在偶彩虹或非三角形有向环上

IF 0.4 Q4 MATHEMATICS, APPLIED Journal of Combinatorics Pub Date : 2019-12-04 DOI:10.4310/joc.2021.v12.n4.a4
A. Czygrinow, T. Molla, B. Nagle, Roy Oursler
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引用次数: 2

摘要

设$G = (V, E)$为一个$n$顶点边色图。2013年,H. Li证明,如果每个顶点$v \in V$都与至少$(n+1)/2$条不同颜色的边相关,那么$G$承认彩虹三角形。我们建立了固定偶数彩虹$\ell$ -循环$C_{\ell}$的相应结果:如果每个顶点$v \in V$都与至少$(n+5)/3$个不同颜色的边相关,其中$n \geq n_0(\ell)$足够大,则$G$允许一个偶数彩虹$\ell$ -循环$C_{\ell}$。当$\ell \not\equiv 0$ (mod 3)时,这个结果是最好的。相应地,我们也表明,对于一个固定的(偶数或奇数)整数$\ell \geq 4$,每个大的$n$ -顶点定向图$\vec{G} = (V, \vec{E})$具有最小的外度至少$(n+1)/3$承认一个(一致的)有向$\ell$ -循环$\vec{C}_{\ell}$。我们的后一个结果与Kelly、Kuhn和Osthus的一个结果有关,他们对具有大半度的有向图证明了一个类似的陈述。我们的证明是基于稳定性方法的。
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On even rainbow or nontriangular directed cycles
Let $G = (V, E)$ be an $n$-vertex edge-colored graph. In 2013, H. Li proved that if every vertex $v \in V$ is incident to at least $(n+1)/2$ distinctly colored edges, then $G$ admits a rainbow triangle. We establish a corresponding result for fixed even rainbow $\ell$-cycles $C_{\ell}$: if every vertex $v \in V$ is incident to at least $(n+5)/3$ distinctly colored edges, where $n \geq n_0(\ell)$ is sufficiently large, then $G$ admits an even rainbow $\ell$-cycle $C_{\ell}$. This result is best possible whenever $\ell \not\equiv 0$ (mod 3). Correspondingly, we also show that for a fixed (even or odd) integer $\ell \geq 4$, every large $n$-vertex oriented graph $\vec{G} = (V, \vec{E})$ with minimum outdegree at least $(n+1)/3$ admits a (consistently) directed $\ell$-cycle $\vec{C}_{\ell}$. Our latter result relates to one of Kelly, Kuhn, and Osthus, who proved a similar statement for oriented graphs with large semi-degree. Our proofs are based on the stability method.
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来源期刊
Journal of Combinatorics
Journal of Combinatorics MATHEMATICS, APPLIED-
自引率
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发文量
21
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