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ECCC
2006
2006
On the Subgroup Distance Problem
We investigate the computational complexity of finding an element of a permutation group H Sn with a minimal distance to a given Sn, for different metrics on Sn. We assume that H is given by a set of generators, such that the problem cannot be solved in polynomial time by exhaustive enumeration. For the case of the Cayley Distance, this problem has been shown to be NP-hard, even if H is abelian of exponent two [7]. We present a much simpler proof for this result, which also works for the Hamming Distance, the lp distance, Lee's Distance, Kendall's tau, and Ulam's Distance. Moreover, we give an NP-hardness proof for the l distance using a different reduction idea. Finally, we settle the complexity of the corresponding fixed-parameter and maximization problems. Key words: permutation groups, subgroup distance 1991 MSC: 20B40, 68Q25
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| Added | 12 Dec 2010 |
| Updated | 12 Dec 2010 |
| Type | Journal |
| Year | 2006 |
| Where | ECCC |
| Authors | Christoph Buchheim, Peter J. Cameron, Taoyang Wu |
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