Ranges of polynomials control degree ranks of Green and Tao over finite prime fields

Abstract

Let p be a prime, let 1 t < d < p be integers, and let S be a non-empty subset of Fp. We establish that if a polynomial P:Fpn Fp with degree d is such that the image P(Sn) does not contain the full image A(Fp) of any non-constant polynomial A: Fp Fp with degree at most t, then P coincides on Sn with a polynomial that in particular has bounded degree- d/(t+1) -rank in the sense of Green and Tao. Similarly, we prove that if the assumption holds even for t=d, then P coincides on Sn with a polynomial determined by a bounded number of coordinates.