Orbites unipotentes et poles d'ordre maximal de la fonction $μ$ de Harish-Chandra

Details Orbites unipotentes et poles d'ordre maximal de la fonction $μ$ de Harish-Chandra Orbites unipotentes et poles d'ordre maximal de la fonction $μ$ de Harish-Chandra

2004-04-07

arxiv.org/abs/math/0404177v1

Mathematics

Representation Theory

28 pages

Scientific paper

In a previous work, we have shown that a representation of a $p$-adic group obtained by (normalized) parabolic induction from an irreducible supercuspidal representation $\sigma $ of a Levi subgroup $M$ contains a subquotient which is square integrable, if and only if Harish-Chandra's $\mu $-function has a pole in $\sigma $ of order equal to the parabolic rank of $M$. The aim of the present article is to interpret this result in terms of Langlands' functoriality principle.

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