Colorings at minimum cost |
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| Authors: | Robert Berke |
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| Affiliation: | a Department of Mathematical and Computing Science, Tokyo Institute of Technology, Meguro-ku Ookayama, Tokyo 152-8552, Japan
b Department of Computer Science, ETH Zürich, Switzerland |
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| Abstract: | We define by minc∑{u,v}∈E(G)|c(u)−c(v)| the min-costMC(G) of a graph G, where the minimum is taken over all proper colorings c. The min-cost-chromatic numberχM(G) is then defined to be the (smallest) number of colors k for which there exists a proper k-coloring c attaining MC(G). We give constructions of graphs G where χ(G) is arbitrarily smaller than χM(G). On the other hand, we prove that for every 3-regular graph G′, χM(G′)≤4 and for every 4-regular line graph G″, χM(G″)≤5. Moreover, we show that the decision problem whether χM(G)=k is  -hard for k≥3. |
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| Keywords: | Graph colorings Graph labelings Bounded degree graphs |
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