English

An Improved Point-Line Incidence Bound Over Arbitrary Fields

Combinatorics 2017-08-16 v4

Abstract

We prove a new upper bound for the number of incidences between points and lines in a plane over an arbitrary field F\mathbb{F}, a problem first considered by Bourgain, Katz and Tao. Specifically, we show that mm points and nn lines in F2\mathbb{F}^2, with m7/8<n<m8/7m^{7/8}<n<m^{8/7}, determine at most O(m11/15n11/15)O(m^{11/15}n^{11/15}) incidences (where, if F\mathbb{F} has positive characteristic pp, we assume m2n13p15m^{-2}n^{13}\ll p^{15}). This improves on the previous best known bound, due to Jones. To obtain our bound, we first prove an optimal point-line incidence bound on Cartesian products, using a reduction to a point-plane incidence bound of Rudnev. We then cover most of the point set with Cartesian products, and we bound the incidences on each product separately, using the bound just mentioned. We give several applications, to sum-product-type problems, an expander problem of Bourgain, the distinct distance problem and Beck's theorem.

Keywords

Cite

@article{arxiv.1609.06284,
  title  = {An Improved Point-Line Incidence Bound Over Arbitrary Fields},
  author = {Sophie Stevens and Frank de Zeeuw},
  journal= {arXiv preprint arXiv:1609.06284},
  year   = {2017}
}

Comments

18 pages. To appear in the Bulletin of the London Mathematical Society

R2 v1 2026-06-22T15:55:48.190Z