Strong exceptional parameters for the dimension of nonlinear slices

Abstract

Let 1 ≤ m < s ≤ n and let A ⊂eq Rn be a Borel set of with s-dimensional Hausdorff measure Hs(A) > 0. The classical Marstrand slicing theorem states that, for almost every m-dimensional subspace V ⊂ Rn, there is a positive-measure set of x ∈ V such that x + V intersects A in a set of Hausdorff dimension s-m. We prove a strong and quantitative version of Marstrand's slicing theorem in the Peres-Schlag framework. In particular, if (λ: Rm)λ ∈ U is a family of generalized projections that satisfies the transversality and strong regularity conditions of degree 0, then for every A ⊂eq with Hs(A) > 0, the set of λ in the parameter space U ⊂eq RN such that \!(A λ-1(x)) < s-m for a.e. x ∈ Rm has Hausdorff dimension at most N + m - s. If moreover Hs(A) < ∞, then this exceptional set is universal for the subsets of A with positive s-dimensional Hausdorff measure in the sense that this same collection of parameters contains the corresponding exceptional sets of all those subsets of A. When (λ)λ ∈ U is only transversal and strongly regular of some sufficiently small order β > 0, a similar conclusion holds modulo an error term of order β1/3.

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