Resolution of Peller's problem concerning Koplienko-Neidhardt trace formulae

Abstract

A formula for the norm of a bilinear Schur multiplier acting from the Cartesian product S2× S2 of two copies of the Hilbert-Schmidt classes into the trace class S1 is established in terms of linear Schur multipliers acting on the space S∞ of all compact operators. Using this formula, we resolve Peller's problem on Koplienko-Neidhardt trace formulae. Namely, we prove that there exist a twice continuously differentiable function f with a bounded second derivative, a self-adjoint (unbounded) operator A and a self-adjoint operator B∈ S2 such that f(A+B)-f(A)-ddt(f(A+tB))t=0 S1.