Calcul d'une valeur d'un facteur epsilon par une formule intégrale
arXiv:0910.2294
Abstract
Let d and m be two natural numbers of distinct parities. Let $Ï$ be an admissible irreducible tempered representation of GL(d,F), where F is a p-adic field. We assume that $Ï$ is self-dual. Then we can extend $Ï$ as a representation $\tildeÏ$ of a non-connected group $GL(d,F)\rtimes \{1,θ\}$. Let $Ï$ be a representation of GL(m,F). We assume that it has similar properties as $Ï$. Jacquet, Piatetski-Shapiro and Shalika have defined the factor $ε(s,Ï\timesÏ,Ï)$. We prove that we can compute $ε(1/2,Ï\timesÏ,Ï)$ by an integral formula where occur the characters of $\tildeÏ$ and $\tildeÏ$. It's similar to the formula which, for special orthogonal groups, computes the multiplicities appearing in the local Gross-Prasad conjecture.