Deng-Fan oscillator potential

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Exact Solutions of Feinberg-Horodecki Equation for Time-Dependent Deng-Fan Molecular Potential

Journal Title, Volume, Page: 
Journal of Theoretical and Applied Physics 2013, 7:40
Year of Publication: 
2013
Authors: 
Sameer M Ikhdair
Department of Physics, Faculty of Science, An-Najah National University, Nablus, West Bank, Palestine
Current Affiliation: 
Department of Physics, Faculty of Science, An-Najah National University, Nablus, Palestine
Majid Hamzavi
Department of Physics, Faculty of Science, An-Najah National University, Nablus, West Bank, Palestine
Majid Amirfakhrian
Department of Physics, Faculty of Science, An-Najah National University, Nablus, West Bank, Palestine
Preferred Abstract (Original): 

The exact bound state solutions of the Feinberg-Horodecki equation with the rotating time-dependent Deng-Fan oscillator potential are presented within the framework of the generalized parametric Nikiforov-Uvarov method. It is shown that the solutions can be expressed in terms of Jacobi polynomials or the generalized hypergeometric functions. The energy eigenvalues and the corresponding wave functions are obtained in closed forms.

2669's picture

Exact Solutions of Feinberg-Horodecki Equation for Time-Dependent Deng-Fan Molecular Potential

Journal Title, Volume, Page: 
Journal of Theoretical and Applied Physics, 7, 40
Year of Publication: 
2013
Authors: 
Sameer M Ikhdair
Department of Physics, Faculty of Science, An-Najah National University, Nablus, Palestine
Current Affiliation: 
Department of Physics, An-Najah National University, Nablus, Palestine
Majid Hamzavi
Department of Science and Engineering, Abhar Branch, Islamic Azad University, Abhar, Iran
Majid Amirfakhrian
Department of Science and Engineering, Abhar Branch, Islamic Azad University, Abhar, Iran
Preferred Abstract (Original): 

The exact bound state solutions of the Feinberg-Horodecki equation with the rotating time-dependent Deng-Fan oscillator potential are presented within the framework of the generalized parametric Nikiforov-Uvarov method. It is shown that the solutions can be expressed in terms of Jacobi polynomials or the generalized hypergeometric functions. The energy eigenvalues and the corresponding wave functions are obtained in closed forms.

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