English

$\mathcal{P}_1$-covers over commutative rings

Commutative Algebra 2020-01-30 v1

Abstract

In this paper we consider the class P1(R)\mathcal{P}_1(R) of modules of projective dimension at most one over a commutative ring RR and we investigate when P1(R)\mathcal{P}_1(R) is a covering class. More precisely, we investigate Enochs' Conjecture for this class, that is the question of whether P1(R)\mathcal{P}_1(R) is covering necessarily implies that P1(R)\mathcal{P}_1(R) is closed under direct limits. We answer the question affirmatively in the case of a commutative semihereditary ring RR. This gives an example of a cotorsion pair (P1(R),P1(R))(\mathcal{P}_1(R), \mathcal{P}_1(R)^\perp) which is not necessarily of finite type such that P1(R)\mathcal{P}_1(R) satisfies Enochs' Conjecture. Moreover, we describe the class limP1(R)\varinjlim \mathcal{P}_1(R) over (not-necessarily commutative) rings which admit a classical ring of quotients.

Keywords

Cite

@article{arxiv.2001.10747,
  title  = {$\mathcal{P}_1$-covers over commutative rings},
  author = {Silvana Bazzoni and Giovanna Le Gros},
  journal= {arXiv preprint arXiv:2001.10747},
  year   = {2020}
}
R2 v1 2026-06-23T13:23:46.895Z