Strongly clean triangular matrix rings with endomorphisms
نویسندگان
چکیده مقاله:
A ring $R$ is strongly clean provided that every element in $R$ is the sum of an idempotent and a unit that commutate. Let $T_n(R,sigma)$ be the skew triangular matrix ring over a local ring $R$ where $sigma$ is an endomorphism of $R$. We show that $T_2(R,sigma)$ is strongly clean if and only if for any $ain 1+J(R), bin J(R)$, $l_a-r_{sigma(b)}: Rto R$ is surjective. Further, $T_3(R,sigma)$ is strongly clean if $l_{a}-r_{sigma(b)}, l_{a}-r_{sigma^2(b)}$ and $l_{b}-r_{sigma(a)}$ are surjective for any $ain U(R),bin J(R)$. The necessary condition for $T_3(R,sigma)$ to be strongly clean is also obtained.
منابع مشابه
strongly clean triangular matrix rings with endomorphisms
a ring $r$ is strongly clean provided that every element in $r$ is the sum of an idempotent and a unit that commutate. let $t_n(r,sigma)$ be the skew triangular matrix ring over a local ring $r$ where $sigma$ is an endomorphism of $r$. we show that $t_2(r,sigma)$ is strongly clean if and only if for any $ain 1+j(r), bin j(r)$, $l_a-r_{sigma(b)}: rto r$ is surjective. furt...
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عنوان ژورنال
دوره 41 شماره 6
صفحات 1365- 1374
تاریخ انتشار 2015-12-01
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