Dario Beraldo
Published 2019-06-03Version 1
In the setting of the geometric Langlands conjecture, we argue that the phenomenon of divergence at infinity on Bun_G (that is, the difference between $!$-extensions and $*$-extensions) is controlled, Langlands-dually, by the locus of semisimple $\check{G}$-local systems. To see this, we first rephrase the question in terms of Deligne-Lusztig duality and then study the Deligne-Lusztig functor DL_G^\spec acting on the spectral Langlands DG category IndCoh_N(LS_G). We prove that DL_G^\spec is the projection IndCoh_N(LS_G) \to QCoh(LS_G), followed by the action of a coherent D-module St_G which we call the {Steinberg} D-module. We argue that St_G might be regarded as the dualizing sheaf of the locus of semisimple $G$-local systems. We also show that DL_G^\spec, while far from being conservative, is fully faithful on the subcategory of compact objects.
Comments: preliminary version
Cohomology of twisted $\mathcal{D}$-modules on $\mathbb{P}^1$ obtained as extensions from $\mathbb{C}^{\times}$
On Extensions of supersingular representations of ${\rm SL}_2(\mathbb{Q}_p)$
Extensions of differential representations of SL(2) and tori
![QR code for arXiv:1906.00934 [math.RT]](http://oss.arxitics.com/images/favicon.svg)