Phase transition for percolation on a randomly stretched lattice

Abstract

Let \i\i ≥ 1 be a sequence of i.i.d.\ positive random variables. Starting from the usual square lattice replace each horizontal edge that links a site in i-th vertical column to another in the (i+1)-th vertical column by an edge having length i. Then declare independently each edge e in the resulting lattice open with probability pe=p|e| where p∈[0,1] and |e| is the length of e. We relate the occurrence of nontrivial phase transition for this model to moment properties of 1. More precisely, we prove that the model undergoes a nontrivial phase transition when E(1η)<∞, for some η>1 whereas, when E(1η)=∞ for some η<1, no phase transition occurs.