Systems of transversal sections near critical energy levels of Hamiltonian systems in R4

Abstract

In this article we study Hamiltonian flows associated to smooth functions H:R4 R restricted to energy levels close to critical levels. We assume the existence of a saddle-center equilibrium point pc in the zero energy level H-1(0). The Hamiltonian function near pc is assumed to satisfy Moser's normal form and pc is assumed to lie in a strictly convex singular subset S0 of H-1(0). Then for all E>0 small, the energy level H-1(E) contains a subset SE near S0, diffeomorphic to the closed 3-ball, which admits a system of transversal sections FE, called a 2-3 foliation. FE is a singular foliation of SE and contains two periodic orbits P2,E⊂ ∂ SE and P3,E⊂ SE ∂ SE as binding orbits. P2,E is the Lyapunoff orbit lying in the center manifold of pc, has Conley-Zehnder index 2 and spans two rigid planes in ∂ SE. P3,E has Conley-Zehnder index 3 and spans a one parameter family of planes in SE ∂ SE. A rigid cylinder connecting P3,E to P2,E completes FE. All regular leaves are transverse to the Hamiltonian vector field. The existence of a homoclinic orbit to P2,E in SE ∂ SE follows from this foliation.