Add to ORKGThe relation between the Kolmogorov-Arnold-Moser theory of the non resonant motions in nearly integrable Hamiltonian systems and the renormalization group methods is pointed out. It is followed by a very detailed proof of a version of the KAM theorem based on dimensional estimates (in which no attention is paid to obtaining best constants)
Perturbation theory is introduced by means of models borrowed from Celestial Mechanics, namely the t...
International audienceIn this paper, we investigate perturbations of linear integrable Hamiltonian s...
Perturbation theory is introduced by means of models borrowed from Celestial Mechanics, namely the t...
Following closely Kolmogorov’s original paper [1], we give a complete proof of his celebrated Theor...
Kolmogorov-Arnold-Moser (or KAM) theory was developed for conservative dynamical systems that are ne...
The Kolmogorov, Arnol'd, Moser (KAM) theory [15, 1, 16] proves that ``small" perturbations of integr...
We construct an approximate renormalization scheme for Hamiltonian systems with two degrees of freed...
We construct an approximate renormalization scheme for Hamiltonian systems with two degrees of freed...
We construct an approximate renormalization scheme for Hamiltonian systems with two degrees of freed...
Following closely Kolmogorov’s original paper [1], we give a complete proof of his celebrated Theor...
Kolmogorov-Arnold-Moser (or kam) theory was developed for con-servative dynamical systems that are n...
The fundamental problem of mechanics is to study Hamiltonian systems that are small pertur-bations o...
In this paper, we give a new proof of the classical KAM theorem on the persistence of an invariant q...
AbstractThe two main stability results for nearly-integrable Hamiltonian systems are revisited: Nekh...
International audienceIn this paper, we investigate perturbations of linear integrable Hamiltonian s...
Perturbation theory is introduced by means of models borrowed from Celestial Mechanics, namely the t...
International audienceIn this paper, we investigate perturbations of linear integrable Hamiltonian s...
Perturbation theory is introduced by means of models borrowed from Celestial Mechanics, namely the t...
Following closely Kolmogorov’s original paper [1], we give a complete proof of his celebrated Theor...
Kolmogorov-Arnold-Moser (or KAM) theory was developed for conservative dynamical systems that are ne...
The Kolmogorov, Arnol'd, Moser (KAM) theory [15, 1, 16] proves that ``small" perturbations of integr...
We construct an approximate renormalization scheme for Hamiltonian systems with two degrees of freed...
We construct an approximate renormalization scheme for Hamiltonian systems with two degrees of freed...
We construct an approximate renormalization scheme for Hamiltonian systems with two degrees of freed...
Following closely Kolmogorov’s original paper [1], we give a complete proof of his celebrated Theor...
Kolmogorov-Arnold-Moser (or kam) theory was developed for con-servative dynamical systems that are n...
The fundamental problem of mechanics is to study Hamiltonian systems that are small pertur-bations o...
In this paper, we give a new proof of the classical KAM theorem on the persistence of an invariant q...
AbstractThe two main stability results for nearly-integrable Hamiltonian systems are revisited: Nekh...
International audienceIn this paper, we investigate perturbations of linear integrable Hamiltonian s...
Perturbation theory is introduced by means of models borrowed from Celestial Mechanics, namely the t...
International audienceIn this paper, we investigate perturbations of linear integrable Hamiltonian s...
Perturbation theory is introduced by means of models borrowed from Celestial Mechanics, namely the t...