Let H be a Sylow p-subgroup of G. Prove that H is the only Sylow p-subgroup of G contained in N(H).












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Let H be a Sylow p-subgroup of G. Prove that H is the only Sylow p-subgroup of G contained in N(H).




I saw a proof online that was pretty long, but can't I just argue that if $H subset N(H)$, then $H$ conjugates with itself. Then there is only one such p-subgroup H of G by the third Sylow Theorem?










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    Let H be a Sylow p-subgroup of G. Prove that H is the only Sylow p-subgroup of G contained in N(H).




    I saw a proof online that was pretty long, but can't I just argue that if $H subset N(H)$, then $H$ conjugates with itself. Then there is only one such p-subgroup H of G by the third Sylow Theorem?










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      Let H be a Sylow p-subgroup of G. Prove that H is the only Sylow p-subgroup of G contained in N(H).




      I saw a proof online that was pretty long, but can't I just argue that if $H subset N(H)$, then $H$ conjugates with itself. Then there is only one such p-subgroup H of G by the third Sylow Theorem?










      share|cite|improve this question














      Let H be a Sylow p-subgroup of G. Prove that H is the only Sylow p-subgroup of G contained in N(H).




      I saw a proof online that was pretty long, but can't I just argue that if $H subset N(H)$, then $H$ conjugates with itself. Then there is only one such p-subgroup H of G by the third Sylow Theorem?







      abstract-algebra group-theory normal-subgroups sylow-theory






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      asked Dec 6 at 17:50









      numericalorange

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          Note that if $|G|=p^km,pnot |m$ and $H$ is $p$-sylow subgroup then $|H|=p^k$. Also $H$ is normal in $N(H)$ therefore $H$ is a normal $p$-sylow subgroup of $N(H)$ and any $p$-sylow subgroup of $N(H)$ is of the form $gHg^{-1}$ where $gin N(H)$ by 2nd sylow theorem. But $H$ is normal in $N(H)implies$ all conjunction of $H$ by elements of $N(H)$ is same as $H$. That is $H$ is the only normal subgroup of $N(H)$.






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            Note that if $|G|=p^km,pnot |m$ and $H$ is $p$-sylow subgroup then $|H|=p^k$. Also $H$ is normal in $N(H)$ therefore $H$ is a normal $p$-sylow subgroup of $N(H)$ and any $p$-sylow subgroup of $N(H)$ is of the form $gHg^{-1}$ where $gin N(H)$ by 2nd sylow theorem. But $H$ is normal in $N(H)implies$ all conjunction of $H$ by elements of $N(H)$ is same as $H$. That is $H$ is the only normal subgroup of $N(H)$.






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              Note that if $|G|=p^km,pnot |m$ and $H$ is $p$-sylow subgroup then $|H|=p^k$. Also $H$ is normal in $N(H)$ therefore $H$ is a normal $p$-sylow subgroup of $N(H)$ and any $p$-sylow subgroup of $N(H)$ is of the form $gHg^{-1}$ where $gin N(H)$ by 2nd sylow theorem. But $H$ is normal in $N(H)implies$ all conjunction of $H$ by elements of $N(H)$ is same as $H$. That is $H$ is the only normal subgroup of $N(H)$.






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                Note that if $|G|=p^km,pnot |m$ and $H$ is $p$-sylow subgroup then $|H|=p^k$. Also $H$ is normal in $N(H)$ therefore $H$ is a normal $p$-sylow subgroup of $N(H)$ and any $p$-sylow subgroup of $N(H)$ is of the form $gHg^{-1}$ where $gin N(H)$ by 2nd sylow theorem. But $H$ is normal in $N(H)implies$ all conjunction of $H$ by elements of $N(H)$ is same as $H$. That is $H$ is the only normal subgroup of $N(H)$.






                share|cite|improve this answer












                Note that if $|G|=p^km,pnot |m$ and $H$ is $p$-sylow subgroup then $|H|=p^k$. Also $H$ is normal in $N(H)$ therefore $H$ is a normal $p$-sylow subgroup of $N(H)$ and any $p$-sylow subgroup of $N(H)$ is of the form $gHg^{-1}$ where $gin N(H)$ by 2nd sylow theorem. But $H$ is normal in $N(H)implies$ all conjunction of $H$ by elements of $N(H)$ is same as $H$. That is $H$ is the only normal subgroup of $N(H)$.







                share|cite|improve this answer












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                answered Dec 6 at 18:14









                UserS

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