The rate of escape of the most visited site of Brownian motion
Abstract
Let \Lzt\ be the jointly continuous local times of a one-dimensional Brownian motion and let L*t=z∈ R Lzt. Let Vt be any point z such that Lzt=L*t, a most visited site of Brownian motion. We prove that if γ>1, then\[t ∞ |Vt| t/( t)γ=∞, a.s., \] with an analogous result for simple random walk. This proves a conjecture of Lifshits and Shi.
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