Perturbation theory and higher order Sp-differentiability of operator functions

Abstract

We establish, for 1 < p < ∞, higher order Sp-differentiability results of the function : t∈ R f(A+tK) - f(A) for selfadjoint operators A and K on a separable Hilbert space H with K element of the Schatten class Sp(H) and f n-times differentiable on R. We prove that if either A and f(n) are bounded or f(i), 1 ≤ i ≤ n are bounded, is n-times differentiable on R in the Sp-norm with bounded nth derivative. If f∈ Cn(R) with bounded f(n), we prove that is n-times continuously differentiable on R. We give explicit formulas for the derivatives of , in terms of multiple operator integrals. As for application, we establish a formula and Sp-estimates for operator Taylor remainders for a more extensive class of functions. These results are the nth order analogue of the results of KPSS. They also extend the results of CLSS from S2(H) to Sp(H) and the results of LMS from n-times continuously differentiable functions to n-times differentiable functions f.