Quantum theory, deformation, and integrability - Info and Reading Options
By Robert W. Carroll
"Quantum theory, deformation, and integrability" is published by Elsevier Science B.V. in 2000 - New York (State), the book is classified in bibliography genre and the language of the book is English.
“Quantum theory, deformation, and integrability” Metadata:
- Title: ➤ Quantum theory, deformation, and integrability
- Author: Robert W. Carroll
- Language: English
- Publisher: Elsevier Science B.V.
- Publish Date: 2000
- Publish Location: New York (State)
- Genres: bibliography
- Dewey Decimal Classification: 530.12/01/516
- Library of Congress Classification: QC174.17.G46 .C37 2000
“Quantum theory, deformation, and integrability” Subjects and Themes:
- Subjects: Geometric quantization - Operator algebras - Mathematical physics
Edition Specifications:
- Number of Pages: xi, 407 p. ; 25 cm.
Edition Identifiers:
- Online Computer Library Center (OCLC) ID: 45024489
- Library of Congress Control Number (LCCN): ^^^00047685^
- All ISBNs: 0444506217
AI-generated Review of “Quantum theory, deformation, and integrability”:
"Quantum theory, deformation, and integrability" Table Of Contents:
- 1- 1. Quantization and Integrability
- 2- 1.1. Algebraic and Geometric Methods
- 3- 1.2. Vertex Operators and Coherent States
- 4- 1.3. Remarks on the Olavo Theory
- 5- 1.4. Trajectory Representations
- 6- 1.5. Miscellaneous
- 7- 2. Geometry and Embedding
- 8- 2.1. Curves and Surfaces
- 9- 2.2. Surfaces in R[superscript 3] and Conformal Immersion
- 10- 2.3. Quantum Mechanics on Embedded Objects
- 11- 2.4. Willmore Surfaces, Strings, and Dirac
- 12- 2.5. Conformal Maps and Curves
- 13- 3. Classical and Quantum Integrability
- 14- 3.1. Background
- 15- 3.2. R Matrices and PL Structures
- 16- 3.3. Quantization and Quantum Groups
- 17- 3.4. Algebraic Bethe Ansatz
- 18- 3.5. Separation of Variables
- 19- 3.6. Hirota Equations
- 20- 3.7. SOV and Hitchin Systems
- 21- 3.8. Deformation Quantization
- 22- 3.9. Miscellaneous
- 23- 4. Discrete Geometry and Moyal
- 24- 4.1. Introduction
- 25- 4.2. Hirota, Strings, and Discrete Surfaces
- 26- 4.3. A Few Summary Remarks
- 27- 4.4. More on Phase Space Discretization
- 28- 5. Whitham Theory
- 29- 5.1. Background
- 30- 5.2. Isomonodromy Problems
- 31- 5.3. Whitham and Seiberg
- 32- itten
- 33- 5.4. Soft Susy Breaking and Whitham
- 34- 5.5. Renormalization
- 35- 5.6. Whitham, WDVV, and Picard
- 36- uchs
- 37- 6. Geometry and Deformation Quantization
- 38- 6.1. Noncommutative Geometry
- 39- 6.2. Gauge Theories
- 40- 6.3. Berezin Toeplitz Quantization.
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- Harvard University Library: Location: Cabot Science Library, Harvard University - Shelf Numbers: QC174.17.G46 .C37 2000
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