First passage percolation and escape strategies

Abstract

Consider first passage percolation on Zd with passage times given by i.i.d. random variables with common distribution F. Let tπ(u,v) be the time from u to v for a path π and t(u,v) the minimal time among all paths from u to v. We ask whether or not there exist points x,y ∈ Zd and a semi-infinite path π=(y0=y,y1,…) such that tπ(y, yn+1)<t(x,yn) for all n. Necessary and sufficient conditions on F are given for this to occur. When the support of F is unbounded, we also obtain results on the number of edges with large passage time used by geodesics.