3-subnormal subgroup: Difference between revisions
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{{subgroup property}} | {{subgroup property composition|normal subgroup|2-subnormal subgroup}} | ||
==Definition== | ==Definition== | ||
Revision as of 21:10, 24 October 2008
This page describes a subgroup property obtained as a composition of two fundamental subgroup properties: normal subgroup and 2-subnormal subgroup
View other such compositions|View all subgroup properties
Definition
Symbol-free definition
A subgroup of a group is termed a 3-subnormal subgroup if it satisfies the following equivalent conditions:
- It is a subnormal subgroup and its subnormal depth is at most three.
- It is a 2-subnormal subgroup of a normal subgroup.
- It is a 2-subnormal subgroup in its normal closure.
- It is a normal subgroup of a 2-subnormal subgroup.
Relation with other properties
Stronger properties
- Normal subgroup
- 2-subnormal subgroup
- Commutator of a 2-subnormal subgroup and a subset: For full proof, refer: Commutator of a 2-subnormal subgroup and a subset implies 3-subnormal