Drazin invertibility of linear operators on quaternionic Banach spaces

Abstract

Let A be a right linear operator on a two-sided quaternionic Banach space X. The paper studies the Drazin inverse for right linear operators on a quaternionic Banach space. It is shown that if A is Drazin invertible then the Drazin inverse of A is given by f(A) where f is 0 in an axially symmetric neighborhood of 0 and f(q) = q-1 in an axially symmetric neighborhood of the nonzero spherical spectrum of A. Some results analogous to the ones concerning the Drazin inverse of operators on complex Banach spaces are proved in the quaternionic context.