Punts d'energia mínima i empaquetaments d'esferes

Authors

  • Jordi Marzo

Abstract

In this article we deal with two very interesting problems and a way to relate them. The first problem is the study of the asymptotic development of the minimum energy of a set of points confined to a sphere and interacting through a Riesz potential. The limiting case of one of the constants that appear in this development will lead us to our second problem, that of determining the best sphere packing in the Euclidean space, a problem in which important advances have recently come out.

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Published

2020-02-05

How to Cite

Marzo, J. (2020). Punts d’energia mínima i empaquetaments d’esferes. Butlletí De La Societat Catalana De Matemàtiques, 34(2), 153–168. Retrieved from https://revistes.iec.cat/index.php/BSCM/article/view/106109.003

Issue

Vol. 34 No. 2 (2019)

Section

Articles

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