English

Random geometry on the sphere

Probability 2014-04-01 v1

Abstract

We introduce and study a universal model of random geometry in two dimensions. To this end, we start from a discrete graph drawn on the sphere, which is chosen uniformly at random in a certain class of graphs with a given size nn, for instance the class of all triangulations of the sphere with nn faces. We equip the vertex set of the graph with the usual graph distance rescaled by the factor n1/4n^{-1/4}. We then prove that the resulting random metric space converges in distribution as nn\to\infty, in the Gromov-Hausdorff sense, toward a limiting random compact metric space called the Brownian map, which is universal in the sense that it does not depend on the class of graphs chosen initially. The Brownian map is homeomorphic to the sphere, but its Hausdorff dimension is equal to 44. We obtain detailed information about the structure of geodesics in the Brownian map. We also present the infinite-volume variant of the Brownian map called the Brownian plane, which arises as the scaling limit of the uniform infinite planar quadrangulation. Finally, we discuss certain open problems. This study is motivated in part by the use of random geometry in the physical theory of two-dimensional quantum gravity.

Keywords

Cite

@article{arxiv.1403.7943,
  title  = {Random geometry on the sphere},
  author = {Jean-François Le Gall},
  journal= {arXiv preprint arXiv:1403.7943},
  year   = {2014}
}

Comments

To appear in the Proceedings of ICM 2014, Seoul

R2 v1 2026-06-22T03:38:55.027Z