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

D. P. Hardin; E. B. Saff; J. S. Brauchart

arxiv: 0808.1291 · v3 · pith:BPB7SFMGnew · submitted 2008-08-08 · 🧮 math-ph · math.MP

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

J. S. Brauchart , D. P. Hardin , E. B. Saff This is my paper

classification 🧮 math-ph math.MP

keywords expansionasymptoticenergypointsrieszanalyticcirclecomplete

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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 $N\to \infty$. For $s\ge -2$, such points form optimal energy $N$-point configurations with respect to the Riesz potential $1/r^{s}$, $s\neq0$, 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.

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