Remarks on Semistable Points and Nonabelian Convexity of Gradient Maps

Abstract

We study the action of a real reductive group G on a Kahler manifold Z which is the restriction of a holomorphic action of a complex reductive Lie group UC. We assume that the action of U, a maximal compact connected subgroup of UC on Z is Hamiltonian. If G⊂ UC is compatible, there is a corresponding gradient map μp: Z p, where g = k p is a Cartan decomposition of the Lie algebra of G. Our main results are the openness and connectedness of the set of semistable points associated with G-action on Z, a convexity theorem for the G-action on a G-invariant compact Lagrangian submanifold of Z, and a convexity result for two-orbit variety.