Is The Alexander-Orbach Conjecture Suitable For Diffusion In Correlated Percolation Clusters

OMMAR CRUZ; RICARDO HIDALGO; SALOMÓN ALAS; LAURA MERAZ; R. H. LÓPEZ; A. DOMINGUEZ

ADSORPTION SCIENCE & TECHNOLOGY

MULTI SCIENCE PUBL CO LTD

Lugar: Brentwood, UK; Año: 2011 vol. 29 p. 663 - 676

0263-6174

How does a particle diffuse inside a percolation cluster? This question is of both scientific and practical importance, e.g. in drug-controlled release and vapour adsorption. Diffusion in fractal media is characterized by the fracton dimension, ds. The Alexander and Orbach conjecture indicates that ds = 4/3 for diffusion in classical percolation clusters and, after much research on the subject, it is still provides a very good approximation for ds in the case of uncorrelated percolation cluster structures. However, what happens to the value of ds when a particle is moving inside a correlated percolation cluster? In this work, this problem is studied via Monte Carlo computer simulation. Our results show that the Alexander and Orbach conjecture is not always fulfilled.