English

An Improved Lower Bound for Arithmetic Regularity

Combinatorics 2016-08-03 v1

Abstract

The arithmetic regularity lemma due to Green [GAFA 2005] is an analogue of the famous Szemer{\'e}di regularity lemma in graph theory. It shows that for any abelian group GG and any bounded function f:G[0,1]f:G \to [0,1], there exists a subgroup HGH \le G of bounded index such that, when restricted to most cosets of HH, the function ff is pseudorandom in the sense that all its nontrivial Fourier coefficients are small. Quantitatively, if one wishes to obtain that for 1ϵ1-\epsilon fraction of the cosets, the nontrivial Fourier coefficients are bounded by ϵ\epsilon, then Green shows that G/H|G/H| is bounded by a tower of twos of height 1/ϵ31/\epsilon^3. He also gives an example showing that a tower of height Ω(log1/ϵ)\Omega(\log 1/\epsilon) is necessary. Here, we give an improved example, showing that a tower of height Ω(1/ϵ)\Omega(1/\epsilon) is necessary.

Keywords

Cite

@article{arxiv.1405.4409,
  title  = {An Improved Lower Bound for Arithmetic Regularity},
  author = {Kaave Hosseini and Shachar Lovett and Guy Moshkovitz and Asaf Shapira},
  journal= {arXiv preprint arXiv:1405.4409},
  year   = {2016}
}
R2 v1 2026-06-22T04:16:52.025Z