The negative energy N-body problem has finite diameter

Abstract

The Jacobi-Maupertuis metric provides a reformulation of the classical N-body problem as a geodesic flow on an energy-dependent metric space denoted ME where E is the energy of the problem. We show that ME has finite diameter for E < 0. Consequently ME has no metric rays. Motivation comes from work of Burgos- Maderna and Polimeni-Terracini for the case E 0 and from a need to correct an error made in a previous ``proof''. We show that ME has finite diameter for E < 0 by showing that there is a constant D such that all points of the Hill region lie a distance D from the Hill boundary. (When E 0 the Hill boundary is empty.) The proof relies on a game of escape which allows us to quantify the escape rate from a closed subset of configuration space, and the reduction of this game to one of escaping the boundary of a polyhedral convex cone into its interior.