Calcul d'une valeur d'un facteur epsilon par une formule intégrale

Let d and m be two natural numbers of distinct parities. Let $\pi$ be an admissible irreducible tempered representation of GL(d,F), where F is a p-adic field. We assume that $\pi$ is self-dual. Then we can extend $\pi$ as a representation $\tilde{\pi}$ of a non-connected group $GL(d,F)\rtimes {1,\theta}$. Let $\rho$ be a representation of GL(m,F). We assume that it has similar properties as $\pi$. Jacquet, Piatetski-Shapiro and Shalika have defined the factor $\epsilon(s,\pi\times\rho,\psi)$. We prove that we can compute $\epsilon(1/2,\pi\times\rho,\psi)$ by an integral formula where occur the characters of $\tilde{\pi}$ and $\tilde{\rho}$. It's similar to the formula which, for special orthogonal groups, computes the multiplicities appearing in the local Gross-Prasad conjecture.

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Source https://hal.science/hal-00423849
Author Waldspurger, Jean-Loup
Maintainer CCSD
Last Updated May 19, 2026, 23:26 (UTC)
Created May 19, 2026, 23:26 (UTC)
Identifier hal-00423849
Language fr
Rights https://about.hal.science/hal-authorisation-v1/
contributor Institut de Mathématiques de Jussieu (IMJ) ; Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS)
creator Waldspurger, Jean-Loup
date 2012-04-30T00:00:00
harvest_object_id a7caad96-da9e-4b5f-9d25-e974778c057f
harvest_source_id 3374d638-d20b-4672-ba96-a23232d55657
harvest_source_title test moissonnage SELUNE
metadata_modified 2024-04-22T00:00:00
relation info:eu-repo/semantics/altIdentifier/arxiv/0910.2294
set_spec type:UNDEFINED