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{{mergeto|non-associative algebra|date=February 2013|discuss=Talk:Non-associative algebra#Merge example}}
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{{Unreferenced|date=December 2009}}
This page presents and discusses an example of a non-associative [[division algebra]] over the [[real number]]s.
 
The multiplication is defined by taking the [[complex conjugate]] of the usual multiplication: <math>a*b=\overline{ab}</math>.  This is a commutative, non-associative division algebra of dimension 2 over the reals, and has no unit element.
 
==Proof that <math>(\mathbb{C},*)</math> is a division algebra==
For a proof that <math>\mathbb{R}</math> is a [[field (mathematics)|field]], see [[real number]].  
Then, the complex numbers themselves clearly form a [[vector space]].
 
It remains to prove that the [[binary operation]] given above satisfies the requirements of a division algebra
* ('''x''' + '''y''')'''z''' = '''x''' '''z''' + '''y''' '''z''';
* '''x'''('''y''' + '''z''') = '''x''' '''y''' + '''x''' '''z''';
* (''a'' '''x''')'''y''' = ''a''('''x''' '''y'''); and
* '''x'''(''b'' '''y''') = ''b''('''x''' '''y''');
[[for all]] scalars ''a'' and ''b'' in <math>\mathbb{R}</math> and all vectors '''x''', '''y''', and '''z''' (also in <math>\mathbb{C}</math>).
 
For [[distributivity]]:
 
:<math>x*(y+z)=\overline{x(y+z)}=\overline{xy+xz}=\overline{xy}+\overline{xz}=x*y+x*z,</math>
 
(similarly for right distributivity); and for the third and fourth requirements
:<math> (ax)*y=\overline{(ax)y}=\overline{a(xy)}=\overline{a}\cdot\overline{xy}=\overline{a}(x*y).</math>
 
==Non associativity of <math>(\mathbb{C},*)</math>==
*:<math>a * (b * c) = a * \overline{b c} = \overline{a \overline{b c}} = \overline{a} b c </math>
*:<math>(a * b) * c = \overline{a b} * c = \overline{\overline{a b} c} = a b \overline{c} </math>
 
So, if ''a'', ''b'', and ''c'' are all non-zero, and if ''a'' and ''c'' do not differ by a real multiple, <math>a * (b * c) \neq (a * b) * c</math>.
 
{{DEFAULTSORT:Example Of A Non-Associative Algebra}}
[[Category:Algebras]]
[[Category:Non-associative algebras]]
[[Category:Articles containing proofs]]

Revision as of 01:01, 28 February 2014

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