Completely bounded isomorphisms of operator algebras and similarity to complete isometries

Abstract

A well-known theorem of Paulsen says that if A is a unital operator algebra and φ:A B(H) is a unital completely bounded homomorphism, then φ is similar to a completely contractive map φ'. Motivated by classification problems for Hilbert space contractions, we are interested in making the inverse φ'-1 completely contractive as well whenever the map φ has a completely bounded inverse. We show that there exist invertible operators X and Y such that the map XaX-1 Yφ(a)Y-1 is completely contractive and is "almost" isometric on any given finite set of elements from A with non-zero spectrum. Although the map cannot be taken to be completely isometric in general, we show that this can be achieved if A is completely boundedly isomorphic to either a C*-algebra or a uniform algebra. In the case of quotient algebras of H∞, we translate these conditions in function theoretic terms and relate them to the classical Carleson condition.