Higher order differentiability of operator functions in Schatten norms

Abstract

We establish the following results on higher order Sp-differentiability, 1<p<∞, of the operator function arising from a continuous scalar function f and self-adjoint operators defined on a fixed separable Hilbert space: (i) f is n times continuously Fr\'echet Sp-differentiable at every bounded self-adjoint operator if and only if f∈ Cn(R); (ii) if f',…,f(n-1)∈ Cb(R) and f(n)∈ C0(R), then f is n times continuously Fr\'echet Sp-differentiable at every self-adjoint operator; (iii) if f',…,f(n)∈ Cb(R), then f is n-1 times continuously Fr\'echet Sp-differentiable and n times G\ateaux Sp-differentiable at every self-adjoint operator. We also prove that if f∈ B∞1n(R) B∞11(R), then f is n times continuously Fr\'echet Sq-differentiable, 1 q<∞, at every self-adjoint operator. These results generalize and extend analogous results of [10] to arbitrary n and unbounded operators as well as substantially extend the results of [2,4,19] on higher order Sp-differentiability of f in a certain Wiener class, G\ateaux S2-differentiability of f∈ Cn(R) with f',…,f(n)∈ Cb(R), and G\ateaux Sq-differentiability of f in the intersection of the Besov classes B∞1n(R) B∞11(R). As an application, we extend Sp-estimates for operator Taylor remainders to a broad set of symbols. Finally, we establish explicit formulas for Fr\'echet differentials and G\ateaux derivatives.