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On a Fractional Operator Combining Proportional and Classical Differintegrals

Dumitru Bǎleanu, Arran Fernandez, Ali Akgül

2020Mathematics286 citationsDOIOpen Access PDF

Abstract

The Caputo fractional derivative has been one of the most useful operators for modelling non-local behaviours by fractional differential equations. It is defined, for a differentiable function f ( t ) , by a fractional integral operator applied to the derivative f ′ ( t ) . We define a new fractional operator by substituting for this f ′ ( t ) a more general proportional derivative. This new operator can also be written as a Riemann–Liouville integral of a proportional derivative, or in some important special cases as a linear combination of a Riemann–Liouville integral and a Caputo derivative. We then conduct some analysis of the new definition: constructing its inverse operator and Laplace transform, solving some fractional differential equations using it, and linking it with a recently described bivariate Mittag-Leffler function.

Topics & Concepts

Fractional calculusMathematicsOperator (biology)Differential operatorDifferentiable functionLaplace transformDerivative (finance)Mathematical analysisPure mathematicsApplied mathematicsTranscription factorChemistryFinancial economicsGeneBiochemistryRepressorEconomicsFractional Differential Equations SolutionsMathematical functions and polynomialsIterative Methods for Nonlinear Equations
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