Subgroup property modifier: Difference between revisions

Latest revision as of 00:21, 8 May 2008

This article is about the notion of property modifier for the [[{{{1}}} property space]]: it inputs a [[{{{1}}} property]] and outputs a [[{{{1}}} property]]

This article is about a general term. A list of important particular cases (instances) is available at Category:Subgroup property modifiers

Definition

Symbol-free definition

A subgroup property modifier is a function from the subgroup property space to itself that takes as input a subgroup property and outputs a subgroup property.

Examples

An example of a subgroup property modifier is the subordination operator, which takes as input a subgroup property $p$ , and outputs the property of being a subgroup, which can be connected to the whole group via a series of intermediate subgroups, each having property $p$ in the next. This is the Kleene-star closure with respect to the composition operator for subgroup properties.

Another example is the left transiter of a subgroup property. The left transiter of a subgroup property $p$ is the following subgroup property $q$ : $H$ has property $q$ in $G$ if whenever $G\leq K$ such that $G$ has property $p$ in $K$ , $H$ also has property $p$ in $K$ .

Related notions

Given a subgroup property modifier, we are often interested in the image space of the modifier: the collection of those subgroup properties that can be obtained by applying the modifier to some property. We are also interested in the fixed-point space: the collection of subgroup properties that remain unchanged on applying the modifier.

There are some subgroup property modifiers whose image space is the same as the fixed-point space; this is equivalent to the condition that applying the modifer twice has the same effect as applying it once. Such a subgroup property modifier is termed an idempotent subgroup property modifier.

There are other properties that nice subgroup property modifiers have. Check out:

Category:Subgroup property modifier properties

@@ Line 1: / Line 1: @@
 {{property modifier}}
+{{particularcases|[[:Category:Subgroup property modifiers]]}}
 ==Definition==
-==Symbol-free definition===
+===Symbol-free definition===
 A '''subgroup property modifier''' is a function from the [[subgroup property space]] to itself that takes as input a [[subgroup property]] and outputs a subgroup property.
+==Examples==
+An example of a subgroup property modifier is the [[subordination operator]], which takes as input a subgroup property <math>p</math>, and outputs the property of being a subgroup, which can be connected to the whole group via a series of intermediate subgroups, each having property <math>p</math> in the next. This is the Kleene-star closure with respect to the [[composition operator]] for subgroup properties.
+Another example is the [[left transiter]] of a subgroup property. The left transiter of a subgroup property <math>p</math> is the following subgroup property <math>q</math>: <math>H</math> has property <math>q</math> in <math>G</math> if whenever <math>G \le K</math> such that <math>G</math> has property <math>p</math> in <math>K</math>, <math>H</math> also has property <math>p</math> in <math>K</math>.
+==Related notions==
+Given a subgroup property modifier, we are often interested in the ''image space'' of the modifier: the collection of those subgroup properties that can be obtained by applying the modifier to some property. We are also interested in the ''fixed-point space'': the collection of subgroup properties that remain unchanged on applying the modifier.
+There are some subgroup property modifiers whose image space is the same as the fixed-point space; this is equivalent to the condition that applying the modifer twice has the same effect as applying it once. Such a subgroup property modifier is termed an [[idempotent subgroup property modifier]].
+There are other properties that ''nice'' subgroup property modifiers have. Check out:
+[[:Category:Subgroup property modifier properties]]