Liouville type theorems for conformal Gaussian curvature equation

Abstract

In this note, we study Liouville type theorem for conformal Gaussian curvature equation (also called the mean field equation) - u=K(x)eu, in R2 where K(x) is a smooth function on R2. When K(x)=K(x1) is a sign-changing smooth function in the real line R, we have a non-existence result for the finite total curvature solutions. When K is monotone non-decreasing along every ray starting at origin, we can prove a non-existence result too. We use moving plane method and moving sphere method.