Random planar maps & growth-fragmentations
Abstract
We are interested in the cycles obtained by slicing at all heights random Boltzmann triangulations with a simple boundary. We establish a functional invariance principle for the lengths of these cycles, appropriately rescaled, as the size of the boundary grows. The limiting process is described using a self-similar growth-fragmentation process with explicit parameters. To this end, we introduce a branching peeling exploration of Boltzmann triangulations, which allows us to identify a crucial martingale involving the perimeters of cycles at given heights. We also use a recent result concerning self-similar scaling limits of Markov chains on the nonnegative integers. A motivation for this work is to give a new construction of the Brownian map from a growth-fragmentation process.
Keywords
Cite
@article{arxiv.1507.02265,
title = {Random planar maps & growth-fragmentations},
author = {Jean Bertoin and Nicolas Curien and Igor Kortchemski},
journal= {arXiv preprint arXiv:1507.02265},
year = {2018}
}
Comments
43 pages, 8 figures. Final version, to appear in Ann. Probab