Morrison-Kawamata cone conjecture for hyperkahler manifolds

Abstract

Let M be a simple holomorphically symplectic manifold, that is, a simply connected holomorphically symplectic manifold of Kahler type with h2,0=1. We prove that the group of holomorphic automorphisms of M acts on the set of faces of its Kahler cone with finitely many orbits, whenever b2(M)≠ 5. This is a version of the Morrison-Kawamata cone conjecture for hyperkahler manifolds. The proof is based on the following observation, proven with ergodic theory. Let M be a complete Riemannian orbifold of dimension at least three, constant negative curvature and finite volume, and \Si\ an infinite set of locally geodesic hypersurfaces. Then the union of Si is dense in M.