Visible parts and slices of Ahlfors regular sets

Abstract

We show that for any compact set E⊂Rd the visible part of E has Hausdorff dimension at most d-1/6 for almost every direction. This improves recent estimates of Orponen and Matheus. If E is s-Ahlfors regular, where s>d-1, we prove a much better estimate. In that case for almost every direction the Hausdorff dimension of the visible part is at most s - α(s-d+1), where α>0.183 is absolute. The estimate is new even for self-similar sets satisfying the open set condition. Along the way, we prove a refinement of the Marstrand's slicing theorem for Ahlfors regular sets.