Recurrence, transience and anti-concentration of Rademacher random walks

Abstract

The Rademacher random walk associated with a deterministic sequence (an)n ≥ 1 is the walk which starts at zero and, at step i, independently steps either up or down by ai with equal probability. We continue the study begun by Bhattacharya and Volkov in 2023 of the transience or recurrence of one-dimensional Rademacher random walks. In particular, we show that if the sequence of step sizes is bounded, the walk is weakly recurrent, meaning that it returns infinitely often to a random finite interval, while if the step sizes tend to infinity arbitrarily slowly, the walk may be transient. On the other hand, using a construction with integer step sizes, we show that the step sizes may grow arbitrarily fast and still give a weakly recurrent random walk. We also show, using a construction with non-integer step sizes, that the same conclusion holds even if we restrict to strictly increasing step sizes. However, we prove that if an = nα + o(1) for some α > 1/2, then the walk is transient. We show that the bound on α is tight by giving an example where an = (n1/2) and the walk is weakly recurrent.

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