The C. Neumann system describes a particle on the sphere Sn under the influence of a potential that is a quadratic form. We study the case that the quadratic form has ` +1 distinct eigenvalues with multiplicity. Each group of m equal eigenvalues gives rise to an O(m )-symmetry in configuration space. The combined symmetry group G is a direct product of ` + 1 such factors, and its cotangent lift has an Ad -equivariant momentum mapping. Regular reduction leads to the Rosochatius system on S` , which has the same form as the Neumann system albeit for an additional effective potential. To understand how the reduced systems fit together we use singular reduction to construct an embedding of the reduced Poisson space T Sn/G into R3`+3. The global...
This paper develops the theory of singular reduction for implicit Hamiltonian systems ad-mitting a s...
A family of classical integrable systems defined on a deformation of the two-dimensional sphere, hyp...
The concept of symmetry breaking and the emergence of corresponding local order parameters constitut...
AbstractA fundamental class of solutions of symmetric Hamiltonian systems is relative equilibria. In...
A fundamental class of solutions of symmetric Hamiltonian systems is relative equi-libria. In this p...
In this paper we study the Neumann system, which describes the harmonic oscillator (of arbitrary di...
1. The classical example of a system soluble by the method of separation of variables using elliptic...
AbstractA new formula for reconstruction phases in Hamiltonian systems with symmetry expresses the p...
The conditional symmetries of the reduced Einstein-Hilbert action emerging from a static, sphericall...
Reduction is a process that uses symmetry to lower the order of a Hamiltonian system. The new variab...
Relative equilibria of Lagrangian and Hamiltonian systems with symmetry are critical points of appro...
We formulate Euler-Poincare and Lagrange-Poincare equations for systems with broken symmetry. We spe...
summary:The Routh reduction of cyclic variables in the Lagrange function and the Jacobi-Maupertuis p...
The problem of degeneracy in quantum mechanics is related to the existence of groups of contact tran...
Accepted for publication in Nonlinearity We introduce a family of new non-linear many-body dynamical...
This paper develops the theory of singular reduction for implicit Hamiltonian systems ad-mitting a s...
A family of classical integrable systems defined on a deformation of the two-dimensional sphere, hyp...
The concept of symmetry breaking and the emergence of corresponding local order parameters constitut...
AbstractA fundamental class of solutions of symmetric Hamiltonian systems is relative equilibria. In...
A fundamental class of solutions of symmetric Hamiltonian systems is relative equi-libria. In this p...
In this paper we study the Neumann system, which describes the harmonic oscillator (of arbitrary di...
1. The classical example of a system soluble by the method of separation of variables using elliptic...
AbstractA new formula for reconstruction phases in Hamiltonian systems with symmetry expresses the p...
The conditional symmetries of the reduced Einstein-Hilbert action emerging from a static, sphericall...
Reduction is a process that uses symmetry to lower the order of a Hamiltonian system. The new variab...
Relative equilibria of Lagrangian and Hamiltonian systems with symmetry are critical points of appro...
We formulate Euler-Poincare and Lagrange-Poincare equations for systems with broken symmetry. We spe...
summary:The Routh reduction of cyclic variables in the Lagrange function and the Jacobi-Maupertuis p...
The problem of degeneracy in quantum mechanics is related to the existence of groups of contact tran...
Accepted for publication in Nonlinearity We introduce a family of new non-linear many-body dynamical...
This paper develops the theory of singular reduction for implicit Hamiltonian systems ad-mitting a s...
A family of classical integrable systems defined on a deformation of the two-dimensional sphere, hyp...
The concept of symmetry breaking and the emergence of corresponding local order parameters constitut...