Birkhoff-Witt theorem

Poincaré–Birkhoff–Witt theorem

A theorem about the representability of Lie algebras in associative algebras. Let $ G $ be a Lie algebra over a field $ k $, let $ U(G) $ be its universal enveloping algebra, and let $ B = \{ {b _ {i} } : {i \in I } \} $ be a basis of the algebra $ G $ which is totally ordered in some way. All the possible finite products $ b _ {\alpha _ {1} } \dots b _ {\alpha _ {r} } $, where $ \alpha _ {1} \leq \dots \leq \alpha _ {r} $, then form a basis of the algebra $ U(G) $, and it thus follows that the canonical homomorphism $ G \rightarrow U(G) $ is a monomorphism.

It is possible to construct a Lie algebra $ L(R) $ for any associative algebra $ R $ by replacing the operation of multiplication in $ R $ with the commutator operation

$$ [xy] = xy - yx . $$

The Birkhoff–Witt theorem is sometimes formulated as follows: For any Lie algebra $ G $ over any field $ k $ there exists an associative algebra $ R $ over this field such that $ G $ is isomorphically imbeddable in $ L(R) $.

The first variant of this theorem was obtained by H. Poincaré [1]; the theorem was subsequently completely demonstrated by E. Witt [2] and G.D. Birkhoff [3]. The theorem remains valid if $ k $ is a principal ideal domain [4], in particular for Lie rings without operators, i.e. over $ \mathbf Z $, but in the general case of Lie algebras over an arbitrary domain of operators the theorem is not valid [5].

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