On stability of rainbow matchings

TL;DR

This paper investigates the stability of rainbow matchings in non-uniform hypergraphs, establishing conditions under which either a rainbow matching exists or a common vertex cover is present, extending classical theorems.

Contribution

It generalizes the Hilton-Milner theorem to rainbow non-uniform settings and proves a stability result for rainbow matchings for all parameters.

Findings

Existence of rainbow matchings under specified size conditions

Presence of a common vertex cover when rainbow matchings do not exist

Extension of classical theorems to non-uniform hypergraph settings

Abstract

We show that for any integer $k\ge 1$ there exists an integer $t_0(k)$ such that for integers $t, k_1, \ldots, k_{t+1}, n$ with $t>t_0(k)$, $\max\{k_1, \ldots, k_{t+1}\}\le k$, and $n > 2k(t+1)$, the following holds: If $F_i \subseteq {[n]\choose k_i}$ and $|F_i|> {n\choose k_i}-{n-t\choose k_i} - {n-t-k \choose k_i-1} + 1$ for all $i \in [t+1]$, then either $\{F_1,\ldots, F_{t+1}\}$ admits a rainbow matching of size $t+1$ or there exists $W\in {[n]\choose t}$ such that $W$ is a vertex cover of $F_i$ for all $i\in [t+1]$. This may be viewed as a rainbow non-uniform extension of the classical Hilton-Milner theorem. We also show that the same holds for every $t$ and $n > 2k^3t$, generalizing a recent stability result of Frankl and Kupavskii on matchings to rainbow matchings.