A Simple Counting Argument for Dense Linear Hypergraphs

Abstract

In connection to the Brown-Erdős-Sós conjecture, we give a short local averaging proof of a density theorem for linear uniform hypergraphs. Let r 3, k 3, and suppose that n (r-2)(k-2)+1. If H is a linear r-uniform hypergraph on n vertices and \[|E(H)| ≥ k-2r2((r-2)(k-2)+1)n2 + nr,\] then H contains k edges spanning at most (r-2)k+3 vertices. In the standard linear-density normalization, this gives the asymptotic density threshold c ≥ r-1r · k-2(r-2)(k-2)+1 + o(1). In particular, this yields a simple proof of the large-uniformity form of the Brown-Erdős-Sós theorem, due to Keevash and Long. In the case of triple systems, our bound becomes c ≥ 2(k-2)3(k-1) + o(1), improving upon a bound of 45 due to Santos and Tyomkyn.