Characteristicity is transitive for Lie rings

This article gives the statement, and possibly proof, of a Lie subring property (i.e., characteristic subring of a Lie ring) satisfying a Lie subring metaproperty (i.e., transitive Lie subring property)
View all Lie subring metaproperty satisfactions | View all Lie subring metaproperty dissatisfactions |Get help on looking up metaproperty (dis)satisfactions for Lie subring properties
Get more facts about characteristic subring of a Lie ring |Get facts that use property satisfaction of characteristic subring of a Lie ring | Get facts that use property satisfaction of characteristic subring of a Lie ring|Get more facts about transitive Lie subring property

ANALOGY: This is an analogue in Lie rings of a fact encountered in group. The old fact is: characteristicity is transitive.
Another analogue to the same fact, in the same new context, is: derivation-invariance is transitive
View other analogues of characteristicity is transitive|View other analogues from group to Lie ring (OR, View as a tabulated list)

Statement

If ${\displaystyle A\leq B\leq L}$ are Lie rings such that ${\displaystyle A}$ is a characteristic subring of ${\displaystyle B}$ and ${\displaystyle B}$ is a characteristic subring of ${\displaystyle L}$, then ${\displaystyle A}$ is a characteristic subring of ${\displaystyle L}$.

Related facts

• Derivation-invariance is transitive
• Derivation-invariant subring of ideal implies ideal