Equilibria of vortex type Hamiltonians on closed surfaces

Abstract

We prove the existence of critical points of vortex type Hamiltonians \[ H(p1,…, pN) = Σi,j=1,i jN ijG(pi,pj)+(p1,…,pN) \] on a closed Riemannian surface (,g) which is not homeomorphic to the sphere or the projective plane. Here G denotes the Green function of the Laplace-Beltrami operator in , :N may be any function of class C1, and 1,…,N∈R\0\ are the vorticities. The Kirchhoff-Routh Hamiltonian from fluid dynamics corresponds to = -Σi=1N i2h(pi,pi) where h:× is the regular part of the Laplace-Beltrami operator. We obtain critical points p=(p1,…,pN) for arbitrary N and vorticities (1,…,N) in RN V where V is an explicitly given algebraic variety of codimension 1.