English

Springer's Weyl group representation via localization

Algebraic Geometry 2019-08-15 v3 Group Theory

Abstract

Let GG denote a reductive algebraic group over C\mathbb{C} and xx a nilpotent element of its Lie algebra g\mathfrak{g}. The Springer variety Bx\mathcal{B}_x is the closed subvariety of the flag variety B\mathcal{B} of GG parameterizing the Borel subalgebras of g\mathfrak{g} containing xx. It has the remarkable property that the Weyl group WW of GG admits a representation on the cohomology of Bx\mathcal{B}_x even though WW rarely acts on Bx\mathcal{B}_x itself. Well-known constructions of this action due to Springer et al use technical machinery from algebraic geometry. The purpose of this note is to describe an elementary approach that gives this action when xx is what we call parabolic-surjective. The idea is to use localization to construct an action of WW on the equivariant cohomology algebra HS(Bx)H_S^*(\mathcal{B}_x), where SS is a certain algebraic subtorus of GG. This action descends to H(Bx)H^*(\mathcal{B}_x) via the forgetful map and gives the desired representation. The parabolic-surjective case includes all nilpotents of type AA and, more generally, all nilpotents for which it is known that WW acts on HS(Bx)H_S^*(\mathcal{B}_x) for some torus SS. Our result is deduced from a general theorem describing when a group action on the cohomology of the fixed point set of a torus action on a space lifts to the full cohomology algebra of the space.

Keywords

Cite

@article{arxiv.1505.06404,
  title  = {Springer's Weyl group representation via localization},
  author = {Jim Carrell and Kiumars Kaveh},
  journal= {arXiv preprint arXiv:1505.06404},
  year   = {2019}
}

Comments

6 pages, title changed and made shorter, the presentation of the paper totally revised, final version to appear in the Canadian Mathematical Bulletin

R2 v1 2026-06-22T09:40:20.457Z