Arnold diffusion in nearly integrable Hamiltonian systems
Abstract
In this paper, Arnold diffusion is proved to be generic phenomenon in nearly integrable convex Hamiltonian systems with three degrees of freedom: H(x,y)=h(y)+ε P(x,y), x∈T3,\ y∈R3. Under typical perturbation ε P, the system admits "connecting" orbit that passes through any two prescribed small balls in the same energy level H-1(E) provided E is bigger than the minimum of the average action, namely, E>α.
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