Random walk on a lattice in the presence of obstacles: The short-time transient regime, anomalous diffusion and crowding
Nguiya P. Neo, Gary W. Slater

TL;DR
This paper investigates the short-time transient, anomalous diffusion, and crowding effects on particle diffusion in a lattice with obstacles, proposing an objective method to identify regimes and measure anomalous behavior.
Contribution
It introduces a new approach using exact numerical methods to define the transient regime and quantify anomalous diffusion in lattice models with obstacles.
Findings
Defined a unique transient regime and anomalous diffusion exponent
Introduced the concept of excess diffusion lengths
Proposed a new Monte Carlo algorithm for short-time diffusion modeling
Abstract
The diffusion of a particle in a crowded environment typically proceeds through three regimes: for very short times the particle diffuses freely until it collides with an obstacle for the first time, while for very long times diffusion the motion is Fickian with a diffusion coefficient that depends on the concentration and type of obstacles present in the system. For intermediate times, the mean-square displacement of the particle often increases approximately as , with , typical of what is generally called anomalous diffusion. However, it is not clear how one can identify or choose a time or displacement interval that would give a reliable estimate of . In this paper, we use two exact numerical approaches to obtain diffusion data for a simple Lattice Monte Carlo model in both time limits. This allows us to propose an objective definition of the…
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Taxonomy
TopicsStochastic processes and statistical mechanics · Diffusion and Search Dynamics · Theoretical and Computational Physics
