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SODA
2000
ACM

Coloring powers of planar graphs

14 years 27 days ago
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
Geir Agnarsson, Magnús M. Halldórsso
Added 01 Nov 2010
Updated 01 Nov 2010
Type Conference
Year 2000
Where SODA
Authors Geir Agnarsson, Magnús M. Halldórsson
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