Аннотация:
Chirikov’s celebrated criterion of resonance overlap has been widely used in celestial
mechanics and Hamiltonian dynamics to detect global instability, but is rarely rigorous. We
introduce two simple Hamiltonian systems, each depending on two parameters measuring,
respectively, the distance to resonance overlap and nonintegrability. Within some thin region
of the parameter plane, classical perturbation theory shows the existence of global instability
and symbolic dynamics, thus illustrating Chirikov’s criterion.