The Riesz energy of the N-th roots of unity: an asymptotic expansion for large N

Abstract

We derive the complete asymptotic expansion in terms of powers of N for the Riesz s-energy of N equally spaced points on the unit circle as N ∞. For s -2, such points form optimal energy N-point configurations with respect to the Riesz potential 1/rs, s≠0, where r is the Euclidean distance between points. By analytic continuation we deduce the expansion for all complex values of s. The Riemann zeta function plays an essential role in this asymptotic expansion.