Publication date: 15 December 2024
Volume: Vol 59
Issue: Svezak 2
Pages: 327-349
DOI: 10.3336/gm.59.2.05
Izvorni znanstveni članak
https://doi.org/10.3336/gm.59.2.05
Generic irreducibility of parabolic induction for real reductive groups
David Renard
; Centre de mathématiques Laurent Schwartz, Ecole Polytechnique, 91128 Palaiseau Cedex, France
Let \(G\) be a real reductive linear group in the Harish-Chandra class. Suppose that \(P\) is a parabolic
subgroup of \(G\) with Langlands decomposition \(P=MAN\). Let \(\pi\) be an irreducible representation of the Levi factor \(L=MA\).
We give sufficient conditions on the infinitesimal character of \(\pi\) for the induced representation \(i_P^G(\pi)\) to be irreducible.
In particular, we prove that if \(\pi_M\) is an irreducible representation of \(M\), then, for a
generic character \(\chi_\nu\) of \(A\), the induced representation \(i_P^G(\pi_M\boxtimes \chi_\nu)\) is irreducible. Here the parameter \(\nu\) is in
\(\mathfrak{a}^*=(\mathrm{Lie}(A)\otimes_{\mathbb{R}} {\mathbb{C}})^*\) and generic means outside a countable, locally finite union of hyperplanes
which depends only on the infinitesimal character of \(\pi\).
Notice that there is no other assumption on \(\pi\) or \(\pi_M\) than being irreducible, so the result is not limited
to generalised principal series or standard representations, for which the result is already well known.
325174
27.12.2024.
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