English

Erd\'elyi-Kober Fractional Diffusion

Mathematical Physics 2012-01-04 v1 math.MP

Abstract

The aim of this Short Note is to highlight that the {\it generalized grey Brownian motion} (ggBm) is an anomalous diffusion process driven by a fractional integral equation in the sense of Erd\'elyi-Kober, and for this reason here it is proposed to call such family of diffusive processes as {\it Erd\'elyi-Kober fractional diffusion}. The ggBm is a parametric class of stochastic processes that provides models for both fast and slow anomalous diffusion. This class is made up of self-similar processes with stationary increments and it depends on two real parameters: 0<α20 < \alpha \le 2 and 0<β10 < \beta \le 1. It includes the fractional Brownian motion when 0<α20 < \alpha \le 2 and β=1\beta=1, the time-fractional diffusion stochastic processes when 0<α=β<10 < \alpha=\beta <1, and the standard Brownian motion when α=β=1\alpha=\beta=1. In the ggBm framework, the Mainardi function emerges as a natural generalization of the Gaussian distribution recovering the same key role of the Gaussian density for the standard and the fractional Brownian motion.

Keywords

Cite

@article{arxiv.1112.0890,
  title  = {Erd\'elyi-Kober Fractional Diffusion},
  author = {Gianni Pagnini},
  journal= {arXiv preprint arXiv:1112.0890},
  year   = {2012}
}

Comments

Accepted for publication in Fractional Calculus and Applied Analysis

R2 v1 2026-06-21T19:46:14.973Z