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Zone diagrams in Euclidean spaces and in other normed spaces
Authors:Akitoshi Kawamura  Ji?í Matou?ek  Takeshi Tokuyama
Affiliation:1. Department of Computer Science, University of Tokyo, 7-3-1 Hongo, Bunkyo-ku, Tokyo, 113-8656, Japan
2. Department of Applied Mathematics, Institute of Theoretical Computer Science (ITI), Charles University, Malostranské nám. 25, 118 00, Praha 1, Czech Republic
3. Institute of Theoretical Computer Science, ETH Zürich, 8092, Zürich, Switzerland
4. Graduate School of Information Sciences, Tohoku University, Aramaki Aza Aoba, Aoba-ku, Sendai, 980-8579, Japan
Abstract:Zone diagrams are a variation on the classical concept of Voronoi diagrams. Given n sites in a metric space that compete for territory, the zone diagram is an equilibrium state in the competition. Formally it is defined as a fixed point of a certain “dominance” map. Asano, Matou?ek, and Tokuyama proved the existence and uniqueness of a zone diagram for point sites in the Euclidean plane, and Reem and Reich showed existence for two arbitrary sites in an arbitrary metric space. We establish existence and uniqueness for n disjoint compact sites in a Euclidean space of arbitrary (finite) dimension, and more generally, in a finite-dimensional normed space with a smooth and rotund norm. The proof is considerably simpler than that of Asano et?al. We also provide an example of non-uniqueness for a norm that is rotund but not smooth. Finally, we prove existence and uniqueness for two point sites in the plane with a smooth (but not necessarily rotund) norm.
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