REPRESENTATIONS FOR THE PSEUDO DRAZIN INVERSE OF ELEMENTS IN A BANACH ALGEBRA

Huihui Zhu; Jianlong Chen; Pedro Patrı́cio

doi:10.11650/tjm.19.2015.4576

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REPRESENTATIONS FOR THE PSEUDO DRAZIN INVERSE OF ELEMENTS IN A BANACH ALGEBRA

Huihui Zhu Jianlong Chen Pedro Patrı́cio

Year: 2015 Journal: Taiwanese Journal of Mathematics Vol: 19 (2) Publisher: Mathematical Society of the Republic of China (Taiwan)

DOI: 10.11650/tjm.19.2015.4576

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Abstract

In this paper, we investigate the pseudo Drazin invertibility of the sum and the\nproduct of elements in a Banach algebra $\\mathscr{A}$. Given pseudo Drazin invertible\nelements $a$ and $b$ such that $a^2b=aba$ and $b^2a=bab$, it is shown that $ab$ is\npseudo Drazin invertible and $a+b$ is pseudo Drazin invertible if and only if so is\n$1+a^{\\ddagger} b$, and the related formulae are provided.

Keywords:

Drazin inverse Mathematics Invertible matrix Banach algebra Pure mathematics Product (mathematics) Algebra over a field Inverse Banach space Geometry

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Algebraic structures and combinatorial models

Physical Sciences → Mathematics → Geometry and Topology

Advanced Topics in Algebra

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Nonlinear Waves and Solitons

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REPRESENTATIONS FOR THE PSEUDO DRAZIN INVERSE OF ELEMENTS IN A BANACH ALGEBRA

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