Strongly clean triangular matrix rings with endomorphisms
Date
2015
Authors
Chen, H.
Kose, H.
Kurtulmaz, Y.
Editor(s)
Advisor
Supervisor
Co-Advisor
Co-Supervisor
Instructor
Source Title
Bulletin of the Iranian Mathematical Society
Print ISSN
1018-6301(print)
Electronic ISSN
1735-8515
Publisher
Springer
Volume
41
Issue
6
Pages
1365 - 1374
Language
English
Type
Journal Title
Journal ISSN
Volume Title
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Abstract
A ring R is strongly clean provided that every element in R is the sum of an idempotent and a unit that commutate. Let Tn(R; σ) be the skew triangular matrix ring over a local ring R where σ is an endomorphism of R. We show that T2(R; σ) is strongly clean if and only if for any aϵ 1+J(R); b ϵ J(R), la -rσ (b): R→ R is surjective. Further, T3(R; σ) is strongly clean if la-rσ (b); la-rσ2 (b) and lb-rσ (a)are surjective for any a ϵ U(R); b ϵ J(R). The necessary condition for T3(R; σ) to be strongly clean is also obtained. © 2015 Iranian Mathematical Society.