Open AccessKinematic Synthesis of Spatial Serial Chains Using Clifford Algebra Exponentials
Author(s) -
Alba Pérez-Gracia,
J. Michael McCarthy
Publication year - 2006
Publication title -
proceedings of the institution of mechanical engineers part c journal of mechanical engineering science
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.411
H-Index - 59
eISSN - 2041-2983
pISSN - 0954-4062
DOI - 10.1243/09544062jmes166
Subject(s) - quaternion , kinematics , geometric algebra , dual quaternion , algebra over a field , kinematics equations , exponential function , set (abstract data type) , mathematics , position (finance) , orientation (vector space) , clifford algebra , computer science , geometry , mathematical analysis , pure mathematics , robot kinematics , artificial intelligence , physics , robot , programming language , finance , classical mechanics , mobile robot , economics
This article presents a formulation of the design equations for a spatial serial chain that uses the Clifford algebra exponential form of its kinematics equations. This is the even Clifford algebra C +(P 3), known as dual quaternions. These equations define the position and orientation of the end effector in terms of rotations or translations about or along the joint axes of the chain. Because the coordinates of these axes appear explicitly, specifying a set of task positions these equations can be solved to determine the location of the joints. At the same time, joint parameters or certain dimensions are specified to ensure that the resulting robotic system has specific features.
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