English

Random walk models approximating symmetric space-fractional diffusion processes

Probability 2012-10-25 v1 Statistical Mechanics Mathematical Physics math.MP

Abstract

For the symmetric case of space-fractional diffusion processes (whose basic analytic theory has been developed in 1952 by Feller via inversion of Riesz potential operators) we present three random walk models discrete in space and time. We show that for properly scaled transition to vanishing space and time steps these models converge in distribution to the corresponding time-parameterized stable probability distribution. Finally, we analyze in detail a model, discrete in time but continuous in space, recently proposed by Chechkin and Gonchar. Concerning the inversion of the Riesz potential operator I0αI_0^\alpha let us point out that its common hyper-singular integral representation fails for α=1.InourSection2wehaveshownthatthecorrespondinghypersingularrepresentationfortheinverseoperator\alpha = 1. In our Section 2 we have shown that the corresponding hyper-singular representation for the inverse operator D_0^\alphacanbeobtainedalsointhecritical(oftenexcluded)case can be obtained also in the critical (often excluded) case \alpha = 1$, by analytic continuation

Keywords

Cite

@article{arxiv.1210.6589,
  title  = {Random walk models approximating symmetric space-fractional diffusion processes},
  author = {Rudolf Gorenflo and Francesco Mainardi},
  journal= {arXiv preprint arXiv:1210.6589},
  year   = {2012}
}

Comments

32 pages

R2 v1 2026-06-21T22:27:12.972Z