Closed trajectories on symmetric convex Hamiltonian energy surfaces
arXiv:0909.3564
Abstract
In this article, let $Σ\subset\R^{2n}$ be a compact convex Hamiltonian energy surface which is symmetric with respect to the origin. where $n\ge 2$. We prove that there exist at least two geometrically distinct symmetric closed trajectories of the Reeb vector field on $\Sg$.
27pages