Additive and multiplicative properties of Drazin inverse under new weakly commutativity condition
Abstract
Given a complex Banach space X, let B(X) be the collection of all bounded linear operators on X. For A,B∈B(X) we define A,B are A-weakly commutative if there exists C∈B(X) satisfying AB=CA and BA=AC. The objective of this paper is to study the Drazin invertibility of A+B and AB, when A, B∈B(X)D are A and B-weakly commutative. Consequently, this extends some of the additive and multiplicative results established by Huanyin and Marjan Sheibani (Linear and Multilinear Algebra 70.1 (2022): 53-65) for a distinct family of elements. Moreover, we also establish these additive and multiplicative properties for g-Drazin inverses in a complex Banach algebra.
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