10.46298/cm.10273
https://cm.episciences.org/10273
Cui, Jian
Jian
Cui
Danchev, Peter
Peter
Danchev
On Strongly pi-Regular Rings with Involution
Recall that a ring R is called strongly pi-regular if, for every a in R,
there is a positive integer n, depending on a, such that a^n belongs to the
intersection of a^{n+1}R and Ra^{n+1}. In this paper we give a further study of
the notion of a strongly pi-star-regular ring, which is the star-version of
strongly pi-regular rings and which was originally introduced by Cui-Wang in J.
Korean Math. Soc. (2015). We also establish various properties of these rings
and give several new characterizations in terms of (strong) pi-regularity and
involution. Our results also considerably extend recent ones in the subject due
to Cui-Yin in Algebra Colloq. (2018) proved for pi-star-regular rings and due
to Cui-Danchev in J. Algebra Appl. (2020) proved for star-periodic rings.
Comment: 8 pages
episciences.org
Mathematics - Rings and Algebras
16E50, 16W10
Attribution 4.0 International (CC BY 4.0)
2022-11-08
2022-11-11
2022-11-11
eng
journal article
arXiv:2211.03235
10.48550/arXiv.2211.03235
2336-1298
https://cm.episciences.org/10273/pdf
VoR
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Communications in Mathematics
Volume 31 (2023), Issue 1
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