New characterization of (b,c)-inverses through polarity

Abstract

In this paper we introduce the notion of (b,c)-polar elements in an associative ring R. Necessary and sufficient conditions of an element a∈ R to be (b,c)-polar are investigated. We show that an element a∈ R is (b,c)-polar if and only if a is (b,c)-invertible. In particular the (b,c)-polarity is a generalization of the polarity along an element introduced by Song, Zhu and Mosi\'c [14] if b=c, and the polarity introduced by Koliha and Patricio [10]. Further characterizations are obtained in the Banach space context.