arXiv:math/0503065 Abstract

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Recurrence of Simple Random Walk on $Z^2$ is Dynamically Sensitive

Published 2005-03-03Version 1

Benjamini, Haggstrom, Peres and Steif introduced the concept of a dynamical random walk. This is a continuous family of random walks, {S_n(t)}. Benjamini et. al. proved that if d=3 or d=4 then there is an exceptional set of t such that {S_n(t)} returns to the origin infinitely often. In this paper we consider a dynamical random walk on Z^2. We show that with probability one there exists t such that {S_n(t)} never returns to the origin. This exceptional set of times has dimension one. This proves a conjecture of Benjamini et. al.

Categories: math.PR

Keywords: simple random walk, dynamical random walk, dynamically sensitive, recurrence, exceptional set

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arXiv:math/0503065 [math.PR]Abstract References Reviews Resources

Recurrence of Simple Random Walk on $Z^2$ is Dynamically Sensitive

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arXiv:math/0503065 [math.PR]AbstractReferencesReviewsResources

Recurrence of Simple Random Walk on $Z^2$ is Dynamically Sensitive

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arXiv:math/0503065 [math.PR]Abstract References Reviews Resources