Add to ORKGAbstract Using a recently developed method to simulate percolation on large clusters of distributed machines [1], we have numerically calculated crossing, spanning and wrapping probabilities in two-dimensional site and bond percolation with exceptional accuracy. Our results are fully consistent with predictions from conformal field theory. We present many new results that await theoretical explanation, particularly for wrapping clusters on a cylinder. We therefore provide possibly the most up-to-date reference for theoreticians working on crossing, spanning and wrapping probabilities in two-dimensional percolation
Simulations of random walkers on two‐dimensional (square lattice) percolation clusters were performe...
Algorithms for estimating the percolation probabilities and cluster size distribution are given in t...
It is shown that the critical exponent g1 related to pair-connectiveness and shortest-path (or chemi...
Six percolation models in two dimensions are studied: percolation by sites and by bonds on square, h...
We consider two-dimensional percolation in the scaling limit close to criticality and use integrable...
This thesis explores critical two-dimensional percolation in bounded regions in the continuum limit....
Using conformal field theory, we derive several new crossing formulae at the two-dimensional percola...
In this article, we use our results from Flores and Kleban (2015 Commun. Math. Phys. 333 389-434, 20...
AbstractThe random-cluster model, a correlated bond percolation model, unifies a range of important ...
The geometrical explanation of universality in terms of fixed points of renormalization-group transf...
Percolation is the paradigm for random connectivity and has been one of the most applied statistical...
Shape-dependent universal crossing probabilities are studied, via Monte Carlo simulations, for bond...
The author`s recently conjectured expression (ibid., vol. 28, p. 1249, 1995) for Cardy`s (1992) cros...
Extensive Monte Carlo simulations were performed to evaluate the excess number of clusters and the c...
The logarithmic conformal field theory describing critical percolation is further explored using Wat...
Simulations of random walkers on two‐dimensional (square lattice) percolation clusters were performe...
Algorithms for estimating the percolation probabilities and cluster size distribution are given in t...
It is shown that the critical exponent g1 related to pair-connectiveness and shortest-path (or chemi...
Six percolation models in two dimensions are studied: percolation by sites and by bonds on square, h...
We consider two-dimensional percolation in the scaling limit close to criticality and use integrable...
This thesis explores critical two-dimensional percolation in bounded regions in the continuum limit....
Using conformal field theory, we derive several new crossing formulae at the two-dimensional percola...
In this article, we use our results from Flores and Kleban (2015 Commun. Math. Phys. 333 389-434, 20...
AbstractThe random-cluster model, a correlated bond percolation model, unifies a range of important ...
The geometrical explanation of universality in terms of fixed points of renormalization-group transf...
Percolation is the paradigm for random connectivity and has been one of the most applied statistical...
Shape-dependent universal crossing probabilities are studied, via Monte Carlo simulations, for bond...
The author`s recently conjectured expression (ibid., vol. 28, p. 1249, 1995) for Cardy`s (1992) cros...
Extensive Monte Carlo simulations were performed to evaluate the excess number of clusters and the c...
The logarithmic conformal field theory describing critical percolation is further explored using Wat...
Simulations of random walkers on two‐dimensional (square lattice) percolation clusters were performe...
Algorithms for estimating the percolation probabilities and cluster size distribution are given in t...
It is shown that the critical exponent g1 related to pair-connectiveness and shortest-path (or chemi...