Local Energy Optimality of Periodic Sets

Abstract

We study the local optimality of periodic point sets in Rn for energy minimization in the Gaussian core model, that is, for radial pair potential functions fc(r)=e-c r with c>0. By considering suitable parameter spaces for m-periodic sets, we can locally rigorously analyze the energy of point sets, within the family of periodic sets having the same point density. We derive a characterization of periodic point sets being fc-critical for all c in terms of weighted spherical 2-designs contained in the set. Especially for 2-periodic sets like the family D+n we obtain expressions for the hessian of the energy function, allowing to certify fc-optimality in certain cases. For odd integers n≥ 9 we can hereby in particular show that D+n is locally fc-optimal among periodic sets for all sufficiently large~c.