Singular support for G-categories
Abstract
For a reductive group , we introduce a notion of singular support for cocomplete dualizable DG-categories equipped with a strong -action. This is done by considering the singular support of the sheaves of matrix coefficients arising from the action. We focus particularly on dualizable -categories whose singular support lies in the nilpotent cone of and refer to these as nilpotent -categories. For such categories, we give a characterization of the singular support in terms of the vanishing of its generalized Whittaker models. We study parabolic induction and restriction functors of nilpotent -categories and show that they interact with singular support in a desired way. We prove that if an orbit is maximal in the singular support of a nilpotent -category , the Hochschild homology of the generalized Whittaker model of coincides with the microstalk of the character sheaf of at that orbit. This should be considered a categorified analogue of a result of Moeglin-Waldspurger that the dimension of the generalized Whittaker model of a smooth admissible representation of a reductive group over a non-Archimedean local field of characteristic zero coincides with the Fourier coefficient in the wave-front set of that orbit. As a consequence, we give another proof of a theorem of Bezrukavnikov-Losev, classifying finite-dimensional modules for -algebras with fixed regular central character. More precisely, we realize the (rationalized) Grothendieck group of this category as a certain subrepresentation of the Springer representation. Along the way, we show that the Springer action of the Weyl group on the twisted Grothendieck--Springer sheaves is the categorical trace of the wall crossing functors, extending an observation of Zhu for integral central characters.
Cite
@article{arxiv.2410.18360,
title = {Singular support for G-categories},
author = {Gurbir Dhillon and Joakim Færgeman},
journal= {arXiv preprint arXiv:2410.18360},
year = {2025}
}
Comments
Corrected some mistakes and expanded on a few results