====== Abelian Group ======
====Definition==== 
A group is $\textdef{abelian}$ if its binary operation is [[wp>Commutative property|commutative]]; otherwise, it is $\textdef{nonabelian}$.

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==== Remarks ==== 
  * None.


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==== $\LaTeX$ version ====
<file tex definition.abelian_group.tex>
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% DEPENDENCIES 
% RequiredMacros: \newcommand{\textdef}[1]{\textit{#1}} 
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\begin{definition}
A group is \textdef{abelian} if its binary operation is commutative; otherwise, it is said to be \textdef{nonabelian}.
\end{definition}
</file>

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==== External links ====
  * [[wp>Abelian group]]


{{tag>definition needsreview rjosh rben}}