Tom Hutchcroft
Published 2017-12-13Version 1
Let $G$ be the product of finitely many trees $T_1\times T_2 \cdots \times T_N$, each of which is regular with degree at least three. We consider Bernoulli bond percolation and the Ising model on this graph, giving a short proof that the model undergoes a second order phase transition with mean-field critical exponents in each case. The result concerning percolation recovers a result of Kozma (2013), while the result concerning the Ising model is new. We also present a new proof, using similar techniques, of a lemma of Schramm concerning the decay of the critical two-point function along a random walk, as well as some generalizations of this lemma.
On the Ornstein-Zernike behaviour for the Bernoulli bond percolation on $\mathbb{Z}^{d},d\geq3,$ in the supercitical regime
The Ising model: Highlights and perspectives
Exponential decay of truncated correlations for the Ising model in any dimension for all but the critical temperature
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