A reduction approach to silting objects for derived categories of hereditary categories

Abstract

Let H be a hereditary abelian category over a field k with finite dimensional Hom and Ext spaces. It is proved that the bounded derived category Db(H) has a silting object iff H has a tilting object iff Db(H) has a simple-minded collection with acyclic Ext-quiver. Along the way, we obtain a new proof for the fact that every presilting object of Db(H) is a partial silting object. We also consider the question of complements for pre-simple-minded collections. In contrast to presilting objects, a pre-simple-minded collection R of Db(H) can be completed into a simple-minded collection iff the Ext-quiver of R is acyclic.