In 1995, Sebastian (1995 J. Phys. A: Math. Gen. 28 4305) gave a path integral computation of the propagator of subdiffusive fractional Brownian motion (fBm), i.e. fBm with a Hurst or self-similarity exponent H ∈ (0, 1/2). The extension of Sebastian’s calculation to superdiffusion, H ∈ (1/2, 1], becomes however quite involved due to the appearance of additional boundary conditions on fractional derivatives of the path. In this communication, we address the construction of the path integral representation in a different fashion, which allows us to treat both subdiffusion and superdiffusion on an equal footing. The derivation of the propagator of fBm for the general Hurst exponent is then performed in a neat and unified way. PACS numbers: 05.4...
It is shown that subdiffusion processes in quantum dynamical systems can be realized without impleme...
We study several properties of the sub-fractional Brownian motion introduced by Bojdecki, Gorostiza ...
Fractional Brownian motion (fBm) is a nonstationary self-similar continuous stochastic process used ...
5 pages, no figures.-- PACS nrs.: 05.40.-a, 02.50.Ey, 05.10.Gg.-- ArXiv preprint available at: http:...
8 pages, no figures.-- PACS nrs.: 02.50.Ey, 05.40.Jc, 05.40.Fb.-- ArXiv pre-print available at: http...
Fractional Lévy motion (fLm) is the natural generalization of fractional Brownian motion in the con...
The Wiener's path integral plays a central role in the studies of Brownian motion. Here we derive ex...
The aim of this work is to establish and generalize a relationship between fractional partial differ...
The aim of this work is to establish and generalize a relationship between fractional partial differ...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...
The work presents integral solutions of the fractional subdiffusion equation by an integral method, ...
In this thesis, we investigate the properties of solution to the stochastic differential equation dr...
In this note we consider generalised diffusion equations in which the diffusivity coefficient is not...
none2This book contains 20 contributions by the leading authors in fracrional dynmics. It covers t...
In this paper we show, by using dyadic approximations, the existence of a geometric rough path assoc...
It is shown that subdiffusion processes in quantum dynamical systems can be realized without impleme...
We study several properties of the sub-fractional Brownian motion introduced by Bojdecki, Gorostiza ...
Fractional Brownian motion (fBm) is a nonstationary self-similar continuous stochastic process used ...
5 pages, no figures.-- PACS nrs.: 05.40.-a, 02.50.Ey, 05.10.Gg.-- ArXiv preprint available at: http:...
8 pages, no figures.-- PACS nrs.: 02.50.Ey, 05.40.Jc, 05.40.Fb.-- ArXiv pre-print available at: http...
Fractional Lévy motion (fLm) is the natural generalization of fractional Brownian motion in the con...
The Wiener's path integral plays a central role in the studies of Brownian motion. Here we derive ex...
The aim of this work is to establish and generalize a relationship between fractional partial differ...
The aim of this work is to establish and generalize a relationship between fractional partial differ...
Fractional Brownian motion is a nontrivial generalization of standard Brownian motion (Wie- ner proc...
The work presents integral solutions of the fractional subdiffusion equation by an integral method, ...
In this thesis, we investigate the properties of solution to the stochastic differential equation dr...
In this note we consider generalised diffusion equations in which the diffusivity coefficient is not...
none2This book contains 20 contributions by the leading authors in fracrional dynmics. It covers t...
In this paper we show, by using dyadic approximations, the existence of a geometric rough path assoc...
It is shown that subdiffusion processes in quantum dynamical systems can be realized without impleme...
We study several properties of the sub-fractional Brownian motion introduced by Bojdecki, Gorostiza ...
Fractional Brownian motion (fBm) is a nonstationary self-similar continuous stochastic process used ...