Recognizing well-dominated graphs is coNP-complete

Inf. Process. Lett. Pub Date : 2022-08-18 DOI:10.48550/arXiv.2208.08864

A. Agrawal, H. Fernau, P. Kindermann, Kevin Mann, U. Souza

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引用次数: 0

Abstract

A graph $G$ is well-covered if every minimal vertex cover of $G$ is minimum, and a graph $G$ is well-dominated if every minimal dominating set of $G$ is minimum. Studies on well-covered graphs were initiated in [Plummer, JCT 1970], and well-dominated graphs were first introduced in [Finbow, Hartnell and Nowakow, AC 1988]. Well-dominated graphs are well-covered, and both classes have been widely studied in the literature. The recognition of well-covered graphs was proved coNP-complete by [Chv\'atal and Slater, AODM 1993] and by [Sankaranarayana and Stewart, Networks 1992], but the complexity of recognizing well-dominated graphs has been left open since their introduction. We close this complexity gap by proving that recognizing well-dominated graphs is coNP-complete. This solves a well-known open question (c.f. [Levit and Tankus, DM 2017] and [G\"{o}z\"{u}pek, Hujdurovic and Milani\v{c}, DMTCS 2017]), which was first asked in [Caro, Seb\H{o} and Tarsi, JAlg 1996]. Surprisingly, our proof is quite simple, although it was a long-standing open problem. Finally, we show that recognizing well-totally-dominated graphs is coNP-complete, answering a question of [Bahad\ir, Ekim, and G\"oz\"upek, AMC 2021].

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识别良好支配图是conp完备的

如果图$G$的每一个极小顶点覆盖都是最小的，则图$G$是良支配的，如果图$G$的每一个极小支配集都是最小的，则图$G$是良支配的。对完备覆盖图的研究始于[Plummer, JCT 1970]，完备支配图的研究始于[Finbow, Hartnell and Nowakow, AC 1988]。良好支配图被很好地覆盖，这两类都在文献中得到了广泛的研究。[Chv\'atal and Slater, AODM 1993]和[Sankaranarayana and Stewart, Networks 1992]证明了对完全覆盖图的识别，但识别良好支配图的复杂性自引入以来一直是开放的。我们通过证明识别良好支配图是conp完全来缩小这种复杂性差距。这解决了一个众所周知的开放问题(c.f. [Levit and Tankus, DM 2017]和[G\“{o}z\”{u}pek, Hujdurovic and Milani\v{c}， DMTCS 2017])，该问题首次在[Caro, Seb\H{o} and Tarsi, JAlg 1996]中提出。令人惊讶的是，我们的证明非常简单，尽管这是一个长期存在的开放性问题。最后，我们证明了识别完全支配的图是conp完全的，回答了[Bahad\ir, Ekim, and G\“oz\”upek, AMC 2021]的问题。

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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Inf. Process. Lett.

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