On Possible Turan Densities

Abstract

The Tur\'an density π(H) of a family H of k-graphs is the limit as n tends to infinity of the maximum edge density of an H-free k-graph on n vertices. Let Ik consist of all possible Tur\'an densities and let Fk be the set of Tur\'an densities of finite k-graph families. Here we prove that Fk contains every density obtained from an arbitrary finite construction by optimally blowing it up and using recursion inside the specified set of parts. As an application, we show that Fk contains an irrational number for each k 3. Also, we show that Ik has cardinality of the continuum. In particular, Ik is not equal to Fk.