arXiv:0901.4393 Abstract | arXiv Analytics

arXiv:0901.4393 [math.PR]Abstract References Reviews Resources

Excited against the tide: A random walk with competing drifts

Published 2009-01-28Version 1

We study a random walk that has a drift $\frac{\beta}{d}$ to the right when located at a previously unvisited vertex and a drift $\frac{\mu}{d}$ to the left otherwise. We prove that in high dimensions, for every $\mu$, the drift to the right is a strictly increasing and continuous function of $\beta$, and that there is precisely one value $\beta_0(\mu,d)$ for which the resulting speed is zero.

Comments: 10 pages

Categories: math.PR, math-ph, math.MP

Subjects: 60K35, 82B41

Keywords: random walk, competing drifts, high dimensions, continuous function

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