Lipschitz functions of perturbed operators

Abstract

We prove that if f is a Lipschitz function on , A and B are self-adjoint operators such that rank (A-B)=1, then f(A)-f(B) belongs to the weak space S1,, i.e., sj(A-B) const (1+j)-1. We deduce from this result that if A-B belongs to the trace class S1 and f is Lipschitz, then f(A)-f(B)∈S, i.e., Σj=0nsj(f(A)-f(B))(2+n). We also obtain more general results about the behavior of double operator integrals of the form Q=(f(x)-f(y))(x-y)-1dE1(x)TdE2(y), where E1 and E2 are spectral measures. We show that if T∈S1, then Q∈S and if T=1, then Q∈S1,. Finally, if T belongs to the Matsaev ideal Sω, then Q is a compact operator.