Extensions of Regular Rings
نویسندگان
چکیده مقاله:
Let $R$ be an associative ring with identity. An element $x in R$ is called $mathbb{Z}G$-regular (resp. strongly $mathbb{Z}G$-regular) if there exist $g in G$, $n in mathbb{Z}$ and $r in R$ such that $x^{ng}=x^{ng}rx^{ng}$ (resp. $x^{ng}=x^{(n+1)g}$). A ring $R$ is called $mathbb{Z}G$-regular (resp. strongly $mathbb{Z}G$-regular) if every element of $R$ is $mathbb{Z}G$-regular (resp. strongly $mathbb{Z}G$-regular). In this paper, we characterize $mathbb{Z}G$-regular (resp. strongly $mathbb{Z}G$-regular) rings. Furthermore, this paper includes a brief discussion of $mathbb{Z}G$-regularity in group rings.
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عنوان ژورنال
دوره 8 شماره 4
صفحات 331- 337
تاریخ انتشار 2016-11-01
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