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A Recursive Method for Finding Revolute-Jointed Manipulator Singularities

Joel W. Burdick

Year
1995
Citations
30

Abstract

A geometric application of screw theory is used to develop a recursive algorithm for computing all singular configurations of revolute-jointed manipulators with arbitrary link geometries and an arbitrary number of joints. The depth of the recursion is linear in the number of joints, n, while the computational burden is proportional to 2n−2. This method does not require explicit construction of the Jacobian matrix elements or a determinant operation. The method is also robust with respect to the bifurcations that occur for industrial robot geometries. Further, the screw axis of the singular motion is determined at no additional cost.

Keywords

Revolute jointJacobian matrix and determinantRecursion (computer science)Screw theoryGravitational singularityMathematicsMatrix (chemical analysis)SingularityControl theory (sociology)Algorithm

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