Is a Subgroup Characteristic in its Normalizer?

Let $G=C_p\times C_p$ and $H$ any subgroup of order $p$. Then $N_G(H)=G$ but $H$ is not characteristic in $G$.


The normalizer of any subgroup of an abelian group is the whole group, but there are subgroups of abelian groups that are not characteristic.

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Abstract Algebra

Group Theory

Finite Groups

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