A subclass of strongly clean rings
In this paper, we introduce a subclass of strongly clean rings. Let be a ring with identity, be the Jacobson radical of , and let denote the set of all elements of which are nilpotent in . An element is called provided that there exists an idempotent such that and or is an element of . A ring is said to be in case every element in is very -clean. We prove that every very -clean ring is strongly -rad clean and has stable range one. It is shown that for a commutative...