Circular convex bipartite graphs: Feedback vertex set

Zhao Lu; Min Lu; Tian Liu; Ke Xu

doi:10.1007/978-3-319-03780-6_24

Circular convex bipartite graphs: Feedback vertex set

Zhao Lu
, Min Lu
, Tian Liu^*
, Ke Xu

^*此作品的通讯作者

计算机学院

Peking University

科研成果: 书/报告/会议事项章节 › 会议稿件 › 同行评审

4 引用（Scopus）

摘要

A feedback vertex set is a subset of vertices, such that the removal of this subset renders the remaining graph cycle-free. The weight of a feedback vertex set is the sum of weights of its vertices. Finding a minimum weighted feedback vertex set is tractable for convex bipartite graphs, but NP-complete even for unweighted bipartite graphs. In a circular convex (convex, respectively) bipartite graph, there is a circular (linear, respectively) ordering defined on one class of vertices, such that for every vertex in another class, the neighborhood of this vertex is a circular arc (an interval, respectively). The minimum weighted feedback vertex set problem is shown tractable for circular convex bipartite graphs in this paper, by making a Cook reduction (i.e. polynomial time Turing reduction) for this problem from circular convex bipartite graphs to convex bipartite graphs.

源语言	英语
主期刊名	Combinatorial Optimization and Applications - 7th International Conference, COCOA 2013, Proceedings
页	272-283
页数	12
DOI	https://doi.org/10.1007/978-3-319-03780-6_24
出版状态	已出版 - 2013
活动	7th International Conference on Combinatorial Optimization and Applications, COCOA 2013 - Chengdu, 中国期限: 12 12月 2013 → 14 12月 2013

出版系列

姓名	Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
卷	8287 LNCS
ISSN（印刷版）	0302-9743
ISSN（电子版）	1611-3349

会议

会议	7th International Conference on Combinatorial Optimization and Applications, COCOA 2013
国家/地区	中国
市	Chengdu
时期	12/12/13 → 14/12/13

访问文件

10.1007/978-3-319-03780-6_24

其它文件与链接

链接到 Scopus 的出版物

引用此

Lu, Z., Lu, M., Liu, T., & Xu, K. (2013). Circular convex bipartite graphs: Feedback vertex set. 在 Combinatorial Optimization and Applications - 7th International Conference, COCOA 2013, Proceedings (页码 272-283). (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics); 卷 8287 LNCS). https://doi.org/10.1007/978-3-319-03780-6_24

@inproceedings{c1afd81324d04abe9e6a858cb03dcf7b,

title = "Circular convex bipartite graphs: Feedback vertex set",

abstract = "A feedback vertex set is a subset of vertices, such that the removal of this subset renders the remaining graph cycle-free. The weight of a feedback vertex set is the sum of weights of its vertices. Finding a minimum weighted feedback vertex set is tractable for convex bipartite graphs, but NP-complete even for unweighted bipartite graphs. In a circular convex (convex, respectively) bipartite graph, there is a circular (linear, respectively) ordering defined on one class of vertices, such that for every vertex in another class, the neighborhood of this vertex is a circular arc (an interval, respectively). The minimum weighted feedback vertex set problem is shown tractable for circular convex bipartite graphs in this paper, by making a Cook reduction (i.e. polynomial time Turing reduction) for this problem from circular convex bipartite graphs to convex bipartite graphs.",

keywords = "Circular convex bipartite graph, Convex bipartite graph, Cook reduction, Feedback vertex set, Tractability",

author = "Zhao Lu and Min Lu and Tian Liu and Ke Xu",

year = "2013",

doi = "10.1007/978-3-319-03780-6\_24",

language = "英语",

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note = "7th International Conference on Combinatorial Optimization and Applications, COCOA 2013 ; Conference date: 12-12-2013 Through 14-12-2013",

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Lu, Z, Lu, M, Liu, T & Xu, K 2013, Circular convex bipartite graphs: Feedback vertex set. 在 Combinatorial Optimization and Applications - 7th International Conference, COCOA 2013, Proceedings. Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics), 卷 8287 LNCS, 页码 272-283, 7th International Conference on Combinatorial Optimization and Applications, COCOA 2013, Chengdu, 中国, 12/12/13. https://doi.org/10.1007/978-3-319-03780-6_24

Circular convex bipartite graphs: Feedback vertex set. / Lu, Zhao; Lu, Min; Liu, Tian 等.
Combinatorial Optimization and Applications - 7th International Conference, COCOA 2013, Proceedings. 2013. 页码 272-283 (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics); 卷 8287 LNCS).

科研成果: 书/报告/会议事项章节 › 会议稿件 › 同行评审

TY - GEN

T1 - Circular convex bipartite graphs

T2 - 7th International Conference on Combinatorial Optimization and Applications, COCOA 2013

AU - Lu, Zhao

AU - Lu, Min

AU - Liu, Tian

AU - Xu, Ke

PY - 2013

Y1 - 2013

N2 - A feedback vertex set is a subset of vertices, such that the removal of this subset renders the remaining graph cycle-free. The weight of a feedback vertex set is the sum of weights of its vertices. Finding a minimum weighted feedback vertex set is tractable for convex bipartite graphs, but NP-complete even for unweighted bipartite graphs. In a circular convex (convex, respectively) bipartite graph, there is a circular (linear, respectively) ordering defined on one class of vertices, such that for every vertex in another class, the neighborhood of this vertex is a circular arc (an interval, respectively). The minimum weighted feedback vertex set problem is shown tractable for circular convex bipartite graphs in this paper, by making a Cook reduction (i.e. polynomial time Turing reduction) for this problem from circular convex bipartite graphs to convex bipartite graphs.

AB - A feedback vertex set is a subset of vertices, such that the removal of this subset renders the remaining graph cycle-free. The weight of a feedback vertex set is the sum of weights of its vertices. Finding a minimum weighted feedback vertex set is tractable for convex bipartite graphs, but NP-complete even for unweighted bipartite graphs. In a circular convex (convex, respectively) bipartite graph, there is a circular (linear, respectively) ordering defined on one class of vertices, such that for every vertex in another class, the neighborhood of this vertex is a circular arc (an interval, respectively). The minimum weighted feedback vertex set problem is shown tractable for circular convex bipartite graphs in this paper, by making a Cook reduction (i.e. polynomial time Turing reduction) for this problem from circular convex bipartite graphs to convex bipartite graphs.

KW - Circular convex bipartite graph

KW - Convex bipartite graph

KW - Cook reduction

KW - Feedback vertex set

KW - Tractability

UR - https://www.scopus.com/pages/publications/84893049788

U2 - 10.1007/978-3-319-03780-6_24

DO - 10.1007/978-3-319-03780-6_24

M3 - 会议稿件

AN - SCOPUS:84893049788

SN - 9783319037790

T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)

SP - 272

EP - 283

BT - Combinatorial Optimization and Applications - 7th International Conference, COCOA 2013, Proceedings

Y2 - 12 December 2013 through 14 December 2013

ER -

Lu Z, Lu M, Liu T, Xu K. Circular convex bipartite graphs: Feedback vertex set. 在 Combinatorial Optimization and Applications - 7th International Conference, COCOA 2013, Proceedings. 2013. 页码 272-283. (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)). doi: 10.1007/978-3-319-03780-6_24

Circular convex bipartite graphs: Feedback vertex set

摘要

出版系列

会议

访问文件

其它文件与链接

指纹

引用此