S\'eparation des repr\'esentations par des surgroupes quadratiques

Abstract

Let π be an unitary irreducible representation of a Lie group G. π defines a moment set Iπ, subset of the dual g* of the Lie algebra of G. Unfortunately, Iπ does not characterize π. However, we sometimes can find an overgroup G+ for G, and associate, to π, a representation π+ of G+ in such a manner that Iπ+ characterizes π, at least for generic representations π. If this construction is based on polynomial functions with degree at most 2, we say that G+ is a quadratic overgroup for G. In this paper, we prove the existence of such a quadratic overgroup for many different classes of G.