Self-focal points of ellipsoids of dimension ≥ 3

Abstract

A self-focal point of a Riemannian manifold (M,g) is a point p so that every geodesic starting from p returns to p at some positive time. It is called a pole if all geodesics through p are closed, and a non-polar self-focal point if all geodesics loop back but not all are smoothly closed. Umbilic points of two dimensional tri-axial ellipsoids are non-polar self-focal points. Little is known about existence of self-focal points for Riemannian manifolds of dimension ≥ 3. We prove that ellipsoids of dimension ≥ 3 with at least 4 distinct axes have no self-focal points. Certain ellipsoids of dimension ≥ 3 with three distinct axes do have non-polar self-focal points. Ellipsoids with ≤ 2 distinct axes always have self-focal points. Self-focal points play an important role in the study of L∞ norms of Laplace eigenfunctions. Our results imply that Laplace eigenfunctions on ellipsoids of dimension ≥ 3 with at least 4 distinct axes never achieve maximal sup-norm growth.