Chow transformation of coherent sheaves

IF 0.5 Q3 MATHEMATICS Complex Manifolds Pub Date : 2023-01-01 DOI:10.1515/coma-2022-0147
M. Meo
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Abstract

Abstract We define a dual of the Chow transformation of currents on any complex projective manifold. This integral transformation is a factor of a left inverse of the Chow transformation and its composition with the Chow transformation is a right inverse of a linear differential operator, which does not commute with ∂ \partial or ∂ ¯ \overline{\partial } . We obtain a complete intrinsic resolution of the problem of the algebraicity of the cohomology classes. On another hand, in the case of the complex projective space, we give the translation in terms of real-analytic D {\mathcal{D}} -modules of the properties of the Chow transformation. Then, the proofs can be simplified by using the conormal currents, which exist for all currents of bidimension ( p , p ) \left(p,p) on the complex projective space, even not closed. This is a consequence of the existence of dual currents, defined on the dual complex projective space. In particular, we obtain a linear differential system of order lower than that of the Gelfand-Gindikin-Graev differential system, characterizing the images by the Chow transformation of smooth differential forms on the complex projective space.
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相干槽轮的Chow变换
摘要我们定义了任意复射影流形上电流的Chow变换的对偶。该积分变换是Chow变换左逆的一个因子,其与Chow变换的组合是线性微分算子的右逆,其不与{\partial}或{\ppartial}上划线进行交换。我们得到了上同调类代数性问题的一个完整的内在解。另一方面,在复射影空间的情况下,我们给出了Chow变换性质的实解析D{\mathcal{D}}-模的平移。然后,利用复射影空间上所有二维(p,p)\left(p,p)流存在的共正规流,即使不是闭的,也可以简化证明。这是对偶复射影空间上定义的对偶流存在的结果。特别地,我们得到了一个阶数低于Gelfand Gindikin-Graev微分系统的线性微分系统,通过复投影空间上光滑微分形式的Chow变换来表征图像。
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来源期刊
Complex Manifolds
Complex Manifolds MATHEMATICS-
CiteScore
1.30
自引率
20.00%
发文量
14
审稿时长
25 weeks
期刊介绍: Complex Manifolds is devoted to the publication of results on these and related topics: Hermitian geometry, Kähler and hyperkähler geometry Calabi-Yau metrics, PDE''s on complex manifolds Generalized complex geometry Deformations of complex structures Twistor theory Geometric flows on complex manifolds Almost complex geometry Quaternionic geometry Geometric theory of analytic functions Holomorphic dynamics Several complex variables Dolbeault cohomology CR geometry.
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