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Quantum Harmonic Oscillator

In: Oscillators - Recent Developments

Author

Listed:
  • Coskun Deniz

Abstract

Quantum harmonic oscillator (QHO) involves square law potential (x2) in the Schrodinger equation and is a fundamental problem in quantum mechanics. It can be solved by various conventional methods such as (i) analytical methods where Hermite polynomials are involved, (ii) algebraic methods where ladder operators are involved, and (iii) approximation methods where perturbation, variational, semiclassical, etc. techniques are involved. Here we present the general outcomes of the two conventional semiclassical approximation methods: the JWKB method (named after Jeffreys, Wentzel, Kramers, and Brillouin) and the MAF method (abbreviated for "modified Airy functions") to solve the QHO in a very good precision. Although JWKB is an approximation method, it interestingly gives the exact solution for the QHO except for the classical turning points (CTPs) where it diverges as typical to the JWKB. As the MAF method, it enables very approximate wave functions to be written in terms of Airy functions without any discontinuity in the entire domain, though, it needs careful treatment since Airy functions exhibit too much oscillatory behavior. Here, we make use of the parity conditions of the QHO to find the exact JWKB and approximate MAF solutions of the QHO within the capability of these methods.

Suggested Citation

  • Coskun Deniz, 2019. "Quantum Harmonic Oscillator," Chapters, in: Patrice Salzenstein (ed.), Oscillators - Recent Developments, IntechOpen.
    • Handle: RePEc:ito:pchaps:169300
    DOI: 10.5772/intechopen.85147
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    Keywords

    Schrodinger equation; quantum mechanics; JWKB; MAF;
    All these keywords.

    JEL classification:

    • C60 - Mathematical and Quantitative Methods - - Mathematical Methods; Programming Models; Mathematical and Simulation Modeling - - - General

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