Local parameters of supercuspidal representations
Abstract
For a connected reductive group over a non-archime\-dean local field of positive characteristic, Genestier and Lafforgue have attached a semisimple parameter to each irreducible representation . Our first result shows that the Genestier-Lafforgue parameter of a tempered can be uniquely refined to a tempered L-parameter , thus giving the unique local Langlands correspondence which is compatible with the Genestier-Lafforgue construction. Our second result establishes ramification properties of for unramfied and supercuspidal constructed by induction from an open compact (modulo center) subgroup. If is pure in an appropriate sense, we show that is ramified (unless is a torus). If the inducing subgroup is sufficiently small in a precise sense, we show is wildly ramified. The proofs are via global arguments, involving the construction of Poincar\'e series with strict control on ramification when the base curve is and a simple application of Deligne's Weil II.
Cite
@article{arxiv.2109.07737,
title = {Local parameters of supercuspidal representations},
author = {Wee Teck Gan and Michael Harris and Will Sawin and Raphaël Beuzart-Plessis},
journal= {arXiv preprint arXiv:2109.07737},
year = {2024}
}
Comments
Appendix by Rapha\"el Beuzart-Plessis added to version 3. The result on tempered Weil-Deligne parameters has been extended to discrete series, using the results of the Appendix. The result on ramification of pure supercuspidal parameters is now stated for general unramified reductive groups