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Generalized nonlinear oscillators with quasi-harmonic behaviour: classical solutions

The classical nonlinear oscillator, proposed by Mathews and Lakshmanan in 1974 and including a position-dependent mass in the kinetic energy term, is generalized in two different ways by adding an extra term to the potential. The solutions of the Euler-Lagrange equation are shown to exhibit richer behaviour patterns than those of the original nonlinear oscillator.

preprint2015arXivOpen access

C. Quesne

math-ph math.MP nlin.SI physics.class-ph

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Generalized nonlinear oscillators with quasi-harmonic behaviour: classical solutions

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