Abstract

In this paper we prove a Nekhoroshev type theorem for perturbations of Hamiltonians describing a particle subject to the force due to a central potential. Precisely, we prove that under an explicit condition on the potential, the Hamiltonian of the central motion is quasi-convex. Thus, when it is perturbed, two actions (the modulus of the total angular momentum and the action of the reduced radial system) are approximately conserved for times which are exponentially long with the inverse of the perturbation parameter.

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Similar Papers

Paper Title
Journal
Date
Author
Lightlike shell solitons of extremal space-time film
Alexander A Chernitskii
Journal of Physics Communications | VOL. 2
Alexander A ChernitskiiAlexander A Chernitskii
01 Oct 2018
A Diophantine duality applied to the KAM and Nekhoroshev theorems
Abed Bounemoura ... Stéphane Fischler
Mathematische Zeitschrift | VOL. 275
Abed Bounemoura, et. al.Abed Bounemoura ... Stéphane Fischler
22 May 2013
Resonant and non-resonant gravity-gradient perturbations of a tumbling tri-axial satellite
Donald L Hitzl ... John V Breakwell
Celestial Mechanics | VOL. 3
Donald L Hitzl, et. al.Donald L Hitzl ... John V Breakwell
01 Sep 1971
A novel design of robust relay-discontinuous sliding mode controller for robot manipulators with parameter perturbations
M N Alpaslan Parlakci ... Oleg Belegradek
-
M N Alpaslan Parlakci, et. al.M N Alpaslan Parlakci ... Oleg Belegradek
01 Sep 2001
View more papers

More From: Regular and Chaotic Dynamics

Paper Title
Journal
Date
Author
Higher Symmetries of Lattices in 3D
Ismagil T Habibullin ... Aigul R Khakimova
Regular and Chaotic Dynamics | VOL. 29
Ismagil T Habibullin, et. al.Ismagil T Habibullin ... Aigul R Khakimova
01 Dec 2024
Rotations and Integrability
Andrey V Tsiganov
Regular and Chaotic Dynamics | VOL. 29
Andrey V TsiganovAndrey V Tsiganov
01 Dec 2024
Lagrangian Manifolds in the Theory of Wave Beams and Solutions of the Helmholtz Equation
Anna V Tsvetkova
Regular and Chaotic Dynamics | VOL. -
Anna V TsvetkovaAnna V Tsvetkova
14 Nov 2024
On a Method for Verifying Hyperbolicity
Sergey D Glyzin ... Andrey Yu Kolesov
Regular and Chaotic Dynamics | VOL. -
Sergey D Glyzin, et. al.Sergey D Glyzin ... Andrey Yu Kolesov
14 Nov 2024
View more papers

Disclaimer: All third-party content on this website/platform is and will remain the property of their respective owners and is provided on "as is" basis without any warranties, express or implied. Use of third-party content does not indicate any affiliation, sponsorship with or endorsement by them. Any references to third-party content is to identify the corresponding services and shall be considered fair use under The CopyrightLaw.