T-group (mathematics)

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In mathematics, in the field of group theory, a T-group is a group in which the property of normality is transitive, that is, every subnormal subgroup is normal. Here are some facts about T-groups:

Every simple group is a T-group.
Every abelian group is a T-group.
Every Hamiltonian group is a T-group.
Every nilpotent T-group is either abelian or Hamiltonian, because in a nilpotent group, every subgroup is subnormal.
Every solvable T-group is metabelian.
Every normal subgroup of a T-group is a T-group.
Every homomorphic image of a T-group is a T-group.

References

Robinson, Derek J.S. (1996), A Course in the Theory of Groups, Berlin, New York: Springer-Verlag, ISBN 978-0-387-94461-6

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