Quenched Central Limit Theorems for Random Walks in Random Scenery
Abstract
Random walks in random scenery are processes defined by Zn:=Σk=1nωSk where S:=(Sk,k 0) is a random walk evolving in Zd and ω:=(ωx, x∈ Zd) is a sequence of i.i.d. real random variables. Under suitable assumptions on the random walk S and the random scenery ω, almost surely with respect to ω, the correctly renormalized sequence (Zn)n≥ 1 is proved to converge in distribution to a centered Gaussian law with explicit variance.
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