Connecting H∞-functional calculus and isometric dilations for commuting families of RittE operators

Abstract

Let (T1,…,Td) be a commuting d-tuple of RittE operators on some UMD Banach space X. We show that (T1,…,Td) admits a bounded H∞-functional calculus if and only if Tk is an R-RittE operator for every k=1,…,d, and the d-tuple (T1,…,Td) admits an isometric dilation (U1,…,Ud) on some UMD Banach space Y such that (U1,…,Ud) is polynomially bounded. In the case where X further possesses property (α), we establish other characterizations of the H∞-functional calculus property for (T1,…,Td) in terms of isometric dilations.