Some New Results on Pseudo n-Strong Drazin Inverses in Rings

Abstract

In this paper, we give a further study in-depth of the pseudo n-strong Drazin inverses in an associative unital ring R. The characterizations of elements a,b∈ R for which aa D=bb D are provided, and some new equivalent conditions on pseudo n-strong Drazin inverses are obtained. In particular, we show that an element a∈ R is pseudo n-strong Drazin invertible if, and only if, a is p-Drazin invertible and a-an+1∈ J(R) if, and only if, there exists e2=e∈ comm2(a) such that ae∈ J(R) and 1-(a+e)n∈ J(R). We also consider pseudo n-strong Drazin inverses with involution, and discuss the extended versions of Cline's formula and Jacobson's lemma of this new class of generalized inverses. Likewise, we define and explore the so-called pseudo π-polar rings and demonstrate their relationships with periodic rings and strongly π-regular rings, respectively.

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