Satake-Furstenberg compactifications and gradient map

Abstract

Let G be a real semisimple Lie group with finite center and let g= k p be a Cartan decomposition of its Lie algebra. Let K be a maximal compact subgroup of G with Lie algebra k and let τ be an irreducible representation of G on a complex vector space V. Let h be a Hermitian scalar product on V such that τ(G) is compatible with respect to U(V,h) C. We denote by μ p: P(V) p the G-gradient map and by O the unique closed orbit of G in P(V), which is a K-orbit, contained in the unique closed orbit of the Zariski closure of τ(G) in U(V,h) C. We prove that up to equivalence the set of irreducible representations of parabolic subgroups of G induced by τ are completely determined by the facial structure of the polar orbitope E=conv(μ p ( O)). Moreover, any parabolic subgroup of G admits a unique closed orbit which is well-adapted to O and μ p respectively. These results are new also in the complex reductive case. The connection between E and τ provides a geometrical description of the Satake compactifications without root data. In this context the properties of the Bourguignon-Li-Yau map are also investigated. Given a measure γ on O, we construct a map γ from the Satake compactification of G/K associated to τ and E. If γ is a K-invariant measure then γ is an homeomorphism of the Satake compactification and E. Finally, we prove that for a large class of measures the map γ is surjective.