Nonexistence and Uniqueness for Pure States of Ferroelectric Six-Vertex Models

Abstract

In this paper we consider the existence and uniqueness of pure states with some fixed slope (s, t) ∈ [0, 1]2 for a general ferroelectric six-vertex model. First, we show there is an open subset H ⊂ [0, 1]2, which is parameterized by the region between two explicit hyperbolas, such that there is no pure state for the ferroelectric six-vertex model of any slope (s, t) ∈ H. Second, we show that there is a unique pure state for this model of any slope (s, t) on the boundary ∂ H of H. These results confirm predictions of Bukman-Shore from 1995.