Capacity of the range of random walk: The law of the iterated logarithm

Abstract

We establish both the and the law of the iterated logarithm (LIL), for the capacity of the range of a simple random walk in any dimension d 3. While for d 4, the order of growth in n of such LIL at dimension d matches that for the volume of the random walk range in dimension d-2, somewhat surprisingly this correspondence breaks down for the capacity of the range at d=3. We further establish such LIL for the Brownian capacity of a 3-dimensional Brownian sample path and novel, sharp moderate deviations bounds for the capacity of the range of a 4-dimensional simple random walk.