Effective medium approximation for lattice random walks with long-range jumps
Abstract
We consider the random walk on a lattice with random transition rates and arbitrarily long-range jumps. We employ Bruggeman's effective medium approximation (EMA) to find the disorder averaged (coarse-grained) dynamics. The EMA procedure replaces the disordered system with a cleverly guessed reference system in a self-consistent manner. We give necessary conditions on the reference system and discuss possible physical mechanisms of anomalous diffusion. In case of a power-law scaling between transition rates and distance, lattice variants of Levy-ights emerge as the effective medium, and the problem is solved analytically, bearing the effective anomalous diffusivity. Finally, we discuss several example distributions, and demonstrate very good agreement with numerical simulations.
Cite
@article{arxiv.1604.06621,
title = {Effective medium approximation for lattice random walks with long-range jumps},
author = {Felix Thiel and Igor M. Sokolov},
journal= {arXiv preprint arXiv:1604.06621},
year = {2016}
}