Abstract
Suppose { X n } is a random walk in time-random environment with state space Z d , ∣ X n ∣ approaches infinity, then under some reasonable conditions of stability, the upper bound of the discrete Packing dimension of the range of { X n } is any stability index α. Moreover, if the environment is stationary, a similar result for the lower bound of the discrete Hausdorff dimension is derived. Thus, the range is a fractal set for almost every environment.
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