Verified convex hull and distance computation for octree-encoded objects

Verified convex hull and distance computation for octree-encoded objects

This paper discusses algorithms for computing verified convex hull and distance enclosure for objects represented by axis-aligned or unaligned octrees. To find a convex enclosure of an octree, the concept of extreme vertices of boxes on its boundary has been used. The convex hull of all extreme vert...

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Veröffentlicht in:Journal of computational and applied mathematics 2007-02, Vol.199 (2), p.358-364
Hauptverfasser: Dyllong, Eva, Luther, Wolfram
Format: Artikel
Sprache:eng
Schlagworte:
Applied sciences
Artificial intelligence
Computer science
control theory
systems
Convex and discrete geometry
Convex hull
Distance computation
Exact sciences and technology
Geometry
Interval algorithms
Mathematics
Methods of scientific computing (including symbolic computation, algebraic computation)
Numerical analysis. Scientific computation
Octrees
Pattern recognition. Digital image processing. Computational geometry
Reliable geometry
Sciences and techniques of general use
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Beschreibung
Zusammenfassung:This paper discusses algorithms for computing verified convex hull and distance enclosure for objects represented by axis-aligned or unaligned octrees. To find a convex enclosure of an octree, the concept of extreme vertices of boxes on its boundary has been used. The convex hull of all extreme vertices yields an enclosure of the object. Thus, distance algorithms for convex polyhedra to obtain lower bounds for the distance between two octrees can be applied. Since using convex hulls makes it possible to avoid the unwanted wrapping effect that results from repeated decompositions, it also opens a way to dynamic distance algorithms for moving objects.
ISSN:0377-0427
1879-1778
DOI:10.1016/j.cam.2005.08.043