Monte Carlo simulations and a scaling hypothesis are used to study the distribution of blob masses on two-dimensional finite-mass clusters at the percolation threshold. The exponents associated with this distribution function are a combination of backbone and percolation exponents. This work offers insights into the structure and fragmentation properties of percolation clusters in particular, and provides methods applicable to other fractal distribution problems in general
A new Monte Carlo method for studying bond percolation clusters is developed and used to identify ne...
We introduce several infinite families of critical exponents for the random-cluster model and presen...
Percolation clusters are random fractals whose geometrical and transport properties can be character...
Monte Carlo simulations and a scaling hypothesis are used to study the distribution of blob masses ...
A scaling theory and simulation results are presented for fragmentation of percolation clusters by ...
The fragmentation properties of percolation clusters yield information about their structure. Monte...
The fragmentation properties of percolation clusters yield information about their structure. Monte ...
Abstract. Cluster statistics in two- and three-dimensional site percolation problems are derived her...
The fragmentation properties of percolation clusters yield information about their structure. Monte ...
The scaling behavior for a binary fragmentation of critical percolation clusters is investigated by ...
The properties of the hulls of directed percolation clusters are studied. The scaling and finite-siz...
Percolation theory is a useful tool when modeling the random interconnectivity of the microscopic el...
Monte Carlo simulations for the site percolation problem are presented for lattices up to 64 x 10 6 ...
A generalized model of percolation encompassing both the usual model, in which bonds are occupied wi...
A study of the site percolation model on the square lattice in a L×M geometry at critically is prese...
A new Monte Carlo method for studying bond percolation clusters is developed and used to identify ne...
We introduce several infinite families of critical exponents for the random-cluster model and presen...
Percolation clusters are random fractals whose geometrical and transport properties can be character...
Monte Carlo simulations and a scaling hypothesis are used to study the distribution of blob masses ...
A scaling theory and simulation results are presented for fragmentation of percolation clusters by ...
The fragmentation properties of percolation clusters yield information about their structure. Monte...
The fragmentation properties of percolation clusters yield information about their structure. Monte ...
Abstract. Cluster statistics in two- and three-dimensional site percolation problems are derived her...
The fragmentation properties of percolation clusters yield information about their structure. Monte ...
The scaling behavior for a binary fragmentation of critical percolation clusters is investigated by ...
The properties of the hulls of directed percolation clusters are studied. The scaling and finite-siz...
Percolation theory is a useful tool when modeling the random interconnectivity of the microscopic el...
Monte Carlo simulations for the site percolation problem are presented for lattices up to 64 x 10 6 ...
A generalized model of percolation encompassing both the usual model, in which bonds are occupied wi...
A study of the site percolation model on the square lattice in a L×M geometry at critically is prese...
A new Monte Carlo method for studying bond percolation clusters is developed and used to identify ne...
We introduce several infinite families of critical exponents for the random-cluster model and presen...
Percolation clusters are random fractals whose geometrical and transport properties can be character...