近 $$G_2$$ 和近 Kähler 6-manifolds 的贝蒂数与韦尔曲率边界

Pub Date : 2024-04-12 DOI:10.1007/s10711-024-00920-4
Anton Iliashenko
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引用次数: 0

摘要

在本文中,我们使用魏岑伯克公式来获取关于紧凑近\(G_2\)和紧凑近凯勒6-manifolds的贝蒂数的信息。首先,我们假设截面曲率的边界,建立了特定空间上两个曲率型自邻接算子的估计值。然后,我们利用谐波形式的魏岑伯克式,得到如下结果:如果这些曲率算子的某些下界成立,那么某些贝蒂数为零。最后,我们将上述两个步骤结合起来,根据截面曲率的边界得到某些贝蒂数消失的充分条件。
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Betti numbers of nearly $$G_2$$ and nearly Kähler 6-manifolds with Weyl curvature bounds

In this paper we use the Weitzenböck formulas to get information about the Betti numbers of compact nearly \(G_2\) and compact nearly Kähler 6-manifolds. First, we establish estimates on two curvature-type self adjoint operators on particular spaces assuming bounds on the sectional curvature. Then using the Weitzenböck formulas on harmonic forms, we get results of the form: if certain lower bounds hold for these curvature operators then certain Betti numbers are zero. Finally, we combine both steps above to get sufficient conditions of vanishing of certain Betti numbers based on the bounds on the sectional curvature.

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