Modification of the Large Parameter Approach for the Periodic Solutions of Nonlinear Dynamical Systems

This paper focuses on the modification of the large parameter approach (LPA), a novelty procedure, for estimating the periodic solutions of two degrees-of-freedom (DOF) autonomous quasi-linear systems with a first integral. This strategy is crucial because it provides an effective approach to recogn...

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Bibliographic Details
Published inMathematics (Basel) Vol. 11; no. 14; p. 3159
Main Authors Ismail, A. I., Amer, T. S., Amer, W. S.
Format Journal Article
LanguageEnglish
Published Basel MDPI AG 01.07.2023
Subjects
Aerospace engineering
Astronomy
Degrees of freedom
dynamical system
Dynamical systems
Exact solutions
Food science
Initial conditions
Linear systems
Mathematical analysis
navigation
nonlinear dynamics
Nonlinear systems
Parameter modification
periodic solutions of rigid bodies
Perturbation
perturbation methods
satellite motions
Velocity
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Summary:This paper focuses on the modification of the large parameter approach (LPA), a novelty procedure, for estimating the periodic solutions of two degrees-of-freedom (DOF) autonomous quasi-linear systems with a first integral. This strategy is crucial because it provides an effective approach to recognizing approximate solutions to problems for which it is impossible to obtain exact solutions. These problems arise in the fields of physics, engineering, aerospace, and astronomy. They can be solved analytically using several perturbation approaches that depend on a small parameter that can be recognized according to the initial conditions and the body parameters of each problem. Therefore, we propose a large parameter instead of a small one to solve the aforementioned 2DOF systems, as well as provide a comparison between the suggested procedure and the previous approaches.
ISSN:2227-7390
2227-7390
DOI:10.3390/math11143159