Reduction theory is concerned with mechanical systems with symmetries. It constructs a lower dimensional reduced space in which associated conservation laws are taken out and symmetries are \factored out" and studies the relation between the dynamics of the given system with the dynamics on the reduced space. This subject is important in many areas, such as stability of relative equilibria, geometric phases and integrable systems
If a mechanical system experiences symmetry, the Lagrangian becomes invariant under a certain group ...
AbstractThis paper proves a symplectic reduction by stages theorem in the context of geometric mecha...
This paper gives an overview of selected topics in mechanics and their relation to questions of sta...
Reduction theory for mechanical systems with symmetry has its roots in the clas-sical works in mecha...
This paper expounds the modern theory of symplectic reduction in finite-dimensional Hamiltonian mech...
In these ve lectures, I cover selected items from the following topics: 1. Reduction theory for mec...
We go through the basic theory of simple mehcanical systems on Riemannain manifolds with symmetry, i...
We give a unified framework for the construction of symplectic manifolds from systems with symmetrie...
This paper aims to introduce readers with backgrounds in classical molecular dynamics to some ideas ...
We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems with symmet...
An overview is first given of reduction for simple mechanical systems (i.e., those whose Lagrangians...
One of the foremost goals of research in physics is to find the most basic and universal theories th...
Abstract. We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems w...
AbstractThis paper presents an alternative phase space reduction process for Hamiltonian systems wit...
This paper surveys selected recent progress in geometric mechanics, focussing on Lagrangian reductio...
If a mechanical system experiences symmetry, the Lagrangian becomes invariant under a certain group ...
AbstractThis paper proves a symplectic reduction by stages theorem in the context of geometric mecha...
This paper gives an overview of selected topics in mechanics and their relation to questions of sta...
Reduction theory for mechanical systems with symmetry has its roots in the clas-sical works in mecha...
This paper expounds the modern theory of symplectic reduction in finite-dimensional Hamiltonian mech...
In these ve lectures, I cover selected items from the following topics: 1. Reduction theory for mec...
We go through the basic theory of simple mehcanical systems on Riemannain manifolds with symmetry, i...
We give a unified framework for the construction of symplectic manifolds from systems with symmetrie...
This paper aims to introduce readers with backgrounds in classical molecular dynamics to some ideas ...
We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems with symmet...
An overview is first given of reduction for simple mechanical systems (i.e., those whose Lagrangians...
One of the foremost goals of research in physics is to find the most basic and universal theories th...
Abstract. We develop reduction theory for controlled Lagrangian and controlled Hamiltonian systems w...
AbstractThis paper presents an alternative phase space reduction process for Hamiltonian systems wit...
This paper surveys selected recent progress in geometric mechanics, focussing on Lagrangian reductio...
If a mechanical system experiences symmetry, the Lagrangian becomes invariant under a certain group ...
AbstractThis paper proves a symplectic reduction by stages theorem in the context of geometric mecha...
This paper gives an overview of selected topics in mechanics and their relation to questions of sta...