Extracting subsets maximizing capacity and Folding of Random Walks

Abstract

We prove that in any finite set of Zd with d 3, there is a subset whose capacity and volume are both of the same order as the capacity of the initial set. As an application we obtain estimates on the probability of covering uniformly a finite set, and characterize some folding events, under optimal hypotheses. For instance, knowing that a region of space has an atypically high occupation density by some random walk, we show that this random region is most likely ball-like