Radial Projections in Rn Revisited

Abstract

We generalize the recent results on radial projections by Orponen, Shmerkin, Wang using two different methods. In particular, we show that given X,Y⊂ Rn Borel sets and X≠ . If Y ∈ (k,k+1] for some k∈ \1,…, n-1\, then \[ x∈ X πx(Y \x\) ≥ \ X + Y - k, k\. \] Our results give a new approach to solving a conjecture of Lund-Pham-Thu in all dimensions and for all ranges of Y. The first of our two methods for proving the above theorem is shorter, utilizing a result of the first author and Gan. Our second method, though longer, follows the original methodology of Orponen--Shmerkin--Wang, and requires a higher dimensional incidence estimate and a dual Furstenberg-set estimate for lines. These new estimates may be of independent interest.