Numerical approximation of Riemann‐Liouville definition of fractional derivative: From Riemann‐Liouville to Atangana‐Baleanu

Numerical approximation of Riemann‐Liouville definition of fractional derivative: From Riemann‐Liouville to Atangana‐Baleanu

In the last decade, theoretical and applied studies were done in order to provide a suitable definition of fractional derivative, which meets all the requirement of a derivative in its primary sense. It was concluded by some eminent researchers that the Riemann‐Liouville version was the most suitabl...

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Veröffentlicht in:Numerical methods for partial differential equations 2018-09, Vol.34 (5), p.1502-1523
Hauptverfasser: Atangana, Abdon, Gómez‐Aguilar, J. F.
Format: Artikel
Sprache:eng
Schlagworte:
Approximation
exponential‐decay‐law
Mathematical analysis
Mittag‐Leffler‐law
numerical approximation
power‐law
Riemann‐Liouville definition
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Zusammenfassung:In the last decade, theoretical and applied studies were done in order to provide a suitable definition of fractional derivative, which meets all the requirement of a derivative in its primary sense. It was concluded by some eminent researchers that the Riemann‐Liouville version was the most suitable. However, many numerical approximation of fractional derivative were done with Caputo version. This paper addresses the numerical approximation of fractional differentiation based on the Riemann‐Liouville definition, from power‐law kernel to generalized Mittag‐Leffler‐law via exponential‐decay‐law.
ISSN:0749-159X
1098-2426
DOI:10.1002/num.22195