Range of (1,2) random walk in random environment

Abstract

Consider (1,2) random walk in random environment \Xn\n0. In each step, the walk jumps at most a distance 2 to the right or a distance 1 to the left. For the walk transient to the right, it is proved that almost surely x→∞\#\Xn:\ 0 Xn x,\ n0\x=θ for some 0<θ<1. The result shows that the range of the walk covers only a linear proportion of the lattice of the positive half line. For the nearest neighbor random walk in random or non-random environment, this phenomenon could not appear in any circumstance.