Title :
Boundary equations of configuration obstacles for manipulators
Author_Institution :
Sandia Nat. Lab., Albuquerque, NM, USA
Abstract :
A method is described for obtaining the boundary equations of configuration obstacles for stick-figure manipulators in three-dimensional environments. Polyhedral obstacles are represented as a collection of planar triangular patches, and the intersection conditions between a line segment and a triangular patch are used to derive boundary equations. It is shown that the boundary equation for the nth joint variable can be solved explicitly in terms of the 0th, 1st, . . ., (n-1)th joint variables. The expressions can be used to compute configuration obstacles or to analyze the geometry of contacts between manipulators and obstacles
Keywords :
computational geometry; robots; 3D environments; boundary equations; configuration obstacles; geometry; joint variables; line segment; manipulators; motion planning; planar triangular patches; polyhedral obstacles; robot manipulators; stick-figure manipulators; Computational geometry; Contracts; Equations; Laboratories; Manipulators; Motion planning; Orbital robotics; Robot kinematics;
Conference_Titel :
Robotics and Automation, 1990. Proceedings., 1990 IEEE International Conference on
Conference_Location :
Cincinnati, OH
Print_ISBN :
0-8186-9061-5
DOI :
10.1109/ROBOT.1990.125991
