Innovative Solutions to the Fractional Diffusion Equation Using the Elzaki Transform-Reference-Cited by-同舟云学术

Innovative Solutions to the Fractional Diffusion Equation Using the Elzaki Transform

Published:2024-09-02 Issue:5 Volume:29 Page:75
ISSN:2297-8747
Container-title:Mathematical and Computational Applications
language:en
Short-container-title:MCA

Author:

Noor Saima¹²^ORCID,Alrowaily Albandari W.³,Alqudah Mohammad⁴^ORCID,Shah Rasool⁵^ORCID,El-Tantawy Samir A.⁶⁷^ORCID

Affiliation:

1. Department of Basic Sciences, General Administration of Preparatory Year, King Faisal University, P.O. Box 400, Al Ahsa 31982, Saudi Arabia

2. Department of Mathematics and Statistics, College of Science, King Faisal University, P.O. Box 400, Al Ahsa 31982, Saudi Arabia

3. Department of Physics, College of Science, Princess Nourah bint Abdulrahman University, Riyadh 11671, Saudi Arabia

4. Department of Basic Sciences, School of Electrical Engineering & Information Technology, German Jordanian University, Amman 11180, Jordan

5. Department of Computer Science and Mathematics, Lebanese American University, Beirut 03797751, Lebanon

6. Department of Physics, Faculty of Science, Port Said University, Port Said 42521, Egypt

7. Department of Physics, Faculty of Science, Al-Baha University, Al-Baha P.O. Box 1988, Saudi Arabia

Abstract

This study explores the application of advanced mathematical techniques to solve fractional differential equations, focusing particularly on the fractional diffusion equation. The fractional diffusion equation, used to simulate a range of physical and engineering phenomena, poses considerable difficulties when applied to fractional orders. Thus, by utilizing the mighty powers of fractional calculus, we employ the variational iteration method (VIM) with the Elzaki transform to produce highly accurate approximations for these specific differential equations. The VIM provides an iterative framework for refining solutions progressively, while the Elzaki transform simplifies the complex integral transforms involved. By integrating these methodologies, we achieve accurate and efficient solutions to the fractional diffusion equation. Our findings demonstrate the robustness and effectiveness of combining the VIM and the Elzaki transform in handling fractional differential equations, offering explicit functional expressions that are beneficial for theoretical analysis and practical applications. This research contributes to the expanding field of fractional calculus, providing valuable insights and useful tools for solving complex, nonlinear fractional differential equations across various scientific and engineering disciplines.

Funder

Princess Nourah bint Abdulrahman University Researchers Supporting Project

Deanship of Scientific Research, Vice Presidency for Graduate Studies and Scientific Research, King Faisal University, Saudi Arabia

Publisher

MDPI AG

Link

https://www.mdpi.com/2297-8747/29/5/75/pdf

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