The k-center problem is one of several classic NP-hard clustering questions. For contemporary massive data sets, RAM-based algorithms become impractical. And although there exist good sequential algorithms for k-center, they are not easily parallelizable. In this paper, we design and implement parallel approximation algorithms for this problem. We observe that Gonzalez's greedy algorithm can be efficiently parallelized in several MapReduce rounds; in practice, we find that two rounds are sufficient, leading to a 4-approximation. We contrast this with an existing parallel algorithm for k-center that runs in a constant number of rounds, and offers a 10-approximation. In depth runtime analysis reveals that this scheme is often slow, and that its sampling procedure only runs if k is sufficiently small, relative to the input size. To trade off runtime for approximation guarantee, we parameterize this sampling algorithm, and find in our experiments that the algorithm is not only faster, but sometimes more effective. Yet the parallel version of Gonzalez is about 100 times faster than both its sequential version and the parallel sampling algorithm, barely compromising solution quality.
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