Finite field restriction estimates for the paraboloid in high even dimensions

Abstract

We prove that the finite field Fourier extension operator for the paraboloid is bounded from L2 Lr for r≥ 2d+4d in even dimensions d 8, which is the optimal L2 estimate. For d=6 we obtain the optimal range r> 2d+4d=8/3, apart from the endpoint. For d=4 we improve the prior range of r>16/5=3.2 to r≥ 28/9=3.111…, compared to the conjectured range of r≥3. The key new ingredient is improved additive energy estimates for subsets of the paraboloid.