Minimizing Lattice Energy and Hexagonal Crystallization
Abstract
Consider the energy per particle on the lattice given by Σ P∈ |P|4 e-π α |P|2 , where α >0 and is a two dimensional lattice. We prove that for α≥32, among two dimensional lattices with unit density, such energy minimum is attained at eiπ3, corresponding to the hexagonal lattice. Our result partially answers some open questions proposed by B\'etermin.
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