Extensibility-stable function property

This article defines a function metaproperty; a property that can be evaluated for properties of functions from a group to itself

Template:Formalism for function metaproperty

Definition

Symbol-free definition

A property ${\displaystyle p}$ of functions from a group to itself is said to be extensibility-stable if, given any subgroup of a group, and a function on the subgroup satisfying property ${\displaystyle p}$ in the subgroup, there is a function on the group satisfying property ${\displaystyle p}$ that extends the given function.

Definition with symbols

A property ${\displaystyle p}$ of functions from a group to itself is said to be extensibility-stable if, given any groups ${\displaystyle H\le G}$, and a function ${\displaystyle f:H\to H}$ satisfying property ${\displaystyle p}$ in ${\displaystyle H}$, there is a function ${\displaystyle f^{\prime }:G\to G}$ such that ${\displaystyle f^{\prime }}$ satisfies ${\displaystyle p}$ and such that the restriction of ${\displaystyle f^{\prime }}$ to ${\displaystyle H}$ is ${\displaystyle f}$.

In terms of the extensibility operator

Extensibility-stable function properties are precisely those function properties that are fixedp oints underthe extensibility operator on the function property space.

Examples

Inner automorphism

Any inner automorphism of a subgroup lifts to an inner automorphism of the whole group. This is because we can take the same conjugating element from the subgroup and use it to define a conjugation on the whole group. Note that since for a given inner automorphism, the choice of conjugating element is not unique, the lift is in general not unique. For full proof, refer: Inner is extensibility-stable