Tilting objects in singularity categories and levelled mutations

Abstract

We show the existence of tilting objects in the singularity category D Sg gr(eAe) associated to certain noetherian AS-regular algebras A and idempotents e. This gives a triangle equivalence between D Sg gr(eAe) and the derived category of a finite-dimensional algebra. In particular, we obtain a tilting object if the Beilinson algebra of A is a levelled Koszul algebra. This generalises the existence of a tilting object in D Sg gr(SG), where S is a Koszul AS-regular algebra and G is a finite group acting on S, found by Iyama-Takahashi and Mori-Ueyama. Our method involves the use of Orlov's embedding of D Sg gr(eAe) into Db(qgr eAe), the bounded derived category of graded tails, and of levelled mutations on a tilting object of Db(qgr eAe).