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

, &
Complexity 2022:1-14 (2022)
  Copy   BIBTEX

Abstract

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.

Categories

Keywords

Reprint years

DOI

10.1155/2022/9269957

Other Versions

No versions found

Links

PhilArchive

    This entry is not archived by us. If you are the author and have permission from the publisher, we recommend that you archive it. Many publishers automatically grant permission to authors to archive pre-prints. By uploading a copy of your work, you will enable us to better index it, making it easier to find.

    Upload a copy of this work     Papers currently archived: 103,024

External links

Setup an account with your affiliations in order to access resources via your University's proxy server

Through your library

My notes

Similar books and articles

New Periodic and Localized Traveling Wave Solutions to a Kawahara-Type Equation: Applications to Plasma Physics.Haifa A. Alyousef, Alvaro H. Salas, M. R. Alharthi & S. A. El-Tantawy - 2022 - Complexity 2022:1-15.
Effects of Symmetric and Asymmetric Nonlinearity on the Dynamics of a Third-Order Autonomous Duffing–Holmes Oscillator.Isaac Sami Doubla, Jacques Kengne, Raoul Blaise Wafo Tekam, Zeric Tabekoueng Njitacke & Clotaire Thierry Sanjong Dagang - 2020 - Complexity 2020:1-26.
Trial Equation Method Based on Symmetry and Applications to Nonlinear Equations Arising in Mathematical Physics.Cheng-Shi Liu - 2011 - Foundations of Physics 41 (5):793-804.
Some Novel Solutions to a Quadratically Damped Pendulum Oscillator: Analytical and Numerical Approximations.Alvaro H. Salas, Wedad Albalawi, M. R. Alharthi & S. A. El-Tantawy - 2022 - Complexity 2022:1-14.
An Iterative Algorithm for Solving n -Order Fractional Differential Equation with Mixed Integral and Multipoint Boundary Conditions.Jingjing Tan, Xinguang Zhang, Lishan Liu & Yonghong Wu - 2021 - Complexity 2021:1-10.
Generalized KdV equation for fluid dynamics and quantum algebras.A. Ludu, R. A. Ionescu & W. Greiner - 1996 - Foundations of Physics 26 (5):665-678.
The structure of the solutions to semilinear equations at a critical exponent.L. Edelson Allan - unknown
Physical foundations of quantum theory: Stochastic formulation and proposed experimental test. [REVIEW]V. J. Lee - 1980 - Foundations of Physics 10 (1-2):77-107.
Classification of exactly solvable potential problems.Haluk Beker - 1993 - Foundations of Physics 23 (5):851-856.
Entire solutions to a class of fully nonlinear elliptic equations.Ovidiu Savin - 2008 - Annali della Scuola Normale Superiore di Pisa- Classe di Scienze 7 (3):369-405.

Analytics

Added to PP
2022-06-17

Downloads
17 (#1,188,757)

6 months
1 (#1,608,746)

Historical graph of downloads
How can I increase my downloads?

Citations of this work

No citations found.

Add more citations

References found in this work

No references found.

Add more references