Radius and profile of random planar maps with faces of arbitrary degrees
Grégory Miermont, CNRS & LM-Orsay, Université de Paris-Sud
Mathilde Weill, DMA, École Normale Supérieure
Abstract
We prove some asymptotic results for the radius and the profile of large
random planar maps with faces of arbitrary degrees. Using a bijection due
to Bouttier, Di Francesco & Guitter between rooted planar maps and certain
four-type trees with positive labels, we derive our results from a
conditional limit theorem for four-type spatial Galton-Watson trees.
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