Algebraically closed metabelian lie algebras

A graded Lie algebra is thin if it is generated by two elements of degree 1 and each of its homogeneous ideals is located between two consecutive terms of the lower central series. In this paper we give a complete classification of the metabelian thin Lie algebras and their graded automorphism group

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

Lie centre-by-metabelian group algebras over fields have been classified by various authors. This classification is extended to group algebras over commutative rings.  2002 Elsevier Science (USA)