A trace formula for functions of contractions and analytic operator Lipschitz functions

Abstract

In this note we study the problem of evaluating the trace of f(T)-f(R), where T and R are contractions on Hilbert space with trace class difference, i.e., T-R∈S1 and f is a function analytic in the unit disk D. It is well known that if f is an operator Lipschitz function analytic in D, then f(T)-f(R)∈S1. The main result of the note says that there exists a function (a spectral shift function) on the unit circle T of class L1( T) such that the following trace formula holds: trace(f(T)-f(R))=∫ T f'(ζ)(ζ)\,dζ, whenever T and R are contractions with T-R∈S1 and f is an operator Lipschitz function analytic in D.