About this Journal Submit a Manuscript Table of Contents
Journal of Discrete Mathematics
Volume 2013 (2013), Article ID 851751, 6 pages
http://dx.doi.org/10.1155/2013/851751
Research Article

Compression of Meanders

1Department of Informatics, University of Piraeus, Karaoli & Dimitriou 80, 18534 Piraeus, Greece
2Department of Informatics, Ionian University, Plateia Tsirigoti 7, 49100 Corfu, Greece

Received 21 June 2012; Revised 29 August 2012; Accepted 12 September 2012

Academic Editor: Annalisa De Bonis

Copyright © 2013 A. Panayotopoulos and P. Vlamos. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Linked References

  1. S. K. Lando and A. K. Zvonkin, “Plane and projective meanders,” Theoretical Computer Science, vol. 117, no. 1-2, pp. 227–241, 1993. View at Publisher · View at Google Scholar · View at Zentralblatt MATH · View at MathSciNet · View at Scopus
  2. P. Rosenstiehl, “Planar Permutations defined by two interesting Jordan curves,” in Graph Theory and Combinatorics, pp. 259–271, Academic Press, New York, NY, USA, 1984. View at Zentralblatt MATH · View at MathSciNet
  3. J. Barraud, A. Panayotopoulos, and P. Tsikouras, “Properties of closed meanders,” Ars Combinatoria, vol. 67, pp. 189–197, 2003. View at Zentralblatt MATH · View at MathSciNet · View at Scopus
  4. M. A. La Croix, Approaches to the enumerative theory of meanders [M.S. thesis], University of Waterloo, 2003.
  5. A. Panayotopoulos and P. Vlamos, “Cutting degree of meanders,” in Proceedings of the 1st Mining Humanistic Data Workshop, 2012.
  6. A. Panayotopoulos and P. Vlamos, “Meandric polygons,” Ars Combinatoria, vol. 87, pp. 147–159, 2008. View at Zentralblatt MATH · View at MathSciNet · View at Scopus
  7. A. Panayotopoulos, “Generating planar permutations,” Journal of Information and Optimization Sciences, vol. 18, no. 2, pp. 281–287, 1997. View at Zentralblatt MATH · View at MathSciNet