let A, B be category; for F being covariant Functor of A,B
for o1, o2 being Object of A st o1,o2 are_iso holds
F . o1,F . o2 are_iso
let F be covariant Functor of A,B; for o1, o2 being Object of A st o1,o2 are_iso holds
F . o1,F . o2 are_iso
let o1, o2 be Object of A; ( o1,o2 are_iso implies F . o1,F . o2 are_iso )
assume A1:
o1,o2 are_iso
; F . o1,F . o2 are_iso
then consider a being Morphism of o1,o2 such that
A2:
a is iso
;
A3:
( <^o1,o2^> <> {} & <^o2,o1^> <> {} )
by A1;
hence
( <^(F . o1),(F . o2)^> <> {} & <^(F . o2),(F . o1)^> <> {} )
by FUNCTOR0:def 18; ALTCAT_3:def 6 ex b1 being M3(<^(F . o1),(F . o2)^>) st b1 is iso
take
F . a
; F . a is iso
thus
F . a is iso
by A3, A2, Th20; verum