The leading role of a special function of the Wright-type, referred to as M-Wright or Mainardi function, within a parametric class of self-similar stochastic processes with stationary increments, is surveyed. This class of processes, known as generalized grey Brownian motion, provides models for both fast and slow anomalous diffusion. In view of a subordination-type formula involving M-Wright functions, these processes emerge to have all finite moments and be uniquely defined by their mean and auto-covariance structure like Gaussian processes. The corresponding master equation is shown to be a fractional differential equation in the Erdélyi-Kober sense and the diffusive process is named Erdélyi-Kober fractional diffusion. In Appendix, an hi...
Two-particle dispersion is investigated in the context of anomalous diffusion. Two different modelin...
Brownian motion, fractional Brownian motion (fBm) and Levy motion are stochastic processes with stat...
Brownian motion can be characterized as a generalized random process and, as such, has a generalized...
The leading role of a special function of the Wright-type, referred to as M-Wright or Mainardi funct...
In the present review we survey the properties of a transcendental function of the Wright type, nowa...
In this paper we present a general mathematical construction that allows us to define a parametric...
We revisit the Cauchy problem for the time-fractional diffusion equation, which is obtained from the...
In this review paper, we stress the importance of the higher transcendental Wright functions of the ...
Brownian motion can be characterized as a generalized random process and, as such, has a generalized...
After a short excursion from discovery of Brownian motion to the Richardson "law of four thirds" in ...
An approach to develop stochastic models for studying anomalous diffusion is proposed. In particular...
Motivated by the results of infinite dimensional Gaussian analysis and especially white noise analys...
The generalized diffusion equations with fractional order derivatives have shown be quite efficient ...
A fractional normal inverse Gaussian (FNIG) process is a fractional Brownian motion subordinated to ...
We consider an ensemble of Ornstein–Uhlenbeck processes featuring a population of relaxation times a...
Two-particle dispersion is investigated in the context of anomalous diffusion. Two different modelin...
Brownian motion, fractional Brownian motion (fBm) and Levy motion are stochastic processes with stat...
Brownian motion can be characterized as a generalized random process and, as such, has a generalized...
The leading role of a special function of the Wright-type, referred to as M-Wright or Mainardi funct...
In the present review we survey the properties of a transcendental function of the Wright type, nowa...
In this paper we present a general mathematical construction that allows us to define a parametric...
We revisit the Cauchy problem for the time-fractional diffusion equation, which is obtained from the...
In this review paper, we stress the importance of the higher transcendental Wright functions of the ...
Brownian motion can be characterized as a generalized random process and, as such, has a generalized...
After a short excursion from discovery of Brownian motion to the Richardson "law of four thirds" in ...
An approach to develop stochastic models for studying anomalous diffusion is proposed. In particular...
Motivated by the results of infinite dimensional Gaussian analysis and especially white noise analys...
The generalized diffusion equations with fractional order derivatives have shown be quite efficient ...
A fractional normal inverse Gaussian (FNIG) process is a fractional Brownian motion subordinated to ...
We consider an ensemble of Ornstein–Uhlenbeck processes featuring a population of relaxation times a...
Two-particle dispersion is investigated in the context of anomalous diffusion. Two different modelin...
Brownian motion, fractional Brownian motion (fBm) and Levy motion are stochastic processes with stat...
Brownian motion can be characterized as a generalized random process and, as such, has a generalized...