%I #24 Aug 20 2013 14:23:26
%S 6,12,24,32,48,60,67,72,80,104,108,122,132,137
%N Magic numbers from Smale’s 7th problem.
%C See pp. 16-17 of Nerattini et al. The sequence is defined as the numbers n of points distributed on the two-sphere in such a way that their average logarithmic pair-energy is minimal, and locally convex as a function of n. So far the available data for this sequence are empirical and should eventually be vindicated, or replaced if necessary, by rigorous data. The name "magic numbers" alludes to a similarity with the "magic numbers" in nuclear physics, see A018226.
%H Rachele Nerattini, Johann S. Brauchart, Michael K.-H. Kiessling, <a href="http://arxiv.org/abs/1307.2834">Magic numbers in Smale's 7th problem</a>, arXiv:1307.2834v2 [math-ph], August 08, 2013.
%H S. Smale, <a href="http://math.berkeley.edu/~smale/">Mathematical problems for the next century</a>, Math. Intelligencer 20 (1998), pp 7-15.
%Y Cf. A018226.
%K nonn
%O 1,1
%A _Jonathan Vos Post_, Jul 10 2013
%E Comment section and reference section corrected and revised by Michael Kiessling, Aug 20 2013
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