Frequently visited sets for random walks
Abstract
We study the occupation measure of various sets for a symmetric transient random walk in Zd with finite variances. Let μXn(A) denote the occupation time of the set A up to time n. It is shown that x∈ ZdμnX(x+A)/ n tends to a finite limit as n∞. The limit is expressed in terms of the largest eigenvalue of a matrix involving the Green's function of X restricted to the set A. Some examples are discussed and the connection to similar results for Brownian motion is given.
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