A Ramsey variant of the Brown-Erdos-S\'os conjecture

Abstract

An r-uniform hypergraph (r-graph for short) is called linear if every pair of vertices belong to at most one edge. A linear r-graph is complete if every pair of vertices are in exactly one edge. The famous Brown-Erdos-S\'os conjecture states that for every fixed k and r, every linear r-graph with (n2) edges contains k edges spanned by at most (r-2)k+3 vertices. As an intermediate step towards this conjecture, Conlon and Nenadov recently suggested to prove its natural Ramsey relaxation. Namely, that for every fixed k, r and c, in every c-colouring of a complete linear r-graph, one can find k monochromatic edges spanned by at most (r-2)k+3 vertices. We prove that this Ramsey version of the conjecture holds under the additional assumption that r ≥ r0(c), and we show that for c=2 it holds for all r≥ 4.