Sharp asymptotic for the chemical distance in long-range percolation

Abstract

We consider instances of long-range percolation on Zd and Rd, where points at distance r get connected by an edge with probability proportional to r-s, for s∈ (d,2d), and study the asymptotic of the graph-theoretical (a.k.a. chemical) distance D(x,y) between x and y in the limit as |x-y|∞. For the model on Zd we show that, in probability as |x|∞, the distance D(0,x) is squeezed between two positive multiples of ( r), where :=1/2(1/γ) for γ:=s/(2d). For the model on Rd we show that D(0,xr) is, in probability as r∞ for any nonzero x∈ Rd, asymptotic to φ(r)( r) for φ a positive, continuous (deterministic) function obeying φ(rγ)=φ(r) for all r>1. The proof of the asymptotic scaling is based on a subadditive argument along a continuum of doubly-exponential sequences of scales. The results strengthen considerably the conclusions obtained earlier by the first author. Still, significant open questions remain.