multibracket

Multibracket is a concept used in algebra and geometry to denote a family of multilinear operations that generalize the binary Lie bracket. A multibracket of arity k is a linear map that takes k arguments from a vector space (or module) and outputs another element of the same space. In many frameworks, brackets of several different arities are included, collectively forming a higher algebraic structure. The defining identities extend the idea of Jacobi compatibility to higher arities, often in a graded or homotopy-theoretic setting.

Two common frameworks for multibrackets are n-Lie algebras and L-infinity algebras. An n-Lie algebra (Filippov algebra)

Examples and applications include the Nambu bracket, a ternary multibracket on smooth functions that generalizes the