On Minima of Difference of Epstein Zeta Functions and Exact Solutions to Lennard-Jones Lattice Energy
Abstract
Let ζ(s,z)=Σ(m,n)∈Z2\0\((z))s|mz+n|2s be the Eisenstein series/Epstein Zeta function. Motivated by widely used Lennard-Jones potential equation V(|·|2):=4( (σ|·|)12-(σ|·|)6 ), equation in physics, in this paper, we consider the following lattice minimization problem equation z∈H(ζ(6,z)-bζ(3,z)), \;\;b=1σ6 equation and completely classify the minimizers for all b∈ . Our results resolve an open problem in Blanc-Lewin Bla2015, and a conjecture by B\'etermin Bet2018. Furthermore, our method of proofs works for general minimization problem equation z∈H(ζ(s1,z)-bζ(s2,z)), \;\;s1>s2>1 equation which corresponds to general Lennard-Jones potential equation V(|·|2):=4( (σ|·|)2s1-(σ|·|)2s2 ),\;\;s1>s2>1. equation
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