Cuplength estimates for periodic solutions of Hamiltonian particle-field systems

Abstract

We consider a natural class of time-periodic infinite-dimensional nonlinear Hamiltonian systems modelling the interaction of a classical mechanical system of particles with a scalar wave field. When the field is defined on a space torus Td=Rd/(2πZ)d and the coordinates of the particles are constrained to a submanifold Q⊂Td, we prove that the number of T-periodic solutions of the coupled Hamiltonian particle-field system is bounded from below by the Z2-cuplength of the space of contractible loops in Q, provided that the square of the ratio T/2π of time period T and space period X=2π is a Diophantine irrational number. The latter condition is necessary since for the infinite-dimensional version of Gromov-Floer compactness as well as for the C0-bounds we need to deal with small divisors.