论文信息 - On Embedding a Cycle in a Plane Graph

On Embedding a Cycle in a Plane Graph

Consider a planar drawing ${\it \Gamma}$of a planar graph G such that the vertices are drawn as small circles and the edges are drawn as thin strips. Consider a cycle c of G. Is it possible to draw c as a non-intersecting closed curve inside ${\it \Gamma}$, following the circles that correspond in ${\it \Gamma}$to the vertices of c and the strips that connect them? We show that this test can be done in polynomial time and study this problem in the framework of clustered planarity for highly non-connected clustered graphs.

Giuseppe Di Battista | Maurizio Patrignani | Maurizio Pizzonia | Pier Francesco Cortese

[1] Dorothea Wagner,et al. Completely Connected Clustered Graphs , 2003, WG.

[2] Robert F. Cohen,et al. How to Draw a Planar Clustered Graph , 1995, COCOON.

[3] Elias Dahlhaus,et al. A Linear Time Algorithm to Recognize Clustered Graphs and Its Parallelization , 1998, LATIN.

[4] Michael Jünger,et al. Advances in C-Planarity Testing of Clustered Graphs , 2002, Graph Drawing.

[5] Shimon Even,et al. Graph Algorithms , 1979 .

[6] Therese C. Biedl. Drawing planar partitions I: LL-drawings and LH-drawings , 1998, SCG '98.

[7] Michael Kaufmann,et al. Drawing Planar Partitions II: HH-Drawings , 1998, WG.

[8] Thomas Lengauer,et al. Hierarchical planarity testing algorithms , 1989, JACM.

[9] Robert F. Cohen,et al. Planarity for Clustered Graphs , 1995, ESA.

[10] Giuseppe Di Battista,et al. Clustered planarity , 2005, Symposium on Computational Geometry.

[11] Giuseppe Di Battista,et al. Clustering Cycles into Cycles of Clusters , 2005, J. Graph Algorithms Appl..

[12] Michael T. Goodrich,et al. C-Planarity of Extrovert Clustered Graphs , 2005, Graph Drawing.

[13] Walter Didimo,et al. Planarization of Clustered Graphs , 2001, Graph Drawing.