Anyone recognize this subgroup?

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Juanriq
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Ahoy hoy, let A be a set with [itex]a \in A[/itex]. Define

[itex]G_a = \{ g \in S_A; g(a) = a \}[/itex]

Where [itex]S_A[/itex] is the permutation group. Are we just talking the set of all inverses of the permutation group? Thanks!
 
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Hey guys, I think I don't understand what this subgroup does. Lanedance, I think I see what you mean, but wouldn't that just be like an identity group? I don't understand what would be so special about some group that just spits the same thing back out all the time... Also, micromass, I have not seen actions yet. This came up in a geometry class after we spent 5 minutes on the permutation group. I understand what the permutation group is, but this subgroup really means nothing to me. Any enlightening ideas would be welcome, I'm going to go wikipedia actions.
 
Juanriq said:
Hey guys, I think I don't understand what this subgroup does. Lanedance, I think I see what you mean, but wouldn't that just be like an identity group? I don't understand what would be so special about some group that just spits the same thing back out all the time...

as i read it, it only has to leave the element a unchanged
 
so if a=(321), then g(321) = (321), right?
 
the inverse of [itex]G_a[/itex] is the identity?
 
i would have thought it was somthing like
A = {a,b,c}

the set of all permutations of A is [itex]S_A[/itex]
{a,b,c} ()
{b,a,c} (12)
{c,b,a} (13)
{a,c,b} (23)
{b,c,a} (123)

the set of all permutations that leave a unchanged are [itex]S_a[/itex]
{a,b,c} ()
{a,c,b} (23)
 
Ohhhhh... that's something completely different than what I was thinking. Thanks lanedance!