Lie algebras MOC

Nilpotent Lie algebra

A Lie algebra 𝔤 is nilpotent iff its lower central series

𝔤0=𝔤,𝔤𝑛+1=[𝔤,𝔤𝑛]

terminates in the zero subalgebra, lie i.e. 𝔤𝑛 =0 for some 𝑛 ∈ℕ.¹ Special cases are an Abelian Lie algebra and a Solvable Lie algebra.

Properties

1. If 𝔤 is nilpotent, then so too are all subalgebras and homomorphic images.
2. If 𝔤/𝔷(𝔤) is nilpotent then so too is 𝔤.
3. If 𝔤 ≠0 is nilpotent then 𝔷(𝔤) ≠0.
4. Engel’s theorem.

Proof of 1–3

Clearly if 𝔞 ≤𝔤, then 𝔞𝑛 ≤𝔤𝑛 for 𝑛 ∈ℕ0, so if the latter terminates so to does the former. Similarly given a epimorphism 𝜑 :𝔤 ↠𝔥 we have 𝜑(𝔤0) =𝔥0, and given 𝜑(𝔤𝑛) =𝔥𝑛

𝜑(𝔤𝑛+1)=𝜑([𝔤,𝔤𝑛])=[𝜑(𝔤),𝜑(𝔤𝑛)]=[𝔥,𝔥𝑛]=𝔥𝑛+1

proving ^P1 by induction.

Say 𝔤𝑛 ⊴𝔷(𝔤), then 𝔤𝑛+1 =0, proving ^P2.

The last nonzero term in the lower central series is central., proving ^P3.

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Footnotes

1. 1972. Introduction to Lie Algebras and Representation Theory, §3.2, pp. 11–12 ↩