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Lacunarity, Kakeya-type sets and directional maximal operators

Published 24 Apr 2014 in math.CA | (1404.6241v2)

Abstract: We develop a notion of finite order lacunarity for direction sets in $\mathbb R{d+1}$. Given a direction set $\Omega$ that is sublacunary according to this definition, we construct random examples of Euclidean sets that contain unit line segments with directions from $\Omega$ and enjoy analytical features similar to those of traditional Kakeya sets of infinitesimal Lebesgue measure. This generalizes to higher dimensions a planar result due to Bateman. Combined with earlier work of Alfonseca, Bateman, Parcet and Rogers, this notion of lacunarity and Kakeya-type sets also yields a characterization in all dimensions for directional maximal operators to be $Lp$-bounded.

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