Critical percolation on slabs with random columnar disorder

Abstract

We explore a bond percolation model on slabs S+k=Z+× Z+×\0,…,k\ featuring one-dimensional inhomogeneities. In this context, a vertical column on the slab comprises the set of vertical edges projecting to the same vertex on Z+×\0,…,k\. Columns are chosen based on the arrivals of a renewal process, where the tail distributions of inter-arrival times follow a power law with exponent φ>1. Inhomogeneities are introduced as follows: vertical edges on selected columns are open (closed) with probability q (respectively 1-q), independently. Conversely, vertical edges within unselected columns and all horizontal edges are open (closed) with probability p (respectively 1-p). We prove that for all sufficiently large φ (depending solely on k), the following assertion holds: if q>pc(S+k), then p can be taken strictly smaller than pc(S+k) in a manner that percolation still occurs.