2005
A modified version of frozen percolation on the binary tree.
Publication
Publication
We consider the following, intuitively described process: at time zero, all sites of a binary tree are at rest. Each site becomes activated at a random uniform [0,1] time, independent of the other sites. As soon as a site is in an infinite cluster of activated sites, this cluster of activated sites freezes. The main question is whether a process like this exists. Aldous [Ald00] proved that this is the case for a slightly different version of frozen percolation. In this paper we construct a process that fits the intuitive description and discuss some properties
Additional Metadata | |
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CWI | |
CWI. Probability, Networks and Algorithms [PNA] | |
Organisation | Stochastic Dynamics and Discrete Probability |
Brouwer, R. (2005). A modified version of frozen percolation on the binary tree.. CWI. Probability, Networks and Algorithms [PNA]. CWI. |