A Tight Bound for the Delaunay Triangulation of Points on a Polyhedron
Abstract
We show that the Delaunay triangulation of a set of n points distributed nearly uniformly on a p-dimensional polyhedron (not necessarily convex) in d-dimensional Euclidean space is O(n^((d-k+1)/p)), where k = ceil(d+1)/(p+1)$. This bound is tight, and improves on the prior upper bound for most values of p.
Domains
Computational Geometry [cs.CG]
Origin : Files produced by the author(s)
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