Characterizing $S$-Artinianness by uniformity

TL;DR

This paper introduces and characterizes uniformly $S$-Artinian modules and rings, establishing their properties, equivalences, and providing examples to distinguish them from classical Artinian rings.

Contribution

It defines the concept of $u$-$S$-Artinian modules and rings, characterizes them via ($S$-MIN)-conditions and $u$-$S$-cofinite properties, and explores their structural properties and relationships.

Findings

$u$-$S$-Artinian modules are characterized by ($S$-MIN)-conditions.

A ring is $u$-$S$-Artinian iff it is $u$-$S$-Noetherian and its $u$-$S$-Jacobson radical is $S$-nilpotent.

Examples differentiate Artinian, $u$-$S$-Artinian, and $S$-Artinian rings.

Abstract

Let $R$ be a commutative ring with identity and $S$ a multiplicative subset of $R$. An $R$-module $M$ is said to be a uniformly $S$-Artinian ($u$-$S$-Artinian for abbreviation) module if there is $s\in S$ such that any descending chain of submodules of $M$ is $S$-stationary with respect to $s$. $u$-$S$-Artinian modules are characterized in terms of ($S$-MIN)-conditions and $u$-$S$-cofinite properties. We call a ring $R$ is a $u$-$S$-Artinian ring if $R$ itself is a $u$-$S$-Artinian module, and then show that any $u$-$S$-semisimple ring is $u$-$S$-Artinian. It is proved that a ring $R$ is $u$-$S$-Artinian if and only if $R$ is $u$-$S$-Noetherian, the $u$-$S$-Jacobson radical ${\rm Jac}_S(R)$ of $R$ is $S$-nilpotent and $R/{\rm Jac}_S(R)$ is a $u$-$S/{\rm Jac}_S(R)$-semisimple ring. Besides, some examples are given to distinguish Artinian rings, $u$-$S$-Artinian rings and $S$-Artinian rings.