Invariance principles for random bipartite planar maps
Abstract
Random planar maps are considered in the physics literature as the discrete counterpart of random surfaces. It is conjectured that properly rescaled random planar maps, when conditioned to have a large number of faces, should converge to a limiting surface whose law does not depend, up to scaling factors, on details of the class of maps that are sampled. Previous works on the topic, starting with Chassaing and Schaeffer, have shown that the radius of a random quadrangulation with faces, that is, the maximal graph distance on such a quadrangulation to a fixed reference point, converges in distribution once rescaled by to the diameter of the Brownian snake, up to a scaling constant. Using a bijection due to Bouttier, Di Francesco and Guitter between bipartite planar maps and a family of labeled trees, we show the corresponding invariance principle for a class of random maps that follow a Boltzmann distribution putting weight on faces of degree : the radius of such maps, conditioned to have faces (or vertices) and under a criticality assumption, converges in distribution once rescaled by to a scaled version of the diameter of the Brownian snake. Convergence results for the so-called profile of maps are also provided. The convergence of rescaled bipartite maps to the Brownian map, in the sense introduced by Marckert and Mokkadem, is also shown. The proofs of these results rely on a new invariance principle for two-type spatial Galton--Watson trees.
Cite
@article{arxiv.math/0504110,
title = {Invariance principles for random bipartite planar maps},
author = {Jean-François Marckert and Grégory Miermont},
journal= {arXiv preprint arXiv:math/0504110},
year = {2009}
}
Comments
Published in at http://dx.doi.org/10.1214/009117906000000908 the Annals of Probability (http://www.imstat.org/aop/) by the Institute of Mathematical Statistics (http://www.imstat.org)