標題: Inapproximability Results for the Weight Problems of Subgroup Permutation Codes
作者: Shieh, Min-Zheng
Tsai, Shi-Chun
生物科技學系
資訊工程學系
Department of Biological Science and Technology
Department of Computer Science
關鍵字: Approximation algorithms;coding theory;computational complexity;subgroup code
公開日期: 1-十一月-2012
摘要: A subgroup permutation code is a set of permutations on n symbols with the property that its elements are closed under the operation of composition. In this paper, we give inapproximability results for the minimum and maximum weight problems of subgroup permutation codes under several well-known metrics. Based on previous works, we prove that under Hamming, Lee, Cayley, Kendall's tau, Ulam's, and l(p) distance metrics, 1) there is no polynomial-time 2(log1-epsilon n)-approximation algorithm for the minimum weight problem for any constant epsilon > 0 unless NP subset of DTIME(2(polylog(n)))(quasi-polynomial time), and 2) there is no polynomial-time r-approximation algorithm for the minimum weight problem for any constant r > 1 unless P = NP. Under L-infinity-metric, we prove that it is NP-hard to approximate the minimum weight problem within factor 2 - epsilon for any constant epsilon > 0. We also prove that for any constant epsilon > 0, it is NP-hard to approximate the maximum weight within p root 3/2 - epsilon under l(p) distance metric, and within 3/2 - epsilon under Hamming, Lee, Cayley, Kendall's tau, and Ulam's distance metrics. Index Terms-Approximation algorithms,
URI: http://dx.doi.org/10.1109/TIT.2012.2208618
http://hdl.handle.net/11536/20414
ISSN: 0018-9448
DOI: 10.1109/TIT.2012.2208618
期刊: IEEE TRANSACTIONS ON INFORMATION THEORY
Volume: 58
Issue: 11
起始頁: 6907
結束頁: 6915
顯示於類別:期刊論文


文件中的檔案:

  1. 000310156500016.pdf

若為 zip 檔案,請下載檔案解壓縮後,用瀏覽器開啟資料夾中的 index.html 瀏覽全文。