Litcius/Paper detail

Random domino tilings and the arctic circle theorem

William Jockusch, James Propp, Peter W. Shor

2026Annales de l’Institut Henri Poincaré D Combinatorics Physics and their Interactions167 citationsDOIOpen Access PDF

Abstract

In this article, we study domino tilings of a family of finite regions, called Aztec diamonds. Every such tiling determines a partition of the Aztec diamond into five sub-regions; in the four outer sub-regions, every tile lines up with nearby tiles, while in the fifth, central sub-region, differently oriented tiles co-exist side by side. We show that when n is sufficiently large, the shape of the central sub-region becomes arbitrarily close to a perfect circle of radius n/\sqrt{2} for all but a negligible proportion of the tilings. Our proof uses techniques from the theory of interacting particle systems. In particular, we prove and make use of a classification of the stationary behaviors of a totally asymmetric one-dimensional exclusion process in discrete time.

Topics & Concepts

DominoTileSubstitution tilingPartition (number theory)MathematicsCombinatoricsDiamondGeographyOrganic chemistryArchaeologyBiochemistryCatalysisChemistryStochastic processes and statistical mechanicsMathematical Dynamics and FractalsMarkov Chains and Monte Carlo Methods
Random domino tilings and the arctic circle theorem | Litcius