On the time constant of high dimensional first passage percolation, revisited

Abstract

In [2], it was claimed that the time constant μd(e1) for the first-passage percolation model on Zd is μd(e1) d/(2ad) as d ∞, if the passage times (τe)e∈ Ed are i.i.d., with a common c.d.f. F satisfying |F(x)x-a| C| x| for some constants a, C and sufficiently small x. However, the proof of the upper bound, namely, Equation (2.1) in [2] align d∞ μd(e1)ad d 12 align is incorrect. In this article, we provide a different approach that establishes this inequality. As a side product of this new method, we also show that the variance of the non-backtracking passage time to the first hyperplane is of order o(( d/d)2) as d ∞ in the case of the when the edge weights are exponentially distributed.