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SODA
2000
ACM
2000
ACM
Coloring powers of planar graphs
We give nontrivial bounds for the inductiveness or degeneracy of power graphs Gk of a planar graph G. This implies bounds for the chromatic number as well, since the inductiveness naturally relates to a greedy algorithm for vertex-coloring the given graph. The inductiveness moreover yields bounds for the choosability of the graph. We show that the inductiveness of a square of a planar graph G is at most 9/5 , for the maximum degree sufficiently large, and that it is sharp. In general, we show for a fixed integer k 1 the inductiveness, the chromatic number, and the choosability of Gk to be O( k/2 ), which is tight. Key words. distance-2 coloring, radio coloring AMS subject classifications. 05C15, 05C85 DOI. 10.1137/S0895480100367950
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| Added | 01 Nov 2010 |
| Updated | 01 Nov 2010 |
| Type | Conference |
| Year | 2000 |
| Where | SODA |
| Authors | Geir Agnarsson, Magnús M. Halldórsson |
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