The Approximability of the Binary Paintshop Problem
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Publisher
Springer Berlin Heidelberg
Link
http://link.springer.com/content/pdf/10.1007/978-3-642-40328-6_15
Reference10 articles.
1. Agarwal, A., Charikar, M., Makarychev, K., Makarychev, Y.: $O(\sqrt{\log n})$ approximation algorithms for min UnCut, min 2CNF deletion, and directed cut problems. In: 37th Annual ACM Symposium on Theory of Computing, pp. 573–581 (2005)
2. Andres, S.D., Hochstättler, W.: Some heuristics for the binary paint shop problem and their expected number of colour changes. J. Discrete Algorithms 9(2), 203–211 (2011)
3. Amini, H., Meunier, F., Michel, H., Mohajeri, A.: Greedy colorings for the binary paintshop problem. Journal of Discrete Algorithms 8(1), 8–14 (2010)
4. Bonsma, P.S., Epping, T., Hochstättler, W.: Complexity results on restricted instances of a paint shop problem for words. Discrete Applied Mathematics 154(9), 1335–1343 (2006)
5. Dinur, I.: The PCP theorem by gap amplification. Journal of the ACM 54(3), 12 (2007)
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