Examples of nearly integrable systems on A3 with asymptotically dense projected orbits

Abstract

Given an integer ≥2, we introduce a class of nearly integrable systems on A3, of the form Hn(θ,r)=12 r 2+1n U(θ2,θ3)+fn(θ,r) where U∈ C(T2) is a generic potential function and fn a C-1 additional perturbation such that fnC-1(A3)≤ 1n, so that Hn is a perturbation of the completely integrable system h(r)=12 r 2. Let :A33 be the canonical projection. We prove that for each δ>0, there exists n0 such that for n≥ n0, the system Hn admits an orbit n at energy 12 whose projection (n) is δ-dense in (Hn-1(12)), in the sense that the δ-neighborhood of (n) in R3 covers (Hn-1(12)).