Related papers: Dynamical and invariance algebras of the $d$-dimensional Dunkl-Coulomb problem

Dynamical and invariance algebras of the $d$-dimensional Dunkl-Coulomb problem

URL: http://arxiv.org/abs/2410.07862v1
Date: Thu, 10 Oct 2024 12:30:19 GMT
Title: Dynamical and invariance algebras of the $d$-dimensional Dunkl-Coulomb problem
Authors: Christiane Quesne,
Abstract summary: It is shown that the rich algebraic structure of the standard $d$-dimensional Coulomb problem can be extended to its Dunkl counterpart. replacing standard derivatives by Dunkl ones in the so($d+1$,2) dynamical algebra generators of the former gives rise to a deformed algebra with similar commutation relations.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: It is shown that the rich algebraic structure of the standard $d$-dimensional Coulomb problem can be extended to its Dunkl counterpart. Replacing standard derivatives by Dunkl ones in the so($d+1$,2) dynamical algebra generators of the former gives rise to a deformed algebra with similar commutation relations, except that the metric tensor becomes dependent on the reflection operators and that there are some additional commutation or anticommutation relations involving the latter. It is then shown that from some of the dynamical algebra generators it is straightforward to derive the integrals of motion of the Dunkl-Coulomb problem in Sturm representation. Finally, from the latter, the components of a deformed Laplace-Runge-Lenz vector are built. Together with the Dunkl angular momentum components, such operators insure the superintegrability of the Dunkl-Coulomb problem in Schr\"odinger representation.

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