























Let $G$ be an edge-colored graph on $n$ vertices. The minimum color degree of $G$, denoted by $δ^c(G)$, is defined as the minimum number of colors assigned to the edges incident to a vertex in $G$. In 2013, H. Li proved that an edge-colored graph $G$ on $n$ vertices contains a rainbow triangle if $δ^c(G)\geq \frac{n+1}{2}$. In this paper, we obtain several estimates on the number of rainbow triangles through one given vertex in $G$. As consequences, we prove counting results for rainbow triangles in edge-colored graphs. One main theorem states that the number of rainbow triangles in $G$ is at least $\frac{1}{6}δ^c(G)(2δ^c(G)-n)n$, which is best possible by considering the rainbow $k$-partite Turán graph, where its order is divisible by $k$. This means that there are $Ω(n^2)$ rainbow triangles in $G$ if $δ^c(G)\geq \frac{n+1}{2}$, and $Ω(n^3)$ rainbow triangles in $G$ if $δ^c(G)\geq cn$ when $c>\frac{1}{2}$. Both results are tight in sense of the order of the magnitude. We also prove a counting version of a previous theorem on rainbow triangles under a color neighborhood union condition due to Broersma et al., and an asymptotically tight color degree condition forcing a colored friendship subgraph $F_k$ (i.e., $k$ rainbow triangles sharing a common vertex).
此内容由惯性聚合(RSS阅读器)自动聚合整理,仅供阅读参考。 原文来自 — 版权归原作者所有。