Let H be a subgroup of finite index of an infinite group G. Prove that G has a normal subgroup of finite index which is contained in H.
I am not sure how to start on this problem, and would appreciate any suggestions.
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2If $[G:H] = n,$ try to define a group homomorphism $\phi: G \to S_{n},$ using the existence of $H.$ – Geoff Robinson Nov 17 '14 at 16:30
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This question is closed as a duplicate of https://math.stackexchange.com/q/936014/491450 . But that is kind of ridiculous since https://math.stackexchange.com/q/936014/491450 is closed as a duplicate of https://math.stackexchange.com/q/428295/491450 . Instead, this question should be directly closed as a duplicate of https://math.stackexchange.com/q/428295/491450 . – Smiley1000 Nov 13 '24 at 08:37
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Let $\;X:=H/G:=$ the set of left cosets of $\;H\;$ in $\;G\;$ , and define an action
$$G\times X\to X\;,\;\;g'\cdot(gH):=(g'g)H\;,\;\;\forall\;g',g\in G$$
Show the above is indeed an action, and it thus determines a groups homomorphism $\;\phi:G\to Sym_X\cong S_n\;$ , with $\;n=[G:H]\;$ , given by $\;\phi(g')(gH):=(g'g)H\;$ .
Prove now that
$$\ker\phi\le H\;\;\text{and}\;\;G/\ker\phi\cong T\le S_n$$
so that $\;N:=\ker\phi\;$ is the wanted normal subgroup.
BTW, $\;N\;$ as above is called the core of $\;H\;$, and it is characterized for being the maximal normal subgroup of $\;G\;$ contained in H.
Extra exercise: prove that
$$N=\ker\phi=\bigcap_{g\in G}H^g\;,\;\;\text{with}\;\;H^g:=g^{-1}Hg$$
Timbuc
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