A spatial operator algebra for manipulator modeling and controlA powerful new spatial operator algebra for modeling, control, and trajectory design of manipulators is discussed along with its implementation in the Ada programming language. Applications of this algebra to robotics include an operator representation of the manipulator Jacobian matrix; the robot dynamical equations formulated in terms of the spatial algebra, showing the complete equivalence between the recursive Newton-Euler formulations to robot dynamics; the operator factorization and inversion of the manipulator mass matrix which immediately results in O(N) recursive forward dynamics algorithms; the joint accelerations of a manipulator due to a tip contact force; the recursive computation of the equivalent mass matrix as seen at the tip of a manipulator; and recursive forward dynamics of a closed chain system. Finally, additional applications and current research involving the use of the spatial operator algebra are discussed in general terms.
Document ID
19900023316
Acquisition Source
Legacy CDMS
Document Type
Conference Paper
Authors
Rodriguez, G. (Jet Propulsion Lab., California Inst. of Tech. Pasadena, CA, United States)
Kreutz, K. (Jet Propulsion Lab., California Inst. of Tech. Pasadena, CA, United States)
Milman, M. (California Institute of Technology Jet Propulsion Laboratory, Pasadena, United States)