Lie ring in which every derivation-invariant subring is characteristic
This article defines a Lie ring property: a property that can be evaluated to true/false for any Lie ring.
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VIEW RELATED: Lie ring property implications | Lie ring property non-implications |Lie ring metaproperty satisfactions | Lie ring metaproperty dissatisfactions | Lie ring property satisfactions | Lie ring property dissatisfactions
Definition
A Lie ring in which every derivation-invariant subring is characteristic is a Lie ring in which every derivation-invariant Lie subring is a characteristic subring.
Facts
- Not every Lie ring is of this type. Further information: Derivation-invariant not implies characteristic