On BMRN*-colouring of planar digraphs

Discret. Math. Theor. Comput. Sci. Pub Date : 2021-02-25 DOI:10.46298/dmtcs.5798

Julien Bensmail, Foivos Fioravantes

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Abstract

International audience In a recent work, Bensmail, Blanc, Cohen, Havet and Rocha, motivated by applications for TDMA scheduling problems, have introduced the notion of BMRN*-colouring of digraphs, which is a type of arc-colouring with particular colouring constraints. In particular, they gave a special focus to planar digraphs. They notably proved that every planar digraph can be 8-BMRN*-coloured, while there exist planar digraphs for which 7 colours are needed in a BMRN*-colouring. They also proved that the problem of deciding whether a planar digraph can be 3-BMRN*-coloured is NP-hard. In this work, we pursue these investigations on planar digraphs, in particular by answering some of the questions left open by the authors in that seminal work. We exhibit planar digraphs needing 8 colours to be BMRN*-coloured, thus showing that the upper bound of Bensmail, Blanc, Cohen, Havet and Rocha cannot be decreased in general. We also generalize their complexity result by showing that the problem of deciding whether a planar digraph can be k-BMRN*-coloured is NP-hard for every k ∈ {3,...,6}. Finally, we investigate the connection between the girth of a planar digraphs and the least number of colours in its BMRN*-colourings.

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平面有向图的BMRN*-着色

在最近的工作中，Bensmail, Blanc, Cohen, Havet和Rocha受到TDMA调度问题应用的启发，引入了有向图的BMRN*-着色的概念，这是一种具有特定着色约束的arc-着色。他们特别关注平面有向图。他们特别证明了每个平面有向图都可以是8-BMRN*着色的，而存在一个平面有向图在BMRN*着色时需要7种颜色。他们还证明了决定一个平面有向图是否可以是3-BMRN*色的问题是np困难的。在这项工作中，我们继续对平面有向图进行这些调查，特别是通过回答作者在那项开创性工作中留下的一些问题。我们展示了需要8种颜色才能被BMRN*着色的平面有向图，从而表明Bensmail, Blanc, Cohen, Havet和Rocha的上界一般不能降低。我们还推广了它们的复杂度结果，证明了判定一个平面有向图是否可以是k- bmrn *色的问题对于每一个k∈{3，…，6}都是np困难的。最后，我们研究了平面有向图的周长与其BMRN*-着色中最小颜色数之间的关系。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Discret. Math. Theor. Comput. Sci.

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