On the Hausdorff dimension of radial slices

Abstract

Let t ∈ (1,2), and let B ⊂ R2 be a Borel set with H B > t. I show that H1(\e ∈ S1 : H (B x,e) ≥ t - 1\) > 0 for all x ∈ R2 \, \, E, where H E ≤ 2 - t. This is the sharp bound for H E. The main technical tool is an incidence inequality of the form Iδ(μ,) t δ · It(μ)I3 - t(), t ∈ (1,2), where μ is a Borel measure on R2, and is a Borel measure on the set of lines in R2, and Iδ(μ,) measures the δ-incidences between μ and the lines parametrised by . This inequality can be viewed as a δ-ε-free version of a recent incidence theorem due to Fu and Ren. The proof in this paper avoids the high-low method, and the induction-on-scales scheme responsible for the δ-ε-factor in Fu and Ren's work. Instead, the inequality is deduced from the classical smoothing properties of the X-ray transform.

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