Limit Points for Browder Spectrum of Operator Matrices

Abstract

Let A∈ B(X) and B∈ B(Y), where X and Y are Banach spaces, and let MC be an operator acting on X Y given by MC=pmatrix A & C \\ 0 & B \\ pmatrix. We investigate the limit point set of the Browder spectrum of MC. It is shown that acc σb(MC) Wacc σb= acc σb(A) acc σb(B) where Wacc σb is a subsets of accσ*(B) accσ*(A) and a union of certain holes in acc σb(MC). Furthermore, several sufficient conditions for accσb(MC)=accσb(A) accσb(B) holds for every C∈ B(Y,X) are given.