Short rainbow cycles for families of matchings and triangles

IF 0.9 3区数学 Q2 MATHEMATICS Journal of Graph Theory Pub Date : 2024-09-23 DOI:10.1002/jgt.23183

He Guo

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引用次数: 0

Abstract

A generalization of the famous Caccetta–Häggkvist conjecture, suggested by Aharoni, is that any family $F = (F_{1}, \dots, F_{n})$ of sets of edges in $K_{n}$ , each of size $k$ , has a rainbow cycle of length at most $⌈ \frac{n}{k} ⌉$ . In works by the author with Aharoni and by the author with Aharoni, Berger, Chudnovsky, and Zerbib, it was shown that asymptotically this can be improved to $O (\log n)$ if all sets are matchings of size 2, or all are triangles. We show that the same is true in the mixed case, that is, if each $F_{i}$ is either a matching of size 2 or a triangle. We also study the case that each $F_{i}$ is a matching of size 2 or a single edge, or each $F_{i}$ is a triangle or a single edge, and in each of these cases we determine the threshold proportion between the types, beyond which the rainbow girth goes from linear to logarithmic.

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短彩虹周期的家庭匹配和三角形

由阿哈罗尼提出的著名的卡塞塔-哈格克维斯特猜想的一个概括是：任何族 F = ( F 1 , ... , F n ) ${rm{ {mathcal F} }}=({F}_{1},\ldots ,{F}_{n})$ K n ${K}_{n} 中的边集，每个边集的大小为 k $k}}=({F}_{1},\ldots ,{F}_{n})$ K n ${K}_{n}$ 中的边集，每个边集的大小为 k $k$，最多有⌈ n k ⌉ $\lceil \frac{n}{k}\rceil $ 长度的彩虹循环。作者与 Aharoni 以及作者与 Aharoni、Berger、Chudnovsky 和 Zerbib 的研究表明，如果所有集合都是大小为 2 的匹配集，或者所有集合都是三角形，那么从渐近的角度来看，这个结果可以改进为 O ( log n ) $O(\mathrm{log}n)$。我们将证明，在混合情况下，即每个 F i ${F}_{i}$ 要么是大小为 2 的匹配集要么是三角形时，情况也是如此。我们还研究了每个 F i ${F}_{i}$ 都是大小为 2 的匹配或单边，或者每个 F i ${F}_{i}$ 都是三角形或单边的情况，在每种情况下，我们都确定了类型之间的临界比例，超过这个比例，彩虹周长就会从线性变为对数。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Graph Theory 数学-数学

CiteScore

1.60

自引率

22.20%

发文量

130

审稿时长

6-12 weeks

期刊介绍： The Journal of Graph Theory is devoted to a variety of topics in graph theory, such as structural results about graphs, graph algorithms with theoretical emphasis, and discrete optimization on graphs. The scope of the journal also includes related areas in combinatorics and the interaction of graph theory with other mathematical sciences. A subscription to the Journal of Graph Theory includes a subscription to the Journal of Combinatorial Designs .

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