Homogeneous sets in hypergraphs with forbidden order-size pairs

Abstract

The well-known Erdos-Hajnal conjecture states that for any graph F, there exists ε>0 such that every n-vertex graph G that contains no induced copy of F has a homogeneous set of size at least nε. We consider a variant of the Erdos-Hajnal problem for hypergraphs where we forbid a family of hypergraphs described by their orders and sizes. For graphs, we observe that if we forbid induced subgraphs on m vertices and f edges for any positive m and 0≤ f ≤ m2, then we obtain large homogeneous sets. For triple systems, in the first nontrivial case m=4, for every S ⊂eq \0,1,2,3,4\, we give bounds on the minimum size of a homogeneous set in a triple system where the number of edges spanned by every four vertices is not in S. For all S we determine if the growth rate is polylogarithmic. Several open problems remain.