# Normalizer-relatively normal subgroup

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## Contents

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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.
View other such properties

## Definition

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

• Whenever $K \le L \le G$ is such that $K$ is normal in $L$, $H$ is also normal in $L$.
• The normalizer $N_G(K)$ is contained in the normalizer $N_G(H)$.
• $H$ is normal in $N_G(K)$.