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Numerical Solution of Advection–Diffusion Equation of Fractional Order Using Chebyshev Collocation Method

Farman Ali Shah, Kamran Kamran, Wadii Boulila, Anis Koubâa, Nabil Mlaiki

2023Fractal and Fractional18 citationsDOIOpen Access PDF

Abstract

This work presents a highly accurate method for the numerical solution of the advection–diffusion equation of fractional order. In our proposed method, we apply the Laplace transform to handle the time-fractional derivative and utilize the Chebyshev spectral collocation method for spatial discretization. The primary motivation for using the Laplace transform is its ability to avoid the classical time-stepping scheme and overcome the adverse effects of time steps on numerical accuracy and stability. Our method comprises three primary steps: (i) reducing the time-dependent equation to a time-independent equation via the Laplace transform, (ii) employing the Chebyshev spectral collocation method to approximate the solution of the transformed equation, and (iii) numerically inverting the Laplace transform. We discuss the convergence and stability of the method and assess its accuracy and efficiency by solving various problems in two dimensions.

Topics & Concepts

Laplace transformMathematicsSpectral methodCollocation (remote sensing)DiscretizationCollocation methodInverse Laplace transformMathematical analysisChebyshev polynomialsFractional calculusChebyshev filterChebyshev nodesApplied mathematicsDiffusion equationLaplace's equationLaplace transform applied to differential equationsPartial differential equationComputer scienceDifferential equationOrdinary differential equationService (business)Machine learningEconomyEconomicsFractional Differential Equations SolutionsDifferential Equations and Numerical MethodsIterative Methods for Nonlinear Equations
Numerical Solution of Advection–Diffusion Equation of Fractional Order Using Chebyshev Collocation Method | Litcius