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Bipartite dimer model: perfect t-embeddings and Lorentz-minimal surfaces

Published 13 Sep 2021 in math.PR, math-ph, math.CV, and math.MP | (2109.06272v1)

Abstract: This is the second paper in the series devoted to the study of the dimer model on t-embeddings of planar bipartite graphs. We introduce the notion of perfect t-embeddings and assume that the graphs of the associated origami maps converge to a Lorentz-minimal surface $\mathrm{S}\xi$ as $\delta\to 0$. In this setup we prove (under very mild technical assumptions) that the gradients of the height correlation functions converge to those of the Gaussian Free Field defined in the intrinsic metric of the surface $\mathrm{S}\xi$. We also formulate several open questions motivated by our work.

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