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Packing-Dimension Profiles and Fractional Brownian Motion

Abstract

In order to compute the packing dimension of orthogonal projections Falconer and Howroyd (1997) introduced a family of packing dimension profiles Dims{\rm Dim}_s that are parametrized by real numbers s>0s>0. Subsequently, Howroyd (2001) introduced alternate ss-dimensional packing dimension profiles \hbox{{\rm P}-\dim}_s and proved, among many other things, that \hbox{{\rm P}-\dim}_s E={\rm Dim}_s E for all integers s>0s>0 and all analytic sets ERNE\subseteq\R^N. The goal of this article is to prove that \hbox{{\rm P}-\dim}_s E={\rm Dim}_s E for all real numbers s>0s>0 and analytic sets ERNE\subseteq\R^N. This answers a question of Howroyd (2001, p. 159). Our proof hinges on a new property of fractional Brownian motion

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    Last time updated on 15/03/2019