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Geometric Algebra for Modeling in Robotic Physics Read chapter Read first chapter

2020 | OriginalPaper | Chapter

7. The Geometric Algebras \(G_{6,0,2}^+\), \(G_{6,3}\), \(G_{9,3}^+\), \(G_{6,0,6}^+\)

Author : Eduardo Bayro-Corrochano

Published in: Geometric Algebra Applications Vol. II

Publisher: Springer International Publishing

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Abstract

The geometric algebra of a 3D Euclidean space \(G_{3,0,0}\) has a point basis and the motor algebra \(G_{3,0,1}^+\) a line basis. In the latter, the lines expressed are expressed in terms of Plücker coordinates and the points and planes in terms of bivectors.

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Literature
1.
Bayro-Corrochano, E., Daniilidis, K., & Sommer, G. (2000). Motor algebra for 3D kinematics. The case of the hand–eye calibration. International Journal of Mathematical Imaging and Vision, 13(2), 79–99.
2.
Bayro-Corrochano, E. (2001). Geometric computing for perception action systems. New York: Springer Verlag.CrossRef
3.
Selig, J., & Bayro-Corrochano, E. (2010). Rigid body dynamics using Clifford algebra. Advances in Applications of Clifford algebras, 20, 141–154.MathSciNetCrossRef
4.
Eaester, R. B., & Hitzer, E. (2017). Double conformal geometric algebra. Advances in Applied Clifford Algebras, 27, 2175–2199.MathSciNetCrossRef
5.
White, N. (1994). Grassmann-Cayley algebras in robotics. Journal of Intelligent Robot Systems, 11, 97–187.
6.
Zamora-Esquivel, J. (2014). \(G_{6,3}\) Geometric algebra: Decription and implementation. Advances in Applied Clifford Algebras, 24, 493–514.MathSciNetCrossRef
7.
Li, H., Hestenes, D., & Rockwood, A. (2001). Generalized homogeneous coordinates for computational geometry. In G. Sommer (Ed.), Geometric computing with Clifford algebra (pp. 27–59). New York: Springer-Verlag.CrossRef
8.
Metadata
Title
The Geometric Algebras , , ,
Author
Eduardo Bayro-Corrochano
Copyright Year
2020
Book
Geometric Algebra Applications Vol. II

Print ISBN: 978-3-030-34976-9

Electronic ISBN: 978-3-030-34978-3

Copyright Year: 2020

DOI
https://doi.org/10.1007/978-3-030-34978-3_7

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