let X, X1, X2 be set ; :: thesis: for Y, Y1, Y2 being complex-functions-membered set
for f being PartFunc of X,Y
for f1 being PartFunc of X1,Y1
for f2 being PartFunc of X2,Y2 holds (f <##> f1) <##> f2 = f <##> (f1 <##> f2)
let Y, Y1, Y2 be complex-functions-membered set ; :: thesis: for f being PartFunc of X,Y
for f1 being PartFunc of X1,Y1
for f2 being PartFunc of X2,Y2 holds (f <##> f1) <##> f2 = f <##> (f1 <##> f2)
let f be PartFunc of X,Y; :: thesis: for f1 being PartFunc of X1,Y1
for f2 being PartFunc of X2,Y2 holds (f <##> f1) <##> f2 = f <##> (f1 <##> f2)
let f1 be PartFunc of X1,Y1; :: thesis: for f2 being PartFunc of X2,Y2 holds (f <##> f1) <##> f2 = f <##> (f1 <##> f2)
let f2 be PartFunc of X2,Y2; :: thesis: (f <##> f1) <##> f2 = f <##> (f1 <##> f2)
set f3 = f <##> f1;
set f4 = f1 <##> f2;
A1: dom ((f <##> f1) <##> f2) = (dom (f <##> f1)) /\ (dom f2) by Def47;
A2: dom (f <##> (f1 <##> f2)) = (dom f) /\ (dom (f1 <##> f2)) by Def47;
( dom (f <##> f1) = (dom f) /\ (dom f1) & dom (f1 <##> f2) = (dom f1) /\ (dom f2) ) by Def47;
hence A3: dom ((f <##> f1) <##> f2) = dom (f <##> (f1 <##> f2)) by A1, A2, XBOOLE_1:16; :: according to FUNCT_1:def 11 :: thesis: for b₁ being object holds
( not b₁ in dom ((f <##> f1) <##> f2) or ((f <##> f1) <##> f2) . b₁ = (f <##> (f1 <##> f2)) . b₁ )
let x be object ; :: thesis: ( not x in dom ((f <##> f1) <##> f2) or ((f <##> f1) <##> f2) . x = (f <##> (f1 <##> f2)) . x )
assume A4: x in dom ((f <##> f1) <##> f2) ; :: thesis: ((f <##> f1) <##> f2) . x = (f <##> (f1 <##> f2)) . x
then A5: x in dom (f1 <##> f2) by A2, A3, XBOOLE_0:def 4;
A6: x in dom (f <##> f1) by A1, A4, XBOOLE_0:def 4;
thus ((f <##> f1) <##> f2) . x = ((f <##> f1) . x) (#) (f2 . x) by A4, Def47
.= ((f . x) (#) (f1 . x)) (#) (f2 . x) by A6, Def47
.= (f . x) (#) ((f1 . x) (#) (f2 . x)) by RFUNCT_1:9
.= (f . x) (#) ((f1 <##> f2) . x) by A5, Def47
.= (f <##> (f1 <##> f2)) . x by A3, A4, Def47 ; :: thesis: verum