Rainbow Perfect Matchings for 4-Uniform Hypergraphs
Rainbow Perfect Matchings for 4-Uniform Hypergraphs
Let $n$ be a sufficiently large integer with $n\equiv 0\pmod 4$, and let $F_i \subseteq{[n]\choose 4}$, where $i\in [n/4]$. We show that if each vertex of $F_i$ is contained in more than ${n-1\choose 3}-{3n/4\choose 3}$ edges, then $\{F_1, \ldots ,F_{n/4}\}$ admits a rainbow matching, i.e., a set of $n/4$ edges …