This paper is concerned with the fractionalized diffusion equations governing the law of the fractional Brownian motion $B_H(t)$. We obtain solutions of these equations which are probability laws extending that of $B_H(t)$. Our analysis is based on McBride fractional operators generalizing the hyper-Bessel operators $L$ and converting their fractional power $L^{alpha}$ into Erd'elyi--Kober fractional integrals. We study also probabilistic properties of the r.v.'s whose distributions satisfy space-time fractional equations involving Caputo and Riesz fractional derivatives. Some results emerging from the analysis of fractional equations with time-varying coefficients have the form of distributions of time-changed r.v.'s.

Fractional diffusions with time-varying coefficients

POLITO, Federico
2015-01-01

Abstract

This paper is concerned with the fractionalized diffusion equations governing the law of the fractional Brownian motion $B_H(t)$. We obtain solutions of these equations which are probability laws extending that of $B_H(t)$. Our analysis is based on McBride fractional operators generalizing the hyper-Bessel operators $L$ and converting their fractional power $L^{alpha}$ into Erd'elyi--Kober fractional integrals. We study also probabilistic properties of the r.v.'s whose distributions satisfy space-time fractional equations involving Caputo and Riesz fractional derivatives. Some results emerging from the analysis of fractional equations with time-varying coefficients have the form of distributions of time-changed r.v.'s.
2015
56
9
1
17
http://arxiv.org/pdf/1501.04806
http://arxiv.org/abs/1501.04806
Fractional Brownian motion, Grey Brownian motion, Fractional derivatives, Generalized Mittag-Leffler functions, Riesz fractional derivatives
R. Garra; E. Orsingher; F. Polito
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2318/1524654
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