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inria-00189038, version 1

Farthest-Polygon Voronoi Diagrams

Otfried Cheong 1, Hazel Everett () a2, Marc Glisse () a2, Joachim Gudmundsson b3, Samuel Hornus c1, Sylvain Lazard () d2, Mira Lee c1, Hyeon-Suk Na e3

15th Annual European Symposium on Algorithms - ALGO 2007 LNCS 4698/2007 (2007) 407-418

Résumé : Given a family of k disjoint connected polygonal sites of total complexity n, we consider the farthest-site Voronoi diagram of these sites, where the distance to a site is the distance to a closest point on it. We show that the complexity of this diagram is O(n), and give an O(n log^3 n) time algorithm to compute it.

  • a –  Université Nancy II
  • b –  Soongsil University
  • c –  KAIST
  • d –  INRIA
  • e –  Soongsil University, Seoul
  • 1 :  Department of Electrical Engineering [Korea Advanced Institute of Science and Technology] (KAIST)
  • Korea Advanced Institute of Science and Technology
  • 2 :  VEGAS (INRIA Lorraine - LORIA)
  • INRIA – CNRS : UMR7503 – Université Henri Poincaré - Nancy I – Université Nancy II – Institut National Polytechnique de Lorraine (INPL)
  • 3 :  School of Computing - Soongsil University, Séoul
  • Soongsil University, Seoul
  • Domaine : Informatique/Géométrie algorithmique
  • Commentaire : The original publication is available at www.springerlink.com
 
  • inria-00189038, version 1
  • http://hal.inria.fr/inria-00189038
  • oai:hal.inria.fr:inria-00189038
  • Contributeur : Sylvain Lazard <>
  • Soumis le : Lundi 19 Novembre 2007, 18:56:33
  • Dernière modification le : Dimanche 20 Décembre 2009, 15:08:55