English

Generalized Tur\'an problem for Complete Hypergraphs

Combinatorics 2023-02-20 v2

Abstract

Write Kn(k)K^{(k)}_{n} for the complete kk-graph on nn vertices. For 2kg<r2 \leq k \leq g < r integers, let π(n,Kg(k),Kr(k))\pi\left(n, K^{(k)}_{g}, K^{(k)}_r\right) be the maximum density of Kg(k)K^{(k)}_{g} in nn vertex Kr(k)K^{(k)}_{r}-free kk-graphs. The main contribution of this paper is the upper bound: π(n,Kg(k),Kr(k))(1+O(n1))m=kg(1(m1k1)(r1k1)).\pi\left(n, K^{(k)}_{g}, K^{(k)}_r\right) \leq \left(1 + O\left(n^{-1}\right) \right)\prod_{m=k}^{g} \left(1 - \frac{\binom{m-1}{k-1}}{\binom{r-1}{k-1}} \right). The graph case (k=2k=2) is the first known generalized Tur\'an question, investigated by Erd\H{o}s. The k=gk=g case is the hypergraph Tur\'an problem where the best known general upper bound is by de Caen. The result proved here matches both bounds asymptotically, while any triple k,g,rk, g, r with 2<k<g<r2 < k < g < r provides a new upper bound. The proof uses techniques from the theory of flag algebras to derive linear relations between different densities. These relations can be combined with linear algebraic methods. Additionally a simple flag algebraic certificate will be given for limnπ(n,K4(3),K5(3))=3/8\lim_{n \rightarrow \infty} \pi \left(n, K^{(3)}_4, K^{(3)}_5 \right) = 3/8.

Keywords

Cite

@article{arxiv.2302.07571,
  title  = {Generalized Tur\'an problem for Complete Hypergraphs},
  author = {Levente Bodnar},
  journal= {arXiv preprint arXiv:2302.07571},
  year   = {2023}
}

Comments

20 pages. Fixed a typo

R2 v1 2026-06-28T08:40:35.867Z