Suspension of the Billiard maps in the Lazutkin's coordinate

Abstract

In this paper we proved that under the Lazutkin's coordinate, the billiard map can be interpolated by a time-1 flow of a Hamiltonian H(x,p,t) which can be formally expressed by \[ H(x,p,t)=p3/2+p5/2V(x,p1/2,t),(x,p,t)∈×[0,+∞)×, \] where V(·,·,·) is Cr-5 smooth if the convex billiard boundary is Cr smooth. Benefit from this suspension we can construct transitive trajectories between two adjacent caustics under a variational framework.