Truncated Connectivities in a highly supercritical anisotropic percolation model

Abstract

We consider an anisotropic bond percolation model on Z2, with p=(ph,pv)∈ [0,1]2, pv>ph, and declare each horizontal (respectively vertical) edge of Z2 to be open with probability ph(respectively pv), and otherwise closed, independently of all other edges. Let x=(x1,x2) ∈ Z2 with 0<x1<x2, and x'=(x2,x1)∈ Z2. It is natural to ask how the two point connectivity function (\0 x\) behaves, and whether anisotropy in percolation probabilities implies the strict inequality (\0 x\)>(\0 x'\). In this note we give an affirmative answer in the highly supercritical regime.