Locally type FPn and n-coherent categories

Abstract

We study finiteness conditions in Grothendieck categories by introducing the concepts of objects of type FPn and studying their closure properties with respect to short exact sequences. This allows us to propose a notion of locally type FPn categories as a generalization of locally finitely generated and locally finitely presented categories. We also define and study the injective objects that are Ext-orthogonal to the class of objects of type FPn, called FPn-injective objects, which will be the right half of a complete cotorsion pair. As a generalization of the category of modules over an n-coherent ring, we present the concept of n-coherent categories, which also recovers the notions of locally noetherian and locally coherent categories for n = 0, 1. Such categories will provide a setting in which the FPn-injective cotorsion pair is hereditary, and where it is possible to construct (pre)covers by FPn-injective objects. Moreover, we see how n-coherent categories provide a suitable framework for a nice theory of Gorenstein homological algebra with respect to the class of FPn-injective modules. We define Gorenstein FPn-injective objects and construct two different model category structures (one abelian and the other one exact) in which these Gorenstein objects are the fibrant objects.