On (s, t)-relaxed strong edge-coloring of graphs
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- 作者:Dan He ; Wensong Lin
- 关键词:Strong edge ; coloring ; Strong chromatic index ; \((s ; t)\) ; relaxed strong edge ; coloring ; \((s ; t)\) ; relaxed strong chromatic index ; Tree ; Infinite \(\Delta \) ; regular tree
- 刊名:Journal of Combinatorial Optimization
- 出版年:2017
- 出版时间:February 2017
- 年:2017
- 卷:33
- 期:2
- 页码:609-625
- 全文大小:
- 刊物类别:Mathematics and Statistics
- 刊物主题:Combinatorics; Convex and Discrete Geometry; Mathematical Modeling and Industrial Mathematics; Theory of Computation; Optimization; Operation Research/Decision Theory;
- 出版者:Springer US
- ISSN:1573-2886
- 卷排序:33
文摘
In this paper, we introduce a new relaxation of strong edge-coloring. Let G be a graph. For two nonnegative integers s and t, an (s, t)-relaxed strong k-edge-coloring is an assignment of k colors to the edges of G, such that for any edge e, there are at most s edges adjacent to e and t edges which are distance two apart from e assigned the same color as e. The (s, t)-relaxed strong chromatic index, denoted by \({\chi '}_{(s,t)}(G)\), is the minimum number k of an (s, t)-relaxed strong k-edge-coloring admitted by G. This paper studies the (s, t)-relaxed strong edge-coloring of graphs, especially trees. For a tree T, the tight upper bounds for \({\chi '}_{(s,0)}(T)\) and \({\chi '}_{(0,t)}(T)\) are given. And the (1, 1)-relaxed strong chromatic index of an infinite regular tree is determined. Further results on \({\chi '}_{(1,0)}(T)\) are also presented.