English

Lipschitz Estimates and an application to trace formulae

Functional Analysis 2025-08-27 v4

Abstract

In this note, we provide an elementary proof for the expression of f(U)f(V)f(U)-f(V) in the form of a double operator integral for every Lipschitz function ff on the unit circle \cir\cir and for a pair of unitary operators (U,V)(U,V) with UVS2(\hilh)U-V\in\mathcal{S}_{2}(\hilh) (the Hilbert-Schmidt class). As a consequence, we obtain the Schatten 22-Lipschitz estimate f(U)f(V)2f\lip(\cir)UV2\|f(U)-f(V)\|_2\leq \|f\|_{\lip(\cir)}\|U-V\|_2 for all Lipschitz functions f:\cir\Cf:\cir\to\C. Moreover, we develop an approach to the operator Lipschitz estimate for a pair of contractions with the assumption that one of them is a strict contraction, which significantly extends the class of functions from results known earlier. More specifically, for each p(1,)p\in(1,\infty) and for every pair of contractions (T0,T1)(T_0,T_1) with T0<1\|T_0\|<1, there exists a constant df,p,T0>0d_{f, p,T_0}>0 such that f(T1)f(T0)pdf,p,T0T1T0p\|f(T_1)-f(T_0)\|_p\leq d_{f,p, T_0}\|T_1-T_0\|_p for all Lipschitz functions on \cir\cir. Using our Lipschitz estimates, we establish a modified Krein trace formula applicable to a specific category of pairs of contractions featuring Hilbert-Schmidt perturbations.

Keywords

Cite

@article{arxiv.2312.08706,
  title  = {Lipschitz Estimates and an application to trace formulae},
  author = {Tirthankar Bhattacharyya and Arup Chattopadhyay and Saikat Giri and Chandan Pradhan},
  journal= {arXiv preprint arXiv:2312.08706},
  year   = {2025}
}

Comments

Minor revision. To appear in the Banach Journal of Mathematical Analysis

R2 v1 2026-06-28T13:50:33.958Z