A new approach for the Brown-Erdos-Sos problem

Abstract

The celebrated Brown-Erdos-S\'os conjecture states that for every fixed e, every 3-uniform hypergraph with (n2) edges contains e edges spanned by e+3 vertices. Up to this date all the approaches towards resolving this problem relied on highly involved applications of the hypergraph regularity method, and yet they supplied only approximate versions of the conjecture, producing e edges spanned by e+O( e/ e) vertices. In this short paper we describe a completely different approach, which reduces the problem to a variant of another well-known conjecture in extremal graph theory. A resolution of the latter would resolve the Brown-Erdos-S\'os conjecture up to an absolute additive constant.