Add to ORKGThe chapter concerns the Fourier representation of the observables of quasi- integrable Hamiltonian systems computed on a chaotic solution, by means of the so-called spectral formulation of the Nekhoroshev Theorem
Nekhoroshev's theorem on the stability of motions in quasi-integrable Hamiltonian systems is revisit...
We give some simple and direct algorithms for deriving the Fourier series which describe the quasi-p...
This distinctive volume presents a clear, rigorous grounding in modern nonlinear integrable dynamics...
(Communicated by Antonio Giorgilli) Abstract: In this paper we provide an analytical characterizatio...
We review results about the Fourier Analysis of chaotic solutions of quasi-integrable systems based ...
In this paper we provide an analytical characterization of the Fourier spectrum of the solutions of ...
We describe and compare two recent tools for detecting the geometry of resonances of a dynamical sys...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
The Nekhoroshev theorem has provided in the last decades an important framework to study the long-te...
We describe a numerical application of the Nekhoroshev theorem to investigate the long-term stabilit...
The chapter contains a short description of chaos and diffusion due to resonances in quasi-integrabl...
We will discuss some applications of complex and harmonic analysis to the problem of stabilizing the...
SIGLECopy held by FIZ Karlsruhe; available from UB/TIB Hannover / FIZ - Fachinformationszzentrum Kar...
The study of dynamical quantum systems, which are classically chaotic, and the search for quantum ma...
I will show some applications of classical Fourier analysis to the problems of discrete nonlinear dy...
Nekhoroshev's theorem on the stability of motions in quasi-integrable Hamiltonian systems is revisit...
We give some simple and direct algorithms for deriving the Fourier series which describe the quasi-p...
This distinctive volume presents a clear, rigorous grounding in modern nonlinear integrable dynamics...
(Communicated by Antonio Giorgilli) Abstract: In this paper we provide an analytical characterizatio...
We review results about the Fourier Analysis of chaotic solutions of quasi-integrable systems based ...
In this paper we provide an analytical characterization of the Fourier spectrum of the solutions of ...
We describe and compare two recent tools for detecting the geometry of resonances of a dynamical sys...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
The Nekhoroshev theorem has provided in the last decades an important framework to study the long-te...
We describe a numerical application of the Nekhoroshev theorem to investigate the long-term stabilit...
The chapter contains a short description of chaos and diffusion due to resonances in quasi-integrabl...
We will discuss some applications of complex and harmonic analysis to the problem of stabilizing the...
SIGLECopy held by FIZ Karlsruhe; available from UB/TIB Hannover / FIZ - Fachinformationszzentrum Kar...
The study of dynamical quantum systems, which are classically chaotic, and the search for quantum ma...
I will show some applications of classical Fourier analysis to the problems of discrete nonlinear dy...
Nekhoroshev's theorem on the stability of motions in quasi-integrable Hamiltonian systems is revisit...
We give some simple and direct algorithms for deriving the Fourier series which describe the quasi-p...
This distinctive volume presents a clear, rigorous grounding in modern nonlinear integrable dynamics...