The Ritt property of subordinated operators in the group case

Abstract

Let G be a locally compact abelian group, let be a regular probability measure on G, let X be a Banach space, let π G B(X) be a bounded strongly continuous representation. Consider the average (or subordinated) operator S(π,) = ∫G π(t)\,d(t)\, X X. We show that if X is a UMD Banach lattice and has bounded angular ratio, then S(π,) is a Ritt operator with a bounded H∞ functional calculus. Next we show that if is the square of a symmetric probability measure and X is K-convex, then S(π,) is a Ritt operator. We further show that this assertion is false on any non K-convex space X.