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definition:permutation
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Table of Contents
Permutation of $X$
Definition
Let $X$ be a set. A $\textdef{permutation}$ of $X$ is a bijection from $X$ to $X$. We can think of a permutation of $X$ as a way of rearranging the elements in $X$. The identity permutation is the permutation $id_X:X\to X$ defined by $id_X(x)=x$.
Remarks
- Put them in a bulleted list.
$\LaTeX$ version
- definition.permutation.tex
%%%%% % DEPENDENCIES % RequiredMacros: \DeclareMathOperator{\syl}{Syl} %%%%% \begin{definition} Let $X$ be a set. A \textdef{permutation} of $X$ is a bijection from $X$ to $X$. We can think of a permutation of $X$ as a way of rearranging the elements in $X$. The identity permutation is the permutation $id_X:X\to X$ defined by $id_X(x)=x$. \end{definition}
External links
- [[wp>Permutation]
definition needsreview ben
definition/permutation.1377200209.txt.gz · Last modified: 2013/08/22 15:36 by bmwoodruff
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