Non-uniqueness phase of Bernoulli percolation on reflection groups for some polyhedra in H^3
Abstract
In the present paper I consider Cayley graphs of reflection groups of finite-sided Coxeter polyhedra in 3-dimensional hyperbolic space H^3, with standard sets of generators. As the main result, I prove the existence of non-trivial non-uniqueness phase of bond and site Bernoulli percolation on such graphs, i.e. that p_c < p_u, for two classes of such polyhedra: * for any k-hedra as above with k at least 13; * for any compact right-angled polyhedra as above. I also establish a natural lower bound for the growth rate of such Cayley graphs (when the number of faces of the polyhedron is at least 6; see thm. 5.2) and an upper bound for the growth rate of the sequence (#{simple cycles of length n through o})_n for a regular graph of degree at least 2 with a distinguished vertex o, depending on its spectral radius (see thm. 5.1 and rem. 2.3), both used to prove the main result.
- Publication:
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arXiv e-prints
- Pub Date:
- March 2013
- DOI:
- 10.48550/arXiv.1303.5624
- arXiv:
- arXiv:1303.5624
- Bibcode:
- 2013arXiv1303.5624C
- Keywords:
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- Mathematics - Probability;
- Mathematics - Combinatorics;
- Mathematics - Metric Geometry;
- 82B43
- E-Print:
- 28 pages