The fractional features of a harmonic oscillator with position-dependent mass
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Date
2020
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Iop Publishing Ltd
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Abstract
In this study, a harmonic oscillator with position-dependent mass is investigated. Firstly, as an introduction, we give a full description of the system by constructing its classical Lagrangian; thereupon, we derive the related classical equations of motion such as the classical Euler-Lagrange equations. Secondly, we fractionalize the classical Lagrangian of the system, and then we obtain the corresponding fractional Euler-Lagrange equations (FELEs). As a final step, we give the numerical simulations corresponding to the FELEs within different fractional operators. Numerical results based on the Caputo and the Atangana-Baleanu-Caputo (ABC) fractional derivatives are given to verify the theoretical analysis.
Description
Jajarmi, Amin/0000-0003-2768-840X; Sajjadi, Samaneh Sadat/0000-0001-7215-885X; Asad, Jihad/0000-0002-6862-1634
Keywords
Position-Dependent Mass, Harmonic Oscillator, Euler-Lagrange Equations, Fractional Derivative
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Citation
Baleanu, Dumitru...et al. (2020). "The fractional features of a harmonic oscillator with position-dependent mass", Communications in Theoretical Physics, Vol. 72, No. 5.
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Q2
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Volume
72
Issue
5