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Advances in High Energy Physics
Volume 2013, Article ID 923686, 6 pages
Research Article

Minimal Length Schrödinger Equation with Harmonic Potential in the Presence of a Magnetic Field

1Department of Physics, Shahrood University, Shahrood, Iran
2Department of Basic Sciences, Shahrood Branch, Islamic Azad University, Shahrood, Iran
3Theoretical Physics Group, Department of Physics, University of Uyo, Nigeria
4Department of Basic Sciences, Garmsar Branch, Islamic Azad University, Garmsar, Iran

Received 18 August 2013; Revised 20 October 2013; Accepted 20 October 2013

Academic Editor: Elias C. Vagenas

Copyright © 2013 H. Hassanabadi et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.


Minimal length Schrödinger equation is investigated for harmonic potential in the presence of magnetic field and illustrates the wave functions in the momentum space. The energy eigenvalues are reported and the corresponding wave functions are calculated in terms of hypergeometric functions.