Your search keyword '"Hulshof, Tim"' showing total 2 results

1. Random Walk on the High-Dimensional IIC.

Author

Heydenreich, Markus, Hofstad, Remco, and Hulshof, Tim

Subjects

RANDOM walks, DIMENSIONAL analysis, INFINITY (Mathematics), CLUSTER analysis (Statistics), DIMENSIONS

Abstract

We study the asymptotic behavior of the exit times of random walk from Euclidean balls around the origin of the incipient infinite cluster in a manner inspired by Kumagai and Misumi (J Theor Probab 21:910-935, ). We do this by getting bounds on the effective resistance between the origin and the boundary of these Euclidean balls. We show that the geometric properties of long-range percolation clusters are significantly different from those of finite-range clusters. We also study the behavior of random walk on the backbone of the IIC and we prove that the Alexander-Orbach conjecture holds for the incipient infinite cluster in high dimensions, both for long-range percolation and for finite-range percolation. [ABSTRACT FROM AUTHOR]

Published

2014

2. High-Dimensional Incipient Infinite Clusters Revisited.

Author

Heydenreich, Markus, Hofstad, Remco, and Hulshof, Tim

Subjects

PERCOLATION theory, INFINITY (Mathematics), MATHEMATICAL expansion, DIMENSIONS, EQUATIONS

Abstract

The incipient infinite cluster (IIC) measure is the percolation measure at criticality conditioned on the cluster of the origin to be infinite. Using the lace expansion, we construct the IIC measure for high-dimensional percolation models in three different ways, extending previous work by the second-named author and Járai. We show that each construction yields the same measure, indicating that the IIC is a robust object. Furthermore, our constructions apply to spread-out versions of both finite-range and long-range percolation models. We also get estimates on structural properties of the IIC, such as the volume of the intersection between the IIC and Euclidean balls. [ABSTRACT FROM AUTHOR]

Published

2014