Cayley-Dickson construction
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In mathematics, the Cayley-Dickson construction produces a sequence of algebras over the field of real numbers, each with twice the dimension of the previous one. The algebras produced by this process are known as Cayley-Dickson algebras; since they extend the complex numbers, they are hypercomplex numbers.
These algebras all have a notion of norm and conjugate, with the general idea being that the product of an element and its conjugate should equal the square of its norm.
The surprise is that for the first several steps, besides having a higher dimensionality, the next algebra loses a specific algebraic property.
Complex numbers as ordered pairs
The complex numbers can be written as ordered pairs [(a, b)] of real numbers [a] and [b], with the addition operator being component-by-component and with multiplication defined by
- [(a, b) (c, d) = (a c - b d, a d + b c).\,]
Another important operation on complex numbers is conjugation. The conjugate [(a, b)^*\,] of [(a, b)] is given by
- [(a, b)^* = (a, -b).\,]
- [(a, b)^* (a, b) = (a a + b b, a b - b a) = (a^2 + b^2, 0),\,]
- [|z| = (z^* z)^.\,]
- [z^ = .\,]
Besides being of higher dimension, the complex numbers can be said to lack one algebraic property of the real numbers: a real number is its own conjugate.
Another step: the quaternions
The next step in the construction is to generalize the multiplication and conjugation operations. What to do is easy, if not quite obvious.
Form ordered pairs [(a, b)] of complex numbers [a] and [b], with multiplication defined by
- [(a, b) (c, d) = (a c - d b^*, a^* d + c b).\,]Slight variations on this formula are possible; the resulting constructions will yield structures identical up to the signs of bases.
- [(a, b)^* = (a^*, -b).\,]
The product of an element with its conjugate is a non-negative number:
- [(a, b)^* (a, b) = (a^*, -b) (a, b) = (a^* a + b b^*, a b - a b) = (|a|^2 + |b|^2, 0 ).\,]
Inasmuch as quaternions consist of two independent complex numbers, they form a 4-dimensional vector space.
The multiplication of quaternions is not quite like the multiplication of real numbers, though. It is not commutative, that is, if [p] and [q] are quaternions, it is not generally true that [p q = q p].
Yet another step: the octonions
From now on, all the steps will look the same.
This time, form ordered pairs [(p, q)] of quaternions [p] and [q], with multiplication and conjugation defined exactly as for the quaternions.
Note, however, that because the quaternions are not commutative, the order of the factors in the multiplication formula becomes important--if the last factor in the multiplication formula were [b c] rather than [c b], the formula for the conjugate wouldn't yield a real number.
For exactly the same reasons as before, the conjugation operator yields a norm and a multiplicative inverse of any nonzero element.
This algebra was discovered by Graves in 1844, and is called the octonions or the "Cayley numbers".
Inasmuch as octonions consist of two quaternions, the octonions form an 8-dimensional vector space.
The multiplication of octonions is even stranger than that of quaternions. Besides being non-commutative, it is not associative, that is, if [p], [q], and [r] are octonions, it is not generally true that [(p q) r = p (q r)].
And so forth
The algebra immediately following the octonions is called the sedenions. It retains an algebraic property called power associativity, meaning that if [s] is a sedenion, [s^n s^m = s^], but loses the property of being an alternative algebra.
The Cayley-Dickson construction can be carried on ad infinitum, at each step producing a power-associative algebra whose dimension is double that of algebra of the preceding step.
After the octonions, though, the algebras even contain zero divisors, that is, if [p] and [q] are elements of one of these algebras, then [p q = 0] no longer implies [p = 0] or [q = 0].
Schafer's extension
The process was generalized by R. D. Schafer (Amer. J. Math. 76, (1954), 435-446) to allow new elements that square to +1 instead of -1. Louenesto, Clifford Algebras and Spinors, p285, uses CD(-1,-1,..) to describe the standard process, and replaces the -1's by +1 where appropriate. Starting with reals, CD(+1) gives complex numbers, CD(+1,-1) gives Clifford(2), CD(+1,-1,-1) gives split-octonions and CD(-1,+1,+1..) gives a series of algebras describing 2,4,8.. complex planes.
Literature
- I. L. Kantor, A. S. Solodownikow: Hyperkomplexe Zahlen. BSG B. G. Teubner Verlagsgesellschaft, Leipzig, 1978.
External links
- [Hamilton: On Quaternions]
- [Baez: The Cayley-Dickson Construction]
- [Baez: The Octonions]
- [History of Hypercomplex Numbers]
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