Classification of three dimensional complex omega-Lie algebras

Abstract

A complex ω-Lie algebra is a vector space L over the complex field, equipped with a skew symmetric bracket [-,-] and a bilinear form ω such that [[x,y],z]+[[y,z],x]+ [[z,x],y]=ω(x,y)z+ω(y,z)x+ω(z,x)y for all x,y,z∈ L. The notion of ω-Lie algebras, as a generalization of Lie algebras, was introduced in Nurowski Nur2007. Fundamental results about finite-dimensional ω-Lie algebras were developed by Zusmanovich Zus2010. In Nur2007, all three dimensional non-Lie real ω-Lie algebras were classified. The purpose of this note is to provide an approach to classify all three dimensional non-Lie complex ω-Lie algebras. Our method also gives a new proof of the classification in Nurowski Nur2007.