The Dynamical Discrete Web

The dynamical discrete web (DDW), introduced in recent work of Howitt and Warren, is a system of coalescing simple symmetric one-dimensional random walks which evolve in an extra continuous dynamical time parameter s. The evolution is by independent updating of the underlying Bernoulli variables indexed by discrete space-time that define the discrete web at any fixed s. In this paper, we study the existence of exceptional (random) values of s where the paths of the web do not behave like usual random walks and the Hausdorff dimension of the set of exceptional such s. Our results are motivated by those about exceptional times for dynamical percolation in high dimension by Häggstrom, Peres and Steif, and in dimension two by Schramm and Steif. The exceptional behavior of the walks in the DDW is rather different from the situation for the dynamical random walks of Benjamini, Häggstrom, Peres and Steif. In particular, we prove that there are exceptional values of s for which the walk from the origin Ss(n) has lim supSs(n)/ √ n ≤ K with a nontrivial dependence of the Hausdorff dimension on K. We also discuss how these and other results extend to the dynamical Brownian web, a natural scaling limit of the DDW. The scaling limit is the focus of a paper in preparation; it was also studied by Howitt and Warren and is related to the Brownian net of Sun and Swart.