Add to ORKGAbstract. The Hannay angles arise in classical mechanics as an anholonomy effect for adiabatically time-dependent Hamiltonian systems. It is proven that for a class of systems with several degrees of freedom the Hannay angles can be experimentally investigated. Our method consists in averaging over the torus of initial angles of the motion. AMS Classification scheme numbers: 34C29,70H99 PACS numbers: 0320 1
We are accustomed to think the phase of single particle states does not matter. After all, the phase...
This volume collects three series of lectures on applications of the theory of Hamiltonian systems, ...
A class of analytic (possibly) time-dependent Hamiltonian systems withd degrees of freedom and the “...
We consider, within the framework developed by Hannay for classical integrable systems (Hannay, 1985...
We establish an analytically computable formula based on the adiabatic Melnikov function for lobe ar...
The classical Hannay angle and the quantal Berry phase are discussed for systems involving neither d...
Certain systems do not completely return to themselves when a subsystem moves through a closed circu...
In this work we apply the moving systems approach developed by Marsden, Montgomery, and Ratiu to a f...
Consider an N degree of freedom autonomous Hamiltonian system having a Hamiltonian function of the f...
The purpose of this thesis is to explore the mathematics behind these action-angle coordinates, and ...
Adiabatic invariants for dynamical systems with one degree of freedom are derived. The method develo...
The word \u27monodromy\u27 means \u27once around a course\u27, and it refers to changes that might o...
We extend the theory of Aubry-Mather measures to Hamiltonian systems that arise in vakonomic mechani...
Abstract: Hamiltonian system with two degrees of freedom is considered, in which fast and ...
SIGLEAvailable from British Library Document Supply Centre- DSC:D52060/84 / BLDSC - British Library ...
We are accustomed to think the phase of single particle states does not matter. After all, the phase...
This volume collects three series of lectures on applications of the theory of Hamiltonian systems, ...
A class of analytic (possibly) time-dependent Hamiltonian systems withd degrees of freedom and the “...
We consider, within the framework developed by Hannay for classical integrable systems (Hannay, 1985...
We establish an analytically computable formula based on the adiabatic Melnikov function for lobe ar...
The classical Hannay angle and the quantal Berry phase are discussed for systems involving neither d...
Certain systems do not completely return to themselves when a subsystem moves through a closed circu...
In this work we apply the moving systems approach developed by Marsden, Montgomery, and Ratiu to a f...
Consider an N degree of freedom autonomous Hamiltonian system having a Hamiltonian function of the f...
The purpose of this thesis is to explore the mathematics behind these action-angle coordinates, and ...
Adiabatic invariants for dynamical systems with one degree of freedom are derived. The method develo...
The word \u27monodromy\u27 means \u27once around a course\u27, and it refers to changes that might o...
We extend the theory of Aubry-Mather measures to Hamiltonian systems that arise in vakonomic mechani...
Abstract: Hamiltonian system with two degrees of freedom is considered, in which fast and ...
SIGLEAvailable from British Library Document Supply Centre- DSC:D52060/84 / BLDSC - British Library ...
We are accustomed to think the phase of single particle states does not matter. After all, the phase...
This volume collects three series of lectures on applications of the theory of Hamiltonian systems, ...
A class of analytic (possibly) time-dependent Hamiltonian systems withd degrees of freedom and the “...