On the increments of the principal value of Brownian local time
Abstract
Let W be a one-dimensional Brownian motion starting from 0. Define Y(t)= ∫0t s W(s) := ε0 ∫0t 1(|W(s)|> ε) s W(s) as Cauchy's principal value related to local time. We prove limsup and liminf results for the increments of Y.
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