论文信息 - Energy Minimization, Periodic Sets and Spherical Designs

Energy Minimization, Periodic Sets and Spherical Designs

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 $\mathsf{A}_2$, $\mathsf{D}_4$, $\mathsf{E}_8$ and the Leech lattice are globally universally optimal, regarding energy minimization, and among periodic sets of fixed point density.

Renaud Coulangeon | Achill Schurmann | Achill Schurmann | R. Coulangeon

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