Sign-changing solutions for the sinh-Poisson equation with Robin Boundary condition

Abstract

Given ε ∈ (0,1) and λ > 1, we address the existence of solutions for the Sinh-Poisson equation with Robin boundary value condition cases u+ε2 (eu - e-u)=0 &in \\ ∂ u∂+λ u=0 &on ∂, cases where ⊂R2 is a bounded smooth domain. We prove two existence results under a suitable relation between ε small and λ large. When is symmetric with respect to an axis, we prove the existence of a family of solutions uε,λ concentrating at two points with different spin, both located on the symmetry line and close to the boundary. In the second result, we assume is not simply connected and we construct sign-changing solutions concentrating at points located close to the boundary, each of them on a different connected component of the boundary.