On exceptional sets of radial projections
Abstract
We prove two new exceptional set estimates for radial projections in the plane. If K ⊂ R2 is a Borel set with H K > 1, then H \x ∈ R2 \, \, K : H πx(K) ≤ σ\ ≤ \1 + σ - H K,0\, σ ∈ [0,1). If K ⊂ R2 is a Borel set with H K ≤ 1, then H \x ∈ R2 \, \, K : H πx(K) < H K\ ≤ 1. The finite field counterparts of both results above were recently proven by Lund, Thang, and Huong Thu. Our results resolve the planar cases of conjectures of Lund-Thang-Huong Thu, and Liu.
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