Local Statistics and Shuffling for Dimers on a Square-Hexagon Lattice

Abstract

We study the dimer model on special subgraphs of the square hexagon lattice called "tower graphs" of size N. Using integrable probability techniques, we confirm that as N → ∞, the local statistics are translation invariant Gibbs measures, as conjectured by Kenyon-Okounkov-Sheffield. We also present a 2+1-dimensional discrete time growth process, whose time N distribution is exactly the dimer model on the size N tower, and we compute the current of this growth process and confirm that the model belongs to the Anisotropic KPZ universality class.

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