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definition:alternating_group
Table of Contents
Alternating Group
Definition
The $\textdef{alternating group}$ of degree $n$, or alternating group on $n$ letters, is the permutation group of even permutations on $n$ elements. We'll use the notation $A_n$ to denote the alternating group of degree $n$.
Remarks
- See soccerballahedron to contruct the Cayley graph on $A_5$.
- We should have a problem (probably really easy) that has the students prove that $A_n$ is a subgroup of the symmetric group $S_n$, with order $n!/2$.
$\LaTeX$ version
- alternating_group.tex
%%%%% % DEPENDENCIES % RequiredMacros: \newcommand{\textdef}[1]{\textit{#1}} %%%%% \begin{definition} The $\textdef{alternating group}$ of degree $n$, or alternating group on $n$ letters, is the permutation group of even permutations on $n$ elements. We'll use the notation $A_n$ to denote the alternating group of degree $n$. \end{definition}
External links
definition ben needsreview rben rdana rjosh complete
definition/alternating_group.txt · Last modified: 2013/08/21 13:10 by bmwoodruff
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