English

Polynomial progressions in topological fields

Number Theory 2024-11-27 v4 Classical Analysis and ODEs Combinatorics

Abstract

Let P1,,PmK[y]P_1, \ldots, P_m \in K[y] be polynomials with distinct degrees, no constant terms and coefficients in a general locally compact topological field KK. We give a quantitative count of the number of polynomial progressions x,x+P1(y),,x+Pm(y)x, x+P_1(y), \ldots, x + P_m(y) lying in a set SKS\subseteq K of positive density. The proof relies on a general LL^{\infty} inverse theorem which is of independent interest. This inverse theorem implies a Sobolev improving estimate for multilinear polynomial averaging operators which in turn implies our quantitative estimate for polynomial progressions. This general Sobolev inequality has the potential to be applied in a number of problems in real, complex and pp-adic analysis.

Keywords

Cite

@article{arxiv.2210.00670,
  title  = {Polynomial progressions in topological fields},
  author = {Ben Krause and Mariusz Mirek and Sarah Peluse and James Wright},
  journal= {arXiv preprint arXiv:2210.00670},
  year   = {2024}
}

Comments

51 pages, no figures, suggestions from the referees reports incorporated. Accepted for publication in the Forum of Mathematics, Sigma

R2 v1 2026-06-28T02:34:24.236Z