An instrumental insight for a periodic solution of a fractal Mathieu–Duffing equation

El‐Dib, Yusry O.; Elgazery, Nasser S.; Alyousef, Haifa A.

doi:10.1177/14613484231185907

Cited by 6 publications

(3 citation statements)

References 66 publications

(95 reference statements)

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“…Since finding a precise solution to these nonlinear fractal models is inherently difficult, analytical and numerical approaches are the most effective ways to tackle the problem. The ability to convert a fractal space into its continuous counterpart is a distinctive advantage of a novel technique presented by El-Dib et al [2,15,42,43]. The fractal derivative that emerges in equation ( 14) is transformed into the traditional derivative in the continuous space using the formula of El-Dib et al [2].…”

Section: Methodsmentioning

confidence: 99%

“…The comparison of equations(42) and(43) with the original definitions given in equations (27) and (28) reveals the values of the unknown parameters S and Sα as follows:Utilizing the values obtained from equations (42) and (43), equation…”

mentioning

confidence: 99%

“…The influence of fractal properties can be used to explain this observation. More specifically, damping is acted upon by the fractal dimension α, as[2,15,42,43] emphasize.…”

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confidence: 99%

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Stability analysis of a time-delayed Van der Pol–Helmholtz–Duffing oscillator in fractal space with a non-perturbative approach

El-Dib

2024

Commun. Theor. Phys.

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The time-delayed fractal Van der Pol-Helmholtz-Duffing (VPHD) oscillator is the subject of this paper, which explores its mechanisms and highlights its stability analysis. While time-delayed technologies are currently garnering significant attention, the focus of this research remains crucially relevant. A non-perturbative approach is employed to refine and set the stage for the system under scrutiny. The innovative methodologies introduced yield an equivalent linear differential equation, mirroring the inherent nonlinearities of the system. Notably, the incorporation of quadratic nonlinearity into the frequency formula represents a cutting-edge advancement. The analytical solution's validity is corroborated using a numerical approach. Stability conditions are ascertained through the residual Galerkin method. Intriguingly, it is observed that the delay parameter, in the context of the fractal system, reverses its stabilizing influence, impacting both the amplitude of delayed velocity and position. The analytical solution's precision is underscored by its close alignment with numerical results. Furthermore, the study reveals that fractal characteristics emulate damping behaviors. Given its applicability across diverse nonlinear dynamical systems, this non-perturbative approach emerges as a promising avenue for future research.

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Section: Methodsmentioning

confidence: 99%

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confidence: 99%

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Stability analysis of a time-delayed Van der Pol–Helmholtz–Duffing oscillator in fractal space with a non-perturbative approach

El-Dib

2024

Commun. Theor. Phys.

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A comprehensive study of stability analysis for nonlinear Mathieu equation without a perturbative technique

El‐Dib

2024

Z Angew Math Mech

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The present research focuses on the challenges engineers face in predicting the behavior of nonlinear vibration systems accurately. The nonperturbative method is highlighted as a solution that provides insights into chaos, bifurcation, resonance response, and stability attributes. Specifically, the study delves into the dynamic analysis of the nonlinear Mathieu equation. The research involves a complex and extensive analytical exploration, transitioning from a nonlinear state to a linear one through various stages. The introduced computational method aims to examine the resonance response of the nonlinear Mathieu equation and offer innovative solutions for the Mathieu–Duffing–type oscillator. The nonperturbative approach remains essential in gaining a deeper understanding of nonlinear vibration systems.

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An innovative efficient approach to solving damped Mathieu–Duffing equation with the non-perturbative technique

El-Dib

2024

Communications in Nonlinear Science and Numerical Simulation

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An instrumental insight for a periodic solution of a fractal Mathieu–Duffing equation

Cited by 6 publications

References 66 publications

Stability analysis of a time-delayed Van der Pol–Helmholtz–Duffing oscillator in fractal space with a non-perturbative approach

Stability analysis of a time-delayed Van der Pol–Helmholtz–Duffing oscillator in fractal space with a non-perturbative approach

A comprehensive study of stability analysis for nonlinear Mathieu equation without a perturbative technique

An innovative efficient approach to solving damped Mathieu–Duffing equation with the non-perturbative technique

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