Analytical Solution for the Cubic-Quintic Duffing Oscillator Equation with Physics Applications

Alvaro H. Salas; Lorenzo J. Martínez H; David L. Ocampo R

doi:10.1155/2022/9269957

Complexity (Jan 2022)

Analytical Solution for the Cubic-Quintic Duffing Oscillator Equation with Physics Applications

Alvaro H. Salas,
Lorenzo J. Martínez H,
David L. Ocampo R

Affiliations

Alvaro H. Salas: Department of Mathematics and Statistics
Lorenzo J. Martínez H: Department of Mathematics and Statistics
David L. Ocampo R: Department of Mathematics and Statistics

DOI: https://doi.org/10.1155/2022/9269957
Journal volume & issue: Vol. 2022

Abstract

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The nonlinear differential equation governing the periodic motion of the one-dimensional, undamped, and unforced cubic-quintic Duffing oscillator is solved exactly by obtaining the period and the solution. The period is given in terms of the complete elliptic integral of the first kind and the solution involves Jacobian elliptic functions. We solve the cubic-quintic Duffing equation under arbitrary initial conditions. Physical applications are provided. The solution to the mixed parity Duffing oscillator is also formally derived. We illustrate the obtained results with concrete examples. We give high accurate trigonometric approximations to the Jacobian function cn.

Published in Complexity

ISSN: 1076-2787 (Print); 1099-0526 (Online)
Publisher: Hindawi-Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics: Instruments and machines: Electronic computers. Computer science
Website: https://www.hindawi.com/journals/complexity/

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