English

Relative discrepancy of hypergraphs

Combinatorics 2025-07-01 v1

Abstract

Given kk-uniform hypergraphs GG and HH on nn vertices with densities pp and qq, their relative discrepancy is defined as disc(G,H)=maxE(G)E(H)pq(nk)\hbox{disc}(G,H)=\max\big||E(G')\cap E(H')|-pq\binom{n}{k}\big|, where the maximum ranges over all pairs G,HG',H' with GGG'\cong G, HHH'\cong H, and V(G)=V(H)V(G')=V(H'). Let bs(k)\hbox{bs}(k) denote the smallest integer m2m \ge 2 such that any collection of mm kk-uniform hypergraphs on nn vertices with moderate densities contains a pair G,HG,H for which disc(G,H)=Ω(n(k+1)/2)\hbox{disc}(G,H) = \Omega(n^{(k+1)/2}). In this paper, we answer several questions raised by Bollob\'as and Scott, providing both upper and lower bounds for bs(k)\hbox{bs}(k). Consequently, we determine the exact value of bs(k)\hbox{bs}(k) for 2k132\le k\le 13, and show bs(k)=O(k0.525)\hbox{bs}(k)=O(k^{0.525}), substantially improving the previous bound bs(k)k+1\hbox{bs}(k)\le k+1 due to Bollob\'as-Scott. The case k=2k=2 recovers a result of Bollob\'as-Scott, which generalises classical theorems of Erd\H{o}s-Spencer, and Erd\H{o}s-Goldberg-Pach-Spencer. The case k=3k=3 also follows from the results of Bollob\'as-Scott and Kwan-Sudakov-Tran. Our proof combines linear algebra, Fourier analysis, and extremal hypergraph theory.

Keywords

Cite

@article{arxiv.2506.23264,
  title  = {Relative discrepancy of hypergraphs},
  author = {Diep Luong-Le and Tuan Tran and Dilong Yang},
  journal= {arXiv preprint arXiv:2506.23264},
  year   = {2025}
}
R2 v1 2026-07-01T03:38:31.772Z