English

Generalized Springer Theory for D-modules on a Reductive Lie Algebra

Representation Theory 2025-07-08 v4 Algebraic Geometry

Abstract

Given a reductive group GG, we give a description of the abelian category of GG-equivariant DD-modules on g=Lie(G)\mathfrak{g}=\mathrm{Lie}(G), which specializes to Lusztig's generalized Springer correspondence upon restriction to the nilpotent cone. More precisely, the category has an orthogonal decomposition in to blocks indexed by cuspidal data (L,E)(L,\mathcal{E}), consisting of a Levi subgroup LL, and a cuspidal local system E\mathcal{E} on a nilpotent LL-orbit. Each block is equivalent to the category of DD-modules on the center z(l)\mathfrak{z}(\mathfrak{l}) of l\mathfrak{l} which are equivariant for the action of the relative Weyl group NG(L)/LN_G(L)/L. The proof involves developing a theory of parabolic induction and restriction functors, and studying the corresponding monads acting on categories of cuspidal objects. It is hoped that the same techniques will be fruitful in understanding similar questions in the group, elliptic, mirabolic, quantum, and modular settings.

Keywords

Cite

@article{arxiv.1510.02452,
  title  = {Generalized Springer Theory for D-modules on a Reductive Lie Algebra},
  author = {Sam Gunningham},
  journal= {arXiv preprint arXiv:1510.02452},
  year   = {2025}
}

Comments

46 pages. v4: Various proofs have been substantially revised to account for an error in an earlier version; main results unchanged. v3: More detail has been added, and some reorganization has taken place. Some of the proofs have been revised; main results unchanged. v2: New material on singular support added to replace the erroneous Lemma 4.10 in v1

R2 v1 2026-06-22T11:16:03.231Z