Nilpotent derivation-invariant Lie subring

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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: unipotent automorphism-invariant subgroup
View other analogues of unipotent automorphism-invariant 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 nilpotent derivation-invariant if it is invariant under all the nilpotent derivations of the whole Lie ring (i.e., all derivations for which some power is zero).

Relation with other properties

Stronger properties