In-normalizer operator

This article defines a subgroup property modifier (a unary subgroup property operator) -- viz an operator that takes as input a subgroup property and outputs a subgroup property

View a complete list of subgroup property modifiers OR View a list of all subgroup property operators (possibly with multiple inputs)

Definition

The in-normalizer operator is a map from the subgroup property space to itself that takes as input a subgroup property ${\displaystyle p}$ and outputs a subgroup property ${\displaystyle q}$ defined as follows: ${\displaystyle H}$ satisfies property ${\displaystyle q}$ in ${\displaystyle G}$ if and only if ${\displaystyle H}$ satisfies property ${\displaystyle p}$ in ${\displaystyle N_G(H)}$.

Application

Important instances of application of the in-normalizer operator:

• central factor of normalizer: obtained from central factor
• very weakly cocentral subgroup: obtained from cocentral subgroup
• AQIN-subgroup: obtained from Abelian-quotient subgroup

Properties

Monotonicity

This subgroup property modifier is monotone, viz if ${\displaystyle p\le q}$ are subgroup properties and ${\displaystyle f}$ is the operator, then ${\displaystyle f(p)\le f(q)}$

If ${\displaystyle p\le q}$ the the in-normalizer of ${\displaystyle p}$ is also ${\displaystyle \le }$ the in-normalizer of ${\displaystyle q}$.

Idempotence

This subgroup property modifier is idempotent, viz applying it twice to a subgroup property has the same effect as applying it once

The in-normalizer operator is idempotent, in the sense that applying it twice to a given subgroup property has the same effect as applying it once. An element is a fixed-point under this operator if and only if it is a in-normalizer subgroup property.

Conditionally ascendant

If ${\displaystyle p}$ is stronger than the property of being a normal subgroup, then ${\displaystyle p}$ is stronger than the in-normalizer of ${\displaystyle p}$. In any case, the conjunction of ${\displaystyle p}$ with the property of being normal, is stronger than the in-normalizer of ${\displaystyle p}$.

This is true of all the examples mentioned above.

Identity-true implies self-normalizing

The property of being the improper subgroup (that is, being the whole group) gets mapped under the in-normalizer operator to the property of being a self-normalizing subgroup. This, along with the monotonicity, tells us that any identity-true subgroup rpoperty gets mapped under the in-normalizer operator to a property weaker than the property of being a self-normalizing subgroup.