English

Characterizing $S$-Artinianness by uniformity

Commutative Algebra 2023-09-01 v6

Abstract

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

Keywords

Cite

@article{arxiv.2207.12569,
  title  = {Characterizing $S$-Artinianness by uniformity},
  author = {Xiaolei Zhang and Wei Qi},
  journal= {arXiv preprint arXiv:2207.12569},
  year   = {2023}
}
R2 v1 2026-06-25T01:13:26.255Z