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Octonion algebra

for all x and yinA.

The most well-known example of an octonion algebra is the classical octonions, which are an octonion algebra over R, the field of real numbers. The split-octonions also form an octonion algebra over R. Up to R-algebra isomorphism, these are the only octonion algebras over the reals. The algebra of bioctonions is the octonion algebra over the complex numbers C.

The octonion algebra for N is a division algebra if and only if the form Nisanisotropic. A split octonion algebra is one for which the quadratic form Nisisotropic (i.e., there exists a non-zero vector x with N(x) = 0). Up to F-algebra isomorphism, there is a unique split octonion algebra over any field F.^[1] When Fisalgebraically closed or a finite field, these are the only octonion algebras over F.

Octonion algebras are always non-associative. They are, however, alternative algebras, alternativity being a weaker form of associativity. Moreover, the Moufang identities hold in any octonion algebra. It follows that the invertible elements in any octonion algebra form a Moufang loop, as do the elements of unit norm.

The construction of general octonion algebras over an arbitrary field k was described by Leonard Dickson in his book Algebren und ihre Zahlentheorie (1927) (Seite 264) and repeated by Max Zorn.^[2] The product depends on selection of a γ from k. Given q and Q from a quaternion algebra over k, the octonion is written q + Qe. Another octonion may be written r + Re. Then with * denoting the conjugation in the quaternion algebra, their product is

${\displaystyle (q+Qe)(r+Re)=(qr+\gamma R^{*}Q)+(Rq+Qr^{*})e.}$

Zorn’s German language description of this Cayley–Dickson construction contributed to the persistent use of this eponym describing the construction of composition algebras.

Cohl Furey has proposed that octonion algebras can be utilized in an attempt to reconcile components of the standard model.^[3]

Classification[edit]

It is a theorem of Adolf Hurwitz that the F-isomorphism classes of the norm form are in one-to-one correspondence with the isomorphism classes of octonion F-algebras. Moreover, the possible norm forms are exactly the Pfister 3-forms over F.^[4]

Since any two octonion F-algebras become isomorphic over the algebraic closureofF, one can apply the ideas of non-abelian Galois cohomology. In particular, by using the fact that the automorphism group of the split octonions is the split algebraic group G₂, one sees the correspondence of isomorphism classes of octonion F-algebras with isomorphism classes of G₂-torsors over F. These isomorphism classes form the non-abelian Galois cohomology set ${\displaystyle H^{1}(F,G_{2})}$.^[5]

References[edit]

• Garibaldi, Skip; Merkurjev, Alexander; Serre, Jean-Pierre (2003). Cohomological invariants in Galois cohomology. University Lecture Series. Vol. 28. Providence, RI: American Mathematical Society. ISBN 0-8218-3287-5. Zbl 1159.12311.
• Lam, Tsit-Yuen (2005). Introduction to Quadratic Forms over Fields. Graduate Studies in Mathematics. Vol. 67. American Mathematical Society. ISBN 0-8218-1095-2. MR 2104929. Zbl 1068.11023.
• Okubo, Susumu (1995). Introduction to octonion and other non-associative algebras in physics. Montroll Memorial Lecture Series in Mathematical Physics. Vol. 2. Cambridge: Cambridge University Press. p. 22. ISBN 0-521-47215-6. Zbl 0841.17001.
• Schafer, Richard D. (1995) [1966]. An introduction to non-associative algebras. Dover Publications. ISBN 0-486-68813-5. Zbl 0145.25601.
• Zhevlakov, K.A.; Slin'ko, A.M.; Shestakov, I.P.; Shirshov, A.I. (1982) [1978]. Rings that are nearly associative. Academic Press. ISBN 0-12-779850-1. MR 0518614. Zbl 0487.17001.
• Serre, J. P. (2002). Galois Cohomology. Springer Monographs in Mathematics. Translated from the French by Patrick Ion. Berlin: Springer-Verlag. ISBN 3-540-42192-0. Zbl 1004.12003.
• Springer, T. A.; Veldkamp, F. D. (2000). Octonions, Jordan Algebras and Exceptional Groups. Springer-Verlag. ISBN 3-540-66337-1.

External links[edit]

• "Cayley–Dickson algebra", Encyclopedia of Mathematics, EMS Press, 2001 [1994]