A sharp exceptional set estimate for visibility

Abstract

A Borel set B ⊂ Rn is visible from x ∈ Rn, if the radial projection of B with base point x has positive Hn - 1 measure. I prove that if B > n - 1, then B is visible from every point x ∈ Rn E, where E is an exceptional set with dimension E ≤ 2(n - 1) - B. This is the sharp bound for all n ≥ 2. Many parts of the proof were already contained in a recent previous paper by P. Mattila and the author, where a weaker bound for E was derived as a corollary from a certain slicing theorem. Here, no improvement to the slicing result is obtained; in brief, the main observation of the present paper is that the proof method gives the optimal result, when applied directly to the visibility problem.