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Rotatıonal And Vıbratıonal Dıatomıc Molecule In The Kleın Gordon Equatıon Wıth Hyperbolıc Scalar And Vector Potentıals (Ikhdair, Sameer M.,)
Bibliographical information (record 266078)
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Rotatıonal And Vıbratıonal Dıatomıc Molecule In The Kleın Gordon Equatıon Wıth Hyperbolıc Scalar And Vector Potentıals
Author:
 Ikhdair, Sameer M., Search Author in Amazon Books

Publisher:
World Scientific Publ,
Edition:
 2009.
Classification:
 QC 21.3
URL:
http://library.neu.edu.tr:2048/login?url=http://dx.doi.org/10.1142/S0129183109014606
Detailed notes
    - We present an approximate analytic solution of the Klein Gordon equation in the presence of equal scalar and vector generalized deformed hyperbolic potential functions by means of parametric generalization of the Nikiforov-Uvarov method. We obtain the approximate bound-state rotational vibrational (ro-vibrational) energy levels and the corresponding normalized wave functions expressed in terms of the Jacobi polynomial Pn((mu,v)) (x), where mu > -1, v > -1, and x is an element of [-1, +1] for a spin-zero particle in a closed form. Special cases are studied including the nonrelativistic solutions obtained by appropriate choice of parameters and also the s-wave solutions.
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Status
Library
Section
EOL-1319
Item available
NEU Grand LibraryOnline (QC 21.3 .R68 2009)
Online electronic
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