几乎阿贝尔李群上的调和g2结构

Pub Date : 2023-09-19 DOI:10.1016/j.difgeo.2023.102060

Andrés J. Moreno

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引用次数: 1

摘要

我们考虑7维几乎阿贝尔李群上的左不变G2结构。此外，我们根据相应李代数的李括号A刻画了相关的扭转形式和全扭转张量。用这些术语，我们为G2结构的可能的16个扭转类中的每一个建立了A上的代数条件。特别地，我们证明了其中四个扭转类是不可容许的，因为τ3=0意味着τ0=0。最后，我们利用上述结果提供了A的代数准则，满足调和条件divT=0，这允许识别哪些扭转类是调和的。

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Harmonic G2-structures on almost Abelian Lie groups

We consider left-invariant $G_{2}$ -structures on 7-dimensional almost Abelian Lie groups. Also, we characterise the associated torsion forms and the full torsion tensor according to the Lie bracket A of the corresponding Lie algebra. In those terms, we establish the algebraic condition on A for each of the possible 16-torsion classes of a $G_{2}$ -structure. In particular, we show that four of those torsion classes are not admissible, since $τ_{3} = 0$ implies $τ_{0} = 0$ . Finally, we use the above results to provide the algebraic criteria on A, satisfying the harmonic condition $div T = 0$ , and this allows to identify which torsion classes are harmonic.

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