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Dual quaternions and dual projective spaces. (English) Zbl 1197.53028

Summary: Not reviewed.
Editorial remark: There are doubts about a proper peer-reviewing procedure of this journal. The editor-in-chief has retired, but, according to a statement of the publisher, articles accepted under his guidance are published without additional control.

MSC:

53B99 Local differential geometry
15A66 Clifford algebras, spinors
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References:

[1] Ata, E., Symplectic geometry on dual quaternions, D.Ü. Fen Bil. Derg, 6, 221-230 (2004)
[2] Chevalley, C., Theory of lie groups (1946), Princeton University Press: Princeton University Press Princeton (NJ) · Zbl 0063.00842
[3] El Naschie, M. S., On Twistors in Cantorian \(&z.epsiv;^{(∞)}\) space, Chaos, Solitons & Fractals, 12, 741-746 (2001) · Zbl 1022.81543
[4] Hacısalihoğlu, H. H., Acceleration axes in spatial kinematics, Communications, 20A, 1-15 (1971) · Zbl 0257.53010
[5] Hacısalihoğlu, H. H., Hareket Geometrisi ve Kuaternionlar Teorisi (1983), Gazi Ünv. Publishing
[6] Penrose, R.; El Naschie, M. S.; Castro, C., The central program of Twistor theory, Superstrings, M,F,S theory. Superstrings, M,F,S theory, Chaos, Solitons & Fractals, 10, 2/3, 581-611 (1999) · Zbl 0994.81049
[7] Yano, K.; Kon, M., Structures on manifolds (1984), World Scientific: World Scientific Singapore · Zbl 0557.53001
[8] Toth, G., Glimpses of algebra and geometry (1998), Springer: Springer Berlin · Zbl 0892.00002
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