Restricted Projections to Lines in Rn+1
Abstract
We prove the following restricted projection theorem. Let n 3 and ⊂ Sn be an (n-1)-dimensional C2 manifold such that has sectional curvature >1. Let Z ⊂ Rn+1 be analytic and let 0 < s < \ Z, 1\. Then equation* \z ∈ : (Z · z) < s\ (n-2)+s = (n-1) + (s-1) < n-1. equation* In particular, for almost every z ∈ , (Z · z) = \ Z, 1\. The core idea, originated from K\"aenm\"aki-Orponen-Venieri, is to transfer the restricted projection problem to the study of the dimension lower bound of Furstenberg sets of cinematic family contained in C2([0,1]n-1). This cinematic family of functions with multivariables are extensions of those of one variable by Pramanik-Yang-Zahl and Sogge. Since the Furstenberg sets of cinematic family contain the affine Furstenberg sets as a special case, the dimension lower bound of Furstenberg sets improves the one by H\'era, H\'era-Keleti-M\'ath\'e and Dabrowski-Orponen-Villa. Moreover, our method to show the restricted projection theorem can also give a new proof for the Mattila's projection theorem in Rn with n 3.
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