%------------------------------------------------------------------------------
% File     : Zenon---0.7.1
% Problem  : RNG106+2 : TPTP v8.1.0. Released v4.0.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : run_zenon %s %d

% Computer : n024.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 : Mon Jul 18 20:48:28 EDT 2022

% Result   : Theorem 0.40s 0.59s
% Output   : Proof 0.40s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.12  % Problem  : RNG106+2 : TPTP v8.1.0. Released v4.0.0.
% 0.03/0.12  % Command  : run_zenon %s %d
% 0.12/0.34  % Computer : n024.cluster.edu
% 0.12/0.34  % Model    : x86_64 x86_64
% 0.12/0.34  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.34  % Memory   : 8042.1875MB
% 0.12/0.34  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.12/0.34  % CPULimit : 300
% 0.12/0.34  % WCLimit  : 600
% 0.12/0.34  % DateTime : Mon May 30 07:33:21 EDT 2022
% 0.12/0.34  % CPUTime  : 
% 0.40/0.59  (* PROOF-FOUND *)
% 0.40/0.59  % SZS status Theorem
% 0.40/0.59  (* BEGIN-PROOF *)
% 0.40/0.59  % SZS output start Proof
% 0.40/0.59  Theorem m__ : ((forall W0 : zenon_U, (forall W1 : zenon_U, (forall W2 : zenon_U, ((((exists W3 : zenon_U, ((aElement0 W3)/\((sdtasdt0 (xc) W3) = W0)))\/(aElementOf0 W0 (slsdtgt0 (xc))))/\(((exists W3 : zenon_U, ((aElement0 W3)/\((sdtasdt0 (xc) W3) = W1)))\/(aElementOf0 W1 (slsdtgt0 (xc))))/\(aElement0 W2)))->(exists W3 : zenon_U, ((aElement0 W3)/\(((sdtasdt0 (xc) W3) = W0)/\(exists W4 : zenon_U, ((aElement0 W4)/\(((sdtasdt0 (xc) W4) = W1)/\(((sdtpldt0 W0 W1) = (sdtasdt0 (xc) (sdtpldt0 W3 W4)))/\(((sdtasdt0 W2 W0) = (sdtasdt0 (xc) (sdtasdt0 W3 W2)))/\((exists W5 : zenon_U, ((aElement0 W5)/\((sdtasdt0 (xc) W5) = (sdtpldt0 W0 W1))))/\((aElementOf0 (sdtpldt0 W0 W1) (slsdtgt0 (xc)))/\((exists W5 : zenon_U, ((aElement0 W5)/\((sdtasdt0 (xc) W5) = (sdtasdt0 W2 W0))))/\(aElementOf0 (sdtasdt0 W2 W0) (slsdtgt0 (xc))))))))))))))))))->(((aSet0 (slsdtgt0 (xc)))/\(forall W0 : zenon_U, ((aElementOf0 W0 (slsdtgt0 (xc)))<->(exists W3 : zenon_U, ((aElement0 W3)/\((sdtasdt0 (xc) W3) = W0))))))->((forall W0 : zenon_U, ((aElementOf0 W0 (slsdtgt0 (xc)))->((forall W1 : zenon_U, ((aElementOf0 W1 (slsdtgt0 (xc)))->(aElementOf0 (sdtpldt0 W0 W1) (slsdtgt0 (xc)))))/\(forall W1 : zenon_U, ((aElement0 W1)->(aElementOf0 (sdtasdt0 W1 W0) (slsdtgt0 (xc))))))))\/(aIdeal0 (slsdtgt0 (xc)))))).
% 0.40/0.59  Proof.
% 0.40/0.59  assert (zenon_L1_ : forall (zenon_TW0_bp : zenon_U), (~((exists W3 : zenon_U, ((aElement0 W3)/\((sdtasdt0 (xc) W3) = zenon_TW0_bp)))\/(aElementOf0 zenon_TW0_bp (slsdtgt0 (xc))))) -> (aElementOf0 zenon_TW0_bp (slsdtgt0 (xc))) -> False).
% 0.40/0.59  do 1 intro. intros zenon_H27 zenon_H28.
% 0.40/0.59  apply (zenon_notor_s _ _ zenon_H27). zenon_intro zenon_H2b. zenon_intro zenon_H2a.
% 0.40/0.59  exact (zenon_H2a zenon_H28).
% 0.40/0.59  (* end of lemma zenon_L1_ *)
% 0.40/0.59  apply NNPP. intro zenon_G.
% 0.40/0.59  apply (zenon_notimply_s _ _ zenon_G). zenon_intro zenon_H2d. zenon_intro zenon_H2c.
% 0.40/0.59  apply (zenon_notimply_s _ _ zenon_H2c). zenon_intro zenon_H2f. zenon_intro zenon_H2e.
% 0.40/0.59  apply (zenon_notor_s _ _ zenon_H2e). zenon_intro zenon_H31. zenon_intro zenon_H30.
% 0.40/0.59  apply (zenon_notallex_s (fun W0 : zenon_U => ((aElementOf0 W0 (slsdtgt0 (xc)))->((forall W1 : zenon_U, ((aElementOf0 W1 (slsdtgt0 (xc)))->(aElementOf0 (sdtpldt0 W0 W1) (slsdtgt0 (xc)))))/\(forall W1 : zenon_U, ((aElement0 W1)->(aElementOf0 (sdtasdt0 W1 W0) (slsdtgt0 (xc)))))))) zenon_H31); [ zenon_intro zenon_H32; idtac ].
% 0.40/0.59  elim zenon_H32. zenon_intro zenon_TW0_bp. zenon_intro zenon_H33.
% 0.40/0.59  apply (zenon_notimply_s _ _ zenon_H33). zenon_intro zenon_H28. zenon_intro zenon_H34.
% 0.40/0.59  apply (zenon_notand_s _ _ zenon_H34); [ zenon_intro zenon_H36 | zenon_intro zenon_H35 ].
% 0.40/0.59  apply (zenon_notallex_s (fun W1 : zenon_U => ((aElementOf0 W1 (slsdtgt0 (xc)))->(aElementOf0 (sdtpldt0 zenon_TW0_bp W1) (slsdtgt0 (xc))))) zenon_H36); [ zenon_intro zenon_H37; idtac ].
% 0.40/0.59  elim zenon_H37. zenon_intro zenon_TW1_ce. zenon_intro zenon_H39.
% 0.40/0.59  apply (zenon_notimply_s _ _ zenon_H39). zenon_intro zenon_H3b. zenon_intro zenon_H3a.
% 0.40/0.59  generalize (zenon_H2d zenon_TW0_bp). zenon_intro zenon_H3c.
% 0.40/0.59  generalize (zenon_H3c zenon_TW1_ce). zenon_intro zenon_H3d.
% 0.40/0.59  generalize (zenon_H3d (xc)). zenon_intro zenon_H3e.
% 0.40/0.59  apply (zenon_imply_s _ _ zenon_H3e); [ zenon_intro zenon_H40 | zenon_intro zenon_H3f ].
% 0.40/0.59  apply (zenon_notand_s _ _ zenon_H40); [ zenon_intro zenon_H27 | zenon_intro zenon_H41 ].
% 0.40/0.59  apply (zenon_L1_ zenon_TW0_bp); trivial.
% 0.40/0.59  apply (zenon_notand_s _ _ zenon_H41); [ zenon_intro zenon_H43 | zenon_intro zenon_H42 ].
% 0.40/0.59  apply (zenon_notor_s _ _ zenon_H43). zenon_intro zenon_H45. zenon_intro zenon_H44.
% 0.40/0.59  exact (zenon_H44 zenon_H3b).
% 0.40/0.59  exact (zenon_H42 m__1905).
% 0.40/0.59  elim zenon_H3f. zenon_intro zenon_TW3_cs. zenon_intro zenon_H47.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H47). zenon_intro zenon_H49. zenon_intro zenon_H48.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H48). zenon_intro zenon_H4b. zenon_intro zenon_H4a.
% 0.40/0.59  elim zenon_H4a. zenon_intro zenon_TW4_cy. zenon_intro zenon_H4d.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H4d). zenon_intro zenon_H4f. zenon_intro zenon_H4e.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H4e). zenon_intro zenon_H51. zenon_intro zenon_H50.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H50). zenon_intro zenon_H53. zenon_intro zenon_H52.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H52). zenon_intro zenon_H55. zenon_intro zenon_H54.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H54). zenon_intro zenon_H57. zenon_intro zenon_H56.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H56). zenon_intro zenon_H59. zenon_intro zenon_H58.
% 0.40/0.59  exact (zenon_H3a zenon_H59).
% 0.40/0.59  apply (zenon_notallex_s (fun W1 : zenon_U => ((aElement0 W1)->(aElementOf0 (sdtasdt0 W1 zenon_TW0_bp) (slsdtgt0 (xc))))) zenon_H35); [ zenon_intro zenon_H5a; idtac ].
% 0.40/0.59  elim zenon_H5a. zenon_intro zenon_TW1_dn. zenon_intro zenon_H5c.
% 0.40/0.59  apply (zenon_notimply_s _ _ zenon_H5c). zenon_intro zenon_H5e. zenon_intro zenon_H5d.
% 0.40/0.59  generalize (zenon_H2d zenon_TW0_bp). zenon_intro zenon_H3c.
% 0.40/0.59  generalize (zenon_H3c zenon_TW0_bp). zenon_intro zenon_H5f.
% 0.40/0.59  generalize (zenon_H5f zenon_TW1_dn). zenon_intro zenon_H60.
% 0.40/0.59  apply (zenon_imply_s _ _ zenon_H60); [ zenon_intro zenon_H62 | zenon_intro zenon_H61 ].
% 0.40/0.59  apply (zenon_notand_s _ _ zenon_H62); [ zenon_intro zenon_H27 | zenon_intro zenon_H63 ].
% 0.40/0.59  apply (zenon_L1_ zenon_TW0_bp); trivial.
% 0.40/0.59  apply (zenon_notand_s _ _ zenon_H63); [ zenon_intro zenon_H27 | zenon_intro zenon_H64 ].
% 0.40/0.59  apply (zenon_L1_ zenon_TW0_bp); trivial.
% 0.40/0.59  exact (zenon_H64 zenon_H5e).
% 0.40/0.59  elim zenon_H61. zenon_intro zenon_TW3_dx. zenon_intro zenon_H66.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H66). zenon_intro zenon_H68. zenon_intro zenon_H67.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H67). zenon_intro zenon_H6a. zenon_intro zenon_H69.
% 0.40/0.59  elim zenon_H69. zenon_intro zenon_TW4_ed. zenon_intro zenon_H6c.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H6c). zenon_intro zenon_H6e. zenon_intro zenon_H6d.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H6d). zenon_intro zenon_H70. zenon_intro zenon_H6f.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H6f). zenon_intro zenon_H72. zenon_intro zenon_H71.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H71). zenon_intro zenon_H74. zenon_intro zenon_H73.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H73). zenon_intro zenon_H76. zenon_intro zenon_H75.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H75). zenon_intro zenon_H78. zenon_intro zenon_H77.
% 0.40/0.59  apply (zenon_and_s _ _ zenon_H77). zenon_intro zenon_H7a. zenon_intro zenon_H79.
% 0.40/0.59  exact (zenon_H5d zenon_H79).
% 0.40/0.59  Qed.
% 0.40/0.59  % SZS output end Proof
% 0.40/0.59  (* END-PROOF *)
% 0.40/0.59  nodes searched: 1085
% 0.40/0.59  max branch formulas: 664
% 0.40/0.59  proof nodes created: 67
% 0.40/0.59  formulas created: 13777
% 0.40/0.59  
%------------------------------------------------------------------------------