几乎复流形的bot - chern和Aeppli上同调及调和形式的相关空间

IF 0.8 4区数学 Q2 MATHEMATICS Expositiones Mathematicae Pub Date : 2023-09-14 DOI:10.1016/j.exmath.2023.09.001

Lorenzo Sillari , Adriano Tomassini

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引用次数: 0

摘要

本文引入了几个新的几乎复流形上同调，其中推广了用算子d, dc定义的bot - chern和Aeppli上同调。我们解释了它们是如何连接到已经存在的几乎复杂流形的上同调的，我们研究了与d, dc相关的调和形式的空间，展示了它们与bot - chern和Aeppli上同调以及其他已经被充分研究的调和形式的空间的关系。值得注意的是，1-形式的bot - chen上同调在紧流形上是有限维的，并且提供了一个区分几乎复杂结构的几乎复杂不变量hd+dc1。在几乎Kähler 4流形上，我们所考虑的调和形式的空间表现得特别好，并且与Tseng和Yau在辛上同调研究中所考虑的调和形式相联系。

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On Bott–Chern and Aeppli cohomologies of almost complex manifolds and related spaces of harmonic forms

In this paper we introduce several new cohomologies of almost complex manifolds, among which stands a generalization of Bott–Chern and Aeppli cohomologies defined using the operators $d$ , $d^{c}$ . We explain how they are connected to already existing cohomologies of almost complex manifolds and we study the spaces of harmonic forms associated to $d$ , $d^{c}$ , showing their relation with Bott–Chern and Aeppli cohomologies and to other well-studied spaces of harmonic forms. Notably, Bott–Chern cohomology of 1-forms is finite-dimensional on compact manifolds and provides an almost complex invariant $h_{d + d^{c}}^{1}$ that distinguishes between almost complex structures. On almost Kähler 4-manifolds, the spaces of harmonic forms we consider are particularly well-behaved and are linked to harmonic forms considered by Tseng and Yau in the study of symplectic cohomology.

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来源期刊

Expositiones Mathematicae 数学-数学

CiteScore

1.30

自引率

0.00%

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审稿时长

40 days

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