Hostname: page-component-cd9895bd7-lnqnp Total loading time: 0 Render date: 2024-12-25T04:16:57.887Z Has data issue: false hasContentIssue false

A non-overconstrained variant of the Agile Eye with a special decoupled kinematics

Published online by Cambridge University Press:  05 December 2013

Chin-Hsing Kuo*
Affiliation:
Department of Mechanical Engineering, National Taiwan University of Science and Technology, Taipei 106, Taiwan
Jian S. Dai
Affiliation:
Centre for Robotics Research, King's College London, University of London, London WC2R 2LS, UK
Giovanni Legnani
Affiliation:
Dip. Ingegneria Meccanica e Industriale, Università di Brescia, 25123 Brescia, Italy
*
*Corresponding author. E-mail: [email protected]

Summary

A non-overconstrained three-DOF parallel orientation mechanism that is kinematically equivalent to the Agile Eye is presented in this paper. The output link (end-effector) of the mechanism is connected to the base by one spherical joint and by another three identical legs. Each leg comprises of, in turns from base, a revolute joint, a universal joint, and three prismatic joints. The three lower revolute joints are active joints, while all other joints are passive ones. Based on a special configuration, some three projective angles of the end-effector coordinates are fully decoupled with respect to the input actuated joints, that is, by actuating any revolute joint the end-effector rotates in such a way that the corresponding projective angle changes with the same angular displacement. The fully decoupled motion is analyzed geometrically and proved theoretically. Besides, the inverse and direct kinematics solutions of the mechanism are provided based on the geometric reasoning and theoretical proof.

Type
Articles
Copyright
Copyright © Cambridge University Press 2013 

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

1. Gosselin, C. M. and Lavoie, E., “On the kinematic design of spherical three-degree-of-freedom parallel manipulators,” Int. J. Robot. Res. 12 (4), 394402 (1993).Google Scholar
2. Gosselin, C. M., Sefrioui, J. and Richard, M. J., “On the direct kinematics of spherical three-degree-of-freedom parallel manipulators of general architecture,” ASME J. Mech. Des. 116 (2), 594598 (1994).CrossRefGoogle Scholar
3. Kong, X. and Gosselin, C. M., “A formula that produces a unique solution to the forward displacement analysis of a quadratic spherical parallel manipulator: The Agile Eye,” ASME J. Mech. Robot. 2 (4), 044501 (2010).CrossRefGoogle Scholar
4. Kong, X. and Gosselin, C. M., “Type synthesis of three-degree-of-freedom spherical parallel manipulators,” Int. J. Robot. Res. 23 (3), 237245 (2004).Google Scholar
5. Kong, X. and Gosselin, C. M., “Type synthesis of 3-DOF spherical parallel manipulators based on screw theory,” ASME J. Mech. Des. 126 (1), 101126 (2004).Google Scholar
6. Fang, Y. and Tsai, L.-W., “Structure synthesis of a class of 3-DOF rotational parallel manipulators,” IEEE Trans. Robot. Autom. 20 (1), 117121 (2004).Google Scholar
7. Karouia, M. and Hervé, J. M., “Asymmetrical 3-Dof spherical parallel mechanisms,” Eur. J. Mech. A 24 (1), 4757 (2005).Google Scholar
8. Hess-Coelho, T. A., “Topological synthesis of a parallel wrist mechanism,” ASME J. Mech. Des. 128 (1), 230235 (2006).Google Scholar
9. Karouia, M. and Hervé, J. M., “A three-DOF tripod for generating spherical rotation,” In: Advances in Robot Kinematics (Lenarčić, J. and Stanišić, M. M., eds.) (Kluwer Academic, London, 2000) pp. 395402.Google Scholar
10. Di Gregorio, R., “Kinematics of a new spherical parallel manipulator with three equal legs: The 3-URC wrist,” J. Robot. Syst. 18 (5), 213219 (2001).Google Scholar
11. Di Gregorio, R., “A new parallel wrist using only revolute pairs: The 3-RUU wrist,” Robotica 19 (3), 305309 (2001).CrossRefGoogle Scholar
12. Di Gregorio, R., “A new family of spherical parallel manipulators,” Robotica 20 (4), 353358 (2002).Google Scholar
13. Di Gregorio, R., “Kinematics of the 3-UPU wrist,” Mech. Mach. Theor. 38 (3), 253263 (2003).CrossRefGoogle Scholar
14. Di Gregorio, R., “The 3-RRS wrist: A new, simple and non-overconstrained spherical parallel manipulator,” ASME J. Mech. Des. 126 (5), 850855 (2004).Google Scholar
15. Di Gregorio, R., “Kinematics of the 3-RSR wrist,” IEEE Trans. Robot. 20 (4), 750753 (2004).Google Scholar
16. Karouia, M. and Hervé, J. M., “Non-overconstrained 3-Dof spherical parallel manipulators of type: 3-RCC, 3-CCR, 3-CRC,” Robotica 24 (1), 8594 (2006).Google Scholar
17. Gogu, G., “Fully-Isotropic Three-Degree-of-Freedom Parallel Wrists,” Proceedings of IEEE International Conference on Robotics and Automation, Roma, Italy (Apr. 10–14, 2007) pp. 895900.Google Scholar
18. Enferadi, J. and Tootoonchi, A. A., “A novel spherical parallel manipulator: Forward position problem, singularity analysis, and isotropy design,” Robotica 27 (5), 663676 (2009).Google Scholar
19. Baumann, R., Maeder, W., Glauser, D. and Clavel, R., “The PantoScope: A Spherical Remote-Center-of-Motion Parallel Manipulator for Force Reflection,” Proceedings of IEEE International Conference on Robotics and Automation, Albuquerque, New Mexico, USA (Apr. 20–25, 1997) pp. 718723.Google Scholar
20. Vischer, P. and Clavel, R., “Argos: A novel 3-DoF parallel wrist mechanism,” Int. J. Robot. Res. 19 (1), 511 (2000).Google Scholar
21. Innocenti, C. and Parenti-Castelli, V., “Echelon form solution of direct kinematics for the general fully-parallel spherical wrist,” Mech. Mach. Theor. 28 (4), 553561 (1993).Google Scholar
22. Wohlhart, K., “Displacement analysis of the general spherical Stewart platform,” Mech. Mach. Theor. 29 (4), 581589 (1994).Google Scholar
23. Huang, Z. and Yao, Y. L., “A new closed-form kinematics of the generalized 3-DOF spherical parallel manipulator,” Robotica 17 (5), 475485 (1999).Google Scholar
24. Alici, G. and Shirinzadeh, B., “Topology optimisation and singularity analysis of a 3-SPS parallel manipulator with a passive constraining spherical joint,” Mech. Mach. Theor. 39 (2), 215235 (2004).CrossRefGoogle Scholar
25. Carricato, M. and Parenti-Castelli, V., “A novel fully decoupled two-degrees-of-freedom parallel wrist,” Int. J. Robot. Res. 23 (6), 661667 (2004).Google Scholar
26. Gallardo, J., Rodríguez, R., Caudillo, M. and Rico, J. M., “A family of spherical parallel manipulators with two legs,” Mech. Mach. Theor. 43 (2), 201216 (2008).Google Scholar
27. Kuo, C.-H. and Dai, J. S., “Kinematics of a fully-decoupled remote center-of-motion parallel manipulator for minimally invasive surgery,” ASME J. Med. Devices 6 (2), 021008 (2012).Google Scholar
28. Kuo, C.-H., “Projective-Angle-Based Rotation Matrix and Its Applications,” The Second IFToMM Asian Conference on Mechanism and Machine Science, Tokyo, Japan (Nov. 7–10, 2012).Google Scholar
29. Jin, Y., Chen, I.-M. and Yang, G., “Kinematic design of a family of 6-DOF partially decoupled parallel manipulators,” Mech. Mach. Theor. 44 (5), 912922 (2009).CrossRefGoogle Scholar
30. Legnani, G., Fassi, I., Giberti, H., Cinquemani, S. and Tosi, D., “A new isotropic and decoupled 6-DoF parallel manipulator,” Mech. Mac. Theor. 58, 6481 (2012).Google Scholar