Energy minimization, periodic sets and spherical designs
Abstract
We study energy minimization for pair potentials among periodic sets in Euclidean spaces. We derive some sufficient conditions under which a point lattice locally minimizes the energy associated to a large class of potential functions. This allows in particular to prove a local version of Cohn and Kumar's conjecture that A2, D4, E8 and the Leech lattice are globally universally optimal, regarding energy minimization, and among periodic sets of fixed point density.
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