An overview of the balanced excited random walk

Abstract

The balanced excited random walk, introduced by Benjamini, Kozma and Schapira in 2011, is defined as a discrete time stochastic process in Zd, depending on two integer parameters 1 d1,d2 d, which whenever it is at a site x∈ Zd at time n, it jumps to x ei with uniform probability, where e1,…,ed are the canonical vectors, for 1 i d1, if the site x was visited for the first time at time n, while it jumps to x ei with uniform probability, for 1+d-d2 i d, if the site x was already visited before time n. Here we give an overview of this model when d1+d2=d and introduce and study the cases when d1+d2>d. In particular, we prove that for all the cases d 5 and most cases d=4, the balanced excited random walk is transient.