A phase transition in block-weighted random maps
Probability
2024-02-06 v4 Combinatorics
Abstract
We consider the model of random planar maps of size biased by a weight per -connected block, and the closely related model of random planar quadrangulations of size biased by a weight per simple component. We exhibit a phase transition at the critical value . If , a condensation phenomenon occurs: the largest block is of size . Moreover, for quadrangulations we show that the diameter is of order , and the scaling limit is the Brownian sphere. When , the largest block is of size , the scaling order for distances is , and the scaling limit is the Brownian tree. Finally, for , the largest block is of size , the scaling order for distances is , and the scaling limit is the stable tree of parameter .
Keywords
Cite
@article{arxiv.2302.01723,
title = {A phase transition in block-weighted random maps},
author = {William Fleurat and Zéphyr Salvy},
journal= {arXiv preprint arXiv:2302.01723},
year = {2024}
}
Comments
71 pages, 24 figures