The Sequential Empirical Process of a Random Walk in Random Scenery
Abstract
A random walk in random scenery (Yn)n∈N is given by Yn=Sn for a random walk (Sn)n∈N and iid random variables (n)n∈Z. In this paper, we will show the weak convergence of the sequential empirical process, i.e. the centered and rescaled empirical distribution function. The limit process shows a new type of behavior, combining properties of the limit in the independent case (roughness of the paths) and in the long range dependent case (self-similarity).
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