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WebJan 1, 2001 · teorema KAM, è opportuno scegliere quale sistema non perturbato un. sistema dotato di caratteristiche particolari. Nel caso dei sistemi inte-4 Introduzione. The Kolmogorov–Arnold–Moser (KAM) theorem is a result in dynamical systems about the persistence of quasiperiodic motions under small perturbations. The theorem partly resolves the small-divisor problem that arises in the perturbation theory of classical mechanics. The problem is whether or not a … See more Integrable Hamiltonian systems The KAM theorem is usually stated in terms of trajectories in phase space of an integrable Hamiltonian system. The motion of an integrable system is confined to an invariant torus See more • Stability of the Solar System • Arnold diffusion • Ergodic theory • Hofstadter's butterfly • Nekhoroshev estimates See more The methods introduced by Kolmogorov, Arnold, and Moser have developed into a large body of results related to quasiperiodic motions, now known as KAM theory. … See more A manifold $${\displaystyle {\mathcal {T}}^{d}}$$ invariant under the action of a flow $${\displaystyle \phi ^{t}}$$ is called an invariant See more shoe store on broadway