Blow-up solutions for mean field equations with Neumann boundary conditions on Riemann surfaces

Abstract

On a compact Riemann surface (, g) with a smooth boundary ∂ , we consider the following mean field equations with Neumann boundary conditions: -g u = λ (Veu∫ Veu \, dvg - 1||g) in with ∂_g u = 0 on ∂ , We find conditions on the potential function V: R+ such that solutions exist for the parameter λ when it is in a small right (or left) neighborhood of a critical value 4π(m+k) for k ≤ m ∈ N+ and blow up as λ approaches the critical parameter. The blow-up occurs exactly at k points in the interior of and (m-k) points on the boundary ∂ .