Minimal Projective Orbits of Semi-simple Lie Groups

Abstract

Let G be a Lie group G with representation on a real simple G-module V. We will call the orbits of the induced action of on the projectivization PV the projective orbits, and projective orbits of lowest possible dimension will be called minimal. We show that when G is semi-simple and non-compact, there exists a compact subgroup K⊂ G such that the minimal orbits of G are in bijection with the minimal K-orbits on a K-invariant proper subspace W⊂ V. In the case that G is split-real, K is the trivial subgroup and there is a unique closed projective orbit, which is moreover of minimal dimension.