Recurrence and transience of multidimensional elephant random walks

Abstract

We prove a conjecture by Bertoin that the multi-dimensional elephant random walk on Zd(d≥ 3) is transient and the expected number of zeros is finite. We also provide some estimates on the rate of escape. In dimensions d= 1, 2, we prove that phase transitions between recurrence and transience occur at p=(2d+1)/(4d). Let S be an elephant random walk with parameter p. For p ≤ 3/4, we provide a Berry-Esseen type bound for properly normalized Sn. For p>3/4, the distribution of n ∞ Sn/n2p-1 will be studied.