Bar 1-Visibility Graphs and their relation to other Nearly Planar Graphs
DOI:
https://doi.org/10.7155/jgaa.00343Abstract
A graph is called a strong (resp. weak) bar 1-visibility graph if its vertices can be represented as horizontal segments (bars) in the plane so that its edges are all (resp. a subset of) the pairs of vertices whose bars have a ε-thick vertical line connecting them that intersects at most one other bar. We explore the relation among weak (resp. strong) bar 1-visibility graphs and other nearly planar graph classes. In particular, we study their relation to 1-planar graphs, which have a drawing with at most one crossing per edge; quasi-planar graphs, which have a drawing with no three mutually crossing edges; and the squares of planar 1-flow networks, which are upward digraphs with in- or out-degree at most one. Our main results are that 1-planar graphs and the (undirected) squares of planar 1-flow networks are weak bar 1-visibility graphs and that these are quasi-planar graphs.Downloads
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Published
2014-12-01
How to Cite
Evans, W., Kaufmann, M., Lenhart, W., Mchedlidze, T., & Wismath, S. (2014). Bar 1-Visibility Graphs and their relation to other Nearly Planar Graphs
. Journal of Graph Algorithms and Applications, 18(5), 721–739. https://doi.org/10.7155/jgaa.00343
License
Copyright (c) 2014 William Evans, Michael Kaufmann, William Lenhart, Tamara Mchedlidze, Stephen Wismath
This work is licensed under a Creative Commons Attribution 4.0 International License.
