Decoupling and near-optimal restriction estimates for Cantor sets

Abstract

For any α∈(0,d), we construct Cantor sets in Rd of Hausdorff dimension α such that the associated natural measure μ obeys the restriction estimate \| f dμ \|p ≤ Cp \| f \|L2(μ) for all p>2d/α. This range is optimal except for the endpoint. This extends the earlier work of Chen-Seeger and Shmerkin-Suomala, where a similar result was obtained by different methods for α=d/k with k∈N. Our proof is based on the decoupling techniques of Bourgain-Demeter and a theorem of Bourgain on the existence of (p) sets.