Functions of operators under perturbations of class p

Abstract

This is a continuation of our paper AP2. We prove that for functions f in the H\"older class () and 1<p<, the operator f(A)-f(B) belongs to p/, whenever A and B are self-adjoint operators with A-B∈p. We also obtain sharp estimates for the Schatten--von Neumann norms \|f(A)-f(B)\|_p/ in terms of \|A-B\|_p and establish similar results for other operator ideals. We also estimate Schatten--von Neumann norms of higher order differences Σj=0m(-1)m-j(m)f(A+jK). We prove that analogous results hold for functions on the unit circle and unitary operators and for analytic functions in the unit disk and contractions. Then we find necessary conditions on f for f(A)-f(B) to belong to q under the assumption that A-B∈p. We also obtain Schatten--von Neumann estimates for quasicommutators f(A)Q-Qf(B), and introduce a spectral shift function and find a trace formula for operators of the form f(A-K)-2f(A)+f(A+K).