三临界有符号图形的密度

Pub Date : 2024-05-12 DOI:10.1002/jgt.23117

Laurent Beaudou, Penny Haxell, Kathryn Nurse, Sagnik Sen, Zhouningxin Wang

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引用次数: 0

摘要

如果一个有符号图不是可着色的，但它的每一个适当子图都是可着色的，我们就说这个图是-临界的。利用 Naserasr、Wang 和 Zhu 所提出的可着色性定义扩展了圆形可着色性的概念，我们证明了每个顶点上的三临界有符号图都至少有边，而且这个约束是渐近紧密的。由此可见，每个周长至少为 6 的有符号平面图或投影平面图都是（循环）3-可着色的，而且对于投影平面图来说，这个周长条件是最好的。为了证明我们的主要结果，我们用有符号图的同态存在来重新表述，有符号图是在每个顶点上都有一个负循环的正三角形。

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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Density of 3-critical signed graphs

We say that a signed graph is $k$ -critical if it is not $k$ -colorable but every one of its proper subgraphs is $k$ -colorable. Using the definition of colorability due to Naserasr, Wang, and Zhu that extends the notion of circular colorability, we prove that every 3-critical signed graph on $n$ vertices has at least $\frac{3 n - 1}{2}$ edges, and that this bound is asymptotically tight. It follows that every signed planar or projective-planar graph of girth at least 6 is (circular) 3-colorable, and for the projective-planar case, this girth condition is best possible. To prove our main result, we reformulate it in terms of the existence of a homomorphism to the signed graph $C_{3}^{*}$ , which is the positive triangle augmented with a negative loop on each vertex.

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