Percolation in an ultrametric space

Abstract

We study percolation on the hierarchical lattice of order N where the probability of connection between two points separated by distance k is of the form ck/Nk(1+δ),\; δ >-1. Since the distance is an ultrametric, there are significant differences with percolation on the Euclidean lattice. There are two non-critical regimes: δ <1, where percolation occurs, and δ >1, where it does not occur. In the critical case, δ =1, we use an approach in the spirit of the renormalization group method of statistical physics and connectivity results of Erdos-Renyi random graphs play a key role. We find sufficient conditions on ck such that percolation occurs, or that it does not occur. An intermediate situation called pre-percolation is also considered. In the cases of percolation we prove uniqueness of the constructed percolation clusters. In a previous paper DG1 we studied percolation in the N∞ limit (mean field percolation) which provided a simplification that allowed finding a necessary and sufficient condition for percolation. For fixed N there are open questions, in particular regarding the existence of a critical value of a parameter in the definition of ck, and if it exists, what would be the behaviour at the critical point.