Steady vortex patches near a rotating flow with constant vorticity in a planar bounded domain

Abstract

In this paper, we study steady vortex patch solutions to the incompressible Euler equations in a planar bounded domain D. Let 0 be the solution of the elliptic problem - 0 =1 in D; 0=0 on ∂ D. We prove that for any finite collection of isolated maximum points of 0, say \x1,···,xk\, and any k-tuple =(1,·,·,·,k) with i>0 and ||:=Σi=1ki<<1, there exists a steady solution of the Euler equations such that the vorticity has the form ω=1-I_i=1k Ai, where I denotes the characteristic function, |Ai|=i and Ai "shrinks" to xi as || 0.