Cluster Editing parameterized above modification-disjoint P 3 -packings

IF 0.9 3区 计算机科学 Q3 COMPUTER SCIENCE, THEORY & METHODS
Shaohua Li, Marcin Pilipczuk, Manuel Sorge
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引用次数: 5

Abstract

Given a graph G = ( V , E ) and an integer k , the Cluster Editing problem asks whether we can transform G into a union of vertex-disjoint cliques by at most k modifications (edge deletions or insertions). In this paper, we study the following variant of Cluster Editing . We are given a graph G = ( V , E ), a packing \(\mathcal {H} \) of modification-disjoint induced P 3 s (no pair of P 3 s in \(\mathcal {H} \) share an edge or non-edge) and an integer ℓ. The task is to decide whether G can be transformed into a union of vertex-disjoint cliques by at most \(\ell +|\mathcal {H}| \) modifications (edge deletions or insertions). We show that this problem is NP-hard even when ℓ = 0 (in which case the problem asks to turn G into a disjoint union of cliques by performing exactly one edge deletion or insertion per element of \(\mathcal {H} \) ) and when each vertex is in at most 23 P 3 s of the packing. This answers negatively a question of van Bevern, Froese, and Komusiewicz (CSR 2016, ToCS 2018), repeated by C. Komusiewicz at Shonan meeting no. 144 in March 2019. We then initiate the study to find the largest integer c such that the problem remains tractable when restricting to packings such that each vertex is in at most c packed P 3 s. Here packed P 3 s are those belonging to the packing \(\mathcal {H} \) . Van Bevern et al. showed that the case c = 1 is fixed-parameter tractable with respect to ℓ and we show that the case c = 2 is solvable in | V | 2ℓ + O (1) time.
聚类编辑参数化上述修改-不相交p3 -填料
给定一个图G = (V, E)和一个整数k,聚类编辑问题问我们是否可以通过最多k次修改(边删除或插入)将G转换为顶点不相交的团的并。在本文中,我们研究了以下变体的聚类编辑。我们给出了一个图G = (V, E),一个由修正不相交诱导的p3s(在\(\mathcal {H} \)中没有p3s对共享边或非边)和一个整数r组成的填充\(\mathcal {H} \)。任务是决定G是否可以通过最多\(\ell +|\mathcal {H}| \)修改(边删除或插入)转换为顶点不相交的团的并。我们证明了这个问题是np困难的,即使当r = 0时(在这种情况下,问题要求通过对\(\mathcal {H} \)的每个元素执行一个边删除或插入来将G变成一个不相交的团并),并且当每个顶点最多在23p3的包装中。这否定地回答了van Bevern, Froese和Komusiewicz (CSR 2016, ToCS 2018)的问题,C. Komusiewicz在湘南会议上重复了这个问题。2019年3月为144。然后,我们开始研究寻找最大的整数c,使问题在限制每个顶点最多在c个填充的p3s中时仍然易于处理。这里包装的p3是属于\(\mathcal {H} \)包装的。Van Bevern et al.证明了c = 1的情况是关于r的定参数可处理的,我们证明了c = 2的情况是在| V | 2r + O(1)时间内可解的。
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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来源期刊
ACM Transactions on Algorithms
ACM Transactions on Algorithms COMPUTER SCIENCE, THEORY & METHODS-MATHEMATICS, APPLIED
CiteScore
3.30
自引率
0.00%
发文量
50
审稿时长
6-12 weeks
期刊介绍: ACM Transactions on Algorithms welcomes submissions of original research of the highest quality dealing with algorithms that are inherently discrete and finite, and having mathematical content in a natural way, either in the objective or in the analysis. Most welcome are new algorithms and data structures, new and improved analyses, and complexity results. Specific areas of computation covered by the journal include combinatorial searches and objects; counting; discrete optimization and approximation; randomization and quantum computation; parallel and distributed computation; algorithms for graphs, geometry, arithmetic, number theory, strings; on-line analysis; cryptography; coding; data compression; learning algorithms; methods of algorithmic analysis; discrete algorithms for application areas such as biology, economics, game theory, communication, computer systems and architecture, hardware design, scientific computing
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