A Generalized Approach of Triple Integral Transforms and Applications

Saadeh, Rania

doi:10.1155/2023/4512353

Cited by 3 publications

(1 citation statement)

References 39 publications

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“…In 2013, Lin and Lu [18] illuminated the concept of using the extension coefficients of binomial series and the Laplace transform (LT) of fractional derivatives to generate explicit solutions for homogeneous fractional differential equations (see, for example, [2,6,8,18,20,22,24]).…”

Section: Introductionmentioning

confidence: 99%

Application of Laplace transform to solve fractional integro-differential equations

Gunasekar,

Raghavendran,

Santra

et al. 2024

J. Math. Computer Sci.

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This paper reveals the solutions to several families of fractional integro-differential equations through the application of a simple fractional calculus method. This approach results in various interesting consequences and also extends the classical Frobenius method. The provided approach is primarily based on established theorems concerning particular solutions of fractional integro-differential equations using the Laplace transform and the extension coefficients of binomial series. Additionally, an illustrative example of such fractional integro-differential equations is presented.

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Section: Introductionmentioning

confidence: 99%

Application of Laplace transform to solve fractional integro-differential equations

Gunasekar,

Raghavendran,

Santra

et al. 2024

J. Math. Computer Sci.

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Towards a new triple integral transform (Laplace–ARA–Sumudu) with applications

Saadeh,

K. Sedeeg,

A. Amleh

et al. 2023

Arab Journal of Basic and Applied Sciences

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Effective transform-expansions algorithm for solving non-linear fractional multi-pantograph system

Qazza

Saadeh

Ala’yed

et al. 2023

MATH

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<abstract> <p>This study presents a new and attractive analytical approach to treat systems with fractional multi-pantograph equations. We introduce the solution as a rapidly-converging series using the Laplace residual power series technique. This method controls the range of convergence and can be easily programmed to find many terms of the series coefficients by computer software. To show the efficiency and strength of the proposed method, we compare the results obtained in this study with those of the Homotopy analysis method and the residual power series technique. Furthermore, two exciting applications of fractional non-homogeneous pantograph systems are discussed in detail and solved numerically. We also present graphical simulations and analyses of the obtained results. Finally, we conclude that the obtained approximate solutions are very close to the exact solutions with a slight difference.</p> </abstract>

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A Generalized Approach of Triple Integral Transforms and Applications

Cited by 3 publications

References 39 publications

Application of Laplace transform to solve fractional integro-differential equations

Application of Laplace transform to solve fractional integro-differential equations

Towards a new triple integral transform (Laplace–ARA–Sumudu) with applications

Effective transform-expansions algorithm for solving non-linear fractional multi-pantograph system

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