English

On the Localisation Theorem for rational Cherednik algebra modules

Representation Theory 2014-02-11 v1

Abstract

Let WW be a complex reflection group of the form G(l,1,n)G(l,1,n). Following [BK12, BPW12, Gor06, GS05, GS06, KR08, MN11], the theory of deform quantising conical symplectic resolutions allows one to study the category of modules for the spherical Cherednik algebra, Uc(W)U_\textbf{c}(W), via a functor, Tc,θ\mathbb T_{\textbf{c},\theta}, which takes invariant global sections of certain twisted sheaves on some Nakajima quiver variety YθY_\theta. A parameter for the Cherednik algebra, c\textbf{c}, is considered `good' if there exists a choice of GIT parameter θ\theta, such that Tc,θ\mathbb T_{\textbf{c},\theta} is exact and `bad' otherwise. By calculating the Kirwan--Ness strata for θ=±(1,,1)\theta=\pm(1,\ldots,1) and using criteria of [MN13], it is shown that the set of all bad parameters is bounded. The criteria are then used to show that, for the cases W=Sn,μ3,B2W=\mathfrak S_n, \mu_3, B_2, all parameters are good.

Keywords

Cite

@article{arxiv.1402.2253,
  title  = {On the Localisation Theorem for rational Cherednik algebra modules},
  author = {Rollo Jenkins},
  journal= {arXiv preprint arXiv:1402.2253},
  year   = {2014}
}
R2 v1 2026-06-22T03:05:03.888Z