The continuous limit of large random planar maps

The continuous limit of large random planar maps

We discuss scaling limits of random planar maps chosen uniformly over the set of all $2p$-angulations with $n$ faces. This leads to a limiting space called the Brownian map, which is viewed as a random compact metric space. Although we are not able to prove the uniqueness of the distribution of the...

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Bibliographic Details
Main Author: Jean-François Le Gall
Format: Article
Language:English
Published: Discrete Mathematics & Theoretical Computer Science 2008-01-01
Series:Discrete Mathematics & Theoretical Computer Science
Subjects:
geodesics
topological type
planar maps
scaling limits
random trees
gromov-hausdorff distance
hausdorff dimension
[info.info-dm] computer science [cs]/discrete mathematics [cs.dm]
[math.math-ds] mathematics [math]/dynamical systems [math.ds]
[math.math-co] mathematics [math]/combinatorics [math.co]
Online Access:https://dmtcs.episciences.org/3554/pdf
Description
Summary:We discuss scaling limits of random planar maps chosen uniformly over the set of all $2p$-angulations with $n$ faces. This leads to a limiting space called the Brownian map, which is viewed as a random compact metric space. Although we are not able to prove the uniqueness of the distribution of the Brownian map, many of its properties can be investigated in detail. In particular, we obtain a complete description of the geodesics starting from the distinguished point called the root. We give applications to various properties of large random planar maps.
ISSN:1365-8050

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