English

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

Dynamical Systems 2015-02-24 v1

Abstract

This article is concerned with the study of existence and properties of stationary solutions for the dynamics of NN point vortices in an idealised fluid constrained to a bounded two--dimen\-sional domain Ω\Omega, which is governed by a Hamiltonian system {Γidxidt=HΩyi(z1,,zN)Γidyidt=HΩxi(z1,,zN)where zi=(xi,yi), i=1,,N, \left\{\begin{aligned} \Gamma_i\frac{d x_i}{d t} &=\frac{\partial H_\Omega}{\partial y_i}(z_1,\dots,z_N)\\ \Gamma_i\frac{d y_i}{d t} &=-\frac{\partial H_\Omega}{\partial x_i}(z_1,\dots,z_N) \end{aligned} \hspace{2cm}\text{where}\ z_i=(x_i,y_i),\ i=1,\dots,N, \right. where HΩ(z):=j=1NΓj2h(zj)+i,j=1,ijNΓiΓjG(zi,zj)H_\Omega(z):=\sum_{j=1}^N\Gamma_j^2h(z_j)+\sum_{i,j=1, i\not=j}^N\Gamma_i\Gamma_jG(z_i,z_j) is the so--called Kirchhoff--Routh--path function under various conditions on the "vorticities" Γi\Gamma_i and various topological and geometrical assumptions on Ω\Omega. 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 Γi\Gamma_i are alternating and Γi|\Gamma_i| is increasing, HΩH_\Omega has a critical point. If Ω\Omega is not simply connected, we are able to derive a critical point of HΩH_\Omega, if jJΓj2>i,jJijΓiΓj\sum_{j\in J}\Gamma_j^2>\sum_{\substack{i,j\in J\\ i\not=j}}|\Gamma_i\Gamma_j| for all J{1,,N}J\subset\{1,\dots,N\}, J2|J|\ge 2.

Keywords

Cite

@article{arxiv.1502.06225,
  title  = {Equilibria for the $N$-vortex-problem in a general bounded domain},
  author = {Christian Kuhl},
  journal= {arXiv preprint arXiv:1502.06225},
  year   = {2015}
}

Comments

35 pages, 3 figures

R2 v1 2026-06-22T08:34:53.382Z