Semi-strict Chordality of Digraphs

Pub Date : 2024-04-17 DOI:10.1007/s00373-024-02778-5
Jing Huang, Ying Ying Ye
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Abstract

Chordal graphs are important in structural graph theory. Chordal digraphs are a digraph analogue of chordal graphs and have been a subject of active studies recently. Unlike chordal graphs, chordal digraphs lack many structural properties such as forbidden subdigraph or representation characterizations. In this paper we introduce the notion of semi-strict chordal digraphs which form a class strictly between chordal digraphs and chordal graphs. Semi-strict chordal digraphs have rich structural properties. We characterize semi-strict chordal digraphs in terms of knotting graphs, a notion analogous to the one introduced by Gallai for the study of comparability graphs. We also give forbidden subdigraph characterizations of semi-strict chordal digraphs within the classes of locally semicomplete digraphs and weakly quasi-transitive digraphs.

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数形的半严格弦性
弦图在结构图理论中非常重要。和弦数图是和弦图的数图类似物,是近来活跃的研究课题。与和弦图不同,和弦数图缺乏许多结构特性,如禁止子图或表示特性。在本文中,我们引入了半严格和弦数图的概念,它是严格介于和弦数图和和弦图之间的一类图。半严格和弦数图具有丰富的结构特性。我们用打结图来描述半严格和弦数图的特征,这一概念类似于加莱在研究可比性图时引入的概念。我们还给出了半严格和弦图在局部半完整图类和弱准传递图类中的禁止子图特征。
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