The (b, c)-inverse in rings and in the Banach context

Abstract

In this article the (b, c)-inverse will be studied. Several equivalent conditions for the existence of the (b,c)-inverse in rings will be given. In particular, the conditions ensuring the existence of the (b,c)-inverse, of the annihilator (b,c)-inverse and of the hybrid (b,c)-inverse will be proved to be equivalent, provided b and c are regular elements in a unitary ring R. In addition, the set of all (b,c)-invertible elements will be characterized and the reverse order law will be also studied. Moreover, the relationship between the (b,c)-inverse and the Bott-Duffin inverse will be considered. In the context of Banach algebras, integral, series and limit representations will be given. Finally the continuity of the (b,c)-inverse will be characterized