Solution of Schrodinger equation for Three Dimensional Harmonics Oscillator plus Rosen- Morse Non-central potential using NU Method and Romanovski Polynomials

Cari , C and Suparmi, A (2014) Solution of Schrodinger equation for Three Dimensional Harmonics Oscillator plus Rosen- Morse Non-central potential using NU Method and Romanovski Polynomials. Journal of Physics: Conference Series.

Full text not available from this repository.

Abstract

The energy eigenvalues and eigenfunctions of Schrodinger equation for three dimensional harmonic osci l lator potential plus Rosen-Morse non-central potential are investigated using NU method and Romanovski polynomial . The bound state energy eigenvalues are given in a closed form and corresponding radial wave functions are expressed in associated Laguerre polynomials whi le angular eigen functions are given in terms of Romanovski polynomials. The Rosen-Morse potential is considered to be a perturbation factor to the three dimensional harmonic osci l lator potential that causes the increase of radial wave function ampl i tude and decrease of angular momentum length. Keywords: Schrodinger Equation, Three dimensional Harmonic Osci l lator potential , Rosen-morse non-central potential , NU method, Romanovski Polynomials

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: 08 May 2014 08:47
Last Modified: 01 Sep 2016 11:20
URI: https://eprints.uns.ac.id/id/eprint/15368

Actions (login required)

View Item