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Related papers: Non-commutative crepant resolutions

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In this paper we prove a common generalisation of results by \v{S}penko-Van den Bergh and Iyama-Wemyss that can be used to generate non-commutative crepant resolutions (NCCRs) of some affine toric Gorenstein varieties. We use and generalise…

Algebraic Geometry · Mathematics 2025-09-16 Aimeric Malter , Artan Sheshmani

We show that all toric noncommutative crepant resolutions (NCCRs) of affine GIT quotients of "weakly symmetric" unimodular torus representations are derived equivalent. This yields evidence for a non-commutative extension of a well known…

Algebraic Geometry · Mathematics 2018-04-10 Špela Špenko , Michel Van den Bergh , with an appendix by Jason P. Bell

The purpose of this paper is to construct a crepant resolution of quotient singularities by finite subgroups of SL(3,C) of monomial type, and prove that the Euler number of the resolution is equal to the number of conjugacy classes. This…

alg-geom · Mathematics 2008-02-03 Yukari Ito

A necessary condition for the existence of torus-equivariant crepant resolutions of Gorenstein toric singularities can be derived by making use of a variant of the classical Upper Bound Theorem which is valid for simplicial balls.

Algebraic Geometry · Mathematics 2007-05-23 Dimitrios I. Dais

We construct a consistent dimer model having the same symmetry as its characteristic polygon. This produces examples of non-commutative crepant resolutions of non-toric non-quotient Gorenstein singularities in dimension 3.

Algebraic Geometry · Mathematics 2023-11-28 Akira Ishii , Álvaro Nolla de Celis , Kazushi Ueda

We study deformations of certain crepant resolutions of isolated rational Gorenstein singularities. After a general discussion of the deformation theory, we specialize to dimension $3$ and consider examples which are good (log) resolutions…

Algebraic Geometry · Mathematics 2026-05-27 Robert Friedman , Radu Laza

We show a sufficient condition for Fujiki-Oka resolutions of Gorenstein abelian quotient singularities to be crepant in all dimensions by using Ashikaga's continuous fractions. Moreover, we prove that all three dimensional Gorenstein…

Algebraic Geometry · Mathematics 2020-09-11 Kohei Sato , Yusuke Sato

We prove that the tangent developables of the varieties appearing in the third row of the Tits-Freudenthal magic square admit categorical crepant resolutions of singularities.

Algebraic Geometry · Mathematics 2013-07-08 Roland Abuaf

We prove the existence and give a classification of toric non-commutative crepant resolutions (NCCRs) of Gorenstein toric singularities with divisor class group of rank one. We prove that they correspond bijectively to non-trivial upper…

Representation Theory · Mathematics 2026-04-22 Ryu Tomonaga

Given a rational convex polyhedral Gorenstein cone constructed as cone over a lattice polytope P, we establish that toric non-commutative crepant resolutions (NCCRs) of its associated toric algebra descend to toric NCCRs of the algebras…

Algebraic Geometry · Mathematics 2026-02-26 Aimeric Malter , Artan Sheshmani

We prove that every variety with log-terminal singularities admits a crepant resolution by a smooth Artin stack. We additionally prove new McKay correspondences for resolutions by Artin stacks, expressing stringy invariants of…

Algebraic Geometry · Mathematics 2023-04-25 Matthew Satriano , Jeremy Usatine

We present an algorithm that finds all toric noncommutative crepant resolutions of a given toric 3-dimensional Gorenstein singularity. The algorithm embeds the quivers of these algebras inside a real 3-dimensional torus such that the…

Algebraic Geometry · Mathematics 2015-03-19 Raf Bocklandt

In this paper we study endomorphism rings of finite global dimension over not necessarily normal commutative rings. These objects have recently attracted attention as noncommutative (crepant) resolutions, or NC(C)Rs, of singularities. We…

Commutative Algebra · Mathematics 2014-12-04 Hailong Dao , Eleonore Faber , Colin Ingalls

Let G be a finite subgroup of SL(n,C), then the quotient C^n/G has a Gorenstein canonical singularity. Bridgeland-King-Reid proved that the G-Hilbert scheme Hilb^G(C^3) gives a crepant resolution of the quotient C^3/G for any finite…

Algebraic Geometry · Mathematics 2019-06-04 Y. Sato

The purpose of this paper is to construct a crepant resolution of quotient singularities by trihedral groups ( finite subgroups of SL(3,C) of certain type ), and prove that each Euler number of the minimal model is equal to the number of…

alg-geom · Mathematics 2008-02-03 Yukari Ito

In this paper, we construct a crepant resolution for the quotient singularity $\mathbb{A}^4/A_4$ in characteristic 2, where $A_4$ is the alternating group of degree 4 with permutation action on $\mathbb{A}^4$. By computing the Euler number…

Algebraic Geometry · Mathematics 2024-10-18 Linghu Fan

Let X be an orbifold with crepant resolution Y. The Crepant Resolution Conjectures of Ruan and Bryan-Graber assert, roughly speaking, that the quantum cohomology of X becomes isomorphic to the quantum cohomology of Y after analytic…

Algebraic Geometry · Mathematics 2008-07-10 Tom Coates , Alessio Corti , Hiroshi Iritani , Hsian-Hua Tseng

We study the relationship between Gromov-Witten invariants of local $\mathbb{P}^4$ and Gromov-witten invariants of $[\mathbb{C}^5/\mathbb{Z}_5]$ for all genera. We state the crepant resolution conjecture in explicit form and prove this…

Algebraic Geometry · Mathematics 2017-07-18 Hyenho Lho

For orbifolds admitting a crepant resolution and satisfying a hard Lefschetz condition, we formulate a conjectural equivalence between the Gromov-Witten theories of the orbifold and the resolution. We prove the conjecture for the…

Algebraic Geometry · Mathematics 2007-05-23 Jim Bryan , Tom Graber

Let k be an algebraically closed field of characteristic zero. We show that the centre of a homologically homogeneous, finitely generated k-algebra has rational singularities. In particular if a finitely generated normal commutative…

Algebraic Geometry · Mathematics 2007-05-23 J. T. Stafford , M. Van den Bergh