Element absorb Topology on rings

Ali Shahidikia
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Abstract

In this paper, we introduce a new Topology related to special elements in a noncummutative rings. Consider a ring $R$, we denote by $\textrm{Id}(R)$ the set of all idempotent elements in $R$. Let $a$ is an element of $R$. The element absorb Topology related to $a$ is defined as $\tau_a:=\{ I\subseteq R | Ia \subseteq I\} \subseteq P(R)$. Since this topology is obtained from act of ring, it explains Some of algebraic properties of ring in Topological language .In a special case when $e$ ia an idempotent element, $\tau_e:=\{ I\subseteq R | Ie \subseteq I\} \subseteq P(R)$. We present Topological description of the pierce decomposition $ R=Re\oplus R(1-e)$.
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元素吸收 环形拓扑
在本文中,我们将介绍一种与非互变环中的特殊元素有关的新拓扑学。考虑一个环 $R$,我们用 $\textrm{Id}(R)$ 表示 $R$ 中所有幂等元素的集合。设 $a$ 是 $R$ 的一个元素。与$a$相关的元素吸收拓扑定义为$\tau_a:=\{ I\subseteq R |Ia \subseteq I\}.\P(R)$.在一种特殊情况下,当 $e$ 是一个幂等元素时,$\tau_e:=\{ Isubseteq R| Ie \subseteq I\} 。\P(R)$.我们提出了皮尔斯分解的拓扑描述 $ R=Re\oplus R(1-e)$.
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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