Vector valued Beurling algebra analogues of Wiener's Theorem

Abstract

Let 0<p≤ 1, ω be a weight on Z, and let A be a unital Banach algebra. If f is a continuous function from the unit circle T to A such that Σn∈ Z \| f(n)\|p ω(n)p<∞ and f(z) is left invertible for all z ∈ T, then there is a weight on Z and a continuous function g: T A such that 1≤ ≤ ω, is constant if and only if ω is constant, g is a left inverse of f and Σn∈ Z\| g(n)\|p(n)p<∞. We shall obtain a similar result when ω is an almost monotone algebra weight and 1<p<∞. We shall obtain an analogue of this result on the real line. We shall apply these results to obtain p-power weighted analogues of the results of off diagonal decay of infinite matrices of operators.