We describe a numerical application of the Nekhoroshev theorem to investigate the long-term stability of quasi-integrable systems. We extend the results of a previous paper to a class of degenerate systems, which are typical in celestial mechanics
This book is devoted to background material and recently developed mathematical methods in the stud...
The chapter concerns the Fourier representation of the observables of quasi- integrable Hamiltonian ...
These lectures are devoted to the main results of classical perturbation theory. We start by recal...
The Nekhoroshev theorem has provided in the last decades an important framework to study the long-te...
The Nekhoroshev theorem has been often indicated in the last decades as the reference theorem for...
The Nekhoroshev theorem has been often indicated in the last decades as the reference theorem for ex...
A perturbation of a degenerate integrable Hamiltonian system has the form H=h(I) + \u3b5 f(I, \u3c6,...
We apply the spectral formulation of the Nekhoroshev theorem to investigate the long-term stability ...
We review results about the Fourier Analysis of chaotic solutions of quasi-integrable systems based ...
The characterization of the long-term stability properties of Hamiltonian systems has a big relevanc...
We investigate the long time stability in Nekhoroshev’s sense for the Sun–Jupiter– Saturn problem i...
For perturbations of integrable Hamiltonians systems, the Nekhoroshev theorem shows that all solutio...
We consider the problem of the stability of action variables in properly degenerate nearly-integrab...
The two main stability results for nearly-integrable Hamiltonian systems are revisited: Nekhoroshev ...
AbstractThe two main stability results for nearly-integrable Hamiltonian systems are revisited: Nekh...
This book is devoted to background material and recently developed mathematical methods in the stud...
The chapter concerns the Fourier representation of the observables of quasi- integrable Hamiltonian ...
These lectures are devoted to the main results of classical perturbation theory. We start by recal...
The Nekhoroshev theorem has provided in the last decades an important framework to study the long-te...
The Nekhoroshev theorem has been often indicated in the last decades as the reference theorem for...
The Nekhoroshev theorem has been often indicated in the last decades as the reference theorem for ex...
A perturbation of a degenerate integrable Hamiltonian system has the form H=h(I) + \u3b5 f(I, \u3c6,...
We apply the spectral formulation of the Nekhoroshev theorem to investigate the long-term stability ...
We review results about the Fourier Analysis of chaotic solutions of quasi-integrable systems based ...
The characterization of the long-term stability properties of Hamiltonian systems has a big relevanc...
We investigate the long time stability in Nekhoroshev’s sense for the Sun–Jupiter– Saturn problem i...
For perturbations of integrable Hamiltonians systems, the Nekhoroshev theorem shows that all solutio...
We consider the problem of the stability of action variables in properly degenerate nearly-integrab...
The two main stability results for nearly-integrable Hamiltonian systems are revisited: Nekhoroshev ...
AbstractThe two main stability results for nearly-integrable Hamiltonian systems are revisited: Nekh...
This book is devoted to background material and recently developed mathematical methods in the stud...
The chapter concerns the Fourier representation of the observables of quasi- integrable Hamiltonian ...
These lectures are devoted to the main results of classical perturbation theory. We start by recal...
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