Dynamics & Stochastics || On Random Walks in Random Scenery

For any 1 1 measure-preserving map T of a probability space, consider the [T, T &1 ] endomorphism and the corresponding decreasing sequence of \_-algebras. We demonstrate that if the decreasing sequence of \_-algebras generated by [T, T &1 ] and [S, S &1 ] are isomorphic, then T and S must have equa

We prove a fixed versus random scenery distinguishability result (along the lines of Benjamini and Kesten) for 0-1 valued scenery on ~\_ where the distances between successive l's in the random scenery are i.i.d, random variables with fat tails. This result is an application of a more general strate

Thinking of a deterministic function s : Z+ N as "scenery" on the integers, a random walk (Z,,, Z,, Z , , . . .) on Z generates a random record of scenery ''observed'' along the walk: s ( Z ) = (s(Z,), s(Z,), . . .). Suppose t : Z + N is another scenery on the integers that is neither a translate of