Vertex-coloring edge-weightings of graphs

Gerard J. Chang; Changhong Lu; Jiaojiao Wu; Qinglin Yu

doi:10.11650/twjm/1500406380

Vertex-coloring edge-weightings of graphs

Gerard J. Chang
, Changhong Lu
, Jiaojiao Wu
, Qinglin Yu

数学科学学院

National Taiwan University
National Tsing Hua University
Thompson Rivers University

科研成果: 期刊稿件 › 文章 › 同行评审

41 引用（Scopus）

摘要

A k-edge-weighting of a graph G is a mapping w: E(G) → {1, 2, . . ., k}. An edge-weightingw induces a vertex coloring f_w: V (G)→ N defined by f_w(v) = ∑_v∈e w(e). An edge-weighting w is vertex-coloring if f_w(u) ≠ f_w(v) for any edge uv. The current paper studies the parameter μ(G), which is the minimum k for which G has a vertex-coloring k-edgeweighting. Exact values of μ(G) are determined for several classes of graphs, including trees and r-regular bipartite graph with r ≥ 3.

源语言	英语
页（从-至）	1807-1813
页数	7
期刊	Taiwanese Journal of Mathematics
卷	15
期	4
DOI	https://doi.org/10.11650/twjm/1500406380
出版状态	已出版 - 8月 2011

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title = "Vertex-coloring edge-weightings of graphs",

abstract = "A k-edge-weighting of a graph G is a mapping w: E(G) → \{1, 2, . . ., k\}. An edge-weightingw induces a vertex coloring fw: V (G)→ N defined by fw(v) = ∑v∈e w(e). An edge-weighting w is vertex-coloring if fw(u) ≠ fw(v) for any edge uv. The current paper studies the parameter μ(G), which is the minimum k for which G has a vertex-coloring k-edgeweighting. Exact values of μ(G) are determined for several classes of graphs, including trees and r-regular bipartite graph with r ≥ 3.",

keywords = "Bipartite graph, Edge-weighting, Tree, Vertex-coloring",

author = "Chang, \{Gerard J.\} and Changhong Lu and Jiaojiao Wu and Qinglin Yu",

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AU - Chang, Gerard J.

AU - Lu, Changhong

AU - Wu, Jiaojiao

AU - Yu, Qinglin

PY - 2011/8

Y1 - 2011/8

N2 - A k-edge-weighting of a graph G is a mapping w: E(G) → {1, 2, . . ., k}. An edge-weightingw induces a vertex coloring fw: V (G)→ N defined by fw(v) = ∑v∈e w(e). An edge-weighting w is vertex-coloring if fw(u) ≠ fw(v) for any edge uv. The current paper studies the parameter μ(G), which is the minimum k for which G has a vertex-coloring k-edgeweighting. Exact values of μ(G) are determined for several classes of graphs, including trees and r-regular bipartite graph with r ≥ 3.

AB - A k-edge-weighting of a graph G is a mapping w: E(G) → {1, 2, . . ., k}. An edge-weightingw induces a vertex coloring fw: V (G)→ N defined by fw(v) = ∑v∈e w(e). An edge-weighting w is vertex-coloring if fw(u) ≠ fw(v) for any edge uv. The current paper studies the parameter μ(G), which is the minimum k for which G has a vertex-coloring k-edgeweighting. Exact values of μ(G) are determined for several classes of graphs, including trees and r-regular bipartite graph with r ≥ 3.

KW - Bipartite graph

KW - Edge-weighting

KW - Tree

KW - Vertex-coloring

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DO - 10.11650/twjm/1500406380

M3 - 文章

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SN - 1027-5487

VL - 15

SP - 1807

EP - 1813

JO - Taiwanese Journal of Mathematics

JF - Taiwanese Journal of Mathematics

IS - 4

ER -

Vertex-coloring edge-weightings of graphs

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