Many critical points for discrete Riesz energy on T2

Abstract

It is widely believed that the energy functional Ep:(S2)n → R Ep = Σi,j=1 i ≠ jn 1\|xi-xj\|p has a number of critical points, ∇ E(x) = 0, that grows exponentially in n. Despite having been extensively tested and being physically well motivated, no rigorous result in this direction exists. We prove a version of this result on the two-dimensional flat torus T2 and show that there are infinitely many n ∈ N such that the number of critical points of Ep: (T2)n → R is at least (c n) provided p ≥ 5 n. We also investigate the special cases n=3,4,5 which turn out to be surprisingly interesting.

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