Universal integrals for superintegrable systems on N-dimensional spaces of constant curvature

Ballesteros, Ángel; Herranz, Francisco J.

doi:10.1088/1751-8113/40/2/f01

Cited by 64 publications

(168 citation statements)

References 28 publications

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“…The results above summarized allows for a straightforward superintegrable even-order anharmonic oscillator perturbation given by [1]:…”

Section: Oscillators On the Nd Euclidean Spacementioning

confidence: 99%

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Superintegrable Anharmonic Oscillators on N-dimensional Curved Spaces

Ballesteros¹,

Enciso²,

Herranz³

et al. 2008

JNMP

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The maximal superintegrability of the intrinsic harmonic oscillator potential on N-dimensional spaces with constant curvature is revisited from the point of view of sl(2)-Poisson coalgebra symmetry. It is shown how this algebraic approach leads to a straightforward definition of a new large family of quasi-maximally superintegrable perturbations of the intrinsic oscillator on such spaces. Moreover, the generalization of this construction to those N-dimensional spaces with non-constant curvature that are endowed with sl(2)-coalgebra symmetry is presented. As the first examples of the latter class of systems, both the oscillator potential on an N-dimensional Darboux space as well as several families of its quasi-maximally superintegrable anharmonic perturbations are explicitly constructed.

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“…The results above summarized allows for a straightforward superintegrable even-order anharmonic oscillator perturbation given by [1]:…”

Section: Oscillators On the Nd Euclidean Spacementioning

confidence: 99%

“…Therefore, the remaining functionally independent constant of the motion does exist and, therefore, it has to be found by direct methods. Such an additional integral can be shown to be any of the following N functions [1]:…”

Section: Stereographic Projection: Poincaré Coordinatesmentioning

confidence: 99%

Superintegrable Anharmonic Oscillators on N-dimensional Curved Spaces

Ballesteros¹,

Enciso²,

Herranz³

et al. 2008

JNMP

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“…Let us briefly recall the main result of [30] that provides an infinite family of QMS Hamiltonians. We stress that, although some of these Hamiltonians can be interpreted as motions on spaces with constant curvature, this approach to QMS systems is quite general, and also nonnatural Hamiltonian systems (for instance, those describing static electromagnetic fields) can be obtained.…”

Section: Qms Hamiltonians With Sl(2 R) Coalgebra Symmetrymentioning

confidence: 99%

“…tan( √ κ r) (see [30] for the expression of this quantity in terms of Poincaré and Beltrami coordinates). Also, for the sake of simplicity, the centrifugal terms coming from the symplectic realization with arbitrary b i will be expressed in ambient coordinates x i [30]:…”

Section: Superintegrable Potentials On Riemannian Spaces Of Constant mentioning

confidence: 99%

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Quantum Deformations and Superintegrable Motions on Spaces with Variable Curvature

Ragnisco

Ballesteros

Herranz

et al. 2007

SIGMA

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Abstract. An infinite family of quasi-maximally superintegrable Hamiltonians with a common set of (2N − 3) integrals of the motion is introduced. The integrability properties of all these Hamiltonians are shown to be a consequence of a hidden non-standard quantum sl(2, R) Poisson coalgebra symmetry. As a concrete application, one of this Hamiltonians is shown to generate the geodesic motion on certain manifolds with a non-constant curvature that turns out to be a function of the deformation parameter z. Moreover, another Hamiltonian in this family is shown to generate geodesic motions on Riemannian and relativistic spaces all of whose sectional curvatures are constant and equal to the deformation parameter z. This approach can be generalized to arbitrary dimension by making use of coalgebra symmetry.

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