Gaussian free field convergence of the six-vertex model with $-1\leq\Delta\leq-\frac12$

Hugo Duminil-Copin; Karol Kajetan Kozlowski; Piet Lammers; and Ioan Manolescu

arXiv:2603.06268·math-ph·March 9, 2026

Gaussian free field convergence of the six-vertex model with $-1\leq\Delta\leq-\frac12$

Hugo Duminil-Copin, Karol Kajetan Kozlowski, Piet Lammers, and Ioan Manolescu

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Abstract

We study the isotropic six-vertex model on $Z^{2}$ with spectral parameter $Δ \in [- 1, - 1/2]$ , that is, with weights $a = b = 1$ and $c \in [3, 2]$ . We show that the associated height function converges, in the scaling limit, to a properly scaled full-plane Gaussian free field. The result extends to anisotropic weights $a \neq = b$ upon using a suitable embedding of the lattice.

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TopicsRandom Matrices and Applications · Algebraic structures and combinatorial models · Stochastic processes and statistical mechanics