RMF accessibility percolation on oriented graphs

Abstract

Accessibility percolation is a new type of percolation problem inspired by evolutionary biology: a random number, called its fitness, is assigned to each vertex of a graph, then a path in the graph is accessible if fitnesses are strictly increasing through it. In the Rough Mount Fuji (RMF) model the fitness function is defined on the graph as ω(v)=η(v)+θ· d(v), where θ is a positive number called the drift, d is the distance to the source of the graph and η(v) are i.i.d. random variables. In this paper we determine values of θ for having RMF accessibility percolation on the hypercube and the two-dimensional lattices L2 and L2alt.