On possible uniform Tur\'an densities
Abstract
Given a family of 3-graphs F, the uniform Tur\'an density π(F) is defined as the infimum d∈[0,1] for which any sufficiently large uniformly d-dense 3-graph - that is, a 3-graph which has edge-density at least d on all linearly sized subsets - contains a copy of some F ∈ F. Let ,fin denote the set of all possible uniform Tur\'an densities of finite families. Erdos, Hajnal, and R\"odl introduced a family of constructions for lower bounds on uniform Tur\'an densities called palette constructions. We show that ,fin contains every d that is obtained as the uniform density of an optimized palette construction. A corollary of this is that ,fin contains the set of Lagrangians of 3-graphs and includes irrational numbers. Our work complements a recent result of Lamaison, which states that every value in ,fin can be approximated by uniform densities of palette constructions.
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