Large cliques in hypergraphs with forbidden substructures

Abstract

A result due to Gy\'arf\'as, Hubenko, and Solymosi (answering a question of Erd\"os) states that if a graph G on n vertices does not contain K2,2 as an induced subgraph yet has at least cn2 edges, then G has a complete subgraph on at least c210n vertices. In this paper we suggest a "higher-dimensional" analogue of the notion of an induced K2,2 which allows us to generalize their result to k-uniform hypergraphs. Our result also has an interesting consequence in discrete geometry. In particular, it implies that the fractional Helly theorem can be derived as a purely combinatorial consequence of the colorful Helly theorem.