Quotient-powering-invariant subgroup: Difference between revisions
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! Property !! Meaning !! Proof of implication !! Proof of strictness (reverse implication failure) !! Intermediate notions | ! Property !! Meaning !! Proof of implication !! Proof of strictness (reverse implication failure) !! Intermediate notions | ||
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| [[Weaker than::normal subgroup of finite group]] || || || || | | [[Weaker than::normal subgroup of finite group]] || the whole group is finite || || || | ||
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| [[Weaker than::normal subgroup of periodic group]] || || || || | | [[Weaker than::normal subgroup of periodic group]] || every element in the whole group has finite order || || || | ||
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| [[Weaker than::normal subgroup of finite index]] || || [[normal of finite index implies quotient-powering-invariant]] || || | | [[Weaker than::normal subgroup of finite index]] || the quotient group is finite || [[normal of finite index implies quotient-powering-invariant]] || || | ||
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| [[Weaker than::finite normal subgroup]] || || [[finite normal implies quotient-powering-invariant]] || || | | [[Weaker than::finite normal subgroup]] || the normal subgroup is finite || [[finite normal implies quotient-powering-invariant]] || || | ||
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| [[Weaker than::direct factor]] || normal subgroup with normal complement || (via complemented normal) || (via complemented normal) || {{intermediate notions short|direct factor|quotient-powering-invariant subgroup}} | | [[Weaker than::direct factor]] || normal subgroup with normal complement || (via complemented normal) || (via complemented normal) || {{intermediate notions short|direct factor|quotient-powering-invariant subgroup}} | ||
Revision as of 01:51, 12 February 2013
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]
Definition
A normal subgroup of a group is termed a quotient-powering-invariant subgroup if, for any prime number such that is a powered for , the quotient group is also powered for .
Relation with other properties
Stronger properties
| Property | Meaning | Proof of implication | Proof of strictness (reverse implication failure) | Intermediate notions |
|---|---|---|---|---|
| normal subgroup of finite group | the whole group is finite | |||
| normal subgroup of periodic group | every element in the whole group has finite order | |||
| normal subgroup of finite index | the quotient group is finite | normal of finite index implies quotient-powering-invariant | ||
| finite normal subgroup | the normal subgroup is finite | finite normal implies quotient-powering-invariant | ||
| direct factor | normal subgroup with normal complement | (via complemented normal) | (via complemented normal) | |FULL LIST, MORE INFO |
| complemented normal subgroup | normal subgroup with a (possibly non-normal) complement | complemented normal implies quotient-powering-invariant | |FULL LIST, MORE INFO | |
| characteristic subgroup of abelian group | characteristic subgroup and the whole group is an abelian group | characteristic subgroup of abelian group is quotient-powering-invariant | |FULL LIST, MORE INFO |
Weaker properties
| Property | Meaning | Proof of implication | Proof of strictness (reverse implication failure) | Intermediate notions |
|---|---|---|---|---|
| powering-invariant subgroup | quotient-powering-invariant implies powering-invariant | powering-invariant not implies quotient-powering-invariant | |FULL LIST, MORE INFO |