Blow-up analysis of Large conformal metrics with prescribed Gaussian and geodesic curvatures

Abstract

Consider a compact Riemannian surface (M,g) with nonempty boundary and negative Euler characteristic. Given two smooth non-constant functions f in M and h in ∂ M with f= h= 0, under a suitable condition on the maximum points of f and h, we prove that for sufficiently small positive constants λ and μ, there exist at least two distinct conformal metrics gλ,μ=e2uμ,λg and gλ,μ=e2uμ,λg with prescribed sign-changing Gaussian and geodesic curvature equal to f + μ and h + λ, respectively. Additionally, we employ the method used in Borer et al. (2015) to study the blowing up behavior of the large solution uμ,λ when μ 0 and λ 0. Finally, we derive a new Liouville-type result for the half-space, eliminating one of the potential blow-up profiles.