Quasi-unit regularity and $QB$-rings

Some relations for quasiunit regular rings and $QB$-rings, as well as for pseudounit regular rings and $QB_{\infty}$-rings, are obtained. In the first part of the paper, we prove that (an exchange ring $R$ is a $QB$-ring) (whenever $x \in R$ is regular, there exists a quasiunit regular element $w \...

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Бібліографічні деталі
Дата:	2012
Автори:	Li, Jianghua, Shangping, Wang, Xiaoqin, Shen, Xiaoqing, Sun, Лі, Їангуа, Шанґпінг, Ванг, Сяоцин, Шен, Сяоцин, Сун
Формат:	Стаття
Мова:	Англійська
Опубліковано:	Institute of Mathematics, NAS of Ukraine 2012
Онлайн доступ:	https://umj.imath.kiev.ua/index.php/umj/article/view/2586
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Назва журналу:	Ukrains’kyi Matematychnyi Zhurnal
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Ukrains’kyi Matematychnyi Zhurnal

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Резюме:	Some relations for quasiunit regular rings and $QB$-rings, as well as for pseudounit regular rings and $QB_{\infty}$-rings, are obtained. In the first part of the paper, we prove that (an exchange ring $R$ is a $QB$-ring) (whenever $x \in R$ is regular, there exists a quasiunit regular element $w \in R$ such that $x = xyx = xyw$ for some $y \in R$) — (whenever $aR + bR = dR$ in $R$, there exists a quasiunit regular element $w \in R$ such that $a + bz = dw$ for some $z \in R$). Similarly, we also give necessary and sufficient conditions for $QB_{\infty}$-rings in the second part of the paper.

Quasi-unit regularity and $QB$-rings

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