Characterizations of weighted core inverse in rings with involution

Abstract

R is a unital ring with involution. We investigate the characterizations and representations of weighted core inverse of an element in R by idempotents and units. For example, let a∈ R and e∈ R be an invertible Hermitian element, n≥slant 1, then a is e-core invertible if and only if there exists an element (or an idempotent) p such that (ep)=ep, pa=0 and an+p (or an(1-p)+p) is invertible. As a consequence, let e, f∈ R be two invertible Hermitian elements, then a is weighted-EP with respect to (e, f) if and only if there exists an element (or an idempotent) p such that (ep)=ep, (fp)=fp, pa=ap=0 and an+p (or an(1-p)+p) is invertible. These results generalize and improve conclusions in Li.