On automorphisms of enveloping algebras

Abstract

Given an algebraic Lie algebra g over C, we canonically associate to it a Lie algebra g∞ defined over C∞-the reduction of C mod infinitely large prime, and show that for a class of Lie algebras g∞ is an invariant of the derived category of g-modules. We give two applications of this construction. First, we show that the bounded derived category of g-modules determines algebra g for a class of Lie algebras. Second, given a semi-simple Lie algebra g over C, we construct a canonical homomorphism from the group of automorphisms of the enveloping algebra Ug to the group of Lie algebra automorphisms of g, such that its kernel does not contain a nontrivial semi-simple automorphism. As a corollary we obtain that any finite subgroup of automorphisms of Ug isomorphic to a subgroup of Lie algebra automorphisms of g.