Local uniqueness of vortices for 2D steady Euler flow in a bounded domain

Abstract

We study the 2D Euler equation in a bounded simply-connected domain, and establish the local uniqueness of flow whose stream function satisfies equation* cases -2 =Σi=1k 1Bδ(z0,i)(-μ,i)+γ,\ \ \ & in \ , =0,\ \ \ & on \ , cases equation* with 0+ the scale parameter of vortices, γ∈(0,∞), ⊂ R2 a bounded simply connected Lipschitz domain, z0,i∈ the limiting location of ith vortex, and μ,i the flux constants unprescribed. Our proof is achieved by a detailed description of asymptotic behavior for and Pohozaev identity technique. For k=1, we prove the nonlinear stability of corresponding vorticity in Lp norm, provided z0,1 is a non-degenerate minimum point of Robin function. This stability result can be generalized to the case k 2, and (z0,1,·s,z0,k)∈ k being a non-degenerate minimum point of the Kirchhoff-Routh function.