Maximal polarization for periodic configurations on the real line

Abstract

We prove that among all 1-periodic configurations of points on the real line R the quantities x ∈ R Σγ ∈ e- π α (x - γ)2 and x ∈ R Σγ ∈ e- π α (x - γ)2 are maximized and minimized, respectively, if and only if the points are equispaced and whenever the number of points n per period is sufficiently large (depending on α). This solves the polarization problem for periodic configurations with a Gaussian weight on R for large n. The first result is shown using Fourier series. The second result follows from work of Cohn and Kumar on universal optimality and holds for all n (independent of α).