Blow-up solutions for mean field equations with non-quantized singularities on Riemann surfaces with boundary

Abstract

We study mean field equations with singular sources on a compact Riemann surface with boundary (,g), subject to homogeneous Neumann boundary conditions: \[ -g v = ( V ev∫ V ev\, d vg - 1||g) - Σ∈ Q ()2γ() (δ- 1||g) in ; ∂_g v = 0 on ∂. \] Here, V is a smooth positive function, is a non-negative parameter, Q⊂ is a finite set of prescribed singular points, and the singular weights satisfy γ()∈(-1,+∞)(N\0\). The coefficients are given by ()=8π for ∈∂ and ()=4π for ∈∂. We construct blow-up solutions in the non-quantized singular regime, including purely singular and mixed singular-regular blow-up cases, with parameters approaching resonant values. The construction is achieved via a Lyapunov-Schmidt reduction under suitable stability assumptions. Key words: Singular mean field equations, Blow-up phenomena, Lyapunov-Schmidt reduction, Riemann surfaces with boundary