Some geometric inequalities related to Liouville equation

Abstract

In this paper, we prove that if u is a solution to the Liouville equation align scalliouville u+e2u =0 in R2, alignthen the diameter of R2 under the conformal metric g=e2uδ is bounded below by π. Here δ is the Euclidean metric in R2. Moreover, we explicitly construct a family of solutions such that the corresponding diameters of R2 range over [π,2π). We also discuss supersolutions. We show that if u is a supersolution and ∫R2 e2u dx<∞, then the diameter of R2 under the metric e2uδ is less than or equal to 2π. For radial supersolutions, we use both analytical and geometric approaches to prove some inequalities involving conformal lengths and areas of disks in R2. We also discuss the connection of the above results with the sphere covering inequality in the case of Gaussian curvature bounded below by 1. Higher dimensional generalizations are also discussed.