Discrete logarithmic energy on the sphere

P. D. Dragnev; D. A. Legg; D. W. Townsend

Journal ArticleOPEN ACCESS

Discrete logarithmic energy on the sphere

Pacific Journal of Mathematics (2002) 207(2) 345-358

DOI: 10.2140/pjm.2002.207.345

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Abstract

In this article we consider the problem posed by Whyte, about the distribution of N point charges on the unit sphere, whose mutual distances have maximal geometric mean. Some properties of the extremal points are discussed. In the case when N = 5 the optimal configuration is established rigorously, which solves an open problem communicated by Rakhmanov.

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Dragnev, P. D., Legg, D. A., & Townsend, D. W. (2002). Discrete logarithmic energy on the sphere. Pacific Journal of Mathematics, 207(2), 345–358. https://doi.org/10.2140/pjm.2002.207.345

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Discrete logarithmic energy on the sphere

Abstract

References Powered by Scopus

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Equilibrium configurations of N equal charges on a sphere

Asymptotics for minimal discrete energy on the sphere

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