Sovability of curvature equations with multiple singular sources on torus via Painleve VI equations

Abstract

We study the curvature equation with multiple singular sources on a torus \[ u+eu=8π Σk=03nkδωk2% +4π ( δp+δ-p) on \;Eτ:=C/( Z+Zτ),\] where nk∈ N and δa denotes the Dirac measure at a. This is known as a critical case for which the apriori estimate does not hold, and the existence of solutions has been a long-standing problem. In this paper, by establishing a deep connection with Painlev\'e VI equations, we show that the existence of even solutions (i.e. u(z)=u(-z)) depends on the location of the singular point p, and we give a sharp criterion of p in terms of Painlev\'e VI equations.