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To select a maximum-size subset of the given requests that contains no conflicts, this algorithm doesn't work. At each iteration, pick the remaining request with the fewest number of conflicts with other remaining requests (breaking ties arbitrarily).

I know there is counter example with 11 requests as shown here (http://www.cs.princeton.edu/~wayne/kleinberg-tardos/04GreedyAlgorithms-2x2.pdf)

However someone told me that with arbitrary tie-breaking, there is a counterexample with only three requests. I have spent one hour and still couldn't figure out what this three-request counterexample might be. Could anyone help me out here?

share|improve this question
    
I'm pretty sure there is no counter-example with only three requests. If the optimal solution is one or three requests, then this greedy approach will certainly find it. If the optimal solution is two requests, then there are only a few general possibilities for the third request which shouldn't be chosen. If it conflicts with both of the other two, then it won't be chosen by the greedy algorithm, and otherwise it doesn't matter whether it is chosen or not. – Vaughn Cato Jan 31 '13 at 6:10
    
Is the algorithm actually: At each iteration we select a new request i having the fewest number of conflicts with other remaining requests, including it in the solution-so-far and deleting from future consideration all requests that conflict with i ? – ringø Jan 31 '13 at 7:52
    
yes´╝îthat is the algorithm – yangsuli Jan 31 '13 at 9:39

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