The degree and codegree threshold for linear triangle covering in 3-graphs

TL;DR

This paper determines the exact and asymptotic degree thresholds for covering a specific linear triangle in 3-uniform hypergraphs, advancing understanding of hypergraph covering problems.

Contribution

It provides the exact value of the codegree threshold and asymptotically determines the degree threshold for covering a linear triangle in 3-uniform hypergraphs.

Findings

Exact value of $c_2(n, F)$ for the linear triangle.

Asymptotic determination of $c_1(n, F)$ for the linear triangle.

Progress in hypergraph covering thresholds.

Abstract

Given two $k$-uniform hypergraphs $F$ and $G$, we say that $G$ has an $F$-covering if every vertex in $G$ is contained in a copy of $F$. For $1\le i \le k-1$, let $c_i(n,F)$ be the least integer such that every $n$-vertex $k$-uniform hypergraph $G$ with $\delta_i(G)> c_i(n,F)$ has an $F$-covering. The covering problem has been systematically studied by Falgas-Ravry and Zhao [Codegree thresholds for covering 3-uniform hypergraphs, SIAM J. Discrete Math., 2016]. Last year, Falgas-Ravry, Markstr\"om, and Zhao [Triangle-degrees in graphs and tetrahedron coverings in 3-graphs, Combinatorics, Probability and Computing, 2021] asymptotically determined $c_1(n, F)$ when $F$ is the generalized triangle. In this note, we give the exact value of $c_2(n, F)$ and asymptotically determine $c_1(n, F)$ when $F$ is the linear triangle $C_6^3$, where $C_6^3$ is the 3-uniform hypergraph with vertex set $\{v_1,v_2,v_3,v_4,v_5,v_6\}$ and edge set $\{v_1v_2v_3,v_3v_4v_5,v_5v_6v_1\}$.