Invariant Metrics on Nilpotent Lie algebras

Abstract

We state criteria for a nilpotent Lie algebra to admit an invariant metric. We use that possesses two canonical abelian ideals () ⊂ J() to decompose the underlying vector space of and then we state sufficient conditions for to admit an invariant metric. The properties of the ideal J() allows to prove that if a current Lie algebra admits an invariant metric, then there must be an invariant and non-degenerate bilinear map from × into the space of centroids of /J(). We also prove that in any nilpotent Lie algebra there exists a non-zero, symmetric and invariant bilinear form. This bilinear form allows to reconstruct by means of an algebra with unit. We prove that this algebra is simple if and only if the bilinear form is an invariant metric on .