Uniquely weakly nil-clean conditions on zero-divisors

Abstract

An element in a ring R is called uniquely weakly nil-clean if every element in R can be uniquely written as a sum or a difference of a nilpotent and an idempotent in the sense of very idempotents. The structure of the ring in which every zero-divisor is uniquely weakly nil-clean is completely determined. We prove that every zero-divisor in a ring R is uniquely weakly nil-clean if and only if R is a D-ring, or R is abelian, periodic, and R/J(R) is isomorphic to a field F, Z3 Z3, Z3 B where B is Boolean, or a Boolean ring. As a specific case, rings in which every zero-divisor a or -a is a nilpotent or an idempotent are also considered. Furthermore, we prove that every zero-divisor in a ring R is uniquely nil-clean if and only if R is a D-ring, or R is abelian, periodic; and R/J(R) is Boolean.3mm Key words: Zero-divisor; Uniquely weakly nil-clean ring; Uniquely nil-clean ring.