Hypo-Analytic Structures : Local Theory (PMS-40).
In Hypo-Analytic Structures Franois Treves provides a systematic approach to the study of the differential structures on manifolds defined by systems of complex vector fields. Serving as his main examples are the elliptic complexes, among which the De Rham and Dolbeault are the best known, and the t...
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| Формат: | Licensed eBooks |
| Хэл сонгох: | англи |
| Хэвлэсэн: |
Princeton :
Princeton University Press
2014.
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| Цуврал: | Princeton mathematical series.
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| Онлайн хандалт: | https://www.jstor.org/stable/10.2307/j.ctt7zvvvk |
Агуулга:
- Frontmatter
- Contents
- Preface
- I. Formally and Locally Integrable Structures. Basic Definitions
- II. Local Approximation and Representation in Locally Integrable Structures
- III. Hypo-Analytic Structures. Hypocomplex Manifolds
- IV. Integrable Formal Structures. Normal Forms
- V. Involutive Structures With Boundary
- VI. Local Integraboity and Local Solvability in Elliptic Structures
- VII. Examples of Nonintegrability and of Nonsolvability
- VIII. Necessary Conditions for the Vanishing of the Cohomology. Local Solvability of a Single Vector Field
- IX. FBI Transform in a Hypo-Analytic Manifold
- X. Involutive Systems of Nonlinear First-Order Differential Equations
- References
- Index.