Strong law of large numbers for a function of the local times of a transient random walk in Zd

Abstract

For an arbitrary transient random walk (Sn)n 0 in Zd, d 1, we prove a strong law of large numbers for the spatial sum Σx∈ Zdf(l(n,x)) of a function f of the local times l(n,x)=Σi=0n I\Si=x\. Particular cases are the number of (a) visited sites (first time considered by Dvoretzky and Erdos), which corresponds to a function f(i)= I\i 1\; (b) α-fold self-intersections of the random walk (studied by Becker and K\"onig), which corresponds to f(i)=iα; (c) sites visited by the random walk exactly j times (considered by Erdos and Taylor and by Pitt), where f(i)= I\i=j\.