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An approximate solution of a time fractional Burgers’ equation involving the Caputo-Katugampola fractional derivative

Mohamed Elbadri

2023Partial Differential Equations in Applied Mathematics15 citationsDOIOpen Access PDF

Abstract

The reduced version of the fractional Laplace transform, called the v-Laplac transform, is used in combination with the Adomian decomposition method to generate approximate solutions of the fractional Berger's equation with the Caputo-Katugampola fractional derivative. The effect of the order of the Caputo-Katugampola fractional derivative in Berger's equation is analyzed. The obtained approximate solutions are displayed graphically. The graphs and numerical solutions have demonstrated a tight correspondence between the exact and v-Laplace DM solutions. It is observed that the solutions for various orders u and v display the same behavior and tend to an integer-order problem's solution, confirming the validity of the provided method.

Topics & Concepts

Fractional calculusLaplace transformMathematicsAdomian decomposition methodExact solutions in general relativityOrder (exchange)Derivative (finance)Integer (computer science)Decomposition method (queueing theory)Mathematical analysisBurgers' equationMittag-Leffler functionApplied mathematicsDifferential equationDiscrete mathematicsComputer scienceFinanceEconomicsProgramming languageFinancial economicsFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsMathematical functions and polynomials
An approximate solution of a time fractional Burgers’ equation involving the Caputo-Katugampola fractional derivative | Litcius