Characterizing $S$-Artinianness by uniformity
Commutative Algebra
2023-09-01 v6
Abstract
Let be a commutative ring with identity and a multiplicative subset of . An -module is said to be a uniformly -Artinian (--Artinian for abbreviation) module if there is such that any descending chain of submodules of is -stationary with respect to . --Artinian modules are characterized in terms of (-MIN)-conditions and --cofinite properties. We call a ring is a --Artinian ring if itself is a --Artinian module, and then show that any --semisimple ring is --Artinian. It is proved that a ring is --Artinian if and only if is --Noetherian, the --Jacobson radical of is -nilpotent and is a --semisimple ring. Besides, some examples are given to distinguish Artinian rings, --Artinian rings and -Artinian rings.
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}
}