On two refinements of the bounded weak approximate identities

Abstract

Let A be a commutative Banach algebra with non-empty character space (A). In this paper, we change the concepts of convergence and boundedness in the classical notion of bounded approximate identity. This work give us a new kind of approximate identity between bounded approximate identity and bounded weak approximate identity. More precisely, a net \eα\ in A is a c-w approximate identity if for each a∈ A, the Gel'fand transform of eαa tends to the Gel'fand transform of a in the compact-open topology and we say \eα\ is weakly bounded if the image of \eα\ under the Gel'fand transform is bounded in C0((A)).