Generic irreducibility of parabolic induction for real reductive groups
Abstract
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 π be an irreducible representation of the Levi factor L=MA. We give sufficient conditions on the infinitesimal character of π for the induced representation iPG(π) to be irreducible. In particular, we prove that if πM is an irreducible representation of M, then for a generic character of A, the induced representation iPG(πM ) is irreducible. Here the parameter is in a*=(Lie(A) R C)* and generic means outside a countable, locally finite union of hyperplanes which depends only on the infinitesimal character of π. Notice that there is no other assumption on π or πM than being irreducible, so the result is not limited to generalised principal series or standard representations, for which the result is already well known.
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