English

Tilting objects in singularity categories and levelled mutations

Representation Theory 2020-04-07 v1 Rings and Algebras

Abstract

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

Keywords

Cite

@article{arxiv.2004.02655,
  title  = {Tilting objects in singularity categories and levelled mutations},
  author = {Louis-Philippe Thibault},
  journal= {arXiv preprint arXiv:2004.02655},
  year   = {2020}
}

Comments

18 pages. Comments welcome

R2 v1 2026-06-23T14:41:00.965Z