Mar 29, 2022 · In this paper we prove that for any integer q\geq 5, the anti-ferromagnetic q-state Potts model on the infinite \Delta-regular tree has a unique Gibbs measure.

Aug 8, 2023 · In this paper we prove that for any integer, the anti-ferromagnetic q-state Potts model on the infinite-regular tree has a unique Gibbs measure for all edge ...

Our main results therefore pinpoints the critical temperature for the anti-ferromagnetic. Potts model on the infinite regular tree for large enough degree. For ...

Aug 8, 2023 · In this paper we prove that for any integer q ≥ 5, the anti-ferromagnetic q-state Potts model on the infinite -regular tree has a unique ...

In this paper we prove that for any integer $$q\ge 5$$ q ≥ 5 , the anti-ferromagnetic q -state Potts model on the infinite $$\Delta $$ Δ -regular tree has ...

In this paper we prove that for any integer $q\geq 5$, the anti-ferromagnetic $q$-state Potts model on the infinite $\Delta$-regular tree has a unique Gibbs ...

In this paper we prove that for any integer q ≥ 5 , the anti-ferromagnetic q -state Potts model on the infinite ∆ -regular tree has a unique Gibbs measure ...

Sep 7, 2022 · We show that the $4$ -state anti-ferromagnetic Potts model with interaction parameter $w\in (0,1)$ on the infinite $(d+1)$ -regular tree has a unique Gibbs ...

In the present paper we consider the problem of determining when the anti-ferromagnetic. Potts model on the infinite (d + 1)-regular tree has a unique Gibbs ...

Uniqueness of the Gibbs Measure for the Anti-ferromagnetic Potts Model on the Infinite $$\Delta $$-Regular Tree for Large $$\Delta $$.