Turan Problems and Shadows III: expansions of graphs

Abstract

The expansion G+ of a graph G is the 3-uniform hypergraph obtained from G by enlarging each edge of G with a new vertex disjoint from V(G) such that distinct edges are enlarged by distinct vertices. Let ex3(n,F) denote the maximum number of edges in a 3-uniform hypergraph with n vertices not containing any copy of a 3-uniform hypergraph F. The study of ex3(n,G+) includes some well-researched problems, including the case that F consists of k disjoint edges, G is a triangle, G is a path or cycle, and G is a tree. In this paper we initiate a broader study of the behavior of ex3(n,G+). Specifically, we show \[ ex3(n,Ks,t+) = (n3 - 3/s)\] whenever t > (s - 1)! and s ≥ 3. One of the main open problems is to determine for which graphs G the quantity ex3(n,G+) is quadratic in n. We show that this occurs when G is any bipartite graph with Tur\'an number o(n) where = 1 + 52, and in particular, this shows ex3(n,Q+) = (n2) where Q is the three-dimensional cube graph.