(Note: access to some article is restricted only to the cs.unc.edu domain.)
K. Abdel-Malekl, D. Blackmore, K. Joy, Swept Volumes: Foundations, Perspectives, and Applications, International Journal of Shape Modeling.
B. Juttler and M. Wagner, Kinematics and Animation, Handbook of CAGD (editors: Farin, Hoschek, and Kim), 2002, pp. 723-748.
K. Abdel-Malek, and H. J. Yeh, (1997), Geometric Representation of the Swept Volume Using the Jacobian Rank Deficiency Conditions, Computer-Aided Design, Vol. 29, No. 6, pp. 457-468.
K. Abdel-Malek, and S. Othman, (1999), Multiple sweeping using the Denavit-Hartenber representation method, Computer-Aided Design, Vol. 31, pp. 567-583.
D. Blackmore, M.C. Leu, L.P. Wang, (1997), Sweep-envelope differential equation algorithm and its application to NC machining verification, Computer-Aided Design, Vol 29, pp. 629-637
J. Weld and M. Leu, Geometric representation of swept volume with application to polyhedral objects (available at the M/P library), International Journal of Robotics Research, Vol. 9, No. 5, Oct. 1990.
S. Abrams and P. Allen, Swept Volumes and their use in viewpoint computation in robot work-cells, Proc. IEEE International Symposium on Assembly and Task Planning, 1995, pp. 188--193.
B. Juttler and M Wagner, Spatial Rational B-Spline Motions, ASME Journal of Mechanical Design, Vol 118. 1996, pp 193-201 (see Sec. 3).
S. Abrams, P. Allen, Computing swept volumes, Journal of Visualization and Computer Animation, Vol. 11, 2000.
S. Raab and D. Halperin, Controlled perturbation of arrangements of polyhedral surfaces with application to swept volumes, 15th Proc. SOCG, 1999.
D. Halperin, Robust Geometric Computing in Motion, 2000.
N. Baek, S. Shin, K. Chwa, On computing translational swept volumes (available at M/P), Intl Journal of Computational Geometry and Applications, Vol. 9, No. 3, 1999.
N. Baek, S. Shin, K. Chwa, Three-dimensional topological sweep for computing rotational swept volumes of polyhedral objects (available at M/P), Intl Journal of Computational Geometry and Applications, Vol. 10, No. 2, 2000.
J. Lee, S. Hong, M. Kim, Polygonal boundary approximation for a 2D general sweep based on envelope and Boolean operations, Visual Computer, Vol. 16, 2000.
D. Blackmore, R. Samulyak, M. Leu, (1999), Trimming swept volumes, Computer-Aided Design, Vol 31, pp. 215-223.
K. Abdel-Malek and H. J. Yeh, (1997), On the Determination of Starting Points for Parametric Surface Intersections, Computer-Aided Design, Vol. 29, No. 1, pp.21-35.C. Madrigal and K. Joy, Generating the envelope of a swept trivariate solid, Proc. of the IASTED Intl Conf on Computer Graphics and Imaging, Oct 1999.
K. Joy and M. Duchaineau, Boundary determination for trivarite solids, Proc. of Pacific Graphics '99, pp 82-91, Oct 1999.
J. Conkey, K. Joy, Using isosurface methods for visualizing the envelope of a swept trivariate solid, Proc. of Pacific Graphics, Oct 2000.
A. Winter, M. Chen, Image-Swept Volumes, Eurographics 2002.
T. Hook, Real-time shaded NC milling display, SIGGRAPH 1986.
K. Hui, Solid sweeping in image space - application to NC simulation, Visual Computer, 10(6):306-316, 1994.
Y. Huang, J. Oliver, NC milling error assessment and tool path correction, SIGGRAPH 1994.
J. Kieffer F. L. Litvin, Swept Volume Determination and Interference Detection for Moving 3-D Solids, Transactions of the ASME, Journal of Mechanical Design, Vol 113 (1990) pp 456-463.
S. Cameron, Collision detection by four-dimensional intersection testing, IEEE Trans. Robotics Automat., 6:291-302, June 1990.
A. Foisy, V. Hayward, A safe swept volume method for robust collision detection, Robotics Research, Sixth International Symposium, 1994.
P. Xavier, Fast Swept-Volume Distance for Robust Collision Detection, IEEE ICRA, 1997.
Volume 31, Issue 3, March 1999
Gershon Elber and Myung-Soo Kim, Offsets, sweeps, and Minkowski sums (Editorial).
Last Modified: 04/23/2003.
Maintained by Young Kim.