DocumentCode
2694520
Title
Dynamic Minkowski sum of convex shapes
Author
Behar, Evan ; Lien, Jyh-Ming
Author_Institution
Dept. of Comput. Sci., George Mason Univ., Fairfax, VA, USA
fYear
2011
fDate
9-13 May 2011
Firstpage
3463
Lastpage
3468
Abstract
Computing the Minkowski sums of rotating ob jects has always been done naively by re-computing every Minkowski sum from scratch. The correspondences between the Minkowski sums are typically completely ignored. We propose a method, called DYMSUM, that can efficiently update the Minkowski sums of rotating convex polyhedra. We show that DYMSUM is significantly more efficient than the traditional approach, in particular when the size of the input polyhedra are large and when the rotation is small between frames. From our experimental results, we show that the computation time of the proposed method grows slowly with respect to the size of the input comparing to the naive approach.
Keywords
Bayes methods; geometry; mobile robots; shapes (structures); DYMSUM; convex shapes; dynamic Minkowski sum; naive approach; polyhedra; rotating objects; Convolution; Face; Force; Heuristic algorithms; Planning; Robustness; Shape;
fLanguage
English
Publisher
ieee
Conference_Titel
Robotics and Automation (ICRA), 2011 IEEE International Conference on
Conference_Location
Shanghai
ISSN
1050-4729
Print_ISBN
978-1-61284-386-5
Type
conf
DOI
10.1109/ICRA.2011.5979992
Filename
5979992
Link To Document