Kaufman and Falconer estimates for radial projections and a continuum version of Beck's Theorem

Abstract

We provide several new answers on the question: how do radial projections distort the dimension of planar sets? Let X,Y ⊂ R2 be non-empty Borel sets. If X is not contained on any line, we prove that \[ x ∈ X H πx(Y) ≥ \H X,H Y,1\. \] If H Y > 1, we have the following improved lower bound: \[ x ∈ X H πx(Y \, \, \x\) ≥ \H X + H Y - 1,1\. \] Our results solve conjectures of Lund-Thang-Huong, Liu, and the first author. Another corollary is the following continuum version of Beck's theorem in combinatorial geometry: if X ⊂ R2 is a Borel set with the property that H (X \, \, ) = H X for all lines ⊂ R2, then the line set spanned by X has Hausdorff dimension at least \2H X,2\. While the results above concern R2, we also derive some counterparts in Rd by means of integralgeometric considerations. The proofs are based on an ε-improvement in the Furstenberg set problem, due to the two first authors, a bootstrapping scheme introduced by the second and third author, and a new planar incidence estimate due to Fu and Ren.