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An efficient numerical approach for fractional multidimensional diffusion equations with exponential memory

Jagdev Singh, Devendra Kumar, Sunıl Dutt Purohıt, Aditya Mani Mishra, Mahesh Bohra

2020Numerical Methods for Partial Differential Equations48 citationsDOI

Abstract

Abstract In this article, we suggest a numerical approach based on q‐ homotopy analysis Elzaki transform method ( q‐ HAETM) to solve fractional multidimensional diffusion equations which represents density dynamics in a material undergoing diffusion. We take the noninteger derivative in the Caputo–Fabrizio kind. The proposed method, q‐ HAETM is an advanced adaptation in q ‐HAM and Elzaki transform method which makes mathematical calculation very effective additionally more accurate. Since, in classical perturbation scheme, the scheme restricted to the small parameter whereas the q‐ HAETM is not restricted to the small parameter. By theoretical and numerical evaluation it is observed that q‐ HAETM yields an analytical solution in the form of a convergent series. By taking three examples and applying q‐ HAETM, the numerical results reveal that the suggested method is straightforward to apply and computationally very effective.

Topics & Concepts

MathematicsFractional calculusConvergent seriesApplied mathematicsNumerical analysisExponential functionScheme (mathematics)Mathematical analysisPower seriesFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsDifferential Equations and Numerical Methods