English

A hypergraph bipartite Tur\'an problem with odd uniformity

Combinatorics 2024-03-12 v2

Abstract

In this paper, we investigate the hypergraph Tur\'an number ex(n,Ks,t(r))ex(n,K^{(r)}_{s,t}). Here, Ks,t(r)K^{(r)}_{s,t} denotes the rr-uniform hypergraph with vertex set (i[t]Xi)Y\left(\cup_{i\in [t]}X_i\right)\cup Y and edge set {Xi{y}:i[t],yY}\{X_i\cup \{y\}: i\in [t], y\in Y\}, where X1,X2,,XtX_1,X_2,\cdots,X_t are tt pairwise disjoint sets of size r1r-1 and YY is a set of size ss disjoint from each XiX_i. This study was initially explored by Erd\H{o}s and has since received substantial attention in research. Recent advancements by Brada\v{c}, Gishboliner, Janzer and Sudakov have greatly contributed to a better understanding of this problem. They proved that ex(n,Ks,t(r))=Os,t(nr1s1)ex(n,K_{s,t}^{(r)})=O_{s,t}(n^{r-\frac{1}{s-1}}) holds for any r3r\geq 3 and s,t2s,t\geq 2. They also provided constructions illustrating the tightness of this bound if r4r\geq 4 is {\it even} and ts2t\gg s\geq 2. Furthermore, they proved that ex(n,Ks,t(3))=Os,t(n31s1εs)ex(n,K_{s,t}^{(3)})=O_{s,t}(n^{3-\frac{1}{s-1}-\varepsilon_s}) holds for s3s\geq 3 and some ϵs>0\epsilon_s>0. Addressing this intriguing discrepancy between the behavior of this number for r=3r=3 and the even cases, Brada\v{c} et al. post a question of whether \begin{equation*} \mbox{ex(n,Ks,t(r))=Or,s,t(nr1s1ε)ex(n,K_{s,t}^{(r)})= O_{r,s,t}(n^{r-\frac{1}{s-1}- \varepsilon}) holds for odd r5r\geq 5 and any s3s\geq 3.} \end{equation*} In this paper, we provide an affirmative answer to this question, utilizing novel techniques to identify regular and dense substructures. This result highlights a rare instance in hypergraph Tur\'an problems where the solution depends on the parity of the uniformity.

Keywords

Cite

@article{arxiv.2403.04318,
  title  = {A hypergraph bipartite Tur\'an problem with odd uniformity},
  author = {Jie Ma and Tianchi Yang},
  journal= {arXiv preprint arXiv:2403.04318},
  year   = {2024}
}
R2 v1 2026-06-28T15:12:01.681Z