• Title/Summary/Keyword: quotient singularities

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INVARIANTS OF DEFORMATIONS OF QUOTIENT SURFACE SINGULARITIES

  • Han, Byoungcheon;Jeon, Jaekwan;Shin, Dongsoo
    • Journal of the Korean Mathematical Society
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    • v.56 no.5
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    • pp.1173-1246
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    • 2019
  • We find all P-resolutions of quotient surface singularities (especially, tetrahedral, octahedral, and icosahedral singularities) together with their dual graphs, which reproduces (a corrected version of) Jan Steven's list [Manuscripta Math. 1993] of the numbers of P-resolutions of each singularities. We then compute the dimensions and Milnor numbers of the corresponding irreducible components of the reduced base spaces of versal deformations of each singularities. Furthermore we realize Milnor fibers as complements of certain divisors (depending only on the singularities) in rational surfaces via the semi-stable minimal model program for 3-folds. Then we compare Milnor fibers with minimal symplectic fillings, where the latter are classified by Bhupal and Ono [Nagoya Math. J. 2012]. As an application, we show that there are 6 pairs of entries in the list of Bhupal and Ono [Nagoya Math. J. 2012] such that two entries in each pairs represent diffeomorphic minimal symplectic fillings.

RESOLUTION OF QUOTIENT SINGULARITIES VIA G-CONSTELLATIONS

  • Seung-Jo Jung
    • Bulletin of the Korean Mathematical Society
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    • v.61 no.2
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    • pp.519-527
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    • 2024
  • For a finite subgroup G of GLn(ℂ), the moduli space 𝓜𝜃 of 𝜃-stable G-constellations is rarely smooth. This note shows that for a group G of type ${\frac{1}{r}}(1,a,b)$ with r = abc + a + b, there is a generic stability parameter 𝜃 ∈ Θ such that the birational component Y𝜃 of 𝜃-stable G-constellations provides a resolution of the quotient singularity X := ℂ3/G.

The rings of invariants of finite abelian subgroups of $GL(2,C)$ of order $leq 18$

  • Keum, J.H.;Choi, N.S.
    • Communications of the Korean Mathematical Society
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    • v.12 no.4
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    • pp.951-973
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    • 1997
  • We classify up to conjugation all finite abelian subgroups of $GL(2,C)$ of order $\leq 18$ and compute the generators and relations of their rings of invariants. In other words, we classify all 2-dimensional quotient singularities by an abelian group of order $\leq 18$ and compute the generators and relations of their affine coordinate rings.

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SYMPLECTIC FILLINGS OF QUOTIENT SURFACE SINGULARITIES AND MINIMAL MODEL PROGRAM

  • Choi, Hakho;Park, Heesang;Shin, Dongsoo
    • Journal of the Korean Mathematical Society
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    • v.58 no.2
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    • pp.419-437
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    • 2021
  • We prove that every minimal symplectic filling of the link of a quotient surface singularity can be obtained from its minimal resolution by applying a sequence of rational blow-downs and symplectic antiflips. We present an explicit algorithm inspired by the minimal model program for complex 3-dimensional algebraic varieties.

IRREDUCIBILITY OF THE MODULI SPACE FOR THE QUOTIENT SINGULARITY $\frac{1}{2k+1}(k+1,1,2k)$

  • Seung-Jo, Jung
    • Bulletin of the Korean Mathematical Society
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    • v.59 no.6
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    • pp.1409-1422
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    • 2022
  • A 3-fold quotient terminal singularity is of the type $\frac{1}{r}(b,1,-1)$ with gcd(r, b) = 1. In [6], it is proved that the economic resolution of a 3-fold terminal quotient singularity is isomorphic to a distinguished component of a moduli space 𝓜𝜃 of 𝜃-stable G-constellations for a suitable 𝜃. This paper proves that each connected component of the moduli space 𝓜𝜃 has a torus fixed point and classifies all torus fixed points on 𝓜𝜃. By product, we show that for $\frac{1}{2k+1}(k+1,1,-1)$ case the moduli space 𝓜𝜃 is irreducible.

A-HILBERT SCHEMES FOR ${\frac{1}{r}}(1^{n-1},\;a)$

  • Jung, Seung-Jo
    • The Pure and Applied Mathematics
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    • v.29 no.1
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    • pp.59-68
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    • 2022
  • For a finite group G ⊂ GL(n, ℂ), the G-Hilbert scheme is a fine moduli space of G-clusters, which are 0-dimensional G-invariant subschemes Z with H0(𝒪Z ) isomorphic to ℂ[G]. In many cases, the G-Hilbert scheme provides a good resolution of the quotient singularity ℂn/G, but in general it can be very singular. In this note, we prove that for a cyclic group A ⊂ GL(n, ℂ) of type ${\frac{1}{r}}$(1, …, 1, a) with r coprime to a, A-Hilbert Scheme is smooth and irreducible.