English

The edge-statistics conjecture for hypergraphs

Combinatorics 2025-08-22 v2

Abstract

Let r,k,r,k,\ell be integers such that 0(kr)0\le\ell\le\binom{k}{r}. Given a large rr-uniform hypergraph GG, we consider the fraction of kk-vertex subsets which span exactly \ell edges. If \ell is 0 or (kr)\binom{k}{r}, this fraction can be exactly 1 (by taking GG to be empty or complete), but for all other values of \ell, one might suspect that this fraction is always significantly smaller than 1. In this paper we prove an essentially optimal result along these lines: if \ell is not 0 or (kr)\binom{k}{r}, then this fraction is at most (1/e)+ε(1/e) + \varepsilon, assuming kk is sufficiently large in terms of rr and ε>0\varepsilon>0, and GG is sufficiently large in terms of kk. Previously, this was only known for a very limited range of values of r,k,r,k,\ell (due to Kwan-Sudakov-Tran, Fox-Sauermann, and Martinsson-Mousset-Noever-Truji\'{c}). Our result answers a question of Alon-Hefetz-Krivelevich-Tyomkyn, who suggested this as a hypergraph generalisation of their "edge-statistics conjecture". We also prove a much stronger bound when \ell is far from 0 and (kr)\binom{k}{r}.

Keywords

Cite

@article{arxiv.2505.03954,
  title  = {The edge-statistics conjecture for hypergraphs},
  author = {Vishesh Jain and Matthew Kwan and Dhruv Mubayi and Tuan Tran},
  journal= {arXiv preprint arXiv:2505.03954},
  year   = {2025}
}
R2 v1 2026-06-28T23:23:40.348Z