The scaling limit of random cubic planar graphs
Abstract
We study the random simple connected cubic planar graph Cn with an even number n of vertices. We show that the Brownian map arises as Gromov--Hausdorff--Prokhorov scaling limit of Cn as n ∈ 2 tends to infinity, after rescaling distances by γ n-1/4 for a specific constant γ>0.
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