Abstract
In 1961, Wang showed that if.. is the commutative C*- algebra C-0(X) with.. a locally compact Hausdorff space, then M(C-0(X)) congruent to C-b(X). Later, this type of characterization ofmultipliers of spaces of continuous scalar- valued functions has also been generalized to algebras and modules of continuous vector- valued functions by several authors. In this paper, we obtain further extension of these results by showing that Hom(C0(X,A))(C-0(X,E),C-0(X,F)) similar or equal to C-s,C-b(X, Hom(A)(E,F)), where E and F are p-normed spaces which are also essential isometric left A-modules with.. being a certain commutative F-algebra, not necessarily locally convex. Our results unify and extend several known results in the literature.