A family of fractal Fourier restriction estimates with implications on the Kakeya problem

Abstract

In a recent paper [Ann. of Math. 189 (2019), 837--861], Du and Zhang proved a fractal Fourier restriction estimate and used it to establish the sharp L2 estimate on the Schr\"odinger maximal function in Rn, n ≥ 2. In this paper, we show that the Du-Zhang estimate is the endpoint of a family of fractal restriction estimates such that each member of the family (other than the original) implies a sharp Kakeya result in Rn that is closely related to the polynomial Wolff axioms. We also prove that all the estimates of our family are true in R2.