Classification of abelian complex structures on 6-dimensional Lie algebras

Abstract: We classify the 6-dimensional Lie algebras that can be endowed with an abelian complex structure and parametrize, on each of these algebras, the space of such structures up to holomorphic isomorphism. IntroductionLet g be a Lie algebra, J be an endomorphism of g such that J 2 = −I, and let g 1,0 be the i-eigenspace of J in g C := g ⊗ R C. When g 1,0 is a complex subalgebra, we say that J is integrable; when g 1,0 is abelian, we say that J is abelian; and when g 1,0 is a complex ideal, we say that J is bi-invar… Show more

“…Remark 3. 4 We do not know if Corollary 1.3 is true when G is not nilpotent, e.g. for solvmanifolds.…”

“…Abelian complex structures were introduced in [5] and were intensely studied in [4,6,11,8,19]. Observe that J is anti-abelian and integrable if and only if it is bi-invariant, i.e.…”

Chern-flat and Ricci-flat invariant almost Hermitian structures

“…Remark 3. 4 We do not know if Corollary 1.3 is true when G is not nilpotent, e.g. for solvmanifolds.…”

“…Abelian complex structures were introduced in [5] and were intensely studied in [4,6,11,8,19]. Observe that J is anti-abelian and integrable if and only if it is bi-invariant, i.e.…”

Chern-flat and Ricci-flat invariant almost Hermitian structures

“…Barberis and I.G. Dotti in [1] gave a classification of all 6-dimensional Lie algebras admitting an abelian complex structure; furthermore, they give a parametrization, on each Lie algebra, of the space of abelian structures up to holomorphic isomorphism. In particular, there are three nilpotent Lie algebras carrying curves of non-equivalent structures.…”

“…Based on this parametrization, we study the existence of minimal metrics on each of these complex nilmanifolds (see Theorem 4.4), and provide an alternative proof of the pairwise non-isomorphism between the structures. The classification in [1] fix the Lie algebra and varies the complex structure. For example, on the Lie algebra h 3 × h 3 they found the curve J s of abelian complex structures defined by J s e 1 = e 2 , J s e 3 = e 4 , J s e 5 = se 5 + e 6 , s ∈ R, and fix the bracket [e 1 , e 2 ] = e 5 , [e 3 , e 4 ] = e 6 .…”

“…We now will use the Pfaffian forms to give an alternative proof of the pairwise non-isomorphism of the family given in [1,Theorem 3.4] in the 2-step nilpotent case. Since dim v 1 = 4 and dim v 2 = 2 , the Pfaffian forms of n 1 , .…”

Invariants of complex structures on nilmanifolds

Symplectic, Product and Complex Structures on 3‐Lie Algebras