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 H of a group G is termed a quotient-powering-invariant subgroup if, for any prime number p such that G is a powered for p, the quotient group G/H is also powered for p.

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

Properties whose conjunction with powering-invariance implies quotient-powering-invariance

Property Proof of conjunction statement
central subgroup powering-invariant and central implies quotient-powering-invariant
normal subgroup contained in the hypercenter normal subgroup contained in the hypercenter that is powering-invariant is quotient-powering-invariant