论文信息 - Train Tracks and Confluent Drawings

Train Tracks and Confluent Drawings

Confluent graphs capture the connection properties of train tracks, offering a very natural generalization of planar graphs, and—as the example of railroad maps shows—are an important tool in graph visualization. In this paper we continue the study of confluent graphs, introducing strongly confluent graphs and tree-confluent graphs. We show that strongly confluent graphs can be recognized in NP (the complexity of recognizing confluent graphs remains open). We also give a natural elimination ordering characterization of tree-confluent graphs, and we show that this class coincides with the (6,2)-chordal bipartite graphs. Finally, we define outerconfluent graphs and identify the bipartite permutation graphs as a natural subclass.

Michael J. Pelsmajer | Marcus Schaefer | Daniel Stefankovic | Peter Hui

[1] J. Harer,et al. Combinatorics of Train Tracks. , 1991 .

[2] Hans-Jürgen Bandelt,et al. Distance-hereditary graphs , 1986, J. Comb. Theory B.

[3] A. Brandstädt,et al. Graph Classes: A Survey , 1987 .

[4] J. A. Bondy,et al. Graph Theory with Applications , 1978 .

[5] Jeremy P. Spinrad,et al. Bipartite permutation graphs , 1987, Discret. Appl. Math..

[6] J. A. Bondy,et al. Graph Theory with Applications , 1978 .

[7] Martin Charles Golumbic,et al. Perfect Elimination and Chordal Bipartite Graphs , 1978, J. Graph Theory.

[8] David S. Johnson,et al. Crossing Number is NP-Complete , 1983 .

[9] David Eppstein,et al. Delta-Confluent Drawings , 2005, Graph Drawing.

[10] Robert C. Penner,et al. Combinatorics of Train Tracks. (AM-125), Volume 125 , 1992 .

[11] Marcus Schaefer,et al. Recognizing string graphs in NP , 2003, J. Comput. Syst. Sci..