arXiv:1410.0744 Abstract | arXiv Analytics

arXiv:1410.0744 [math.MG]Abstract References Reviews Resources

Extreme problems of circle packings on a sphere and irreducible contact graphs

Published 2014-10-03Version 1

Recently, we enumerate up to isometry, all locally rigid circle packings on the unit sphere with number of circles N<12. This problem is equivalent to the enumeration of irreducible contact graphs. In this paper we show that by using the list of irreducible graphs can solve various problems of extreme packings such as the Tammes problem for the sphere and the projective plane, the maximal contacts problem, Danzer's and other problems on irreducible contact graphs.

Comments: 21 pages, 86 figures, in Russian

Categories: math.MG, math.CO

Keywords: irreducible contact graphs, extreme problems, maximal contacts problem, locally rigid circle packings, unit sphere

Related articles: Most relevant | Search more

arXiv:1312.5450 [math.MG] (Published 2013-12-19)

Enumeration of irreducible contact graphs on the sphere

Oleg Musin, Alexey Tarasov

arXiv:2212.12778 [math.MG] (Published 2022-12-24)

Surface areas of equifacetal polytopes inscribed in the unit sphere $\mathbb{S}^2$

Nicolas Freeman, Steven Hoehner, Jeff Ledford, David Pack, Brandon Walters

arXiv:1903.12619 [math.MG] (Published 2019-03-29)

A diameter gap for quotients of the unit sphere