English

Turan Problems on Non-uniform Hypergraphs

Combinatorics 2013-01-10 v1

Abstract

A non-uniform hypergraph H=(V,E)H=(V,E) consists of a vertex set VV and an edge set E2VE\subseteq 2^V; the edges in EE are not required to all have the same cardinality. The set of all cardinalities of edges in HH is denoted by R(H)R(H), the set of edge types. For a fixed hypergraph HH, the Tur\'an density π(H)\pi(H) is defined to be limnmaxGnhn(Gn)\lim_{n\to\infty}\max_{G_n}h_n(G_n), where the maximum is taken over all HH-free hypergraphs GnG_n on nn vertices satisfying R(Gn)R(H)R(G_n)\subseteq R(H), and hn(Gn)h_n(G_n), the so called Lubell function, is the expected number of edges in GnG_n hit by a random full chain. This concept, which generalizes the Tur\'an density of kk-uniform hypergraphs, is motivated by recent work on extremal poset problems. The details connecting these two areas will be revealed in the end of this paper. Several properties of Tur\'an density, such as supersaturation, blow-up, and suspension, are generalized from uniform hypergraphs to non-uniform hypergraphs. Other questions such as "Which hypergraphs are degenerate?" are more complicated and don't appear to generalize well. In addition, we completely determine the Tur\'an densities of 1,2{1,2}-hypergraphs.

Keywords

Cite

@article{arxiv.1301.1870,
  title  = {Turan Problems on Non-uniform Hypergraphs},
  author = {Travis Johnston and Linyuan Lu},
  journal= {arXiv preprint arXiv:1301.1870},
  year   = {2013}
}

Comments

29 pages, 7 figures, 1 table

R2 v1 2026-06-21T23:06:40.267Z