Closure-characteristic subgroup: Difference between revisions

Latest revision as of 17:30, 21 December 2014

This article defines a subgroup property: a property that can be evaluated to true/false given a group and a subgroup thereof, invariant under subgroup equivalence. View a complete list of subgroup properties [SHOW MORE]
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Definition

QUICK PHRASES: normal closure is characteristic, join of all conjugates is characteristic

A subgroup of a group is termed closure-characteristic, or a subgroup whose normal closure is characteristic, if its normal closure in the whole group is a characteristic subgroup. In symbols, a subgroup $H$ of a group $G$ is termed closure-characteristic if the normal closure $H^{G}$ of $H$ in $G$ is characteristic in $G$ .

Relation with other properties

Stronger properties

Property	Meaning	Proof of implication	Intermediate notions
characteristic subgroup	invariant under all automorphisms		\|FULL LIST, MORE INFO
automorph-dominating subgroup	all automorphic subgroups are contained in conjugate subgroups		\|FULL LIST, MORE INFO
automorph-conjugate subgroup	all automorphic subgroups are conjugate	(via automorph-dominating)	\|FULL LIST, MORE INFO
join of automorph-conjugate subgroups	join of automorph-conjugate subgroups		\|FULL LIST, MORE INFO
Sylow subgroup	$p$ -subgroup of finite group with index relatively prime to $p$		\|FULL LIST, MORE INFO
join of Sylow subgroups	join of Sylow subgroups		\|FULL LIST, MORE INFO
Hall subgroup	subgroup of finite group whose order and index are relatively prime		\|FULL LIST, MORE INFO
contranormal subgroup	normal closure is whole group		\|FULL LIST, MORE INFO

Conjunction with other properties

Any normal subgroup that is also closure-characteristic, is characteristic.

Metaproperties

BEWARE! This section of the article uses terminology local to the wiki, possibly without giving a full explanation of the terminology used (though efforts have been made to clarify terminology as much as possible within the particular context)

Metaproperty name	Satisfied?	Proof	Difficulty level (0-5)	Statement with symbols
trim subgroup property	Yes	(obvious)	0	In any group $G$ , both the trivial subgroup ${e}$ and the whole group $G$ are closure-characteristic.
strongly join-closed subgroup property	Yes	closure-characteristicity is strongly join-closed		Suppose $G$ is a group and $H_{i}, i \in I$ are all closure-characteristic subgroups of $G$ . Then the join $⟨ H_{i} ⟩_{i \in I}$ is also closure-characteristic.

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 | [[Weaker than::characteristic subgroup]] || invariant under all [[automorphism]]s || || || {{intermediate notions short|closure-characteristic subgroup|characteristic subgroup}}
 |-
-| [[Weaker than::automorph-conjugate subgroup]] || all [[automorphic subgroups]] are [[conjugate subgroups|conjugate]] || || || {{intermediate notions short|closure-characteristic subgroup|automorph-conjugate subgroup}}
+| [[Weaker than::automorph-dominating subgroup]] || all [[automorphic subgroups]] are contained in [[conjugate subgroups]] || || || {{intermediate notions short|closure-characteristic subgroup|automorph-dominating subgroup}}
+|-
+| [[Weaker than::automorph-conjugate subgroup]] || all [[automorphic subgroups]] are [[conjugate subgroups|conjugate]] || (via automorph-dominating) || || {{intermediate notions short|closure-characteristic subgroup|automorph-conjugate subgroup}}
 |-
 | [[Weaker than::join of automorph-conjugate subgroups]] || [[join of subgroups|join]] of [[automorph-conjugate subgroup]]s || || || {{intermediate notions short|closure-characteristic subgroup|join of automorph-conjugate subgroups}}