Three-dimensional topological sweep for computing rotational swept volumes of polyhedral objects
Plane sweep plays an important role in computational geometry. This paper shows that an extension of topological plane sweep to three-dimensional space can calculate the Volume swept by rotating a solid polyhedral object about a fixed axis. Analyzing the characteristics of rotational swept volumes, we present an incremental algorithm based on the three-dimensional topological sweep technique. Our solution shows the time bound of O(n(2) . 2(alpha(n)) + T-c), where n Is the number of vertices in the original object and T-c is time for handling face cycles. Here, a(n) is the inverse of Ackermann's function.
- Publisher
- WORLD SCIENTIFIC PUBL CO PTE LTD
- Issue Date
- 2000-04
- Language
- English
- Article Type
- Article
- Keywords
REPRESENTATION
- Citation
INTERNATIONAL JOURNAL OF COMPUTATIONAL GEOMETRY APPLICATIONS, v.10, no.2, pp.131 - 156
- ISSN
- 0218-1959
- Appears in Collection
- CS-Journal Papers(저널논문)
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