Arnold diffusion in multidimensional a priori unstable Hamiltonian systems

Abstract

We study the Arnold diffusion in a priori unstable near-integrable systems in a neighbourhood of a resonance of low order. We consider a non-autonomous near-integrable Hamiltonian system with n+1/2 degrees of freedom, n 2. Let the Hamilton function H of depend on the parameter , for =0 the system is integrable and has a homoclinic asymptotic manifold . Our main result is that for small generic perturbation in an -neighborhood of there exist trajectories the projections of which on the space of actions cross the resonance. By ``generic perturbations'' we mean an open dense set in the space of Cr-smooth functions dd|=0 H, r=r0,r0+1,…,∞,ω. Combination of this result with results of DT answers the main questions on the Arnold diffusion in a priori unstable case: the diffusion takes place for generic perturbation, diffusion trajectories can go along any smooth curve in the action space with average velocity of order /| |.