The spans in Brownian motion
Abstract
For d ∈ \1,2,3\, let (Bdt;~ t ≥ 0) be a d-dimensional standard Brownian motion. We study the d-Brownian span set Span(d):=\t-s;~ Bds=Bdt~for some~0 ≤ s ≤ t\. We prove that almost surely the random set Span(d) is σ-compact and dense in R+. In addition, we show that Span(1)=R+ almost surely; the Lebesgue measure of Span(2) is 0 almost surely and its Hausdorff dimension is 1 almost surely; and the Hausdorff dimension of Span(3) is 12 almost surely. We also list a number of conjectures and open problems.
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