Approximation on slabs and uniqueness for inhomogeneous percolation with a plane of defects

Abstract

Let Ld = ( Zd,Ed ) be the d -dimensional hypercubic lattice. We consider a model of inhomogeneous Bernoulli percolation on Ld in which every edge inside the s -dimensional hyperplane Zs × \ 0 \d-s , 2 ≤ s < d , is open with probability q and every other edge is open with probability p . We prove the uniqueness of the infinite cluster in the supercritical regime whenever p ≠ pc(d) , where pc(d) denotes the threshold for homogeneous percolation, and that the critical point (p,qc(p)) can be approximated on the phase space by the critical points of slabs, for any p < pc(d) .