Tight bounds for rainbow partial $F$-tiling in edge-colored complete hypergraphs

TL;DR

This paper establishes tight bounds for the minimum number of colors needed to guarantee rainbow tilings of multiple copies of a hypergraph in edge-colored complete hypergraphs, extending classical anti-Ramsey results.

Contribution

It introduces a reduction of rainbow partial tiling numbers to simpler cases for bounded, smooth hypergraphs and determines these numbers for smaller tilings using Turán number gaps.

Findings

Reduces complex rainbow tiling problems to simpler cases for certain hypergraphs.

Determines rainbow tiling bounds for smaller tilings using Turán number gaps.

Applicable to hypergraphs with unknown Turán densities, like the tetrahedron.

Abstract

For an $r$-graph $F$ and integers $n,t$ satisfying $t \le n/v(F)$, let $\mathrm{ar}(n,tF)$ denote the minimum integer $N$ such that every edge-coloring of $K_{n}^{r}$ using $N$ colors contains a rainbow copy of $tF$, where $tF$ is the $r$-graphs consisting of $t$ vertex-disjoint copies of $F$. The case $t=1$ is the classical anti-Ramsey problem proposed by Erd\H{o}s--Simonovits--S\'{o}s~\cite{ESS75}. When $F$ is a single edge, this becomes the rainbow matching problem introduced by Schiermeyer~\cite{Sch04} and \"{O}zkahya--Young~\cite{OY13}. We conduct a systematic study of $\mathrm{ar}(n,tF)$ for the case where $t$ is much smaller than $\mathrm{ex}(n,F)/n^{r-1}$. Our first main result provides a reduction of $\mathrm{ar}(n,tF)$ to $\mathrm{ar}(n,2F)$ when $F$ is bounded and smooth, two properties satisfied by most previously studied hypergraphs. Complementing the first result, the second main result, which utilizes gaps between Tur\'{a}n numbers, determines $\mathrm{ar}(n,tF)$ for relatively smaller $t$. Together, these two results determine $\mathrm{ar}(n,tF)$ for a large class of hypergraphs. Additionally, the latter result has the advantage of being applicable to hypergraphs with unknown Tur\'{a}n densities, such as the famous tetrahedron $K_{4}^{3}$.