Law of large numbers for critical first-passage percolation on the triangular lattice

Abstract

We study the site version of (independent) first-passage percolation on the triangular lattice T. Denote the passage time of the site v in T by t(v), and assume that P(t(v)=0)=P(t(v)=1)=1/2. Denote by a0,n the passage time from 0 to (n,0), and by b0,n the passage time from 0 to the halfplane \(x,y):x≥ n\. We prove that there exists a constant 0<μ<∞ such that as n→∞, a0,n/ n→ μ in probability and b0,n/ n→ μ/2 almost surely. This result confirms a prediction of Kesten and Zhang (Probab. Theory Relat. Fields 107: 137--160, 1997). The proof relies on the existence of the full scaling limit of critical site percolation on T, established by Camia and Newman.