Percolation on supercritical causal triangulations

Abstract

We study oriented percolation on random causal triangulations, those are random planar graphs obtained roughly speaking by adding horizontal connections between vertices of an infinite tree. When the underlying tree is a geometric Galton--Watson tree with mean m>1, we prove that the oriented percolation undergoes a phase transition at pc(m), where pc(m) = η1+η with η = 1m+1 Σn ≥ 0 m-1mn+1-1. We establish that strictly above the threshold pc(m), infinitely many infinite components coexist in the map. This is a typical percolation result for graphs with a hyperbolic flavour. We also demonstrate that large critical oriented percolation clusters converge after rescaling towards the Brownian continuum random tree. The proof is based on a Markovian exploration method, similar in spirit to the peeling process of random planar maps.