Small dense subgraphs of a graph

Abstract

Given a family F of graphs, and a positive integer n, the Tur\'an number ex(n, F) of F is the maximum number of edges in an n-vertex graph that does not contain any member of F as a subgraph. The order of a graph is the number of vertices in it. In this paper, we study the Tur\'an number of the family of graphs with bounded order and high average degree. For every real d≥ 2 and positive integer m≥ 2, let Fd,m denote the family of graphs on at most m vertices that have average degree at least d. It follows from the Erdos-R\'enyi bound that ex(n, Fd,m)=(n2-2d+cdm), for some positive constant c. Verstra\"ete asked if it is true that for each fixed d there exists a function εd(m) that tends to 0 as m ∞ such that ex(n, Fd,m)=O(n2-2d+εd(m)). We answer Verstra\"ete's question in the affirmative whenever d is an integer. We also prove an extension of the cube theorem on the Tur\'an number of the cube Q3, which partially answers a question of Pinchasi and Sharir.