Parameterized Complexity of 1-Planarity

A. Grigoriev; D. Fernandez-Baca; F.J. Brandenburg; G. Ringel; G.L. Miller; H. Schumacher; J. Chen; J. Czap; J. Guo; J. Nešetřil; J. Pach; P. Damaschke; P. Eades; P. Eades; S.-H. Hong; S.B. Seidman; T. Akutsu; V.P. Korzhik; V.P. Korzhik; Y. Gurevich; Y. Suzuki; Z.-Z. Chen

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Parameterized Complexity of 1-Planarity

Authors: A. Grigoriev
D. Fernandez-Baca
F.J. Brandenburg
G. Ringel
G.L. Miller
H. Schumacher
J. Chen
J. Czap
J. Guo
J. Nešetřil
J. Pach
P. Damaschke
P. Eades
P. Eades
S.-H. Hong
S.B. Seidman
T. Akutsu
V.P. Korzhik
V.P. Korzhik
Y. Gurevich
Y. Suzuki
Z.-Z. Chen
Publication date: 1 January 2013
Publisher: 'Journal of Graph Algorithms and Applications'
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Abstract

We consider the problem of finding a 1-planar drawing for a general graph, where a 1-planar drawing is a drawing in which each edge participates in at most one crossing. Since this problem is known to be NP-hard we investigate the parameterized complexity of the problem with respect to the vertex cover number, tree-depth, and cyclomatic number. For these parameters we construct fixed-parameter tractable algorithms. However, the problem remains NP-complete for graphs of bounded bandwidth, pathwidth, or treewidth.Comment: WADS 201

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