Recollements from Cotorsion Pairs

Abstract

Given a complete hereditary cotorsion pair (A,B) in a Grothendieck category G, the derived category D(B) of the exact category B is defined as the quotient of the category Ch(B), of unbounded complexes with terms in B, modulo the subcategory B consisting of the acyclic complexes with terms in B and cycles in B. We restrict our attention to the cotorsion pairs such that B coincides with the class exB of the acyclic complexes of Ch(G) with terms in B. In this case the derived category D(B) fits into a recollement exB ←→← K(B) ←→← Ch(B)exB . We will explore the conditions under which ex\,B=B and provide many examples. Symmetrically, we prove analogous results for the exact category A.