Abelian characteristic subgroup: Difference between revisions
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==Definition== | ==Definition== | ||
A [[subgroup]] <math>H</math> of a [[group]] <math>G</math> is termed an '''abelian characteristic subgroup''' if <math>H</math> is [[abelian group|abelian]] as a group (i.e., <math>H</math> is an [[abelian subgroup]] of <math>G</math> and also, <math>H</math> is a [[characteristic subgroup]] of <math>G</math>, i.e., <math>H</math> is invariant under all [[automorphism]]s of <math>G</math>. | |||
==Examples== | |||
{{subgroups satisfying group-subgroup property conjunction sorted by importance rank|characteristic subgroup|abelian group}} | |||
== | ==Facts== | ||
* [[Second half of lower central series of nilpotent group comprises abelian groups]]: In particular, this means that for a group <math>G</math> of nilpotency class <math>c</math>, all the subgroups <math>\gamma_k(G), k \ge (c + 1)/2</math> are abelian characteristic subgroups. | |||
* The [[center]] of any group is an abelian characteristic subgroup. | |||
==Relation with other properties== | ==Relation with other properties== | ||
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| [[Weaker than::characteristic subgroup of center]] || [[characteristic subgroup]] ''of'' the [[center]] || || || {{intermediate notions short|abelian characteristic subgroup|characteristic subgroup of center}} | | [[Weaker than::characteristic subgroup of center]] || [[characteristic subgroup]] ''of'' the [[center]] || || || {{intermediate notions short|abelian characteristic subgroup|characteristic subgroup of center}} | ||
|- | |- | ||
| [[Weaker than::characteristic subgroup of abelian group]] || the whole group is an [[abelian group]] || || || {{intermediate notions short|abelian characteristic subgroup|characteristic subgroup of abelian group}} | | [[Weaker than::characteristic subgroup of abelian group]] || the whole group is an [[abelian group]] and the subgroup is characteristic || || || {{intermediate notions short|abelian characteristic subgroup|characteristic subgroup of abelian group}} | ||
|- | |- | ||
| [[Weaker than::maximal among abelian characteristic subgroups]] || || || || {{intermediate notions short|abelian characteristic subgroup|maximal among abelian characteristic subgroups}} | | [[Weaker than::maximal among abelian characteristic subgroups]] || || || || {{intermediate notions short|abelian characteristic subgroup|maximal among abelian characteristic subgroups}} | ||
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| [[Stronger than::abelian normal subgroup]] || abelian and a [[normal subgroup]] -- invariant under all [[inner automorphism]]s || follows from [[characteristic implies normal]] || follows from [[normal not implies characteristic in the collection of all groups satisfying a nontrivial finite direct product-closed group property]] || {{intermediate notions short|abelian normal subgroup|abelian characteristic subgroup}} | | [[Stronger than::abelian normal subgroup]] || abelian and a [[normal subgroup]] -- invariant under all [[inner automorphism]]s || follows from [[characteristic implies normal]] || follows from [[normal not implies characteristic in the collection of all groups satisfying a nontrivial finite direct product-closed group property]] || {{intermediate notions short|abelian normal subgroup|abelian characteristic subgroup}} | ||
|- | |||
| [[Stronger than::abelian subnormal subgroup]] || abelian and a [[subnormal subgroup]] || || || {{intermediate notions short|abelian subnormal subgroup|abelian characteristic subgroup}} | |||
|- | |- | ||
| [[Stronger than::class two characteristic subgroup]] || characteristic subgroup that is also a [[group of nilpotency class two]] || || || {{intermediate notions short|class two characteristic subgroup|abelian characteristic subgroup}} | | [[Stronger than::class two characteristic subgroup]] || characteristic subgroup that is also a [[group of nilpotency class two]] || || || {{intermediate notions short|class two characteristic subgroup|abelian characteristic subgroup}} | ||
Latest revision as of 20:39, 12 August 2013
This article describes a property that arises as the conjunction of a subgroup property: characteristic subgroup with a group property (itself viewed as a subgroup property): Abelian group
View a complete list of such conjunctions
Definition
A subgroup of a group is termed an abelian characteristic subgroup if is abelian as a group (i.e., is an abelian subgroup of and also, is a characteristic subgroup of , i.e., is invariant under all automorphisms of .
Examples
Here are some examples of subgroups in basic/important groups satisfying the property:
Here are some examples of subgroups in relatively less basic/important groups satisfying the property:
| Group part | Subgroup part | Quotient part | |
|---|---|---|---|
| Center of dihedral group:D8 | Dihedral group:D8 | Cyclic group:Z2 | Klein four-group |
Here are some examples of subgroups in even more complicated/less basic groups satisfying the property:
Facts
- Second half of lower central series of nilpotent group comprises abelian groups: In particular, this means that for a group of nilpotency class , all the subgroups are abelian characteristic subgroups.
- The center of any group is an abelian characteristic subgroup.
Relation with other properties
Stronger properties
| Property | Meaning | Proof of implication | Proof of strictness (reverse implication failure) | Intermediate notions |
|---|---|---|---|---|
| cyclic characteristic subgroup | cyclic group and a characteristic subgroup of the whole group | |FULL LIST, MORE INFO | ||
| characteristic central subgroup | central subgroup (i.e., contained in the center) and a characteristic subgroup of the whole group | |FULL LIST, MORE INFO | ||
| abelian critical subgroup | |FULL LIST, MORE INFO | |||
| characteristic subgroup of center | characteristic subgroup of the center | |FULL LIST, MORE INFO | ||
| characteristic subgroup of abelian group | the whole group is an abelian group and the subgroup is characteristic | |FULL LIST, MORE INFO | ||
| maximal among abelian characteristic subgroups | |FULL LIST, MORE INFO | |||
| abelian fully invariant subgroup | abelian and a fully invariant subgroup -- invariant under all endomorphisms | |FULL LIST, MORE INFO |
Weaker properties
| Property | Meaning | Proof of implication | Proof of strictness (reverse implication failure) | Intermediate notions |
|---|---|---|---|---|
| abelian normal subgroup | abelian and a normal subgroup -- invariant under all inner automorphisms | follows from characteristic implies normal | follows from normal not implies characteristic in the collection of all groups satisfying a nontrivial finite direct product-closed group property | |FULL LIST, MORE INFO |
| abelian subnormal subgroup | abelian and a subnormal subgroup | |FULL LIST, MORE INFO | ||
| class two characteristic subgroup | characteristic subgroup that is also a group of nilpotency class two | |FULL LIST, MORE INFO | ||
| nilpotent characteristic subgroup | characteristic subgroup that is also a nilpotent group | follows from abelian implies nilpotent | follows from nilpotent not implies abelian | |FULL LIST, MORE INFO |
| solvable characteristic subgroup | characteristic subgroup that is also a solvable group | (via nilpotent) | (via nilpotent) | |FULL LIST, MORE INFO |