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Uniform hyperbolicity of invariant cylinder
Published 10 Sep 2015 in math.DS | (1509.03160v1)
Abstract: For a nearly integrable Hamiltonian systems $H=h(p)+\epsilon P(p,q)$ with $(p,q)\in\mathbb{R}3\times\mathbb{T}3$, large normally hyperbolic invariant cylinders exist along the whole resonant path, except for the $\sqrt{\epsilon}{1+d}$-neighborhood of finitely many double resonant points. It allows one to construct diffusion orbits to cross double resonance.
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