Peller's problem concerning Koplienko-Neidhardt trace formulae: the unitary case
Abstract
We prove the existence of a complex valued C2-function on the unit circle, a unitary operator U and a self-adjoint operator Z in the Hilbert-Schmidt class S2, such that the perturbated operator f(eiZU)-f(U) -ddt(f(eitZU)) t=0 does not belong to the space S1 of trace class operators. This resolves a problem of Peller concerning the validity of the Koplienko-Neidhardt trace formula for unitaries.
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