Flexible algebra
In mathematics, particularly abstract algebra, a binary operation • on a set is flexible if it satisfies the flexible identity:
- [math]\displaystyle{ a \bullet \left(b \bullet a\right) = \left(a \bullet b\right) \bullet a }[/math]
for any two elements a and b of the set. A magma (that is, a set equipped with a binary operation) is flexible if the binary operation with which it is equipped is flexible. Similarly, a nonassociative algebra is flexible if its multiplication operator is flexible.
Every commutative or associative operation is flexible, so flexibility becomes important for binary operations that are neither commutative nor associative, e.g. for the multiplication of sedenions, which are not even alternative.
In 1954, Richard D. Schafer examined the algebras generated by the Cayley–Dickson process over a field and showed that they satisfy the flexible identity.[1]
Examples
Besides associative algebras, the following classes of nonassociative algebras are flexible:
- Alternative algebras
- Lie algebras
- Jordan algebras (which are commutative)
- Okubo algebras
Similarly, the following classes of nonassociative magmas are flexible:
- Alternative magmas
- Semigroups (which are associative magmas, and which are also alternative)
The sedenions, and all algebras constructed from these by iterating the Cayley–Dickson construction, are also flexible.
See also
- Zorn ring
- Maltsev algebra
References
- ↑ Richard D. Schafer (1954) “On the algebras formed by the Cayley-Dickson process”, American Journal of Mathematics 76: 435–46 doi:10.2307/2372583
- Schafer, Richard D. (1995) [1966]. An introduction to non-associative algebras. Dover Publications. ISBN 0-486-68813-5. https://archive.org/details/introductiontono0000scha.
Original source: https://en.wikipedia.org/wiki/Flexible algebra.
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