On approximation of homomorphisms of algebras of entire functions on Banach spaces

Abstract

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It is known due to R. Aron, B. Cole and T. Gamelin that every complex homomorphism of the algebra of entire functions of bounded type on a Banach space $X$ can be approximated in some sense by a net of point valued homomorphism. In this paper we consider the question about a generalization of this result for the case of homomorphisms to any commutative Banach algebra $A.$ We obtained some positive results if $A$ is the algebra of uniformly continuous analytic functions on the unit ball of $X.$

Keywords

• analytic functions on banach space
• homomorphisms of algebras of analytic functions
• approximation property