English

Functions of perturbed normal operators

Functional Analysis 2010-03-30 v1 Classical Analysis and ODEs Complex Variables Spectral Theory

Abstract

In \cite{Pe1}, \cite{Pe2}, \cite{AP1}, \cite{AP2}, and \cite{AP3} sharp estimates for f(A)f(B)f(A)-f(B) were obtained for self-adjoint operators AA and BB and for various classes of functions ff on the real line R\R. In this note we extend those results to the case of functions of normal operators. We show that if ff belongs to the H\"older class \L\a(R2)\L_\a(\R^2), 0<\a<10<\a<1, of functions of two variables, and N1N_1 and N2N_2 are normal operators, then f(N1)f(N2)\constf\L\aN1N2\a\|f(N_1)-f(N_2)\|\le\const\|f\|_{\L_\a}\|N_1-N_2\|^\a. We obtain a more general result for functions in the space \L\o(R2)={f:f(\z1)f(\z2)\const\o(\z1\z2)}\L_\o(\R^2)=\big\{f: |f(\z_1)-f(\z_2)|\le\const\o(|\z_1-\z_2|)\big\} for an arbitrary modulus of continuity \o\o. We prove that if ff belongs to the Besov class B\be11(R2)B_{\be1}^1(\R^2), then it is operator Lipschitz, i.e., f(N1)f(N2)\constfB\be11N1N2\|f(N_1)-f(N_2)\|\le\const\|f\|_{B_{\be1}^1}\|N_1-N_2\|. We also study properties of f(N1)f(N2)f(N_1)-f(N_2) in the case when f\L\a(R2)f\in\L_\a(\R^2) and N1N2N_1-N_2 belongs to the Schatten-von Neuman class \bSp\bS_p.

Keywords

Cite

@article{arxiv.1003.5286,
  title  = {Functions of perturbed normal operators},
  author = {Aleksei Aleksandrov and Vladimir Peller and Denis Potapov and Fedor Sukochev},
  journal= {arXiv preprint arXiv:1003.5286},
  year   = {2010}
}

Comments

6 pages

R2 v1 2026-06-21T15:03:22.563Z