Deviations of a random walk in a random scenery with stretched exponential tails

Abstract

Let (Zn)n∈0 be a d-dimensional random walk in random scenery, i.e., Zn=Σk=0n-1YSk with (Sk)k∈0 a random walk in Zd and (Yz)z∈ Zd an i.i.d. scenery, independent of the walk. We assume that the random variables Yz have a stretched exponential tail. In particular, they do not possess exponential moments. We identify the speed and the rate of the logarithmic decay of Pr(Zn>tn n) for all sequences (tn)n∈ satisfying a certain lower bound. This complements previous results, where it was assumed that Yz has exponential moments of all orders. In contrast to the previous situation,the event \Zn>tnn\ is not realized by a homogeneous behavior of the walk's local times and the scenery, but by many visits of the walker to a particular site and a large value of the scenery at that site. This reflects a well-known extreme behavior typical for random variables having no exponential moments.

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