Clifford algebra: What is it?

@article{Bolinder1987CliffordAW,
  title={Clifford algebra: What is it?},
  author={E. Bolinder},
  journal={IEEE Antennas and Propagation Society Newsletter},
  year={1987},
  volume={29},
  pages={18-23}
}
  • E. Bolinder
  • Published 1987
  • Computer Science
  • IEEE Antennas and Propagation Society Newsletter
The participants, about 70 people from 20 countries constituted a motley crowd of mathematicians, physicists, and engineers. Some names: Among the mathematicians were I. Ahlfors (USA), I.M. Benn (UK), F. Brackx (Belgium), A. Crumeyrolle (France), R. Delanghe (Belgium), K. Imaeda (Japan), E. Kaehler (West Germany), P. Lounesto (Finland), A. Micali (France), and I. Porteous (UK). Among the physicists were A.O. Barut (USA), G .A. Deschamps (USA), 1. Dresden (USA), K.R. Greider (USA), D. Hestenes… Expand
29 Citations
Introduction to Clifford Analysis
Some Applications of Clifford Algebra in Geometry
  • 1
  • PDF
On determinant, other characteristic polynomial coefficients, and inverses in Clifford algebras of arbitrary dimension
  • 3
  • Highly Influenced
Inverse of multivector: Beyond p+q=5 threshold
  • 2
  • PDF
Theory of Spinors in Curved Space-Time
Conceptual Problems in Bell's Inequality and Quantum Entanglement
  • PDF
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1
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References

SHOWING 1-10 OF 11 REFERENCES
Electromagnetics and differential forms
  • 240
  • PDF
Theory of noisy two-port networks
  • 11
Ahlfors , ' On the fixed points of Mijbius transformations in Rn , " Ann
  • Acad . Sci . Fenn .
  • 1984
See also " The Quarternion Centenary Celebration
  • Elements of guarternions
  • 1967
Quartemionic form of relativity
  • 1965
Weyl , " Spinors in n dimensions
  • J . of Math .
  • 1938
Schidlof , " Sur les nombres hypercomplexes de Clifford et leurs applications a l ' analyse vectorielle ordinaire , a 1 ' 6 lecromagnetisme de Minkowski et A la theorie de Dirac "
  • 1930
Applications of Grassmann's Extensive Algebra
  • 412
...
1
2
...