Approximations and Hovey triples by objects of finite homological dimensions: Applications to sheaves

Abstract

Let Q be a class of objects in an abelian category A which need not have enough projective or injective objects. In this paper, we prove that if Q is the first class of a Hovey triple (Q,W,R) in A satisfying certain assumptions-weaker than those required in the recent literature-then Qn, the class of objects with Q-resolution dimension at most an integer n 0, forms the first class of a hereditary Hovey triple Mn=(Qn,WQ,n,RQ,n), where WQ,n and RQ,n are described explicitly. Consequently, Qn is the left-hand side of a complete hereditary cotorsion pair and hence a special precovering class. The dual statement is also established. As a main application, we construct an abelian model structure on Qcoh(X), the category of quasi-coherent sheaves over a semi-separated Noetherian scheme X, in which the cofibrant (resp. fibrant) objects are precisely the sheaves with Gorenstein flat (resp. Gorenstein injective) dimension at most n.