Analytic genericity of diffusing orbits in a priori unstable Hamiltonian systems

Abstract

The genericity of Arnold diffusion in the analytic category is an open problem. In this paper, we study this problem in the following a priori unstable Hamiltonian system with a time-periodic perturbation \[H(p,q,I,,t)=h(I)+Σi=1n (12pi2+Vi(qi))+ H1(p,q,I,, t), \] where (p,q)∈ Rn×Tn, (I,)∈Rd×Td with n, d≥ 1, Vi are Morse potentials, and is a small non-zero parameter. The unperturbed Hamiltonian is not necessarily convex, and the induced inner dynamics does not need to satisfy a twist condition. Using geometric methods we prove that Arnold diffusion occurs for generic analytic perturbations H1. Indeed, the set of admissible H1 is Cω dense and C3 open (a fortiori, Cω open). Our perturbative technique for the genericity is valid in the Ck topology for all k∈ [3,∞)\∞, ω\.