On weakly nil-clean rings

M. Tamer KOŞAN; Yiqiang ZHOU

doi:10.1007/s11464-016-0555-6

Front. Math. China ›› 2016, Vol. 11 ›› Issue (4) : 949 -955. DOI: 10.1007/s11464-016-0555-6

RESEARCH ARTICLE

On weakly nil-clean rings

M. Tamer KOŞAN ¹
, Yiqiang ZHOU ²^,^*

Author information +

History +

PDF (113KB)

Abstract

We obtain the structure of the rings in which every element is either a sum or a difference of a nilpotent and an idempotent that commute. This extends the structure theorems of a commutative weakly nil-clean ring, of an abelian weakly nil-clean ring, and of a strongly nil-clean ring. As applications, this result is used to determine the 2-primal rings R such that the matrix ring $M n (R)$ is weakly nil-clean, and to show that the endomorphism ring End_D(V ) over a vector space V_D is weakly nil-clean if and only if it is nil-clean or dim(V ) = 1 with $D ≅ Z 3$ .

Keywords

Nil-clean ring / strongly nil-clean ring / weakly nil-clean ring / matrix ring / endomorphism ring of a vector space / 2-primal ring

Cite this article

Download citation ▾

M. Tamer KOŞAN, Yiqiang ZHOU. On weakly nil-clean rings. Front. Math. China, 2016, 11(4): 949-955 DOI:10.1007/s11464-016-0555-6

登录浏览全文

4963

注册一个新账户忘记密码

References

Publishing order | Descend order by publishing year | Descend order by cited within

[1]	Ahn M-S, Anderson D D. Weakly clean rings and almost clean rings. Rocky Mountain J Math, 2006, 36: 783–798

[2]	Breaz S, Calugareanu G, Danchev P, Micu T. Nil-clean matrix rings. Linear Algebra Appl, 2013, 439: 3115–3119

[3]	Breaz S, Danchev P V, Zhou Y. Rings in which every element is either a sum or a difference of a nilpotent and an idempotent. J Algebra Appl, 2016, 15(8): 1650148

[4]	Danchev P V, McGovern W Wm. Commutative weakly nil-clean rings. J Algebra, 2015, 425: 410–422

[5]	Diesl A J. Nil clean rings. J Algebra, 2013, 383: 197–211

[6]	Han J, Nicholson W K. Extensions of clean rings. Comm Algebra, 2001, 29: 2589–2595

[7]	Kosan M T, Lee T-K, Zhou Y. When is every matrix over a division ring a sum of an idempotent and a nilpotent? Linear Algebra Appl, 2014, 450: 7–12