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Revision as of 18:04, 11 June 2009
, 18:04, 11 June 2009→Note 23: format table of permutations
Recalling the manner of our acquaintance with the symmetric group <math>S_3,\!</math> we began with the ''bigraph'' (bipartite graph) picture of its natural representation as the set of all permutations or substitutions on the set <math>X = \{ \mathrm{A}, \mathrm{B}, \mathrm{C} \}.\!</math>
Recalling the manner of our acquaintance with the symmetric group <math>S_3,\!</math> we began with the ''bigraph'' (bipartite graph) picture of its natural representation as the set of all permutations or substitutions on the set <math>X = \{ \mathrm{A}, \mathrm{B}, \mathrm{C} \}.\!</math>
{| align="center" cellpadding="6" width="90%"
<br>
<pre>
{| align="center" border="1" cellpadding="8" cellspacing="0" style="background:#f8f8ff; text-align:center; width:90%"
|+ <math>\text{Permutation Substitutions in}~ \operatorname{Sym} \{ \mathrm{A}, \mathrm{B}, \mathrm{C} \}</math>
|- style="background:#f0f0ff"
| | | | | | |
| width="16%" | <math>\operatorname{e}</math>
| e | f | g | h | i | j |
| width="16%" | <math>\operatorname{f}</math>
| | | | | | |
| width="16%" | <math>\operatorname{g}</math>
| width="16%" | <math>\operatorname{h}</math>
| width="16%" | <math>\operatorname{i}</math>
| width="16%" | <math>\operatorname{j}</math>
|-
|
<math>\begin{matrix}
\mathrm{A} & \mathrm{B} & \mathrm{C}
\\[3pt]
\downarrow & \downarrow & \downarrow
\\[6pt]
</pre>
\mathrm{A} & \mathrm{B} & \mathrm{C}
\end{matrix}</math>
|
<math>\begin{matrix}
\mathrm{A} & \mathrm{B} & \mathrm{C}
\\[3pt]
\downarrow & \downarrow & \downarrow
\\[6pt]
\mathrm{C} & \mathrm{A} & \mathrm{B}
\end{matrix}</math>
|
<math>\begin{matrix}
\mathrm{A} & \mathrm{B} & \mathrm{C}
\\[3pt]
\downarrow & \downarrow & \downarrow
\\[6pt]
\mathrm{B} & \mathrm{C} & \mathrm{A}
\end{matrix}</math>
|
<math>\begin{matrix}
\mathrm{A} & \mathrm{B} & \mathrm{C}
\\[3pt]
\downarrow & \downarrow & \downarrow
\\[6pt]
\mathrm{A} & \mathrm{C} & \mathrm{B}
\end{matrix}</math>
|
<math>\begin{matrix}
\mathrm{A} & \mathrm{B} & \mathrm{C}
\\[3pt]
\downarrow & \downarrow & \downarrow
\\[6pt]
\mathrm{C} & \mathrm{B} & \mathrm{A}
\end{matrix}</math>
|
<math>\begin{matrix}
\mathrm{A} & \mathrm{B} & \mathrm{C}
\\[3pt]
\downarrow & \downarrow & \downarrow
\\[6pt]
\mathrm{B} & \mathrm{A} & \mathrm{C}
\end{matrix}</math>
|}
|}
<br>
Then we rewrote these permutations — being functions <math>f : X \to X</math> they can also be recognized as being 2-adic relations <math>f \subseteq X \times X</math> — in ''relative form'', in effect, in the manner to which Peirce would have made us accustomed had he been given a relative half-a-chance:
Then we rewrote these permutations — being functions <math>f : X \to X</math> they can also be recognized as being 2-adic relations <math>f \subseteq X \times X</math> — in ''relative form'', in effect, in the manner to which Peirce would have made us accustomed had he been given a relative half-a-chance:
