The scaling limit of planar maps with large faces

Abstract

We prove that large Boltzmann stable planar maps of index α ∈ (1;2) converge in the scaling limit towards a random compact metric space Sα that we construct explicitly. They form a one-parameter family of random continuous spaces ``with holes'' or ``faces'' different from the Brownian sphere. In the so-called dilute phase α ∈ [3/2;2), the topology of Sα is that of the Sierpinski carpet, while in the dense phase α ∈ (1;3/2) the ``faces'' of Sα may touch each-others. En route, we prove various geometric properties of these objects concerning their faces or the behavior of geodesics.