Geometric quantities arising from bubbling analysis of mean field equations

Abstract

Let E = C/ be a flat torus and G be its Green function with singularity at 0. Consider the multiple Green function Gn on En: Gn(z1,·s,zn) := Σi < j G(zi - zj) - n Σi = 1 n G(zi). A critical point a = (a1, ·s, an) of Gn is called trivial if \a1, ·s, an\ = \-a1, ·s, -an\. For such a point a, two geometric quantities D(a) and H(a) arising from bubbling analysis of mean field equations are introduced. D(a) is a global quantity measuring asymptotic expansion and H(a) is the Hessian of Gn at a. By way of geometry of Lam\'e curves developed in our previous paper (Cambridge J. Math 3, 2015), we derive precise formulas to relate these two quantities.