* [[Start|Home]] * [[Possible Outlines]] * [[playground:Playground]] * [[Needs Review]] * [[sidebar|Edit The Sidebar]]
User Tools
Sidebar
definition:abelian_group
Table of Contents
Abelian Group
Definition
A group is if its binary operation is commutative; otherwise, it is .
Remarks
- None.
$\LaTeX$ version
- definition.abelian_group.tex
%%%%% % DEPENDENCIES % RequiredMacros: \newcommand{\textdef}[1]{\textit{#1}} %%%%% \begin{definition} A group is \textdef{abelian} if its binary operation is commutative; otherwise, it is said to be \textdef{nonabelian}. \end{definition}
External links
definition/abelian_group.txt · Last modified: 2013/08/21 13:02 by bmwoodruff
Except where otherwise noted, content on this wiki is licensed under the following license: CC Attribution-Share Alike 4.0 International
