Favorite sites for simple random walk in two and more dimensions

Abstract

On the trace of a discrete-time simple random walk on Zd for d≥ 2, we consider the evolution of favorite sites, i.e., sites that achieve the maximal local time at a certain time. For d=2, we show that almost surely three favorite sites occur simultaneously infinitely often and eventually there is no simultaneous occurrence of four favorite sites. For d≥ 3, we derive sharp asymptotics of the number of favorite sites. This answers an open question of Erdos and R\'ev\'esz (1987), which was brought up again in Dembo (2005).