Bipolar orientations on planar maps and SLE12

Author(s)

Kenyon, Richard; Miller, Jason; Sheffield, Scott Roger; Wilson, David B.

Abstract

We give bijections between bipolar-oriented (acyclic with unique source and sink) planar maps and certain random walks, which show that the uniformly random bipolar-oriented planar map, decorated by the "peano curve" surrounding the tree of left-most paths to the sink, converges in law with respect to the peanosphere topology to a √4/3-Liouville quantum gravity surface decorated by an independent Schramm-Loewner evolution with parameter κ = 12 (i.e., SLE 12 ). This result is universal in the sense that it holds for bipolar-oriented triangulations, quadrangulations, k-angulations and maps in which face sizes are mixed. Keywords: Bipolar oriention; random planar map; Schramm–Loewner evolution; Liouville quantum gravity; continuum; random tree

Date issued

2019-05

URI

https://hdl.handle.net/1721.1/125760

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Annals of Probability

Publisher

Institute of Mathematical Statistics

Citation

Kenyon, Richard et al., "Bipolar orientations on planar maps and SLE12." Annals of Probability 47, 3 (May 2019): 1240-1269. ©2019 Institute of Mathematical Statistics.

Version: Original manuscript

ISSN

0091-1798