Complex structures on the complexification of a real Lie algebra

Complex structures on the complexification of a real Lie algebra

Let g = a+b be a Lie algebra with a direct sum decomposition such that a and b are Lie subalgebras. Then, we can construct an integrable complex structure J̃ on h = ℝ(gℂ) from the decomposition, where ℝ(gℂ) is a real Lie algebra obtained from gℂby the scalar restriction. Conversely, let J̃ be an int...

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Bibliographic Details
Main Author: Yamada Takumi
Format: Article
Language:English
Published: De Gruyter 2018-08-01
Series:Complex Manifolds
Subjects:
nilmanifold
dolbeault cohomology group
complex structure
53c30
57t15
22e25
Online Access:https://doi.org/10.1515/coma-2018-0010
Description
Summary:Let g = a+b be a Lie algebra with a direct sum decomposition such that a and b are Lie subalgebras. Then, we can construct an integrable complex structure J̃ on h = ℝ(gℂ) from the decomposition, where ℝ(gℂ) is a real Lie algebra obtained from gℂby the scalar restriction. Conversely, let J̃ be an integrable complex structure on h = ℝ(gℂ). Then, we have a direct sum decomposition g = a + b such that a and b are Lie subalgebras. We also investigate relations between the decomposition g = a + b and dim Hs.t∂̄J̃ (hℂ).
ISSN:2300-7443

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