Verfügbarkeit: J-holomorphic curves and symplectic topology

J-holomorphic curves and symplectic topology:

Gespeichert in:

Bibliographische Detailangaben
Beteilige Person:	McDuff, Dusa (VerfasserIn)
Format:	Buch
Sprache:	Englisch
Veröffentlicht:	Providence, R.I. American Mathematical Society 2004
Schriftenreihe:	American Mathematical Society: Colloquium publications 52
Schlagwörter:	Pseudoholomorphe Funktion Differentialgeometrie Symplektische Mannigfaltigkeit Holomorphe Kurve Holomorphie
Links:	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=012823304&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
Umfang:	XII, 669 S.
ISBN:	0821834851

Internformat

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Datensatz im Suchindex

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adam_text	Contents Preface ix Chapter 1. Introduction 1 1.1. Symplectic manifolds 1 1.2. Moduli spaces: regularity and compactness 4 1.3. Evaluation maps and pseudocycles 7 1.4. The Gromov Witten invariants 10 Chapter 2. J holomorphic Curves 17 2.1. Almost complex structures 17 2.2. The nonlinear Cauchy Riemann equations 19 2.3. Unique continuation 21 2.4. Critical points 26 2.5. Somewhere injective curves 30 2.6. The adjunction inequality 34 Chapter 3. Moduli Spaces and Transversality 37 3.1. Moduli spaces of simple curves 37 3.2. Transversality 46 3.3. A regularity criterion 54 3.4. Curves with pointwise constraints 58 3.5. Implicit function theorem 65 Chapter 4. Compactness 71 4.1. Energy 72 4.2. The bubbling phenomenon 75 4.3. The mean value inequality 80 4.4. The isoperimetric inequality 85 4.5. Removal of singularities 89 4.6. Convergence modulo bubbling 92 4.7. Bubbles connect 98 Chapter 5. Stable Maps 107 5.1. Stable maps 107 5.2. Gromov convergence 114 5.3. Gromov compactness 117 5.4. Uniqueness of the limit 125 5.5. Gromov compactness for stable maps 129 5.6. The Gromov topology 137 Chapter 6. Moduli Spaces of Stable Maps 143 V vi CONTENTS 6.1. Simple stable maps 145 6.2. Transversality for simple stable maps 148 6.3. Transversality for evaluation maps 153 6.4. Semipositivity 156 6.5. Pseudocycles 159 6.6. Gromov Witten pseudocycles 165 6.7. The pseudocycle of graphs 169 Chapter 7. Gromov Witten Invariants 187 7.1. Counting pseudoholomorphic spheres 189 7.2. Variations on the definition 195 7.3. Counting pseudoholomorphic graphs 203 7.4. Rational curves in projective spaces 208 7.5. Axioms for Gromov Witten invariants 222 Chapter 8. Hamiltonian Perturbations 239 8.1. Trivial bundles 240 8.2. Locally Hamiltonian fibrations 246 8.3. Pseudoholomorphic sections 252 8.4. Pseudoholomorphic spheres in the fiber 259 8.5. The pseudocycle of sections 261 8.6. Counting pseudoholomorphic sections 266 Chapter 9. Applications in Symplectic Topology 275 9.1. Periodic orbits of Hamiltonian systems 276 9.2. Obstructions to Lagrangian embeddings 290 9.3. The nonsqueezing theorem 301 9.4. Symplectic 4 manifolds 307 9.5. The group of symplectomorphisms 320 9.6. Hofer geometry 328 9.7. Distinguishing symplectic structures 334 Chapter 10. Gluing 343 10.1. The gluing theorem 344 10.2. Connected sums of J holomorphic curves 347 10.3. Weighted norms 349 10.4. Cutoff functions 353 10.5. Construction of the gluing map 356 10.6. The derivative of the gluing map 365 10.7. Surjectivity of the gluing map 373 10.8. Proof of the splitting axiom 379 Chapter 11. Quantum Cohomology 387 11.1. The small quantum cohomology ring 388 11.2. The Gromov Witten potential 403 11.3. Four examples 409 11.4. The Seidel representation 432 11.5. Frobenius manifolds 443 Chapter 12. Floer Homology 451 CONTENTS vii 12.1. Floer s cochain complex 452 12.2. Ring structure 463 12.3. Poincare duality 467 12.4. Spectral invariants 469 12.5. The Seidel representation 478 12.6. Donaldson s quantum category 483 12.7. The symplectic vortex equations 487 Appendix A. Fredholm Theory 493 A.I. Fredholm theory 493 A.2. Determinant line bundles 495 A.3. The implicit function theorem 500 A.4. Finite dimensional reduction 506 A.5. The Sard Smale theorem 508 Appendix B. Elliptic Regularity 511 B.I. Sobolev spaces 511 B.2. The Calderon Zygmund inequality 523 B.3. Regularity for the Laplace operator 530 B.4. Elliptic bootstrapping 533 Appendix C. The Riemann Roch Theorem 541 C.I. Cauchy Riemann operators 541 C.2. Elliptic estimates 546 C.3. The boundary Maslov index (by Joel Robbin) 552 C.4. Proof of the Riemann Roch theorem 558 C.5. The Riemann mapping theorem 562 C.6. Nonsmooth bundles 564 C.7. Almost complex structures 565 Appendix D. Stable Curves of Genus Zero 569 D.I. Mobius transformations and cross ratios 569 D.2. Trees, labels, and splittings 572 D.3. Stable curves 579 D.4. An embedding 582 D.5. The Grothendieck Knudsen compactification 587 D.6. The GK topology 592 D.7. Examples 595 Appendix E. Singularities and Intersections (written with Laurent Lazzarini) 601 E.I. The main results 602 E.2. Positivity of intersections 606 E.3. Integrability 612 E.4. The Hartman Wintner theorem 616 E.5. Local behaviour 621 E.6. Contact between branches 626 E.7. Singularities of J holomorphic curves 634 Bibliography 643 viii CONTENTS List of Symbols 655 Index 659
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institution	BVB
isbn	0821834851
language	English
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spellingShingle	McDuff, Dusa J-holomorphic curves and symplectic topology American Mathematical Society: Colloquium publications Pseudoholomorphe Funktion (DE-588)4176138-8 gnd Differentialgeometrie (DE-588)4012248-7 gnd Symplektische Mannigfaltigkeit (DE-588)4290704-4 gnd Holomorphe Kurve (DE-588)4160476-3 gnd Holomorphie (DE-588)4160484-2 gnd
subject_GND	(DE-588)4176138-8 (DE-588)4012248-7 (DE-588)4290704-4 (DE-588)4160476-3 (DE-588)4160484-2
title	J-holomorphic curves and symplectic topology
title_auth	J-holomorphic curves and symplectic topology
title_exact_search	J-holomorphic curves and symplectic topology
title_full	J-holomorphic curves and symplectic topology Dusa McDuff ; Dietmar Salamon
title_fullStr	J-holomorphic curves and symplectic topology Dusa McDuff ; Dietmar Salamon
title_full_unstemmed	J-holomorphic curves and symplectic topology Dusa McDuff ; Dietmar Salamon
title_short	J-holomorphic curves and symplectic topology
title_sort	j holomorphic curves and symplectic topology
topic	Pseudoholomorphe Funktion (DE-588)4176138-8 gnd Differentialgeometrie (DE-588)4012248-7 gnd Symplektische Mannigfaltigkeit (DE-588)4290704-4 gnd Holomorphe Kurve (DE-588)4160476-3 gnd Holomorphie (DE-588)4160484-2 gnd
topic_facet	Pseudoholomorphe Funktion Differentialgeometrie Symplektische Mannigfaltigkeit Holomorphe Kurve Holomorphie
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=012823304&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV035417609
work_keys_str_mv	AT mcduffdusa jholomorphiccurvesandsymplectictopology AT salamondietmar jholomorphiccurvesandsymplectictopology

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