On Hausdorff dimension of radial projections

Abstract

For any x∈Rd, d≥ 2, denote πx: Rd\x\→ Sd-1 as the radial projection πx(y)=y-x|y-x|. Given a Borel set E⊂ Rd, H E≤ d-1, in this paper we investigate for how many x∈ Rd the radial projection πx preserves the Hausdorff dimension of E, namely whether Hπx(E)=H E. We develop a general framework to link πx(E), x∈ F and πy(F), y∈ E, for any Borel set F⊂Rd. In particular, whether Hπx(E)=HE for some x∈ F can be reduced to whether F is visible from some y∈ E (i.e. Hd-1(πy(F))>0). This allows us to apply Orponen's estimate on visibility to obtain H\x∈Rd: Hπx(E)<HE\≤ 2(d-1)-HE, for any Borel set E⊂ Rd, H E∈(d-2, d-1]. This improves the Peres-Schlag bound when H E∈(d-32, d-1], and it is optimal at the endpoint H E=d-1.