Characteristic Lie subring: Difference between revisions
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==Relation with properties in related groups== | ==Relation with properties in related groups== | ||
* [[Lazard correspondence establishes a correspondence between characteristic Lazard Lie | * [[Lazard correspondence establishes a correspondence between characteristic Lazard Lie subgroups and characteristic Lazard Lie subrings]] | ||
* [[Lazard correspondence establishes a correspondence between powering-invariant characteristic subgroups and powering-invariant characteristic subrings]] | |||
==Metaproperties== | ==Metaproperties== | ||
Revision as of 19:09, 29 June 2013
This article describes a Lie subring property: a property that can be evaluated for a subring of a Lie ring
View a complete list of such properties
VIEW RELATED: Lie subring property implications | Lie subring property non-implications | Lie subring metaproperty satisfactions | Lie subring metaproperty dissatisfactions | Lie subring property satisfactions |Lie subring property dissatisfactions
ANALOGY: This is an analogue in Lie ring of a property encountered in group. Specifically, it is a Lie subring property analogous to the subgroup property: characteristic subgroup
An alternative analogue of characteristic subgroup in Lie ring is: derivation-invariant Lie subring
View other analogues of characteristic subgroup | View other analogues in Lie rings of subgroup properties (OR, View as a tabulated list)
Definition
A subring of a Lie ring is termed a characteristic subring if it is invariant under all automorphisms of the Lie ring.
- Lazard correspondence establishes a correspondence between characteristic Lazard Lie subgroups and characteristic Lazard Lie subrings
- Lazard correspondence establishes a correspondence between powering-invariant characteristic subgroups and powering-invariant characteristic subrings
Metaproperties
Transitivity
This Lie subring property is transitive: a Lie subring with this property in a Lie subring with this property, also has this property.
View a complete list of transitive Lie subring properties
A characteristic Lie subring of a characteristic Lie subring is characteristic in the whole Lie ring. For full proof, refer: Characteristicity is transitive for Lie rings
Lie brackets
This Lie subring property is Lie bracket-closed: the Lie bracket of any two Lie subrings, both with this property, also has this property.
View a complete list of Lie bracket-closed Lie subring properties
The Lie bracket of two characteristic subrings of a Lie ring is again a characteristic subring. For full proof, refer: Characteristicity is Lie bracket-closed for Lie rings
Template:Intersection-closed Lie subring property
An arbitrary intersection of characteristic Lie subrings is a characteristic Lie subring.
Template:Join-closed Lie subring property
An arbitrary join of characteristic Lie subrings is a characteristic Lie subring.