Author:
Jahnel Benedikt,Rozikov Utkir
Abstract
Abstract
We investigate the finite-state p-solid-on-solid (p-SOS) 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
1
→
3
→
5
→
6
→
7
. 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.