J-clean rings

Abstract

In this paper, we study a new class of rings, called J-clean rings. A ring in which every element can be expressed as the addition of an idempotent and an element from J(R) is called a J-clean ring. Here, J(R)=\ z∈ R : zn∈ J(R) \ for \ some \ n ≥ 1 \ where, J(R) is the Jacobson radical. We provide the basic properties of J-clean rings. We also show that the class of semiboolean and nil clean rings is a proper subclass of the class of J-clean rings, which itself is a proper subclass of clean rings. We obtain basic properties of J-clean rings and give a characterization of J-clean rings: a ring R is a J-clean ring iff R/J(R) is a J-clean ring and idempotents lift modulo J(R). We also prove that a ring is a uniquely clean ring if and only if it is a uniquely J-clean ring. Finally, several matrix extensions like Tn(R) and Dn(R) over a J-clean ring are explored.

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