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CCCG
2010

Existence of zone diagrams in compact subsets of uniformly convex spaces

14 years 27 days ago
Existence of zone diagrams in compact subsets of uniformly convex spaces
A zone diagram is a relatively new concept which has emerged in computational geometry and is related to Voronoi diagrams. Formally, it is a fixed point of a certain mapping, and neither its uniqueness nor its existence are obvious in advance. It has been studied by several authors, starting with T. Asano, J. Matousek and T. Tokuyama, who considered the Euclidean plane with singleton sites, and proved the existence and uniqueness of zone diagrams there. We announce the existence of zone diagrams with respect to finitely many pairwise disjoint compact sites contained in a compact and convex subset of a uniformly convex normed space. The proof is based on the Schauder fixed point theorem, the Curtis-Schori theorem regarding the Hilbert cube, and on recent results concerning the characterization of Voronoi cells as a collection of line segments and their geometric stability with respect to small changes of the corresponding sites. Along the way we obtain interesting and apparently new pr...
Eva Kopecká, Daniel Reem, Simeon Reich
Added 29 Oct 2010
Updated 29 Oct 2010
Type Conference
Year 2010
Where CCCG
Authors Eva Kopecká, Daniel Reem, Simeon Reich
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