Derived equivalences induced by nonclassical tilting objects
Abstract
Suppose that A is an abelian category whose derived category D(A) has Hom sets and arbitrary (small) coproducts, let T be a (not necessarily classical) (n-)tilting object of A and let H be the heart of the associated t-structure on D(A). We show that the inclusion functor H(A) extends to a triangulated equivalence of unbounded derived categories D(H)D(A). The result admits a straightforward dualization to cotilting objects in abelian categories whose derived category has Hom sets and arbitrary products.
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