Periodic solutions with prescribed minimal period of vortex type problem in domains

Abstract

We consider Hamiltonian systems with two degrees of freedom of point vortex type \[ j zj = J ∇zj H(z1,z2), j=1,2, \] for z1,z2 in a domain ⊂R2. In the classical point vortex context the Hamiltonian H is of the form \[ H(z1,z2) = -1 2π |z1-z2| - 21 2g(z1,z2) - 12 h(z1) - 22 h(z2), \] where g:× is the regular part of a hydrodynamic Green function in , h: is the Robin function: h(z)=g(z,z), and 1, 2 are the vortex strengths. We prove the existence of infinitely many periodic solutions with prescribed minimal period that are superpositions of a slow motion of the center of vorticity close to a star-shaped level line of h and of a fast rotation of the two vortices around their center of vorticity. The proofs are based on a recent higher dimensional version of the Poincar\'e-Birkhoff theorem due to Fonda and Ure\~na.