The quickhull algorithm for convex hulls

Author:

Barber C. Bradford1,Dobkin David P.2,Huhdanpaa Hannu3

Affiliation:

1. Univ. of Minnesota, Minneapolis

2. Princeton Univ., Princeton, NJ

3. Configured Energy Systems, Inc., Plymouth, MN

Abstract

The convex hull of a set of points is the smallest convex set that contains the points. This article presents a practical convex hull algorithm that combines the two-dimensional Quickhull algorithm with the general-dimension Beneath-Beyond Algorithm. It is similar to the randomized, incremental algorithms for convex hull and delaunay triangulation. We provide empirical evidence that the algorithm runs faster when the input contains nonextreme points and that it used less memory. computational geometry algorithms have traditionally assumed that input sets are well behaved. When an algorithm is implemented with floating-point arithmetic, this assumption can lead to serous errors. We briefly describe a solution to this problem when computing the convex hull in two, three, or four dimensions. The output is a set of “thick” facets that contain all possible exact convex hulls of the input. A variation is effective in five or more dimensions.

Publisher

Association for Computing Machinery (ACM)

Subject

Applied Mathematics,Software

Reference36 articles.

1. Determination and evaluation of support structures in layered manufacturing;ALLEN S.;J. Des. Manufactur.,1995

2. Voronoi diagrams—a survey of a fundamental geometric data structure

3. On the randomized construction of the Delaunay tree

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