Let $H$ be a $4$-uniform hypergraph on $n$ vertices. The transversal number $\tau(H)$ of $H$ is the minimum number of vertices that intersect every edge. The result in [J. Combin. Theory Ser. B 50 (1990), 129—133] by Lai and Chang implies that $\tau(H) \le 7n/18$ when $H$ is $3$-regular. The main result in [Combinatorica 27 (2007), 473—487] by Thomassé and Yeo implies an improved bound of $\tau(H) \le 8n/21$. We provide a further improvement and prove that $\tau(H) \le 3n/8$, which is best possible due to a hypergraph of order eight. More generally, we show that if $H$ is a $4$-uniform hypergraph on $n$ vertices and $m$ edges with maximum degree $\Delta(H) \le 3$, then $\tau(H) \le n/4 + m/6$, which proves a known conjecture. We show that an easy corollary of our main result is that if $H$ is a $4$-uniform hypergraph with $n$ vertices and $n$ edges, then $\tau(H) \le \frac{3}{7}n$, which was the main result of the Thomassé-Yeo paper [Combinatorica 27 (2007), 473—487].
@article{10_37236_5304,
author = {Michael A. Henning and Anders Yeo},
title = {Transversals in 4-uniform hypergraphs},
journal = {The electronic journal of combinatorics},
year = {2016},
volume = {23},
number = {3},
doi = {10.37236/5304},
zbl = {1351.05221},
url = {http://geodesic.mathdoc.fr/articles/10.37236/5304/}
}
TY - JOUR
AU - Michael A. Henning
AU - Anders Yeo
TI - Transversals in 4-uniform hypergraphs
JO - The electronic journal of combinatorics
PY - 2016
VL - 23
IS - 3
UR - http://geodesic.mathdoc.fr/articles/10.37236/5304/
DO - 10.37236/5304
ID - 10_37236_5304
ER -
%0 Journal Article
%A Michael A. Henning
%A Anders Yeo
%T Transversals in 4-uniform hypergraphs
%J The electronic journal of combinatorics
%D 2016
%V 23
%N 3
%U http://geodesic.mathdoc.fr/articles/10.37236/5304/
%R 10.37236/5304
%F 10_37236_5304
Michael A. Henning; Anders Yeo. Transversals in 4-uniform hypergraphs. The electronic journal of combinatorics, Tome 23 (2016) no. 3. doi: 10.37236/5304
