Height fluctuations in the honeycomb dimer model
Abstract
We study a model of random surfaces arising in the dimer model on the honeycomb lattice. For a fixed ``wire frame'' boundary condition, as the lattice spacing , Cohn, Kenyon and Propp [CKP] showed the almost sure convergence of a random surface to a non-random limit shape . In [KO], Okounkov and the author showed how to parametrize the limit shapes in terms of analytic functions, in particular constructing a natural conformal structure on them. We show here that when has no facets, for a family of boundary conditions approximating the wire frame, the large-scale surface fluctuations (height fluctuations) about converge as to a Gaussian free field for the above conformal structure. We also show that the local statistics of the fluctuations near a given point are, as conjectured in [CKP], given by the unique ergodic Gibbs measure (on plane configurations) whose slope is the slope of the tangent plane of at .
Keywords
Cite
@article{arxiv.math-ph/0405052,
title = {Height fluctuations in the honeycomb dimer model},
author = {Richard Kenyon},
journal= {arXiv preprint arXiv:math-ph/0405052},
year = {2007}
}
Comments
39 pages. Expanded and revised version