Boundary value problem for the mean field equation on a compact Riemann surface

Abstract

Let (,g) be a compact Riemann surface with smooth boundary ∂, g be the Laplace-Beltrami operator, and h be a positive smooth function. Using a min-max scheme introduced by Djadli-Malchiodi (2006) and Djadli (2008), we prove that if is non-contractible, then for any ∈(8kπ,8(k+1)π) with k∈N, the mean field equation \arraylll g u=heu∫ heudvg& in&\\[1.5ex] u=0& on&∂ array. has a solution. This generalizes earlier existence results of Ding-Jost-Li-Wang (1999) and Chen-Lin (2003) in the Euclidean domain. Also we consider the corresponding Neumann boundary value problem. If h is a positive smooth function, then for any ∈(4kπ,4(k+1)π) with k∈N, the mean field equation \arraylll g u=(heu∫ heudvg-1||)& in&\\[1.5ex] ∂ u/∂v=0& on&∂ array. has a solution, where v denotes the unit normal outward vector on ∂. Note that in this case we do not require the surface to be non-contractible.