English

On uniquely $\pi$-clean rings

Rings and Algebras 2014-07-01 v1

Abstract

An element of a ring is unique clean if it can be uniquely written as the sum of an idempotent and a unit. A ring RR is uniquely π\pi-clean if some power of every element in RR is uniquely clean. In this article, we prove that a ring RR is uniquely π\pi-clean if and only if for any aRa\in R, there exists an mNm\in {\Bbb N} and a central idempotent eRe\in R such that ameJ(R)a^m-e\in J(R), if and only if RR is abelian; every idempotent lifts modulo J(R)J(R); and R/PR/P is torsion for all prime ideals PP containing the Jacobson radical J(R)J(R). Further, we prove that a ring RR is uniquely π\pi-clean and J(R)J(R) is nil if and only if RR is an abelian periodic ring, if and only if for any aRa\in R, there exists some mNm\in {\Bbb N} and a unique idempotent eRe\in R such that ameP(R)a^m-e\in P(R), where P(R)P(R) is the prime radical of RR.

Keywords

Cite

@article{arxiv.1406.7472,
  title  = {On uniquely $\pi$-clean rings},
  author = {Huanyin Chen},
  journal= {arXiv preprint arXiv:1406.7472},
  year   = {2014}
}
R2 v1 2026-06-22T04:50:18.890Z