On G/N-Hilb of N-Hilb

Ishii, Akira; Ito, Yukari; Celis, Álvaro Nolla de

doi:10.1215/21562261-1966080

Cited by 6 publications

(7 citation statements)

References 15 publications

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“…In the case of G-constellations for non-abelian G & GLð2; CÞ, we shall use the iterated construction of moduli spaces for a normal subgroup of G as in [IINdC13]. In order to do so, we have to consider G-constellations on a variety, rather than an a‰ne space.…”

Section: G-constellations On a Varietymentioning

confidence: 99%

“…We can show that the conjecture is true if G is abelian (Theorem 5) by using the result of [CI04]. The idea in the non-abelian case of Theorem 1 is to use iterated construction of moduli spaces as in [IINdC13] and reduce the problem to the abelian group case. Namely, let N be the cyclic group generated by ÀI , which is a normal subgroup of every non-abelian finite small subgroup.…”

Section: Introductionmentioning

confidence: 99%

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$G$-constellations and the maximal resolution of a quotient surface singularity

Ishii¹

2020

Hiroshima Math. J.

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For a finite subgroup G of GLð2; CÞ, we consider the moduli space M y of G-constellations. It depends on the stability parameter y and if y is generic it is a resolution of singularities of C 2 =G. In this paper, we show that a resolution Y of C 2 =G is isomorphic to M y for some generic y if and only if Y is dominated by the maximal resolution under the assumption that G is abelian or small. 2010 Mathematics Subject Classification. 14D20; 14E16; 14J17. Key words and phrases. G-constellation, quotient singularity, maximal resolution. G-constellations onthat H 0 ðEÞ is isomorphic to the regular representation of G as a C½G-module.

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Section: G-constellations On a Varietymentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

$G$-constellations and the maximal resolution of a quotient surface singularity

Ishii¹

2020

Hiroshima Math. J.

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“…The unlocking procedure for this curve is shown in Fig. 26 giving G-igpC 3 q t1, 2,3,4,5,6,8,9,10,12,13,14,16,17,18,20,21,22,24,25,26,28,29,30, 32, 33, 34u. Notice that every chain meeting the 3-chain in a vertex is broken there.…”

Section: Examplementioning

confidence: 99%

“…We complete the description of wall-crossing behaviours from [25] by calling a wall Type 0 if the corresponding contraction is a isomorphism. This explicit and malleable description of the walls for C 0 has applications to studying the birational geometry of other crepant resolutions of A 3 {G. In forthcoming work [18], the author and Y. Ito use this description of C 0 to study the geometry of another Hilbert scheme-like resolution introduced in [14] called the "iterated G-Hilbert scheme" or "Hilb of Hilb".…”

Section: Introductionmentioning

confidence: 99%

Walls for G-Hilb via Reid's Recipe

Wormleighton

2020

SIGMA

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The three-dimensional McKay correspondence seeks to relate the geometry of crepant resolutions of Gorenstein 3-fold quotient singularities A 3 {G with the representation theory of the group G. The first crepant resolution studied in depth was the G-Hilbert scheme G-Hilb A 3 , which is also a moduli space of θ-stable representations of the McKay quiver associated to G. As the stability parameter θ varies, we obtain many other crepant resolutions. In this paper we focus on the case where G is abelian, and compute explicit inequalities for the chamber of the stability space defining G-Hilb A 3 in terms of a marking of exceptional subvarieties of G-Hilb A 3 called Reid's recipe. We further show which of these inequalities define walls. This procedure depends only on the combinatorics of the exceptional fibre and has applications to the birational geometry of other crepant resolutions.

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“…We can show that the conjecture is true if G is abelian (Theorem 5.1) by using the result of [CI04]. The idea in the nonabelian case of Theorem 1.1 is to use iterated construction of moduli spaces as in [IINdC13] and reduce the problem to the abelian group case. Namely, let N be the cyclic group generated by −I, which is a normal subgroup of every non-abelian finite small subgroup.…”

Section: Introductionmentioning

confidence: 99%

$G$-constellations and the maximal resolution of a quotient surface singularity

Ishii¹

2017

Preprint

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For a finite subgroup G of GL(2, C), we consider the moduli space M θ of G-constellations. It depends on the stability parameter θ and if θ is generic it is a resolution of singularities of C 2 /G. In this paper, we show that a resolution Y of C 2 /G is isomorphic to M θ for some generic θ if and only if Y is s dominated by the maximal resolution under the assumption that G is abelian or small. G-constellations on C n DefinitionsLet V = C n be an affine space and G ⊂ GL(V ) a finite subgroup.

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On G/N-Hilb of N-Hilb

Cited by 6 publications

References 15 publications

$G$-constellations and the maximal resolution of a quotient surface singularity

$G$-constellations and the maximal resolution of a quotient surface singularity

Walls for G-Hilb via Reid's Recipe

$G$-constellations and the maximal resolution of a quotient surface singularity

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