On the Logarithmic Energy of Points on S2

Abstract

We revisit a classical question: how large is the minimal logarithmic energy of n points on S2 E(n) = x1, …, xn ∈ S2 Σi,j =1 i ≠ jn 1\|xi-xj\| ? Betermin & Sandier (building on work of Sandier & Serfaty) showed that E(n) = ( 12 - 2 )n2 - n n2 + c · n + o(n), where the constant c is characterized by a certain renormalized minimization problem. Brauchart, Hardin \& Saff conjectured a closed form expression for c ( -0.05) assuming analytic continuation. We describe a simple renormalization approach that results in a purely local problem involving superpositions of Gaussians. In particular, if the hexagonal lattice minimizes Gaussians energy, this would prove that c indeed coincides with the conjectured value. We also improve the lower bound from c ≥ -0.223 to c ≥ -0.095.