Octonions: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Ragnar Schroder
(modifying header)
mNo edit summary
 
(5 intermediate revisions by 3 users not shown)
Line 1: Line 1:
{{subpages}}
{{subpages}}
'''Octonions''' are a [[Commutativity|non-commutative]] and [[Associative law|non-associative]] extension of the [[Real number|real numbers]]. They were were first discovered by John Graves, a friend of Sir William Rowan Hamilton who first described the related [[Quaternions|quaternions]].  
'''Octonions''' are a [[Commutativity|non-commutative]] and [[Associative law|non-associative]] extension of the [[Real number|real numbers]]. They were were first discovered by John Graves, a friend of Sir William Rowan Hamilton who first described the related [[Quaternions|quaternions]].  
Although Hamilton offered to publicize Graves discovery, it took Arthur Cayley to rediscover and publish in 1845, for this reason octonions are also known as Cayley Numbers.
Although Hamilton offered to publicize Graves discovery, it took Arthur Cayley to rediscover and publish in 1845, for this reason octonions are also known as Cayley Numbers.


== Definition & basic operations ==
== Definition & basic operations ==
The octinions, <math>\mathbb{O}</math>, are a eight-dimensional normed division algebra over the [[Real number|real numbers]].<br/><br/>
The octonions, <math>\mathbb{O}</math>, are a eight-dimensional normed division algebra over the real numbers.<br/><br/>
:<math>\mathbb{O}=\left\lbrace a_0 + \sum_{i=7}^7a_i e_i|a_0, \dots, a_7 \in {\mathbb{R}}\right\rbrace</math><br/>
:<math>\mathbb{O}=\left\lbrace a_0 + \sum_{i=1}^7a_i e_i|a_1, \dots, a_7 \in {\mathbb{R}}\right\rbrace</math><br/>


== Properties ==
== Properties ==


== Applications ==
== Applications ==
==See also==
*[[Cayley-Dickson construction]]
==Related topics==
*[[Geometric Algebra]]
*[[Fano plane]]
*[[Quaternions]]


== References ==
== References ==
{{reflist}}[[Category:Suggestion Bot Tag]]

Latest revision as of 06:00, 28 September 2024

This article is a stub and thus not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
This editable Main Article is under development and subject to a disclaimer.

Octonions are a non-commutative and non-associative extension of the real numbers. They were were first discovered by John Graves, a friend of Sir William Rowan Hamilton who first described the related quaternions. Although Hamilton offered to publicize Graves discovery, it took Arthur Cayley to rediscover and publish in 1845, for this reason octonions are also known as Cayley Numbers.


Definition & basic operations

The octonions, , are a eight-dimensional normed division algebra over the real numbers.


Properties

Applications

See also

Related topics

References