Cocoloring
In graph theory, a cocoloring of a graph G is an assignment of colors to the vertices such that each color class forms an independent set in G or in the complement of G. The cochromatic number z(G) of G is the fewest colors needed in any cocolorings of G. The graphs with cochromatic number 2 are exactly the bipartite graphs, complements of bipartite graphs, and split graphs.
As the requirement that each color class be a clique or independent is weaker than the requirement for coloring (in which each color class must be an independent set) and stronger than for subcoloring (in which each color class must be a disjoint union of cliques), it follows that the cochromatic number of G is less than or equal to the chromatic number of G, and that it is greater than or equal to the subchromatic number of G.
Cocoloring was named and first studied by Lesniak & Straight (1977). Jørgensen (1995) characterizes critical 3-cochromatic graphs, while Fomin, Kratsch & Novelli (2002) describe algorithms for approximating the cochromatic number of a graph. Zverovich (2000) defines a class of perfect cochromatic graphs, analogous to the definition of perfect graphs via graph coloring, and provides a forbidden subgraph characterization of these graphs.
References[edit]
- Fomin, Fedor V.; Kratsch, Dieter; Novelli, Jean-Christophe (2002), "Approximating minimum cocolourings", Inf. Process. Lett., 84 (5): 285–290, doi:10.1016/S0020-0190(02)00288-0, S2CID 17733740.
- Gimbel, John; Straight, H. Joseph (1987), "Some topics in cochromatic theory", Graphs and Combinatorics, 3 (1): 255–265, doi:10.1007/BF01788548, S2CID 8218390.
- Jørgensen, Leif K. (1995), "Critical 3-cochromatic graphs", Graphs and Combinatorics, 11 (3): 263–266, doi:10.1007/BF01793013, S2CID 38851896.
- Lesniak, L.; Straight, H. J. (1977), "The cochromatic number of a graph", Ars Combinatoria, 3: 39–46.
- Straight, H. J. (1979), "Cochromatic number and the genus of a graph", Journal of Graph Theory, 3 (1): 43–51, doi:10.1002/jgt.3190030106.
- Zverovich, Igor V. (2000), Perfect cochromatic graphs, Research report RRR 16-2000, Rutgers University Center for Operations Research, archived from the original on 2016-03-03, retrieved 2006-10-16.