On Generalized Rickart *-rings

Abstract

A ring R with an involution * is a generalized Rickart *-ring if for all x∈ R the right annihilator of xn is generated by a projection for some positive integer n depending on x. In this work, we introduce generalized right projection of an element in a *-ring and prove that every element in a generalized Rickart *-ring has generalized right projection. Various characterizations of generalized Rickart *-rings are obtained. We introduce the concept of generalized weakly Rickart *-ring and provide a characterization of generalized Rickart *-rings in terms of weakly generalized Rickart *-rings. It is shown that generalized Rickart *-rings satisfy the parallelogram law. A sufficient condition is established for partial comparability in generalized Rickart *-rings. Furthermore, it is proved that pair of projections in a generalized Rickart *-ring possess orthogonal decomposition.