The Drazin spectrum of tensor product of Banach algebra elements and elementary operators

Abstract

Given unital Banach algebras A and B and elements a∈ A and b∈ B, the Drazin spectrun of a b∈ A B will be fully characterized, where A B is a Banach algebra that is the completion of A B with respect to a uniform crossnorm. To this end, however, first the isolated points of the spectrum of a b∈ A B need to be characterized. On the other hand, given Banach spaces X and Y and Banach space operators S∈ L(X) and T∈ L(Y), using similar arguments the Drazin spectrum of τST∈ L(L(Y,X)), the elementary operator defined by S and T, will be fully characterized.