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