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Dynamics of chaotic system based on circuit design with Ulam stability through fractal-fractional derivative with power law kernel

Naveed Khan, Zubair Ahmad, Jamal Shah, Saqib Murtaza, M. Daher Albalwi, Hijaz Ahmad, Jamel Baili, Shao-Wen Yao

2023Scientific Reports29 citationsDOIOpen Access PDF

Abstract

In this paper, the newly developed Fractal-Fractional derivative with power law kernel is used to analyse the dynamics of chaotic system based on a circuit design. The problem is modelled in terms of classical order nonlinear, coupled ordinary differential equations which is then generalized through Fractal-Fractional derivative with power law kernel. Furthermore, several theoretical analyses such as model equilibria, existence, uniqueness, and Ulam stability of the system have been calculated. The highly non-linear fractal-fractional order system is then analyzed through a numerical technique using the MATLAB software. The graphical solutions are portrayed in two dimensional graphs and three dimensional phase portraits and explained in detail in the discussion section while some concluding remarks have been drawn from the current study. It is worth noting that fractal-fractional differential operators can fastly converge the dynamics of chaotic system to its static equilibrium by adjusting the fractal and fractional parameters.

Topics & Concepts

Phase portraitFractalChaoticFractal derivativeKernel (algebra)UniquenessMathematicsNonlinear systemFractional calculusOrdinary differential equationApplied mathematicsStability (learning theory)MATLABMathematical analysisDifferential equationComputer scienceFractal dimensionBifurcationPhysicsFractal analysisPure mathematicsQuantum mechanicsOperating systemArtificial intelligenceMachine learningFractional Differential Equations SolutionsChaos control and synchronizationQuantum chaos and dynamical systems
Dynamics of chaotic system based on circuit design with Ulam stability through fractal-fractional derivative with power law kernel | Litcius