Noncommutative $L_p$-differentiability and trace formulae

TL;DR

This paper proves higher-order differentiability of operator functions in noncommutative $L_p$-spaces and extends trace formulae to broader classes of perturbations and functions, advancing the understanding of noncommutative analysis.

Contribution

It extends previous results on $L_p$-differentiability to higher orders and broader function classes, and generalizes trace formulae to less restrictive perturbations.

Findings

Proved $n$-times differentiability of $f(a+tb)-f(a)$ in $L_p$-norm.

Extended trace formulae to unbounded perturbations in noncommutative $L_p$-spaces.

Broadened class of functions for which trace formulae hold.

Abstract

Let $\mathcal{M}$ be a semifinite von Neumann algebra equipped with a normal faithful semifinite trace $\tau$, and let $L_p(\mathcal{M})$ denote the associated noncommutative $L_p$-space for $1<p<\infty$. Let $n\in\mathbb{N}$ and let $a, b$ be $\tau$-measurable self-adjoint operators such that $b\in L_p(\mathcal{M})\cap L_{np}(\mathcal{M})$. For a function $f\in C^n(\mathbb{R})$ whose derivatives $f^{(k)}$ are bounded for $1\le k\le n$, we prove that the map $\phi:t\in\mathbb{R}\mapsto f(a+tb)-f(a)$ is $n$-times differentiable in the $\|\cdot\|_{L_p}$-norm. This strengthens the corresponding result of de Pagter and Sukochev for $p\neq 2$ and extends it to higher-order derivatives. In addition, if $f^{(n)}\in C_0(\mathbb{R})$ or $b\in \mathcal{M}$, then $\phi^{(n)}$ is continuous on $\mathbb{R}$. Consequently, we extend the Potapov--Skripka--Sukochev higher-order trace formula from bounded $L_n$-perturbations to not necessarily bounded perturbations in $L_n(\mathcal{M})\cap L_{n^{2}}(\mathcal{M})$. Moreover, we show that this trace formula holds for a broader class of admissible functions than the classes previously considered in the literature.