Separation-Sensitive Collision Detection for Convex Objects
Abstract
We develop a class of new kinetic data structures for collision detection between moving convex polytopes; the performance of these structures is sensitive to the separation of the polytopes during their motion. For two convex polygons in the plane, let be the maximum diameter of the polygons, and let be the minimum distance between them during their motion. Our separation certificate changes times when the relative motion of the two polygons is a translation along a straight line or convex curve, for translation along an algebraic trajectory, and for algebraic rigid motion (translation and rotation). Each certificate update is performed in time. Variants of these data structures are also shown that exhibit \emph{hysteresis}---after a separation certificate fails, the new certificate cannot fail again until the objects have moved by some constant fraction of their current separation. We can then bound the number of events by the combinatorial size of a certain cover of the motion path by balls.
Cite
@article{arxiv.cs/9809035,
title = {Separation-Sensitive Collision Detection for Convex Objects},
author = {Jeff Erickson and Leonidas J. Guibas and Jorge Stolfi and Li Zhang},
journal= {arXiv preprint arXiv:cs/9809035},
year = {2007}
}
Comments
10 pages, 8 figures; to appear in Proc. 10th Annual ACM-SIAM Symposium on Discrete Algorithms, 1999; see also http://www.uiuc.edu/ph/www/jeffe/pubs/kollide.html ; v2 replaces submission with camera-ready version