Geodesic
On Residues of Intertwining Operators inCases with Prehomogeneous Nilradical
Canadian journal of mathematics, Tome 69 (2017) no. 5, pp. 1169-1200

Voir la notice de l'article provenant de la source Cambridge University Press

Let $\text{P}\,\text{=}\,\text{M}\,\text{N}$ be a Levi decomposition of a maximal parabolic subgroup of a connected reductive group $\text{G}$ over a $p$ -adic field $F$ . Assume that there exists ${{w}_{0}}\,\in \,G\left( F \right)$ that normalizes $\text{M}$ and conjugates $\text{p}$ to an opposite parabolic subgroup. When $\text{N}$ has a Zariski dense $\text{Int}\,\text{M}$ -orbit, $\text{F}$ . Shahidi and $\text{X}$ . Yu described a certain distribution $D$ on $\text{M}\left( F \right)$ , such that, for irreducible unitary supercuspidal representations $\pi $ of $\text{M}\left( F \right)$ with $\pi \,\cong \,\pi \,\circ \,\text{Int}\,{{w}_{0}},\,\text{Ind}_{\text{P}\left( F \right)}^{\text{G}\left( F \right)}\,\pi $ is irreducible if and only if $D\left( f \right)\,\ne \,0$ for some pseudocoefficient $f$ of $\pi $ . Since this irreducibility is conjecturally related to $\pi $ arising via transfer from certain twisted endoscopic groups of $\text{M}$ , it is of interest to realize $D$ as endoscopic transfer from a simpler distribution on a twisted endoscopic group $\text{H}$ of $\text{M}$ . This has been done in many situations where $\text{N}$ is abelian. Here we handle the standard examples in cases where $\text{N}$ is nonabelian but admit a Zariski dense $\text{Int}\,\text{M}$ -orbit.
DOI : 10.4153/CJM-2016-032-3
Mots-clés : 22E50, 11F70, induced representation, intertwining operator, endoscopy 
On Residues of Intertwining Operators inCases with Prehomogeneous Nilradical. Canadian journal of mathematics, Tome 69 (2017) no. 5, pp. 1169-1200. doi: 10.4153/CJM-2016-032-3
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