The Kepler Problem with Anisotropic Perturbations

Abstract

We study a 2-body problem given by the sum of the Newtonian potential and an anisotropic perturbation that is a homogeneous function of degree -β, β 2. For β>2, the sets of initial conditions leading to collisions/ejections and the one leading to escapes/captures have positive measure. For β>2 and β 3, the flow on the zero-energy manifold is chaotic. For β=2, a case we prove integrable, the infinity manifold of the zero-energy level is a disconnected set, which has heteroclinic connections with the collision manifold.