$\Sigma$-semi-compact rings and modules
Abstract
In this paper several characterizations of semi-compact modules are given. Among other results, we study rings whose semi-compact modules are injective. We introduce the property -semi-compact for modules and we characterize the modules satisfying this property. In particular, we show that a ring is left -semi-compact if and only if satisfies the ascending (resp. descending) chain condition on the left (resp. right) annulets. Moreover, we prove that every flat left -module is semi-compact if and only if is left -semi-compact. We also show that a ring is left Noetherian if and only if every pure projective left -module is semi-compact. Finally, we consider rings whose flat modules are finitely (singly) projective. For any commutative arithmetical ring with quotient ring , we prove that every flat -module is semi-compact if and only if every flat -module is finitely (singly) projective if and only if is pure semisimple. A similar result is obtained for reduced commutative rings with the space compact. We also prove that every -flat left -module is singly projective if is left -semi-compact, and the converse holds if is an -flat left -module.
Cite
@article{arxiv.2203.03255,
title = {$\Sigma$-semi-compact rings and modules},
author = {Mahmood Behboodi and François Couchot and Seyed Hossein Shojaee},
journal= {arXiv preprint arXiv:2203.03255},
year = {2022}
}