The quenched limiting distributions of a one-dimensional random walk in random scenery.
The quenched limiting distributions of a one-dimensional random walk in random scenery.
For a one-dimensional random walk in random scenery (RWRS) on Z, we determine its quenched weak limits by applying Strassen's functional law of the iterated logarithm. As a consequence, conditioned on the random scenery, the one-dimensional RWRS does not converge in law, in contrast with the multi-dimensional case.