https://arxiv.org/abs/1809.10525 seems relevant.. Jim Propp On Thu, Sep 10, 2020 at 6:26 PM Dan Asimov <dasimov@earthlink.net> wrote:
The Tammes problem is the well-known problem to find the arrangement of N points on the unit sphere S^2 that maximizes the minimum distance between any pair of them.
What about the same question for N points on the square torus
T^2 = R^2/Z^2
or the cubical torus
T^3 = R^3/Z^3
???
(Note that the maximum distance between any two points on T^2 is sqrt(2)/2 and between any two points on T^3 is sqrt(3)/2.)
This gets very difficult on S^2 even for slightly large N, so I don't expect it will be easy to solve on T^2 or T^3.
But what would seem to be the best arrangements for 1 <= N <= 10 on T^2 and T^3 ???
—Dan
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