Lower bounds for incidences

Author(s)

Cohen, Alex; Pohoata, Cosmin; Zakharov, Dmitrii

Abstract

Let p 1 , … , p n be a set of points in the unit square and let T 1 , … , T n be a set of δ -tubes such that T j passes through p j . We prove a lower bound for the number of incidences between the points and tubes under a natural regularity condition (similar to Frostman regularity). As a consequence, we show that in any configuration of points p 1 , … , p n ∈ [ 0 , 1 ] 2 along with a line ℓ j through each point p j , there exist j ≠ k for which d ( p j , ℓ k ) ≲ n − 2 / 3 + o ( 1 ) . It follows from the latter result that any set of n points in the unit square contains three points forming a triangle of area at most n − 7 / 6 + o ( 1 ) . This new upper bound for Heilbronn’s triangle problem attains the high-low limit established in our previous work arXiv: 2305.18253.

Date issued

2025-03-14

URI

https://hdl.handle.net/1721.1/162190

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Inventiones mathematicae

Publisher

Springer Berlin Heidelberg

Citation

Cohen, A., Pohoata, C. & Zakharov, D. Lower bounds for incidences. Invent. math. 240, 1045–1118 (2025).

Version: Final published version