Classes of intersection digraphs with good algorithmic properties

Pub Date : 2023-12-18 DOI:10.1002/jgt.23065
Lars Jaffke, O-joung Kwon, Jan Arne Telle
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Abstract

While intersection graphs play a central role in the algorithmic analysis of hard problems on undirected graphs, the role of intersection digraphs in algorithms is much less understood. We present several contributions towards a better understanding of the algorithmic treatment of intersection digraphs. First, we introduce natural classes of intersection digraphs that generalize several classes studied in the literature. Second, we define the directed locally checkable vertex (DLCV) problems, which capture many well-studied problems on digraphs, such as  (Independent) Dominating SetKernel, and H $H$ -Homomorphism. Third, we give a new width measure of digraphs, bi-mim-width, and show that the DLCV problems are polynomial-time solvable when we are provided a decomposition of small bi-mim-width. Fourth, we show that several classes of intersection digraphs have bounded bi-mim-width, implying that we can solve all DLCV problems on these classes in polynomial time given an intersection representation of the input digraph. We identify reflexivity as a useful condition to obtain intersection digraph classes of bounded bi-mim-width, and therefore to obtain positive algorithmic results.

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具有良好算法特性的交点图类
虽然交集图在无向图难题的算法分析中发挥着核心作用,但人们对交集数图在算法中的作用却知之甚少。为了更好地理解交点图的算法处理,我们提出了几项贡献。首先,我们介绍了交点图的自然类,它们概括了文献中研究的几类交点图。其次,我们定义了有向局部可检查顶点(DLCV)问题,它捕捉了许多已被充分研究的数图问题,如(独立)占优集、核和 H$H$ 同构。第三,我们给出了一种新的数图宽度度量--bi-mim-width,并证明当我们得到一个小的 bi-mim-width 分解时,DLCV 问题是多项式时间可解的。第四,我们证明了几类交集数字图具有有界的 bi-mim-width,这意味着只要给定输入数字图的交集表示,我们就能在多项式时间内解决这几类数字图上的所有 DLCV 问题。我们发现,反身性是获得有界双米宽的交集数字图类的有用条件,因此也是获得积极算法结果的有用条件。
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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