English

Dimers and Imaginary geometry

Probability 2018-11-28 v3 Mathematical Physics math.MP

Abstract

We present a general result which shows that the winding of the branches in a uniform spanning tree on a planar graph converge in the limit of fine mesh size to a Gaussian free field. The result holds true assuming only convergence of simple random walk to Brownian motion and a Russo-Seymour-Welsh type crossing estimate. As an application, we prove universality of the fluctuations of the height function associated to the dimer model, in several situations. This includes the case of lozenge tilings with boundary conditions lying in a plane, and Temperleyan domains in isoradial graphs (recovering a recent result of Li). The robustness of our approach, which is a key novelty of this paper, comes from the fact that the exactly solvable nature of the model plays only a minor role in the analysis. Instead, we rely on a connection to imaginary geometry, where the limit of a uniform spanning tree is viewed as a set of flow lines associated to a Gaussian free field.

Keywords

Cite

@article{arxiv.1603.09740,
  title  = {Dimers and Imaginary geometry},
  author = {Nathanaël Berestycki and Benoit Laslier and Gourab Ray},
  journal= {arXiv preprint arXiv:1603.09740},
  year   = {2018}
}

Comments

Thoroughly revised following referee's comments. The whole paper is split into a main file containing the major proofs and a supplementary portion containing the technical and less enlightening parts of the proof

R2 v1 2026-06-22T13:22:41.302Z