Ring isomorphisms in norm between Banach algebras of continuous complex-valued functions

Abstract

Let X and Y be compact Hausdorff spaces, and let C(X) and C(Y) denote the commutative Banach algebras of all continuous complex-valued functions on X and Y, respectively. We study bijective maps T from C(X) onto C(Y) which preserve the ring structure in the norm in the following sense: \[ \|T(f+g)\|=\|T(f)+T(g)\|, \|T(fg)\|=\|T(f)T(g)\| (f,g∈ C(X)). \] Our main objective is to clarify whether such maps must necessarily be induced by homeomorphisms between the underlying spaces. Under the additional assumption that T(f)=T(f) for f∈ C(X), we prove that T is a real-linear isometry. As a consequence, we obtain a concrete representation of such maps as weighted composition operators.