Tree independence number I. (Even hole, diamond, pyramid)-free graphs

Pub Date : 2024-04-24 DOI:10.1002/jgt.23104

Tara Abrishami, Bogdan Alecu, Maria Chudnovsky, Sepehr Hajebi, Sophie Spirkl, Kristina Vušković

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Abstract

The tree-independence number $tree- α$ , first defined and studied by Dallard, Milanič, and Štorgel, is a variant of treewidth tailored to solving the maximum independent set problem. Over a series of papers, Abrishami et al. developed the so-called central bag method to study induced obstructions to bounded treewidth. Among others, they showed that, in a certain superclass $C$ of (even hole, diamond, pyramid)-free graphs, treewidth is bounded by a function of the clique number. In this paper, we relax the bounded clique number assumption, and show that $C$ has bounded $tree- α$ . Via existing results, this yields a polynomial-time algorithm for the Maximum Weight Independent Set problem in this class. Our result also corroborates, for this class of graphs, a conjecture of Dallard, Milanič, and Štorgel that in a hereditary graph class, $tree- α$ is bounded if and only if the treewidth is bounded by a function of the clique number.

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树独立性编号 I. 无（偶数孔、菱形、金字塔）图形

树独立数（tree-independence number）最早由达拉德（Dallard）、米拉尼奇（Milanič）和斯托格尔（Štorgel）定义和研究，是树宽的一种变体，专门用于解决最大独立集问题。在一系列论文中，阿布里萨米等人提出了所谓的中心袋法，用于研究有界树宽的诱导障碍。其中，他们证明了在（偶数洞、菱形、金字塔）无簇图的某一超类中，树宽受簇数函数的约束。在本文中，我们放宽了有界小群数假设，并证明有界.通过已有的结果，我们得到了该类图中最大权重独立集问题的多项式时间算法。我们的结果还证实了 Dallard、Milanič 和 Štorgel 对该类图的猜想，即在遗传图类中，当且仅当树宽受有界小群数的函数约束时，树宽才是有界的。

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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