The Lie Structure of Enveloping Algebras

Lie stack is an algebra morphism s : A Ä A B where A and B are finite dimensional C-algebras with B being augmented local. We construct the enveloping algebra U(s) of a Lie stack and show that it is an irreducible Hopf algebra domain with a Poincare Birkhoff Witt basis. We recover the enveloping alg

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

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