A note on the Lie algebras g(m∞)

Let K be a field of characteristic 3 and let G be a non-abelian group. It is shown that the group algebra KG is Lie centrally metabelian if and only if the commutator subgroup GЈ is cyclic of order 3. In view of the results of R. K. Sharma Ž . and J. B. Srivastava 1992, J. Algebra 151, 476᎐486 , thi

We define the notion of a "Lie \(k\)-algebra" to be a ( \(k+1\) )-ary skew-symmetric operation on a bigraded vector space which satislies a certain relation of degree \(2 k+1\). The notion of Lie 1 -algebra coincides with the notion of Lie superalgebra. An ordinary Lie algebra is precisely a Lie 1 -

Let g,, be a real Lie algebra and g its complexification. The aim of this paper is to study the Lie-CRstructures (in the following we shall call them just LCR-structures) on g,. To an LCR-structure corresponds a CR-structure on the associated real Lie group Go for which right and left translations a

We prove a fundamental case of a conjecture of the first author which expresses the homology of the extension of the Heisenberg Lie algebra by C½t=ðt kþ1 Þ in terms of the homology of the Heisenberg Lie algebra itself. More specifically, we show that both the 0th and ðk þ 1Þth x-graded components of

Linear algebraic methods are used to classify the Lie algebras L s r , presented by generators and relations. They were introduced as an algebraic model for quantized Hamiltonians.