Polarization optimality of equally spaced points on the circle for discrete potentials
Abstract
We prove a conjecture of Ambrus, Ball and Erd\'elyi that equally spaced points maximize the minimum of discrete potentials on the unit circle whenever the potential is of the form Σk=1n f(d(z,zk)), where f:[0,π] [0,∞] is non-increasing and strictly convex and d(z,w) denotes the geodesic distance between z and w on the circle.
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