Closed Magnetic geodesics on Heisenberg nilmanifolds

Abstract

In this work we study the existence of closed magnetic geodesics on three-dimensional Heisenberg nilmanifolds for every left-invariant Lorentz force. Our first objective is to establish the existence of closed contractible magnetic geodesics on H3. Once the invariant magnetic field is induced to a compact quotient M=Λ H3, we study magnetic geodesics on M. Firstly, we determine conditions on a lattice Λ⊂ H3 to ensure that a given magnetic geodesic projects to a closed curve on M. In particular, we prove that for any energy level below the Mañé critical value there always exists a contractible closed magnetic geodesic on the compact manifold M. On the other hand, we show that closed magnetic geodesics do not necessarily exist in every homotopy class. Finally, we present examples of compact quotients Γk H3 that admit infinitely many closed magnetic trajectories, as well as examples for which no closed non-contractible magnetic trajectories exist for a given left-invariant Lorentz force.