Restricting Representations from a Complex Group to a Real Form
Abstract
Let G be a complex connected reductive algebraic group and let GR be a real form of G. We construct a sequence of functors LiR from admissible (resp. finite-length) representations of G to admissible (resp. finite-length) representations of GR. We establish many basic properties of these functors, including their behavior with respect to infinitesimal character, associated variety, and restriction to a maximal compact subgroup. We deduce that each LiR takes unipotent representations of G to unipotent representations of GR. Taking the alternating sum of LiR, we get a well-defined homomorphism on the level of characters. We compute this homomorphism in the case when GR is split.
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