Understanding deterministic diffusion by correlated random walks
Abstract
Low-dimensional periodic arrays of scatterers with a moving point particle are ideal models for studying deterministic diffusion. For such systems the diffusion coefficient is typically an irregular function under variation of a control parameter. Here we propose a systematic scheme of how to approximate deterministic diffusion coefficients of this kind in terms of correlated random walks. We apply this approach to two simple examples which are a one-dimensional map on the line and the periodic Lorentz gas. Starting from suitable Green-Kubo formulas we evaluate hierarchies of approximations for their parameter-dependent diffusion coefficients. These approximations converge exactly yielding a straightforward interpretation of the structure of these irregular diffusion coeficients in terms of dynamical correlations.
Cite
@article{arxiv.nlin/0202040,
title = {Understanding deterministic diffusion by correlated random walks},
author = {R. Klages and N. Korabel},
journal= {arXiv preprint arXiv:nlin/0202040},
year = {2009}
}
Comments
13 pages (revtex) with 5 figures (postscript)