New improvement to Falconer distance set problem in higher dimensions
Abstract
We show that if a compact set E⊂ Rd has Hausdorff dimension larger than d2+14-18d+4, where d≥ 3, then there is a point x∈ E such that the pinned distance set x(E) has positive Lebesgue measure. This improves upon bounds of Du-Zhang and Du-Iosevich-Ou-Wang-Zhang in all dimensions d 3. We also prove lower bounds for Hausdorff dimension of pinned distance sets when H (E) ∈ (d2 - 14 - 38d+4, d2+14-18d+4), which improves upon bounds of Harris and Wang-Zheng in dimensions d 3.
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