Izumi Okada
Published 2014-07-08, updated 2014-12-23Version 2
In this paper, we deal with the inner boundary of random walk range, that is, the set of those points in a random walk range which have at least one neighbor site outside the range. If $L_n$ be the number of the inner boundary points of random walk range in the $n$ steps, we prove $\lim_{n\to \infty}\frac{L_n}{n}$ exists with probability one. Also, we obtain some large deviation result for transient walk. We find that the expectation of the number of the inner boundary points of simple random walk on two dimensionnal square lattice is of the same order as $\frac{n}{(\log n)^2}$.
Comments: Accepted for the publication in J. Math. Soc. Japan
Entropy of random walk range on uniformly transient and on uniformly recurrent graphs
Average Entropy of the Ranges for Simple Random Walks on Discrete Groups
Moderate Deviations for the Capacity of the Random Walk range in dimension four
![QR code for arXiv:1407.2081 [math.PR]](http://oss.arxitics.com/images/favicon.svg)