With respect to whom are you critical?

Abstract

For any compact Riemannian surface S and any point y in S, Qy-1 denotes the set of all points in S, for which y is a critical point. We proved BIVZ together with Imre B\'ar\'any that cardQy-1 ≥ 1, and that equality for all y∈ S characterizes the surfaces homeomorphic to the sphere. Here we show, for any orientable surface S and any point y ∈ S, the following two main results. There exist an open and dense set of Riemannian metrics g on S for which y is critical with respect to an odd number of points in S, and this is sharp. CardQy-1 ≤ 5 for the torus and cardQy-1 ≤ 8g-5 if the genus g of S is at least 2. Properties involving points at globally maximal distance on S are eventually presented.