Symmetry, Integrability and Geometry: Methods and Applications
RUS  ENG    JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB  
General information
Latest issue
Archive
Impact factor

Search papers
Search references

RSS
Latest issue
Current issues
Archive issues
What is RSS



SIGMA:
Year:
Volume:
Issue:
Page:
Find






Personal entry:
Login:
Password:
Save password
Enter
Forgotten password?
Register


Symmetry, Integrability and Geometry: Methods and Applications, 2011, Volume 7, 113, 11 pp.
DOI: https://doi.org/10.3842/SIGMA.2011.113
(Mi sigma671)
 

This article is cited in 3 scientific papers (total in 3 papers)

Breaking pseudo-rotational symmetry through $\mathbf H^2_+$ metric deformation in the Eckart potential problem

Nehemias Leija-Martineza, David Edwin Alvarez-Castillob, Mariana Kirchbacha

a Institute of Physics, Autonomous University of San Luis Potosi, Av. Manuel Nava 6, San Luis Potosi, S.L.P. 78290, Mexico
b H. Niewodniczanski Institute of Nuclear Physics, Radzikowskiego 152, 31-342 Kraków, Poland
Full-text PDF (466 kB) Citations (3)
References:
Abstract: The peculiarity of the Eckart potential problem on $\mathbf H^2_+$ (the upper sheet of the two-sheeted two-dimensional hyperboloid), to preserve the $(2l+1)$-fold degeneracy of the states typical for the geodesic motion there, is usually explained in casting the respective Hamiltonian in terms of the Casimir invariant of an so$(2,1)$ algebra, referred to as potential algebra. In general, there are many possible similarity transformations of the symmetry algebras of the free motions on curved surfaces towards potential algebras, which are not all necessarily unitary. In the literature, a transformation of the symmetry algebra of the geodesic motion on $\mathbf H_+^2$ towards the potential algebra of Eckart's Hamiltonian has been constructed for the prime purpose to prove that the Eckart interaction belongs to the class of Natanzon potentials. We here take a different path and search for a transformation which connects the $(2l+1)$ dimensional representation space of the pseudo-rotational so$(2,1)$ algebra, spanned by the rank-$l$ pseudo-spherical harmonics, to the representation space of equal dimension of the potential algebra and find a transformation of the scaling type. Our case is that in so doing one is producing a deformed isometry copy to $\mathbf H^2_+$ such that the free motion on the copy is equivalent to a motion on $\mathbf H^2_+$, perturbed by a $\coth$ interaction. In this way, we link the so$(2,1)$ potential algebra concept of the Eckart Hamiltonian to a subtle type of pseudo-rotational symmetry breaking through $\mathbf H^2_+$ metric deformation. From a technical point of view, the results reported here are obtained by virtue of certain nonlinear finite expansions of Jacobi polynomials into pseudo-spherical harmonics. In due places, the pseudo-rotational case is paralleled by its so(3) compact analogue, the cotangent perturbed motion on S$^2$. We expect awareness of different so$(2,1)$/so$(3)$ isometry copies to benefit simulation studies on curved manifolds of many-body systems.
Keywords: pseudo-rotational symmetry, Eckart potential, symmetry breaking through metric deformation.
Received: October 12, 2011; in final form December 8, 2011; Published online December 11, 2011
Bibliographic databases:
Document Type: Article
MSC: 47E05; 81R40
Language: English
Citation: Nehemias Leija-Martinez, David Edwin Alvarez-Castillo, Mariana Kirchbach, “Breaking pseudo-rotational symmetry through $\mathbf H^2_+$ metric deformation in the Eckart potential problem”, SIGMA, 7 (2011), 113, 11 pp.
Citation in format AMSBIB
\Bibitem{LeiAlvKir11}
\by Nehemias Leija-Martinez, David Edwin Alvarez-Castillo, Mariana Kirchbach
\paper Breaking pseudo-rotational symmetry through $\mathbf H^2_+$ metric deformation in the Eckart potential problem
\jour SIGMA
\yr 2011
\vol 7
\papernumber 113
\totalpages 11
\mathnet{http://mi.mathnet.ru/sigma671}
\crossref{https://doi.org/10.3842/SIGMA.2011.113}
\mathscinet{http://mathscinet.ams.org/mathscinet-getitem?mr=2861228}
\isi{https://gateway.webofknowledge.com/gateway/Gateway.cgi?GWVersion=2&SrcApp=Publons&SrcAuth=Publons_CEL&DestLinkType=FullRecord&DestApp=WOS_CPL&KeyUT=000298101900001}
\scopus{https://www.scopus.com/record/display.url?origin=inward&eid=2-s2.0-84857170458}
Linking options:
  • https://www.mathnet.ru/eng/sigma671
  • https://www.mathnet.ru/eng/sigma/v7/p113
  • This publication is cited in the following 3 articles:
    Citing articles in Google Scholar: Russian citations, English citations
    Related articles in Google Scholar: Russian articles, English articles
    Symmetry, Integrability and Geometry: Methods and Applications
    Statistics & downloads:
    Abstract page:889
    Full-text PDF :51
    References:58
     
      Contact us:
     Terms of Use  Registration to the website  Logotypes © Steklov Mathematical Institute RAS, 2024