The edge-statistics conjecture for hypergraphs

Abstract

Let r,k, be integers such that 0kr. Given a large r-uniform hypergraph G, we consider the fraction of k-vertex subsets which span exactly edges. If is 0 or kr, this fraction can be exactly 1 (by taking G to be empty or complete), but for all other values of , 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 is not 0 or kr, then this fraction is at most (1/e) + , assuming k is sufficiently large in terms of r and >0, and G is sufficiently large in terms of k. Previously, this was only known for a very limited range of values of r,k, (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 is far from 0 and kr.