Singularity loci of planar parallel manipulators with revolute actuators

Abstract The determination of the singularity loci of planar parallel manipulators is addressed in this paper. The inverse kinematics of two kinds of planar parallel manipulators (a two-degree-of-freedom manipulator and a three-degree-of-freedom manipulator) are first computed and their velocity equations are then derived. At the same time, the branches of the manipulators are distinguished by the introduction of a branch index Ki. Using the velocity equations, the singularity analysis of the manipulators is completed and expressions which represent the singularity of the manipulators are obtained. A polynomial form of the singularity loci is also derived. For the first type of singularity of parallel manipulators, the singularity locus is obtained by finding the workspace limits of the manipulators. For the second type of singularity, the loci are obtained through the solution of nonlinear algebraic equations obtained from the velocity analysis. Finally, the graphical representation of the complete singularity loci of the manipulators is illustrated with examples. The algorithm introduced in this paper allows the determination of the singularity loci of planar parallel manipulators with revolute actuators, which has been elusive to previous approaches.

[1]  C. Gosselin,et al.  The optimum kinematic design of a spherical three-degree-of-freedom parallel manipulator , 1988 .

[2]  Jorge Angeles,et al.  Architecture singularities of platform manipulators , 1991, Proceedings. 1991 IEEE International Conference on Robotics and Automation.

[3]  Daniel C. H. Yang,et al.  A New Method for the Singularity Analysis of Simple Six-link Manipulators , 1986 .

[4]  K. H. Hunt,et al.  Kinematic geometry of mechanisms , 1978 .

[5]  Clément Gosselin,et al.  Singularity analysis of closed-loop kinematic chains , 1990, IEEE Trans. Robotics Autom..

[6]  Clément Gosselin,et al.  Singularity analysis and representation of planar parallel manipulators , 1992, Robotics Auton. Syst..

[7]  Huiqin Yan The stationary configurations of planar six-bar kinematic chainsDie stationären konfigurationen sechsgliedriger kinematischer ketten , 1988 .

[8]  Jorge Angeles,et al.  A General Method of Four-Bar Linkage Mobility Analysis , 1987 .

[9]  Jean-Pierre Merlet Singular Configurations of Parallel Manipulators and Grassmann Geometry , 1989, Int. J. Robotics Res..

[10]  C. Gosselin,et al.  On the quadratic nature of the singularity curves of planar three-degree-of-freedom parallel manipulators , 1995 .

[11]  J. Sefrioui Etude et representation des lieux de singularite des manipulateurs parallelles spheriques a trois degres de liberte avec actionneurs prismatiquesDetermination of the singularity loci of spherical three-degree-of-freedom parallel manipulators , 1994 .

[12]  C. Gosselin Determination of the Workspace of 6-DOF Parallel Manipulators , 1990 .

[13]  K. H. Hunt,et al.  Structural Kinematics of In-Parallel-Actuated Robot-Arms , 1983 .

[14]  Clément Gosselin,et al.  Workspaces of Planar Parallel Manipulators , 1998 .

[15]  Bernard Roth,et al.  Workspace and Mobility of a Closed- Loop Manipulator , 1986 .