenon_U, (forall C : zenon_U, (((zenon_TY_bi = B)/\(rinvF zenon_TY_bi C))->(rinvF B C)))) -> False).
% 79.12/79.35  do 2 intro. intros zenon_H76 zenon_H54 zenon_H53 zenon_H2f zenon_H20 zenon_H77 zenon_H78.
% 79.12/79.35  elim zenon_H76. zenon_intro zenon_TY_er. zenon_intro zenon_H7a.
% 79.12/79.35  apply (zenon_and_s _ _ zenon_H7a). zenon_intro zenon_H7c. zenon_intro zenon_H7b.
% 79.12/79.35  generalize (axiom_8 zenon_TY_bi). zenon_intro zenon_H24.
% 79.12/79.35  generalize (zenon_H24 zenon_TY_er). zenon_intro zenon_H7d.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H7d); [ zenon_intro zenon_H80; zenon_intro zenon_H7f | zenon_intro zenon_H7c; zenon_intro zenon_H7e ].
% 79.12/79.35  exact (zenon_H80 zenon_H7c).
% 79.12/79.35  generalize (axiom_5 zenon_TY_er). zenon_intro zenon_H81.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H81); [ zenon_intro zenon_H84; zenon_intro zenon_H83 | zenon_intro zenon_H7b; zenon_intro zenon_H82 ].
% 79.12/79.35  exact (zenon_H84 zenon_H7b).
% 79.12/79.35  apply (zenon_and_s _ _ zenon_H82). zenon_intro zenon_H86. zenon_intro zenon_H85.
% 79.12/79.35  elim zenon_H86. zenon_intro zenon_TY_bq. zenon_intro zenon_H87.
% 79.12/79.35  apply (zenon_and_s _ _ zenon_H87). zenon_intro zenon_H89. zenon_intro zenon_H88.
% 79.12/79.35  generalize (zenon_H78 zenon_TY_bq). zenon_intro zenon_H8a.
% 79.12/79.35  generalize (axiom_7 zenon_TY_er). zenon_intro zenon_H8b.
% 79.12/79.35  generalize (axiom_7 zenon_TY_bj). zenon_intro zenon_H8c.
% 79.12/79.35  generalize (zenon_H8b zenon_TY_bq). zenon_intro zenon_H8d.
% 79.12/79.35  generalize (zenon_H77 zenon_TY_bq). zenon_intro zenon_H52.
% 79.12/79.35  generalize (zenon_H8c zenon_TY_bq). zenon_intro zenon_H8e.
% 79.12/79.35  generalize (zenon_H8e (i2003_11_14_17_21_4056)). zenon_intro zenon_H8f.
% 79.12/79.35  apply (zenon_imply_s _ _ zenon_H8f); [ zenon_intro zenon_H90 | zenon_intro zenon_H3a ].
% 79.12/79.35  apply (zenon_notand_s _ _ zenon_H90); [ zenon_intro zenon_H29 | zenon_intro zenon_H34 ].
% 79.12/79.35  generalize (zenon_H8d zenon_TY_bi). zenon_intro zenon_H91.
% 79.12/79.35  apply (zenon_imply_s _ _ zenon_H91); [ zenon_intro zenon_H93 | zenon_intro zenon_H92 ].
% 79.12/79.35  apply (zenon_notand_s _ _ zenon_H93); [ zenon_intro zenon_H94 | zenon_intro zenon_H7f ].
% 79.12/79.35  exact (zenon_H94 zenon_H89).
% 79.12/79.35  exact (zenon_H7f zenon_H7e).
% 79.12/79.35  generalize (zenon_H8a zenon_TY_bj). zenon_intro zenon_H95.
% 79.12/79.35  apply (zenon_imply_s _ _ zenon_H95); [ zenon_intro zenon_H96 | zenon_intro zenon_H28 ].
% 79.12/79.35  apply (zenon_notand_s _ _ zenon_H96); [ zenon_intro zenon_H97 | zenon_intro zenon_H21 ].
% 79.12/79.35  apply zenon_H97. apply sym_equal. exact zenon_H92.
% 79.12/79.35  apply (zenon_L1_ zenon_TY_bi zenon_TY_bj); trivial.
% 79.12/79.35  apply (zenon_L2_ zenon_TY_bj zenon_TY_bq); trivial.
% 79.12/79.35  exact (zenon_H34 zenon_H2f).
% 79.12/79.35  apply (zenon_L8_ zenon_TY_bj zenon_TY_bq); trivial.
% 79.12/79.35  (* end of lemma zenon_L9_ *)
% 79.12/79.35  assert (zenon_L10_ : forall (zenon_TY_bj : zenon_U) (zenon_TY_bi : zenon_U), (cUnsatisfiable zenon_TY_bi) -> (forall B : zenon_U, (forall C : zenon_U, (((zenon_TY_bi = B)/\(rinvF zenon_TY_bi C))->(rinvF B C)))) -> (forall B : zenon_U, (forall C : zenon_U, ((((i2003_11_14_17_21_4056) = B)/\(rinvF (i2003_11_14_17_21_4056) C))->(rinvF B C)))) -> (rf zenon_TY_bj zenon_TY_bi) -> (rf zenon_TY_bj (i2003_11_14_17_21_4056)) -> (~(exists Y : zenon_U, (ra_Px1 zenon_TY_bj Y))) -> (forall Y : zenon_U, ((rinvR (i2003_11_14_17_21_4056) Y)->(ca_Vx3 Y))) -> False).
% 79.12/79.35  do 2 intro. intros zenon_H98 zenon_H78 zenon_H77 zenon_H20 zenon_H2f zenon_H53 zenon_H54.
% 79.12/79.35  generalize (axiom_2 zenon_TY_bi). zenon_intro zenon_H99.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_H99); [ zenon_intro zenon_H9c; zenon_intro zenon_H9b | zenon_intro zenon_H98; zenon_intro zenon_H9a ].
% 79.12/79.35  exact (zenon_H9c zenon_H98).
% 79.12/79.35  apply (zenon_and_s _ _ zenon_H9a). zenon_intro zenon_H9e. zenon_intro zenon_H9d.
% 79.12/79.35  apply (zenon_and_s _ _ zenon_H9d). zenon_intro zenon_H76. zenon_intro zenon_H9f.
% 79.12/79.35  apply (zenon_L9_ zenon_TY_bj zenon_TY_bi); trivial.
% 79.12/79.35  (* end of lemma zenon_L10_ *)
% 79.12/79.35  generalize (axiom_2 (i2003_11_14_17_21_4056)). zenon_intro zenon_Ha0.
% 79.12/79.35  apply (zenon_equiv_s _ _ zenon_Ha0); [ zenon_intro zenon_Ha3; zenon_intro zenon_Ha2 | zenon_intro axiom_11; zenon_intro zenon_Ha1 ].
% 79.12/79.35  exact (zenon_Ha3 axiom_11).
% 79.12/79.35  apply (zenon_and_s _ _ zenon_Ha1). zenon_intro zenon_H54. zenon_intro zenon_Ha4.
% 79.12/79.35  apply (zenon_and_s _ _ zenon_Ha4). zenon_intro zenon_Ha6. zenon_intro zenon_Ha5.
% 79.12/79.35  elim zenon_Ha6. zenon_intro zenon_TY_bj. zenon_intro zenon_Ha7.
% 79.12/79.36  apply (zenon_and_s _ _ zenon_Ha7). zenon_intro zenon_H33. zenon_intro zenon_Ha8.
% 79.12/79.36  generalize (axiom_8 (i2003_11_14_17_21_4056)). zenon_intro zenon_H31.
% 79.12/79.36  generalize (zenon_H31 zenon_TY_bj). zenon_intro zenon_H32.
% 79.12/79.36  apply (zenon_equiv_s _ _ zenon_H32); [ zenon_intro zenon_H30; zenon_intro zenon_H34 | zenon_intro zenon_H33; zenon_intro zenon_H2f ].
% 79.12/79.36  exact (zenon_H30 zenon_H33).
% 79.12/79.36  generalize (axiom_5 zenon_TY_bj). zenon_intro zenon_Ha9.
% 79.12/79.36  apply (zenon_equiv_s _ _ zenon_Ha9); [ zenon_intro zenon_Hac; zenon_intro zenon_Hab | zenon_intro zenon_Ha8; zenon_intro zenon_Haa ].
% 79.12/79.36  exact (zenon_Hac zenon_Ha8).
% 79.12/79.36  apply (zenon_and_s _ _ zenon_Haa). zenon_intro zenon_Hae. zenon_intro zenon_Had.
% 79.12/79.36  elim zenon_Hae. zenon_intro zenon_TY_bi. zenon_intro zenon_Haf.
% 79.12/79.36  apply (zenon_and_s _ _ zenon_Haf). zenon_intro zenon_H20. zenon_intro zenon_H9f.
% 79.12/79.36  generalize (axiom_3 zenon_TY_bj). zenon_intro zenon_Hb0.
% 79.12/79.36  apply (zenon_equiv_s _ _ zenon_Hb0); [ zenon_intro zenon_Hb2; zenon_intro zenon_Hb1 | zenon_intro zenon_Had; zenon_intro zenon_H53 ].
% 79.12/79.36  exact (zenon_Hb2 zenon_Had).
% 79.12/79.36  generalize (rinvF_substitution_1 (i2003_11_14_17_21_4056)). zenon_intro zenon_H77.
% 79.12/79.36  generalize (rinvF_substitution_1 zenon_TY_bi). zenon_intro zenon_H78.
% 79.12/79.36  generalize (cUnsatisfiable_substitution_1 (i2003_11_14_17_21_4056)). zenon_intro zenon_Hb3.
% 79.12/79.36  generalize (axiom_7 zenon_TY_bj). zenon_intro zenon_H8c.
% 79.12/79.36  generalize (zenon_H8c (i2003_11_14_17_21_4056)). zenon_intro zenon_Hb4.
% 79.12/79.36  generalize (zenon_Hb3 zenon_TY_bi). zenon_intro zenon_Hb5.
% 79.12/79.36  apply (zenon_imply_s _ _ zenon_Hb5); [ zenon_intro zenon_Hb6 | zenon_intro zenon_H98 ].
% 79.12/79.36  apply (zenon_notand_s _ _ zenon_Hb6); [ zenon_intro zenon_Hb7 | zenon_intro zenon_Ha3 ].
% 79.12/79.36  generalize (zenon_Hb4 zenon_TY_bi). zenon_intro zenon_Hb8.
% 79.12/79.36  apply (zenon_imply_s _ _ zenon_Hb8); [ zenon_intro zenon_Hba | zenon_intro zenon_Hb9 ].
% 79.12/79.36  apply (zenon_notand_s _ _ zenon_Hba); [ zenon_intro zenon_H34 | zenon_intro zenon_H27 ].
% 79.12/79.36  exact (zenon_H34 zenon_H2f).
% 79.12/79.36  exact (zenon_H27 zenon_H20).
% 79.12/79.36  exact (zenon_Hb7 zenon_Hb9).
% 79.12/79.36  generalize (axiom_2 (i2003_11_14_17_21_4056)). zenon_intro zenon_Ha0.
% 79.12/79.36  apply (zenon_equiv_s _ _ zenon_Ha0); [ zenon_intro zenon_Ha3; zenon_intro zenon_Ha2 | zenon_intro axiom_11; zenon_intro zenon_Ha1 ].
% 79.12/79.36  exact (zenon_Ha2 zenon_Ha1).
% 79.12/79.36  exact (zenon_Ha3 axiom_11).
% 79.12/79.36  apply (zenon_L10_ zenon_TY_bj zenon_TY_bi); trivial.
% 79.12/79.36  Qed.
% 79.12/79.36  % SZS output end Proof
% 79.12/79.36  (* END-PROOF *)
% 79.12/79.36  nodes searched: 9569916
% 79.12/79.36  max branch formulas: 47408
% 79.12/79.36  proof nodes created: 194534
% 79.12/79.36  formulas created: 8128541
% 79.12/79.36  
%------------------------------------------------------------------------------