Minimal period estimates for brake orbits of nonlinear symmetric Hamiltonian systems
arXiv:0908.0029
Abstract
In this paper, we consider the minimal period estimates for brake orbits of nonlinear symmetric Hamiltonian systems. We prove that if the Hamiltonian function $H\in C^2(\Bbb R^{2n}, \Bbb R)$ is super-quadratic and convex, for every number $Ï>0$, there exists at least one $Ï$-periodic brake orbit $(Ï,x)$ with minimal period $Ï$ or $Ï/2$ provided $H(Nx)=H(x)$.
21 pages, accepted by DCDS