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COMGEO
2008
ACM
2008
ACM
Encompassing colored planar straight line graphs
Consider a planar straight line graph (PSLG), G, with k connected components, k 2. We show that if no component is a singleton, we can always find a vertex in one component that sees an entire edge in another component. This implies that when the vertices of G are colored, so that adjacent vertices have different colors, then (1) we can augment G with k -1 edges so that we get a color conforming connected PSLG; (2) if each component of G is 2-edge connected, then we can augment G with 2k -2 edges so that we get a 2-edge connected PSLG. Furthermore, we can determine a set of augmenting edges in O(nlogn) time. An important special case of this result is that any red
Real-time Traffic| Added | 25 Dec 2010 |
| Updated | 25 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | COMGEO |
| Authors | Ferran Hurtado, Mikio Kano, David Rappaport, Csaba D. Tóth |
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