On 3-graphs with no four vertices spanning exactly two edges

Abstract

Let D2 denote the 3-uniform hypergraph with 4 vertices and 2 edges. Answering a question of Alon and Shapira, we prove an induced removal lemma for D2 having polynomial bounds. We also prove an Erdos-Hajnal-type result: every induced D2-free hypergraph on n vertices contains a clique or an independent set of size nc for some absolute constant c > 0. In the case of both problems, D2 is the only nontrivial k-uniform hypergraph with k≥ 3 which admits a polynomial bound.