Normalizer-relatively normal subgroup

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This article describes a property that can be evaluated for a triple of a group, a subgroup of the group, and a subgroup of that subgroup.
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Definition

Suppose ${\displaystyle H\leq K\leq G}$ are groups. We say that ${\displaystyle H}$ is a normalizer-relatively normal subgroup of ${\displaystyle K}$ with respect to ${\displaystyle G}$ if the following equivalent conditions are satisfied:

• Whenever ${\displaystyle K\leq L\leq G}$ is such that ${\displaystyle K}$ is normal in ${\displaystyle L}$, ${\displaystyle H}$ is also normal in ${\displaystyle L}$.
• The normalizer ${\displaystyle N_{G}(K)}$ is contained in the normalizer ${\displaystyle N_{G}(H)}$.
• ${\displaystyle H}$ is normal in ${\displaystyle N_{G}(K)}$.

Relation with other properties

Stronger properties

• Middle-characteristic subgroup
• Strongly closed subgroup
• Weakly closed subgroup: For full proof, refer: Weakly closed implies normalizer-relatively normal

Weaker properties

• Relatively normal subgroup