English

Bias implies low rank for quartic polynomials

Combinatorics 2019-03-05 v2

Abstract

We investigate the structure of polynomials of degree four in many variables over a fixed prime field F=Fp\mathbb{F}=\mathbb{F}_{p}. In 2007, Green and Tao proved that if a polynomial f:FnFf:\mathbb{F}^{n}\rightarrow\mathbb{F} is poorly distributed, then it is a function of a few polynomials of smaller degree. In 2009, Haramaty and Shpilka found an effective bound for ff of degree four: If bias(f)δbias\left(f\right)\geq\delta, then the number of lower degree polynomials required is at most polynomial in 1/δ1/\delta and ff has a simple presentation as a sum of their products. We make a step towards showing that in fact the number of lower degree polynomials required is at most log-polynomial in 1/δ1/\delta, with the same simple presentation of ff. This result was a Master's thesis supervised by T. Ziegler at the Hebrew University of Jerusalem, submitted in October 2018. A log-polynomial bound for polynomials of arbitrary degree was recently proved independently by Milicevic and by Janzer.

Keywords

Cite

@article{arxiv.1902.10632,
  title  = {Bias implies low rank for quartic polynomials},
  author = {Amichai Lampert},
  journal= {arXiv preprint arXiv:1902.10632},
  year   = {2019}
}
R2 v1 2026-06-23T07:53:13.267Z