A scaling theory and simulation results are presented for fragmentation of percolation clusters by random bond dilution. At the percolation threshold, scaling forms describe the average number of fragmenting bonds and the distribution of cluster masses produced by fragmentation. A relationship between the scaling exponents and standard percolation exponents is verified in one dimension, on the Bethe lattice, and for Monte Carlo simulations on a square lattice. These results further describe the structure of percolation clusters and provide kernels relevant to rate equations for fragmentation
Percolative fragmentation of carbon particles during combustion is modelled by means of two Monte-Ca...
Off-lattice dynamic Monte-Carlo simulations were done of reversible cluster-cluster aggregation for ...
We study the statistical properties of a recently proposed social networks measure of fragmentation ...
The fragmentation properties of percolation clusters yield information about their structure. Monte...
The fragmentation properties of percolation clusters yield information about their structure. Monte ...
The fragmentation properties of percolation clusters yield information about their structure. Monte ...
Monte Carlo simulations and a scaling hypothesis are used to study the distribution of blob masses o...
The scaling behavior for a binary fragmentation of critical percolation clusters is investigated by ...
A new Monte Carlo method for studying bond percolation clusters is developed and used to identify ne...
Monte Carlo simulations and a scaling hypothesis are used to study the distribution of blob masses ...
Percolation theory is a useful tool when modeling the random interconnectivity of the microscopic el...
Algorithms for estimating the percolation probabilities and cluster size distribution are given in t...
Abstract. Cluster statistics in two- and three-dimensional site percolation problems are derived her...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...
We show that the size distributions of fragments created by high energy nuclear collisions are remar...
Percolative fragmentation of carbon particles during combustion is modelled by means of two Monte-Ca...
Off-lattice dynamic Monte-Carlo simulations were done of reversible cluster-cluster aggregation for ...
We study the statistical properties of a recently proposed social networks measure of fragmentation ...
The fragmentation properties of percolation clusters yield information about their structure. Monte...
The fragmentation properties of percolation clusters yield information about their structure. Monte ...
The fragmentation properties of percolation clusters yield information about their structure. Monte ...
Monte Carlo simulations and a scaling hypothesis are used to study the distribution of blob masses o...
The scaling behavior for a binary fragmentation of critical percolation clusters is investigated by ...
A new Monte Carlo method for studying bond percolation clusters is developed and used to identify ne...
Monte Carlo simulations and a scaling hypothesis are used to study the distribution of blob masses ...
Percolation theory is a useful tool when modeling the random interconnectivity of the microscopic el...
Algorithms for estimating the percolation probabilities and cluster size distribution are given in t...
Abstract. Cluster statistics in two- and three-dimensional site percolation problems are derived her...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...
We show that the size distributions of fragments created by high energy nuclear collisions are remar...
Percolative fragmentation of carbon particles during combustion is modelled by means of two Monte-Ca...
Off-lattice dynamic Monte-Carlo simulations were done of reversible cluster-cluster aggregation for ...
We study the statistical properties of a recently proposed social networks measure of fragmentation ...