Green functions, Hitchin's formula and curvature equations on tori

Abstract

Let G(z)=G(z;τ) be the Green function on the flat torus Eτ=C/(Z+Zτ) with the singularity at 0. Lin and Wang (Ann. Math. 2010) proved that G(z) has either 3 or 5 critical points (depending on the choice of τ). Later, Bergweiler and Eremenko (Proc. Amer. Math. Soc. 2016) gave a new proof of this remarkable result by using anti-holomorphic dynamics. In this paper, firstly, we prove that once G(z) has 5 critical points, then these 5 critical points are all non-degenerate. Secondly, we study the sum of two Green functions which can be reduced to Gp(z):=12(G(z+p)+G(z-p)). We prove that for any p satisfying p≠ -p in Eτ, the number of critical points of Gp(z) belongs to \4,6,8,10\ (depending on the choice of (τ, p)) and each number really occurs. We apply Hitchin's formula (J. Differ. Geom. 1995) in a surprising way to prove the generic non-degeneracy of critical points. This allows us to study the distribution of the numbers of critical points of Gp(z) as p varies. Applications to the curvature equation u+eu=4π(δp+δ-p) on Eτ are also given, and how the geometry of the torus affects the solution structure is studied.