Noncommutative Lp-differentiability and trace formulae

Abstract

Let M be a semifinite von Neumann algebra equipped with a normal faithful semifinite trace τ, and let Lp(M) denote the associated noncommutative Lp-space for 1<p<∞. Let n∈N and let a, b be τ-measurable self-adjoint operators such that b∈ Lp(M) Lnp(M). For a function f∈ Cn(R) whose derivatives f(k) are bounded for 1 k n, we prove that the map φ:t∈R f(a+tb)-f(a) is n-times differentiable in the \|·\|Lp-norm. This strengthens the corresponding result of de Pagter and Sukochev for p≠ 2 and extends it to higher-order derivatives. In addition, if f(n)∈ C0(R) or b∈ M, then φ(n) is continuous on R. Consequently, we extend the Potapov--Skripka--Sukochev higher-order trace formula from bounded Ln-perturbations to not necessarily bounded perturbations in Ln(M) Ln2(M). Moreover, we show that this trace formula holds for a broader class of admissible functions than the classes previously considered in the literature.