How much can heavy lines cover?

Abstract

One formulation of Marstrand's slicing theorem is the following. Assume that t ∈ (1,2], and B ⊂ R2 is a Borel set with Ht(B) < ∞. Then, for almost all directions e ∈ S1, Ht almost all of B is covered by lines parallel to e with H (B ) = t - 1. We investigate the prospects of sharpening Marstrand's result in the following sense: in a generic direction e ∈ S1, is it true that a strictly less than t-dimensional part of B is covered by the heavy lines ⊂ R2, namely those with H (B ) > t - 1? A positive answer for t-regular sets B ⊂ R2 was previously obtained by the first author. The answer for general Borel sets turns out to be negative for t ∈ (1,32] and positive for t ∈ (32,2]. More precisely, the heavy lines can cover up to a \t,3 - t\ dimensional part of B in a generic direction. We also consider the part of B covered by the s-heavy lines, namely those with H (B ) ≥ s for s > t - 1. We establish a sharp answer to the question: how much can the s-heavy lines cover in a generic direction? Finally, we identify a new class of sets called sub-uniformly distributed sets, which generalise Ahlfors-regular sets. Roughly speaking, these sets share the spatial uniformity of Ahlfors-regular sets, but pose no restrictions on uniformity across different scales. We then extend and sharpen the first author's previous result on Ahlfors-regular sets to the class of sub-uniformly distributed sets.

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