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problem:permutation_group_generated_by_s
Table of Contents
Permutation Group Generated By $S$
Problem
Let be a set. Let be a collection of permutations of .
- Show that there is a permutation group that contains .
- Let be the intersection of all permutation groups that contain . Show that is a permutation group.
- Why is the smallest permutation group that contains . In other words, if is any other permutation group that contains , why must we have .
Remarks
- We could alternately define as the set of permutations of that we can express as a finite composition of elements in and inverses of elements in .
$\LaTeX$ version
- problem.permutation_group_generated_by_s.tex
%%%%% % DEPENDENCIES %%%%% \begin{problem} Type the problem code here. \end{problem}
External links
problem/permutation_group_generated_by_s.txt · Last modified: 2013/08/22 15:56 by bmwoodruff
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