Symmetric Composition Algebras

In this paper we prove that the generic cyclotomic Hecke algebras for imprimitive complex reflection groups are symmetric over any ring containing inverses of the parameters. For this we show that the determinant of the Gram matrix of a certain canonical symmetrizing form introduced by K. Bremke and

The finite dimensional flexible composition algebras include the Hurwitz alge-Ž . bras composition algebras with unit element , but also other interesting classes of algebras: the para-Hurwitz and the Okubo algebras. The above mentioned algebras present many symmetries, and this is reflected in thei

Let θ be an involution of a semisimple Lie algebra g, let g θ denote the fixed Lie subalgebra, and assume the Cartan subalgebra of g has been chosen in a suitable way. We construct a quantum analog of U g θ which can be characterized as the unique subalgebra of the quantized enveloping algebra of g

## An algebra A with multiplication are given by u∂ i • v∂ j = v∂ j u ∂ i . An analogue of the Amitsur-Levitzki theorem for right-symmetric Witt algebras is established. Rightsymmetric Witt algebras of rank n satisfy the standard right-symmetric identity of degree 2n The minimal degree for left p