DocumentCode
2148234
Title
The Minkowski sum of two simple surfaces generated by slope-monotone closed curves
Author
Seong, Joon-Kyung ; Kim, Myung-Soo ; Sugihara, Kokichi
Author_Institution
Sch. of Comput. Sci. & Eng., Seoul Nat. Univ., South Korea
fYear
2002
fDate
2002
Firstpage
33
Lastpage
42
Abstract
We present an algorithm for computing Minkowski sums among surfaces of revolution and surfaces of linear extrusion, generated by slope-monotone closed curves. The special structure of these simple surfaces allows the process of normal matching between two surfaces to be expressed as an explicit equation. Based on this insight, we also present an efficient algorithm for computing the distance between two simple surfaces, even though they may in general be non-convex. Using an experimental implementation, the distance between two surfaces of revolution was computed in less than 0.5 msec on average.
Keywords
computational geometry; Minkowski sums; algorithm; explicit equation; normal matching; simple surfaces; slope-monotone closed curves; surfaces of linear extrusion; surfaces of revolution; Computer science; Equations; Euclidean distance; Gaussian processes; Informatics; Object detection; Solid modeling; Vectors;
fLanguage
English
Publisher
ieee
Conference_Titel
Geometric Modeling and Processing, 2002. Proceedings
Print_ISBN
0-7695-1674-2
Type
conf
DOI
10.1109/GMAP.2002.1027494
Filename
1027494
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