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#1 2010-01-08 13:15:21
- noemi
- Member
- Registered: 2010-01-07
- Posts: 2,333
simple groups
JaneFairfax wrote:
Such a group
has 1 or 4 Sylow 3-subgroups, each of order 9. Suppose 4 and let be one of them. Then and so by Humphreyss corollary, there is a normal subgroup of contained in such that 4 divides and divides 4! = 24. showing that is not simple.Wow, it really is simple when you know how.
why is|G:N_G(P)|=4?
what does Humpreys's corollary say? also if u can give me a proof
thank you
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#2 2010-01-08 14:59:15
- JaneFairfax
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- Registered: 2007-02-23
- Posts: 6,868
Re: simple groups
Are you familiar with the theory of group actions? All Sylow p-subgroups of a group are conjugate, so if is the set of all Sylow p-subgroups, then acts on by conjugation and for any the number of Sylow p-subgroups is the size of the orbit of under this action. By the orbitstabilizer theorem, the size of the orbit of is the index in of the stabilizer of in , and the stabilizer of in is easily seen to be the normalizer of in .
For Humphreyss corollary, see this: http://www.mathisfunforum.com/viewtopic … 38#p109938.
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#3 2010-01-08 22:43:18
- noemi
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- Registered: 2010-01-07
- Posts: 2,333
Re: simple groups
very nice, tnx Jane! 
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