Arithmetic Wavefront Sets and Generic $L$-packets
Abstract
Let be a classical group defined over a local field of characteristic zero. Let be an irreducible admissible representation of , which is of Casselman-Wallach type if is archimedean. If has a generic local -parameter, we define the arithmetic wavefront set of , which is a subset of -rational nilpotent orbits of the Lie algebra of , by means of the arithmetic structures of the enhanced -parameter of . Those arithmetic structures are discovered by using our method of consecutive descents of enhanced -parameters, based on the rationality of the local Langlands correspondence and the local Gan-Gross-Prasad conjecture. We study the basic structure of and prove that it is an invariant of (Theorem 5.10). Furthermore, those basic structures are expected to yield the precise -rational structure of , which has been realized, when is archimedean, in Theorems 1.3 and 1.4 (Theorems 7.10, 7.14, and 9.2). Based on the local Langlands reciprocity, the Wavefront Set Conjecture (Conjecture 1.2 and Conjecture 5.14) asserts that the wavefront sets on the L-parameter side should be closed related to those on the representation side, namely, when has a generic local -parameter, where the algebraic wavefront set is defined by Moeglin and Waldspurger in [MW87], using generalized Whittaker models and the analytic wavefront set is defined by Howe [H81, Hd85] using distribution characters, and also by [H74, HC78, BV80]. Conjecture 1.2 is verified for families of interesting cases.
Keywords
Cite
@article{arxiv.2207.04700,
title = {Arithmetic Wavefront Sets and Generic $L$-packets},
author = {Dihua Jiang and Dongwen Liu and Lei Zhang},
journal= {arXiv preprint arXiv:2207.04700},
year = {2025}
}
Comments
Revised based on a referee report