Integrability of orthogonal projections, and applications to Furstenberg sets

Abstract

Let G(d,n) be the Grassmannian manifold of n-dimensional subspaces of Rd, and let πV Rd V be the orthogonal projection. We prove that if μ is a compactly supported Radon measure on Rd satisfying the s-dimensional Frostman condition μ(B(x,r)) ≤ Crs for all x ∈ Rd and r > 0, then ∫G(d,n) \|πVμ\|Lp(V)p \, dγd,n(V) < ∞, 1 ≤ p < 2d - n - sd - s. The upper bound for p is sharp, at least, for d - 1 ≤ s ≤ d, and every 0 < n < d. Our motivation for this question comes from finding improved lower bounds on the Hausdorff dimension of (s,t)-Furstenberg sets. For 0 ≤ s ≤ 1 and 0 ≤ t ≤ 2, a set K ⊂ R2 is called an (s,t)-Furstenberg set if there exists a t-dimensional family L of affine lines in R2 such that H (K ) ≥ s for all ∈ L. As a consequence of our projection theorem in R2, we show that every (s,t)-Furstenberg set K ⊂ R2 with 1 < t ≤ 2 satisfies H K ≥ 2s + (1 - s)(t - 1). This improves on previous bounds for pairs (s,t) with s > 12 and t ≥ 1 + ε for a small absolute constant ε > 0. We also prove a higher dimensional analogue of this estimate for codimension-1 Furstenberg sets in Rd. As another corollary of our method, we obtain a δ-discretised sum-product estimate for (δ,s)-sets. Our bound improves on a previous estimate of Chen for every 12 < s < 1, and also of Guth-Katz-Zahl for s ≥ 0.5151.