Reversibility of skew Hurwitz series rings

Fatma Kaynarca, Muhammed Ali YILDIRIM

Type: Article

Publication Date: 2020-07-11

Citations: 1

DOI: https://doi.org/10.15672/hujms.679606

Abstract

We study the reversibility of skew Hurwitz series at zero as a generalization of an $\alpha$-rigid ring, introducing the concept of skew Hurwitz reversibility. A ring $R$ is called skew Hurwitz reversible ($SH$-reversible, for short), if the skew Hurwitz series ring $(HR,\alpha)$ is reversible i.e. whenever skew Hurwitz series $f, g\in (HR,\alpha)$ satisfy $fg=0$, then $gf=0$. We examine some characterizations and extensions of $SH$-reversible rings in relation with several ring theoretic properties which have roles in ring theory.

Locations

Hacettepe Journal of Mathematics and Statistics - View - PDF
DergiPark (Istanbul University) - View

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