We study long-range power-law correlated disorder on square and cubic lattices. In particular, we present high-precision results for the percolation thresholds and the fractal dimension of the largest clusters as a function of the correlation strength. The correlations are generated using a discrete version of the Fourier filtering method. We consider two different metrics to set the length scales over which the correlations decay, showing that the percolation thresholds are highly sensitive to such system details. By contrast, we verify that the fractal dimension d(f) is a universal quantity and unaffected by the choice of metric. We also show that for weak correlations, its value coincides with that for the uncorrelated system. In two dim...
Employing highly efficient algorithms for simulating invasion percolation (IP) with trapping, we obt...
We have measured the fluctuations of the mass M of the infinite cluster in percolation, as well as t...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...
We study long-range power-law correlated disorder on square and cubic lattices. In particular, we pr...
[[abstract]]We provide a Monte Carlo analysis of the moments of the cluster size distributions built...
In this thesis we study various problems in dependent percolation theory. In the first part of this ...
We study the scaling laws of diffusion in two-dimensional media with long-range correlated disorder ...
We derive scaling laws for the percolation properties of an elongated lattice, i.e., those with dime...
Partially motivated by the desire to better understand the connectivity phase transition in fractal ...
Large contour lines in a random landscape constitute a continuum percolation problem. We consider di...
The primary focus of this work is to obtain precise values of critical exponents associated with ran...
Shifting of percolation threshold of an elongated lattice towards higher values is shown by the stat...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...
© 2019 American Physical Society. How does removal of sites by a random walk lead to blockage of per...
Employing highly efficient algorithms for simulating invasion percolation (IP) with trapping, we obt...
We have measured the fluctuations of the mass M of the infinite cluster in percolation, as well as t...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...
We study long-range power-law correlated disorder on square and cubic lattices. In particular, we pr...
[[abstract]]We provide a Monte Carlo analysis of the moments of the cluster size distributions built...
In this thesis we study various problems in dependent percolation theory. In the first part of this ...
We study the scaling laws of diffusion in two-dimensional media with long-range correlated disorder ...
We derive scaling laws for the percolation properties of an elongated lattice, i.e., those with dime...
Partially motivated by the desire to better understand the connectivity phase transition in fractal ...
Large contour lines in a random landscape constitute a continuum percolation problem. We consider di...
The primary focus of this work is to obtain precise values of critical exponents associated with ran...
Shifting of percolation threshold of an elongated lattice towards higher values is shown by the stat...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...
© 2019 American Physical Society. How does removal of sites by a random walk lead to blockage of per...
Employing highly efficient algorithms for simulating invasion percolation (IP) with trapping, we obt...
We have measured the fluctuations of the mass M of the infinite cluster in percolation, as well as t...
We investigate the percolation thresholds of both random and invasion percolation in two and three d...