Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
4648271 | Discrete Mathematics | 2010 | 6 Pages |
Abstract
The vertex-face chromatic number of a map on a surface is the minimum integer mm such that the vertices and faces of the map can be colored by mm colors in such a way that adjacent or incident elements receive distinct colors. The vertex-face chromatic number of a surface is the maximal vertex-chromatic number for all maps on the surface. We give an upper bound on the vertex-face chromatic number of the surfaces of Euler genus ≥2≥2. The upper bound is less (by 1) than Ringel’s upper bound on the 1-chromatic number of a surface for about 5/125/12 of all surfaces. We show that there are good grounds to suppose that the upper bound on the vertex-face chromatic number is tight.
Keywords
Related Topics
Physical Sciences and Engineering
Mathematics
Discrete Mathematics and Combinatorics
Authors
Vladimir P. Korzhik,