Numerical Solution for Conformable Fractional PDEs by Using a New Double Conformable Integral Transform-Decomposition Method

Authors

DOI:

https://doi.org/10.24996/ijs.2024.65.8.30

Keywords:

Adomin decomposition method, Burger’s Equation, Conformable Fractional Derivatives, Conformable Sumudu–Elzaki transform, pseudohyperbolic equation

Abstract

The conformable Sumudu-Elzaki Transform Decomposition Method CSETDM is used in this research to handle the approximate numerical solutions for the regular and singular one-dimensional conformable Fractional Coupled Burger's Equation CFCBsE and the Nonlinear Singular Conformable Pseudohyperbolic equation NSCPE. This method is generalized in the sense of conformable derivatives. Essential results and theorems concerning this method are discussed. Some numerical examples are given to exhibit the proposed technique's viability, applicability, and effortlessness.

Author Biography

Mohammed G. S. Al-Safi, Department of Accounting- Al-Esraa University College, Baghdad, Iraq

Faculty Member - Accounting Department, Al-Esraa University College. Also, I do research in applied mathematics

 

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Published

2024-08-30

Issue

Section

Mathematics

How to Cite

Numerical Solution for Conformable Fractional PDEs by Using a New Double Conformable Integral Transform-Decomposition Method. (2024). Iraqi Journal of Science, 65(8), 4489-4512. https://doi.org/10.24996/ijs.2024.65.8.30

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