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An analysis for heat equations arises in diffusion process using new Yang‐Abdel‐Aty‐Cattani fractional operator

Sunil Kumar, Surath Ghosh, Bessem Samet, Emile Franc Doungmo Goufo

2020Mathematical Methods in the Applied Sciences189 citationsDOI

Abstract

The heat equation is parabolic partial differential equation and occurs in the characterization of diffusion progress. In the present work, a new fractional operator based on the Rabotnov fractional‐exponential kernel is considered. Next, we conferred some fascinating and original properties of nominated new fractional derivative with some integral transform operators where all results are significant. The fundamental target of the proposed work is to solve the multidimensional heat equations of arbitrary order by using analytical approach homotopy perturbation transform method and residual power series method, where new fractional operator has been taken in new Yang‐Abdel‐Aty‐Cattani (YAC) sense. The obtained results indicate that solution converges to the original solution in language of generalized Mittag‐Leffler function. Three numerical examples are discussed to draw an effective attention to reveal the proficiency and adaptability of the recommended methods on new YAC operator.

Topics & Concepts

MathematicsFractional calculusOperator (biology)Heat kernelHeat equationPartial differential equationMathematical analysisIntegral transformSemi-elliptic operatorKernel (algebra)Applied mathematicsDifferential operatorPure mathematicsRepressorChemistryGeneBiochemistryTranscription factorFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsNonlinear Differential Equations Analysis
An analysis for heat equations arises in diffusion process using new Yang‐Abdel‐Aty‐Cattani fractional operator | Litcius