A bilinear approach to the finite field restriction problem

Abstract

Let P denote the 3-dimensional paraboloid over a finite field of odd characteristic in which -1 is not a square. We show that the Fourier extension operator associated with P maps L2 to Lr for r > 329 ≈ 3.555. In contrast with much of the recent progress on this problem, our argument does not use state-of-the-art incidence estimates but rather proceeds by obtaining estimates on a related bilinear operator. These estimates are based on a geometric result that, roughly speaking, states that a set of points in the finite plane F2 can be decomposed as a union of sets each of which either contains a controlled number of rectangles or a controlled number of trapezoids.