论文信息 - Further Results on Bar k-Visibility Graphs

Further Results on Bar k-Visibility Graphs

A bar visibility representation of a graph $G$ is a collection of horizontal bars in the plane corresponding to the vertices of $G$ such that two vertices are adjacent if and only if the corresponding bars can be joined by an unobstructed vertical line segment. In a bar $k$-visibility graph, two vertices are adjacent if and only if the corresponding bars can be joined by a vertical line segment that intersects at most $k$ other bars. Bar $k$-visibility graphs were introduced by Dean et al. [J. Graph Algorithms Appl., 11 (2007), pp. 45-59]. In this paper, we present sharp upper bounds on the maximum number of edges in a bar $k$-visibility graph on $n$ vertices and the largest order of a complete bar $k$-visibility graph. We also discuss regular bar $k$-visibility graphs and forbidden induced subgraphs of bar $k$-visibility graphs.

Stephen G. Hartke | Jennifer Vandenbussche | Paul S. Wenger

[1] Ellen Gethner,et al. Bar k-Visibility Graphs , 2007, J. Graph Algorithms Appl..

[2] Stefan Felsner,et al. Thickness of Bar 1-Visibility Graphs , 2006, Graph Drawing.

[3] Franco P. Preparata. Advances in computing research , 1988 .

[4] Chak-Kuen Wong,et al. A note on visibility graphs , 1987, Discret. Math..

[5] Ellen Gethner,et al. Bar k-Visibility Graphs: Bounds on the Number of Edges, Chromatic Number, and Thickness , 2005, GD.

[6] Thomas Andreae. Some Results on Visibility Graphs , 1992, Discret. Appl. Math..

[7] Stephen K. Wismath,et al. Characterizing bar line-of-sight graphs , 1985, SCG '85.

[8] Michael S. Jacobson,et al. The Bar Visibility Number of a Graph , 2004, SIAM J. Discret. Math..

[9] C. Lekkeikerker,et al. Representation of a finite graph by a set of intervals on the real line , 1962 .

[10] Roberto Tamassia,et al. A unified approach to visibility representations of planar graphs , 1986, Discret. Comput. Geom..

[11] Fabrizio Luccio,et al. A Visibility Problem in VLSI Layout Compaction , 1984 .