Enveloping algebras of simple three-dimensional Lie algebras

We observe that any finite-dimensional indecomposable module for a restricted Lie algebra over an algebraically closed field is a module for a finite-dimensional quotient of the universal enveloping algebra. These algebras form a two-parameter family which generalizes the notion of a reduced envelop

This paper examines the Lie structure of restricted universal enveloping algebras \(u(L)\) over fields of characteristic \(p>0\). It is determined precisely when \(u(L)\), considered as a Lie algebra, is soluble (for \(p>2\) ), nilpotent, or satisfies the Engel condition. 1993 Acadernic Press. Inc.

In this paper a series of dimensions is suggested which includes as first terms dimension of a vector space, Gelfand᎐Kirillov dimension, and superdimension. In terms of these dimensions we describe the change of a growth in transition from a Lie algebra to its universal enveloping algebra. Also, we

Let Fro(29) be the relatively free algebra of rank m \_> 2 in the nonlocally nilpotent variety 29 of Lie algebras over an infinite field of any characteristic. We study the problem of finite generation of the algebra of invariants of a cyclic linear group G = (g) of finite order invertible in the ba