The eigenvalue spectra of the transition probability matrix for random walks traversing critically disordered clusters in three different types of percolation problems show that the random walker sees a developing Euclidean signature for short time scales as the local, full-coordination constraint is iteratively applied. (C) 2002 Elsevier Science B.V. All rights reserved
Large contour lines in a random landscape constitute a continuum percolation problem. We consider di...
A central problem in data analysis is the low dimensional representation of high dimensional data, a...
This introduction to some of the principal models in the theory of disordered systems leads the read...
The primary focus of this work is to obtain precise values of critical exponents associated with ran...
The dependence of the universality class on the statistical weight of unrestricted random paths is e...
We numerically investigate random walks (RWs) and self-avoiding random walks (SAWs) on critical perc...
In this work we have studied diffusion in critically disordered system modeled by a fractal in the f...
We numerically investigate random walks (RWs) and self-avoiding random walks (SAWs) on critical perc...
We study the scaling laws of diffusion in two-dimensional media with long-range correlated disorder ...
The dependence of the universality class on the statistical weight of unrestricted random paths is e...
The dependence of the universality class on the statistical weight of unrestricted random paths is e...
We investigate dynamical processes on random and regular fractals. The (static) problem of percolati...
The notion of spectral dimensionality of a self-similar (fractal) structure is recalled, and its val...
In these lecture notes, we will analyze the behavior of random walk on disordered media by means of ...
Different diffusion processes can be defined on random networks like the infinite incipient clusters...
Large contour lines in a random landscape constitute a continuum percolation problem. We consider di...
A central problem in data analysis is the low dimensional representation of high dimensional data, a...
This introduction to some of the principal models in the theory of disordered systems leads the read...
The primary focus of this work is to obtain precise values of critical exponents associated with ran...
The dependence of the universality class on the statistical weight of unrestricted random paths is e...
We numerically investigate random walks (RWs) and self-avoiding random walks (SAWs) on critical perc...
In this work we have studied diffusion in critically disordered system modeled by a fractal in the f...
We numerically investigate random walks (RWs) and self-avoiding random walks (SAWs) on critical perc...
We study the scaling laws of diffusion in two-dimensional media with long-range correlated disorder ...
The dependence of the universality class on the statistical weight of unrestricted random paths is e...
The dependence of the universality class on the statistical weight of unrestricted random paths is e...
We investigate dynamical processes on random and regular fractals. The (static) problem of percolati...
The notion of spectral dimensionality of a self-similar (fractal) structure is recalled, and its val...
In these lecture notes, we will analyze the behavior of random walk on disordered media by means of ...
Different diffusion processes can be defined on random networks like the infinite incipient clusters...
Large contour lines in a random landscape constitute a continuum percolation problem. We consider di...
A central problem in data analysis is the low dimensional representation of high dimensional data, a...
This introduction to some of the principal models in the theory of disordered systems leads the read...
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