The Scaling Limit of Random Outerplanar Maps
classification
🧮 math.PR
keywords
outerplanarmapsrandomsqrtverticesaldousbelongbijection
read the original abstract
A planar map is outerplanar if all its vertices belong to the same face. We show that random uniform outerplanar maps with $n$ vertices suitably rescaled by a factor $1/ \sqrt{n}$ converge in the Gromov-Hausdorff sense to $\displaystyle{\frac{7 \sqrt{2}}{9}}$ times Aldous' Brownian tree. The proof uses the bijection of Bonichon, Gavoille and Hanusse.
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