Higher order 2-differentiability and application to Koplienko trace formula

Abstract

Let A be a selfadjoint operator in a separable Hilbert space, K a selfadjoint Hilbert-Schmidt operator, and f∈ Cn(R). We establish that (t)=f(A+tK)-f(A) is n-times continuously differentiable on R in the Hilbert-Schmidt norm, provided either A is bounded or the derivatives f(i), i=1,…,n, are bounded. As an application of the second order 2-differentiability, we extend the Koplienko trace formula from the Besov class B∞12() to functions f for which the divided difference f[2] admits a certain Hilbert space factorization.