Left-transitively fixed-depth subnormal subgroup: Difference between revisions

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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

A subgroup ${\displaystyle H}$ of a group ${\displaystyle K}$ is termed left-transitively fixed-depth subnormal in ${\displaystyle K}$ if there exists a natural number ${\displaystyle k\geq 1}$ such that ${\displaystyle H}$ is left-transitively ${\displaystyle k}$-subnormal in ${\displaystyle K}$. In other words, whenever ${\displaystyle K}$ is a ${\displaystyle k}$-subnormal subgroup of a group ${\displaystyle G}$, ${\displaystyle H}$ is also ${\displaystyle k}$-subnormal in ${\displaystyle G}$.

Note that any subgroup that is left-transitively ${\displaystyle k}$-subnormal is also left-transitively ${\displaystyle l}$-subnormal for ${\displaystyle l\geq k}$.

Relation with other properties

Stronger properties

• Characteristic subgroup: For characteristic subgroups, we can set ${\displaystyle k=1}$. For full proof, refer: Characteristic of normal implies normal
• Left-transitively 2-subnormal subgroup: Obtained by setting ${\displaystyle k=2}$. Also related:
  • Cofactorial automorphism-invariant subgroup

Weaker properties

• Subnormal subgroup: For full proof, refer: Normal not implies left-transitively fixed-depth subnormal

Related properties

• Right-transitively fixed-depth subnormal subgroup

Metaproperties

Transitivity

This subgroup property is transitive: a subgroup with this property in a subgroup with this property, also has this property in the whole group.
ABOUT THIS PROPERTY: View variations of this property that are transitive | View variations of this property that are not transitive
ABOUT TRANSITIVITY: View a complete list of transitive subgroup properties|View a complete list of facts related to transitivity of subgroup properties |Read a survey article on proving transitivity

If ${\displaystyle H\leq K\leq G}$ are such that ${\displaystyle H}$ is left-transitively ${\displaystyle k}$-subnormal in ${\displaystyle K}$ and ${\displaystyle K}$ is left-transitively ${\displaystyle l}$-subnormal in ${\displaystyle G}$, then ${\displaystyle H}$ is left-transitively ${\displaystyle \max\{k,l\}}$-subnormal in ${\displaystyle G}$.

Intersection-closedness

This subgroup property is finite-intersection-closed; a finite (nonempty) intersection of subgroups with this property, also has this property
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An intersection of finitely many such subgroups again has the property. In particular, the intersection of a left-transitively ${\displaystyle k}$-subnormal subgroup and a left-transitively ${\displaystyle l}$-subnormal subgroup is left-transitively ${\displaystyle \max\{k,l\}}$-subnormal.

Trimness

This subgroup property is trim -- it is both trivially true (true for the trivial subgroup) and identity-true (true for a group as a subgroup of itself).
View other trim subgroup properties | View other trivially true subgroup properties | View other identity-true subgroup properties

Template:Finite-join-closed

A join of finitely many such subgroups again has the property. In particular, the join of a left-transitively ${\displaystyle k}$-subnormal subgroup and a left-transitively ${\displaystyle l}$-subnormal subgroup is left-transitively ${\displaystyle \max\{k,l\}}$-subnormal.