Model categories structures from rigid objects in exact categories

Abstract

Let E be a weakly idempotent complete exact category with enough injective and projective objects. Assume that M ⊂eq E is a rigid, contravariantly finite subcategory of E containing all the injective and projective objects, and stable under taking direct sums and summands. In this paper, 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 DL, that the category of finite presentation modules on the costable category M is a localization of E. We also deduce that E modM admits a calculus of fractions up to homotopy. These two corollaries are analogues for exact categories of results of Buan and Marsh in BM2, BM1 (see also Be) that hold for triangulated categories. If 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 Palu for the case of triangulated categories). This last result applies in particular when E is any of the Hom-finite Frobenius categories appearing in relation to cluster algebras.