Oriented percolation in a random environment

Abstract

On the lattice Z2+:=(x,y)∈ Z × Z+ x+y is even we consider the following oriented (northwest-northeast) site percolation: the lines Hi:=(x,y)∈ Z2+ y=i are first declared to be bad or good with probabilities and 1- respectively, independently of each other. Given the configuration of lines, sites on good lines are open with probability p_G>pc, the critical probability for the standard oriented site percolation on Z+ × Z+, and sites on bad lines are open with probability p_B, some small positive number, independently of each other. We show that given any pair p_G>pc and p_B>0, there exists a δ (p_G, p_B)>0 small enough, so that for δ δ(pG,pB) there is a strictly positive probability of oriented percolation to infinity from the origin.