Extreme Gibbs measures for a Hard-Core-SOS model on Cayley trees
| Autor: | Khakimov, R. M., Makhammadaliev, M. T., Rozikov, U. A. |
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| Rok vydání: | 2024 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | We investigate splitting Gibbs measures (SGMs) of a three-state (wand-graph) hardcore SOS model on Cayley trees of order $ k \geq 2 $. Recently, this model was studied for the hinge-graph with $ k = 2, 3 $, while the case $ k \geq 4 $ remains unresolved. It was shown that as the coupling strength $\theta$ increases, the number of translation-invariant SGMs (TISGMs) evolves through the sequence $ 1 \to 3 \to 5 \to 6 \to 7 $. In this paper, for wand-graph we demonstrate that for arbitrary $ k \geq 2 $, the number of TISGMs is at most three, denoted by $ \mu_i $, $ i = 0, 1, 2 $. We derive the exact critical value $\theta_{\text{cr}}(k)$ at which the non-uniqueness of TISGMs begins. The measure $ \mu_0 $ exists for any $\theta > 0$. Next, we investigate whether $ \mu_i $, $i=0,1,2$ is extreme or non-extreme in the set of all Gibbs measures. The results are quite intriguing: 1) For $\mu_0$: - For $ k = 2 $ and $ k = 3 $, there exist critical values $\theta_1(k)$ and $\theta_2(k)$ such that $ \mu_0 $ is extreme if and only if $\theta \in (\theta_1, \theta_2)$, excluding the boundary values $\theta_1$ and $\theta_2$, where the extremality remains undetermined. - Moreover, for $ k \geq 4 $, $ \mu_0 $ is never extreme. 2) For $\mu_1$ and $\mu_2$ at $k=2$ there is $\theta_5<\theta_{\text{cr}}(2)=1$ such that these measures are extreme if $\theta \in (\theta_5, 1)$. Comment: 14 pages |
| Databáze: | arXiv |
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