Contracting Bipartite Graphs to Paths and Cycles

Dabrowski, K.K.; Paulusma, D.

doi:10.1016/j.ipl.2017.06.013

Contracting Bipartite Graphs to Paths and Cycles

Dabrowski, K.K.; Paulusma, D.

Authors

K.K. Dabrowski

Professor Daniel Paulusma daniel.paulusma@durham.ac.uk
Professor

Abstract

Testing if a given graph G contains the k -vertex path Pk as a minor or as an induced minor is trivial for every fixed integer k≥1. However, the situation changes for the problem of checking if a graph can be modified into Pk by using only edge contractions. In this case the problem is known to be NP-complete even if k=4. This led to an intensive investigation for testing contractibility on restricted graph classes. We focus on bipartite graphs. Heggernes, van 't Hof, Lévêque and Paul proved that the problem stays NP-complete for bipartite graphs if k=6. We strengthen their result from k=6 to k=5. We also show that the problem of contracting a bipartite graph to the 6-vertex cycle C6 is NP-complete. The cyclicity of a graph is the length of the longest cycle the graph can be contracted to. As a consequence of our second result, determining the cyclicity of a bipartite graph is NP-hard.

Citation

Dabrowski, K., & Paulusma, D. (2017). Contracting Bipartite Graphs to Paths and Cycles. Information Processing Letters, 127, 37-42. https://doi.org/10.1016/j.ipl.2017.06.013

Journal Article Type	Article
Acceptance Date	Jun 29, 2017
Online Publication Date	Jul 5, 2017
Publication Date	Nov 1, 2017
Deposit Date	Jun 30, 2017
Publicly Available Date	Jun 30, 2017
Journal	Information Processing Letters
Print ISSN	0020-0190
Electronic ISSN	1872-6119
Publisher	Elsevier
Peer Reviewed	Peer Reviewed
Volume	127
Pages	37-42
DOI	https://doi.org/10.1016/j.ipl.2017.06.013
Public URL	https://durham-repository.worktribe.com/output/1384022

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