Normalizer

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October 8th 2011, 01:19 PM
dwsmith

Normalizer

Let $H\leq G$ . Show that $H\leq N_G(h)$ . Give an example to show that this is not necessarily true if H is not a subgroup.

Since H is a subgroup e is in H. $e=xx^{-1}$ so $x,x^{-1}\in H$ .

How can I show the proposition?

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