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Using Double Integral Transform (Laplace-ARA Transform) in Solving Partial Differential Equations

Abdelilah Kamal H. Sedeeg, Zahra I. Mahamoud, Rania Saadeh

2022Symmetry16 citationsDOIOpen Access PDF

Abstract

The main goal of this research is to present a new approach to double transforms called the double Laplace–ARA transform (DL-ARAT). This new double transform is a novel combination of Laplace and ARA transforms. We present the basic properties of the new approach including existence, linearity and some results related to partial derivatives and the double convolution theorem. To obtain exact solutions, the new double transform is applied to several partial differential equations such as the Klein–Gordon equation, heat equation, wave equation and telegraph equation; each of these equations has great utility in physical applications. In symmetry to other symmetric transforms, we conclude that our new approach is simpler and needs less calculations.

Topics & Concepts

Laplace transformLaplace transform applied to differential equationsPartial differential equationTwo-sided Laplace transformMathematicsConvolution theoremIntegral transformMathematical analysisInverse Laplace transformMellin transformConvolution (computer science)Green's function for the three-variable Laplace equationLaplace's equationApplied mathematicsFractional Fourier transformFourier transformComputer scienceFourier analysisMachine learningArtificial neural networkFractional Differential Equations SolutionsNonlinear Waves and SolitonsIterative Methods for Nonlinear Equations
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