On the generalized Ramanujan and Arthur conjectures over function fields
Abstract
Let be a simple group over a global function field , and let be a cuspidal automorphic representation of . Suppose has two places and (satisfying a mild restriction on the residue field cardinality), at which the group is quasi-split, such that is tempered and is unramified and generic. We prove that is tempered at all unramified places at which is unramified quasi-split. More generally, the set of unitary spherical representations is partitioned according to nilpotent conjugacy classes in the Lie algebra of . We show that if is in the set corresponding to the nilpotent class , and if satisfies an analogous hypothesis, then belongs to the same class , where is as above. These results are consistent with conjectures of Shahidi and Arthur. The proofs use the Galois parametrization of cuspidal representations due to V. Lafforgue to relate the local Satake parameters of to Deligne's theory of Frobenius weights. The main observation is that, in view of the classification of unitary spherical representations, due to Barbasch and the first-named author, the theory of weights excludes almost all complementary series as possible local components of . This in turn determines the local Frobenius weights at all unramified places. In order to apply this observation in practice we need a result of the second-named author with Gan and Sawin on the weights of discrete series representations.
Keywords
Cite
@article{arxiv.2311.15300,
title = {On the generalized Ramanujan and Arthur conjectures over function fields},
author = {Dan Ciubotaru and Michael Harris},
journal= {arXiv preprint arXiv:2311.15300},
year = {2023}
}
Comments
Expands and replaces "On the generalized Ramanujan conjecture over function fields," arXiv:2204.06053