Sectorial perturbations of self-adjoint matrices and operators

Abstract

This paper considers N× N matrices of the form Aγ =A+ γ B, where A is self-adjoint, γ ∈ C and B is a non-self-adjoint perturbation of A. We obtain some monodromy-type results relating the spectral behaviour of such matrices in the two asymptotic regimes |γ |∞ and |γ | 0 under certain assumptions on B. We also explain some properties of the spectrum of Aγ for intermediate sized γ by considering the limit N∞, concentrating on properties that have no self-adjoint analogue. A substantial number of the results extend to operators on infinite-dimensional Hilbert spaces.