let X be non empty set ; :: thesis: for Y being ComplexNormSpace
for f, g, h being VECTOR of (C_VectorSpace_of_BoundedFunctions X,Y)
for f9, g9, h9 being bounded Function of X,the carrier of Y st f9 = f & g9 = g & h9 = h holds
( h = f + g iff for x being Element of X holds h9 . x = (f9 . x) + (g9 . x) )
let Y be ComplexNormSpace; :: thesis: for f, g, h being VECTOR of (C_VectorSpace_of_BoundedFunctions X,Y)
for f9, g9, h9 being bounded Function of X,the carrier of Y st f9 = f & g9 = g & h9 = h holds
( h = f + g iff for x being Element of X holds h9 . x = (f9 . x) + (g9 . x) )
let f, g, h be VECTOR of (C_VectorSpace_of_BoundedFunctions X,Y); :: thesis: for f9, g9, h9 being bounded Function of X,the carrier of Y st f9 = f & g9 = g & h9 = h holds
( h = f + g iff for x being Element of X holds h9 . x = (f9 . x) + (g9 . x) )
A1: C_VectorSpace_of_BoundedFunctions X,Y is Subspace of ComplexVectSpace X,Y by Th8, CSSPACE:13;
then reconsider f1 = f as VECTOR of (ComplexVectSpace X,Y) by CLVECT_1:30;
reconsider h1 = h as VECTOR of (ComplexVectSpace X,Y) by A1, CLVECT_1:30;
reconsider g1 = g as VECTOR of (ComplexVectSpace X,Y) by A1, CLVECT_1:30;
let f9, g9, h9 be bounded Function of X,the carrier of Y; :: thesis: ( f9 = f & g9 = g & h9 = h implies ( h = f + g iff for x being Element of X holds h9 . x = (f9 . x) + (g9 . x) ) )
assume A2: ( f9 = f & g9 = g & h9 = h ) ; :: thesis: ( h = f + g iff for x being Element of X holds h9 . x = (f9 . x) + (g9 . x) )
hence ( h = f + g iff for x being Element of X holds h9 . x = (f9 . x) + (g9 . x) ) by A3; :: thesis: verum