Cantor set zeros of one-dimensional Brownian motion minus Cantor function

Abstract

It was shown by Antunovi\'c, Burdzy, Peres, and Ruscher that a Cantor function added to one-dimensional Brownian motion has zeros in the middle α-Cantor set, α ∈ (0,1), with positive probability if and only if α ≠ 1/2. We give a refined picture by considering a generalized version of middle 1/2-Cantor sets. By allowing the middle 1/2 intervals to vary in size around the value 1/2 at each iteration step we will see that there is a big class of generalized Cantor functions such that if these are added to one-dimensional Brownian motion, there are no zeros lying in the corresponding Cantor set almost surely.