Approximate Solution of Schrodinger Equation for Modified Poschl- Teller plus Trigonometric Rosen-Morse Non-Central Potentials in Terms of Finite Romanovski Polynomials

Suparmi, A and Cari, C and Handhika, J and Yanuarie, C and Marini, H (2012) Approximate Solution of Schrodinger Equation for Modified Poschl- Teller plus Trigonometric Rosen-Morse Non-Central Potentials in Terms of Finite Romanovski Polynomials. IOSR Journal of Applied Physics (IOSR-JAP), 2 (2). pp. 45-51. ISSN 2278-4861

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    Abstract

    Abstract: The energy eigenvalues and eigenfunctions of Schrodinger equation for Modified Poschl-Teller potential plus trigonometric Rosen-Morse non-central potential are investigated approximately in terms offinite Romanovski polynomial. The approximation has been made to solve the radial Schrodinger equation. The approximate bound state energy eigenvalues are given in a closed form and corresponding radial and eigenfunctions are obtained in terms of Romanovski polynomials. The polar eigenfunctions are obtained in terms of Romanovski polynomials. The trigonometric Rosen-Morse potential is considered to be perturbation factor to the modified Poschl-Teller potential since it causes the decrease of the length of angular momentum vectors.

    Item Type: Article
    Subjects: Q Science > Q Science (General)
    Q Science > QC Physics
    Divisions: Lembaga Penelitian dan Pengabdian Kepada Masyarakat - LPPM
    Depositing User: Anis Fagustina
    Date Deposited: 03 May 2014 21:15
    Last Modified: 03 May 2014 21:15
    URI: https://eprints.uns.ac.id/id/eprint/14812

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