the ObjectMap of F is Covariant by Def12;
then consider f being Function of the carrier of C1, the carrier of C2 such that
A1: the ObjectMap of F = [:f,f:] ;
the ObjectMap of G is Contravariant by Def13;
then consider g being Function of the carrier of C2, the carrier of C3 such that
A2: the ObjectMap of G = ~ [:g,g:] ;
take g * f ; :: according to FUNCTOR0:def 2,FUNCTOR0:def 13 :: thesis: the ObjectMap of (G * F) = ~ [:(g * f),(g * f):]
thus the ObjectMap of (G * F) = the ObjectMap of G * the ObjectMap of F by Def36
.= ~ ([:g,g:] * [:f,f:]) by A1, A2, ALTCAT_2:3
.= ~ [:(g * f),(g * f):] by FUNCT_3:71 ; :: thesis: verum