Verfügbarkeit: Handbook of global analysis

Handbook of global analysis:

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Format:	Buch
Sprache:	English
Veröffentlicht:	Amsterdam [u.a.] Elsevier 2008
Ausgabe:	1. ed.
Schlagworte:	Global analysis (Mathematics) Mathematische Physik Mathematical physics Differentialgeometrie Globale Analysis
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	XII, 1229 S.

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Datensatz im Suchindex

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adam_text	Vll Contents Preface Contents vii Global aspects of Finsler geometry 1 Tadashi Aikou and Laszlo Kozma 1 Finsler metrics and connections...................... 1 2 Geodesies in Finsler manifolds...................... 16 3 Comparison theorems: Cartan-Hadamard theorem, Bonnet-Myers theo- rem, Laplacian and volume comparison.................. 27 4 Rigidity theorems: Finsler manifolds of scalar curvature and locally sym- metric Finsler metrics........................... 31 5 Closed geodesies on Finsler manifolds, sphere theorem and the Gauss- Bonnet formula .............................. 33 Morse theory and nonlinear differential equations 41 Thomas Bartsch, Andrzej Szulkin and Michel Willem 1 Introduction................................ 41 2 Global theory ............................... 43 3 Local theory................................ 51 4 Applications................................ 53 5 Strongly indefinite Morse theory ..................... 58 6 Strongly indefinite variational problems.................. 63 Index theory 75 David Bleecker 1 Introduction and some history....................... 75 2 Fredholm operators - theory and examples................ 77 3 The space of Fredholm operators and A -theory.............. 86 4 Elliptic operators and Sobolev spaces................... 95 5 The Atiyah-Singer Index Theorem .................... 104 6 Generalizations .............................. 139 viii Contents Partial differential equations on closed and open manifolds 147 Jiirgen Eichhorn 1 Introduction................................ 147 2 Sobolev spaces............................... 148 3 Non-linear Sobolev structures....................... 157 4 Self-adjoint linear differential operators on manifolds and their spectral theory ................................... 167 5 The spectral value zero .......................... 177 6 The heat equation, the heat kernel and the heat flow ........... 189 7 The wave equation, its Hamiltonian approach and completeness..... 204 8 Index theory on open manifolds...................... 211 9 The continuity method for non-linear PDEs on open manifolds..... 235 10 Teichmiiller theory............................. 237 11 Harmonic maps .............................. 248 12 Non-linear field theories.......................... 253 13 Gauge theory................................ 258 14 Fluid dynamics............................... 268 15 The Ricci flow............................... 277 Spectral geometry 289 P. Gilkey 1 Introduction................................ 289 2 The geometry of operators of Laplace and Dirac type .......... 290 3 Heat trace asymptotics for closed manifolds ............... 291 4 Hearing the shape of a drum........................ 294 5 Heat trace asymptotics of manifolds with boundary............ 296 6 Heat trace asymptotics and index theory ................. 303 7 Heat content asymptotics ......................... 306 8 Heat content with source terms...................... 312 9 Time dependent phenomena........................ 314 10 Spectral boundary conditions....................... 315 11 Operators which are not of Laplace type ................. 316 12 The spectral geometry of Riemannian submersions............ 317 Lagrangian formalism on Grassmann manifolds 327 D. R. Grigore 1 Introduction................................ 327 2 Grassmann manifolds........................... 328 3 The Lagrangian formalism on a Grassmann manifold .......... 344 4 Lagrangian formalism on second order Grassmann bundles....... 357 5 Some applications............................. 362 Sobolev spaces on manifolds 375 Emmanuel Hebey and Frederic Robert 1 Motivations ................................ 375 2 Sobolev spaces on manifolds: definition and first properties....... 376 3 Equality and density issues ........................ 380 Contents ix 4 Embedding theorems, Part I........................ 381 5 Euclidean type inequalities ........................ 388 6 Embedding theorems, Part II ....................... 389 7 Embedding theorems, Part III....................... 392 8 Compact embeddings........................... 394 9 Best constants............................... 394 10 Explicit sharp inequalities......................... 405 11 The Cartan-Hadamard conjecture..................... 406 Harmonic maps 417 Frederic Helein and John C. Wood 1 Harmonic functions on Euclidean spaces................. 418 2 Harmonic maps between Riemannian manifolds............. 421 3 Weakly harmonic maps and Sobolev spaces between manifolds..... 429 4 Regularity................................. 442 5 Existence methods............................. 453 6 Other analytical properties......................... 468 7 Twistor theory and completely integrable systems ............ 473 Topology of differentiable mappings 493 Kevin Houston 1 Introduction................................ 493 2 Manifolds and singularities........................ 495 3 Milnor fibre ................................ 498 4 Monodromy................................ 504 5 Stratifications of spaces.......................... 507 6 Stratified Morse theory .......................... 512 7 Rectified homotopical depth........................ 517 8 Relative stratified Morse theory...................... 520 9 Topology of images and multiple point spaces.............. 521 10 The image computing spectral sequence ................. 525 Group actions and Hilbert s fifth problem 533 Soren lllman 1 Hilbert s fifth problem........................... 534 2 Lie groups and manifolds......................... 539 3 Group actions ............................... 540 4 Cartan and proper actions of Lie groups.................. 543 5 Non-paracompact Cartan G-manifolds .................. 548 6 Homogeneous spaces of Lie groups.................... 550 7 Twisted products.............................. 552 8 Slices.................................... 555 9 The strong Cr topologies, 1 r oo, and the very-strong C00 topology 559 10 Continuity of induced maps in the strong Cr topologies, 1 r oo, and in the very-strong C00 topology.................... 563 11 The product theorem............................ 568 12 The equivariant glueing lemma...................... 569 x Contents 13 Whitney approximation.......................... 570 14 Haar integrals of C* maps, 1 s oo, and of real analytic maps .... 572 15 Continuity of the averaging maps in the strong C topologies, 1 r co, and in the very-strong C°° topology.................. 575 16 Approximation of A -equi variant Cs maps, 1 s oo, by K- equivariant real analytic maps, in the strong Cs topologies, 1 s oo, and in the very-strong C1OC topology.................... 578 17 Approximation of Cs A -slices, 1 s oc................ 580 18 Proof of the main theorem......................... 582 Exterior differential systems 591 Niky Kamran 1 Introduction................................ 591 2 Exterior differential systems........................ 593 3 Basic existence theorems for integral manifolds of C00 systems..... 595 4 Involutive analytic systems and the Cartan-Kahler Theorem....... 600 5 Prolongation and the Cartan-Kuranishi Theorem............. 607 6 A Cartan-Kahler Theorem for C°° Pfaffian systems ........... 608 7 Characteristic cohomology ........................ 612 8 Topological obstructions.......................... 613 9 Applications to second-order scalar hyperbolic partial differential equa- tions in the plane .............................. 614 10 Some applications to differential geometry................ 616 Weil bundles as generalized jet spaces 625 Ivan Kolar 1 Weil algebras................................ 627 2 Weil bundles................................ 632 3 On the geometry of T^-prolongations .................. 641 4 Fiber product preserving bundle functors................. 650 5 Some applications............................. 656 Distributions, vector distributions, and immersions of manifolds in Euclidean spaces 665 Julius Korbas 1 Introduction................................ 665 2 Distributions on Euclidean spaces..................... 666 3 Distributions and related concepts on manifolds ............. 674 4 Vector distributions or plane fields on manifolds............. 680 5 Immersions and embeddings of manifolds in Euclidean spaces...... 706 Geometry of differential equations 725 Boris Kruglikov and Valentin Lychagin 1 Geometry of jet spaces........................... 726 2 Algebra of differential operators...................... 733 3 Formal theory of PDEs .......................... 741 4 Local and global aspects.......................... 751 Contents xi Global variational theory in fibred spaces 773 D. Krupka 1 Introduction................................ 773 2 Prolongations of fibred manifolds..................... 775 3 Differential forms on prolongations of fibred manifolds......... 782 4 Lagrange structures............................ 790 5 The structure of the Euler-Lagrange mapping............... 806 6 Invariant variational principles....................... 816 7 Remarks.................................. 820 Second Order Ordinary Differential Equations in Jet Bundles and the Inverse Problem of the Calculus of Variations 837 O. Krupkova and G. E. Prince 1 Introduction................................ 837 2 Second-order differential equations on fibred manifolds......... 839 3 Variational structures in the theory of SODEs............... 850 4 Symmetries and first integrals....................... 863 5 Geometry of regular sodes on R x TM................. 879 6 The inverse problem for semisprays.................... 884 Elements of noncommutative geometry 905 Giovanni Landi 1 Introduction................................ 905 2 Algebras instead of spaces......................... 907 3 Modules as bundles............................ 908 4 Homology and cohomology........................ 910 5 The Chern characters ........................... 915 6 Connections and gauge transformations.................. 919 7 Noncommutative manifolds........................ 923 8 Toric noncommutative manifolds..................... 935 9 The spectral geometry of the quantum group SUq(2)........... 938 De Rham cohomology 953 M. A. Malakhaltsev 1 De Rham complex............................. 954 2 Integration and de Rham cohomology. De Rham currents. Harmonic forms 959 3 Generalizations of the de Rham complex................. 961 4 Equivariant de Rham cohomology..................... 965 5 Complexes of differential forms associated to differential geometric structures.................................. 967 Topology of manifolds with corners 983 J. Margalef-Roig and E. Outerelo Dominguez 1 Introduction................................ 983 2 Quadrants ................................. 984 3 Differentiation theories .......................... 996 4 Manifolds with corners .......................... 1019 xii Contents 5 Manifolds with generalized boundary................... 1031 Jet manifolds and natural bundles 1035 D. J. Saunders 1 Introduction................................ 1035 2 Jets..................................... 1036 3 Differential equations........................... 1050 4 The calculus of variations......................... 1056 5 Natural bundles .............................. 1063 Some aspects of differential theories 1069 Jozsef Szilasi and Rezso L. Lovas 1 Background................................ 1072 2 Calculus in topological vector spaces and beyond............. 1077 3 The Chern - Rund derivative........................ 1101 Variational sequences 1115 R. Vitolo 1 Preliminaries................................ 1118 2 Contact forms............................... 1120 3 Variational bicomplex and variational sequence.............. 1128 4 C-spectral sequence and variational sequence............... 1136 5 Finite order variational sequence ..................... 1143 6 Special topics ............................... 1146 7 Notes on the development of the subject ................. 1153 The Oka-Grauert-Gromov principle for holomorphic bundles 1165 Pit-Mann Wong 1 Stein manifolds and Stein spaces..................... 1166 2 Oka s theorem............................... 1170 3 Grauert s Oka principle.......................... 1173 4 Gromov s Oka principle.......................... 1176 5 The case of Riemann surfaces....................... 1178 6 Complete intersections........................... 1180 7 Embedding dimensions of Stein spaces.................. 1184 8 Oka principle with growth condition ................... 1188 9 Oka s principle and the Moving Lemma in hyperbolic geometry..... 1194 10 The algebraic version of Oka s principle................. 1206 Abstracts 1211 Index 1219
adam_txt	Vll Contents Preface Contents vii Global aspects of Finsler geometry 1 Tadashi Aikou and Laszlo Kozma 1 Finsler metrics and connections. 1 2 Geodesies in Finsler manifolds. 16 3 Comparison theorems: Cartan-Hadamard theorem, Bonnet-Myers theo- rem, Laplacian and volume comparison. 27 4 Rigidity theorems: Finsler manifolds of scalar curvature and locally sym- metric Finsler metrics. 31 5 Closed geodesies on Finsler manifolds, sphere theorem and the Gauss- Bonnet formula . 33 Morse theory and nonlinear differential equations 41 Thomas Bartsch, Andrzej Szulkin and Michel Willem 1 Introduction. 41 2 Global theory . 43 3 Local theory. 51 4 Applications. 53 5 Strongly indefinite Morse theory . 58 6 Strongly indefinite variational problems. 63 Index theory 75 David Bleecker 1 Introduction and some history. 75 2 Fredholm operators - theory and examples. 77 3 The space of Fredholm operators and A"-theory. 86 4 Elliptic operators and Sobolev spaces. 95 5 The Atiyah-Singer Index Theorem . 104 6 Generalizations . 139 viii Contents Partial differential equations on closed and open manifolds 147 Jiirgen Eichhorn 1 Introduction. 147 2 Sobolev spaces. 148 3 Non-linear Sobolev structures. 157 4 Self-adjoint linear differential operators on manifolds and their spectral theory . 167 5 The spectral value zero . 177 6 The heat equation, the heat kernel and the heat flow . 189 7 The wave equation, its Hamiltonian approach and completeness. 204 8 Index theory on open manifolds. 211 9 The continuity method for non-linear PDEs on open manifolds. 235 10 Teichmiiller theory. 237 11 Harmonic maps . 248 12 Non-linear field theories. 253 13 Gauge theory. 258 14 Fluid dynamics. 268 15 The Ricci flow. 277 Spectral geometry 289 P. Gilkey 1 Introduction. 289 2 The geometry of operators of Laplace and Dirac type . 290 3 Heat trace asymptotics for closed manifolds . 291 4 Hearing the shape of a drum. 294 5 Heat trace asymptotics of manifolds with boundary. 296 6 Heat trace asymptotics and index theory . 303 7 Heat content asymptotics . 306 8 Heat content with source terms. 312 9 Time dependent phenomena. 314 10 Spectral boundary conditions. 315 11 Operators which are not of Laplace type . 316 12 The spectral geometry of Riemannian submersions. 317 Lagrangian formalism on Grassmann manifolds 327 D. R. Grigore 1 Introduction. 327 2 Grassmann manifolds. 328 3 The Lagrangian formalism on a Grassmann manifold . 344 4 Lagrangian formalism on second order Grassmann bundles. 357 5 Some applications. 362 Sobolev spaces on manifolds 375 Emmanuel Hebey and Frederic Robert 1 Motivations . 375 2 Sobolev spaces on manifolds: definition and first properties. 376 3 Equality and density issues . 380 Contents ix 4 Embedding theorems, Part I. 381 5 Euclidean type inequalities . 388 6 Embedding theorems, Part II . 389 7 Embedding theorems, Part III. 392 8 Compact embeddings. 394 9 Best constants. 394 10 Explicit sharp inequalities. 405 11 The Cartan-Hadamard conjecture. 406 Harmonic maps 417 Frederic Helein and John C. Wood 1 Harmonic functions on Euclidean spaces. 418 2 Harmonic maps between Riemannian manifolds. 421 3 Weakly harmonic maps and Sobolev spaces between manifolds. 429 4 Regularity. 442 5 Existence methods. 453 6 Other analytical properties. 468 7 Twistor theory and completely integrable systems . 473 Topology of differentiable mappings 493 Kevin Houston 1 Introduction. 493 2 Manifolds and singularities. 495 3 Milnor fibre . 498 4 Monodromy. 504 5 Stratifications of spaces. 507 6 Stratified Morse theory . 512 7 Rectified homotopical depth. 517 8 Relative stratified Morse theory. 520 9 Topology of images and multiple point spaces. 521 10 The image computing spectral sequence . 525 Group actions and Hilbert's fifth problem 533 Soren lllman 1 Hilbert's fifth problem. 534 2 Lie groups and manifolds. 539 3 Group actions . 540 4 Cartan and proper actions of Lie groups. 543 5 Non-paracompact Cartan G-manifolds . 548 6 Homogeneous spaces of Lie groups. 550 7 Twisted products. 552 8 Slices. 555 9 The strong Cr topologies, 1 r oo, and the very-strong C00 topology 559 10 Continuity of induced maps in the strong Cr topologies, 1 r oo, and in the very-strong C00 topology. 563 11 The product theorem. 568 12 The equivariant glueing lemma. 569 x Contents 13 Whitney approximation. 570 14 Haar integrals of C* maps, 1 s oo, and of real analytic maps . 572 15 Continuity of the averaging maps in the strong C topologies, 1 r co, and in the very-strong C°° topology. 575 16 Approximation of A'-equi variant Cs maps, 1 s oo, by K- equivariant real analytic maps, in the strong Cs topologies, 1 s oo, and in the very-strong C1OC topology. 578 17 Approximation of Cs A'-slices, 1 s oc. 580 18 Proof of the main theorem. 582 Exterior differential systems 591 Niky Kamran 1 Introduction. 591 2 Exterior differential systems. 593 3 Basic existence theorems for integral manifolds of C00 systems. 595 4 Involutive analytic systems and the Cartan-Kahler Theorem. 600 5 Prolongation and the Cartan-Kuranishi Theorem. 607 6 A Cartan-Kahler Theorem for C°° Pfaffian systems . 608 7 Characteristic cohomology . 612 8 Topological obstructions. 613 9 Applications to second-order scalar hyperbolic partial differential equa- tions in the plane . 614 10 Some applications to differential geometry. 616 Weil bundles as generalized jet spaces 625 Ivan Kolar 1 Weil algebras. 627 2 Weil bundles. 632 3 On the geometry of T^-prolongations . 641 4 Fiber product preserving bundle functors. 650 5 Some applications. 656 Distributions, vector distributions, and immersions of manifolds in Euclidean spaces 665 Julius Korbas 1 Introduction. 665 2 Distributions on Euclidean spaces. 666 3 Distributions and related concepts on manifolds . 674 4 Vector distributions or plane fields on manifolds. 680 5 Immersions and embeddings of manifolds in Euclidean spaces. 706 Geometry of differential equations 725 Boris Kruglikov and Valentin Lychagin 1 Geometry of jet spaces. 726 2 Algebra of differential operators. 733 3 Formal theory of PDEs . 741 4 Local and global aspects. 751 Contents xi Global variational theory in fibred spaces 773 D. Krupka 1 Introduction. 773 2 Prolongations of fibred manifolds. 775 3 Differential forms on prolongations of fibred manifolds. 782 4 Lagrange structures. 790 5 The structure of the Euler-Lagrange mapping. 806 6 Invariant variational principles. 816 7 Remarks. 820 Second Order Ordinary Differential Equations in Jet Bundles and the Inverse Problem of the Calculus of Variations 837 O. Krupkova and G. E. Prince 1 Introduction. 837 2 Second-order differential equations on fibred manifolds. 839 3 Variational structures in the theory of SODEs. 850 4 Symmetries and first integrals. 863 5 Geometry of regular sodes on R x TM. 879 6 The inverse problem for semisprays. 884 Elements of noncommutative geometry 905 Giovanni Landi 1 Introduction. 905 2 Algebras instead of spaces. 907 3 Modules as bundles. 908 4 Homology and cohomology. 910 5 The Chern characters . 915 6 Connections and gauge transformations. 919 7 Noncommutative manifolds. 923 8 Toric noncommutative manifolds. 935 9 The spectral geometry of the quantum group SUq(2). 938 De Rham cohomology 953 M. A. Malakhaltsev 1 De Rham complex. 954 2 Integration and de Rham cohomology. De Rham currents. Harmonic forms 959 3 Generalizations of the de Rham complex. 961 4 Equivariant de Rham cohomology. 965 5 Complexes of differential forms associated to differential geometric structures. 967 Topology of manifolds with corners 983 J. Margalef-Roig and E. Outerelo Dominguez 1 Introduction. 983 2 Quadrants . 984 3 Differentiation theories . 996 4 Manifolds with corners . 1019 xii Contents 5 Manifolds with generalized boundary. 1031 Jet manifolds and natural bundles 1035 D. J. Saunders 1 Introduction. 1035 2 Jets. 1036 3 Differential equations. 1050 4 The calculus of variations. 1056 5 Natural bundles . 1063 Some aspects of differential theories 1069 Jozsef Szilasi and Rezso L. Lovas 1 Background. 1072 2 Calculus in topological vector spaces and beyond. 1077 3 The Chern - Rund derivative. 1101 Variational sequences 1115 R. Vitolo 1 Preliminaries. 1118 2 Contact forms. 1120 3 Variational bicomplex and variational sequence. 1128 4 C-spectral sequence and variational sequence. 1136 5 Finite order variational sequence . 1143 6 Special topics . 1146 7 Notes on the development of the subject . 1153 The Oka-Grauert-Gromov principle for holomorphic bundles 1165 Pit-Mann Wong 1 Stein manifolds and Stein spaces. 1166 2 Oka's theorem. 1170 3 Grauert's Oka principle. 1173 4 Gromov's Oka principle. 1176 5 The case of Riemann surfaces. 1178 6 Complete intersections. 1180 7 Embedding dimensions of Stein spaces. 1184 8 Oka principle with growth condition . 1188 9 Oka's principle and the Moving Lemma in hyperbolic geometry. 1194 10 The algebraic version of Oka's principle. 1206 Abstracts 1211 Index 1219
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spelling	Handbook of global analysis ed. by Demeter Krupka ... Global analysis 1. ed. Amsterdam [u.a.] Elsevier 2008 XII, 1229 S. txt rdacontent n rdamedia nc rdacarrier Global analysis (Mathematics) Mathematische Physik Mathematical physics Mathematische Physik (DE-588)4037952-8 gnd rswk-swf Differentialgeometrie (DE-588)4012248-7 gnd rswk-swf Globale Analysis (DE-588)4021285-3 gnd rswk-swf Globale Analysis (DE-588)4021285-3 s DE-604 Differentialgeometrie (DE-588)4012248-7 s Mathematische Physik (DE-588)4037952-8 s Krupka, Demeter Sonstige oth HBZ Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=016287978&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Handbook of global analysis Global analysis (Mathematics) Mathematische Physik Mathematical physics Mathematische Physik (DE-588)4037952-8 gnd Differentialgeometrie (DE-588)4012248-7 gnd Globale Analysis (DE-588)4021285-3 gnd
subject_GND	(DE-588)4037952-8 (DE-588)4012248-7 (DE-588)4021285-3
title	Handbook of global analysis
title_alt	Global analysis
title_auth	Handbook of global analysis
title_exact_search	Handbook of global analysis
title_exact_search_txtP	Handbook of global analysis
title_full	Handbook of global analysis ed. by Demeter Krupka ...
title_fullStr	Handbook of global analysis ed. by Demeter Krupka ...
title_full_unstemmed	Handbook of global analysis ed. by Demeter Krupka ...
title_short	Handbook of global analysis
title_sort	handbook of global analysis
topic	Global analysis (Mathematics) Mathematische Physik Mathematical physics Mathematische Physik (DE-588)4037952-8 gnd Differentialgeometrie (DE-588)4012248-7 gnd Globale Analysis (DE-588)4021285-3 gnd
topic_facet	Global analysis (Mathematics) Mathematische Physik Mathematical physics Differentialgeometrie Globale Analysis
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=016287978&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
work_keys_str_mv	AT krupkademeter handbookofglobalanalysis AT krupkademeter globalanalysis

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