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Hamiltonian reduction by stages / Jerrold E. Marsden ... [and others]
Math/Physics/Astronomy Library QA3 .L28 no.1913
Available
- Format:
- Book
- Series:
- Lecture notes in mathematics (Springer-Verlag) ; 1913.
- Lecture notes in mathematics, 0075-8434 ; 1913
- Language:
- English
- Subjects (All):
- Hamiltonian systems.
- Differential equations.
- Physical Description:
- xv, 519 pages : illustrations ; 24 cm.
- Place of Publication:
- Berlin ; New York : Springer Verlag, [2007]
- Summary:
- In this volume readers will find for the first time a detailed account of the theory of symplectic reduction by stages, along with numerous illustrations of the theory. Special emphasis is given to group extensions, including a detailed discussion of the Euclidean group, the oscillator group, the Bott-Virasoro group and other groups of matrices. Ample background theory on symplectic reduction and cotangent bundle reduction in particular is provided. Novel features of the book are the inclusion of a systematic treatment of the cotangent bundle case, including the identification of cocycles with magnetic terms, as well as the general theory of singular reduction by stages.
- Contents:
- Part I Background and the Problem Setting 1
- 1 Symplectic Reduction 3
- 1.2 Symplectic Reduction - Proofs and Further Details 12
- 1.3 Reduction Theory: Historical Overview 24
- 1.4 Overview of Singular Symplectic Reduction 36
- 2 Cotangent Bundle Reduction 43
- 2.1 Principal Bundles and Connections 43
- 2.2 Cotangent Bundle Reduction: Embedding Version 59
- 2.3 Cotangent Bundle Reduction: Bundle Version 71
- 2.4 Singular Cotangent Bundle Reduction 88
- 3 The Problem Setting 101
- 3.1 The Setting for Reduction by Stages 101
- 3.2 Applications and Infinite Dimensional Problems 106
- Part II Regular Symplectic Reduction by Stages 111
- 4 Commuting Reduction and Semidirect Product Theory 113
- 4.1 Commuting Reduction 113
- 4.2 Semidirect Products 119
- 4.3 Cotangent Bundle Reduction and Semidirect Products 132
- 4.4 Example: The Euclidean Group 137
- 5 Regular Reduction by Stages 143
- 5.1 Motivating Example: The Heisenberg Group 144
- 5.2 Point Reduction by Stages 149
- 5.3 Poisson and Orbit Reduction by Stages 171
- 6 Group Extensions and the Stages Hypothesis 177
- 6.1 Lie Group and Lie Algebra Extensions 178
- 6.2 Central Extensions 198
- 6.3 Group Extensions Satisfy the Stages Hypotheses 201
- 6.4 The Semidirect Product of Two Groups 204
- 7 Magnetic Cotangent Bundle Reduction 211
- 7.1 Embedding Magnetic Cotangent Bundle Reduction 212
- 7.2 Magnetic Lie-Poisson and Orbit Reduction 225
- 8 Stages and Coadjoint Orbits of Central Extensions 239
- 8.1 Stage One Reduction for Central Extensions 240
- 8.2 Reduction by Stages for Central Extensions 245
- 9.1 The Heisenberg Group Revisited 252
- 9.2 A Central Extension of L(S[superscript 1]) 253
- 9.3 The Oscillator Group 259
- 9.4 Bott-Virasoro Group 267
- 9.5 Fluids with a Spatial Symmetry 279
- 10 Stages and Semidirect Products with Cocycles 285
- 10.1 Abelian Semidirect Product Extensions: First Reduction 286
- 10.2 Abelian Semidirect Product Extensions: Coadjoint Orbits 295
- 10.3 Coupling to a Lie Group 304
- 10.4 Poisson Reduction by Stages: General Semidirect Products 309
- 10.5 First Stage Reduction: General Semidirect Products 315
- 10.6 Second Stage Reduction: General Semidirect Products 321
- 10.7 Example: The Group T [circledS] U 347
- 11 Reduction by Stages via Symplectic Distributions 397
- 11.1 Reduction by Stages of Connected Components 398
- 11.2 Momentum Level Sets and Distributions 401
- 11.3 Proof: Reduction by Stages II 406
- 12 Reduction by Stages with Topological Conditions 409
- 12.1 Reduction by Stages III 409
- 12.2 Relation Between Stages II and III 416
- 12.3 Connected Components of Reduced Spaces 419
- Part III Optimal Reduction and Singular Reduction by Stages / Juan-Pablo Ortega 421
- 13 The Optimal Momentum Map and Point Reduction 423
- 13.1 Optimal Momentum Map and Space 423
- 13.2 Momentum Level Sets and Associated Isotropies 426
- 13.3 Optimal Momentum Map Dual Pair 427
- 13.4 Dual Pairs, Reduced Spaces, and Symplectic Leaves 430
- 13.5 Optimal Point Reduction 432
- 13.6 The Symplectic Case and Sjamaar's Principle 435
- 14 Optimal Orbit Reduction 437
- 14.1 The Space for Optimal Orbit Reduction 437
- 14.2 The Symplectic Orbit Reduction Quotient 443
- 14.3 The Polar Reduced Spaces 446
- 14.4 Symplectic Leaves and the Reduction Diagram 454
- 14.5 Orbit Reduction: Beyond Compact Groups 455
- 14.6 Examples: Polar Reduction of the Coadjoint Action 457
- 15 Optimal Reduction by Stages 461
- 15.1 The Polar Distribution of a Normal Subgroup 461
- 15.2 Isotropy Subgroups and Quotient Groups 464
- 15.3 The Optimal Reduction by Stages Theorem 466
- 15.4 Optimal Orbit Reduction by Stages 470
- 15.5 Reduction by Stages of Globally Hamiltonian Actions 475.
- Notes:
- Includes bibliographical references (pages [483]-508) and index.
- ISBN:
- 9783540724698
- 3540724699
- OCLC:
- 154712316
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