Weighted restriction estimates using polynomial partitioning

Abstract

We use the polynomial partitioning method of Guth to prove weighted Fourier restriction estimates in R3 with exponents p that range between 3 and 3.25, depending on the weight. As a corollary to our main theorem, we obtain new (non-weighted) local and global restriction estimates for compact C∞ surfaces S ⊂ R3 with strictly positive second fundamental form. For example, we establish the global restriction estimate \| Ef \|Lp( R3) ≤ C \, \| f \|Lq(S) in the full conjectured range of exponents for p > 3.25 (up to the sharp line), and the global restriction estimate \| Ef \|Lp() ≤ C \, \| f \|L2(S) for p>3 and certain sets ⊂ R3 of infinite Lebesgue measure. As a corollary to our main theorem, we also obtain new results on the decay of spherical means of Fourier transforms of positive compactly supported measures on R3 with finite α-dimensional energies.