论文信息 - The harmonious chromatic number of a complete binary and trinary tree

The harmonious chromatic number of a complete binary and trinary tree

Abstract The harmonious chromatic number of a graph G , denoted by h ( G ), is the least number of colors which can be assigned to the vertices of G such that adjacent vertices are colored differently and any two distinct edges have different color pairs. This is a slight variation of a definition given independently by Hopcroft and Krishnamoorthy and by Frank, Harary, and Plantholt. D. Johnson has shown that determining h ( G ) is an NP-complete problem. In this paper we improve Mitchem's results on the harmonious chromatic number of a complete binary tree and discuss the same problem for a complete trinary tree.

Zhikang Lu

[1] John Mitchem,et al. An upper bound for the harmonious chromatic number of a graph , 1987, J. Graph Theory.

[2] Zhikang Lu. On an upper bound for the harmonious chromatic number of a graph , 1991, J. Graph Theory.

[3] Norman L. Biggs,et al. The growth rate of the harmonious chromatic number , 1989, J. Graph Theory.

[4] John Mitchem. On the harmonious chromatic number of a graph , 1989, Discret. Math..

[5] Dan Pritikin,et al. The harmonious coloring number of a graph , 1991, Discret. Math..

[6] John E. Hopcroft,et al. On the Harmonious Coloring of Graphs , 1983 .