let T be non empty transitive RelStr ; :: thesis: for S being non empty full SubRelStr of T
for X being Subset of S holds
( S inherits_sup_of X,T iff ( ex_sup_of X,T implies ( ex_sup_of X,S & sup X = "\/" X,T ) ) )
let S be non empty full SubRelStr of T; :: thesis: for X being Subset of S holds
( S inherits_sup_of X,T iff ( ex_sup_of X,T implies ( ex_sup_of X,S & sup X = "\/" X,T ) ) )
let X be Subset of S; :: thesis: ( S inherits_sup_of X,T iff ( ex_sup_of X,T implies ( ex_sup_of X,S & sup X = "\/" X,T ) ) )
hereby :: thesis: ( ( ex_sup_of X,T implies ( ex_sup_of X,S & sup X = "\/" X,T ) ) implies S inherits_sup_of X,T )
assume that A1:
S inherits_sup_of X,
T
and A2:
ex_sup_of X,
T
;
:: thesis: ( ex_sup_of X,S & sup X = "\/" X,T )
"\/" X,
T in the
carrier of
S
by A1, A2, Def6;
hence
(
ex_sup_of X,
S &
sup X = "\/" X,
T )
by A2, YELLOW_0:65;
:: thesis: verum
end;
assume A3:
( ex_sup_of X,T implies ( ex_sup_of X,S & sup X = "\/" X,T ) )
; :: thesis: S inherits_sup_of X,T
assume
ex_sup_of X,T
; :: according to YELLOW16:def 6 :: thesis: "\/" X,T in the carrier of S
hence
"\/" X,T in the carrier of S
by A3; :: thesis: verum