A Hilbert-Mumford Criterion for polystability for actions of real reductive Lie groups

Abstract

We presented a Hilbert-Mumford criterion for polystablility associated with an action of a real reductive Lie group G on a real submanifold X of a Kahler manifold Z. Suppose the action of a compact Lie group with Lie algebra u extends holomorphically to an action of the complexified group UC and that the U-action on Z is Hamiltonian. If G⊂ UC is compatible, there is a corresponding gradient map μp: X p, where g = k p is a Cartan decomposition of the Lie algebra of G. Under some mild restrictions on the G-action on X, we characterize which G-orbits in X intersect μp-1(0) in terms of the maximal weight function, which we viewed as a collection of maps defined on the boundary at infinity (∂∞ G/K) of the symmetric space G/K.