International audienceWe provide a Monte Carlo analysis of the moments of the cluster size distributions built up from random occupation of deterministic Sierpinski fractals. Features of the site percolation transition in non-integer dimensions are investigated for two fractal dimensions lying between 1 and 2. Data collapses of the moments when going from an iteration step of the fractal to the next are associated with a real space renormalization procedure and show that a constant gap scaling hypothesis is satisfied. Nevertheless, scaling corrections occuring in the behavior of the thresholds with the size of the lattices are stronger that in the standard percolation case; we point out that, in the case of fractals, a contribution to these...
In Percolation Theory, functions like the probability that a given site belongs to the infinite clus...
International audienceWe show that simple, stationary point processes of a given intensity on $\mR^d...
Abstract. Cluster statistics in two- and three-dimensional site percolation problems are derived her...
[[abstract]]We provide a Monte Carlo analysis of the moments of the cluster size distributions built...
Shifting of percolation threshold of an elongated lattice towards higher values is shown by the stat...
Partially motivated by the desire to better understand the connectivity phase transition in fractal ...
We study long-range power-law correlated disorder on square and cubic lattices. In particular, we pr...
We derive scaling laws for the percolation properties of an elongated lattice, i.e., those with dime...
We discuss the dynamics of phase transformations following a quench from a high-temperature disorder...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...
The notion of spectral dimensionality of a self-similar (fractal) structure is recalled, and its val...
[[abstract]]We study the Wolff cluster size distributions obtained from Monte Carlo simulations of t...
Simulations of random walkers on two‐dimensional (square lattice) percolation clusters were performe...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
Employing highly efficient algorithms for simulating invasion percolation (IP) with trapping, we obt...
In Percolation Theory, functions like the probability that a given site belongs to the infinite clus...
International audienceWe show that simple, stationary point processes of a given intensity on $\mR^d...
Abstract. Cluster statistics in two- and three-dimensional site percolation problems are derived her...
[[abstract]]We provide a Monte Carlo analysis of the moments of the cluster size distributions built...
Shifting of percolation threshold of an elongated lattice towards higher values is shown by the stat...
Partially motivated by the desire to better understand the connectivity phase transition in fractal ...
We study long-range power-law correlated disorder on square and cubic lattices. In particular, we pr...
We derive scaling laws for the percolation properties of an elongated lattice, i.e., those with dime...
We discuss the dynamics of phase transformations following a quench from a high-temperature disorder...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...
The notion of spectral dimensionality of a self-similar (fractal) structure is recalled, and its val...
[[abstract]]We study the Wolff cluster size distributions obtained from Monte Carlo simulations of t...
Simulations of random walkers on two‐dimensional (square lattice) percolation clusters were performe...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
Employing highly efficient algorithms for simulating invasion percolation (IP) with trapping, we obt...
In Percolation Theory, functions like the probability that a given site belongs to the infinite clus...
International audienceWe show that simple, stationary point processes of a given intensity on $\mR^d...
Abstract. Cluster statistics in two- and three-dimensional site percolation problems are derived her...