Percolation in the hyperbolic plane

Benjamini, Itai; Schramm, Oded

doi:10.1090/S0894-0347-00-00362-3

Percolation in the hyperbolic plane
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by Itai Benjamini and Oded Schramm

J. Amer. Math. Soc. 14 (2001), 487-507

DOI: https://doi.org/10.1090/S0894-0347-00-00362-3

Published electronically: December 28, 2000

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Abstract:

We study percolation in the hyperbolic plane $\mathbb {H}^2$ and on regular tilings in the hyperbolic plane. The processes discussed include Bernoulli site and bond percolation on planar hyperbolic graphs, invariant dependent percolations on such graphs, and Poisson-Voronoi-Bernoulli percolation. We prove the existence of three distinct nonempty phases for the Bernoulli processes. In the first phase, $p\in (0,p_c]$, there are no unbounded clusters, but there is a unique infinite cluster for the dual process. In the second phase, $p\in (p_c,p_u)$, there are infinitely many unbounded clusters for the process and for the dual process. In the third phase, $p\in [p_u,1)$, there is a unique unbounded cluster, and all the clusters of the dual process are bounded. We also study the dependence of $p_c$ in the Poisson-Voronoi-Bernoulli percolation process on the intensity of the underlying Poisson process.

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