English

Model categories structures from rigid objects in exact categories

Representation Theory 2019-05-07 v2 Algebraic Topology Category Theory K-Theory and Homology

Abstract

Let E\mathcal{E} be a weakly idempotent complete exact category with enough injective and projective objects. Assume that ME\mathcal{M} \subseteq \mathcal{E} is a rigid, contravariantly finite subcategory of E\mathcal{E} containing all the injective and projective objects, and stable under taking direct sums and summands. In this paper, E\mathcal{E} is equipped with the structure of a prefibration category with cofibrant replacements. As a corollary, we show, using the results of Demonet and Liu in \cite{DL}, that the category of finite presentation modules on the costable category M\overline{\mathcal{M}} is a localization of E\mathcal{E}. We also deduce that EmodM\mathcal{E} \to \mathrm{mod}\overline{\mathcal{M}} admits a calculus of fractions up to homotopy. These two corollaries are analogues for exact categories of results of Buan and Marsh in \cite{BM2}, \cite{BM1} (see also \cite{Be}) that hold for triangulated categories. If E\mathcal{E} is a Frobenius exact category, we enhance its structure of prefibration category to the structure of a model category (see the article of Palu in \cite{Palu} for the case of triangulated categories). This last result applies in particular when E\mathcal{E} is any of the Hom-finite Frobenius categories appearing in relation to cluster algebras.

Keywords

Cite

@article{arxiv.1706.06530,
  title  = {Model categories structures from rigid objects in exact categories},
  author = {Lucie Jacquet-Malo},
  journal= {arXiv preprint arXiv:1706.06530},
  year   = {2019}
}

Comments

41 pages

R2 v1 2026-06-22T20:24:12.602Z