Universal graded Lie algebras

In this paper, a complete generalization of Herstein's theorem to the case of Lie color algebras is obtained. Let G be an abelian group, F a field of characteristic not 2, : G × G → F \* an antisymmetric bicharacter. Suppose A = g∈G A g is a G-graded simple associative algebra over F . ## In this p

We present the classification of one type of graded nilpotent Lie algebras. We start from the gradation related to the filtration which is produced in a natural way by the descending central sequence in a Lie algebra. These gradations were studied by Vergne [Bull. Soc. Math. France 98 (1970) 81-116]

A Lie algebra is said to be split graded if it is graded by a torsion free abelian group Q in such a way that the subalgebra 0 is abelian and the operators ad 0 are diagonalized by the grading. The elements of Q \ 0 with α = 0 are called roots and a root α is said to be integrable if there are root

We describe the isomorphism classes of infinite-dimensional N-graded Lie algebras of maximal class over fields of odd characteristic generated by their first homogeneous component.