TSTP Solution File: SCT037-1 by Bliksem---1.12

%------------------------------------------------------------------------------
% File     : Bliksem---1.12
% Problem  : SCT037-1 : TPTP v8.1.0. Released v4.1.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : bliksem %s

% Computer : n009.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  : 0s
% DateTime : Mon Jul 18 21:00:43 EDT 2022

% Result   : Timeout 300.09s 300.52s
% Output   : None 
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.10/0.11  % Problem  : SCT037-1 : TPTP v8.1.0. Released v4.1.0.
% 0.10/0.12  % Command  : bliksem %s
% 0.13/0.33  % Computer : n009.cluster.edu
% 0.13/0.33  % Model    : x86_64 x86_64
% 0.13/0.33  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.33  % Memory   : 8042.1875MB
% 0.13/0.33  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.13/0.33  % CPULimit : 300
% 0.13/0.33  % DateTime : Sat Jul  2 07:13:07 EDT 2022
% 0.13/0.33  % CPUTime  : 
% 0.89/1.28  *** allocated 10000 integers for termspace/termends
% 0.89/1.28  *** allocated 10000 integers for clauses
% 0.89/1.28  *** allocated 10000 integers for justifications
% 0.89/1.28  *** allocated 15000 integers for termspace/termends
% 0.89/1.28  *** allocated 22500 integers for termspace/termends
% 0.89/1.28  Bliksem 1.12
% 0.89/1.28  
% 0.89/1.28  
% 0.89/1.28  Automatic Strategy Selection
% 0.89/1.28  
% 0.89/1.28  Clauses:
% 0.89/1.28  [
% 0.89/1.28     [ ~( =( 'c_ATP__Linkup_Osko__Wellfounded__XwfI__pf__1__1'( X, Y ), 
% 0.89/1.28    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ) ) ), 
% 0.89/1.28    'c_Wellfounded_Owf'( X, Y ) ],
% 0.89/1.28     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, X, 'tc_fun'( Y, 
% 0.89/1.28    'tc_bool' ) ), X ) ],
% 0.89/1.28     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), =( 
% 0.89/1.28    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Y, X ), Y ) ],
% 0.89/1.28     [ =( 'c_Relation_OImage'( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.28    X, Y, 'tc_fun'( 'tc_prod'( Z, T ), 'tc_bool' ) ), U, Z, T ), 
% 0.89/1.28    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_OImage'( X, U, 
% 0.89/1.28    Z, T ), 'c_Relation_OImage'( Y, U, Z, T ), 'tc_fun'( T, 'tc_bool' ) ) ) ]
% 0.89/1.28    ,
% 0.89/1.28     [ =( 'c_Relation_OImage'( X, 
% 0.89/1.28    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 'tc_fun'( T, 
% 0.89/1.28    'tc_bool' ) ), T, U ), 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.28    'c_Relation_OImage'( X, Y, T, U ), 'c_Relation_OImage'( X, Z, T, U ), 
% 0.89/1.28    'tc_fun'( U, 'tc_bool' ) ) ) ],
% 0.89/1.28     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.28    'c_List_Osko__Recdef__Xtfl__wf__induct__1__1'( X, Z, T ) ) ) ), ~( 
% 0.89/1.28    'c_Wellfounded_Owf'( Z, T ) ) ],
% 0.89/1.28     [ =( 'c_Set_Oinsert'( X, 'c_Set_Oinsert'( Y, Z, T ), T ), 
% 0.89/1.28    'c_Set_Oinsert'( Y, 'c_Set_Oinsert'( X, Z, T ), T ) ) ],
% 0.89/1.28     [ =( hAPP( 'c_COMBK'( X, Y, Z ), T ), X ) ],
% 0.89/1.28     [ =( 'c_HOL_Ominus__class_Ominus'( 'c_HOL_Ominus__class_Ominus'( X, Y, 
% 0.89/1.28    'tc_fun'( Z, 'tc_bool' ) ), Y, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.28    'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.28     [ =( 'c_Set_Oinsert'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.28    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ), 
% 0.89/1.28    'c_Set_Oinsert'( Y, 'c_Set_Oinsert'( X, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.28    'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ) ) ],
% 0.89/1.28     [ ~( 'class_OrderedGroup_Oab__group__add'( X ) ), ~( =( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, Z, X ), 'c_HOL_Ominus__class_Ominus'( T
% 0.89/1.29    , T, X ) ) ), =( Y, Z ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Oab__group__add'( X ) ), ~( =( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, Y, X ), 'c_HOL_Ominus__class_Ominus'( Z
% 0.89/1.29    , T, X ) ) ), =( Z, T ) ],
% 0.89/1.29     [ =( 'c_Set_Oimage'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ), Y, Z ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oboolean__algebra'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Z, X ), X ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( 'c_Set_Oimage'( X, Y, Z
% 0.89/1.29    , T ), 'c_Set_Oimage'( X, U, Z, T ), 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Set_Oimage'( X, 'c_HOL_Ominus__class_Ominus'( Y, U, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z, T ), 'tc_fun'( T, 'tc_bool' ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), T, X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), T, X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), X ), ~( 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ) )
% 0.89/1.29     ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Y ), ~( 'c_lessequals'( Y, X, 'tc_fun'( Z, 'tc_bool' ) ) )
% 0.89/1.29     ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), Y ), ~( 
% 0.89/1.29    'c_lessequals'( Y, Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), ~( =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), Y ) ), 
% 0.89/1.29    'c_lessequals'( Y, Z, X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), Z ), ~( 
% 0.89/1.29    'c_lessequals'( Z, Y, X ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_lessequals'( Y, T, 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , T, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Lattices_Oupper__semilattice__class_Osup'( Y, X
% 0.89/1.29    , 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y
% 0.89/1.29    , 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_lessequals'( Y, T, 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , T, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), T, X ), ~( 
% 0.89/1.29    'c_lessequals'( Z, T, X ) ), ~( 'c_lessequals'( Y, T, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, Y, X ), X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), T, X ), ~( 
% 0.89/1.29    'c_lessequals'( Z, T, X ) ), ~( 'c_lessequals'( Y, T, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), T, X ), ~( 
% 0.89/1.29    'c_lessequals'( Z, T, X ) ), ~( 'c_lessequals'( Y, T, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, Y, X ), X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), X ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Olower__semilattice__class_Oinf'( Y, X, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, Y, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, Y, X ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Oacyclic'( X, Y ), ~( 'c_Wellfounded_Owf'( X, Y ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, X, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ), Y ), ~( 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' )
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ), X ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), X, 'tc_fun'( Z, 'tc_bool' ) ) ],
% 0.89/1.29     [ =( 'c_Set_Oinsert'( X, 'c_HOL_Ominus__class_Ominus'( Y, 
% 0.89/1.29    'c_Set_Oinsert'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ), 'tc_fun'( Z, 'tc_bool' ) ), Z ), 'c_Set_Oinsert'( X, 
% 0.89/1.29    Y, Z ) ) ],
% 0.89/1.29     [ ~( =( 'c_Set_Oinsert'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y
% 0.89/1.29    , 'tc_bool' ) ), Y ), 'c_Set_Oinsert'( Z, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Y, 'tc_bool' ) ), Y ) ) ), =( X, Z ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( T, X, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( T, X, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Set_Oimage'( 'c_COMBK'( X, Y, Z ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z, Y ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( =( 'c_Set_Oinsert'( X, Y, Z ), 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ), 'c_in'( X, Y, Z ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_lessequals'( 'c_Set_Oinsert'( X, T, Z ), Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Product__Type_OSigma'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, Z, U ), 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Product__Type_OSigma'( X, T, Z, U ), 'c_Product__Type_OSigma'( Y, T, Z
% 0.89/1.29    , U ), 'tc_fun'( 'tc_prod'( Z, U ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( 'c_Set_Oinsert'( X, Y, Z ), T ) ), ~( hBOOL( hAPP( Y, T )
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Set_Oinsert'( Y, Z, T ), 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ), ~( 'c_lessequals'( X, Z, 'tc_fun'( T, 'tc_bool' ) ) ), 'c_in'( Y, X
% 0.89/1.29    , T ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), 'c_in'( T, X, Z ), 
% 0.89/1.29    ~( 'c_lessequals'( X, 'c_Set_Oinsert'( T, Y, Z ), 'tc_fun'( Z, 'tc_bool'
% 0.89/1.29     ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Set_Oinsert'( Y, Z, T ), 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ), ~( 'c_lessequals'( X, Z, 'tc_fun'( T, 'tc_bool' ) ) ), 'c_in'( Y, X
% 0.89/1.29    , T ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , 'c_Set_Oinsert'( T, Y, Z ), 'tc_fun'( Z, 'tc_bool' ) ) ), 'c_in'( T, X
% 0.89/1.29    , Z ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Odistrib__lattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), T, X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Odistrib__lattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, X ), X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Olower__semilattice__class_Oinf'( X, Z, 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( 'c_Relation_ODomain'( X
% 0.89/1.29    , Y, Z ), 'c_Relation_ODomain'( T, Y, Z ), 'tc_fun'( Y, 'tc_bool' ) ), 
% 0.89/1.29    'c_Relation_ODomain'( 'c_HOL_Ominus__class_Ominus'( X, T, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Z ), 'tc_bool' ) ), Y, Z ), 'tc_fun'( Y, 'tc_bool' ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ ~( =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' )
% 0.89/1.29     ) ) ), =( 'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 'tc_bool' ) )
% 0.89/1.29    , X ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_in'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( 'c_Product__Type_OSigma'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, Z, U ), 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Product__Type_OSigma'( X, T, Z, U ), 'c_Product__Type_OSigma'( Y, T, Z
% 0.89/1.29    , U ), 'tc_fun'( 'tc_prod'( Z, U ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Set_Oimage'( 'c_COMBK'( X, Y, Z ), T, Z, Y ), 'c_Set_Oinsert'( X
% 0.89/1.29    , 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ), Y ) ), ~( 
% 0.89/1.29    'c_in'( U, T, Z ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_in'( Y, X, Z ) ), 
% 0.89/1.29    ~( 'c_lessequals'( X, 'c_Set_Oinsert'( Y, T, Z ), 'tc_fun'( Z, 'tc_bool'
% 0.89/1.29     ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Set_Oinsert'( Y, Z, T ), 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ), ~( 'c_in'( Y, X, T ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( T, 'tc_bool' ) ), T ), 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ) ), Z, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Set_Oinsert'( Y, Z, T ), 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ), ~( 'c_in'( Y, X, T ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( T, 'tc_bool' ) ), T ), 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ) ), Z, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( 'c_Set_Oinsert'( X, Y, Z ), T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'c_HOL_Ominus__class_Ominus'( Y, T, 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ) ), ~( 'c_in'( X, T, Z ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_Set_Oinsert'( T, X, Z ), Y, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Set_Oinsert'( Y, Z, T ), 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ), ~( 'c_lessequals'( X, Z, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( 'c_Relation_ORange'( X, 
% 0.89/1.29    Y, Z ), 'c_Relation_ORange'( T, Y, Z ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Relation_ORange'( 'c_HOL_Ominus__class_Ominus'( X, T, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Z ), 'tc_bool' ) ), Y, Z ), 'tc_fun'( Z, 'tc_bool' ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xwf__induct__1__1'( X, Z, T ) ) ) ), 
% 0.89/1.29    ~( 'c_Wellfounded_Owf'( Z, T ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oboolean__algebra'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), X ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oboolean__algebra'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), Y, X ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Y, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Y, 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool'
% 0.89/1.29     ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Y, 'tc_bool' ) ), X, 
% 0.89/1.29    'tc_fun'( Y, 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ), 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Z, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Y, Y ), 'tc_bool' ) ), Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ ~( =( 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ), 
% 0.89/1.29    'c_Set_Oimage'( Y, Z, T, X ) ) ), =( Z, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Set_Oinsert'( X, Y
% 0.89/1.29    , Z ), T, 'tc_fun'( Z, 'tc_bool' ) ), 'c_Set_Oinsert'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 'c_Set_Oinsert'( Y
% 0.89/1.29    , Z, T ), 'tc_fun'( T, 'tc_bool' ) ), 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), T ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Opordered__ab__group__add'( X ) ), 
% 0.89/1.29    'c_lessequals'( Y, Z, X ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Z, X ), 'c_HOL_Ouminus__class_Ouminus'( Y
% 0.89/1.29    , X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Opordered__ab__group__add'( X ) ), 
% 0.89/1.29    'c_lessequals'( 'c_HOL_Ouminus__class_Ouminus'( Y, X ), 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Z, X ), X ), ~( 'c_lessequals'( Z, Y, X )
% 0.89/1.29     ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ), 'c_HOL_Ouminus__class_Ouminus'( Z, 'tc_fun'( Y, 'tc_bool'
% 0.89/1.29     ) ), 'tc_fun'( Y, 'tc_bool' ) ), ~( 'c_lessequals'( Z, X, 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ), 'c_HOL_Ouminus__class_Ouminus'( Z, 'tc_fun'( Y, 'tc_bool'
% 0.89/1.29     ) ), 'tc_fun'( Y, 'tc_bool' ) ), ~( 'c_lessequals'( Z, X, 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool'
% 0.89/1.29     ) ), Y, 'tc_fun'( X, 'tc_bool' ) ) ],
% 0.89/1.29     [ ~( 'class_Orderings_Obot'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ), Y, X ) ],
% 0.89/1.29     [ =( 'c_HOL_Ouminus__class_Ouminus'( 'c_HOL_Ominus__class_Ominus'( X, Y
% 0.89/1.29    , 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Z, 'tc_bool' ) ), Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, 'c_Set_Oinsert'( Y, Z, T ), 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), 'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, Z, 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Set_Oinsert'( Y, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), T ), 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, 'c_Set_Oinsert'( Y, Z, T ), 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), 'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( T, 'tc_bool' ) ), T ), 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ) ), Z, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( =( 'c_Set_Oinsert'( X, Y, Z ), 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( 'c_Set_Oinsert'( X, Y
% 0.89/1.29    , Z ), 'c_Set_Oinsert'( X, T, Z ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Set_Oinsert'( X, 'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ =( 'c_Relation_OImage'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y
% 0.89/1.29    , 'tc_bool' ) ), Y, Z ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Set_Oinsert'( X, 'c_Set_Oinsert'( X, Y, Z ), Z ), 
% 0.89/1.29    'c_Set_Oinsert'( X, Y, Z ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), =( Z, Y ), ~( hBOOL( hAPP( 'c_Set_Oinsert'( Z, 
% 0.89/1.29    X, T ), Y ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool'
% 0.89/1.29     ) ), 'c_HOL_Ouminus__class_Ouminus'( 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( X, 'tc_bool' ) ), 'tc_fun'( X, 'tc_bool' ) ), 'tc_fun'( X, 
% 0.89/1.29    'tc_bool' ) ) ],
% 0.89/1.29     [ =( 'c_Relation_ODomain'( 'c_Set_Oinsert'( 'c_Pair'( X, Y, Z, T ), U, 
% 0.89/1.29    'tc_prod'( Z, T ) ), Z, T ), 'c_Set_Oinsert'( X, 'c_Relation_ODomain'( U
% 0.89/1.29    , Z, T ), Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y
% 0.89/1.29    , 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ), ~( 'c_Relation_Osym'( 
% 0.89/1.29    Y, Z ) ), ~( 'c_Relation_Osym'( X, Z ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_ODomain'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Z, T ), 'tc_bool' ) ), Z, T ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 'c_Relation_ODomain'( X, Z
% 0.89/1.29    , T ), 'c_Relation_ODomain'( Y, Z, T ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Obounded__lattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ), X ), 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Obounded__lattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ), Y, X ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ), Y, 'tc_fun'( 
% 0.89/1.29    X, 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool'
% 0.89/1.29     ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ), 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Set_Oinsert'( Y, X, Z ), 'tc_fun'( Z, 'tc_bool'
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Set_Oimage'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), T, U ), 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Set_Oimage'( X, Y, T, U ), 'c_Set_Oimage'( X, Z, T, U ), 'tc_fun'( U, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( U, 'tc_bool' ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_OImage'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), T, U ), 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Relation_OImage'( X, Y, T, U ), 'c_Relation_OImage'( X, Z, T, U ), 
% 0.89/1.29    'tc_fun'( U, 'tc_bool' ) ), 'tc_fun'( U, 'tc_bool' ) ) ],
% 0.89/1.29     [ ~( =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ), 'c_lessequals'( T, X, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_lessequals'( T, X, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Product__Type_OSigma'( 'c_HOL_Ominus__class_Ominus'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), T, Z, U ), 'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_Product__Type_OSigma'( X, T, Z, U ), 'c_Product__Type_OSigma'( Y, T, Z
% 0.89/1.29    , U ), 'tc_fun'( 'tc_prod'( Z, U ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Y, 'tc_bool' ) ), 'tc_fun'( Y, 'tc_bool' ) ), X ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, X, 'tc_fun'( Y, 'tc_bool' ) ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( Z, Y ) ), ~( hBOOL( hAPP( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, X, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), Y ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), T ) ), ~( hBOOL( hAPP( Y, T ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), T ) ), ~( hBOOL( hAPP( X, T ) ) ) ],
% 0.89/1.29     [ ~( =( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Relation_ODomain'( X, Y, Y ), 'c_Relation_ORange'( Z, Y, Y ), 'tc_fun'( 
% 0.89/1.29    Y, 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool'
% 0.89/1.29     ) ) ) ), ~( 'c_Wellfounded_Owf'( Z, Y ) ), ~( 'c_Wellfounded_Owf'( X, Y
% 0.89/1.29     ) ), 'c_Wellfounded_Owf'( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    X, Z, 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y ) ],
% 0.89/1.29     [ =( 'c_Product__Type_OSigma'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z ), Z, U ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 'c_Product__Type_OSigma'( X
% 0.89/1.29    , 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z ), Z, U ), 
% 0.89/1.29    'c_Product__Type_OSigma'( Y, 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z )
% 0.89/1.29    , Z, U ), 'tc_fun'( 'tc_prod'( Z, U ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Relation_Orefl__on'( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    X, Y, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( T, U, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Z, Z ), 'tc_bool' ) ), Z ), ~( 'c_Relation_Orefl__on'( Y, U, Z ) ), ~( 
% 0.89/1.29    'c_Relation_Orefl__on'( X, T, Z ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), T, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), T, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Obounded__lattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ), X ), Y ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Obounded__lattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ), Y, X ), Y ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ), Y, 'tc_fun'( 
% 0.89/1.29    X, 'tc_bool' ) ), Y ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ), 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ), X ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( X, 'tc_bool' ) ), Y, 'tc_fun'( X, 'tc_bool' ) ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Product__Type_OSigma'( 'c_Set_Oinsert'( X, Y, Z ), 'c_COMBK'( 
% 0.89/1.29    'c_Set_Oinsert'( T, U, W ), 'tc_fun'( W, 'tc_bool' ), Z ), Z, W ), 
% 0.89/1.29    'c_Set_Oinsert'( 'c_Pair'( X, T, Z, W ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Product__Type_OSigma'( Y
% 0.89/1.29    , 'c_COMBK'( 'c_Set_Oinsert'( T, U, W ), 'tc_fun'( W, 'tc_bool' ), Z ), Z
% 0.89/1.29    , W ), 'c_Product__Type_OSigma'( 'c_Set_Oinsert'( X, Y, Z ), 'c_COMBK'( U
% 0.89/1.29    , 'tc_fun'( W, 'tc_bool' ), Z ), Z, W ), 'tc_fun'( 'tc_prod'( Z, W ), 
% 0.89/1.29    'tc_bool' ) ), 'tc_prod'( Z, W ) ) ) ],
% 0.89/1.29     [ ~( hBOOL( hAPP( 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool'
% 0.89/1.29     ) ), Y ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, Z, 'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ) ), 'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Olower__semilattice__class_Oinf'( X, Z, 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Set_Oimage'( 'c_COMBK'( X, Y, Z ), T, Z, Y ), 'c_Set_Oinsert'( X
% 0.89/1.29    , 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ), Y ) ), =( T
% 0.89/1.29    , 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_HOL_Ominus__class_Ominus'( T, U, 'tc_fun'( Z, 'tc_bool'
% 0.89/1.29     ) ), 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( U, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ), ~( 'c_lessequals'( X, T, 'tc_fun'( Z, 'tc_bool' ) ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ ~( 'c_in'( X, Y, Z ) ), ~( 'c_in'( X, T, Z ) ), ~( =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( T, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) )
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    Y, 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ), ~( 
% 0.89/1.29    'c_Relation_Otrans'( Y, Z ) ), ~( 'c_Relation_Otrans'( X, Z ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, X ), X ), X ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Olower__semilattice__class_Oinf'( T, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), X ), Y ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xwf__def__1__1'( X, Z, T ) ) ) ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( Z, T ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oboolean__algebra'( X ) ), ~( =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), 'c_HOL_Ouminus__class_Ouminus'( Z
% 0.89/1.29    , X ) ) ), =( Y, Z ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Ogroup__add'( X ) ), ~( =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), 'c_HOL_Ouminus__class_Ouminus'( Z
% 0.89/1.29    , X ) ) ), =( Y, Z ) ],
% 0.89/1.29     [ ~( =( 'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Y, 'tc_bool' ) ), 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Z, 'tc_fun'( Y, 'tc_bool' ) ) ) ), =( X, 
% 0.89/1.29    Z ) ],
% 0.89/1.29     [ 'c_Wellfounded_Oacyclic'( X, Y ), ~( 'c_Wellfounded_Oacyclic'( 
% 0.89/1.29    'c_Relation_Oconverse'( X, Y, Y ), Y ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Oacyclic'( 'c_Relation_Oconverse'( X, Y, Y ), Y ), ~( 
% 0.89/1.29    'c_Wellfounded_Oacyclic'( X, Y ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), X ), Y ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), Y ), ~( 
% 0.89/1.29    'c_lessequals'( Z, Y, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), ~( =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), Z ) ), 
% 0.89/1.29    'c_lessequals'( Y, Z, X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), Z ), ~( 
% 0.89/1.29    'c_lessequals'( Y, Z, X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Y ), ~( 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ) )
% 0.89/1.29     ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), X ), ~( 'c_lessequals'( Y, X, 'tc_fun'( Z, 'tc_bool' ) ) )
% 0.89/1.29     ],
% 0.89/1.29     [ ~( =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ), Y ) ), 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) )
% 0.89/1.29     ],
% 0.89/1.29     [ 'c_Relation_Orefl__on'( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    X, Y, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( T, U, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Z, Z ), 'tc_bool' ) ), Z ), ~( 'c_Relation_Orefl__on'( Y, U, Z ) ), ~( 
% 0.89/1.29    'c_Relation_Orefl__on'( X, T, Z ) ) ],
% 0.89/1.29     [ ~( =( 'c_Set_Oinsert'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ), 
% 0.89/1.29    'c_Set_Oinsert'( T, 'c_Set_Oinsert'( U, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ) ) ), =( X, U ), =( X, T ) ],
% 0.89/1.29     [ =( 'c_Relation_Oconverse'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Z, T ), 'tc_bool' ) ), Z, T ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 'c_Relation_Oconverse'( X, 
% 0.89/1.29    Z, T ), 'c_Relation_Oconverse'( Y, Z, T ), 'tc_fun'( 'tc_prod'( T, Z ), 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 'c_Set_Oinsert'( Y
% 0.89/1.29    , Z, T ), 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ) ), 'c_in'( Y, X, T ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( 'c_Set_Oinsert'( X, Y
% 0.89/1.29    , Z ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ), 'c_in'( X, T, Z ) ],
% 0.89/1.29     [ 'c_Relation_Ototal__on'( X, Y, Z ), ~( 
% 0.89/1.29    'c_Order__Relation_Ostrict__linear__order__on'( X, Y, Z ) ) ],
% 0.89/1.29     [ ~( =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' )
% 0.89/1.29     ) ) ), =( Y, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ ~( =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' )
% 0.89/1.29     ) ) ), =( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Obounded__lattice'( X ) ), ~( =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ) ) ), =( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Obounded__lattice'( X ) ), ~( =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ) ) ), =( Z, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    X, Y, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, X, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ), 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Orel__comp'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Z, T ), 'tc_bool' ) ), U, Z, T, W ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_Orel__comp'( X
% 0.89/1.29    , U, Z, T, W ), 'c_Relation_Orel__comp'( Y, U, Z, T, W ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Z, W ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Orel__comp'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    T, U ), 'tc_bool' ) ), W, T, U ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_Orel__comp'( X
% 0.89/1.29    , Y, W, T, U ), 'c_Relation_Orel__comp'( X, Z, W, T, U ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( W, U ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , 'c_Lattices_Olower__semilattice__class_Oinf'( T, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , 'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( Y, Z, 
% 0.89/1.29    X ), ~( 'c_lessequals'( Y, 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    Z, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( Y, Z, 
% 0.89/1.29    X ), ~( 'c_lessequals'( Y, 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    T, Z, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), T, X ), ~( 
% 0.89/1.29    'c_lessequals'( Y, T, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), T, X ), ~( 
% 0.89/1.29    'c_lessequals'( Z, T, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( Y, Z, 
% 0.89/1.29    X ), ~( 'c_lessequals'( Y, 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    Z, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( Y, Z, 
% 0.89/1.29    X ), ~( 'c_lessequals'( Y, 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    T, Z, X ), X ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, T, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Olordered__ab__group__add'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), 'c_HOL_Ouminus__class_Ouminus'( Z
% 0.89/1.29    , X ), X ), X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Oupper__semilattice__class_Osup'( Y, X, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, Y, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, Y, X ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oboolean__algebra'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), 'c_HOL_Ouminus__class_Ouminus'( Z
% 0.89/1.29    , X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Olordered__ab__group__add'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), 'c_HOL_Ouminus__class_Ouminus'( Z
% 0.89/1.29    , X ), X ) ) ],
% 0.89/1.29     [ =( 'c_Relation_ODomain'( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    X, Y, 'tc_fun'( 'tc_prod'( Z, T ), 'tc_bool' ) ), Z, T ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_ODomain'( X, Z
% 0.89/1.29    , T ), 'c_Relation_ODomain'( Y, Z, T ), 'tc_fun'( Z, 'tc_bool' ) ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( 'c_Set_Oinsert'( X, Y, Z ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Set_Oinsert'( X, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ) ) ],
% 0.89/1.29     [ =( 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ), 
% 0.89/1.29    'c_Set_Oimage'( Y, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool'
% 0.89/1.29     ) ), Z, X ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oboolean__algebra'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), 'c_HOL_Ouminus__class_Ouminus'( Z
% 0.89/1.29    , X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Olordered__ab__group__add'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), 'c_HOL_Ouminus__class_Ouminus'( Z
% 0.89/1.29    , X ), X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, X, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool'
% 0.89/1.29     ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_ORange'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Z, T ), 'tc_bool' ) ), Z, T ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 'c_Relation_ORange'( X, Z, 
% 0.89/1.29    T ), 'c_Relation_ORange'( Y, Z, T ), 'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xwf__induct__rule__1__1'( X, Z, T ) ) )
% 0.89/1.29     ), ~( 'c_Wellfounded_Owf'( Z, T ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ), Y ), 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Z, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Y, Y ), 'tc_bool' ) ), Y ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, 'c_HOL_Ouminus__class_Ouminus'( Y
% 0.89/1.29    , 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( 'c_Set_Oinsert'( X, Y, Z ), T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'c_Set_Oinsert'( X, 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, T, 'tc_fun'( Z, 'tc_bool' ) ), Z ) ), 
% 0.89/1.29    'c_in'( X, T, Z ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Set_Oinsert'( Y, Z, T ), 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ), ~( 'c_lessequals'( X, Z, 'tc_fun'( T, 'tc_bool' ) ) ), ~( 
% 0.89/1.29    'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( T, 'tc_bool' ) ), T ), 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ) ), Z, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, X, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), Y ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), Y ) ) ) ],
% 0.89/1.29     [ =( 'c_Relation_ORange'( 'c_Set_Oinsert'( 'c_Pair'( X, Y, Z, T ), U, 
% 0.89/1.29    'tc_prod'( Z, T ) ), Z, T ), 'c_Set_Oinsert'( Y, 'c_Relation_ORange'( U, 
% 0.89/1.29    Z, T ), T ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) )
% 0.89/1.29     ), ~( 'c_lessequals'( X, 'c_HOL_Ouminus__class_Ouminus'( Y, 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' )
% 0.89/1.29     ) ) ), 'c_lessequals'( X, 'c_HOL_Ouminus__class_Ouminus'( Y, 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y
% 0.89/1.29    , 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ), ~( 'c_Relation_Osym'( 
% 0.89/1.29    Y, Z ) ), ~( 'c_Relation_Osym'( X, Z ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( 'c_Set_Oinsert'( X, Y, Z ), 
% 0.89/1.29    'c_Set_Oinsert'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ), 'tc_fun'( Z, 'tc_bool' ) ), Y ), 'c_in'( X, Y, Z ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z
% 0.89/1.29    , 'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_lessequals'( 'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), Z, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( =( hAPP( X, 'c_List_Osko__Recdef__Xcuts__eq__1__1'( X, Y, Z, T, U, 
% 0.89/1.29    W ) ), hAPP( Y, 'c_List_Osko__Recdef__Xcuts__eq__1__1'( X, Y, Z, T, U, W
% 0.89/1.29     ) ) ) ), =( 'c_Recdef_Ocut'( X, Z, T, U, W ), 'c_Recdef_Ocut'( Y, Z, T, 
% 0.89/1.29    U, W ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ouminus__class_Ouminus'( 'c_HOL_Ouminus__class_Ouminus'( X, 
% 0.89/1.29    'tc_fun'( Y, 'tc_bool' ) ), 'tc_fun'( Y, 'tc_bool' ) ), X ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Ogroup__add'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 'c_HOL_Ouminus__class_Ouminus'( Y, X ), X
% 0.89/1.29     ), Y ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oboolean__algebra'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 'c_HOL_Ouminus__class_Ouminus'( Y, X ), X
% 0.89/1.29     ), Y ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Ogroup__add'( X ) ), =( Y, 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 'c_HOL_Ouminus__class_Ouminus'( Y, X ), X
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Ogroup__add'( X ) ), =( Y, 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 'c_HOL_Ouminus__class_Ouminus'( Y, X ), X
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Ogroup__add'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 'c_HOL_Ouminus__class_Ouminus'( Y, X ), X
% 0.89/1.29     ), Y ) ],
% 0.89/1.29     [ 'c_Wellfounded_Oacyclic'( X, Y ), ~( 'c_Wellfounded_Oacyclic'( 
% 0.89/1.29    'c_Set_Oinsert'( 'c_Pair'( Z, T, Y, Y ), X, 'tc_prod'( Y, Y ) ), Y ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ ~( 'class_OrderedGroup_Oab__group__add'( X ) ), =( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 'c_HOL_Ominus__class_Ominus'( Y, Z, X ), 
% 0.89/1.29    X ), 'c_HOL_Ominus__class_Ominus'( Z, Y, X ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Opordered__ab__group__add'( X ) ), 
% 0.89/1.29    'c_lessequals'( Y, 'c_HOL_Ouminus__class_Ouminus'( Z, X ), X ), ~( 
% 0.89/1.29    'c_lessequals'( Z, 'c_HOL_Ouminus__class_Ouminus'( Y, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Opordered__ab__group__add'( X ) ), 
% 0.89/1.29    'c_lessequals'( Y, 'c_HOL_Ouminus__class_Ouminus'( Z, X ), X ), ~( 
% 0.89/1.29    'c_lessequals'( Z, 'c_HOL_Ouminus__class_Ouminus'( Y, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Opordered__ab__group__add'( X ) ), 
% 0.89/1.29    'c_lessequals'( 'c_HOL_Ouminus__class_Ouminus'( Y, X ), Z, X ), ~( 
% 0.89/1.29    'c_lessequals'( 'c_HOL_Ouminus__class_Ouminus'( Z, X ), Y, X ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Opordered__ab__group__add'( X ) ), 
% 0.89/1.29    'c_lessequals'( 'c_HOL_Ouminus__class_Ouminus'( Y, X ), Z, X ), ~( 
% 0.89/1.29    'c_lessequals'( 'c_HOL_Ouminus__class_Ouminus'( Z, X ), Y, X ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), T ), ~( 'c_in'( X, Z, T ) ), ~( 'c_in'( X, Y
% 0.89/1.29    , T ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), T ), ~( 'c_in'( X, Z, T ) ), ~( 'c_in'( X, Y
% 0.89/1.29    , T ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Set_Oinsert'( Y, Z, T ), T ), ~( 'c_in'( X, Z, T ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( X, 'c_Set_Oinsert'( Y, Z, T ), T ), ~( 'c_in'( X, Z, T ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( X, 'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), T ), ~( 'c_in'( X, Y, T ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), T ), ~( 'c_in'( X, Z, T ) ) ],
% 0.89/1.29     [ ~( 'c_in'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' )
% 0.89/1.29     ), Y ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( 'c_in'( Y, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ ~( 'c_in'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' )
% 0.89/1.29     ), Y ) ) ],
% 0.89/1.29     [ ~( 'c_in'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' )
% 0.89/1.29     ), Y ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), =( X, T ), ~( 'c_in'( X, 'c_Set_Oinsert'( T, Y, Z )
% 0.89/1.29    , Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), 'c_in'( X, T, Z ), ~( 'c_in'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( T, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ ~( 'c_in'( X, Y, Z ) ), ~( 'c_in'( X, 'c_HOL_Ominus__class_Ominus'( T
% 0.89/1.29    , Y, 'tc_fun'( Z, 'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( X, 'c_HOL_Ominus__class_Ominus'( Y, T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_HOL_Ouminus__class_Ouminus'( Y, 'tc_fun'( Z, 'tc_bool' )
% 0.89/1.29     ), Z ), 'c_in'( X, Y, Z ) ],
% 0.89/1.29     [ ~( 'c_in'( X, Y, Z ) ), ~( 'c_in'( X, 'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    Y, 'tc_fun'( Z, 'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Set_Oinsert'( X, Y, Z ), Z ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Set_Oinsert'( X, Y, Z ), Z ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Set_Oinsert'( X, Y, Z ), Z ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( T, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ ~( hBOOL( hAPP( X, Y ) ) ), ~( 'c_in'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_HOL_Ominus__class_Ominus'( Y, Z, 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ), T ), 'c_in'( X, Z, T ), ~( 'c_in'( X, Y, T ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_HOL_Ominus__class_Ominus'( Y, Z, 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ), T ), 'c_in'( X, Z, T ), ~( 'c_in'( X, Y, T ) ) ],
% 0.89/1.29     [ ~( =( 'c_Set_Oinsert'( X, Y, Z ), 'c_Set_Oinsert'( X, T, Z ) ) ), 
% 0.89/1.29    'c_in'( X, T, Z ), 'c_in'( X, Y, Z ), =( Y, T ) ],
% 0.89/1.29     [ =( 'c_Set_Oinsert'( X, Y, Z ), Y ), ~( 'c_in'( X, Y, Z ) ) ],
% 0.89/1.29     [ ~( =( 'c_Relation_OImage'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'c_Relation_OImage'( X, 'c_Set_Oinsert'( T, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ) )
% 0.89/1.29     ), 'c_in'( 'c_Pair'( Y, T, Z, Z ), X, 'tc_prod'( Z, Z ) ), ~( 'c_in'( T
% 0.89/1.29    , U, Z ) ), ~( 'c_Equiv__Relations_Oequiv'( U, X, Z ) ) ],
% 0.89/1.29     [ ~( =( 'c_Relation_OImage'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'c_Relation_OImage'( X, 'c_Set_Oinsert'( T, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ) )
% 0.89/1.29     ), ~( 'c_Equiv__Relations_Oequiv'( U, X, Z ) ), 'c_in'( 'c_Pair'( Y, T, 
% 0.89/1.29    Z, Z ), X, 'tc_prod'( Z, Z ) ), ~( 'c_in'( T, U, Z ) ), ~( 'c_in'( Y, U, 
% 0.89/1.29    Z ) ) ],
% 0.89/1.29     [ =( 'c_Relation_OImage'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'c_Relation_OImage'( X, 'c_Set_Oinsert'( T, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ) )
% 0.89/1.29    , ~( 'c_in'( 'c_Pair'( Y, T, Z, Z ), X, 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( 
% 0.89/1.29    T, U, Z ) ), ~( 'c_in'( Y, U, Z ) ), ~( 'c_Equiv__Relations_Oequiv'( U, X
% 0.89/1.29    , Z ) ) ],
% 0.89/1.29     [ ~( =( 'c_Relation_OImage'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'c_Relation_OImage'( X, 'c_Set_Oinsert'( T, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ) )
% 0.89/1.29     ), ~( 'c_in'( T, U, Z ) ), ~( 'c_in'( Y, U, Z ) ), ~( 
% 0.89/1.29    'c_Equiv__Relations_Oequiv'( U, X, Z ) ), 'c_in'( 'c_Pair'( Y, T, Z, Z )
% 0.89/1.29    , X, 'tc_prod'( Z, Z ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_OImage'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'c_Relation_OImage'( X, 'c_Set_Oinsert'( T, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_in'( 'c_Pair'( Y, T, Z, Z ), X, 
% 0.89/1.29    'tc_prod'( Z, Z ) ) ), ~( 'c_Equiv__Relations_Oequiv'( U, X, Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Oirrefl'( 'c_HOL_Ominus__class_Ominus'( X, 
% 0.89/1.29    'c_Relation_OId'( Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__XrtranclE__1__1'( X, Y, Z, T )
% 0.89/1.29    , Y, T, T ), Z, 'tc_prod'( T, T ) ), =( X, Y ), ~( 'c_in'( 'c_Pair'( X, Y
% 0.89/1.29    , T, T ), 'c_Transitive__Closure_Ortrancl'( Z, T ), 'tc_prod'( T, T ) ) )
% 0.89/1.29     ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__Xrtrancl__induct__1__1'( X, Z, 
% 0.89/1.29    T, U ), U, U ), 'c_Transitive__Closure_Ortrancl'( T, U ), 'tc_prod'( U, U
% 0.89/1.29     ) ), ~( hBOOL( hAPP( X, Z ) ) ), ~( 'c_in'( 'c_Pair'( Z, Y, U, U ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, U ), 'tc_prod'( U, U ) ) ) ],
% 0.89/1.29     [ ~( =( 'c_Set_Oinsert'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ), 
% 0.89/1.29    'c_Set_Oinsert'( T, 'c_Set_Oinsert'( U, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ) ) ), =( Y, T ), =( X, T ) ],
% 0.89/1.29     [ ~( =( 'c_Set_Oinsert'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ), 
% 0.89/1.29    'c_Set_Oinsert'( T, 'c_Set_Oinsert'( U, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ) ) ), =( X, U ), =( Y, U ) ],
% 0.89/1.29     [ ~( =( 'c_Set_Oinsert'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ), 
% 0.89/1.29    'c_Set_Oinsert'( T, 'c_Set_Oinsert'( U, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Z ), Z ) ) ), =( Y, T ), =( Y, U ) ],
% 0.89/1.29     [ =( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ) ), 
% 0.89/1.29    ~( 'c_lessequals'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Y, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool'
% 0.89/1.29     ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ), 
% 0.89/1.29    'tc_fun'( X, 'tc_bool' ) ) ],
% 0.89/1.29     [ ~( =( 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ), 
% 0.89/1.29    'c_Set_Oinsert'( Y, Z, X ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( 'c_Set_Oinsert'( X, Y
% 0.89/1.29    , Z ), T, 'tc_fun'( Z, 'tc_bool' ) ), 'c_Set_Oinsert'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ) ), ~( 'c_in'( X, T, Z ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 'c_Set_Oinsert'( Y
% 0.89/1.29    , Z, T ), 'tc_fun'( T, 'tc_bool' ) ), 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), T ) ), ~( 'c_in'( Y, X, T ) ) ],
% 0.89/1.29     [ =( 'c_Set_Oimage'( X, 'c_Set_Oinsert'( Y, Z, T ), T, U ), 
% 0.89/1.29    'c_Set_Oinsert'( hAPP( X, Y ), 'c_Set_Oimage'( X, Z, T, U ), U ) ) ],
% 0.89/1.29     [ 'c_Relation_Ototal__on'( 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 
% 0.89/1.29    'tc_bool' ) ), Y, X ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    T, U, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_lessequals'( Y, U, 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , T, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Oconverse'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Z, T ), 'tc_bool' ) ), Z, T ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_Oconverse'( X, 
% 0.89/1.29    Z, T ), 'c_Relation_Oconverse'( Y, Z, T ), 'tc_fun'( 'tc_prod'( T, Z ), 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), Y, X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), Z, X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ), ~( 
% 0.89/1.29    'c_lessequals'( Y, T, X ) ), ~( 'c_lessequals'( Y, Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ), ~( 
% 0.89/1.29    'c_lessequals'( Y, T, X ) ), ~( 'c_lessequals'( Y, Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ), ~( 
% 0.89/1.29    'c_lessequals'( Y, T, X ) ), ~( 'c_lessequals'( Y, Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), Z, X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), Y, X ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), X, 'tc_fun'( Z, 'tc_bool' ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Y, 'tc_fun'( Z, 'tc_bool' ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z
% 0.89/1.29    , 'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_lessequals'( X, Z, 'tc_fun'( T, 'tc_bool' ) ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , Y, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z
% 0.89/1.29    , 'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_lessequals'( X, Z, 'tc_fun'( T, 'tc_bool' ) ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , Y, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Product__Type_OSigma'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z ), Z, U ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Product__Type_OSigma'( X
% 0.89/1.29    , 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z ), Z, U ), 
% 0.89/1.29    'c_Product__Type_OSigma'( Y, 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z )
% 0.89/1.29    , Z, U ), 'tc_fun'( 'tc_prod'( Z, U ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Odistrib__lattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), T, X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Odistrib__lattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Z, T, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, X ), X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Y, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Oupper__semilattice__class_Osup'( X, Z, 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'c_Lattices_Oupper__semilattice__class_Osup'( Y, T, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( X, Y ), ~( 
% 0.89/1.29    'c_Order__Relation_Ostrict__linear__order__on'( Z, X, Y ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( 'c_Set_Oinsert'( X, Y, Z ), X ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Set_Oinsert'( X, Y, Z ), T, 'tc_fun'( Z, 'tc_bool'
% 0.89/1.29     ) ), ~( 'c_lessequals'( Y, T, 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_in'( X
% 0.89/1.29    , T, Z ) ) ],
% 0.89/1.29     [ =( 'c_Product__Type_OSigma'( 'c_HOL_Ominus__class_Ominus'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z ), 
% 0.89/1.29    Z, U ), 'c_HOL_Ominus__class_Ominus'( 'c_Product__Type_OSigma'( X, 
% 0.89/1.29    'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z ), Z, U ), 
% 0.89/1.29    'c_Product__Type_OSigma'( Y, 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z )
% 0.89/1.29    , Z, U ), 'tc_fun'( 'tc_prod'( Z, U ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ), X ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, X ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Relation_ORange'( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    X, Y, 'tc_fun'( 'tc_prod'( Z, T ), 'tc_bool' ) ), Z, T ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_ORange'( X, Z, 
% 0.89/1.29    T ), 'c_Relation_ORange'( Y, Z, T ), 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    Y, 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( X, Z ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    Y, 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( Y, Z ) ) ],
% 0.89/1.29     [ =( 'c_Set_Oinsert'( X, 'c_HOL_Ominus__class_Ominus'( Y, 
% 0.89/1.29    'c_Set_Oinsert'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ), 'tc_fun'( Z, 'tc_bool' ) ), Z ), Y ), ~( 'c_in'( X, Y
% 0.89/1.29    , Z ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Olower__semilattice'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Y, X ), Y ) ],
% 0.89/1.29     [ =( 'c_Lattices_Olower__semilattice__class_Oinf'( X, X, 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ), X ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( Y, Z, 
% 0.89/1.29    X ), ~( 'c_lessequals'( 'c_Lattices_Oupper__semilattice__class_Osup'( T, 
% 0.89/1.29    Y, X ), Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( Y, Z, 
% 0.89/1.29    X ), ~( 'c_lessequals'( 'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    T, X ), Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ), ~( 
% 0.89/1.29    'c_lessequals'( Y, T, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( Y, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Z, T, X ), X ), ~( 
% 0.89/1.29    'c_lessequals'( Y, Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( Y, Z, 
% 0.89/1.29    X ), ~( 'c_lessequals'( 'c_Lattices_Oupper__semilattice__class_Osup'( T, 
% 0.89/1.29    Y, X ), Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Lattices_Oupper__semilattice'( X ) ), 'c_lessequals'( Y, Z, 
% 0.89/1.29    X ), ~( 'c_lessequals'( 'c_Lattices_Oupper__semilattice__class_Osup'( Y, 
% 0.89/1.29    T, X ), Z, X ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Y, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( T, X, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Y, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Oacyclic'( X, Y ), ~( 'c_lessequals'( X, Z, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ) ), ~( 'c_Wellfounded_Oacyclic'( Z, Y ) )
% 0.89/1.29     ],
% 0.89/1.29     [ ~( =( 'c_Set_Oimage'( X, Y, Z, T ), 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ) ) ), =( Y, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    T, U, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_lessequals'( Y, U, 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_lessequals'( X
% 0.89/1.29    , T, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, Z, 'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), T, 'tc_fun'( Z, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, T, 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Set_Oinsert'( X, 'c_Orderings_Obot__class_Obot'( 
% 0.89/1.29    'tc_fun'( Y, 'tc_bool' ) ), Y ), Y ) ],
% 0.89/1.29     [ =( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ) ), 
% 0.89/1.29    ~( 'c_lessequals'( X, 'c_HOL_Ouminus__class_Ouminus'( X, 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( Y, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( X, 'c_Set_Oinsert'( Y, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ), Z ) ), =( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ) ) ), ~( 'c_lessequals'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, Y, 'tc_fun'( T, 'tc_bool' ) ), 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( X, Z, 'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( 'c_Lattices_Olower__semilattice__class_Oinf'( X, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), T ) ), ~( hBOOL( hAPP( Y, T ) ) ), ~( hBOOL( 
% 0.89/1.29    hAPP( X, T ) ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Olordered__ab__group__add'( X ) ), =( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, X ), 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( Y, X ), 'c_HOL_Ouminus__class_Ouminus'( Z
% 0.89/1.29    , X ), X ), X ) ) ],
% 0.89/1.29     [ =( 'c_HOL_Ominus__class_Ominus'( X, 'c_HOL_Ominus__class_Ominus'( Y, Z
% 0.89/1.29    , 'tc_fun'( T, 'tc_bool' ) ), 'tc_fun'( T, 'tc_bool' ) ), Z ), ~( 
% 0.89/1.29    'c_lessequals'( X, Y, 'tc_fun'( T, 'tc_bool' ) ) ), ~( 'c_lessequals'( Z
% 0.89/1.29    , X, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_OrderedGroup_Opordered__ab__group__add'( X ) ), ~( =( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, Z, X ), 'c_HOL_Ominus__class_Ominus'( T
% 0.89/1.29    , U, X ) ) ), 'c_lessequals'( U, T, X ), ~( 'c_lessequals'( Z, Y, X ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ ~( 'class_OrderedGroup_Opordered__ab__group__add'( X ) ), ~( =( 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, Z, X ), 'c_HOL_Ominus__class_Ominus'( T
% 0.89/1.29    , U, X ) ) ), 'c_lessequals'( Z, Y, X ), ~( 'c_lessequals'( U, T, X ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_lessequals'( 'c_Set_Oinsert'( X, Y, Z ), 'c_Set_Oinsert'( X, T, Z )
% 0.89/1.29    , 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( Y, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ), 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) ), 'tc_fun'( X, 
% 0.89/1.29    'tc_bool' ) ), 'c_Orderings_Obot__class_Obot'( 'tc_fun'( X, 'tc_bool' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ =( 'c_Set_Oimage'( X, 'c_Lattices_Oupper__semilattice__class_Osup'( Y
% 0.89/1.29    , Z, 'tc_fun'( T, 'tc_bool' ) ), T, U ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Set_Oimage'( X, Y, T, U
% 0.89/1.29     ), 'c_Set_Oimage'( X, Z, T, U ), 'tc_fun'( U, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Relation_Oirrefl'( X, Y ), ~( 
% 0.89/1.29    'c_Order__Relation_Ostrict__linear__order__on'( Z, X, Y ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Oacyclic'( 'c_Set_Oinsert'( 'c_Pair'( X, Y, Z, Z ), T, 
% 0.89/1.29    'tc_prod'( Z, Z ) ), Z ), 'c_in'( 'c_Pair'( Y, X, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ), ~( 
% 0.89/1.29    'c_Wellfounded_Oacyclic'( T, Z ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T
% 0.89/1.29    , Z ), 'tc_prod'( Z, Z ) ) ), ~( 'c_Wellfounded_Oacyclic'( 
% 0.89/1.29    'c_Set_Oinsert'( 'c_Pair'( Y, X, Z, Z ), T, 'tc_prod'( Z, Z ) ), Z ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__Xrtrancl__induct__1__1'( X, Z, 
% 0.89/1.29    T, U ), 'c_ATP__Linkup_Osko__Transitive__Closure__Xrtrancl__induct__1__2'( 
% 0.89/1.29    X, Z, T, U ), U, U ), T, 'tc_prod'( U, U ) ), ~( hBOOL( hAPP( X, Z ) ) )
% 0.89/1.29    , ~( 'c_in'( 'c_Pair'( Z, Y, U, U ), 'c_Transitive__Closure_Ortrancl'( T
% 0.89/1.29    , U ), 'tc_prod'( U, U ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_OImage'( Y, 'c_Set_Oinsert'( X, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    Z ), ~( 'c_in'( X, T, Z ) ), ~( 'c_Equiv__Relations_Oequiv'( T, Y, Z ) )
% 0.89/1.29     ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ), ~( 'c_in'( U, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( 'c_Relation_OImage'( T, 
% 0.89/1.29    'c_Set_Oinsert'( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ), Z ), Z, Z ), 'c_Relation_OImage'( T, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), Z ) ), ~( 'c_Equiv__Relations_Oequiv'( W, T, 
% 0.89/1.29    Z ) ) ],
% 0.89/1.29     [ =( 'c_Set_Oinsert'( hAPP( X, Y ), 'c_Set_Oimage'( X, Z, T, U ), U ), 
% 0.89/1.29    'c_Set_Oimage'( X, Z, T, U ) ), ~( 'c_in'( Y, Z, T ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, T ), U, 'tc_prod'( Z, T ) ), ~( 'c_in'( Y, 
% 0.89/1.29    'c_Relation_OImage'( U, 'c_Set_Oinsert'( X, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, T ), 
% 0.89/1.29    T ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_OImage'( Y, 'c_Set_Oinsert'( Z, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( T, 'tc_bool' ) ), T ), T, U ), 
% 0.89/1.29    U ), ~( 'c_in'( 'c_Pair'( Z, X, T, U ), Y, 'tc_prod'( T, U ) ) ) ],
% 0.89/1.29     [ ~( =( 'c_Product__Type_OSigma'( X, 'c_COMBK'( Y, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ), T ), T, Z ), 'c_Product__Type_OSigma'( U, 'c_COMBK'( Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ), T ), T, Z ) ) ), ~( 'c_in'( W, Y, Z ) ), =( X, 
% 0.89/1.29    U ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( X, Y ), ~( 'c_Wellfounded_Owf'( 'c_Set_Oinsert'( 
% 0.89/1.29    'c_Pair'( Z, T, Y, Y ), X, 'tc_prod'( Y, Y ) ), Y ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_ATP__Linkup_Osko__Relation__XImageE__1__1'( X, Y, Z, T, U )
% 0.89/1.29    , X, T ), ~( 'c_in'( Y, 'c_Relation_OImage'( Z, X, T, U ), U ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    T, T ), 'tc_bool' ) ), T ), 'tc_prod'( T, T ) ), ~( 'c_in'( X, 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Y, T ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( Y, Z, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    T, T ), 'tc_bool' ) ), T ), 'tc_prod'( T, T ) ), ~( 'c_in'( X, 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, T ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ =( 'c_Relation_OImage'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'c_Relation_OImage'( X, 'c_Set_Oinsert'( T, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ) )
% 0.89/1.29    , ~( 'c_in'( 'c_Pair'( Y, T, Z, Z ), X, 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_Equiv__Relations_Oequiv'( U, X, Z ) ) ],
% 0.89/1.29     [ =( 'c_Relation_OImage'( X, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'c_Relation_OImage'( X, 'c_Set_Oinsert'( T, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ) )
% 0.89/1.29    , ~( 'c_in'( 'c_Pair'( Y, T, Z, Z ), X, 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_Equiv__Relations_Oequiv'( U, X, Z ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), 'c_in'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__induct__rule__1__1'( X, Z, T ), 
% 0.89/1.29    'c_Wellfounded_Oacc'( Z, T ), T ), ~( 'c_in'( Y, 'c_Wellfounded_Oacc'( Z
% 0.89/1.29    , T ), T ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_ATP__Linkup_Osko__Wellfounded__Xnot__acc__down__1__1'( X
% 0.89/1.29    , Y, Z ), 'c_Wellfounded_Oacc'( X, Z ), Z ) ), 'c_in'( Y, 
% 0.89/1.29    'c_Wellfounded_Oacc'( X, Z ), Z ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__induct__rule__1__1'( X, Z, T ) )
% 0.89/1.29     ) ), ~( 'c_in'( Y, 'c_Wellfounded_Oacc'( Z, T ), T ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_Orel__comp'( X
% 0.89/1.29    , X, Y, Y, Y ), 'c_Relation_Orel__comp'( Z, X, Y, Y, Y ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ), Z, 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ), Y ), ~( 'c_Wellfounded_Owf'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, Z, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Y, Y ), 'tc_bool' ) ), Y ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    Y, 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_Orel__comp'( X
% 0.89/1.29    , X, Z, Z, Z ), 'c_Relation_Orel__comp'( Y, X, Z, Z, Z ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Z, Z ), 'tc_bool' ) ), Y, 'tc_fun'( 'tc_prod'( Z, Z ), 
% 0.89/1.29    'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Otrancl'( X, Y ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, 'c_Relation_Orel__comp'( 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( X, Y ), X, Y, Y, Y ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ), 'c_Relation_OId'( Y ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ), 'c_Transitive__Closure_Ortrancl'( X, Y
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, 'c_Relation_OId'( Y ), 
% 0.89/1.29    'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( 'c_HOL_Ominus__class_Ominus'( X, 
% 0.89/1.29    'c_Relation_OId'( Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Oantisym'( 'c_Transitive__Closure_Ortrancl'( X, Y ), Y ), 
% 0.89/1.29    ~( 'c_Wellfounded_Oacyclic'( X, Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_Relation_Oconverse'( X, Y, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool'
% 0.89/1.29     ) ), Y ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Lattices_Olower__semilattice__class_Oinf'( X, 
% 0.89/1.29    'c_Relation_Oconverse'( X, Y, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool'
% 0.89/1.29     ) ), Y ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    'c_Relation_OId'( Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y ), 
% 0.89/1.29    ~( 'c_Relation_Otrans'( X, Y ) ) ],
% 0.89/1.29     [ =( 'c_Relation_OImage'( 'c_Relation_OId__on'( X, Y ), Z, Y, Y ), 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( X, Z, 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Relation_Oantisym'( X, Y ), ~( 'c_Relation_Oantisym'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, 'c_Relation_OId'( Y ), 
% 0.89/1.29    'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Oantisym'( 'c_Lattices_Oupper__semilattice__class_Osup'( X
% 0.89/1.29    , 'c_Relation_OId'( Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y )
% 0.89/1.29    , ~( 'c_Relation_Oantisym'( X, Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Ototal__on'( X, Y, Z ), ~( 'c_Relation_Ototal__on'( X, 
% 0.89/1.29    'c_HOL_Ominus__class_Ominus'( Y, 'c_Relation_OId'( Z ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Ototal__on'( X, 'c_HOL_Ominus__class_Ominus'( Y, 
% 0.89/1.29    'c_Relation_OId'( Z ), 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ), 
% 0.89/1.29    ~( 'c_Relation_Ototal__on'( X, Y, Z ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__Xrtrancl__induct__1__2'( X, Z, 
% 0.89/1.29    T, U ) ) ) ), ~( hBOOL( hAPP( X, Z ) ) ), ~( 'c_in'( 'c_Pair'( Z, Y, U, U
% 0.89/1.29     ), 'c_Transitive__Closure_Ortrancl'( T, U ), 'tc_prod'( U, U ) ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 'v_sko__Transitive__Closure__Xrtrancl__Xcases__1'( 
% 0.89/1.29    X, Y, Z ), 't_a', 't_a' ), 'c_Transitive__Closure_Ortrancl'( Z, 't_a' ), 
% 0.89/1.29    'tc_prod'( 't_a', 't_a' ) ), =( Y, X ), ~( 'c_in'( 'c_Pair'( X, Y, 't_a'
% 0.89/1.29    , 't_a' ), 'c_Transitive__Closure_Ortrancl'( Z, 't_a' ), 'tc_prod'( 't_a'
% 0.89/1.29    , 't_a' ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__Xrtrancl__induct__1__1'( X, Z, 
% 0.89/1.29    T, U ) ) ), ~( hBOOL( hAPP( X, Z ) ) ), ~( 'c_in'( 'c_Pair'( Z, Y, U, U )
% 0.89/1.29    , 'c_Transitive__Closure_Ortrancl'( T, U ), 'tc_prod'( U, U ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'v_sko__Transitive__Closure__Xrtrancl__Xcases__1'( X
% 0.89/1.29    , Y, Z ), Y, 't_a', 't_a' ), Z, 'tc_prod'( 't_a', 't_a' ) ), =( Y, X ), 
% 0.89/1.29    ~( 'c_in'( 'c_Pair'( X, Y, 't_a', 't_a' ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, 't_a' ), 'tc_prod'( 't_a', 't_a' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__Xconverse__rtrancl__induct__1__1'( 
% 0.89/1.29    X, Z, T, U ) ) ) ), ~( hBOOL( hAPP( X, Z ) ) ), ~( 'c_in'( 'c_Pair'( Y, Z
% 0.89/1.29    , U, U ), 'c_Transitive__Closure_Ortrancl'( T, U ), 'tc_prod'( U, U ) ) )
% 0.89/1.29     ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__XrtranclE__1__1'( X, Y, Z, T )
% 0.89/1.29    , T, T ), 'c_Transitive__Closure_Ortrancl'( Z, T ), 'tc_prod'( T, T ) ), 
% 0.89/1.29    =( X, Y ), ~( 'c_in'( 'c_Pair'( X, Y, T, T ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, T ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xwf__induct__rule__1__1'( X, T, U ), U
% 0.89/1.29    , U ), T, 'tc_prod'( U, U ) ) ), ~( 'c_Wellfounded_Owf'( T, U ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xwf__def__1__1'( X, T, U ), U, U ), T, 
% 0.89/1.29    'tc_prod'( U, U ) ) ), ~( 'c_Wellfounded_Owf'( T, U ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'c_List_Osko__Recdef__Xtfl__wf__induct__1__1'( X, T, U ), U, U ), T, 
% 0.89/1.29    'tc_prod'( U, U ) ) ), ~( 'c_Wellfounded_Owf'( T, U ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xwf__induct__1__1'( X, T, U ), U, U ), 
% 0.89/1.29    T, 'tc_prod'( U, U ) ) ), ~( 'c_Wellfounded_Owf'( T, U ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, X, Y, Y ), Z, 'tc_prod'( Y, Y ) ) ), 'c_in'( 
% 0.89/1.29    'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__Xirrefl__trancl__rD__1__1'( Z, 
% 0.89/1.29    Y ), 'c_ATP__Linkup_Osko__Transitive__Closure__Xirrefl__trancl__rD__1__1'( 
% 0.89/1.29    Z, Y ), Y, Y ), 'c_Transitive__Closure_Otrancl'( Z, Y ), 'tc_prod'( Y, Y
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__Xconverse__tranclE__1__1'( X, Y
% 0.89/1.29    , Z, T ), Z, T, T ), 'c_Transitive__Closure_Otrancl'( X, T ), 'tc_prod'( 
% 0.89/1.29    T, T ) ), 'c_in'( 'c_Pair'( Y, Z, T, T ), X, 'tc_prod'( T, T ) ), ~( 
% 0.89/1.29    'c_in'( 'c_Pair'( Y, Z, T, T ), 'c_Transitive__Closure_Otrancl'( X, T ), 
% 0.89/1.29    'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 'v_sko__Transitive__Closure__Xtrancl__Xcases__1'( 
% 0.89/1.29    X, Y, Z ), 't_a', 't_a' ), 'c_Transitive__Closure_Otrancl'( Z, 't_a' ), 
% 0.89/1.29    'tc_prod'( 't_a', 't_a' ) ), 'c_in'( 'c_Pair'( X, Y, 't_a', 't_a' ), Z, 
% 0.89/1.29    'tc_prod'( 't_a', 't_a' ) ), ~( 'c_in'( 'c_Pair'( X, Y, 't_a', 't_a' ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( Z, 't_a' ), 'tc_prod'( 't_a', 't_a' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, X, Y, Y ), 'c_Transitive__Closure_Otrancl'( Z
% 0.89/1.29    , Y ), 'tc_prod'( Y, Y ) ) ), ~( 'c_Wellfounded_Oacyclic'( Z, Y ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__XtranclE__1__1'( X, Y, Z, T ), 
% 0.89/1.29    Y, T, T ), Z, 'tc_prod'( T, T ) ), 'c_in'( 'c_Pair'( X, Y, T, T ), Z, 
% 0.89/1.29    'tc_prod'( T, T ) ), ~( 'c_in'( 'c_Pair'( X, Y, T, T ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( Z, T ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__XtranclE__1__1'( X, Y, Z, T ), 
% 0.89/1.29    T, T ), 'c_Transitive__Closure_Otrancl'( Z, T ), 'tc_prod'( T, T ) ), 
% 0.89/1.29    'c_in'( 'c_Pair'( X, Y, T, T ), Z, 'tc_prod'( T, T ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( X, Y, T, T ), 'c_Transitive__Closure_Otrancl'( Z, T ), 
% 0.89/1.29    'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__Xconverse__tranclE__1__1'( Y, X
% 0.89/1.29    , Z, T ), T, T ), Y, 'tc_prod'( T, T ) ), 'c_in'( 'c_Pair'( X, Z, T, T )
% 0.89/1.29    , Y, 'tc_prod'( T, T ) ), ~( 'c_in'( 'c_Pair'( X, Z, T, T ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( Y, T ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'v_sko__Transitive__Closure__Xtrancl__Xcases__1'( X
% 0.89/1.29    , Y, Z ), Y, 't_a', 't_a' ), Z, 'tc_prod'( 't_a', 't_a' ) ), 'c_in'( 
% 0.89/1.29    'c_Pair'( X, Y, 't_a', 't_a' ), Z, 'tc_prod'( 't_a', 't_a' ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( X, Y, 't_a', 't_a' ), 'c_Transitive__Closure_Otrancl'( Z, 't_a'
% 0.89/1.29     ), 'tc_prod'( 't_a', 't_a' ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ), ~( 'c_in'( Y, 
% 0.89/1.29    U, Z ) ), ~( 'c_lessequals'( 'c_Relation_OImage'( T, 'c_Set_Oinsert'( Y, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'c_Relation_OImage'( T, 'c_Set_Oinsert'( X, 
% 0.89/1.29    'c_Orderings_Obot__class_Obot'( 'tc_fun'( Z, 'tc_bool' ) ), Z ), Z, Z ), 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_Equiv__Relations_Oequiv'( U, T, Z ) )
% 0.89/1.29     ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Relation__Xrel__compEpair__1__1'( X, Y, Z, T, U, W, 
% 0.89/1.29    V0 ), Y, V0, W ), T, 'tc_prod'( V0, W ) ), ~( 'c_in'( 'c_Pair'( X, Y, U, 
% 0.89/1.29    W ), 'c_Relation_Orel__comp'( Z, T, U, V0, W ), 'tc_prod'( U, W ) ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Relation__Xrel__compEpair__1__1'( X, Y, Z, T, U, W, 
% 0.89/1.29    V0 ), U, V0 ), Z, 'tc_prod'( U, V0 ) ), ~( 'c_in'( 'c_Pair'( X, Y, U, W )
% 0.89/1.29    , 'c_Relation_Orel__comp'( Z, T, U, V0, W ), 'tc_prod'( U, W ) ) ) ],
% 0.89/1.29     [ =( X, 'c_Pair'( 'c_ATP__Linkup_Osko__Relation__XIdE__1__1'( X, Y ), 
% 0.89/1.29    'c_ATP__Linkup_Osko__Relation__XIdE__1__1'( X, Y ), Y, Y ) ), ~( 'c_in'( 
% 0.89/1.29    X, 'c_Relation_OId'( Y ), 'tc_prod'( Y, Y ) ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( X, Y ), 'c_lessequals'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__XwfI__pf__1__1'( X, Y ), 
% 0.89/1.29    'c_Relation_OImage'( X, 'c_ATP__Linkup_Osko__Wellfounded__XwfI__pf__1__1'( 
% 0.89/1.29    X, Y ), Y, Y ), 'tc_fun'( Y, 'tc_bool' ) ) ],
% 0.89/1.29     [ =( X, 'c_Orderings_Obot__class_Obot'( 'tc_fun'( Y, 'tc_bool' ) ) ), 
% 0.89/1.29    ~( 'c_lessequals'( X, 'c_Relation_OImage'( Z, X, Y, Y ), 'tc_fun'( Y, 
% 0.89/1.29    'tc_bool' ) ) ), ~( 'c_Wellfounded_Owf'( Z, Y ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( X, Y ), ~( 'c_in'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xwf__acc__iff__1__1'( X, Y ), 
% 0.89/1.29    'c_Wellfounded_Oacc'( X, Y ), Y ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( X, Y ), ~( 'c_in'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__wfI__1__1'( X, Y ), 
% 0.89/1.29    'c_Wellfounded_Oacc'( X, Y ), Y ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Product__Type_OSigma'( X, Y, Z, T ), 
% 0.89/1.29    'c_Product__Type_OSigma'( U, W, Z, T ), 'tc_fun'( 'tc_prod'( Z, T ), 
% 0.89/1.29    'tc_bool' ) ), ~( 'c_lessequals'( hAPP( Y, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Product__Type__XSigma__mono__1__1'( X, Y, W, Z, T )
% 0.89/1.29     ), hAPP( W, 'c_ATP__Linkup_Osko__Product__Type__XSigma__mono__1__1'( X, 
% 0.89/1.29    Y, W, Z, T ) ), 'tc_fun'( T, 'tc_bool' ) ) ), ~( 'c_lessequals'( X, U, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_OImage'( X, Y, Z, T ), U, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), ~( 'c_lessequals'( Y, 'c_HOL_Ouminus__class_Ouminus'( 
% 0.89/1.29    'c_Relation_OImage'( 'c_Relation_Oconverse'( X, Z, T ), 
% 0.89/1.29    'c_HOL_Ouminus__class_Ouminus'( U, 'tc_fun'( T, 'tc_bool' ) ), T, Z ), 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_HOL_Ouminus__class_Ouminus'( 'c_Relation_OImage'( 
% 0.89/1.29    'c_Relation_Oconverse'( Y, Z, T ), 'c_HOL_Ouminus__class_Ouminus'( U, 
% 0.89/1.29    'tc_fun'( T, 'tc_bool' ) ), T, Z ), 'tc_fun'( Z, 'tc_bool' ) ), 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ) ), ~( 'c_lessequals'( 'c_Relation_OImage'( Y, X, Z, T ), U
% 0.89/1.29    , 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_ATP__Linkup_Osko__Relation__XId__onE__1__1'( X, Y, Z ), X, 
% 0.89/1.29    Z ), ~( 'c_in'( Y, 'c_Relation_OId__on'( X, Z ), 'tc_prod'( Z, Z ) ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( X, 'c_Pair'( 'c_ATP__Linkup_Osko__Relation__XId__onE__1__1'( Y, X, 
% 0.89/1.29    Z ), 'c_ATP__Linkup_Osko__Relation__XId__onE__1__1'( Y, X, Z ), Z, Z ) )
% 0.89/1.29    , ~( 'c_in'( X, 'c_Relation_OId__on'( Y, Z ), 'tc_prod'( Z, Z ) ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( 'c_Recdef_Ocut'( X, Y, Z, T, U ), 'c_Recdef_Ocut'( W, Y, Z, T, U )
% 0.89/1.29     ), 'c_in'( 'c_Pair'( 'c_List_Osko__Recdef__Xcuts__eq__1__1'( X, W, Y, Z
% 0.89/1.29    , T, U ), Z, T, T ), Y, 'tc_prod'( T, T ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Transitive__Closure_Otrancl'( X, Y ), 
% 0.89/1.29    'c_Product__Type_OSigma'( Z, 'c_COMBK'( Z, 'tc_fun'( Y, 'tc_bool' ), Y )
% 0.89/1.29    , Y, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    X, 'c_Product__Type_OSigma'( Z, 'c_COMBK'( Z, 'tc_fun'( Y, 'tc_bool' ), Y
% 0.89/1.29     ), Y, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Lattices_Oupper__semilattice__class_Osup'( X, 
% 0.89/1.29    Y, 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), Z ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_Relation_Orel__comp'( X, Y, Z, Z, Z ), X, 'tc_fun'( 'tc_prod'( Z, Z )
% 0.89/1.29    , 'tc_bool' ) ) ), ~( 'c_Wellfounded_Owf'( Y, Z ) ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( X, Z ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Transitive__Closure_Otrancl'( X, Y ), Z, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_Relation_Orel__comp'( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( X, Y ), Z, 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ), X, Y, Y, Y ), Z, 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' )
% 0.89/1.29     ) ), ~( 'c_lessequals'( X, Z, 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Product__Type_OSigma'( Y, 'c_COMBK'( Y, 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ), Z ), Z, Z ), 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), 
% 0.89/1.29    ~( 'c_Equiv__Relations_Oequiv'( Y, X, Z ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_Orel__comp'( X, Y, Z, T, U ), 
% 0.89/1.29    'c_Product__Type_OSigma'( W, 'c_COMBK'( V0, 'tc_fun'( U, 'tc_bool' ), Z )
% 0.89/1.29    , Z, U ), 'tc_fun'( 'tc_prod'( Z, U ), 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    Y, 'c_Product__Type_OSigma'( V1, 'c_COMBK'( V0, 'tc_fun'( U, 'tc_bool' )
% 0.89/1.29    , T ), T, U ), 'tc_fun'( 'tc_prod'( T, U ), 'tc_bool' ) ) ), ~( 
% 0.89/1.29    'c_lessequals'( X, 'c_Product__Type_OSigma'( W, 'c_COMBK'( V1, 'tc_fun'( 
% 0.89/1.29    T, 'tc_bool' ), Z ), Z, T ), 'tc_fun'( 'tc_prod'( Z, T ), 'tc_bool' ) ) )
% 0.89/1.29     ],
% 0.89/1.29     [ =( 'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( X, Y ), 'c_Relation_OId'( Y ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ), 'c_Transitive__Closure_Ortrancl'( X, Y
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Otrancl'( 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( X, 'c_Relation_OId'( Y ), 
% 0.89/1.29    'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( X, Y ), 'c_Relation_OId'( Y ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Product__Type_OSigma'( Y, 'c_COMBK'( Y, 'tc_fun'( 
% 0.89/1.29    Z, 'tc_bool' ), Z ), Z, Z ), 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ), 
% 0.89/1.29    ~( 'c_Relation_Orefl__on'( Y, X, Z ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    'c_Lattices_Oupper__semilattice__class_Osup'( 'c_Relation_OId'( Y ), 
% 0.89/1.29    'c_Relation_Orel__comp'( 'c_Transitive__Closure_Ortrancl'( X, Y ), X, Y, 
% 0.89/1.29    Y, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Relation_ORange'( 'v_r', 't_a', 't_b' ), 'c_Relation_ODomain'( 
% 0.89/1.29    'c_Relation_Oconverse'( 'v_r', 't_a', 't_b' ), 't_b', 't_a' ) ) ],
% 0.89/1.29     [ 'c_Relation_Oirrefl'( X, Y ), 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Relation__Xirrefl__def__1__1'( X, Y ), 
% 0.89/1.29    'c_ATP__Linkup_Osko__Relation__Xirrefl__def__1__1'( X, Y ), Y, Y ), X, 
% 0.89/1.29    'tc_prod'( Y, Y ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_OId__on'( X, Y ), 'c_Product__Type_OSigma'( 
% 0.89/1.29    X, 'c_COMBK'( X, 'tc_fun'( Y, 'tc_bool' ), Y ), Y, Y ), 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ) ],
% 0.89/1.29     [ =( 'c_Relation_OImage'( X, 
% 0.89/1.29    'c_Lattices_Olower__semilattice__class_Oinf'( Y, Z, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), T, U ), 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Relation_OImage'( X, Y, T, U ), 'c_Relation_OImage'( X, Z, T, U ), 
% 0.89/1.29    'tc_fun'( U, 'tc_bool' ) ) ), ~( 'c_Relation_Osingle__valued'( 
% 0.89/1.29    'c_Relation_Oconverse'( X, T, U ), U, T ) ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_HOL_Ominus__class_Ominus'( X, 'c_Relation_OId'( 
% 0.89/1.29    Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), Y ), ~( 
% 0.89/1.29    'c_Relation_Oantisym'( X, Y ) ), ~( 'c_Relation_Otrans'( X, Y ) ) ],
% 0.89/1.29     [ 'c_Nitpick_Orefl_H'( X, Y ), ~( 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_Nitpick_Osko__Nitpick__Xrefl_H__def__1__1'( X, Y ), 
% 0.89/1.29    'c_Nitpick_Osko__Nitpick__Xrefl_H__def__1__1'( X, Y ), Y, Y ), X, 
% 0.89/1.29    'tc_prod'( Y, Y ) ) ) ],
% 0.89/1.29     [ 'c_Order__Relation_Ostrict__linear__order__on'( X, Y, Z ), ~( 
% 0.89/1.29    'c_Relation_Ototal__on'( X, Y, Z ) ), ~( 'c_Relation_Oirrefl'( Y, Z ) ), 
% 0.89/1.29    ~( 'c_Relation_Otrans'( Y, Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'c_ATP__Linkup_Osko__Relation__XImageE__1__1'( X, Y
% 0.89/1.29    , Z, T, U ), Y, T, U ), Z, 'tc_prod'( T, U ) ), ~( 'c_in'( Y, 
% 0.89/1.29    'c_Relation_OImage'( Z, X, T, U ), U ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'v_a____', 'v_b____', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    'v_P____'( X ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ), ~( 'c_in'( 'c_Pair'( 'v_a_H____', 
% 0.89/1.29    'v_b_H____', 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'v_P_H____'( X ), 'tc_prod'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'v_a_H____', 'v_b_H____', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    'v_P_H____'( X ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ), ~( 'c_in'( 'c_Pair'( 'v_a____', 
% 0.89/1.29    'v_b____', 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'v_P____'( X ), 'tc_prod'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ) )
% 0.89/1.29     ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xnot__acc__down__1__1'( X, Y, Z ), Y, Z
% 0.89/1.29    , Z ), X, 'tc_prod'( Z, Z ) ), 'c_in'( Y, 'c_Wellfounded_Oacc'( X, Z ), Z
% 0.89/1.29     ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__induct__rule__1__1'( X, T, U ), U
% 0.89/1.29    , U ), T, 'tc_prod'( U, U ) ) ), ~( 'c_in'( Y, 'c_Wellfounded_Oacc'( T, U
% 0.89/1.29     ), U ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T
% 0.89/1.29    , Z ), 'tc_prod'( Z, Z ) ) ), ~( 'c_Wellfounded_Owf'( 'c_Set_Oinsert'( 
% 0.89/1.29    'c_Pair'( Y, X, Z, Z ), T, 'tc_prod'( Z, Z ) ), Z ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Set_Oinsert'( 'c_Pair'( X, Y, Z, Z ), T, 
% 0.89/1.29    'tc_prod'( Z, Z ) ), Z ), 'c_in'( 'c_Pair'( Y, X, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( T, Z ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Product__Type_OSigma'( X, 'c_COMBK'( Y, 'tc_fun'( Z
% 0.89/1.29    , 'tc_bool' ), T ), T, Z ), 'c_Product__Type_OSigma'( U, 'c_COMBK'( Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ), T ), T, Z ), 'tc_fun'( 'tc_prod'( T, Z ), 
% 0.89/1.29    'tc_bool' ) ), ~( 'c_lessequals'( X, U, 'tc_fun'( T, 'tc_bool' ) ) ), ~( 
% 0.89/1.29    'c_in'( W, Y, Z ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_Product__Type_OSigma'( X, 'c_COMBK'( T, 'tc_fun'( U, 'tc_bool' ), Z )
% 0.89/1.29    , Z, U ), 'c_Product__Type_OSigma'( Y, 'c_COMBK'( T, 'tc_fun'( U, 
% 0.89/1.29    'tc_bool' ), Z ), Z, U ), 'tc_fun'( 'tc_prod'( Z, U ), 'tc_bool' ) ) ), 
% 0.89/1.29    ~( 'c_in'( W, T, U ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Product__Type_OSigma'( X, Y, Z, T ), 
% 0.89/1.29    'c_Product__Type_OSigma'( U, W, Z, T ), 'tc_fun'( 'tc_prod'( Z, T ), 
% 0.89/1.29    'tc_bool' ) ), 'c_in'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Product__Type__XSigma__mono__1__1'( X, Y, W, Z, T )
% 0.89/1.29    , X, Z ), ~( 'c_lessequals'( X, U, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_OImage'( X, Y, Z, T ), U, 'tc_fun'( T, 
% 0.89/1.29    'tc_bool' ) ), ~( 'c_lessequals'( X, 'c_Product__Type_OSigma'( W, 
% 0.89/1.29    'c_COMBK'( U, 'tc_fun'( T, 'tc_bool' ), Z ), Z, T ), 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Z, T ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Transitive__Closure_Ortrancl'( X, Y ), Z, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ), ~( 'c_lessequals'( 
% 0.89/1.29    'c_Relation_Orel__comp'( 'c_Lattices_Olower__semilattice__class_Oinf'( 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ), Z, 'tc_fun'( 'tc_prod'( Y, Y )
% 0.89/1.29    , 'tc_bool' ) ), X, Y, Y, Y ), Z, 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool'
% 0.89/1.29     ) ) ), ~( 'c_lessequals'( 'c_Relation_OId'( Y ), Z, 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    Y, Y ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), =( X, T ), ~( 'c_lessequals'( U, 
% 0.89/1.29    'c_Product__Type_OSigma'( Y, 'c_COMBK'( Y, 'tc_fun'( Z, 'tc_bool' ), Z )
% 0.89/1.29    , Z, Z ), 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( X, T, Z, Z ), 'c_Transitive__Closure_Ortrancl'( U, Z ), 
% 0.89/1.29    'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, 'c_Relation_Orel__comp'( 'c_Relation_Oconverse'( X
% 0.89/1.29    , Y, Y ), X, Y, Y, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_Relation_Orefl__on'( Z, X, Y ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__XtranclD__1__1'( Y, X, Z, T ), 
% 0.89/1.29    T, T ), Y, 'tc_prod'( T, T ) ), ~( 'c_in'( 'c_Pair'( X, Z, T, T ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( Y, T ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__XtranclD2__1__1'( X, Y, Z, T )
% 0.89/1.29    , Z, T, T ), X, 'tc_prod'( T, T ) ), ~( 'c_in'( 'c_Pair'( Y, Z, T, T ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( X, T ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_Orel__comp'( X, X, Y, Y, Y ), X, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ), ~( 'c_Relation_Otrans'( X, Y ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Transitive__Closure_Otrancl'( Y, Z ), 'tc_prod'( Z, Z )
% 0.89/1.29     ), ~( 'c_lessequals'( T, Y, 'tc_fun'( 'tc_prod'( Z, Z ), 'tc_bool' ) ) )
% 0.89/1.29    , ~( 'c_in'( X, 'c_Transitive__Closure_Otrancl'( T, Z ), 'tc_prod'( Z, Z
% 0.89/1.29     ) ) ) ],
% 0.89/1.29     [ 'c_in'( hAPP( X, Y ), Z, T ), ~( 'c_in'( Y, U, W ) ), ~( 
% 0.89/1.29    'c_lessequals'( 'c_Set_Oimage'( X, U, W, T ), Z, 'tc_fun'( T, 'tc_bool' )
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ ~( 'class_Orderings_Olinorder'( X ) ), 'c_lessequals'( Y, Z, X ), 
% 0.89/1.29    'c_lessequals'( Z, Y, X ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_OImage'( X, Y, Z, T ), 'c_Relation_OImage'( 
% 0.89/1.29    U, W, Z, T ), 'tc_fun'( T, 'tc_bool' ) ), ~( 'c_lessequals'( Y, W, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_lessequals'( X, U, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Z, T ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ) ), 'c_lessequals'( 
% 0.89/1.29    'c_Set_Oimage'( T, X, Z, U ), 'c_Set_Oimage'( T, Y, Z, U ), 'tc_fun'( U, 
% 0.89/1.29    'tc_bool' ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Set_Oimage'( X, Y, Z, T ), 'c_Set_Oimage'( X, U, Z
% 0.89/1.29    , T ), 'tc_fun'( T, 'tc_bool' ) ), ~( 'c_lessequals'( Y, U, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_ODomain'( X, Y, Z ), 'c_Relation_ODomain'( 
% 0.89/1.29    T, Y, Z ), 'tc_fun'( Y, 'tc_bool' ) ), ~( 'c_lessequals'( X, T, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Z ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Relation_Osingle__valued'( X, Y, Z ), ~( 
% 0.89/1.29    'c_Relation_Osingle__valued'( T, Y, Z ) ), ~( 'c_lessequals'( X, T, 
% 0.89/1.29    'tc_fun'( 'tc_prod'( Y, Z ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( 'c_lessequals'( Z, X, 'tc_fun'( T, 'tc_bool'
% 0.89/1.29     ) ) ), ~( hBOOL( hAPP( Z, Y ) ) ) ],
% 0.89/1.29     [ 'c_Relation_Oantisym'( X, Y ), ~( 'c_Relation_Oantisym'( Z, Y ) ), ~( 
% 0.89/1.29    'c_lessequals'( X, Z, 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Orderings_Opreorder'( X ) ), 'c_lessequals'( Y, Y, X ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ ~( 'class_Orderings_Oorder'( X ) ), 'c_lessequals'( Y, Y, X ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( X, Y ), ~( 'c_lessequals'( X, Z, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ) ), ~( 'c_Wellfounded_Owf'( Z, Y ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( Z, Y ) ) ), ~( 'c_lessequals'( 
% 0.89/1.29    Z, X, 'tc_fun'( T, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ), ~( 'c_lessequals'( T
% 0.89/1.29    , Y, 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 'c_lessequals'( X, T, 'tc_fun'( Z, 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, X, 'tc_fun'( Y, 'tc_bool' ) ) ],
% 0.89/1.29     [ 'c_lessequals'( X, X, 'tc_fun'( Y, 'tc_bool' ) ) ],
% 0.89/1.29     [ ~( 'class_Orderings_Opreorder'( X ) ), 'c_lessequals'( Y, Z, X ), ~( 
% 0.89/1.29    'c_lessequals'( T, Z, X ) ), ~( 'c_lessequals'( Y, T, X ) ) ],
% 0.89/1.29     [ ~( 'class_Orderings_Oorder'( X ) ), 'c_lessequals'( Y, Z, X ), ~( 
% 0.89/1.29    'c_lessequals'( Y, T, X ) ), ~( 'c_lessequals'( T, Z, X ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ), ~( 'c_lessequals'( X, 'c_Transitive__Closure_Ortrancl'( Z
% 0.89/1.29    , Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_Orderings_Oorder'( X ) ), =( Y, Z ), ~( 'c_lessequals'( Y, Z
% 0.89/1.29    , X ) ), ~( 'c_lessequals'( Z, Y, X ) ) ],
% 0.89/1.29     [ ~( 'class_Orderings_Oorder'( X ) ), =( Y, Z ), ~( 'c_lessequals'( Z, Y
% 0.89/1.29    , X ) ), ~( 'c_lessequals'( Y, Z, X ) ) ],
% 0.89/1.29     [ ~( 'class_Orderings_Oorder'( X ) ), =( Y, Z ), ~( 'c_lessequals'( Z, Y
% 0.89/1.29    , X ) ), ~( 'c_lessequals'( Y, Z, X ) ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_lessequals'( Y, X, 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 
% 0.89/1.29    'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_lessequals'( Y, X, 'tc_fun'( Z, 'tc_bool' ) ) ), ~( 
% 0.89/1.29    'c_lessequals'( X, Y, 'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ), ~( 'c_lessequals'( X, Z, 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_Orel__comp'( X, Y, Z, T, U ), 
% 0.89/1.29    'c_Relation_Orel__comp'( W, V0, Z, T, U ), 'tc_fun'( 'tc_prod'( Z, U ), 
% 0.89/1.29    'tc_bool' ) ), ~( 'c_lessequals'( Y, V0, 'tc_fun'( 'tc_prod'( T, U ), 
% 0.89/1.29    'tc_bool' ) ) ), ~( 'c_lessequals'( X, W, 'tc_fun'( 'tc_prod'( Z, T ), 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, Y ) ), ~( 'c_lessequals'( X, 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Z, Y ), 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ) ), ~( 'c_lessequals'( Z, X, 'tc_fun'( 'tc_prod'( Y, Y ), 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Wellfounded_Oacc'( X, Y ), 'c_Wellfounded_Oacc'( Z
% 0.89/1.29    , Y ), 'tc_fun'( Y, 'tc_bool' ) ), ~( 'c_lessequals'( Z, X, 'tc_fun'( 
% 0.89/1.29    'tc_prod'( Y, Y ), 'tc_bool' ) ) ) ],
% 0.89/1.29     [ ~( 'class_HOL_Oord'( X ) ), 'c_lessequals'( hAPP( Y, Z ), hAPP( T, Z )
% 0.89/1.29    , X ), ~( 'c_lessequals'( Y, T, 'tc_fun'( U, X ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( X, T, Z ) ), ~( 'c_lessequals'( T, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_lessequals'( T, Y, 'tc_fun'( Z, 'tc_bool' ) )
% 0.89/1.29     ), ~( 'c_in'( X, T, Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( X, T, Z ) ), ~( 'c_lessequals'( T, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( X, T, Z ) ), ~( 'c_lessequals'( T, Y, 
% 0.89/1.29    'tc_fun'( Z, 'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__XtranclD__1__1'( X, Y, Z, T ), 
% 0.89/1.29    Z, T, T ), 'c_Transitive__Closure_Ortrancl'( X, T ), 'tc_prod'( T, T ) )
% 0.89/1.29    , ~( 'c_in'( 'c_Pair'( Y, Z, T, T ), 'c_Transitive__Closure_Otrancl'( X, 
% 0.89/1.29    T ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Transitive__Closure__XtranclD2__1__1'( Y, X, Z, T )
% 0.89/1.29    , T, T ), 'c_Transitive__Closure_Ortrancl'( Y, T ), 'tc_prod'( T, T ) ), 
% 0.89/1.29    ~( 'c_in'( 'c_Pair'( X, Z, T, T ), 'c_Transitive__Closure_Otrancl'( Y, T
% 0.89/1.29     ), 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_lessequals'( 'c_Relation_Orel__comp'( 'c_Relation_Oconverse'( X, Y
% 0.89/1.29    , Y ), X, Y, Y, Y ), X, 'tc_fun'( 'tc_prod'( Y, Y ), 'tc_bool' ) ), ~( 
% 0.89/1.29    'c_Relation_Otrans'( X, Y ) ), ~( 'c_Relation_Osym'( X, Y ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'v_sko__Wellfounded__Xacc__Xinduct__1'( X, T ), 't_a', 't_a' ), T, 
% 0.89/1.29    'tc_prod'( 't_a', 't_a' ) ) ), ~( 'c_in'( Y, 'c_Wellfounded_Oacc'( T, 
% 0.89/1.29    't_a' ), 't_a' ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Transitive__Closure_Ortrancl'( Y, Z ), 'tc_prod'( Z, Z )
% 0.89/1.29     ), ~( 'c_in'( X, Y, 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Transitive__Closure_Otrancl'( Y, Z ), 'tc_prod'( Z, Z )
% 0.89/1.29     ), ~( 'c_in'( X, Y, 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_in'( 'c_Pair'( X, U, Z, Z ), T, 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), T, 'tc_prod'( 
% 0.89/1.29    Z, Z ) ) ), ~( 'c_in'( 'c_Pair'( X, U, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), =( X, Y )
% 0.89/1.29     ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), =( X, Y ), ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), =( X, Y ), ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    'c_Relation_Oconverse'( T, Z, Z ), Z ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( Y, X, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z ), 
% 0.89/1.29    'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( Y, X, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( 'c_Relation_Oconverse'( T, Z, Z ), Z )
% 0.89/1.29    , 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), 'c_in'( 'c_Pair'( Y, X, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( U, X, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z ), 
% 0.89/1.29    'tc_prod'( Z, Z ) ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_Relation_Osingle__valued'( T, Z, Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_in'( 'c_Pair'( X, U, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z ), 
% 0.89/1.29    'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( X, U, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z ), 
% 0.89/1.29    'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Relation_Oconverse'( 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( T, Z ), Z, Z ), 'tc_prod'( Z, Z ) ), ~( 
% 0.89/1.29    'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( 
% 0.89/1.29    'c_Relation_Oconverse'( T, Z, Z ), Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( 
% 0.89/1.29    'c_Relation_Oconverse'( T, Z, Z ), Z ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( X, Y, Z, Z ), 'c_Relation_Oconverse'( 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( T, Z ), Z, Z ), 'tc_prod'( Z, Z ) ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( hAPP( 'c_split'( X, Y, Z, T ), 'c_Pair'( U, W, Y, Z ) ), hAPP( hAPP( 
% 0.89/1.29    X, U ), W ) ) ],
% 0.89/1.29     [ =( hAPP( 'c_split'( X, Y, Z, T ), 'c_Pair'( U, W, Y, Z ) ), hAPP( hAPP( 
% 0.89/1.29    X, U ), W ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( hAPP( hAPP( X, Y ), Z ), T ) ), ~( hBOOL( hAPP( hAPP( 
% 0.89/1.29    'c_split'( X, U, W, 'tc_fun'( V0, 'tc_bool' ) ), 'c_Pair'( Y, Z, U, W ) )
% 0.89/1.29    , T ) ) ) ],
% 0.89/1.29     [ 'c_in'( hAPP( X, Y ), 'c_Set_Oimage'( X, Z, T, U ), U ), ~( 'c_in'( Y
% 0.89/1.29    , Z, T ) ) ],
% 0.89/1.29     [ 'c_in'( hAPP( X, Y ), 'c_Set_Oimage'( X, Z, T, U ), U ), ~( 'c_in'( Y
% 0.89/1.29    , Z, T ) ) ],
% 0.89/1.29     [ ~( 'c_in'( X, Y, Z ) ), 'c_in'( hAPP( T, X ), 'c_Set_Oimage'( T, Y, Z
% 0.89/1.29    , U ), U ) ],
% 0.89/1.29     [ ~( 'c_in'( X, Y, Z ) ), 'c_in'( hAPP( T, X ), 'c_Set_Oimage'( T, Y, Z
% 0.89/1.29    , U ), U ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Wellfounded_Oacc'( Y, Z ), Z ), ~( 'c_Wellfounded_Owf'( 
% 0.89/1.29    Y, Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Osingle__valued'( 'c_Relation_OId__on'( X, Y ), Y, Y ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Transitive__Closure_Otrancl'( X, Y ), Y ), ~( 
% 0.89/1.29    'c_Relation_Osym'( X, Y ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__induct__1__1'( X, Z, T ) ) ) ), 
% 0.89/1.29    ~( 'c_in'( Y, 'c_Wellfounded_Oacc'( Z, T ), T ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Otrancl'( X, Y ), X ), ~( 
% 0.89/1.29    'c_Relation_Otrans'( X, Y ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'v_sko__Wellfounded__Xacc__Xinducts__1'( X, Z ) ) ) ), ~( 'c_in'( Y, 
% 0.89/1.29    'c_Wellfounded_Oacc'( Z, 't_a' ), 't_a' ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( X, Y ), ~( 'c_Relation_Osym'( 
% 0.89/1.29    'c_Relation_Oconverse'( X, Y, Y ), Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Relation_Oconverse'( X, Y, Y ), Y ), ~( 
% 0.89/1.29    'c_Relation_Osym'( X, Y ) ) ],
% 0.89/1.29     [ =( 'c_Relation_ODomain'( 'c_Transitive__Closure_Otrancl'( X, Y ), Y, Y
% 0.89/1.29     ), 'c_Relation_ODomain'( X, Y, Y ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_ATP__Linkup_Osko__Relation__XImage__iff__1__1'( X, Y, Z, T
% 0.89/1.29    , U ), X, T ), ~( 'c_in'( Y, 'c_Relation_OImage'( Z, X, T, U ), U ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Relation_OId'( X ), X ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_Relation_OId__on'( X, Y ), Y ) ],
% 0.89/1.29     [ =( 'c_Relation_Orel__comp'( 'c_Relation_OId'( X ), Y, X, X, Z ), Y ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( 'c_Relation_Orel__comp'( X, 'c_Relation_OId'( Y ), Z, Y, Y ), X ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_Relation_Oantisym'( 'c_Relation_OId__on'( X, Y ), Y ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Relation_Oconverse'( 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( X, Y ), Y, Y ), Y ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( 'c_Relation_Oconverse'( X, Y, Y ), Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Orefl__on'( X, Y, Z ), ~( 'c_Relation_Orefl__on'( X, 
% 0.89/1.29    'c_Relation_Oconverse'( Y, Z, Z ), Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Orefl__on'( X, 'c_Relation_Oconverse'( Y, Z, Z ), Z ), ~( 
% 0.89/1.29    'c_Relation_Orefl__on'( X, Y, Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Transitive__Closure_Ortrancl'( X, Y ), Y ), ~( 
% 0.89/1.29    'c_Relation_Osym'( X, Y ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Relation_Orel__comp'( X, X, Y, Y, Y ), Y ), 
% 0.89/1.29    ~( 'c_Wellfounded_Owf'( X, Y ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( X, Y ), ~( 'c_Wellfounded_Owf'( 
% 0.89/1.29    'c_Relation_Orel__comp'( X, X, Y, Y, Y ), Y ) ) ],
% 0.89/1.29     [ =( 'c_Relation_OImage'( 'c_Relation_OId'( X ), Y, X, X ), Y ) ],
% 0.89/1.29     [ 'c_Relation_Osingle__valued'( 'c_Relation_OId'( X ), X, X ) ],
% 0.89/1.29     [ =( 'c_Relation_ODomain'( 'c_Relation_OId__on'( X, Y ), Y, Y ), X ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( 'c_Relation_Oconverse'( X, Y, Y ), X ), ~( 'c_Relation_Osym'( X, Y
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ ~( =( 'c_Relation_Oconverse'( X, Y, Y ), X ) ), 'c_Relation_Osym'( X, 
% 0.89/1.29    Y ) ],
% 0.89/1.29     [ =( 'c_Relation_ORange'( 'c_Transitive__Closure_Otrancl'( X, Y ), Y, Y
% 0.89/1.29     ), 'c_Relation_ORange'( X, Y, Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_Transitive__Closure_Otrancl'( X, Y ), Y ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ =( 'c_Relation_Oconverse'( 'c_Relation_Orel__comp'( X, Y, Z, T, U ), Z
% 0.89/1.29    , U ), 'c_Relation_Orel__comp'( 'c_Relation_Oconverse'( Y, T, U ), 
% 0.89/1.29    'c_Relation_Oconverse'( X, Z, T ), U, T, Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Relation_OId__on'( X, Y ), Y ) ],
% 0.89/1.29     [ 'c_Relation_Orefl__on'( X, 'c_Relation_OId__on'( X, Y ), Y ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Relation_Oinv__image'( X, Y, Z, T ), T ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( X, Z ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Orel__comp'( X, 'c_Transitive__Closure_Ortrancl'( X, Y
% 0.89/1.29     ), Y, Y, Y ), 'c_Relation_Orel__comp'( 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    X, Y ), X, Y, Y, Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( 'c_Relation_Oinv__image'( X, Y, Z, T ), T ), ~( 
% 0.89/1.29    'c_Relation_Osym'( X, Z ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Otrancl'( 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    X, Y ), Y ), 'c_Transitive__Closure_Ortrancl'( X, Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_Transitive__Closure_Ortrancl'( X, Y ), Y ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_Relation_Otrans'( X, Y ), ~( 'c_Relation_Otrans'( 
% 0.89/1.29    'c_Relation_Oconverse'( X, Y, Y ), Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_Relation_Oconverse'( X, Y, Y ), Y ), ~( 
% 0.89/1.29    'c_Relation_Otrans'( X, Y ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Oconverse'( 'c_Relation_OId'( X ), X, X ), 
% 0.89/1.29    'c_Relation_OId'( X ) ) ],
% 0.89/1.29     [ 'c_Wellfounded_Owf'( 'c_Transitive__Closure_Otrancl'( X, Y ), Y ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( X, Y ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Orel__comp'( 'c_Relation_Orel__comp'( X, Y, Z, T, U ), 
% 0.89/1.29    W, Z, U, V0 ), 'c_Relation_Orel__comp'( X, 'c_Relation_Orel__comp'( Y, W
% 0.89/1.29    , T, U, V0 ), Z, T, V0 ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Oconverse'( 'c_Relation_Oinv__image'( X, Y, Z, T ), T, 
% 0.89/1.29    T ), 'c_Relation_Oinv__image'( 'c_Relation_Oconverse'( X, Z, Z ), Y, Z, T
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Otrancl'( 'c_Relation_Oconverse'( X, Y, Y )
% 0.89/1.29    , Y ), 'c_Relation_Oconverse'( 'c_Transitive__Closure_Otrancl'( X, Y ), Y
% 0.89/1.29    , Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_Relation_Oinv__image'( X, Y, Z, T ), T ), ~( 
% 0.89/1.29    'c_Relation_Otrans'( X, Z ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Oconverse'( 'c_Relation_OId__on'( X, Y ), Y, Y ), 
% 0.89/1.29    'c_Relation_OId__on'( X, Y ) ) ],
% 0.89/1.29     [ ~( =( 'c_Relation_Orel__comp'( 'c_Relation_Oconverse'( X, Y, Y ), X, Y
% 0.89/1.29    , Y, Y ), X ) ), 'c_Equiv__Relations_Oequiv'( 'c_Relation_ODomain'( X, Y
% 0.89/1.29    , Y ), X, Y ) ],
% 0.89/1.29     [ 'c_Relation_Oantisym'( 'c_Relation_OId'( X ), X ) ],
% 0.89/1.29     [ =( 'c_Relation_ORange'( 'c_Relation_Oconverse'( X, Y, Z ), Z, Y ), 
% 0.89/1.29    'c_Relation_ODomain'( X, Y, Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_ATP__Linkup_Osko__Wellfounded__Xwf__eq__minimal__1__1'( X, 
% 0.89/1.29    Y, Z ), X, Z ), ~( 'c_in'( T, X, Z ) ), ~( 'c_Wellfounded_Owf'( Y, Z ) )
% 0.89/1.29     ],
% 0.89/1.29     [ =( 'c_Relation_ORange'( 'c_Relation_OId__on'( X, Y ), Y, Y ), X ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_Relation_Osingle__valued'( 'c_Relation_Orel__comp'( X, Y, Z, T, U )
% 0.89/1.29    , Z, U ), ~( 'c_Relation_Osingle__valued'( Y, T, U ) ), ~( 
% 0.89/1.29    'c_Relation_Osingle__valued'( X, Z, T ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Oconverse'( 'c_Relation_Oconverse'( X, Y, Z ), Z, Y ), 
% 0.89/1.29    X ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( 'c_Relation_OId'( X ), X ) ],
% 0.89/1.29     [ =( 'c_Relation_Orel__comp'( 'c_Relation_Oconverse'( X, Y, Y ), X, Y, Y
% 0.89/1.29    , Y ), X ), ~( 'c_Equiv__Relations_Oequiv'( Z, X, Y ) ) ],
% 0.89/1.29     [ =( 'c_Relation_Orel__comp'( 'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ), Y, Y, Y ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Oantisym'( X, Y ), ~( 'c_Relation_Oantisym'( 
% 0.89/1.29    'c_Relation_Oconverse'( X, Y, Y ), Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Oantisym'( 'c_Relation_Oconverse'( X, Y, Y ), Y ), ~( 
% 0.89/1.29    'c_Relation_Oantisym'( X, Y ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( hBOOL( hAPP( X, 
% 0.89/1.29    'v_sko__Wellfounded__Xacc__Xinduct__1'( X, Z ) ) ) ), ~( 'c_in'( Y, 
% 0.89/1.29    'c_Wellfounded_Oacc'( Z, 't_a' ), 't_a' ) ) ],
% 0.89/1.29     [ 'c_Relation_Orefl__on'( X, Y, Z ), ~( 'c_Equiv__Relations_Oequiv'( X, 
% 0.89/1.29    Y, Z ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( 'c_Relation_Oconverse'( X, Y, Y )
% 0.89/1.29    , Y ), 'c_Relation_Oconverse'( 'c_Transitive__Closure_Ortrancl'( X, Y ), 
% 0.89/1.29    Y, Y ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_ATP__Linkup_Osko__Wellfounded__XwfE__min__1__1'( X, Y, Z )
% 0.89/1.29    , X, Z ), ~( 'c_in'( T, X, Z ) ), ~( 'c_Wellfounded_Owf'( Y, Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Osym'( X, Y ), ~( 'c_Equiv__Relations_Oequiv'( Z, X, Y ) )
% 0.89/1.29     ],
% 0.89/1.29     [ 'c_in'( X, 'c_Wellfounded_Oacc'( Y, Z ), Z ), ~( 'c_in'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__Xintros__1__1'( Y, X, Z ), 
% 0.89/1.29    'c_Wellfounded_Oacc'( Y, Z ), Z ) ) ],
% 0.89/1.29     [ 'c_Equiv__Relations_Ocongruent'( X, hAPP( Y, Z ), T, U ), ~( 'c_in'( Z
% 0.89/1.29    , W, V0 ) ), ~( 'c_Equiv__Relations_Ocongruent2'( V1, X, Y, V0, T, U ) )
% 0.89/1.29    , ~( 'c_Equiv__Relations_Oequiv'( W, V1, V0 ) ) ],
% 0.89/1.29     [ =( 'c_Relation_ODomain'( 'c_Relation_Oconverse'( X, Y, Z ), Z, Y ), 
% 0.89/1.29    'c_Relation_ORange'( X, Y, Z ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Otrancl'( X, Y ), 'c_Relation_Orel__comp'( 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( X, Y ), X, Y, Y, Y ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Otrancl'( X, Y ), 'c_Relation_Orel__comp'( X
% 0.89/1.29    , 'c_Transitive__Closure_Ortrancl'( X, Y ), Y, Y, Y ) ) ],
% 0.89/1.29     [ =( 'c_Relation_ORange'( X, Y, Z ), 'c_Relation_ODomain'( 
% 0.89/1.29    'c_Relation_Oconverse'( X, Y, Z ), Z, Y ) ) ],
% 0.89/1.29     [ 'c_Relation_Ototal__on'( X, Y, Z ), ~( 'c_Relation_Ototal__on'( X, 
% 0.89/1.29    'c_Relation_Oconverse'( Y, Z, Z ), Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Ototal__on'( X, 'c_Relation_Oconverse'( Y, Z, Z ), Z ), 
% 0.89/1.29    ~( 'c_Relation_Ototal__on'( X, Y, Z ) ) ],
% 0.89/1.29     [ 'c_Relation_Otrans'( X, Y ), ~( 'c_Equiv__Relations_Oequiv'( Z, X, Y )
% 0.89/1.29     ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), 'c_in'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__induct__1__1'( X, Z, T ), 
% 0.89/1.29    'c_Wellfounded_Oacc'( Z, T ), T ), ~( 'c_in'( Y, 'c_Wellfounded_Oacc'( Z
% 0.89/1.29    , T ), T ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( 'c_Transitive__Closure_Otrancl'( 
% 0.89/1.29    X, Y ), Y ), 'c_Transitive__Closure_Ortrancl'( X, Y ) ) ],
% 0.89/1.29     [ =( 'c_Transitive__Closure_Ortrancl'( 'c_Transitive__Closure_Ortrancl'( 
% 0.89/1.29    X, Y ), Y ), 'c_Transitive__Closure_Ortrancl'( X, Y ) ) ],
% 0.89/1.29     [ ~( 'c_in'( X, Y, Z ) ), ~( 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__XwfE__min__1__1'( Y, T, Z ), Z, Z ), T
% 0.89/1.29    , 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( U, Y, Z ) ), ~( 'c_Wellfounded_Owf'( 
% 0.89/1.29    T, Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'c_ATP__Linkup_Osko__Relation__XRangeE__1__1'( X, Y
% 0.89/1.29    , Z, T ), X, T, Z ), Y, 'tc_prod'( T, Z ) ), ~( 'c_in'( X, 
% 0.89/1.29    'c_Relation_ORange'( Y, T, Z ), Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Wellfounded_Oacc'( Y, Z ), Z ), 'c_in'( 'c_Pair'( 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__Xintros__1__1'( Y, X, Z ), X, Z, 
% 0.89/1.29    Z ), Y, 'tc_prod'( Z, Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Wellfounded_Oacc'( Y, Z ), Z ), ~( 'c_in'( T, 
% 0.89/1.29    'c_Wellfounded_Oacc'( Y, Z ), Z ) ), ~( 'c_in'( 'c_Pair'( X, T, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( Y, Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Wellfounded_Oacc'( Y, Z ), Z ), ~( 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    T, Z, Z ), 'c_Transitive__Closure_Ortrancl'( Y, Z ), 'tc_prod'( Z, Z ) )
% 0.89/1.29     ), ~( 'c_in'( T, 'c_Wellfounded_Oacc'( Y, Z ), Z ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), 'c_in'( Z, 'c_Wellfounded_Oacc'( T, 't_a' ), 
% 0.89/1.29    't_a' ), ~( 'c_in'( 'c_Pair'( Z, 'v_sko__Wellfounded__Xacc__Xinducts__1'( 
% 0.89/1.29    X, T ), 't_a', 't_a' ), T, 'tc_prod'( 't_a', 't_a' ) ) ), ~( 'c_in'( Y, 
% 0.89/1.29    'c_Wellfounded_Oacc'( T, 't_a' ), 't_a' ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_ODomain'( Y, Z, Z ), Z ), 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    X, Z, Z ), 'c_Transitive__Closure_Ortrancl'( Y, Z ), 'tc_prod'( Z, Z ) )
% 0.89/1.29     ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'v_sko__Wellfounded__Xacc__Xinducts__1'( X, T ), 't_a', 't_a' ), T, 
% 0.89/1.29    'tc_prod'( 't_a', 't_a' ) ) ), ~( 'c_in'( Y, 'c_Wellfounded_Oacc'( T, 
% 0.89/1.29    't_a' ), 't_a' ) ) ],
% 0.89/1.29     [ 'c_in'( hAPP( hAPP( X, Y ), Z ), 'c_Set_Oimage'( 'c_split'( X, T, U, W
% 0.89/1.29     ), V0, 'tc_prod'( T, U ), W ), W ), ~( 'c_in'( 'c_Pair'( Y, Z, T, U ), 
% 0.89/1.29    V0, 'tc_prod'( T, U ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 'c_ATP__Linkup_Osko__Relation__XDomainE__1__1'( X
% 0.89/1.29    , Y, Z, T ), Z, T ), Y, 'tc_prod'( Z, T ) ), ~( 'c_in'( X, 
% 0.89/1.29    'c_Relation_ODomain'( Y, Z, T ), Z ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), 'c_in'( Z, 'c_Wellfounded_Oacc'( T, 't_a' ), 
% 0.89/1.29    't_a' ), ~( 'c_in'( 'c_Pair'( Z, 'v_sko__Wellfounded__Xacc__Xinduct__1'( 
% 0.89/1.29    X, T ), 't_a', 't_a' ), T, 'tc_prod'( 't_a', 't_a' ) ) ), ~( 'c_in'( Y, 
% 0.89/1.29    'c_Wellfounded_Oacc'( T, 't_a' ), 't_a' ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), hBOOL( hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Z, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xacc__induct__1__1'( X, T, U ), U, U )
% 0.89/1.29    , T, 'tc_prod'( U, U ) ) ), ~( 'c_in'( Y, 'c_Wellfounded_Oacc'( T, U ), U
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ ~( 'c_in'( X, Y, Z ) ), ~( 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Wellfounded__Xwf__eq__minimal__1__1'( Y, T, Z ), Z, 
% 0.89/1.29    Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( U, Y, Z ) ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( T, Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    'c_ATP__Linkup_Osko__Relation__XDomain__iff__1__1'( X, Y, Z, T ), Z, T )
% 0.89/1.29    , Y, 'tc_prod'( Z, T ) ), ~( 'c_in'( X, 'c_Relation_ODomain'( Y, Z, T ), 
% 0.89/1.29    Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'c_ATP__Linkup_Osko__Relation__XImage__iff__1__1'( X
% 0.89/1.29    , Y, Z, T, U ), Y, T, U ), Z, 'tc_prod'( T, U ) ), ~( 'c_in'( Y, 
% 0.89/1.29    'c_Relation_OImage'( Z, X, T, U ), U ) ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), 'c_in'( 
% 0.89/1.29    X, 'c_Relation_ODomain'( T, Z, Z ), Z ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'c_ATP__Linkup_Osko__Relation__XRange__iff__1__1'( X
% 0.89/1.29    , Y, Z, T ), X, T, Z ), Y, 'tc_prod'( T, Z ) ), ~( 'c_in'( X, 
% 0.89/1.29    'c_Relation_ORange'( Y, T, Z ), Z ) ) ],
% 0.89/1.29     [ ~( =( 'v_a____', 'v_b____' ) ) ],
% 0.89/1.29     [ ~( =( 'v_b____', 'v_a_H____' ) ) ],
% 0.89/1.29     [ ~( =( 'v_a_H____', 'v_b_H____' ) ) ],
% 0.89/1.29     [ ~( =( 'v_a____', 'v_b_H____' ) ) ],
% 0.89/1.29     [ 'c_in'( X, hAPP( 'c_split'( Y, Z, T, 'tc_fun'( U, 'tc_bool' ) ), 
% 0.89/1.29    'c_Pair'( W, V0, Z, T ) ), U ), ~( 'c_in'( X, hAPP( hAPP( Y, W ), V0 ), U
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ =( hAPP( hAPP( X, Y ), Z ), hAPP( hAPP( X, T ), U ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( Z, U, W, W ), V0, 'tc_prod'( W, W ) ) ), ~( 'c_in'( 'c_Pair'( Y
% 0.89/1.29    , T, V1, V1 ), V2, 'tc_prod'( V1, V1 ) ) ), ~( 
% 0.89/1.29    'c_Equiv__Relations_Ocongruent2'( V2, V0, X, V1, W, V3 ) ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_in'( 'c_Pair'( Z, Y, T, U ), W, 'tc_prod'( T, U ) ) )
% 0.89/1.29    , ~( 'c_in'( 'c_Pair'( Z, X, T, U ), W, 'tc_prod'( T, U ) ) ), ~( 
% 0.89/1.29    'c_Relation_Osingle__valued'( W, T, U ) ) ],
% 0.89/1.29     [ =( hAPP( 'c_Recdef_Ocut'( X, Y, Z, T, U ), W ), hAPP( X, W ) ), ~( 
% 0.89/1.29    'c_in'( 'c_Pair'( W, Z, T, T ), Y, 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ =( hAPP( 'c_Recdef_Ocut'( X, Y, Z, T, U ), W ), hAPP( X, W ) ), ~( 
% 0.89/1.29    'c_in'( 'c_Pair'( W, Z, T, T ), Y, 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ 'c_FunDef_Oin__rel'( X, Y, Z, T, U ), ~( 'c_in'( 'c_Pair'( Y, Z, T, U
% 0.89/1.29     ), X, 'tc_prod'( T, U ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, T ), U, 'tc_prod'( Z, T ) ), ~( 
% 0.89/1.29    'c_FunDef_Oin__rel'( U, X, Y, Z, T ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( U, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( 'c_Pair'( X
% 0.89/1.29    , U, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_Relation_Otrans'( T, Z ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( U, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( 'c_Pair'( X
% 0.89/1.29    , U, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_Relation_Otrans'( T, Z ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, T ), 'c_Relation_Oconverse'( U, T, Z ), 
% 0.89/1.29    'tc_prod'( Z, T ) ), ~( 'c_in'( 'c_Pair'( Y, X, T, Z ), U, 'tc_prod'( T, 
% 0.89/1.29    Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, T ), 'c_Relation_Oconverse'( U, T, Z ), 
% 0.89/1.29    'tc_prod'( Z, T ) ), ~( 'c_in'( 'c_Pair'( Y, X, T, Z ), U, 'tc_prod'( T, 
% 0.89/1.29    Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, T ), U, 'tc_prod'( Z, T ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( Y, X, T, Z ), 'c_Relation_Oconverse'( U, Z, T ), 'tc_prod'( T, 
% 0.89/1.29    Z ) ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, X, Y, Y ), Z, 'tc_prod'( Y, Y ) ) ), ~( 
% 0.89/1.29    'c_Relation_Oirrefl'( Z, Y ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), T, 'tc_prod'( 
% 0.89/1.29    Z, Z ) ) ), ~( 'c_in'( 'c_Pair'( X, U, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( X, U, Z, Z ), T, 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), T, 'tc_prod'( 
% 0.89/1.29    Z, Z ) ) ), ~( 'c_in'( 'c_Pair'( X, U, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_in'( 'c_Pair'( X, U, Z, Z ), T, 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( 
% 0.89/1.29    Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Ortrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_in'( 'c_Pair'( X, U, Z, Z ), 'c_Transitive__Closure_Ortrancl'( T, Z )
% 0.89/1.29    , 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, X, Y, Y ), 'c_Transitive__Closure_Ortrancl'( Z, Y
% 0.89/1.29     ), 'tc_prod'( Y, Y ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, X, Y, Y ), 'c_Transitive__Closure_Ortrancl'( Z, Y
% 0.89/1.29     ), 'tc_prod'( Y, Y ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( Y, X, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_Wellfounded_Owf'( 
% 0.89/1.29    T, Z ) ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_in'( 'c_Pair'( Y, X, Z, Z ), T, 'tc_prod'( Z, Z ) ) )
% 0.89/1.29    , ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_Relation_Oantisym'( T, Z ) ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_in'( 'c_Pair'( Y, X, Z, Z ), T, 'tc_prod'( Z, Z ) ) )
% 0.89/1.29    , ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 
% 0.89/1.29    'c_Relation_Oantisym'( T, Z ) ) ],
% 0.89/1.29     [ =( hAPP( X, Y ), hAPP( X, Z ) ), ~( 'c_in'( 'c_Pair'( Y, Z, T, T ), U
% 0.89/1.29    , 'tc_prod'( T, T ) ) ), ~( 'c_Equiv__Relations_Ocongruent'( U, X, T, W )
% 0.89/1.29     ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Relation_OId__on'( T
% 0.89/1.29    , Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ ~( =( 'c_Recdef_Ocut'( X, Y, Z, T, U ), 'c_Recdef_Ocut'( W, Y, Z, T, U
% 0.89/1.29     ) ) ), =( hAPP( X, V0 ), hAPP( W, V0 ) ), ~( 'c_in'( 'c_Pair'( V0, Z, T
% 0.89/1.29    , T ), Y, 'tc_prod'( T, T ) ) ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Relation_OId'( Z ), 
% 0.89/1.29    'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, X, Y, Y ), Z, 'tc_prod'( Y, Y ) ), ~( 
% 0.89/1.29    'c_Nitpick_Orefl_H'( Z, Y ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, X, Y, Y ), Z, 'tc_prod'( Y, Y ) ) ), ~( 
% 0.89/1.29    'c_Wellfounded_Owf'( Z, Y ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Relation_Oinv__image'( T, U, W, Z )
% 0.89/1.29    , 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( hAPP( U, X ), hAPP( U, Y ), W
% 0.89/1.29    , W ), T, 'tc_prod'( W, W ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( hAPP( X, Y ), hAPP( X, Z ), T, T ), U, 'tc_prod'( T
% 0.89/1.29    , T ) ), ~( 'c_in'( 'c_Pair'( Y, Z, W, W ), 'c_Relation_Oinv__image'( U, 
% 0.89/1.29    X, T, W ), 'tc_prod'( W, W ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( Y, X, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_Relation_Osym'( T
% 0.89/1.29    , Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( Y, X, Z, Z ), T, 'tc_prod'( Z, Z ) ) ), ~( 'c_Relation_Osym'( T
% 0.89/1.29    , Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, T ), 'c_Relation_Orel__comp'( U, W, Z, V0, 
% 0.89/1.29    T ), 'tc_prod'( Z, T ) ), ~( 'c_in'( 'c_Pair'( V1, Y, V0, T ), W, 
% 0.89/1.29    'tc_prod'( V0, T ) ) ), ~( 'c_in'( 'c_Pair'( X, V1, Z, V0 ), U, 'tc_prod'( 
% 0.89/1.29    Z, V0 ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), T, 'tc_prod'( 
% 0.89/1.29    Z, Z ) ) ), ~( 'c_in'( 'c_Pair'( X, U, Z, Z ), T, 'tc_prod'( Z, Z ) ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z
% 0.89/1.29     ), 'tc_prod'( Z, Z ) ), ~( 'c_in'( 'c_Pair'( U, Y, Z, Z ), 
% 0.89/1.29    'c_Transitive__Closure_Otrancl'( T, Z ), 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( 
% 0.89/1.29    'c_Pair'( X, U, Z, Z ), 'c_Transitive__Closure_Otrancl'( T, Z ), 
% 0.89/1.29    'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, X, Y, Y ), 'c_Relation_OId'( Y ), 'tc_prod'( Y, Y
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, X, Y, Y ), 'c_Relation_OId'( Y ), 'tc_prod'( Y, Y
% 0.89/1.29     ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omktop'( 
% 0.89/1.29    Z, T ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ), ~( 'c_in'( 'c_Pair'( X, Y, 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), Z
% 0.89/1.29    , 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ), =( X, Y ), =( X, T ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omktop'( 
% 0.89/1.29    Z, T ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ), ~( 'c_in'( 'c_Pair'( X, Y, 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), Z
% 0.89/1.29    , 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ), =( Y, T ), =( X, T ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, X, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omktop'( 
% 0.89/1.29    Y, X ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omktop'( 
% 0.89/1.29    Z, X ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), Z, 'tc_prod'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ) )
% 0.89/1.29    , =( Y, T ), ~( 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt'
% 0.89/1.29    , 'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omktop'( 
% 0.89/1.29    Z, T ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ) ],
% 0.89/1.29     [ =( X, Y ), =( Y, X ), 'c_in'( 'c_Pair'( X, Y, 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    'c_Arrow__Order__Mirabelle_Omkbot'( Z, X ), 'tc_prod'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ) )
% 0.89/1.29     ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, X, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omkbot'( 
% 0.89/1.29    Y, X ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omkbot'( 
% 0.89/1.29    Z, Y ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omkbot'( 
% 0.89/1.29    Z, T ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ), ~( 'c_in'( 'c_Pair'( X, Y, 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), Z
% 0.89/1.29    , 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ), =( X, Y ), =( Y, T ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omkbot'( 
% 0.89/1.29    Z, T ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ), ~( 'c_in'( 'c_Pair'( X, Y, 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), Z
% 0.89/1.29    , 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ), =( X, T ), =( Y, T ) ],
% 0.89/1.29     [ =( X, Y ), =( X, Y ), 'c_in'( 'c_Pair'( X, Y, 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    'c_Arrow__Order__Mirabelle_Omktop'( Z, Y ), 'tc_prod'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ) )
% 0.89/1.29     ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), Z, 'tc_prod'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ) )
% 0.89/1.29    , =( X, T ), ~( 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt'
% 0.89/1.29    , 'tc_Arrow__Order__Mirabelle_Oalt' ), 'c_Arrow__Order__Mirabelle_Omkbot'( 
% 0.89/1.29    Z, T ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    'v_sko__Arrow__Order__Mirabelle__Xcomplete__Lin__1'( X, Y ), 'tc_prod'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ) )
% 0.89/1.29    , =( X, Y ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'v_a_H____', 'v_a____', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    hAPP( 'v_F', 'v_Q____' ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ), =( 'v_a____', 'v_a_H____' ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, T ), 'c_Product__Type_OSigma'( U, W, Z, T )
% 0.89/1.29    , 'tc_prod'( Z, T ) ), ~( 'c_in'( Y, hAPP( W, X ), T ) ), ~( 'c_in'( X, U
% 0.89/1.29    , Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, T ), 'c_Product__Type_OSigma'( U, W, Z, T )
% 0.89/1.29    , 'tc_prod'( Z, T ) ), ~( 'c_in'( Y, hAPP( W, X ), T ) ), ~( 'c_in'( X, U
% 0.89/1.29    , Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Wellfounded_Oacc'( Y, Z ), Z ), ~( 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    T, Z, Z ), Y, 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( T, 'c_Wellfounded_Oacc'( 
% 0.89/1.29    Y, Z ), Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Wellfounded_Oacc'( Y, Z ), Z ), ~( 'c_in'( 'c_Pair'( X, 
% 0.89/1.29    T, Z, Z ), Y, 'tc_prod'( Z, Z ) ) ), ~( 'c_in'( T, 'c_Wellfounded_Oacc'( 
% 0.89/1.29    Y, Z ), Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_OImage'( Y, Z, T, U ), U ), ~( 'c_in'( 'c_Pair'( 
% 0.89/1.29    W, X, T, U ), Y, 'tc_prod'( T, U ) ) ), ~( 'c_in'( W, Z, T ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_OImage'( Y, Z, T, U ), U ), ~( 'c_in'( 'c_Pair'( 
% 0.89/1.29    W, X, T, U ), Y, 'tc_prod'( T, U ) ) ), ~( 'c_in'( W, Z, T ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( 'c_Pair'( X, T, Z, Z ), 
% 0.89/1.29    'c_Relation_OId__on'( Y, Z ), 'tc_prod'( Z, Z ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, X, Y, Y ), 'c_Relation_OId__on'( Z, Y ), 
% 0.89/1.29    'tc_prod'( Y, Y ) ), ~( 'c_in'( X, Z, Y ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( 'c_Pair'( T, X, Z, Z ), U, 'tc_prod'( Z
% 0.89/1.29    , Z ) ) ), ~( 'c_Equiv__Relations_Oequiv'( Y, U, Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( 'c_Pair'( X, T, Z, Z ), U, 'tc_prod'( Z
% 0.89/1.29    , Z ) ) ), ~( 'c_Equiv__Relations_Oequiv'( Y, U, Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_ORange'( Y, Z, T ), T ), ~( 'c_in'( 'c_Pair'( U
% 0.89/1.29    , X, Z, T ), Y, 'tc_prod'( Z, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_ORange'( Y, Z, T ), T ), ~( 'c_in'( 'c_Pair'( U
% 0.89/1.29    , X, Z, T ), Y, 'tc_prod'( Z, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_ODomain'( Y, Z, T ), Z ), ~( 'c_in'( 'c_Pair'( 
% 0.89/1.29    X, U, Z, T ), Y, 'tc_prod'( Z, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, 'c_Relation_ODomain'( Y, Z, T ), Z ), ~( 'c_in'( 'c_Pair'( 
% 0.89/1.29    X, U, Z, T ), Y, 'tc_prod'( Z, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, hAPP( Y, Z ), T ), ~( 'c_in'( 'c_Pair'( Z, X, U, T ), 
% 0.89/1.29    'c_Product__Type_OSigma'( W, Y, U, T ), 'tc_prod'( U, T ) ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( 'c_Pair'( X, T, Z, U ), 
% 0.89/1.29    'c_Product__Type_OSigma'( Y, W, Z, U ), 'tc_prod'( Z, U ) ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, Y, Z, Z ), T, 'tc_prod'( Z, Z ) ), 'c_in'( 
% 0.89/1.29    'c_Pair'( Y, X, Z, Z ), T, 'tc_prod'( Z, Z ) ), =( Y, X ), ~( 'c_in'( X, 
% 0.89/1.29    U, Z ) ), ~( 'c_in'( Y, U, Z ) ), ~( 'c_Relation_Ototal__on'( U, T, Z ) )
% 0.89/1.29     ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, X, Y, Y ), Z, 'tc_prod'( Y, Y ) ), ~( 'c_in'( X, 
% 0.89/1.29    T, Y ) ), ~( 'c_Relation_Orefl__on'( T, Z, Y ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( 'c_Pair'( T, X, Z, Z ), U, 'tc_prod'( Z
% 0.89/1.29    , Z ) ) ), ~( 'c_Relation_Orefl__on'( Y, U, Z ) ) ],
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( 'c_in'( 'c_Pair'( X, T, Z, Z ), U, 'tc_prod'( Z
% 0.89/1.29    , Z ) ) ), ~( 'c_Relation_Orefl__on'( Y, U, Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( X, X, Y, Y ), Z, 'tc_prod'( Y, Y ) ), ~( 'c_in'( X, 
% 0.89/1.29    T, Y ) ), ~( 'c_Relation_Orefl__on'( T, Z, Y ) ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'v_a____', 'v_b____', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    hAPP( 'v_F', 'v_Q____' ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ],
% 0.89/1.29     [ ~( =( 'c_Pair'( X, Y, Z, T ), 'c_Pair'( U, W, Z, T ) ) ), =( Y, W ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ ~( =( 'c_Pair'( X, Y, Z, T ), 'c_Pair'( U, W, Z, T ) ) ), =( X, U ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'c_in'( X, Y, Z ), ~( hBOOL( hAPP( Y, X ) ) ) ],
% 0.89/1.29     [ hBOOL( hAPP( X, Y ) ), ~( 'c_in'( Y, X, Z ) ) ],
% 0.89/1.29     [ 'c_in'( 'v_Q____', 'c_Arrow__Order__Mirabelle_OProf', 'tc_fun'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oindi', 'tc_fun'( 'tc_prod'( 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    'tc_bool' ) ) ) ],
% 0.89/1.29     [ 'c_Arrow__Order__Mirabelle_Ounanimity'( 'v_F' ) ],
% 0.89/1.29     [ 'c_in'( 'c_Pair'( 'v_b____', 'v_b_H____', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    hAPP( 'v_Q____', X ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ],
% 0.89/1.29     [ ~( 'c_in'( 'c_Pair'( 'v_b____', 'v_b_H____', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt', 'tc_Arrow__Order__Mirabelle_Oalt' ), 
% 0.89/1.29    hAPP( 'v_F', 'v_Q____' ), 'tc_prod'( 'tc_Arrow__Order__Mirabelle_Oalt', 
% 0.89/1.29    'tc_Arrow__Order__Mirabelle_Oalt' ) ) ) ],
% 0.89/1.29     [ 'class_Lattices_Oupper__semilattice'( 'tc_fun'( X, Y ) ), ~( 
% 0.89/1.29    'class_Lattices_Olattice'( Y ) ) ],
% 0.89/1.29     [ 'class_Lattices_Olower__semilattice'( 'tc_fun'( X, Y ) ), ~( 
% 0.89/1.29    'class_Lattices_Olattice'( Y ) ) ],
% 0.89/1.29     [ 'class_Lattices_Odistrib__lattice'( 'tc_fun'( X, Y ) ), ~( 
% 0.89/1.29    'class_Lattices_Odistrib__lattice'( Y ) ) ],
% 0.89/1.29     [ 'class_Lattices_Obounded__lattice'( 'tc_fun'( X, Y ) ), ~( 
% 0.89/1.29    'class_Lattices_Obounded__lattice'( Y ) ) ],
% 0.89/1.29     [ 'class_Lattices_Oboolean__algebra'( 'tc_fun'( X, Y ) ), ~( 
% 0.89/1.29    'class_Lattices_Oboolean__algebra'( Y ) ) ],
% 0.89/1.29     [ 'class_Orderings_Opreorder'( 'tc_fun'( X, Y ) ), ~( 
% 0.89/1.29    'class_Orderings_Opreorder'( Y ) ) ],
% 0.89/1.29     [ 'class_Lattices_Olattice'( 'tc_fun'( X, Y ) ), ~( 
% 0.89/1.29    'class_Lattices_Olattice'( Y ) ) ],
% 0.89/1.29     [ 'class_Orderings_Oorder'( 'tc_fun'( X, Y ) ), ~( 
% 0.89/1.29    'class_Orderings_Oorder'( Y ) ) ],
% 0.89/1.29     [ 'class_Orderings_Obot'( 'tc_fun'( X, Y ) ), ~( 'class_Orderings_Obot'( 
% 0.89/1.29    Y ) ) ],
% 0.89/1.29     [ 'class_HOL_Oord'( 'tc_fun'( X, Y ) ), ~( 'class_HOL_Oord'( Y ) ) ]
% 0.89/1.29    ,
% 0.89/1.29     [ 'class_Lattices_Oupper__semilattice'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_Lattices_Olower__semilattice'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_Lattices_Odistrib__lattice'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_Lattices_Obounded__lattice'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_Lattices_Oboolean__algebra'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_Orderings_Opreorder'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_Lattices_Olattice'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_Orderings_Oorder'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_Orderings_Obot'( 'tc_bool' ) ],
% 0.89/1.29     [ 'class_HOL_Oord'( 'tc_bool' ) ],
% 0.89/1.29     [ 'c_fequal'( X, X, Y ) ],
% 0.89/1.29     [ =( X, Y ), ~( 'c_fequal'( X, Y, Z ) ) ]
% 0.89/1.29  ] .
% 0.89/1.29  
% 0.89/1.29  
% 0.89/1.29  percentage equality = 0.230949, percentage horn = 0.885993
% 0.89/1.29  This is a problem with some equality
% 0.89/1.29  
% 0.89/1.29  
% 0.89/1.29  
% 0.89/1.29  Options Used:
% 0.89/1.29  
% 0.89/1.29  useres =            1
% 0.89/1.29  useparamod =        1
% 0.89/1.29  useeqrefl =         1
% 0.89/1.29  useeqfact =         1
% 0.89/1.29  usefactor =         1
% 0.89/1.29  usesimpsplitting =  0
% 0.89/1.29  usesimpdemod =      5
% 0.89/1.29  usesimpres =        3
% 0.89/1.29  
% 0.89/1.29  resimpinuse      =  1000
% 0.89/1.29  resimpclauses =     20000
% 0.89/1.29  substype =          eqrewr
% 0.89/1.29  backwardsubs =      1
% 0.89/1.29  selectoldest =      5
% 0.89/1.29  
% 0.89/1.29  litorderings [0] =  split
% 0.89/1.29  litorderings [1] =  extend the termordering, first sorting on arguments
% 0.89/1.29  
% 0.89/1.29  termordering =      kbo
% 0.89/1.29  
% 0.89/1.29  litapriori =        0
% 0.89/1.29  termapriori =       1
% 0.89/1.29  litaposteriori =    0
% 0.89/1.29  termaposteriori =   0
% 0.89/1.29  demodaposteriori =  0
% 0.89/1.29  ordereqreflfact =   0
% 0.89/1.29  
% 0.89/1.29  litselect =         negord
% 0.89/1.29  
% 0.89/1.29  maxweight =         15
% 0.89/1.29  maxdepth =          30000
% 0.89/1.29  maxlength =         115
% 0.89/1.29  maxnrvars =         195
% 0.89/1.29  excuselevel =       1
% 0.89/1.29  increasemaxweight = 1
% 0.89/1.29  
% 0.89/1.29  maxselected =       10000000
% 0.89/1.29  maxnrclauses =      10000000
% 0.89/1.29  
% 0.89/1.29  showgenerated =    0
% 0.89/1.29  showkept =         0
% 0.89/1.29  showselected =     0
% 0.89/1.29  showdeleted =      0
% 0.89/1.29  showresimp =       1
% 0.89/1.29  showstatus =       2000
% 0.89/1.29  
% 0.89/1.29  prologoutput =     1
% 0.89/1.29  nrgoals =          5000000
% 0.89/1.29  totalproof =       1
% 0.89/1.29  
% 0.89/1.29  Symbols occurring in the translation:
% 0.89/1.29  
% 0.89/1.29  {}  [0, 0]      (w:1, o:2, a:1, s:1, b:0), 
% 0.89/1.29  .  [1, 2]      (w:1, o:105, a:1, s:1, b:0), 
% 0.89/1.29  !  [4, 1]      (w:0, o:79, a:1, s:1, b:0), 
% 0.89/1.29  =  [13, 2]      (w:1, o:0, a:0, s:1, b:0), 
% 0.89/1.29  ==>  [14, 2]      (w:1, o:0, a:0, s:1, b:0), 
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% 0.89/1.29  'tc_bool'  [42, 0]      (w:1, o:12, a:1, s:1, b:0), 
% 0.89/1.29  'tc_fun'  [43, 2]      (w:1, o:131, a:1, s:1, b:0), 
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% 0.89/1.29  'c_Wellfounded_Owf'  [45, 2]      (w:1, o:132, a:1, s:1, b:0), 
% 0.89/1.29  'c_Lattices_Oupper__semilattice__class_Osup'  [47, 3]      (w:1, o:157, a:1
% 0.89/1.29    , s:1, b:0), 
% 0.89/1.29  'class_Lattices_Oupper__semilattice'  [48, 1]      (w:1, o:85, a:1, s:1, b:
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% 0.89/1.29  'c_Relation_OImage'  [53, 4]      (w:1, o:186, a:1, s:1, b:0), 
% 0.89/1.29  hAPP  [57, 2]      (w:1, o:134, a:1, s:1, b:0), 
% 0.89/1.29  hBOOL  [58, 1]      (w:1, o:86, a:1, s:1, b:0), 
% 0.89/1.29  'c_List_Osko__Recdef__Xtfl__wf__induct__1__1'  [59, 3]      (w:1, o:158, a:
% 0.89/1.29    1, s:1, b:0), 
% 0.89/1.29  'c_Set_Oinsert'  [61, 3]      (w:1, o:165, a:1, s:1, b:0), 
% 0.89/1.29  'c_COMBK'  [62, 3]      (w:1, o:166, a:1, s:1, b:0), 
% 0.89/1.29  'c_HOL_Ominus__class_Ominus'  [64, 3]      (w:1, o:167, a:1, s:1, b:0), 
% 0.89/1.29  'class_OrderedGroup_Oab__group__add'  [66, 1]      (w:1, o:87, a:1, s:1, b:
% 0.89/1.29    0), 
% 0.89/1.29  'c_Set_Oimage'  [70, 4]      (w:1, o:188, a:1, s:1, b:0), 
% 0.89/1.29  'c_HOL_Ouminus__class_Ouminus'  [71, 2]      (w:1, o:135, a:1, s:1, b:0), 
% 0.89/1.29  'c_Lattices_Olower__semilattice__class_Oinf'  [72, 3]      (w:1, o:168, a:1
% 0.89/1.29    , s:1, b:0), 
% 0.89/1.29  'class_Lattices_Oboolean__algebra'  [73, 1]      (w:1, o:88, a:1, s:1, b:0)
% 0.89/1.29    , 
% 0.89/1.29  'c_lessequals'  [74, 3]      (w:1, o:169, a:1, s:1, b:0), 
% 0.89/1.29  'class_Lattices_Olattice'  [77, 1]      (w:1, o:89, a:1, s:1, b:0), 
% 0.89/1.29  'class_Lattices_Olower__semilattice'  [78, 1]      (w:1, o:90, a:1, s:1, b:
% 0.89/1.29    0), 
% 0.89/1.29  'c_Wellfounded_Oacyclic'  [82, 2]      (w:1, o:136, a:1, s:1, b:0), 
% 0.89/1.29  'c_in'  [84, 3]      (w:1, o:170, a:1, s:1, b:0), 
% 0.89/1.29  'c_Product__Type_OSigma'  [87, 4]      (w:1, o:189, a:1, s:1, b:0), 
% 0.89/1.29  'class_Lattices_Odistrib__lattice'  [88, 1]      (w:1, o:91, a:1, s:1, b:0)
% 0.89/1.29    , 
% 0.89/1.29  'c_Relation_ODomain'  [89, 3]      (w:1, o:159, a:1, s:1, b:0), 
% 0.89/1.29  'c_Relation_ORange'  [90, 3]      (w:1, o:160, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Wellfounded__Xwf__induct__1__1'  [91, 3]      (w:1, o:
% 0.89/1.29    171, a:1, s:1, b:0), 
% 0.89/1.29  'c_Transitive__Closure_Ortrancl'  [92, 2]      (w:1, o:137, a:1, s:1, b:0)
% 0.89/1.29    , 
% 0.89/1.29  'class_OrderedGroup_Opordered__ab__group__add'  [93, 1]      (w:1, o:92, a:
% 0.89/1.29    1, s:1, b:0), 
% 0.89/1.29  'class_Orderings_Obot'  [94, 1]      (w:1, o:93, a:1, s:1, b:0), 
% 0.89/1.29  'c_Pair'  [95, 4]      (w:1, o:190, a:1, s:1, b:0), 
% 0.89/1.29  'c_Relation_Osym'  [97, 2]      (w:1, o:138, a:1, s:1, b:0), 
% 0.89/1.29  'class_Lattices_Obounded__lattice'  [98, 1]      (w:1, o:94, a:1, s:1, b:0)
% 0.89/1.29    , 
% 0.89/1.29  'c_Relation_Orefl__on'  [99, 3]      (w:1, o:161, a:1, s:1, b:0), 
% 0.89/1.29  'c_Relation_Otrans'  [101, 2]      (w:1, o:139, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Wellfounded__Xwf__def__1__1'  [103, 3]      (w:1, o:
% 0.89/1.29    172, a:1, s:1, b:0), 
% 0.89/1.29  'class_OrderedGroup_Ogroup__add'  [104, 1]      (w:1, o:95, a:1, s:1, b:0)
% 0.89/1.29    , 
% 0.89/1.29  'c_Relation_Oconverse'  [105, 3]      (w:1, o:162, a:1, s:1, b:0), 
% 0.89/1.29  'c_Relation_Ototal__on'  [107, 3]      (w:1, o:164, a:1, s:1, b:0), 
% 0.89/1.29  'c_Order__Relation_Ostrict__linear__order__on'  [108, 3]      (w:1, o:173
% 0.89/1.29    , a:1, s:1, b:0), 
% 0.89/1.29  'c_Relation_Orel__comp'  [111, 5]      (w:1, o:205, a:1, s:1, b:0), 
% 0.89/1.29  'class_OrderedGroup_Olordered__ab__group__add'  [112, 1]      (w:1, o:96
% 0.89/1.29    , a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Wellfounded__Xwf__induct__rule__1__1'  [113, 3]      
% 0.89/1.29    (w:1, o:174, a:1, s:1, b:0), 
% 0.89/1.29  'c_List_Osko__Recdef__Xcuts__eq__1__1'  [115, 6]      (w:1, o:211, a:1, s:1
% 0.89/1.29    , b:0), 
% 0.89/1.29  'c_Recdef_Ocut'  [116, 5]      (w:1, o:206, a:1, s:1, b:0), 
% 0.89/1.29  'c_Equiv__Relations_Oequiv'  [117, 3]      (w:1, o:175, a:1, s:1, b:0), 
% 0.89/1.29  'c_Relation_OId'  [118, 1]      (w:1, o:97, a:1, s:1, b:0), 
% 0.89/1.29  'c_Relation_Oirrefl'  [119, 2]      (w:1, o:140, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Transitive__Closure__XrtranclE__1__1'  [120, 4]      
% 0.89/1.29    (w:1, o:191, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Transitive__Closure__Xrtrancl__induct__1__1'  [121, 4
% 0.89/1.29    ]      (w:1, o:192, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Transitive__Closure__Xrtrancl__induct__1__2'  [123, 4
% 0.89/1.29    ]      (w:1, o:193, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Relation__XImageE__1__1'  [124, 5]      (w:1, o:207
% 0.89/1.29    , a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Wellfounded__Xacc__induct__rule__1__1'  [125, 3]      
% 0.89/1.29    (w:1, o:176, a:1, s:1, b:0), 
% 0.89/1.29  'c_Wellfounded_Oacc'  [126, 2]      (w:1, o:141, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Wellfounded__Xnot__acc__down__1__1'  [127, 3]      (w:
% 0.89/1.29    1, o:177, a:1, s:1, b:0), 
% 0.89/1.29  'c_Transitive__Closure_Otrancl'  [128, 2]      (w:1, o:142, a:1, s:1, b:0)
% 0.89/1.29    , 
% 0.89/1.29  'c_Relation_Oantisym'  [129, 2]      (w:1, o:143, a:1, s:1, b:0), 
% 0.89/1.29  'c_Relation_OId__on'  [130, 2]      (w:1, o:144, a:1, s:1, b:0), 
% 0.89/1.29  'v_sko__Transitive__Closure__Xrtrancl__Xcases__1'  [133, 3]      (w:1, o:
% 0.89/1.29    178, a:1, s:1, b:0), 
% 0.89/1.29  't_a'  [134, 0]      (w:1, o:55, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Transitive__Closure__Xconverse__rtrancl__induct__1__1'
% 0.89/1.29      [135, 4]      (w:1, o:194, a:1, s:1, b:0), 
% 0.89/1.29  'c_ATP__Linkup_Osko__Transitive__Closure__Xirrefl__trancl__rD__1__1'  [137
% 5.57/5.93    , 2]      (w:1, o:145, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Transitive__Closure__Xconverse__tranclE__1__1'  [138, 
% 5.57/5.93    4]      (w:1, o:195, a:1, s:1, b:0), 
% 5.57/5.93  'v_sko__Transitive__Closure__Xtrancl__Xcases__1'  [139, 3]      (w:1, o:179
% 5.57/5.93    , a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Transitive__Closure__XtranclE__1__1'  [140, 4]      
% 5.57/5.93    (w:1, o:198, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__Xrel__compEpair__1__1'  [141, 7]      (w:1
% 5.57/5.93    , o:213, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__XIdE__1__1'  [143, 2]      (w:1, o:146, a:1
% 5.57/5.93    , s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Wellfounded__Xwf__acc__iff__1__1'  [144, 2]      (w:1
% 5.57/5.93    , o:147, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Wellfounded__Xacc__wfI__1__1'  [145, 2]      (w:1, o:
% 5.57/5.93    148, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Product__Type__XSigma__mono__1__1'  [146, 5]      (w:1
% 5.57/5.93    , o:208, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__XId__onE__1__1'  [147, 3]      (w:1, o:180
% 5.57/5.93    , a:1, s:1, b:0), 
% 5.57/5.93  'v_r'  [148, 0]      (w:1, o:57, a:1, s:1, b:0), 
% 5.57/5.93  't_b'  [149, 0]      (w:1, o:58, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__Xirrefl__def__1__1'  [150, 2]      (w:1, o:
% 5.57/5.93    149, a:1, s:1, b:0), 
% 5.57/5.93  'c_Relation_Osingle__valued'  [151, 3]      (w:1, o:163, a:1, s:1, b:0), 
% 5.57/5.93  'c_Nitpick_Orefl_H'  [152, 2]      (w:1, o:150, a:1, s:1, b:0), 
% 5.57/5.93  'c_Nitpick_Osko__Nitpick__Xrefl_H__def__1__1'  [153, 2]      (w:1, o:151
% 5.57/5.93    , a:1, s:1, b:0), 
% 5.57/5.93  'v_a____'  [154, 0]      (w:1, o:59, a:1, s:1, b:0), 
% 5.57/5.93  'v_b____'  [155, 0]      (w:1, o:61, a:1, s:1, b:0), 
% 5.57/5.93  'tc_Arrow__Order__Mirabelle_Oalt'  [156, 0]      (w:1, o:62, a:1, s:1, b:0)
% 5.57/5.93    , 
% 5.57/5.93  'v_P____'  [158, 1]      (w:1, o:98, a:1, s:1, b:0), 
% 5.57/5.93  'v_a_H____'  [159, 0]      (w:1, o:60, a:1, s:1, b:0), 
% 5.57/5.93  'v_b_H____'  [160, 0]      (w:1, o:64, a:1, s:1, b:0), 
% 5.57/5.93  'v_P_H____'  [161, 1]      (w:1, o:99, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Transitive__Closure__XtranclD__1__1'  [162, 4]      
% 5.57/5.93    (w:1, o:196, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Transitive__Closure__XtranclD2__1__1'  [163, 4]      
% 5.57/5.93    (w:1, o:197, a:1, s:1, b:0), 
% 5.57/5.93  'class_Orderings_Olinorder'  [164, 1]      (w:1, o:100, a:1, s:1, b:0), 
% 5.57/5.93  'class_Orderings_Opreorder'  [166, 1]      (w:1, o:102, a:1, s:1, b:0), 
% 5.57/5.93  'class_Orderings_Oorder'  [167, 1]      (w:1, o:101, a:1, s:1, b:0), 
% 5.57/5.93  'class_HOL_Oord'  [171, 1]      (w:1, o:103, a:1, s:1, b:0), 
% 5.57/5.93  'v_sko__Wellfounded__Xacc__Xinduct__1'  [173, 2]      (w:1, o:152, a:1, s:1
% 5.57/5.93    , b:0), 
% 5.57/5.93  'c_split'  [174, 4]      (w:1, o:199, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Wellfounded__Xacc__induct__1__1'  [176, 3]      (w:1
% 5.57/5.93    , o:181, a:1, s:1, b:0), 
% 5.57/5.93  'v_sko__Wellfounded__Xacc__Xinducts__1'  [177, 2]      (w:1, o:153, a:1, s:
% 5.57/5.93    1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__XImage__iff__1__1'  [178, 5]      (w:1, o:
% 5.57/5.93    209, a:1, s:1, b:0), 
% 5.57/5.93  'c_Relation_Oinv__image'  [179, 4]      (w:1, o:187, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Wellfounded__Xwf__eq__minimal__1__1'  [181, 3]      
% 5.57/5.93    (w:1, o:182, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Wellfounded__XwfE__min__1__1'  [182, 3]      (w:1, o:
% 5.57/5.93    183, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Wellfounded__Xacc__Xintros__1__1'  [183, 3]      (w:1
% 5.57/5.93    , o:184, a:1, s:1, b:0), 
% 5.57/5.93  'c_Equiv__Relations_Ocongruent'  [185, 4]      (w:1, o:200, a:1, s:1, b:0)
% 5.57/5.93    , 
% 5.57/5.93  'c_Equiv__Relations_Ocongruent2'  [187, 6]      (w:1, o:212, a:1, s:1, b:0)
% 5.57/5.93    , 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__XRangeE__1__1'  [188, 4]      (w:1, o:201
% 5.57/5.93    , a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__XDomainE__1__1'  [190, 4]      (w:1, o:202
% 5.57/5.93    , a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__XDomain__iff__1__1'  [191, 4]      (w:1, o:
% 5.57/5.93    203, a:1, s:1, b:0), 
% 5.57/5.93  'c_ATP__Linkup_Osko__Relation__XRange__iff__1__1'  [192, 4]      (w:1, o:
% 5.57/5.93    204, a:1, s:1, b:0), 
% 5.57/5.93  'c_FunDef_Oin__rel'  [197, 5]      (w:1, o:210, a:1, s:1, b:0), 
% 5.57/5.93  'c_Arrow__Order__Mirabelle_Omktop'  [199, 2]      (w:1, o:154, a:1, s:1, b:
% 5.57/5.93    0), 
% 5.57/5.93  'c_Arrow__Order__Mirabelle_Omkbot'  [200, 2]      (w:1, o:155, a:1, s:1, b:
% 5.57/5.93    0), 
% 5.57/5.93  'v_sko__Arrow__Order__Mirabelle__Xcomplete__Lin__1'  [201, 2]      (w:1, o:
% 5.57/5.93    156, a:1, s:1, b:0), 
% 5.57/5.93  'v_F'  [202, 0]      (w:1, o:71, a:1, s:1, b:0), 
% 5.57/5.93  'v_Q____'  [203, 0]      (w:1, o:72, a:1, s:1, b:0), 
% 5.57/5.93  'c_Arrow__Order__Mirabelle_OProf'  [206, 0]      (w:1, o:73, a:1, s:1, b:0)
% 21.14/21.50    , 
% 21.14/21.50  'tc_Arrow__Order__Mirabelle_Oindi'  [207, 0]      (w:1, o:74, a:1, s:1, b:0
% 21.14/21.50    ), 
% 21.14/21.50  'c_Arrow__Order__Mirabelle_Ounanimity'  [208, 1]      (w:1, o:104, a:1, s:1
% 21.14/21.50    , b:0), 
% 21.14/21.50  'c_fequal'  [211, 3]      (w:1, o:185, a:1, s:1, b:0).
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Starting Search:
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    5290
% 21.14/21.50  Kept:         2000
% 21.14/21.50  Inuse:        198
% 21.14/21.50  Deleted:      7
% 21.14/21.50  Deletedinuse: 0
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    13169
% 21.14/21.50  Kept:         4064
% 21.14/21.50  Inuse:        336
% 21.14/21.50  Deleted:      11
% 21.14/21.50  Deletedinuse: 1
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    20579
% 21.14/21.50  Kept:         6068
% 21.14/21.50  Inuse:        398
% 21.14/21.50  Deleted:      73
% 21.14/21.50  Deletedinuse: 8
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    30507
% 21.14/21.50  Kept:         8287
% 21.14/21.50  Inuse:        528
% 21.14/21.50  Deleted:      76
% 21.14/21.50  Deletedinuse: 8
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    39821
% 21.14/21.50  Kept:         10304
% 21.14/21.50  Inuse:        570
% 21.14/21.50  Deleted:      80
% 21.14/21.50  Deletedinuse: 11
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    53580
% 21.14/21.50  Kept:         12316
% 21.14/21.50  Inuse:        622
% 21.14/21.50  Deleted:      83
% 21.14/21.50  Deletedinuse: 11
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    68442
% 21.14/21.50  Kept:         14326
% 21.14/21.50  Inuse:        630
% 21.14/21.50  Deleted:      83
% 21.14/21.50  Deletedinuse: 11
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    77823
% 21.14/21.50  Kept:         16495
% 21.14/21.50  Inuse:        653
% 21.14/21.50  Deleted:      84
% 21.14/21.50  Deletedinuse: 11
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    88832
% 21.14/21.50  Kept:         18593
% 21.14/21.50  Inuse:        711
% 21.14/21.50  Deleted:      86
% 21.14/21.50  Deletedinuse: 11
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying clauses:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    100664
% 21.14/21.50  Kept:         20646
% 21.14/21.50  Inuse:        812
% 21.14/21.50  Deleted:      414
% 21.14/21.50  Deletedinuse: 12
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    113041
% 21.14/21.50  Kept:         23285
% 21.14/21.50  Inuse:        888
% 21.14/21.50  Deleted:      418
% 21.14/21.50  Deletedinuse: 16
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    123397
% 21.14/21.50  Kept:         25321
% 21.14/21.50  Inuse:        917
% 21.14/21.50  Deleted:      422
% 21.14/21.50  Deletedinuse: 20
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    141001
% 21.14/21.50  Kept:         27327
% 21.14/21.50  Inuse:        951
% 21.14/21.50  Deleted:      430
% 21.14/21.50  Deletedinuse: 28
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    157277
% 21.14/21.50  Kept:         29778
% 21.14/21.50  Inuse:        967
% 21.14/21.50  Deleted:      430
% 21.14/21.50  Deletedinuse: 28
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    182485
% 21.14/21.50  Kept:         32777
% 21.14/21.50  Inuse:        977
% 21.14/21.50  Deleted:      430
% 21.14/21.50  Deletedinuse: 28
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    198926
% 21.14/21.50  Kept:         34807
% 21.14/21.50  Inuse:        1002
% 21.14/21.50  Deleted:      430
% 21.14/21.50  Deletedinuse: 28
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    224926
% 21.14/21.50  Kept:         36807
% 21.14/21.50  Inuse:        1010
% 21.14/21.50  Deleted:      443
% 21.14/21.50  Deletedinuse: 41
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    240619
% 21.14/21.50  Kept:         38869
% 21.14/21.50  Inuse:        1062
% 21.14/21.50  Deleted:      446
% 21.14/21.50  Deletedinuse: 44
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying clauses:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    261312
% 21.14/21.50  Kept:         41563
% 21.14/21.50  Inuse:        1116
% 21.14/21.50  Deleted:      988
% 21.14/21.50  Deletedinuse: 44
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    279762
% 21.14/21.50  Kept:         44017
% 21.14/21.50  Inuse:        1121
% 21.14/21.50  Deleted:      989
% 21.14/21.50  Deletedinuse: 45
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    293466
% 21.14/21.50  Kept:         46101
% 21.14/21.50  Inuse:        1146
% 21.14/21.50  Deleted:      990
% 21.14/21.50  Deletedinuse: 46
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    312565
% 21.14/21.50  Kept:         48342
% 21.14/21.50  Inuse:        1183
% 21.14/21.50  Deleted:      999
% 21.14/21.50  Deletedinuse: 52
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  Resimplifying inuse:
% 21.14/21.50  Done
% 21.14/21.50  
% 21.14/21.50  
% 21.14/21.50  Intermediate Status:
% 21.14/21.50  Generated:    328649
% 21.14/21.50  Kept:         50515
% 21.14/21.50  Inuse:        1206
% 21.14/21.50  Deleted:      1008
% 21.14/21.50  Deletedinuse: 54
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    346954
% 82.03/82.42  Kept:         52530
% 82.03/82.42  Inuse:        1255
% 82.03/82.42  Deleted:      1010
% 82.03/82.42  Deletedinuse: 56
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    360007
% 82.03/82.42  Kept:         54535
% 82.03/82.42  Inuse:        1297
% 82.03/82.42  Deleted:      1014
% 82.03/82.42  Deletedinuse: 60
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    382142
% 82.03/82.42  Kept:         57565
% 82.03/82.42  Inuse:        1306
% 82.03/82.42  Deleted:      1014
% 82.03/82.42  Deletedinuse: 60
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    401559
% 82.03/82.42  Kept:         60765
% 82.03/82.42  Inuse:        1316
% 82.03/82.42  Deleted:      1014
% 82.03/82.42  Deletedinuse: 60
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying clauses:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    416359
% 82.03/82.42  Kept:         63307
% 82.03/82.42  Inuse:        1326
% 82.03/82.42  Deleted:      1852
% 82.03/82.42  Deletedinuse: 60
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    430182
% 82.03/82.42  Kept:         65316
% 82.03/82.42  Inuse:        1359
% 82.03/82.42  Deleted:      1852
% 82.03/82.42  Deletedinuse: 60
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    441455
% 82.03/82.42  Kept:         67318
% 82.03/82.42  Inuse:        1386
% 82.03/82.42  Deleted:      1856
% 82.03/82.42  Deletedinuse: 63
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    461076
% 82.03/82.42  Kept:         69720
% 82.03/82.42  Inuse:        1409
% 82.03/82.42  Deleted:      1856
% 82.03/82.42  Deletedinuse: 63
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    474887
% 82.03/82.42  Kept:         71835
% 82.03/82.42  Inuse:        1435
% 82.03/82.42  Deleted:      1859
% 82.03/82.42  Deletedinuse: 66
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    493069
% 82.03/82.42  Kept:         74321
% 82.03/82.42  Inuse:        1460
% 82.03/82.42  Deleted:      1859
% 82.03/82.42  Deletedinuse: 66
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    503058
% 82.03/82.42  Kept:         76392
% 82.03/82.42  Inuse:        1495
% 82.03/82.42  Deleted:      1861
% 82.03/82.42  Deletedinuse: 68
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    517714
% 82.03/82.42  Kept:         78415
% 82.03/82.42  Inuse:        1528
% 82.03/82.42  Deleted:      1862
% 82.03/82.42  Deletedinuse: 69
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    530709
% 82.03/82.42  Kept:         80451
% 82.03/82.42  Inuse:        1554
% 82.03/82.42  Deleted:      1864
% 82.03/82.42  Deletedinuse: 70
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying clauses:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    553168
% 82.03/82.42  Kept:         84101
% 82.03/82.42  Inuse:        1569
% 82.03/82.42  Deleted:      2176
% 82.03/82.42  Deletedinuse: 70
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    567548
% 82.03/82.42  Kept:         86164
% 82.03/82.42  Inuse:        1599
% 82.03/82.42  Deleted:      2176
% 82.03/82.42  Deletedinuse: 70
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    582266
% 82.03/82.42  Kept:         88165
% 82.03/82.42  Inuse:        1628
% 82.03/82.42  Deleted:      2176
% 82.03/82.42  Deletedinuse: 70
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    611843
% 82.03/82.42  Kept:         91242
% 82.03/82.42  Inuse:        1659
% 82.03/82.42  Deleted:      2178
% 82.03/82.42  Deletedinuse: 72
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    632407
% 82.03/82.42  Kept:         93243
% 82.03/82.42  Inuse:        1671
% 82.03/82.42  Deleted:      2178
% 82.03/82.42  Deletedinuse: 72
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    646739
% 82.03/82.42  Kept:         95259
% 82.03/82.42  Inuse:        1693
% 82.03/82.42  Deleted:      2178
% 82.03/82.42  Deletedinuse: 72
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    661147
% 82.03/82.42  Kept:         97276
% 82.03/82.42  Inuse:        1718
% 82.03/82.42  Deleted:      2179
% 82.03/82.42  Deletedinuse: 73
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    684658
% 82.03/82.42  Kept:         101231
% 82.03/82.42  Inuse:        1734
% 82.03/82.42  Deleted:      2181
% 82.03/82.42  Deletedinuse: 75
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying clauses:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    700453
% 82.03/82.42  Kept:         103327
% 82.03/82.42  Inuse:        1759
% 82.03/82.42  Deleted:      2350
% 82.03/82.42  Deletedinuse: 75
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    722112
% 82.03/82.42  Kept:         105371
% 82.03/82.42  Inuse:        1809
% 82.03/82.42  Deleted:      2350
% 82.03/82.42  Deletedinuse: 75
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 82.03/82.42  Done
% 82.03/82.42  
% 82.03/82.42  
% 82.03/82.42  Intermediate Status:
% 82.03/82.42  Generated:    744853
% 82.03/82.42  Kept:         107471
% 82.03/82.42  Inuse:        1859
% 82.03/82.42  Deleted:      2350
% 82.03/82.42  Deletedinuse: 75
% 82.03/82.42  
% 82.03/82.42  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    770801
% 207.71/208.15  Kept:         109486
% 207.71/208.15  Inuse:        1915
% 207.71/208.15  Deleted:      2353
% 207.71/208.15  Deletedinuse: 78
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    785799
% 207.71/208.15  Kept:         111511
% 207.71/208.15  Inuse:        1939
% 207.71/208.15  Deleted:      2353
% 207.71/208.15  Deletedinuse: 78
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    801558
% 207.71/208.15  Kept:         113564
% 207.71/208.15  Inuse:        1964
% 207.71/208.15  Deleted:      2353
% 207.71/208.15  Deletedinuse: 78
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    824382
% 207.71/208.15  Kept:         117087
% 207.71/208.15  Inuse:        1974
% 207.71/208.15  Deleted:      2353
% 207.71/208.15  Deletedinuse: 78
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    854317
% 207.71/208.15  Kept:         119930
% 207.71/208.15  Inuse:        1989
% 207.71/208.15  Deleted:      2353
% 207.71/208.15  Deletedinuse: 78
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying clauses:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    868973
% 207.71/208.15  Kept:         122041
% 207.71/208.15  Inuse:        2019
% 207.71/208.15  Deleted:      2440
% 207.71/208.15  Deletedinuse: 80
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    877951
% 207.71/208.15  Kept:         124298
% 207.71/208.15  Inuse:        2044
% 207.71/208.15  Deleted:      2441
% 207.71/208.15  Deletedinuse: 81
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    903226
% 207.71/208.15  Kept:         126885
% 207.71/208.15  Inuse:        2064
% 207.71/208.15  Deleted:      2441
% 207.71/208.15  Deletedinuse: 81
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    923851
% 207.71/208.15  Kept:         130506
% 207.71/208.15  Inuse:        2074
% 207.71/208.15  Deleted:      2442
% 207.71/208.15  Deletedinuse: 82
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    945584
% 207.71/208.15  Kept:         134228
% 207.71/208.15  Inuse:        2084
% 207.71/208.15  Deleted:      2443
% 207.71/208.15  Deletedinuse: 83
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    955850
% 207.71/208.15  Kept:         136737
% 207.71/208.15  Inuse:        2114
% 207.71/208.15  Deleted:      2446
% 207.71/208.15  Deletedinuse: 86
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1015752
% 207.71/208.15  Kept:         144133
% 207.71/208.15  Inuse:        2133
% 207.71/208.15  Deleted:      2447
% 207.71/208.15  Deletedinuse: 86
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying clauses:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1070776
% 207.71/208.15  Kept:         150610
% 207.71/208.15  Inuse:        2138
% 207.71/208.15  Deleted:      3004
% 207.71/208.15  Deletedinuse: 86
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1095782
% 207.71/208.15  Kept:         154391
% 207.71/208.15  Inuse:        2148
% 207.71/208.15  Deleted:      3004
% 207.71/208.15  Deletedinuse: 86
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1154484
% 207.71/208.15  Kept:         161352
% 207.71/208.15  Inuse:        2158
% 207.71/208.15  Deleted:      3006
% 207.71/208.15  Deletedinuse: 88
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1212475
% 207.71/208.15  Kept:         167940
% 207.71/208.15  Inuse:        2163
% 207.71/208.15  Deleted:      3010
% 207.71/208.15  Deletedinuse: 92
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying clauses:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1233544
% 207.71/208.15  Kept:         171342
% 207.71/208.15  Inuse:        2168
% 207.71/208.15  Deleted:      3125
% 207.71/208.15  Deletedinuse: 93
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1252240
% 207.71/208.15  Kept:         176401
% 207.71/208.15  Inuse:        2169
% 207.71/208.15  Deleted:      3126
% 207.71/208.15  Deletedinuse: 94
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1274460
% 207.71/208.15  Kept:         179965
% 207.71/208.15  Inuse:        2171
% 207.71/208.15  Deleted:      3129
% 207.71/208.15  Deletedinuse: 95
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1295171
% 207.71/208.15  Kept:         183497
% 207.71/208.15  Inuse:        2176
% 207.71/208.15  Deleted:      3132
% 207.71/208.15  Deletedinuse: 98
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1302163
% 207.71/208.15  Kept:         185714
% 207.71/208.15  Inuse:        2182
% 207.71/208.15  Deleted:      3153
% 207.71/208.15  Deletedinuse: 100
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1307827
% 207.71/208.15  Kept:         187798
% 207.71/208.15  Inuse:        2192
% 207.71/208.15  Deleted:      3176
% 207.71/208.15  Deletedinuse: 103
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying clauses:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1334415
% 207.71/208.15  Kept:         190251
% 207.71/208.15  Inuse:        2198
% 207.71/208.15  Deleted:      8429
% 207.71/208.15  Deletedinuse: 104
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1342457
% 207.71/208.15  Kept:         192410
% 207.71/208.15  Inuse:        2218
% 207.71/208.15  Deleted:      8431
% 207.71/208.15  Deletedinuse: 106
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  Resimplifying inuse:
% 207.71/208.15  Done
% 207.71/208.15  
% 207.71/208.15  
% 207.71/208.15  Intermediate Status:
% 207.71/208.15  Generated:    1384692
% 207.71/208.15  Kept:         196155
% 207.71/208.15  Inuse:        2227
% 207.71/208.15  Deleted:      8433
% 207.71/208.15  Deletedinuse: 107
% 300.09/300.52  Cputime limit exceeded (core dumped)
%------------------------------------------------------------------------------