Direct Paths in the Temporal Hypercube

Abstract

We consider the n-dimensional random temporal hypercube, i.e., the n-dimensional hypercube graph with its edges endowed with i.i.d. continuous random weights. We say that a vertex w is accessible from another vertex v if and only if there is a path from v to w with increasing edge weights. We study accessible "direct" paths from a fixed vertex to its antipodal point and show that as n ∞, the number of such paths converges in distribution to a mixed Poisson law with mixture given by the product of two independent exponentials with rate 1. Our proof makes use of the Chen-Stein method, coupling arguments, as well as combinatorial arguments which show that typical pairs of accessible paths have small overlap.