Quenched limits for transient, zero speed one-dimensional random walk in random environment

Abstract

We consider a nearest-neighbor, one dimensional random walk \Xn\n≥0 in a random i.i.d. environment, in the regime where the walk is transient but with zero speed, so that Xn is of order ns for some s<1. Under the quenched law (i.e., conditioned on the environment), we show that no limit laws are possible: There exist sequences \nk\ and \xk\ depending on the environment only, such that Xnk-xk=o( nk)2 (a localized regime). On the other hand, there exist sequences \tm\ and \sm\ depending on the environment only, such that sm/ tm s<1 and Pω(Xtm/sm≤ x)1/2 for all x>0 and 0 for x≤0 (a spread out regime).