Accessibility Percolation with Rough Mount Fuji labels

Abstract

Consider an infinite, rooted, connected graph where each vertex is labelled with an independent and identically distributed Uniform(0,1) random variable, plus a parameter θ times its distance from the root ρ. That is, we label vertex v with Xv = Uv + θd(ρ,v). We say that accessibility percolation occurs if there is an infinite path started from ρ along which the vertex labels are increasing. When the graph is a Bienaymé-Galton-Watson tree, we give an exact characterisation of the critical value θc such that there is accessibility percolation with positive probability if and only if θ>θc. We also give more explicit bounds on the value of θc. The lower bound holds for a much more general class of trees. When the graph is the lattice Zn for n 2, we show that there is a non-trivial phase transition and give some first bounds on θc. To do this we introduce a novel coupling with oriented percolation.