论文信息 - Wagner's Theorem on Realizers

Wagner's Theorem on Realizers

A realizer of a maximal plane graph is a set of three particular spanning trees. It has been used in several graph algorithms and particularly in graph drawing algorithms. We propose colored flips on realizers to generalize Wagner's theorem on maximal planar graphs to realizers. From this result, it is proved that ?0 + ?1 + ?2 - ? = ni is the number of inner nodes in the tree Ti, ? is the number of three colored faces in the realizer and n is the number of vertices. As an application of this formula, we show that orderly spanning trees with at most ? 2n+1-?/3 ? leaves can be computed in linear time.

Nicolas Bonichon | Bertrand Le Saëc | Mohamed Mosbah

[1] K. Wagner. Bemerkungen zum Vierfarbenproblem. , 1936 .

[2] Shalom Eliahou,et al. Signed Diagonal Flips and the Four Color Theorem , 1999, Eur. J. Comb..

[3] A. K. Dewdney,et al. Wagner's theorem for Torus graphs , 1973, Discret. Math..

[4] SYLVAIN GRAVIER,et al. Flips Signés et Triangulations d'un Polygone , 2002, Eur. J. Comb..

[5] W. Schnyder. Planar graphs and poset dimension , 1989 .

[6] Xin He,et al. Compact Encodings of Planar Graphs via Canonical Orderings and Multiple Parentheses , 1998, ICALP.

[7] Walter Schnyder,et al. Embedding planar graphs on the grid , 1990, SODA '90.

[8] János Pach,et al. How to draw a planar graph on a grid , 1990, Comb..

[9] Sylvain Gravier,et al. Three Moves on Signed Surface Triangulations , 2002, J. Comb. Theory, Ser. B.

[10] Yi-Ting Chiang,et al. Orderly spanning trees with applications to graph encoding and graph drawing , 2001, SODA '01.

[11] Robert E. Tarjan,et al. Rectilinear planar layouts and bipolar orientations of planar graphs , 1986, Discret. Comput. Geom..