论文信息 - Coloring the Cartesian Sum of Graphs

Coloring the Cartesian Sum of Graphs

Abstract For graphs G and H, let G ⊕ H denote their Cartesian sum. We prove that for any graphs G and H, χ ( G ⊕ H ) ⩽ max { ⌈ χ c ( G ) χ ( H ) ⌉ , ⌈ χ ( G ) χ c ( H ) ⌉ } . Moreover the bound is sharp. We conjecture that for any graphs G and H, χ c ( G ⊕ H ) ⩽ max { χ ( H ) χ c ( G ) , χ ( G ) χ c ( H ) } . The conjectured bound would be sharp if it is true. We confirm this conjecture for graphs G and H with special values of χ c ( G ) and χ c ( H ) . These results improve previously known bounds on the chromatic number and the circular chromatic number for the Cartesian sum of graphs.

Xuding Zhu | Daphne Der-Fen Liu

[1] Sandi Klavzar,et al. Coloring graph products - A survey , 1996, Discret. Math..

[2] S. Hedetniemi. Homomorphisms of graphs and automata , 1967 .

[3] Xuding Zhu,et al. Star Extremal Circulant Graphs , 1999, SIAM J. Discret. Math..

[4] Wensong Lin. Some star extremal circulant graphs , 2003, Discret. Math..

[5] M. Borowiecki. On chromatic number of products of two graphs , 1972 .

[6] Kung-wei Yang. Chromatic number of Cartesian sum of two graphs , 1968 .

[7] Xuding Zhu,et al. Circular chromatic number: a survey , 2001, Discret. Math..

[8] Norbert Sauer,et al. The chromatic number of the product of two 4-chromatic graphs is 4 , 1985, Comb..

[9] Xuding Zhu,et al. Star-extremal graphs and the lexicographic product , 1996, Discret. Math..

[10] Sandi Klavzar,et al. On the chromatic number of the lexicographic product and the Cartesian sum of graphs , 1994, Discret. Math..

[11] O. Ore. Theory of Graphs , 1962 .

[12] Xuding Zhu. Star chromatic numbers and products of graphs , 1992, J. Graph Theory.