CoCalc Public Filessupport / 2015-04-11-122012-beezer.sagewsOpen in with one click!
Authors: Harald Schilly, ℏal Snyder, William A. Stein
Description: Jupyter notebook support/2015-06-04-141749-bokeh.ipynb
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Chapter5Permutation Groups

Permutation groups are central to the study of geometric symmetries and to Galois theory, the study of finding solutions of polynomial equations. They also provide abundant examples of nonabelian groups.

Let us recall for a moment the symmetries of the equilateral triangle ABC\bigtriangleup ABC from Chapter 3. The symmetries actually consist of permutations of the three vertices, where a permutation of the set S={A,B,C}S = \{ A, B, C \} is a one-to-one and onto map π:SS\pi :S \rightarrow S. The three vertices have the following six permutations.

We have used the array (ABCBCA)\begin{pmatrix} A & B & C \\ B & C & A \end{pmatrix} to denote the permutation that sends AA to BB, BB to CC, and CC to AA. That is, The symmetries of a triangle form a group. In this chapter we will study groups of this type.

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