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Modelling and analysis of fractal-fractional partial differential equations: Application to reaction-diffusion model

Kolade M. Owolabi, Abdon Atangana, Ali Akgül

2020Alexandria Engineering Journal175 citationsDOIOpen Access PDF

Abstract

In this paper, an extension is paid to an idea of fractal and fractional derivatives which has been applied to a number of ordinary differential equations to model a system of partial differential equations. As a case study, the fractal fractional Schnakenberg system is formulated with the Caputo operator (in terms of the power law), the Caputo-Fabrizio operator (with exponential decay law) and the Atangana-Baleanu fractional derivative (based on the Mittag-Liffler law). We design some algorithms for the Schnakenberg model by using the newly proposed numerical methods. In such schemes, it worth mentioning that the classical cases are recovered whenever α=1 and β=1. Numerical results obtained for different fractal-order (β∈(0,1)) and fractional-order (α∈(0,1)) are also given to address any point and query that may arise.

Topics & Concepts

FractalMathematicsFractional calculusFractal derivativePartial differential equationOperator (biology)Ordinary differential equationApplied mathematicsExponential functionDifferential equationMathematical analysisFractal analysisFractal dimensionRepressorChemistryBiochemistryGeneTranscription factorFractional Differential Equations SolutionsNonlinear Differential Equations AnalysisDifferential Equations and Numerical Methods
Modelling and analysis of fractal-fractional partial differential equations: Application to reaction-diffusion model | Litcius