A new linear quotient of C 4 admitting a symplectic resolution

Author(s)

Bellamy, Gwyn; Schedler, Travis

Abstract

We show that the quotient C[superscript 4]/G admits a symplectic resolution for G = Q[subscript 8] x [subscript Z/2]D[subscript 8] < Sp[subscript 4](C). Here Q[subscript 8] is the quaternionic group of order eight and D[subscript 8] is the dihedral group of order eight, and G is the quotient of their direct product which identifies the nontrivial central elements −Id of each. It is equipped with the tensor product representation C[superscript 2] ⊠ C[superscript 2] ≅ C[superscript 4]. This group is also naturally a subgroup of the wreath product group Q[superscript 8][subscript 2] ⋊ S[subscript 2] < Sp[subscript 4](C). We compute the singular locus of the family of commutative spherical symplectic reflection algebras deforming C[superscript 4]/G. We also discuss preliminary investigations on the more general question of classifying linear quotients V/G admitting symplectic resolutions.

Description

C2 C2 ∼= C4.

Date issued

2012-04

URI

http://hdl.handle.net/1721.1/104945

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Mathematische Zeitschrift

Publisher

Springer-Verlag

Citation

Bellamy, Gwyn, and Travis Schedler. “A New Linear Quotient of C 4 Admitting a Symplectic Resolution.” Mathematische Zeitschrift 273.3–4 (2013): 753–769.

Version: Author's final manuscript

ISSN

0025-5874

1432-1823