Spectral inclusions of perturbed normal operators and applications

Abstract

We consider a normal operator T on a Hilbert space H. Under various assumptions on the spectrum of T, we give bounds for the spectrum of T+A where A is T-bounded with relative bound less than 1 but we do not assume that A is symmetric or normal. If the imaginary part of the spectrum of T is bounded, then the spectrum of T+A is contained in the region between certain hyperbolas whose asymptotic slope depends on the T-bound of A. If the spectrum of T is contained in a bisector, then the spectrum of T+A is contained in the area between certain rotated hyperbola. The case of infinite gaps in the spectrum of T is studied. Moreover, we prove a stability result for the essential spectrum of T+A. If A is even p-subordinate to T, then we obtain stronger results for the localisation of the spectrum of T+A.