论文信息 - NUMERICAL ANALYSIS OF DISPLACEMENTS IN SPATIAL MECHANISMS WITH SPHERICAL JOINTS UTILIZING AN EXTENDED D-H NOTATION

NUMERICAL ANALYSIS OF DISPLACEMENTS IN SPATIAL MECHANISMS WITH SPHERICAL JOINTS UTILIZING AN EXTENDED D-H NOTATION

Spherical joints consist of a pair of concave and convex spherical surfaces engaged in such a way as to prevent translational motion of the ball and socket whilst simultaneously allowing three degrees of rotational freedom. The kinematics of spatial mechanisms comprising links and joints are commonly analyzed using the Denavit-Hartenberg (D-H) notation. However, whilst this method allows the kinematics of mechanisms containing prismatic, revolute, helical and cylindrical joints to be explicitly defined, it cannot be directly applied to mechanical systems containing spherical pairs. Accordingly, this paper proposes an extended D-H notation which allows the independent parameters of any spatial mechanism, including one with spherical pairs, to be derived for analysis and synthesis purposes. The validity of the proposed notation is demonstrated via its application to the analysis of mechanisms containing revolute (R), spherical (S), cylindrical (C) and prismatic (P) joints. The results confirm the viability of the extended D-H notation as a means of analyzing the displacements of mechanical systems containing kinematic chains such as RSCR, RSCP, CSSR and CSSP.

Jung-Fa Hsieh | Jung-Fa Hsieh

[1] J. Denavit,et al. A kinematic notation for lower pair mechanisms based on matrices , 1955 .

[2] J-F Hsieh. Application of homogenous transformation matrix to the design and machining of a Geneva mechanism with curved slots , 2007 .

[3] C. H. Liu,et al. Direct Singular Positions of 3RPS Parallel Manipulators , 2004 .

[4] J. J. Uicker,et al. A Generalized Symbolic Notation for Mechanisms , 1971 .

[5] F. Freudenstein. Advanced mechanism design: Analysis and synthesis: Vol. 2, by G. N. Sandor and A. G. Erdman. Prentice-Hall Inc., Englewood Cliffs, New Jersey, 1984, 688 p , 1985 .

[6] Hüseyin Mutlu,et al. A Novel Approach in the Direct Kinematics of Stewart Platform Mechanisms with Planar Platforms , 2006 .

[7] R. Paul. Robot manipulators : mathematics, programming, and control : the computer control of robot manipulators , 1981 .

[8] Ian S. Fischer,et al. Numerical analysis of displacements in spatial mechanisms with ball joints , 2000 .

[9] Kenneth J. Waldron,et al. Kinematics, dynamics, and design of machinery , 1998 .

[10] Anirvan DasGupta. Mobility Analysis of a Class of RPSPR Kinematic Chains , 2004 .

[11] Jianmin Zhu,et al. On realization of spherical joints in RSSR mechanisms , 2005 .

[12] A. T. Yang. Displacement Analysis of Spatial Five-Link Mechanisms Using (3×3) Matrices With Dual-Number Elements , 1969 .