Une formule intégrale reliée à la conjecture locale de Gross-Prasad, 2ème partie: extension aux représentations tempérées
arXiv:0904.0314
Abstract
Let $F$ be a non-archimedean local field, of characteristic 0. Let $V$ be a finite dimensional vector space over $F$ and $q$ be a non-degenerate quadratic form on $V$. Denote $G$ the special orthogonal group of $(V,q)$. Let $W$ a non-degenerate hyperplane of $V$, denote $H$ the special orthogonal group of $W$. Let $Ï$, resp. $Ï$, an admissible irreducible representation of $G(F)$, resp. $H(F)$. Denote $m(Ï,Ï)$ the dimension of the complex space $Hom_{H(F)}(Ï_{| H(F)},Ï)$. It's know that $m(Ï,Ï)=0$ or 1. In a first paper, we have defined another term $m_{geom}(Ï,Ï)$. It's an explicit sum of integrals of functions that can be deduced from the characters of $Ï$ and $Ï$. Assume that $Ï$ and $Ï$ are tempered. Then we prove the equality $m(Ï,Ï)=m_{geom}(Ï,Ï)$. This generalize the result of the first paper, where $Ï$ was supercuspidal. As in this paper, the previous equality implies as corollary (assuming certain properties of tempered $L$-packets) a weak form of the local Gross-Prasad conjecture, now for pairs of tempered $L$-packets.