"Magic" numbers in Smale's 7th problem

Abstract

Smale's 7-th problem concerns N-point configurations on the 2-dim sphere which minimize the logarithmic pair-energy V0(r) = -ln r averaged over the pairs in a configuration; here, r is the chordal distance between the points forming a pair. More generally, V0(r) may be replaced by the standardized Riesz pair-energy Vs(r)= (r-s -1)/s, which becomes - ln r in the limit s to 0, and the sphere may be replaced by other compact manifolds. This paper inquires into the concavity of the map from the integers N>1 into the minimal average standardized Riesz pair-energies vs(N) of the N-point configurations on the 2-sphere for various real s. It is known that vs(N) is strictly increasing for each real s, and for s<2 also bounded above, hence "overall concave." It is (easily) proved that v-2(N) is even locally strictly concave, and that so is vs(2n) for s<-2. By analyzing computer-experimental data of putatively minimal average Riesz pair-energies vsx(N) for s in -1,0,1,2,3 and N in 2,...,200, it is found that v-1x(N) is locally strictly concave, while vsx(N) is not always locally strictly concave for s in 0,1,2,3: concavity defects occur whenever N in Cx+(s) (an s-specific empirical set of integers). It is found that the empirical map Cx+(s), with s in -2,-1,0,1,2,3, is set-theoretically increasing; moreover, the percentage of odd numbers in Cx+(s), s in 0,1,2,3, is found to increase with s. The integers in Cx+(0) are few and far between, forming a curious sequence of numbers, reminiscent of the "magic numbers" in nuclear physics. It is conjectured that the "magic numbers" in Smale's 7-th problem are associated with optimally symmetric optimal-energy configurations.