Serre functor and torsion pairs
Abstract
Given a torsion pair (T,F) in an abelian category A and its Happel-Reiten-Smal tilt B, the equivalence of the realization functor Db( B) Db( A) is determined by some properties of the torsion pair [9]. We call (T,F) satisfying such a property effaceable. If A is an Ext-finite abelian category with Serre duality, we prove that (T,F) is effaceable implies that U T is closed under Serre functor. Conversely, when A is the module category of a finite-dimensional hereditary algebra, we prove that the torsion pair (T,F) is effaceable if and only if UT is closed under the Serre functor via a recollement of Db( A).
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