Solving Partial Differential Equations of Fractional Order by Using a Novel Double Integral Transform

In this work, the double Sumudu–Elzaki transform was used for solving fractional-partial differential equations (FPDEs) with starting and boundary conditions. We will use the fractional-order derivative (Caputo’s derivatives) idea. Theorems and facts that are crucial to the newly introduced transfor...

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Bibliographic Details
Published in:Mathematical problems in engineering 2023, Vol.2023 (1)
Main Authors: Ahmed, Shams A., Elzaki, Tarig M., Mohamed, Anis
Format: Article
Language:English
Subjects:
Boundary conditions
Fractional calculus
Integral transforms
Mathematical analysis
Mathematical functions
Partial differential equations
Theorems
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Summary:In this work, the double Sumudu–Elzaki transform was used for solving fractional-partial differential equations (FPDEs) with starting and boundary conditions. We will use the fractional-order derivative (Caputo’s derivatives) idea. Theorems and facts that are crucial to the newly introduced transform are also discussed and illustrated. By using this newly designed integral transform and its properties, FPDEs can be reduced into algebraic equations. This strategy has the precise answer since it does not need any discrimination, transformation, or limited assumptions. Five further instances were given to support our conclusions. The results showed that the recommended strategy is superb, reliable, and efficient. It is also a simple method for solving specific problems in a number of applied scientific and technical fields.
ISSN:1024-123X
1563-5147
DOI:10.1155/2023/9971083