Cohomological Aspects in Complex Non-Kähler Geometry [electronic resource] /by Daniele Angella.
by Angella, Daniele [author.]; SpringerLink (Online service).
Material type:
BookSeries: Lecture Notes in Mathematics: 2095Publisher: Cham : Springer International Publishing : 2014.Description: XXV, 262 p. 7 illus. online resource.ISBN: 9783319024417.Subject(s): Mathematics | Differential equations, partial | Global differential geometry | Mathematics | Differential Geometry | Several Complex Variables and Analytic SpacesDDC classification: 516.36 Online resources: Click here to access online | Item type | Current location | Call number | Status | Date due | Barcode |
|---|---|---|---|---|---|
| MAIN LIBRARY | QA641-670 (Browse shelf) | Available |
Browsing MAIN LIBRARY Shelves Close shelf browser
| LC8-6691 Design Alchemy | QA75.5-76.95 String Processing and Information Retrieval | QC1-999 Basic Concepts in Computational Physics | QA641-670 Cohomological Aspects in Complex Non-Kähler Geometry | HF54.5-54.56 SOA Maturity Model | P87-96 Against the Hypothesis of the End of Privacy | HF5469.7-5481 China in Global Finance |
Preliminaries on (almost-) complex manifolds -- Cohomology of complex manifolds -- Cohomology of nilmanifolds -- Cohomology of almost-complex manifolds -- References.
In these notes, we provide a summary of recent results on the cohomological properties of compact complex manifolds not endowed with a Kähler structure. On the one hand, the large number of developed analytic techniques makes it possible to prove strong cohomological properties for compact Kähler manifolds. On the other, in order to further investigate any of these properties, it is natural to look for manifolds that do not have any Kähler structure. We focus in particular on studying Bott-Chern and Aeppli cohomologies of compact complex manifolds. Several results concerning the computations of Dolbeault and Bott-Chern cohomologies on nilmanifolds are summarized, allowing readers to study explicit examples. Manifolds endowed with almost-complex structures, or with other special structures (such as, for example, symplectic, generalized-complex, etc.), are also considered.
There are no comments for this item.