• DocumentCode
    3372717
  • Title

    Solution of inverse kinematic problem for serial robot using quaterninons

  • Author

    Sariyildiz, Emre ; Temeltas, Hakan

  • Author_Institution
    Dept. of Control Eng., Istanbul Tech. Univ., Istanbul, Turkey
  • fYear
    2009
  • fDate
    9-12 Aug. 2009
  • Firstpage
    26
  • Lastpage
    31
  • Abstract
    A new inverse kinematic solution for serial robot manipulators is represented in this paper. Major aims of this paper are to obtain singularity avoiding inverse kinematic solutions and formulize kinematic problems in a compact closed form. Our solution method is based on screw theory and it uses quaternions as a screw motion operator. Screw theory methods based on line transformation. All screw motions are represented as a rotation about a line together with a translation along the line with respect to base frame. Thus screw theory methods do not suffer from singularities. Two quaterninos are used to represent screw motion. First one is for orientation and second one is for translation. Thus we formulize kinematic problems in a compact closed form. 6R-DOF industrial robot manipulators forward and inverse kinematic equations are derived using this new formulation and also it compared with D-H convention that is the most common method in robot kinematic.
  • Keywords
    industrial manipulators; manipulator kinematics; 6R-DOF industrial robot manipulators; D-H convention; inverse kinematic problem; kinematic equations; line transformation; quaternions; screw motion operator; screw theory; serial robot manipulators; End effectors; Equations; Fasteners; Manipulators; Mechatronics; Motion analysis; Quaternions; Robot kinematics; Robotics and automation; Service robots; Inverse Kinematic; Line Transformation; Quaternion; Screw Theory; Serial Robot;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Mechatronics and Automation, 2009. ICMA 2009. International Conference on
  • Conference_Location
    Changchun
  • Print_ISBN
    978-1-4244-2692-8
  • Electronic_ISBN
    978-1-4244-2693-5
  • Type

    conf

  • DOI
    10.1109/ICMA.2009.5246684
  • Filename
    5246684