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The Power Fractional Calculus: First Definitions and Properties with Applications to Power Fractional Differential Equations

El Mehdi Lotfi, Houssine Zine, Delfim F. M. Torres, Noura Yousfi

2022Mathematics20 citationsDOIOpen Access PDF

Abstract

Using the Laplace transform method and the convolution theorem, we introduce new and more general definitions for fractional operators with non-singular kernels, extending well-known concepts existing in the literature. The new operators are based on a generalization of the Mittag–Leffler function, characterized by the presence of a key parameter p. This power parameter p is important to enable researchers to choose an adequate notion of the derivative that properly represents the reality under study, to provide good mathematical models, and to predict future dynamic behaviors. The fundamental properties of the new operators are investigated and rigorously proved. As an application, we solve a Caputo and a Riemann–Liouville fractional differential equation.

Topics & Concepts

Fractional calculusLaplace transformGeneralizationMathematicsConvolution (computer science)Applied mathematicsCalculus (dental)Function (biology)Generalized functionAlgebra over a fieldComputer scienceMathematical analysisPure mathematicsArtificial neural networkDentistryBiologyMachine learningMedicineEvolutionary biologyFractional Differential Equations SolutionsNonlinear Differential Equations AnalysisDifferential Equations and Numerical Methods
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