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

Let $G(z)=G(z;τ)$ be the Green function on the torus $E_τ=\mathbb{C}/(\mathbb{Z}+\mathbb{Z}τ)$ 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 prove that for any $p\in E_τ$ satisfying $p\neq -p$ in $E_τ$, the number of critical points of $G_p(z):=\frac12(G(z+p)+G(z-p))$ belongs to $\{4,6,8,10\}$ (depending on the choice of $(τ, p)$) and each number really occurs. We apply Hitchin's formula to prove the generic non-degeneracy of critical points. This allows us to study the distribution of the numbers of critical points of $G_p$ as $p$ varies. Applications to the curvature equation $Δu+e^{u}=4π(δ_{p}+δ_{-p})$ on $E_τ$ are also given. How the geometry of the torus affects the solution structure is studied.