On the Structure of Quintic Polynomials

Abstract

We study the structure of bounded degree polynomials over finite fields. Haramaty and Shpilka [STOC 2010] showed that biased degree three or four polynomials admit a strong structural property. We confirm that this is the case for degree five polynomials also. Let F=Fq be a prime field. [1.] Suppose f:Fn→ F is a degree five polynomial with bias(f)=δ. Then f can be written in the form f= Σi=1c Gi Hi + Q, where Gi and His are nonconstant polynomials satisfying deg(Gi)+deg(Hi)≤ 5 and Q is a degree ≤ 4 polynomial. Moreover, c=c(δ) does not depend on n and q. [2.] Suppose f:Fn→ F is a degree five polynomial with bias(f)=δ. Then there exists an δ(n) dimensional affine subspace V of Fn such that f restricted to V is a constant. Cohen and Tal [Random 2015] proved that biased polynomials of degree at most four are constant on a subspace of dimension (n). Item [2.] extends this to degree five polynomials. A corollary to Item [2.] is that any degree five affine disperser for dimension k is also an affine extractor for dimension O(k). We note that Item [2.] cannot hold for degrees six or higher. We obtain our results for degree five polynomials as a special case of structure theorems that we prove for biased degree d polynomials when d<|F|+4. While the d<|F|+4 assumption seems very restrictive, we note that prior to our work such structure theorems were only known for d<|F| by Green and Tao [Contrib. Discrete Math. 2009] and Bhowmick and Lovett [arXiv:1506.02047]. Using algorithmic regularity lemmas for polynomials developed by Bhattacharyya, et. al. [SODA 2015], we show that whenever such a strong structure exists, it can be found algorithmically in time polynomial in n.