Interpretation of the q-Deformed 1-D Quantum Harmonic Oscillator

Authors

  • A S Mahmood Department of Physics, College of Science, Al-Nahrain University, Baghdad-Iraq.
  • M. A Z Habeeb Department of Physics, College of Science, Al-Nahrain University, Baghdad-Iraq

Keywords:

quantum q-deformed oscillator, classical limit, classical Liouville equation, method of characteristics, classical probability distribution function

Abstract

The interpretation of the q-deformed 1-D quantum harmonic oscillator is investigated for two definitions of q-deformation. This investigation is achieved by using Zaslavskii’s method to obtain the Heisenberg equations of motion (quantum Liouville equations) in the undeformed phase space. These quantum Liouville equations exhibit a non-commutative geometry produce from the existence of the dilatation operator which is inherent in the q-deformation process. The classical limits of these equations are obtained by applying a special classical limiting condition to produce the classical Liouville equations of the q-deformed oscillator. These classical Liouville equations are solved by using the method of characteristics in order to obtain the classical probability distribution functions for this system. The 2-D and 3-D behaviors of these functions were then investigated using a computer visualization method. The results of the mathematical derivations together with the computer visualization method show that the classical limit of the quantum Liouville equations for the q-deformed 1-D quantum harmonic oscillator are statistical in nature where the nonlinearity parameter for the q-deformed oscillator is connected with . This result conforms to that obtained by Ghosh et al. for the undeformed 1-D quantum harmonic oscillator. The obtained classical probability distribution functions exhibit whorl shapes that evolve with time in phase space that are similar to the shapes obtained for the 1-D classical q-deformed oscillator. These whorl shapes in phase space are similar to those introduced by Milburn for the 1-D classical anharmonic oscillator. This similarity results from the fact that the anharmonicity itself represents a kind of deformation with a frequency that is a function of amplitude.



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Published

2018-05-24

Issue

Vol. 19 No. 3 (2016): September

Section

Articles

How to Cite

[1]
“Interpretation of the q-Deformed 1-D Quantum Harmonic Oscillator”, ANJS, vol. 19, no. 3, pp. 53–69, May 2018, Accessed: Apr. 24, 2024. [Online]. Available: https://anjs.edu.iq/index.php/anjs/article/view/206