Alternativity: Difference between revisions
Neither alternativity nor flexibility is a stronger property |
imported>John Baez |
||
| Line 18: | Line 18: | ||
==Examples== | ==Examples== | ||
Examples of alternative | Examples of algebraic structures with an alternative multiplication include: | ||
* Any [[ | * Any [[semigroup]] is associative and therefore alternative. | ||
* [[Moufang loop]]s are alternative and flexible but not associative. See {{Section link|Moufang loop|Examples}} for more examples. | * [[Moufang loop]]s are alternative and flexible but generally not associative. See {{Section link|Moufang loop|Examples}} for more examples. | ||
* [[Octonion]] multiplication is alternative and flexible. | * [[Octonion]] multiplication is alternative and flexible. The same is more generally true for any [[octonion algebra]]. | ||
* | * Applying the [[Cayley-Dickson construction]] once to a [[commutative ring]] with a trivial involution <math>a^\ast = a</math> gives a commutative associative algebra. Applying it twice gives an associative algebra. Applying it three times gives an alternative algebra. Applying it four or more times gives an algebra that is typically not alternative (thought it is in characteristic two). An example is the sequence <math>\mathbb{R}, \mathbb{C}, \mathbb{H}, \mathbb{O}, \mathbb{S},...</math> where <math>\mathbb{H}</math> is the algebra of quaternions, <math>\mathbb{O}</math> is the algebra of [[octonions]], and <math>\mathbb{S}</math> is the algebras of [[sedenions]]. | ||
==See also== | ==See also== | ||
| Line 30: | Line 30: | ||
==References== | ==References== | ||
{{reflist}} | {{reflist}} | ||
* {{ cite book | last=Schafer | first=Richard D. |author-link=Richard D. Schafer| year=1995 | orig-year=1966 | title=An Introduction to Nonassociative Algebras | publisher=Dover | isbn=0-486-68813-5 | url=https://books.google.com/books?isbn=0486688135 | zbl=0145.25601 }} | |||
[[Category:Properties of binary operations]] | [[Category:Properties of binary operations]] | ||
Latest revision as of 10:01, 18 October 2025
Template:Short description Script error: No such module "Distinguish". Script error: No such module "Unsubst". Script error: No such module "Unsubst". In abstract algebra, alternativity is a property of a binary operation. A magma Template:Mvar is said to be <templatestyles src="Template:Visible anchor/styles.css" />left alternative if for all and <templatestyles src="Template:Visible anchor/styles.css" />right alternative if for all . A magma that is both left and right alternative is said to be <templatestyles src="Template:Visible anchor/styles.css" />alternative.[1]
Any associative magma (that is, a semigroup) is alternative. More generally, a magma in which every pair of elements generates an associative submagma must be alternative. The converse, however, is not true, in contrast to the situation in alternative algebras.
Examples
Examples of algebraic structures with an alternative multiplication include:
- Any semigroup is associative and therefore alternative.
- Moufang loops are alternative and flexible but generally not associative. See Template:Section link for more examples.
- Octonion multiplication is alternative and flexible. The same is more generally true for any octonion algebra.
- Applying the Cayley-Dickson construction once to a commutative ring with a trivial involution gives a commutative associative algebra. Applying it twice gives an associative algebra. Applying it three times gives an alternative algebra. Applying it four or more times gives an algebra that is typically not alternative (thought it is in characteristic two). An example is the sequence where is the algebra of quaternions, is the algebra of octonions, and is the algebras of sedenions.
See also
References
<templatestyles src="Reflist/styles.css" />
- ↑ Script error: No such module "citation/CS1"..
Script error: No such module "Check for unknown parameters".
- Script error: No such module "citation/CS1".