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I understand that graph coloring is a NP-complete problem. I was wondering if adding a restriction on the number of vertices that can have a given color makes the problem simpler? I can't seem to find any algorithm which does this. For example if I have a graph, I'd like to say "what is the smallest coloring of this graph such that each color has at most 3 vertices", or if it simplifies the problem "is there a way to color this graph with 4 colors such that each color has at most 3 vertices"?


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2 Answers 2

up vote 2 down vote accepted

This problem is still NP-complete by a simple reduction from the original graph coloring problem: a graph with n nodes is k-colorable if and only if the graph can be colored with k colors and no color is assigned to more than n nodes. In other words, the general version of the problem you're phrasing has graph coloring as a special case, and so it will still be NP-hard.

Hope this helps!

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Thanks! I appreciate it! –  cs54321 Apr 12 '13 at 17:46
do you mean np-complete when you said that the problem will still be np-hard? –  Calpis Apr 12 '13 at 18:05
@Calpis NP-hard should be correct because the reduction implies that this is at least as difficult as the standard graph coloring problem. –  G. Bach Apr 12 '13 at 18:41

I would say that looking for the chromatic number of a graph given the restriction that a k-coloring exists can be easily added to an exact DSATUR based algorithm [Randall-Brown 72] [San Segundo 11] and prune the search space when one vertex has to be assgined color k. In any case the problem remains in NP.

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