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Title: Rainbow connection in graphs (English)
Author: Chartrand, Gary
Author: Johns, Garry L.
Author: McKeon, Kathleen A.
Author: Zhang, Ping
Language: English
Journal: Mathematica Bohemica
ISSN: 0862-7959 (print)
ISSN: 2464-7136 (online)
Volume: 133
Issue: 1
Year: 2008
Pages: 85-98
Summary lang: English
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Category: math
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Summary: Let $G$ be a nontrivial connected graph on which is defined a coloring $c\: E(G) \rightarrow \lbrace 1, 2, \ldots , k\rbrace $, $k \in {\mathbb{N}}$, of the edges of $G$, where adjacent edges may be colored the same. A path $P$ in $G$ is a rainbow path if no two edges of $P$ are colored the same. The graph $G$ is rainbow-connected if $G$ contains a rainbow $u-v$ path for every two vertices $u$ and $v$ of $G$. The minimum $k$ for which there exists such a $k$-edge coloring is the rainbow connection number $\mathop {\mathrm rc}(G)$ of $G$. If for every pair $u, v$ of distinct vertices, $G$ contains a rainbow $u-v$ geodesic, then $G$ is strongly rainbow-connected. The minimum $k$ for which there exists a $k$-edge coloring of $G$ that results in a strongly rainbow-connected graph is called the strong rainbow connection number $\mathop {\mathrm src}(G)$ of $G$. Thus $\mathop {\mathrm rc}(G) \le \mathop {\mathrm src}(G)$ for every nontrivial connected graph $G$. Both $\mathop {\mathrm rc}(G)$ and $\mathop {\mathrm src}(G)$ are determined for all complete multipartite graphs $G$ as well as other classes of graphs. For every pair $a, b$ of integers with $a \ge 3$ and $b \ge (5a-6)/3$, it is shown that there exists a connected graph $G$ such that $\mathop {\mathrm rc}(G)=a$ and $\mathop {\mathrm src}(G)=b$. (English)
Keyword: edge coloring
Keyword: rainbow coloring
Keyword: strong rainbow coloring
MSC: 05C15
MSC: 05C38
MSC: 05C40
idZBL: Zbl 1199.05106
idMR: MR2400153
DOI: 10.21136/MB.2008.133947
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Date available: 2009-09-24T22:34:49Z
Last updated: 2020-07-29
Stable URL: http://hdl.handle.net/10338.dmlcz/133947
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Reference: [1] G. Chartrand, P. Zhang: Introduction to Graph Theory.McGraw-Hill, Boston, 2005.
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