Relative weak global Gorenstein dimension, AB-contexts and model structures
Abstract
In this paper we introduce and study the weak Gorenstein global dimension of a ring with respect to a left -module . We provide several characterizations of when this homological invariant is bounded. Two main applications are given: first, we prove that the weak Gorenstein global dimension of relative to a semidualizing -bimodule can be computed either by the -flat dimension of the left -modules or right -modules, just like the (absolute) weak global dimension. As a consequence, a new argument for solving Bennis' conjecture is obtained. As a second application, we give a concrete description of the weak equivalences in the -flat model structure recently found by the authors. In order to prove this result, an interesting connection between abelian model structures and AB-weak contexts is proved. This connection leads to a result that can be applied to obtain abelian model structures with a simpler description of trivial objects.
Cite
@article{arxiv.2304.05228,
title = {Relative weak global Gorenstein dimension, AB-contexts and model structures},
author = {Driss Bennis and Rachid EL Maaouy and Juan Ramon Garcia Rozas and Luis Oyonarte},
journal= {arXiv preprint arXiv:2304.05228},
year = {2024}
}
Comments
to appear in Homology, Homotopy and Applications