Discrete Transformations in the Thomson Problem

Abstract

A significantly lower upper limit to minimum energy solutions of the electrostatic Thomson Problem is reported. A point charge is introduced to the origin of each N-charge solution. This raises the total energy by N as an upper limit to each (N+1)-charge solution. Minimization of energy to U(N+1) is well fit with -0.5518(3/2) N+1/2 for up to N=500. The energy distribution due to this displacement exhibits correspondences with shell-filling behavior in atomic systems. This work may aid development of more efficient and innovative numerical search algorithms to obtain N-charge configurations having global energy minima and yield new insights to atomic structure.