Variation of discrete spectra for non-selfadjoint perturbations of selfadjoint operators
Abstract
Let B=A+K where A is a bounded selfadjoint operator and K is an element of the von Neumann-Schatten ideal Sp with p>1. Let λn denote an enumeration of the discrete spectrum of B. We show that Σn (λn, σ(A))p is bounded from above by a constant multiple of |K|pp. We also derive a unitary analog of this estimate and apply it to obtain new estimates on zero-sets of Cauchy transforms.
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