Abelian complex structures on solvable Lie algebras
Abstract
We obtain a characterization of the real Lie algebras admitting abelian complex structures in terms of certain affine Lie algebras a f f (A), where A is a commutative algebra. These affine Lie algebras are natural generalizations of a f f ( C) and the corresponding Lie groups are complex affine manifolds. It turns out that all 4-dimensional Lie algebras carrying abelian complex structures are central extensions of such affine Lie algebras.
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