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Transitively normal subgroup

In mathematics, in the field of group theory, a subgroup of a group is said to be transitively normal in the group if every normal subgroup of the subgroup is also normal in the whole group. In symbols, is a transitively normal subgroup of if for every normal in , we have that is normal in .

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In mathematics, in the field of group theory, a subgroup of a group is said to be transitively normal in the group if every normal subgroup of the subgroup is also normal in the whole group. In symbols, H {\displaystyle H} is a transitively normal subgroup of G {\displaystyle G} if for every K {\displaystyle K} normal in H {\displaystyle H} , we have that K {\displaystyle K} is normal in G {\displaystyle G} .1

An alternate way to characterize these subgroups is: every normal subgroup preserving automorphism of the whole group must restrict to a normal subgroup preserving automorphism of the subgroup.

Here are some facts about transitively normal subgroups:

  • Every normal subgroup of a transitively normal subgroup is normal.
  • Every direct factor, or more generally, every central factor is transitively normal. Thus, every central subgroup is transitively normal.
  • A transitively normal subgroup of a transitively normal subgroup is transitively normal.
  • A transitively normal subgroup is normal.
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See also

See also