Add to ORKGUnder certain conditions, generalized action–angle coordinates can be introduced near non-compact invariant manifolds of completely and partially integrable Hamiltonian systems. PACS numbers: 45.20.Jj, 02.30.Ik 1
In this paper we analyze the obstructions to the existence of global action-angle variables for regu...
Abstract: This paper deals with Hamiltonian perturbation theory for systems which, like Euler-Poinso...
Abstract: This paper deals with Hamiltonian perturbation theory for systems which, like Euler-Poinso...
Old paper put here for archival purposes. Contains a list of errata. 32 pages (=37 pages in Composit...
Title: Integrability in Hamiltonian mechanics Author: David Kokoška Department: Mathematical Institu...
This article aims to study non-local Lagrangians with an infinite number of degrees of freedom. We o...
We study meromorphic actions of unipotent complex Lie groups on compactK\"ahler manifolds using mome...
For an autonomous nearly integrable Hamiltonian system ofn degrees of freedom withn > 1 it was shown...
Abstract. This is an expanded version of the lecture notes for a mini-course that I gave at a summer...
We extend the Poincare-Lyapounov-Nekhoroshev theorem from torus actions and invariant tori to genera...
Poincar\ue9 mostr\uf2 che per, un sistema hamiltoniano autonomo quasi integrabile adn gradi di liber...
For an autonomous nearly integrable Hamiltonian system ofn degrees of freedom withn > 1 it was shown...
Given any symplectomorphism on $D^{2n} (n\geq 1)$ which is $C^{\infty}$ close to the identity, and a...
The aim of this Letter is to show that singularities of inte-grable Hamiltonian systems, besides bei...
The Mishchenko–Fomenko theorem on superintegrable Hamiltonian systems is general-ized to superintegr...
In this paper we analyze the obstructions to the existence of global action-angle variables for regu...
Abstract: This paper deals with Hamiltonian perturbation theory for systems which, like Euler-Poinso...
Abstract: This paper deals with Hamiltonian perturbation theory for systems which, like Euler-Poinso...
Old paper put here for archival purposes. Contains a list of errata. 32 pages (=37 pages in Composit...
Title: Integrability in Hamiltonian mechanics Author: David Kokoška Department: Mathematical Institu...
This article aims to study non-local Lagrangians with an infinite number of degrees of freedom. We o...
We study meromorphic actions of unipotent complex Lie groups on compactK\"ahler manifolds using mome...
For an autonomous nearly integrable Hamiltonian system ofn degrees of freedom withn > 1 it was shown...
Abstract. This is an expanded version of the lecture notes for a mini-course that I gave at a summer...
We extend the Poincare-Lyapounov-Nekhoroshev theorem from torus actions and invariant tori to genera...
Poincar\ue9 mostr\uf2 che per, un sistema hamiltoniano autonomo quasi integrabile adn gradi di liber...
For an autonomous nearly integrable Hamiltonian system ofn degrees of freedom withn > 1 it was shown...
Given any symplectomorphism on $D^{2n} (n\geq 1)$ which is $C^{\infty}$ close to the identity, and a...
The aim of this Letter is to show that singularities of inte-grable Hamiltonian systems, besides bei...
The Mishchenko–Fomenko theorem on superintegrable Hamiltonian systems is general-ized to superintegr...
In this paper we analyze the obstructions to the existence of global action-angle variables for regu...
Abstract: This paper deals with Hamiltonian perturbation theory for systems which, like Euler-Poinso...
Abstract: This paper deals with Hamiltonian perturbation theory for systems which, like Euler-Poinso...