Derivation-invariant Lie subring

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 rings of the subgroup property:
View other analogues of characteristicity | View other analogues in Lie rings of subgroup properties

Definition

A subring ${\displaystyle A}$ of a Lie ring ${\displaystyle L}$ is termed derivation-invariant if ${\displaystyle d(A)\subseteq A}$ for every derivation ${\displaystyle d}$ of ${\displaystyle L}$.

Relation with other properties

Stronger properties

In some special circumstances, any characteristic subring of a Lie ring is derivation-invariant. This happens when every derivation can be exponentiated to an automorphism of the Lie ring.

Weaker properties

• Ideal: This is a subring invariant under all inner derivations. The fact that any derivation-invariant subring is an ideal, is analogous to the fact that characteristic implies normal