Gibbs measures for hardcore-SOS models on Cayley trees
Abstract
We investigate the finite-state p-solid-on-solid model, for p=∞, on Cayley trees of order k≥ 2 and establish a system of functional equations where each solution corresponds to a (splitting) Gibbs measure of the model. Our main result is that, for three states, k=2,3 and increasing coupling strength, the number of translation-invariant Gibbs measures behaves as 13567. This phase diagram is qualitatively similar to the one observed for three-state p-SOS models with p>0 and, in the case of k=2, we demonstrate that, on the level of the functional equations, the transition p∞ is continuous.
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