Add to ORKGWe introduce some basic concepts from symplectic geometry, classical mechanics and integrable systems. We use this theory to show that the rational and the trigonometric Calogero-Moser systems, that is the Hamiltonian systems with Hamiltonian and respectively are integrable systems. We do this using symplectic reduction on
We present an algebraic formulation of the notion of integrability of dynamical systems, based on a ...
In this dissertation I prove a number of results about the symplectic geometry of finite dimensional...
Title: Integrability in Hamiltonian mechanics Author: David Kokoška Department: Mathematical Institu...
We introduce some basic concepts from symplectic geometry, classical mechanics and integrable system...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1....
We apply a recently introduced reduction procedure based on the embedding of non-crystallographic Co...
We apply a recently introduced reduction procedure based on the embedding of non-crystallographic Co...
This thesis gives a brief introduction to the Hamiltonian formalism and symplectic geometry. The Ham...
By applying the Hamiltonian reduction technique we derive a matrix first order differential equation...
We show that the bi-Hamiltonian structure of the rational n-particle (attractive) Calogero-Moser sys...
We present an algebraic formulation of the notion of integrability of dynamical systems, based on a ...
In this dissertation I prove a number of results about the symplectic geometry of finite dimensional...
Title: Integrability in Hamiltonian mechanics Author: David Kokoška Department: Mathematical Institu...
We introduce some basic concepts from symplectic geometry, classical mechanics and integrable system...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1. We...
This thesis presents our results on Liouville integrable systems of Calogero-Ruijsenaars type: 1....
We apply a recently introduced reduction procedure based on the embedding of non-crystallographic Co...
We apply a recently introduced reduction procedure based on the embedding of non-crystallographic Co...
This thesis gives a brief introduction to the Hamiltonian formalism and symplectic geometry. The Ham...
By applying the Hamiltonian reduction technique we derive a matrix first order differential equation...
We show that the bi-Hamiltonian structure of the rational n-particle (attractive) Calogero-Moser sys...
We present an algebraic formulation of the notion of integrability of dynamical systems, based on a ...
In this dissertation I prove a number of results about the symplectic geometry of finite dimensional...
Title: Integrability in Hamiltonian mechanics Author: David Kokoška Department: Mathematical Institu...