Extensions and automorphisms of Lie algebras

Abstract

Let 0 A L B 0 be a short exact sequence of Lie algebras over a field F, where A is abelian. We show that the obstruction for a pair of automorphisms in (A) × (B) to be induced by an automorphism in (L) lies in the Lie algebra cohomology 2(B;A). As a consequence, we obtain a four term exact sequence relating automorphisms, derivations and cohomology of Lie algebras. We also obtain a more explicit necessary and sufficient condition for a pair of automorphisms in (Ln,2(1)) × (Ln,2ab) to be induced by an automorphism in (Ln,2), where Ln,2 is a free nilpotent Lie algebra of rank n and step 2.