Uniform fluctuation and wandering bounds in first passage percolation

Abstract

We consider first passage percolation on certain isotropic random graphs in Rd. We assume exponential concentration of passage times T(x,y), on some scale σr whenever |y-x| is of order r, with σr "growning like r" for some 0<<1. Heuristically this means transverse wandering of geodesics should be at most of order r = (rσr)1/2. We show that in fact uniform versions of exponential concentration and wandering bounds hold: except with probability exponentially small in t, there are no x,y in a natural cylinder of length r and radius Kr for which either (i) |T(x,y) - ET(x,y)|≥ tσr, or (ii) the geodesic from x to y wanders more than distance tr from the cylinder axis. We also establish that for the time constant μ = n ET(0,ne1)/n, the "nonrandom error" |μ|x| - ET(0,x)| is at most a constant multiple of σ(|x|).