Equilibria for the N-vortex-problem in a general bounded domain

Abstract

This article is concerned with the study of existence and properties of stationary solutions for the dynamics of N point vortices in an idealised fluid constrained to a bounded two--dimen\-sional domain , which is governed by a Hamiltonian system \[ \aligned id xid t &=∂ H∂ yi(z1,…,zN)\\ id yid t &=-∂ H∂ xi(z1,…,zN) aligned 2cmwhere\ zi=(xi,yi),\ i=1,…,N, . \] where H(z):=Σj=1Nj2h(zj)+Σi,j=1, i=jNijG(zi,zj) is the so--called Kirchhoff--Routh--path function under various conditions on the "vorticities" i and various topological and geometrical assumptions on . In particular, we will prove that (under an additional technical assumption) if it is possible to align the vortices along a line, such that the signs of the i are alternating and |i| is increasing, H has a critical point. If is not simply connected, we are able to derive a critical point of H, if Σj∈ Jj2>Σi,j∈ J\\ i=j|ij| for all J⊂\1,…,N\, |J| 2.