set L = LKer f;
set vq = VectQuot V,(LKer f);
let f1, f2 be additiveSAF homogeneousSAF Form of (VectQuot V,(LKer f)),W; :: thesis: ( ( for A being Vector of
for w being Vector of
for v being Vector of st A = v + (LKer f) holds
f1 . A,w = f . v,w ) & ( for A being Vector of
for w being Vector of
for v being Vector of st A = v + (LKer f) holds
f2 . A,w = f . v,w ) implies f1 = f2 )
assume that
A13: for A being Vector of
for w being Vector of
for a being Vector of st A = a + (LKer f) holds
f1 . A,w = f . a,w and
A14: for A being Vector of
for w being Vector of
for a being Vector of st A = a + (LKer f) holds
f2 . A,w = f . a,w ; :: thesis: f1 = f2
now
let A be Vector of ; :: thesis: for w being Vector of holds f1 . A,w = f2 . A,w
let w be Vector of ; :: thesis: f1 . A,w = f2 . A,w
consider a being Vector of such that
A15: A = a + (LKer f) by VECTSP10:23;
thus f1 . A,w = f . a,w by A13, A15
.= f2 . A,w by A14, A15 ; :: thesis: verum
end;
hence f1 = f2 by BINOP_1:2; :: thesis: verum