Two stability theorems for $\mathcal{K}_{\ell + 1}^{r}$-saturated hypergraphs
Abstract
An -saturated -graph is a maximal -graph not containing any member of as a subgraph. Let be the collection of all -graphs with at most edges such that for some -set every pair is covered by an edge in . Our first result shows that for each every -saturated -graph on vertices with edges contains a complete -partite subgraph on vertices, which extends a stability theorem for -saturated graphs given by Popielarz, Sahasrabudhe and Snyder. We also show that the bound is best possible. Our second result is motivated by a celebrated theorem of Andr\'{a}sfai, Erd\H{o}s and S\'{o}s which states that for every -free graph on vertices with minimum degree is -partite. We give a hypergraph version of it. The \emph{minimum positive co-degree} of an -graph , denoted by , is the maximum such that if is an -set contained in a edge of , then is contained in at least distinct edges of . Let be an integer and be a -saturated -graph on vertices. We prove that if either and ; or and , then is -partite; and the bound is best possible. This is the first stability result on minimum positive co-degree for hypergraphs.
Cite
@article{arxiv.2211.02838,
title = {Two stability theorems for $\mathcal{K}_{\ell + 1}^{r}$-saturated hypergraphs},
author = {Jianfeng Hou and Heng Li and Caihong Yang and Qinghou Zeng and Yixiao Zhang},
journal= {arXiv preprint arXiv:2211.02838},
year = {2022}
}