English

A note on simple modules over quasi-local rings

Rings and Algebras 2018-07-31 v1

Abstract

Matlis showed that the injective hull of a simple module over a commutative Noetherian ring is Artinian. Many non-commutative Noetherian rings whose injective hulls of simple modules are locally Artinian have been extensively studied recently. This property had been denoted by property ()(\diamond). In this paper we investigate, which non-Noetherian semiprimary commutative quasi-local rings (R,m)(R, m) satisfy property ()(\diamond). For quasi-local rings (R,m)(R,m) with m3=0m^3=0, we prove a characterisation of this property in terms of the dual space of Soc(R)Soc(R). Furthermore, we show that (R,m)(R,m) satisfies ()(\diamond) if and only if its associated graded ring gr(R)gr(R) does. Given a field FF and vector spaces VV and WW and a symmetric bilinear map β:V×VW\beta:V\times V\rightarrow W we consider commutative quasi-local rings of the form F×V×WF\times V \times W, whose product is given by (λ1,v1,w1)(λ2,v2,w2)=(λ1λ2,λ1v2+λ2v1,λ1w2+λ2w1+β(v1,v2))(\lambda_1, v_1,w_1)(\lambda_2,v_2,w_2) = (\lambda_1\lambda_2, \lambda_1v_2+\lambda_2v_1, \lambda_1w_2+\lambda_2w_1+\beta(v_1,v_2)) in order to build new examples and to illustrate our theory. In particular we prove that any quasi-local commutative ring with radical cube-zero does not satisfy ()(\diamond) if and only if it has a factor, whose associated graded ring is of the form F×V×FF\times V \times F with VV infinite dimensional and β\beta non-degenerated.

Keywords

Cite

@article{arxiv.1711.10580,
  title  = {A note on simple modules over quasi-local rings},
  author = {Paula A. A. B. Carvalho and Christian Lomp and Patrick F. Smith},
  journal= {arXiv preprint arXiv:1711.10580},
  year   = {2018}
}

Comments

Dedicated to John Clark

R2 v1 2026-06-22T23:00:08.597Z