Model Structures Arising from Extendable Cotorsion Pairs

Abstract

The aim of this paper is to construct exact model structures from so called extendable cotorsion pairs. Given a hereditary Hovey triple (C, W, F) in a weakly idempotent complete exact category with enough projectives and injectives. If one of the cotorsion pairs (C, F) and (C, W) is extendable, then there is a chain of hereditary Hovey triples whose corresponding homotopy categories coincide. As applications, we obtain a new description of the Q-shaped derived categories introduced by Holm and J rgensen. We can also interpret the Krause's recollement in terms of ``n-dimensional'' homotopy categories. Finally, we have two approaches to get ``n-dimensional'' hereditary Hovey triples, which are proved to coincide, in the category Rep(Q,A) of all representations of a rooted quiver Q with values in an abelian category A.