The degree threshold for covering with all the connected $3$-graphs with $3$ edges

TL;DR

This paper determines the minimum degree threshold for covering with all connected 3-graphs with 3 edges, extending previous results to new specific hypergraphs and providing exact thresholds for certain cases.

Contribution

It asymptotically determines the degree threshold for the generalized triangle F_5 and finds exact thresholds for all other connected 3-graphs with 3 edges, except for three known cases.

Findings

Asymptotic threshold for F_5 determined.

Exact thresholds for all other connected 3-graphs with 3 edges identified.

Extends previous work on hypergraph covering thresholds.

Abstract

Given two $r$-uniform hypergraphs $F$ and $H$, we say that $H$ has an $F$-covering if every vertex in $H$ is contained in a copy of $F$. Let $c_{i}(n,F)$ be the least integer such that every $n$-vertex $r$-graph $H$ with $\delta_{i}(H)>c_i(n,F)$ has an $F$-covering. Falgas-Ravry, Markst\"om and Zhao (Combin. Probab. Comput., 2021) asymptotically determined $c_1(n,K_{4}^{(3)-})$, where $K_{4}^{(3)-}$ is obtained by deleting an edge from the complete $3$-graph on $4$ vertices. Later, Tang, Ma and Hou (arXiv, 2022) asymptotically determined $c_1(n,C_{6}^{(3)})$, where $C_{6}^{(3)}$ is the linear triangle, i.e. $C_{6}^{(3)}=([6],\{123,345,561\})$. In this paper, we determine $c_1(n,F_5)$ asymptotically, where $F_5$ is the generalized triangle, i.e. $F_5=([5],\{123,124,345\})$. We also determine the exact values of $c_1(n,F)$, where $F$ is any connected $3$-graphs with $3$ edges and $F\notin\{K_4^{(3)-}, C_{6}^{(3)}, F_5\}$.