Asymptotic trajectories of KAM torus

Abstract

In this paper we construct a certain type of nearly integrable systems of two and a half degrees of freedom: \[H(p,q,t)=h(p)+ε f(p,q,t), (q,p)∈ T*T2,t∈ S1=R/Z, \] with a self-similar and weak-coupled f(p,q,t) and h(p) strictly convex. For a given Diophantine rotation vector ω, we can find asymptotic orbits towards the KAM torus Tω, which persists owing to the classical KAM theory, as long as ε1 sufficiently small and f∈ Cr(T*T2×S1,R) properly smooth. The construction bases on the new methods developed in a priori stable Arnold Diffusion problem by Chong-Qing Cheng. As an expansion of that, this paper sheds some light on the seeking of much preciser diffusion orbits.