A minimal model for short-time diffusion in periodic potentials
Abstract
We investigate the dynamics of a single, overdamped colloidal particle, which is driven by a constant force through a one-dimensional periodic potential. We focus on systems with large barrier heights where the lowest-order cumulants of the density field, that is, average position and the mean-squared displacement, show nontrivial (non-diffusive) short-time behavior characterized by the appearance of plateaus. We demonstrate that this "cage-like" dynamics can be well described by a discretized master equation model involving two states (related to two positions) within each potential valley. Non-trivial predictions of our approach include analytic expressions for the plateau heights and an estimate of the "de-caging time" obtained from the study of deviations from Gaussian behaviour. The simplicity of our approach means that it offers a minimal model to describe the short-time behavior of systems with hindered dynamics.
Cite
@article{arxiv.1209.1504,
title = {A minimal model for short-time diffusion in periodic potentials},
author = {Clive Emary and Robert Gernert and Sabine H. L. Klapp},
journal= {arXiv preprint arXiv:1209.1504},
year = {2016}
}
Comments
8 pages, 6 figures