Lévy Processes Linked to the Lower-Incomplete Gamma Function

Lévy Processes Linked to the Lower-Incomplete Gamma Function

We start by defining a subordinator by means of the lower-incomplete gamma function. This can be considered as an approximation of the stable subordinator, easier to be handled in view of its finite activity. A tempered version is also considered in order to overcome the drawback of infinite moments...

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Veröffentlicht in:Fractal and fractional 2021-09, Vol.5 (3), p.72
Hauptverfasser: Beghin, Luisa, Ricciuti, Costantino
Format: Artikel
Sprache:eng
Schlagworte:
anomalous diffusions
Approximation
Brownian motion
fractional operators
Gamma function
incomplete-gamma function
Laplace transforms
Lévy processes
Mathematical analysis
Mathematical functions
Operators (mathematics)
subordination
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Zusammenfassung:We start by defining a subordinator by means of the lower-incomplete gamma function. This can be considered as an approximation of the stable subordinator, easier to be handled in view of its finite activity. A tempered version is also considered in order to overcome the drawback of infinite moments. Then, we study Lévy processes that are time-changed by these subordinators with particular attention to the Brownian case. An approximation of the fractional derivative (as well as of the fractional power of operators) arises from the analysis of governing equations. Finally, we show that time-changing the fractional Brownian motion produces a model of anomalous diffusion, which exhibits a sub-diffusive behavior.
ISSN:2504-3110
2504-3110
DOI:10.3390/fractalfract5030072