论文信息 - Chromaticity of series-parallel graphs

Chromaticity of series-parallel graphs

Abstract By applying a sequence of edge-gluings on a set of cycles each of length k , we obtain a special series-parallel graph. The well-known k -gon tree theorem (see [1,10]) states that these graphs form a ξ-equivalence class. Many of the other known classes of ξ-unique graphs and ξ-equivalence classes are also special cases of series-parallel graphs. This paper introduces some new chromatic invariants for this class of graphs. We illustrate the usefulness of these invariants by constructing several new ξ-equivalence classes which include edge-gluings of graphs in a special class of series-parallel graphs. The latter result parallels that of the k -gon tree theorem.

Chung-Piaw Teo | K. M. Koh

[1] R. Duffin. Topology of series-parallel networks , 1965 .

[2] Douglas R. Woodall,et al. Chromatic polynomials, polygon trees, and outerplanar graphs , 1992, J. Graph Theory.

[3] Beatrice Loerinc. Chromatic uniqueness of the generalized θ-graph , 1978, Discret. Math..

[4] Chong-Yun Chao,et al. On trees of polygons , 1985 .

[5] Earl Glen Whitehead. Chromatic polynomials of generalized trees , 1988, Discret. Math..

[6] G. Dirac. A Property of 4-Chromatic Graphs and some Remarks on Critical Graphs , 1952 .

[7] Chong-Yun Chao,et al. On chromatic equivalence of graphs , 1978 .

[8] Shaoji Xu. Classes of chromatically equivalent graphs and polygon trees , 1994, Discret. Math..

[9] Shaoji Xu,et al. The chromaticity of s-bridge graphs and related graphs , 1994, Discret. Math..

[10] Kee L. Teo,et al. The search for chromatically unique graphs , 1990, Graphs Comb..

[11] L. Beineke,et al. Selected Topics in Graph Theory 2 , 1985 .