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JCT
2002
2002
Coloring Locally Bipartite Graphs on Surfaces
It is proved that there is a function f : N N such that the following holds. Let G be a graph embedded in a surface of Euler genus g with all faces of even size and with edge-width f(g). Then (i) If every contractible 4-cycle of G is facial and there is a face of size > 4, then G is 3-colorable. (ii) If G is a quadrangulation, then G is not 3-colorable if and only if there exist disjoint surface separating cycles C1, . . . , Cg such that, after cutting along C1, . . . , Cg, we obtain a sphere with g holes and g M
Real-time TrafficContractible 4-cycle | EULER | Facial | JCT 2002 |
Related Content
| Added | 22 Dec 2010 |
| Updated | 22 Dec 2010 |
| Type | Journal |
| Year | 2002 |
| Where | JCT |
| Authors | Bojan Mohar, Paul D. Seymour |
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