在色度约束下的边色图分解

Combinatorics, Probability and Computing Pub Date : 2019-03-01 DOI:10.1017/S0963548319000014

S. Fujita, Ruonan Li, Guanghui Wang

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引用次数: 5

摘要

摘要对于边色图G, G的最小色度是指与G的每个顶点相关的边上颜色的最小数目。我们证明了如果G是一个最小色度至少为5的边色图，那么V(G)可以被分割成两部分，使得每一部分都能引出一个最小色度至少为2的子图。我们通过证明更强的形式来证明这个定理。此外，我们还指出了我们的定理与有向图中的Bermond和Thomassen猜想之间的重要关系。

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Decomposing edge-coloured graphs under colour degree constraints

Abstract For an edge-coloured graph G, the minimum colour degree of G means the minimum number of colours on edges which are incident to each vertex of G. We prove that if G is an edge-coloured graph with minimum colour degree at least 5, then V(G) can be partitioned into two parts such that each part induces a subgraph with minimum colour degree at least 2. We show this theorem by proving amuch stronger form. Moreover, we point out an important relationship between our theorem and Bermond and Thomassen’s conjecture in digraphs.

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Combinatorics, Probability and Computing

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