Restricted Projections to Hyperplanes in Rn

Abstract

We study dimensions of sets projected to an (n-2)-dimensional family of hyperplanes in Rn under curvature conditions. Let n 3 and ⊂ Sn-1 be an (n-2)-dimensional C2 manifold such that has non-vanishing geodesic curvature (n=3)/sectional curvature >1 (n 4). Let Z ⊂ Rn be analytic with Z n-2 and 0 < s < Z. Then equation* \x ∈ : πTxSn-1(Z) < s\ s equation* where πTxSn-1 is the orthogonal projection from Rn to the tangent space TxSn-1. In particular, for Hn-2-a.e. x ∈ , πTxSn-1(Z) = Z. When n=3 and Z < 1, the quantitative estimate improves the one obtained by Gan-Guo-Guth-Harris-Maldague-Wang. For the case Z > n-2, if in addition πTySn-1(Z) n-2 for some y ∈ Sn-1, we show that πTxSn-1(Z) = \ Z, n-1\ for Hn-2-a.e. x ∈ .