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Smooth manifolds and observables / Jet Nestruev.

Nestruev, Jet.
2020
QA613
Available Online
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Title
Smooth manifolds and observables / Jet Nestruev.
Author
Nestruev, Jet.
Edition
2nd ed.
ISBN
9783030456504 (electronic book)
3030456501 (electronic book)
3030456498
9783030456498
DOI
https://doi.org/10.1007/978-3-030-45650-4
https://doi.org/10.1007/978-3-030-45
Publication Details
Cham, Switzerland : Springer, 2020.
Language
English
Description
1 online resource
Item Number
10.1007/978-3-030-45650-4 doi
10.1007/978-3-030-45
Call Number
QA613
Dewey Decimal Classification
516/.07
Summary
This textbook demonstrates how differential calculus, smooth manifolds, and commutative algebra constitute a unified whole, despite having arisen at different times and under different circumstances. Motivating this synthesis is the mathematical formalization of the process of observation from classical physics. A broad audience will appreciate this unique approach for the insight it gives into the underlying connections between geometry, physics, and commutative algebra. The main objective of this book is to explain how differential calculus is a natural part of commutative algebra. This is achieved by studying the corresponding algebras of smooth functions that result in a general construction of the differential calculus on various categories of modules over the given commutative algebra. It is shown in detail that the ordinary differential calculus and differential geometry on smooth manifolds turns out to be precisely the particular case that corresponds to the category of geometric modules over smooth algebras. This approach opens the way to numerous applications, ranging from delicate questions of algebraic geometry to the theory of elementary particles. Smooth Manifolds and Observables is intended for advanced undergraduates, graduate students, and researchers in mathematics and physics. This second edition adds ten new chapters to further develop the notion of differential calculus over commutative algebras, showing it to be a generalization of the differential calculus on smooth manifolds. Applications to diverse areas, such as symplectic manifolds, de Rham cohomology, and Poisson brackets are explored. Additional examples of the basic functors of the theory are presented alongside numerous new exercises, providing readers with many more opportunities to practice these concepts.
Bibliography, etc. Note
Includes bibliographical references and index.
Access Note
Access limited to authorized users.
Series
Graduate texts in mathematics.
Available in Other Form
Print version: 9783030456498
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Foreword
Preface
1. Introduction
2. Cutoff and Other Special Smooth Functions on R^n
3. Algebras and Points
4. Smooth Manifolds (Algebraic Definition)
5. Charts and Atlases
6. Smooth Maps
7. Equivalence of Coordinate and Algebraic Definitions
8. Points, Spectra and Ghosts
9. The Differential Calculus as Part of Commutative Algebra
10. Symbols and the Hamiltonian Formalism
11. Smooth Bundles
12. Vector Bundles and Projective Modules
13. Localization
14. Differential 1-forms and Jets
15. Functors of the differential calculus and their representations
16. Cosymbols, Tensors, and Smoothness
17. Spencer Complexes and Differential Forms
18. The (co)chain complexes that come from the Spencer Sequence
19. Differential forms: classical and algebraic approach
20. Cohomology
21. Differential operators over graded algebras
Afterword
Appendix
References
Index.

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