A family of explicit minimizers for interaction energies

Abstract

In this paper we consider the minimizers of the interaction energies with the power-law interaction potentials W( x) = | x|aa - | x|bb in d dimensions. For odd d with (a,b)=(3,2-d) and even d with (a,b)=(3,1-d), we give the explicit formula for the unique energy minimizer up to translation. For the odd dimensions, the key observation is that successive Laplacian of the Euler-Lagrange condition gives a local partial differential equation for the minimizer. For the even dimensions d, the minimizer is given as the projection and rescaling of the previously constructed minimizer in dimension d+1 via a new lemma on dimension reduction.