On Strongly \( J\# \)-Clean Rings

Abstract

We define and examine the class of strongly \( J\# \)-clean rings consisting of those rings R such that each element of R is the sum of an idempotent from R and an element from J\#(R) that commute with each other. More exactly, we prove that these rings are simultaneously strongly clean and Dedekind-finite as well as that they factor-ring modulo the Jacobson radical is always Boolean, and also provide some close relations with certain other well-established classes of rings like these of local, semi-local and strongly J-clean rings (as introduced by Chen on 2010) showing the surprising fact that the classes of strongly \( J\# \)-clean and strongly J-clean rings, actually, do coincide. Moreover, a few more extensions of the newly defined class such as group rings and generalized matrix rings are provided too.