On the time constant of high dimensional first passage percolation

Abstract

We study the time constant μ(e1) in first passage percolation on Zd as a function of the dimension. We prove that if the passage times have finite mean, d ∞ μ(e1) d d = 12a, where a ∈ [0,∞] is a constant that depends only on the behavior of the distribution of the passage times at 0. For the same class of distributions, we also prove that the limit shape is not an Euclidean ball, nor a d-dimensional cube or diamond, provided that d is large enough.