English

Relative injective modules, superstability and noetherian categories

Rings and Algebras 2024-08-19 v5 Logic

Abstract

We study classes of modules closed under direct sums, M\mathcal{M}-submodules and M\mathcal{M}-epimorphic images where M\mathcal{M} is either the class of embeddings, RDRD-embeddings or pure embeddings. We show that the M\mathcal{M}-injective modules of theses classes satisfy a Baer-like criterion. In particular, injective modules, RDRD-injective modules, pure injective modules, flat cotorsion modules and s\mathfrak{s}-torsion pure injective modules satisfy this criterion. The argument presented is a model theoretic one. We use in an essential way stable independence relations which generalize Shelah's non-forking to abstract elementary classes. We show that the classical model theoretic notion of superstability is equivalent to the algebraic notion of a noetherian category for these classes. We use this equivalence to characterize noetherian rings, pure semisimple rings, perfect rings and finite products of finite rings and artinian valuation rings via superstability.

Keywords

Cite

@article{arxiv.2308.02456,
  title  = {Relative injective modules, superstability and noetherian categories},
  author = {Marcos Mazari-Armida and Jiri Rosicky},
  journal= {arXiv preprint arXiv:2308.02456},
  year   = {2024}
}

Comments

25 pages

R2 v1 2026-06-28T11:48:18.494Z