A class of core inverses associated with Green's relations in semigroups
Abstract
Let S be a *-monoid and let a,b,c be elements of S. We say that a is (b,c)-core-EP invertible if there exist some x in S and some nonnegative integer k such that cax(ca)kc=(ca)kc, x R(ca)kb and x L((ca)kc)*. This terminology can be seen as an extension of the w-core-EP inverse and the (b,c)-core inverse. It is explored when (b,c)-core-EP invertibility implies w-core-EP invertibility. Another accomplishment of our work is to establish the criteria for the (b,c)-core-EP inverse of a and to clarify the relations between the (b,c)-inverse, the core inverse, the core-EP inverse, the w-core inverse, the (b,c)-core inverse and the (b,c)-core-EP inverse. As an application, we improve a result in the literature focused on (b,c)-core inverses. We then establish the criterion for the (B,C)-core-EP inverse of A in complex matrices, and give the solution to the system of matrix equations.
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