English

Singularity categories via the derived quotient

Algebraic Geometry 2021-07-13 v3 Representation Theory

Abstract

Given a noncommutative partial resolution A=EndR(RM)A=\mathrm{End}_R(R\oplus M) of a Gorenstein singularity RR, we show that the relative singularity category ΔR(A)\Delta_R(A) of Kalck-Yang is controlled by a certain connective dga A/LAeAA/^{\mathbb{L}}\kern -2pt AeA, the derived quotient of Braun-Chuang-Lazarev. We think of A/LAeAA/^{\mathbb{L}}\kern -2pt AeA as a kind of `derived exceptional locus' of the partial resolution AA, as we show that it can be thought of as the universal dga fitting into a suitable recollement. This theoretical result has geometric consequences. When RR is an isolated hypersurface singularity, it follows that the singularity category Dsg(R)D_\mathrm{sg}(R) is determined completely by A/LAeAA/^{\mathbb{L}}\kern -2pt AeA, even when AA has infinite global dimension. Thus our derived contraction algebra classifies threefold flops, even those XSpec(R)X \to \mathrm{Spec} (R) where XX has only terminal singularities. This gives a solution to the strongest form of the derived Donovan-Wemyss conjecture, which we further show is the best possible classification result in this singular setting.

Keywords

Cite

@article{arxiv.2003.05439,
  title  = {Singularity categories via the derived quotient},
  author = {Matt Booth},
  journal= {arXiv preprint arXiv:2003.05439},
  year   = {2021}
}

Comments

46 pages. This is an improvement of the second half of arXiv:1810.10060, split off for publication. v2: proof of 6.4.6 improved, other minor refinements. To appear in Advances in Mathematics. v3: error in published version corrected, see http://mattbooth.info/papers/singcats-errata.pdf for the full errata

R2 v1 2026-06-23T14:11:57.301Z