The general Racah algebra as the symmetry algebra of generic systems on
pseudo--spheres
- URL: http://arxiv.org/abs/2004.07048v1
- Date: Wed, 15 Apr 2020 12:22:14 GMT
- Title: The general Racah algebra as the symmetry algebra of generic systems on
pseudo--spheres
- Authors: S. Kuru, I. Marquette and J. Negro
- Abstract summary: We characterize the symmetry algebra of the generic superintegrable system on a pseudo-sphere corresponding to the homogeneous space $SO(p,q+1)/SO(p,q)$ where $p+q=cal N$, $cal Ninmathbb N$.
We show that this algebra is independent of the signature $(p,q+1)$ of the metric and that it is the same as the Racah algebra $cal R(cal N+1)$.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We characterize the symmetry algebra of the generic superintegrable system on
a pseudo-sphere corresponding to the homogeneous space $SO(p,q+1)/SO(p,q)$
where $p+q={\cal N}$, ${\cal N}\in\mathbb N$. We show that this algebra is
independent of the signature $(p,q+1)$ of the metric and that it is the same as
the Racah algebra ${\cal R}({\cal N}+1)$. The spectrum obtained from ${\cal
R}({\cal N}+1)$ via the Daskaloyannis method depends on undetermined signs that
can be associated to the signatures. Two examples are worked out explicitly for
the cases $SO(2,1)/SO(2)$ and $SO(3)/SO(2)$ where it is shown that their
spectrum obtained by means of separation of variables coincide with particular
choices of the signs corresponding to the specific signatures of the spectrum
for the symmetry algebra ${\cal R}(3)$.
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