Subcritical percolation with a line of defects

Abstract

We consider the Bernoulli bond percolation process Pp,p' on the nearest-neighbor edges of Zd, which are open independently with probability p<pc, except for those lying on the first coordinate axis, for which this probability is p'. Define \[p,p':=-n∞n-1 Pp,p'(0 n e1)\] and p:=p,p. We show that there exists pc'=pc'(p,d) such that p,p'=p if p'<pc' and p,p'<p if p'>pc'. Moreover, pc'(p,2)=pc'(p,3)=p, and pc'(p,d)>p for d≥ 4. We also analyze the behavior of p-p,p' as p' pc' in dimensions d=2,3. Finally, we prove that when p'>pc', the following purely exponential asymptotics holds: \[ Pp,p'(0 n e1)=de-p,p'n(1+o(1))\] for some constant d=d(p,p'), uniformly for large values of n. This work gives the first results on the rigorous analysis of pinning-type problems, that go beyond the effective models and don't rely on exact computations.