List Total Colorings of Planar Graphs without Triangles at Small Distance

List Total Colorings of Planar Graphs without Triangles at Small Distance

Suppose that G is a planar graph with maximum degree △. In this paper it is proved that G is total-(△ + 2)-choosable if (1) △ ≥ 7 and G has no adjacent triangles (i.e., no two triangles are incident with a common edge); or (2) △ ≥6 and G has no intersecting triangles (i.e., no two triangles are inci...

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Veröffentlicht in:Acta mathematica Sinica. English series 2011-12, Vol.27 (12), p.2437-2444
Hauptverfasser: Liu, Bin, Hou, Jian Feng, Liu, Gui Zhen
Format: Artikel
Sprache:eng
Schlagworte:
Coloring
Graph coloring
Graph theory
Graphs
Integers
Lists
Mathematical analysis
Mathematics
Mathematics and Statistics
Studies
Triangles
三角形
不相交
事件
全染色
名单
平面图形
距离
顶点
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Beschreibung
Zusammenfassung:Suppose that G is a planar graph with maximum degree △. In this paper it is proved that G is total-(△ + 2)-choosable if (1) △ ≥ 7 and G has no adjacent triangles (i.e., no two triangles are incident with a common edge); or (2) △ ≥6 and G has no intersecting triangles (i.e., no two triangles are incident with a common vertex); or (3) △ ≥ 5, G has no adjacent triangles and G has no k-cycles for some integer k ∈ {5, 6}.
ISSN:1439-8516
1439-7617
DOI:10.1007/s10114-011-9154-3