Riesz Energy on the Torus: Regularity of Minimizers

Abstract

We study sets of N points on the d-dimensional torus Td minimizing interaction functionals of the type \[ Σi, j =1 i ≠ jN f(xi - xj). \] The main result states that for a class of functions f that behave like Riesz energies f(x) \|x\|-s for 0< s < d, the minimizing configuration of points has optimal regularity w.r.t. a Fourier-analytic regularity measure that arises in the study of irregularities of distribution. A particular consequence is that they are optimal quadrature points in the space of trigonometric polynomials up to a certain degree. The proof extends to other settings and also covers less singular functions such as f(x) = (- N2d \|x\|2 ).