English

Automorphic Gluing

Representation Theory 2022-04-21 v1 Algebraic Geometry

Abstract

We prove a gluing theorem on the automorphic side of the geometric Langlands correspondence: roughly speaking, we show that the difference between DMod(BunG)\mathrm{DMod}(\mathrm{Bun}_G) and its full subcategory DMod(BunG)temp\mathrm{DMod}(\mathrm{Bun}_G)^\mathrm{temp} of tempered objects is compensated by the categories DMod(BunM)temp\mathrm{DMod}(\mathrm{Bun}_M)^\mathrm{temp} for all standard Levi subgroups MGM \subsetneq G. This theorem is designed to match exactly with the spectral gluing theorem, an analogous result occurring on the other side of the geometric Langlands conjecture. Along the way, we state and prove several facts that might be of independent interest. For instance, for any parabolic PGP \subseteq G, we show that the functors CTP,:DMod(BunG)DMod(BunM)\mathrm{CT}_{P,*}:\mathrm{DMod}(\mathrm{Bun}_G) \to \mathrm{DMod}(\mathrm{Bun}_M) and EisP,:DMod(BunM)DMod(BunG)\mathrm{Eis}_{P,*}: \mathrm{DMod}(\mathrm{Bun}_M) \to \mathrm{DMod}(\mathrm{Bun}_G) preserve tempered objects, whereas the standard Eisenstein functor EisP,!\mathrm{Eis}_{P,!} preserves anti-tempered objects.

Keywords

Cite

@article{arxiv.2204.09141,
  title  = {Automorphic Gluing},
  author = {Dario Beraldo and Lin Chen},
  journal= {arXiv preprint arXiv:2204.09141},
  year   = {2022}
}

Comments

68 pages

R2 v1 2026-06-24T10:52:37.867Z