Restricted Marstrand's projection theorem for general families of linear subspaces
Abstract
This paper investigates a refinement of Marstrand's projection theorem; more specifically, let t, t∈[0,1] be a family of m dimensional subspaces of the Euclidean space Rn and let Pt:R4 t be the orthogonal projections onto t. We hope to determine the conditions on t under which, for any Borel A⊂Rn, H Pt(A)=(m,H A) holds for almost every t. We propose a conjectured condition on t and provide partial progress towards its resolution. We first establish a version of the polynomial Wolff axiom, and then apply polynomial partitioning to derive a version of the Lp Kakeya inequality. Finally, we use a discretization procedure to obtain the desired bound.
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