Wikipedia:Reference desk/Archives/Mathematics/2012 November 19
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November 19
[edit]Normal subgroups and bijection
[edit]Let be a surjective homomorphism. Suppose you have some subgroup of and define . Let be a subgroup of containing and be a normal subgroup of containing . Show that there is a bijection between and .--AnalysisAlgebra (talk) 22:27, 19 November 2012 (UTC)
- But what you've stated is clearly false. Sławomir Biały (talk) 00:06, 20 November 2012 (UTC)
- I TOTALLY misunderstood the question. I need to show that there is a bijection between the set of subgroups of G and the set of subgroups of G' . I'm not sure if they need to be normal or not.--AnalysisAlgebra (talk) 08:46, 20 November 2012 (UTC)
- Subgroups containing H and H' respectively, that is.--AnalysisAlgebra (talk) 08:48, 20 November 2012 (UTC)
- They don't need to be normal. Start by showing that if , then . This depends on . Then use that to show that is the desired bijection.--149.148.254.207 (talk) 09:53, 20 November 2012 (UTC)
- Hem. That's harder than it looks. You can get . How does the result follow? How do you use that is surjective?--AnalysisAlgebra (talk) 17:31, 20 November 2012 (UTC)
- Hint:consider .
- Surjectivity isn't important; since the image of is a subgroup, you could just replace with image.--80.109.106.49 (talk) 18:17, 20 November 2012 (UTC)
- Yes, is in the kernel of . So what?--AnalysisAlgebra (talk) 18:46, 20 November 2012 (UTC)
- What's the relationship between the kernel of and H?--80.109.106.49 (talk) 19:02, 20 November 2012 (UTC)
- All I can think of is is a suubgroup of ; did you have something else in mind? How does it relate to ?--AnalysisAlgebra (talk) 20:43, 20 November 2012 (UTC)
- Since N contains H, this tells you that .--80.109.106.49 (talk) 20:59, 20 November 2012 (UTC)
- All I can think of is is a suubgroup of ; did you have something else in mind? How does it relate to ?--AnalysisAlgebra (talk) 20:43, 20 November 2012 (UTC)
- What's the relationship between the kernel of and H?--80.109.106.49 (talk) 19:02, 20 November 2012 (UTC)
- Yes, is in the kernel of . So what?--AnalysisAlgebra (talk) 18:46, 20 November 2012 (UTC)
- Hem. That's harder than it looks. You can get . How does the result follow? How do you use that is surjective?--AnalysisAlgebra (talk) 17:31, 20 November 2012 (UTC)
- They don't need to be normal. Start by showing that if , then . This depends on . Then use that to show that is the desired bijection.--149.148.254.207 (talk) 09:53, 20 November 2012 (UTC)