Periodic modules and acyclic complexes
Abstract
We study the behaviour of modules that fit into a short exact sequence , where belongs to a class of modules , the so-called -periodic modules. We find a rather general framework to improve and generalize some well-known results of Benson and Goodearl and Simson. In the second part we will combine techniques of hereditary cotorsion pairs and presentation of direct limits, to conclude, among other applications, that if is any module and is cotorsion, then will be also cotorsion. This will lead to some meaningful consequences in the category of unbounded chain complexes and in Gorenstein homological algebra. For example we show that every acyclic complex of cotorsion modules has cotorsion cycles, and more generally, every map where is a complex of cotorsion modules and is an acyclic complex of flat cycles, is null-homotopic. In other words, every complex of cotorsion modules is dg-cotorsion.
Cite
@article{arxiv.1704.06672,
title = {Periodic modules and acyclic complexes},
author = {Silvana Bazzoni and Manuel Cortés Izurdiaga and Sergio Estrada},
journal= {arXiv preprint arXiv:1704.06672},
year = {2019}
}