Approximate periodic solutions for oscillatory phenomena modelled by nonlinear differential equations (Q1718572)

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scientific article; zbMATH DE number 7016628

Language	Label	Description	Also known as
English	Approximate periodic solutions for oscillatory phenomena modelled by nonlinear differential equations	scientific article; zbMATH DE number 7016628

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scholarly article

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Approximate periodic solutions for oscillatory phenomena modelled by nonlinear differential equations (English)

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Constantin Bota

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Bogdan Căruntu

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Mathematical Problems in Engineering

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publication date

8 February 2019

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Summary: We apply the Fourier-least squares method (FLSM) which allows us to find approximate periodic solutions for a very general class of nonlinear differential equations modelling oscillatory phenomena. We illustrate the accuracy of the method by using several significant examples of nonlinear problems including the cubic Duffing oscillator, the Van der Pol oscillator, and the Jerk equations. The results are compared to those obtained by other methods.

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MaRDI profile type

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full work available at URL

https://doi.org/10.1155/2014/513473

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The homotopy perturbation method for nonlinear oscillators with discontinuities.

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Comparative vibration analysis of a parametrically nonlinear excited oscillator using HPM and numerical method

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Variational approach for nonlinear oscillators

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Higher-order approximate periodic solutions of a nonlinear oscillator with discontinuity by variational approach

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Harmonic balance approach to periodic solutions of non-linear jerk equations

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Rational harmonic balance based method for conservative nonlinear oscillators: application to the Duffing equation

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Newton-harmonic balancing approach for accurate solutions to nonlinear cubic-quintic duffing oscillators

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A note on the solutions of the Van der Pol and Duffing equations using a linearisation method

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Numerical investigations of the constant and periodic motions of the human vocal cords including stability and bifurcation phenomena

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A role of initial conditions choice on the results obtained using different perturbation methods

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Multidimensional adapted Runge-Kutta-Nyström methods for oscillatory systems

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An optimized explicit Runge-Kutta-Nyström method for the numerical solution of orbital and related periodical initial value problems

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On symplectic and symmetric ARKN methods

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Symmetric and symplectic ERKN methods for oscillatory Hamiltonian systems

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Numerical Versus Analytical Conditions for Chaos, Using the Example of the Duffing Oscillator

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Harmonic balance approach to limit cycles for nonlinear jerk equations

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Perturbation method for periodic solutions of nonlinear jerk equations

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Iteration calculations of periodic solutions to nonlinear jerk equations

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Analytical and approximate solutions to autonomous, nonlinear, third-order ordinary differential equations

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Identifiers

zbMATH Open document ID

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10.1155/2014/513473

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Mathematics Subject Classification ID

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zbMATH DE Number

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Sitelinks

Mathematics(1 entry)

mardi Publication:1718572

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