let A, B be Category; :: thesis: for F2, F3, F, F1 being Functor of A,B
for t being natural_transformation of F,F1
for t9 being natural_transformation of F2,F3
for f, g being Morphism of (Functors (A,B)) st f = [[F,F1],t] & g = [[F2,F3],t9] holds
( [g,f] in dom the Comp of (Functors (A,B)) iff F1 = F2 )
let F2, F3, F, F1 be Functor of A,B; :: thesis: for t being natural_transformation of F,F1
for t9 being natural_transformation of F2,F3
for f, g being Morphism of (Functors (A,B)) st f = [[F,F1],t] & g = [[F2,F3],t9] holds
( [g,f] in dom the Comp of (Functors (A,B)) iff F1 = F2 )
let t be natural_transformation of F,F1; :: thesis: for t9 being natural_transformation of F2,F3
for f, g being Morphism of (Functors (A,B)) st f = [[F,F1],t] & g = [[F2,F3],t9] holds
( [g,f] in dom the Comp of (Functors (A,B)) iff F1 = F2 )
let t9 be natural_transformation of F2,F3; :: thesis: for f, g being Morphism of (Functors (A,B)) st f = [[F,F1],t] & g = [[F2,F3],t9] holds
( [g,f] in dom the Comp of (Functors (A,B)) iff F1 = F2 )
let f, g be Morphism of (Functors (A,B)); :: thesis: ( f = [[F,F1],t] & g = [[F2,F3],t9] implies ( [g,f] in dom the Comp of (Functors (A,B)) iff F1 = F2 ) )
assume that
A1: f = [[F,F1],t] and
A2: g = [[F2,F3],t9] ; :: thesis: ( [g,f] in dom the Comp of (Functors (A,B)) iff F1 = F2 )
thus ( [g,f] in dom the Comp of (Functors (A,B)) implies F1 = F2 ) :: thesis: ( F1 = F2 implies [g,f] in dom the Comp of (Functors (A,B)) ) A5: cod f = F1 by A1, Th39;
dom g = F2 by A2, Th39;
hence ( F1 = F2 implies [g,f] in dom the Comp of (Functors (A,B)) ) by A5, Def18; :: thesis: verum