Derivations, Automorphisms, and Representations of Complex ω-Lie Algebras

Abstract

Let (g,ω) be a finite-dimensional non-Lie complex ω-Lie algebra. We study the derivation algebra Der(g) and the automorphism group Aut(g) of (g,ω). We introduce the notions of ω-derivations and ω-automorphisms of (g,ω) which naturally preserve the bilinear form ω. We show that the set Derω(g) of all ω-derivations is a Lie subalgebra of Der(g) and the set Autω(g) of all ω-automorphisms is a subgroup of Aut(g). For any 3-dimensional and 4-dimensional nontrivial ω-Lie algebra g, we compute Der(g) and Aut(g) explicitly, and study some Lie group properties of Aut(g). We also study representation theory of ω-Lie algebras. We show that all 3-dimensional nontrivial ω-Lie algebras are multiplicative, as well as we provide a 4-dimensional example of ω-Lie algebra that is not multiplicative. Finally, we show that any irreducible representation of the simple ω-Lie algebra Cα(α≠ 0,-1) is 1-dimensional.