English

Non-degenerate Hypergraphs with Exponentially Many Extremal Constructions

Combinatorics 2022-08-02 v1

Abstract

For every integer t0t \ge 0, denote by F5tF_5^t the hypergraph on vertex set {1,2,,5+t}\{1,2,\ldots, 5+t\} with hyperedges {123,124}{34k:5k5+t}\{123,124\} \cup \{34k : 5 \le k \le 5+t\}. We determine ex(n,F5t)\mathrm{ex}(n,F_5^t) for every t0t\ge 0 and sufficiently large nn and characterize the extremal F5tF_5^t-free hypergraphs. In particular, if nn satisfies certain divisibility conditions, then the extremal F5tF_5^t-free hypergraphs are exactly the balanced complete tripartite hypergraphs with additional hyperedges inside each of the three parts (V1,V2,V3)(V_1,V_2,V_3) in the partition; each part ViV_i spans a (Vi,3,2,t)(|V_i|,3,2,t)-design. This generalizes earlier work of Frankl and F\"uredi on the Tur\'an number of F5:=F50F_5:=F_5^0. Our results extend a theory of Erd\H{o}s and Simonovits about the extremal constructions for certain fixed graphs. In particular, the hypergraphs F56tF_5^{6t}, for t1t\geq 1, are the first examples of hypergraphs with exponentially many extremal constructions and positive Tur\'an density.

Keywords

Cite

@article{arxiv.2208.00652,
  title  = {Non-degenerate Hypergraphs with Exponentially Many Extremal Constructions},
  author = {József Balogh and Felix Christian Clemen and Haoran Luo},
  journal= {arXiv preprint arXiv:2208.00652},
  year   = {2022}
}
R2 v1 2026-06-25T01:22:18.641Z