Anti-commutative anti-associative algebras. Acaa-algebras

Abstract

Let (A,μ) be a nonassociative algebra over a field of characteristic zero. The polarization process allows us to associate two other algebras, and this correspondence is one-one, one commutative, the other anti-commutative. Assume that μ satisfies a quadratic identity Σσ ∈ 3 aσμ(μ(xσ(i),xσ(j)),xσ(k)-aσμ(xσ(i),μ(xσ(j),xσ(k))=0. Under certain conditions, the polarization of such a multiplication determines an anticommutative multiplication also verifying a quadratic identity. Now only two identities are possible, the first is the Jacobi identity which makes this anticommutative multiplication a Lie algebra and the multiplication μ is Lie admissible, the second, less classical is given by [[x,y],z]=[[y,z],x]=[[z,x],y]. Such a multiplication is here called Acaa for Anticommutative and Antiassociative. We establish some properties of this type of algebras.

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