ON STRONGLY CLEAN MATRIX RINGS
Glasgow mathematical journal, Tome 48 (2006) no. 3, pp. 557-566
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A ring $R$ with identity is called strongly clean if every element of $R$ is the sum of an idempotent and a unit that commute. For a commutative local ring $R$, $n=3,4$, and $m, k, s \in {\mathbb N}$ it is proved that ${\mathbb M}_n(R)$ is strongly clean if and only if ${\mathbb M}_n(R[[x]])$ is strongly clean if and only if ${\mathbb M}_n(R[[x_1, x_2, \ldots, x_m]])$ is strongly clean if and only if $ {\mathbb M}_n(\frac{R[x]}{(x^{k})})$ is strongly clean if and only if $ {\mathbb M}_n(\dfrac{R[x_{1}, x_{2}, \ldots , x_{s}]}{(x^{n_1}_{1}, x^{n_{2}}_{2}, \ldots , x^{n_{s}}_{s})}) $ is strongly clean if and only if ${\mathbb M}_n(R \propto R)$ is strongly clean where $ R\propto R=\{\scriptsize(\begin{array}{@{}c@{\quad}c@{}} a& b \\ 0& a \end{array}): a, b \in R \}$ is the trivial extension of $R$. This extends a result of J. Chen, X. Yang and Y. Zhou [$\mathbf{5}$] from $n=2$ to 3 and 4.
FAN, LINGLING; YANG, XIANDE. ON STRONGLY CLEAN MATRIX RINGS. Glasgow mathematical journal, Tome 48 (2006) no. 3, pp. 557-566. doi: 10.1017/S0017089506003284
@article{10_1017_S0017089506003284,
author = {FAN, LINGLING and YANG, XIANDE},
title = {ON {STRONGLY} {CLEAN} {MATRIX} {RINGS}},
journal = {Glasgow mathematical journal},
pages = {557--566},
year = {2006},
volume = {48},
number = {3},
doi = {10.1017/S0017089506003284},
url = {http://geodesic.mathdoc.fr/articles/10.1017/S0017089506003284/}
}
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