Nilpotent Invariants for Generic Discrete Series of Real Groups
Abstract
Let G(R) be a real reductive group. Suppose π is an irreducible representation of G(R) having a Whittaker model, and consider three invariants of π related to nilpotents elements of the Lie algebra of G (or its dual): the associated variety, the wave-front set, and the set of Whittaker data for which π has a Whittaker model. If π is a discrete series representation, these invariants are known to determine each other. We provide a self-contained account of this and related results, including an elementary proof that passage from π to the three invariants defines natural bijections between the generic discrete series in an L-packet, the possible Whittaker data for G(R), and the appropriate sets of nilpotent orbits. Given one of the three invariants, we also explain how to reconstruct the other two. Many of the results were known: we give simplified proofs for several of them, for instance a simple proof (for generic discrete series) that the associated variety and the wave-front set are related by the Kostant-Sekiguchi correspondence.
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