Natural Generalized Inverse and Core of an Element in Semi- groups, Rings and Banach and Operator Algebras

Authors

  • Xavier Mary

Keywords:

generalized inverses, Koliha-Drazin inverse

Abstract

Using the recent notion of inverse along an element in a semigroup, and the natural partial order on idempotents, we study bicommuting generalized inverses and define a new inverse called natural inverse, that generalizes the Drazin inverse in a semigroup, but also the Koliha-Drazin inverse in a ring. In this setting we get a core decomposition similar to the nilpotent, Kato or Mbekhta decompositions. In Banach and Operator algebras, we show that the study of the spectrum is not sufficient, and use ideas from local spectral theory to study this new inverse.

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Published

2012-05-14

Issue

Section

Algebraic Geometry

How to Cite

Natural Generalized Inverse and Core of an Element in Semi- groups, Rings and Banach and Operator Algebras. (2012). European Journal of Pure and Applied Mathematics, 5(2), 160-173. https://www.ejpam.com/index.php/ejpam/article/view/1599