let C, D be Category; for T being Functor of C,D
for f, g being Morphism of C st dom g = cod f holds
( dom (T . g) = cod (T . f) & T . (g * f) = (T . g) * (T . f) )
let T be Functor of C,D; for f, g being Morphism of C st dom g = cod f holds
( dom (T . g) = cod (T . f) & T . (g * f) = (T . g) * (T . f) )
let f, g be Morphism of C; ( dom g = cod f implies ( dom (T . g) = cod (T . f) & T . (g * f) = (T . g) * (T . f) ) )
assume A1:
dom g = cod f
; ( dom (T . g) = cod (T . f) & T . (g * f) = (T . g) * (T . f) )
then A2:
( the Comp of C . g,f = g * f & [g,f] in dom the Comp of C )
by Def8, Th41;
A3: id (dom (T . g)) =
T . (id (cod f))
by A1, Def18
.=
id (cod (T . f))
by Def18
;
hence
dom (T . g) = cod (T . f)
by Th45; T . (g * f) = (T . g) * (T . f)
the Comp of D . (T . g),(T . f) = (T . g) * (T . f)
by A3, Th41, Th45;
hence
T . (g * f) = (T . g) * (T . f)
by A2, Def18; verum