Higher-order spectral shift function for resolvent comparable perturbations
Abstract
Given a pair of self-adjoint operators H and V such that V is bounded and (H+V-i)-1-(H-i)-1 belongs to the Schatten-von Neumann ideal Sn, n 2, of operators on a separable Hilbert space, we establish higher order trace formulas for a broad set of functions f containing several major classes of test functions and also establish existence of the respective locally integrable real-valued spectral shift functions determined uniquely up to a low degree polynomial summand. Our result generalizes the result of PSS13 for Schatten-von Neumman perturbations V and settles earlier attempts to encompass general perturbations with Schatten-von Neumman difference of resolvents, which led to more complicated trace formulas for more restrictive sets of functions f and to analogs of spectral shift functions lacking real-valuedness and/or expected degree of uniqueness. Our proof builds on a general change of variables method derived in this paper and significantly refining those appearing in vNS21,PSS15,S17 with respect to several parameters at once.
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