Lie operad
Appearance
This article relies largely or entirely on a single source. (May 2024) |
In mathematics, the Lie operad is an operad whose algebras are Lie algebras. The notion (at least one version) was introduced by Ginzburg & Kapranov (1994) in their formulation of Koszul duality.
Definition à la Ginzburg–Kapranov[edit]
Fix a base field k and let denote the free Lie algebra over k with generators and the subspace spanned by all the bracket monomials containing each exactly once. The symmetric group acts on by permutations of the generators and, under that action, is invariant. The operadic composition is given by substituting expressions (with renumbered variables) for variables. Then, is an operad.[1]
Koszul-Dual[edit]
The Koszul-dual of is the commutative-ring operad, an operad whose algebras are the commutative rings over k.
Notes[edit]
- ^ Ginzburg & Kapranov 1994, § 1.3.9.
References[edit]
- Ginzburg, Victor; Kapranov, Mikhail (1994), "Koszul duality for operads", Duke Mathematical Journal, 76 (1): 203–272, doi:10.1215/S0012-7094-94-07608-4, MR 1301191
External links[edit]