论文信息 - Five-Coloring Maps on Surfaces

Five-Coloring Maps on Surfaces

For every surface S there exists a natural number n(S) such that every map drawn on S can be colored using live colors only provided every simple noncontractible closed curve on the surface contains at least n(S) border points of the map. This proves a conjecture of M. O. Albertson and W. R. Stromquist. There is no four-color theorem of this type.

C. Thomassen | C. Thomassen

[1] P. Erdös,et al. Graph Theory and Probability , 1959 .

[2] Walter Stromquist,et al. Locally planar toroidal graphs are 5-colorable , 1982 .

[3] Joan P. Hutchinson. A FIVE-COLOR THEOREM FOR GRAPHS ON SURFACES , 1984 .

[4] G. Ringel. Map Color Theorem , 1974 .

[5] P. J. Heawood. Map-Colour Theorem , 1949 .

[6] Carsten Thomassen,et al. Embeddings of graphs with no short noncontractible cycles , 1990, J. Comb. Theory, Ser. B.

[7] Roy B. Levow. Relative Colorings and the Four-Color Conjecture , 1974 .