On character space of the algebra of BSE-functions

Abstract

Suppose that A is a semi-simple and commutative Banach algebra. In this paper we try to characterize the character space of the Banach algebra CBSE((A)) consisting of all BSE-functions on (A) where (A) denotes the character space of A. Indeed, in the case that A=C0(X) where X is a non-empty locally compact Hausdroff space, we give a complete characterization of (CBSE((A))) and in the general case we give a partial answer. Also, using the Fourier algebra, we show that CBSE((A)) is not a C*-algebra in general. Finally for some subsets E of A*, we define the subspace of BSE-like functions on (A) E and give a nice application of this space related to Goldstine's theorem.