Frequently visited sites of the inner boundary of simple random walk range

Abstract

This paper considers the question: how many times does a simple random walk revisit the most frequently visited site among the inner boundary points? It is known that in Z2, the number of visits to the most frequently visited site among all of the points of the random walk range up to time n is asymptotic to π-1( n)2, while in Zd (d3), it is of order n. We prove that the corresponding number for the inner boundary is asymptotic to βd n for any d2, where βd is a certain constant having a simple probabilistic expression.