On delocalization in the six-vertex model

Abstract

We show that the six-vertex model with parameter c∈[ 3, 2] on a square lattice torus has an ergodic infinite-volume limit as the size of the torus grows to infinity. Moreover we prove that for c∈[2+ 2, 2], the associated height function on Z2 has unbounded variance. The proof relies on an extension of the Baxter-Kelland-Wu representation of the six-vertex model to multi-point correlation functions of the associated spin model. Other crucial ingredients are the uniqueness and percolation properties of the critical random cluster measure for q∈[1,4], and recent results relating the decay of correlations in the spin model with the delocalization of the height function.