Bond percolation on honeycomb and triangular lattices-Reference-Cited by-同舟云学术

Bond percolation on honeycomb and triangular lattices

Published:1981-06 Issue:2 Volume:13 Page:298-313
ISSN:0001-8678
Container-title:Advances in Applied Probability
language:en
Short-container-title:Advances in Applied Probability

Author:

Wierman John C.

Abstract

The two common critical probabilities for a lattice graph L are the cluster size critical probability pH(L) and the mean cluster size critical probability pT(L). The values for the honeycomb lattice H and the triangular lattice T are proved to be pH(H) = pT(H) = 1–2 sin (π/18) and PH(T) = pT(T) = 2 sin (π/18). The proof uses the duality relationship and the star-triangle relationship between the two lattices, to find lower bounds for sponge-crossing probabilities.

Publisher

Cambridge University Press (CUP)

Subject

Applied Mathematics,Statistics and Probability

Reference15 articles.

1. The critical probability of bond percolation on the square lattice equals 1/2

2. Exact Critical Percolation Probabilities for Site and Bond Problems in Two Dimensions

3. Correlation inequalities on some partially ordered sets

4. On critical probabilities in percolation theory

5. Percolation processes

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