Intersections of various spectra of operator matrices

Nikola Sarajlija

Published 2021-08-27Version 1

This paper is concerned with general $n\times n$ upper triangular operator matrices with given diagonal entries. We characterize perturbations of the left (right) essential spectrum, the essential spectrum, as well as the left (right) the Weyl spectrum of such operators, thus generalizing and improving some results of \cite{CAO}, \cite{CAO2}, \cite{SUNTHEORY}, \cite{SUN}, \cite{LIandDU}, \cite{ZHANG} from $n=2$ to case of $n\geq2$. We show that related results hold in arbitrary Banach spaces without assuming separability, thus extending and improving recent results from \cite{WU}, \cite{WU2}. For the lack of adjointness and orthogonality in Banach spaces, we use an adequate alternative: the concept of inner generalized inverse.