On the growth of random planar maps with a prescribed degree sequence

Abstract

For non-negative integers (dn(k))k 1 such that Σk 1 dn(k) = n, we sample a bipartite planar map with n faces uniformly at random amongst those which have dn(k) faces of degree 2k for every k 1 and we study its asymptotic behaviour as n ∞. We prove that the diameter of such maps grow like σn1/2, where σn2 = Σk 1 k (k-1) dn(k) is a global variance term. More precisely, we prove that the vertex-set of these maps equipped with the graph distance divided by σn1/2 and the uniform probability measure always admits subsequential limits in the Gromov-Hausdorff-Prokhorov topology. Our proof relies on a bijection with random labelled trees; we are able to prove that the label process is always tight when suitably rescaled, even if the underlying tree is not tight for the Gromov-Hausdorff topology. We also rely on a new spinal decomposition which is of independent interest. Finally this paper also serves as a toolbox for a companion paper in which we discuss more precisely Brownian limits of such maps.