let V be non empty set ; for C being Category
for a being Object of C st Hom C c= V holds
(hom?? V,C) ?- (a opp ) = hom?- V,a
let C be Category; for a being Object of C st Hom C c= V holds
(hom?? V,C) ?- (a opp ) = hom?- V,a
let a be Object of C; ( Hom C c= V implies (hom?? V,C) ?- (a opp ) = hom?- V,a )
assume A1:
Hom C c= V
; (hom?? V,C) ?- (a opp ) = hom?- V,a
thus (hom?? V,C) ?- (a opp ) =
(curry (hom?? V,C)) . ((id a) opp )
by OPPCAT_1:21
.=
(curry (hom?? V,C)) . (id a)
by OPPCAT_1:def 4
.=
(curry (hom?? C)) . (id a)
by A1, Def28
.=
hom?- a
by Th57
.=
hom?- V,a
by A1, Def26
; verum