Higher order $\mathcal{S}^{p}$-differentiability: The unitary case
Abstract
Consider the set of unitary operators on a complex separable Hilbert space , denoted as . Consider . We establish that a function defined on the unit circle is times continuously Fr\'echet -differentiable at every point in if and only if . Take a function such that the function takes values in and is times continuously -differentiable on . Consequently, for , we prove that is times continuously G\^ateaux -differentiable at . We provide explicit expressions for both types of derivatives of in terms of multiple operator integrals. In the domain of unitary operators, these results closely follow the th order successes for self-adjoint operators achieved by the second author, Le Merdy, Skripka, and Sukochev. Furthermore, as for application, we derive a formula and -estimates for operator Taylor remainders for a broader class of functions. Our results extend those of Peller, Potapov, Skripka, Sukochev and Tomskova.
Cite
@article{arxiv.2404.08253,
title = {Higher order $\mathcal{S}^{p}$-differentiability: The unitary case},
author = {Arup Chattopadhyay and Clément Coine and Saikat Giri and Chandan Pradhan},
journal= {arXiv preprint arXiv:2404.08253},
year = {2024}
}
Comments
Addressed referee's comments. Appear in the Journal of Spectral Theory