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A Novel Method for the Analytical Solution of Partial Differential Equations Arising in Mathematical Physics

Hossein Ali Eaued, Hassan Kamil Jassim, Mayada Gassab Mohammed

2020IOP Conference Series Materials Science and Engineering22 citationsDOIOpen Access PDF

Abstract

Abstract In this article, an efficient analytical technique, called Sumudu variational iteration method (SVIM), is used to obtain the solution of fractional partial differential equations arising in mathematical physics. The fractional derivatives are described in terms of Caputo sense. This method is the combination of the Sumudu transform (ST) and variational iteration method (VIM). The solution of the suggested technique is represented in a series form, which is convergent to the exact solution of the given problems. Furthermore, the results of the present method have shown close relations with the exact approaches of the investigated problems. Illustrative examples are discussed, showing the validity of the current method. The attractive and straightforward procedure of the present method suggests that this method can easily be extended for the solutions of other nonlinear fractional-order partial differential equations.

Topics & Concepts

MathematicsPartial differential equationApplied mathematicsSeries (stratigraphy)Convergent seriesExact solutions in general relativityNonlinear systemDifferential equationOrder (exchange)Mathematical analysisFractional calculusCalculus (dental)PhysicsPower seriesPaleontologyEconomicsMedicineBiologyDentistryQuantum mechanicsFinanceFractional Differential Equations SolutionsNonlinear Waves and SolitonsIterative Methods for Nonlinear Equations